For what value of k is the given pair of linear equations inconsistent 3x y 1
Ex 3.5 ,2 (ii) For which value of k will the following pair of linear equations have no solution? 3x + y = 1 (2k – 1) x + (k – 1) y = 2k+ 1 3x + y = 1 (2k – 1)x + (k – 1)y = 2k + 1 3x + y = 1 3x + y – 1 = 0 Comparing with a1x + b1y + c1 = 0 ∴ a1 = 3, b1 = 1, c1 = –1 (2k – 1)x + (k – 1)y = 2k + 1 (2k – 1)x + (k – 1)y – (2k + 1)= 0 Comparing with a2x + b2y + c2 = 0 ∴ a2 = (2k – 1), b2 = (k – 1), c2 = – (2k + 1) So, a1 = 3, b1 = 1, c1 = –1 & a2 = (2k – 1), b2 = (k – 1), c2 = – (2k + 1) It is given that the equation has no solution So, 𝒂𝟏/𝒂𝟐 = 𝒃𝟏/𝒃𝟐 ≠ 𝒄𝟏/𝒄𝟐 Taking 𝒂𝟏/𝒂𝟐 = 𝒃𝟏/𝒃𝟐 3/((2𝑘 − 1)) = 1/((𝑘 − 1)) 3(k – 1) = 1(2k – 1) 3k – 3 = 2k – 1 3k – 2k = 3 – 1 k = 2 Therefore, for k = 2 the given set of equations have no solutions
3x + y 1 = 0 (2k –1)x + (k –1)y  (2k + 1) = 0 `a_1/a_2 = 3/(2k1)` `b_1/b_2 = 1/(k1)` `c_1/c_2 = (1)/(2k1) = 1/(2k+1)` For no solutions, `a_1/a_2 = b_1/b_2 ≠ c_1/c_2` `3/(2k1) = 1/(k1) ≠ 1/(2k+1)` `3/(2k1) = 1/(k1)` 3k  3 = 2k  1 k = 2 Hence, for k = 2, the given equation has no solution. 3x + y 1 = 0 (2k 1)x + (k1)y – 2k 1 = 0 a1/a2 = 3/(2k 1) , b1/b2 = 1/(k1), c1/c2 = 1/(2k 1) = 1/( 2k +1) For no solutions a1/a2 = b1/b2 ≠ c1/c2 3/(2k1) = 1/(k 1) ≠ 1/(2k +1) 3/(2k –1) = 1/(k 1) 3k 3 = 2k 1 k =2 Therefore, for k = 2 the given pair of linear equations will have no solution. Students who wish to excel in exams practise RD Sharma Solutions for Class 10. This solution guide also builds a foundation in the student’s life. This chapter is an extension of what you have learnt from the middle school about linear equations in one variable. Let’s see some of the concepts discussed in this chapter:
Chapter 3 Pair Of Linear Equations In Two Variables
Exercise
Download RD Sharma Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations In Two Variables PDF
Access the RD Sharma Solutions For Class 10 Maths Chapter 3 – Pair of Linear Equations In Two VariablesExercise 3.1 Page No: 3.12 Solution: Let ‘x’ be the number of rides Akhila had on the giant wheel. And, let ‘y’ be the number of times she played Hoopla. From the question we can write the below pair of equations. y = (1/2)x ⇒ x 2y = 0……. (i) 3x + 4y = 20……. (ii) To represent these equations graphically we need at least two solutions for each (i) and (ii). And let’s put them in a table for each: For equation (i), x02y = (1/2)x01 For equation (ii), x020/34y = (20 – 3x)/4502 When: The solution of the variable is zero; the equation can be solved easily. Putting x =0 in equation (ii) we get 4y = 20 ⇒y = 5 Similarly putting y = 0 in equation (ii) we get 3x = 20 ⇒x = 20/3 but it is not an integer so it is not easy to plot on graph paper. So, we chose y=2 which gives x =4 as an integer value. The above can be plotted in a graph as below: We can observe that the two lines represents the equations (i) and (ii) intersect at a single point. 2. Aftab tells his daughter, “Seven years ago, I was seven times as old as you were then. Also, three years from now, I shall be three times as old as you will be.” Is not this interesting? Represent this situation algebraically and graphically. Solution: Let the present age of Aftab and his daughter be x and y respectively. Hence, seven years ago, Age of Aftab = x – 7 and Age of his daughter = y – 7 According to the given condition, x – 7 = 7 (y – 7) ⇒ x – 7y = 42……… (i) Three years from the present age, x + 3 = 3 (y + 3) ⇒x – 3y = 6………..(ii) Therefore, equations (i) and (ii) represents the situation algebraically. To represent these equations graphically we need at least two solutions for each (i) and (ii). And let’s put them in a table for each: For equation (i), x707y = (x + 42)/7567 For equation (ii), x630y = (x – 6)/3012 The above can be plotted in a graph as below: 3. The path of the train A is given by the equation 3x+4y12 =0 and the path of another train B is given by the equation 6x+8y48 =0. Represent this situation graphically. Solution: Given pair of linear equations which represents the paths of train A and train B, 3x + 4y – 12 = 0………………………….. (i) 6x + 8y – 48 = 0 ………………………….. (ii) To represent these equations graphically we need at least two solutions for each (i) and (ii). And let’s put them in a table for each: For equation (i), x04y = (12 – 3x)/430 For equation (i), x08y = (48 – 6x)/860 The above can be plotted in a graph as below: Exercise 3.2 Page No: 3.29 Solve the following system of equations graphically: 1. x + y = 3 2x + 5y = 12 Solution: Given, x + y = 3……. (i) 2x + 5y = 12……. (ii) For equation (i), When y = 0, we have x =3 When x= 0, we have y =3 Thus we have the following table giving points on the line x + y = 3 x03y30 For equation (ii), We solve for y: ⇒ y = (12 – 2x)/5 So, when x = 1 y = (12 – 2(1))/5 = 2 And, when x = 6 ⇒ y = (12 – 2(6))/5 = 0 Thus we have the following table giving points on the line 2x + 5y = 12 x16y20 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (1, 2) Hence, x= 1 and y = 2 2. x – 2y = 5 2x + 3y = 10 Solution: Given, x – 2y = 5……. (i) 2x + 3y = 10……. (ii) For equation (i), ⇒ y = (x – 5)/2 When y = 0, we have x = 5 When x = 1, we have y = 2 Thus we have the following table giving points on the line x – 2y = 5 x5 1y02 For equation (ii), We solve for y: ⇒ y = (10 – 2x)/3 So, when x = 5 y = (10 – 2(5))/3 = 0 And, when x = 2 ⇒ y = (10 – 2(2))/3 =2 Thus we have the following table giving points on the line 2x + 3y = 10 x52y02 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (5, 0) Hence, x= 5 and y = 0 3. 3x+ y + 1 = 0 2x – 3y + 8 = 0 Solution: Given, 3x+ y + 1 = 0 ……. (i) 2x – 3y + 8 = 0……. (ii) For equation (i), ⇒ y = (1 + 3x) When x = 0, we have y = 1 When x = 1, we have y = 2 Thus we have the following table giving points on the line 3x+ y + 1 = 0 x10y21 For equation (ii), We solve for y: ⇒ y = (2x + 8)/ 3 So, when x = 4 y = (2(4) + 8)/3 = 0 And, when x = 1 ⇒ y = (2(1) + 8)/3 = 2 Thus we have the following table giving points on the line 2x – 3y + 8 = 0 x41y02 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (1, 2) Hence, x= 4 and y = 0 4. 2x + y – 3 = 0 2x – 3y – 7 = 0 Solution: Given, 2x + y – 3 = 0……. (i) 2x – 3y – 7 = 0……. (ii) For equation (i), ⇒ y = (3 – 2x) When x = 0, we have y = (3 – 2(0)) = 3 When x = 1, we have y = (3 – 2(1)) = 1 Thus we have the following table giving points on the line 2x + y – 3 = 0 x01y31 For equation (ii), We solve for y: ⇒ y = (2x – 7)/ 3 So, when x = 2 y = (2(2) – 7)/3 = 1 And, when x = 5 ⇒ y = (2(5) – 7)/3 = 1 Thus we have the following table giving points on the line 2x – 3y – 7 = 0 x25y11 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (2, 1) Hence, x= 2 and y = 1 5. x + y = 6 x – y = 2 Solution: Given, x + y = 6……. (i) x – y = 2……. (ii) For equation (i), ⇒ y = (6 – x) When x = 2, we have y = (6 – 2)) = 4 When x = 3, we have y = (6 – 3) = 3 Thus we have the following table giving points on the line x + y = 6 x23y43 For equation (ii), We solve for y: ⇒ y = (x – 2) So, when x = 2 y = (0 – 2) = 2 And, when x = 5 ⇒ y = (2 – 2) = 0 Thus we have the following table giving points on the line x – y = 2 x02y20 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (4, 2) Hence, x= 4 and y = 2 6. x – 2y = 6 3x – 6y = 0 Solution: Given, x – 2y = 6……. (i) 3x – 6y = 0……. (ii) For equation (i), ⇒ y = (x – 6)/2 When x = 2, we have y = (2 – 6)/2 = 2 When x = 0, we have y = (0 – 6)/2 = 3 Thus we have the following table giving points on the line x – 2y = 6 x20y23 For equation (ii), We solve for y: ⇒ y = x/ 2 So, when x = 0 y = 0/2 = 0 And, when x = 2 ⇒ y = 2/2 = 1 Thus we have the following table giving points on the line 3x – 6y = 0 x02y01 Graph of the equations (i) and (ii) is as below: Clearly the two lines are parallel to each other. So, the two lines do not intersect. Hence, the given system has no solutions. 7. x + y = 4 2x – 3y = 3 Solution: Given, x + y = 4……. (i) 2x – 3y = 3……. (ii) For equation (i), ⇒ y = (4 – x) When x = 4, we have y = (4 – 4) = 0 When x = 2, we have y = (4 – 2) = 2 Thus we have the following table giving points on the line x + y = 4 x42y02 For equation (ii), We solve for y: ⇒ y = (2x – 3)/3 So, when x = 3 y = (2(3) – 3)/3 = 1 And, when x = 0 ⇒ y = (2(0) – 3)/3 = 1 Thus we have the following table giving points on the line 2x – 3y = 3 x30y11 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (3, 1) Hence, x= 3 and y = 1 8. 2x + 3y = 4 x – y + 3 = 0 Solution: Given, 2x + 3y = 4……. (i) x – y + 3 = 0……. (ii) For equation (i), ⇒ y = (4 – 2x) /3 When x = 1, we have y = (4 – 2(1))/3 = 2 When x = 2, we have y = (4 – 2(2))/3 = 0 Thus we have the following table giving points on the line 2x + 3y = 4 x12y20 For equation (ii), We solve for y: ⇒ y = (x + 3) So, when x = 0 y = ( 0 + 3) = 3 And, when x = 1 ⇒ y = ( 1 + 3) = 4 Thus we have the following table giving points on the line x – y + 3 = 0 x01y34 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (1, 2) Hence, x= 1 and y = 2 9. 2x – 3y + 13 = 0 3x – 2y + 12 = 0 Solution: Given, 2x – 3y + 13 = 0……. (i) 3x – 2y + 12 = 0……. (ii) For equation (i), ⇒ y = (2x + 13) /3 When x = 5, we have y = (2(5) + 13))/3 = 1 When x = 2, we have y = (2(2) + 13))/3 = 3 Thus we have the following table giving points on the line 2x – 3y + 13 = 0 x52y13 For equation (ii), We solve for y: ⇒ y = (3x + 12)/2 So, when x = 4 y = (3(4) + 12)/2 = 0 And, when x = 2 ⇒ y = (3(2) + 12)/2 = 3 Thus we have the following table giving points on the line 3x – 2y + 12 = 0 x42y03 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (2, 3) Hence, x= 2 and y = 3 10. 2x + 3y + 5 = 0 3x + 2y – 12 = 0 Solution: Given, 2x + 3y + 5 = 0……. (i) 3x – 2y – 12 = 0……. (ii) For equation (i), ⇒ y = (2x + 5) /3 When x = 4, we have y = (2(4) + 5))/3 = 1 When x = 2, we have y = (2(2) + 5))/3 = 1 Thus we have the following table giving points on the line 2x + 3y + 5 = 0 x41y11 For equation (ii), We solve for y: ⇒ y = (3x – 12)/2 So, when x = 4 y = (3(4) – 12)/2 = 0 And, when x = 6 ⇒ y = (3(6) – 12)/2 = 3 Thus we have the following table giving points on the line 3x – 2y – 12 = 0 x46y03 Graph of the equations (i) and (ii) is as below: Clearly the two lines intersect at a single point P (2, 3) Hence, x= 2 and y = 3 Show graphically that each one of the following systems of equation has infinitely many solution: 11. 2x + 3y = 6 4x + 6y = 12 Solution: Given, 2x + 3y = 6……. (i) 4x + 6y = 12……. (ii) For equation (i), ⇒ y = (6 – 2x) /3 When x = 0, we have y = (6 – 2(0))/3 = 2 When x = 3, we have y = (6 – 2(3))/3 = 0 Thus we have the following table giving points on the line 2x + 3y = 6 x03y20 For equation (ii), We solve for y: ⇒ y = (12 – 4x)/6 So, when x = 0 y = (12 – 4(0))/6 = 2 And, when x = 3 ⇒ y = (12 – 4(3))/6 = 0 Thus we have the following table giving points on the line 4x + 6y = 12 x03y20 Graph of the equations (i) and (ii) is as below: Thus, the graphs of the two equations are coincident. Hence, the system of equations has infinitely many solutions. 12. x – 2y = 5 3x – 6y = 15 Solution: Given, x – 2y = 5……. (i) 3x – 6y = 15……. (ii) For equation (i), ⇒ y = (x – 5) /2 When x = 3, we have y = (3 – 5) /2 = 1 When x = 5, we have y = (5 – 5) /2 = 0 Thus we have the following table giving points on the line x – 2y = 5 x35y10 For equation (ii), We solve for y: ⇒ y = (3x – 15)/6 So, when x = 1 y = (3(1) – 15)/6= 2 And, when x = 1 ⇒ y = (3(1) – 15)/6= 3 Thus we have the following table giving points on the line 3x – 6y = 15 x11y23 Graph of the equations (i) and (ii) is as below: Thus, the graphs of the two equations are coincident. Hence, the system of equations has infinitely many solutions. 13. 3x + y = 8 6x + 2y = 16 Solution: Given, 3x + y = 8……. (i) 6x + 2y = 16……. (ii) For equation (i), ⇒ y = (8 – 3x) When x = 2, we have y = (8 – 3(2)) = 2 When x = 3, we have y = (8 – 3(3)) = 1 Thus we have the following table giving points on the line 3x + y = 8 x23y21 For equation (ii), We solve for y: ⇒ y = (16 – 6x)/2 So, when x = 3 y = (16 – 6(3))/2= 1 And, when x = 1 ⇒ y = (16 – 6(1))/2= 5 Thus we have the following table giving points on the line 6x + 2y = 16 x31y15 Graph of the equations (i) and (ii) is as below: Thus, the graphs of the two equations are coincident. Hence, the system of equations has infinitely many solutions. 14. x – 2y + 11 = 0 3x + 6y + 33 = 0 Solution: Given, x – 2y + 11 = 0……. (i) 3x – 6y + 33 = 0……. (ii) For equation (i), ⇒ y = (x + 11)/2 When x = 1, we have y = (1 + 11)/2 = 5 When x = 3, we have y = (3 + 11)/2 = 4 Thus we have the following table giving points on the line x – 2y + 11 = 0 x13y54 For equation (ii), We solve for y: ⇒ y = (3x + 33)/6 So, when x = 1 y = (3(1) + 33)/6 = 6 And, when x = 1 ⇒ y = (3(1) + 33)/6 = 5 Thus we have the following table giving points on the line 3x – 6y + 33 = 0 x11y65 Graph of the equations (i) and (ii) is as below: Thus, the graphs of the two equations are coincident. Hence, the system of equations has infinitely many solutions. Show graphically that each one of the following systems of equations is inconsistent (i.e has no solution): 15. 3x – 5y = 20 6x – 10y = – 40 Solution: Given, 3x – 5y = 20……. (i) 6x – 10y = – 40……. (ii) For equation (i), ⇒ y = (3x – 20)/5 When x = 5, we have y = (3(5) – 20)/5 = 1 When x = 0, we have y = (3(0) – 20)/5 = 4 Thus we have the following table giving points on the line 3x – 5y = 20 x50y14 For equation (ii), We solve for y: ⇒ y = (6x + 40)/10 So, when x = 0 y = (6(0) + 40)/10 = 4 And, when x = 5 ⇒ y = (6(5) + 40)/10 = 1 Thus we have the following table giving points on the line 6x – 10y = – 40 x05y41 Graph of the equations (i) and (ii) is as below: It is clearly seen that, there is no common point between these two lines. Hence, the given systems of equations is inconsistent. 16. x – 2y = 6 3x – 6y = 0 Solution: Given, x – 2y = 6……. (i) 3x – 6y = 0……. (ii) For equation (i), ⇒ y = (x – 6)/2 When x = 6, we have y = (6 – 6)/2 = 0 When x = 2 we have y = (2 – 6)/2 = 2 Thus we have the following table giving points on the line x – 2y = 6 x62y02 For equation (ii), We solve for y: ⇒ y = x/2 So, when x = 0 y = 0/2 = 0 And, when x = 2 ⇒ y = 2/2 = 1 Thus we have the following table giving points on the line 3x – 6y = 0 x02y01 Graph of the equations (i) and (ii) is as below: It is clearly seen that, there is no common point between these two lines. Hence, the given systems of equations is inconsistent. 17. 2y – x = 9 6y – 3x = 21 Solution: Given, 2y – x = 9……. (i) 6y – 3x = 21……. (ii) For equation (i), ⇒ y = (x + 9)/2 When x = 3, we have y = (3 + 9)/2= 3 When x = 1, we have y = (1 + 9)/2= 4 Thus we have the following table giving points on the line 2y – x = 9 x31y34 For equation (ii), We solve for y: ⇒ y = (21 + 3x)/6 So, when x = 3 y = (21 + 3(3))/6 = 2 And, when x = 1 ⇒ y = (21 + 3(1))/6 = 3 Thus we have the following table giving points on the line 6y – 3x = 21 x31y23 Graph of the equations (i) and (ii) is as below: It is clearly seen that, there is no common point between these two lines. Hence, the given systems of equations is inconsistent. 18. 3x – 4y – 1 = 0 2x – (8/3)y + 5 = 0 Solution: Given, 3x – 4y – 1 = 0……. (i) 2x – (8/3)y + 5 = 0……. (ii) For equation (i), ⇒ y = (3x – 1)/4 When x = 1, we have y = (3(1) – 1)/4= 1 When x = 3, we have y = (3(3) – 1)/4= 2 Thus we have the following table giving points on the line 3x – 4y – 1 = 0 x13y12 For equation (ii), We solve for y: ⇒ y = (6x + 15)/8 So, when x = 2.5 y = (6(2.5) + 15)/8 = 0 And, when x = 1.5 ⇒ y = (6(1.5) + 15)/8 = 3 Thus we have the following table giving points on the line 2x – (8/3)y + 5 = 0 x2.51.5y03 Graph of the equations (i) and (ii) is as below: It is clearly seen that, there is no common point between these two lines. Hence, the given systems of equations is inconsistent. 19. Determine graphically the vertices of the triangle, the equations of whose sides are given below: (i) 2y – x = 8, 5y – x = 14 and y – 2x = 1 Solution: Given, 2y – x = 8……. (i) 5y – x = 14……. (ii) y – 2x = 1……… (iii) For equation (i), ⇒ y = (x + 8)/2 When x = 4, we have y = (4 + 8)/2 = 2 When x = 0, we have y = (0 + 8)/2 = 4 Thus we have the following table giving points on the line 2y – x = 8 x40y24 For equation (ii), We solve for y: ⇒ y = (x + 14)/5 So, when x = 4 y = ((4) + 14)/5= 2 And, when x = 1 ⇒ y = (1 + 14)/5= 3 Thus we have the following table giving points on the line 5y – x = 14 x41y23 Finally, for equation (iii), ⇒ y = (2x + 1) When x = 1, we have y = (2(1) + 1) = 1 When x = 1, we have y = (2(1) + 1) = 3 Thus we have the following table giving points on the line y – 2x = 1 x11y13 Graph of the equations (i), (ii) and (iii) is as below: From the above graph, we observe that the lines taken in pairs intersect at points A(4,2), B(1,3) and C(2,5) Hence the vertices of the triangle are A(4, 2), B(1, 3) and C(2,5) (ii) y = x, y = 0 and 3x + 3y = 10 Solution: Given, y = x ……. (i) y = 0 ……. (ii) 3x + 3y = 10……… (iii) For equation (i), When x = 1, we have y = 1 When x = 2, we have y = 2 Thus we have the following table giving points on the line y = x x12y12 For equation (ii), When x = 0 y = 0 And, when x = 10/3 ⇒ y = 0 Thus we have the following table giving points on the line y = 0 x010/3y010/3 Finally, for equation (iii), ⇒ y = (10 – 3x)/3 When x = 1, we have y = (10 – 3(1))/3) = 7/3 When x = 2, we have y = (10 – 3(2))/3 = 4/3 Thus we have the following table giving points on the line 3x + 3y = 10 x12y7/34/3 Graph of the equations (i), (ii) and (iii) is as below: From the above graph, we observe that the lines taken in pairs intersect at points A(0,0) B(10/3,0) and C(5/3, 5/3) Hence the vertices of the triangle are A(0,0) B(10/3,0) and C(5/3, 5/3). 20. Determine graphically whether the system of equations x – 2y = 2, 4x – 2y = 5 is consistent or inconsistent. Solution: Given, x – 2y = 2……. (i) 4x – 2y = 5……. (ii) For equation (i), ⇒ y = (x – 2)/2 When x = 2, we have y = (2 – 2)/2 = 0 When x = 0, we have y = (0 – 2)/2 = 1 Thus we have the following table giving points on the line x – 2y = 2 x20y01 For equation (ii), We solve for x: ⇒ x = (5 + 2y)/4 So, when y = 0 x = (5 + 2(0))/4 = 5/4 And, when y = 1.5 ⇒ x = (5 + 2(1))/4 = 7/4 Thus we have the following table giving points on the line 4x – 2y = 5 x5/47/4y01 Graph of the equations (i) and (ii) is as below: It is clearly seen that the two lines intersect at (1,0) Hence, the system of equations is consistent. 21. Determine by drawing graphs, whether the following system of linear equation has a unique solution or not: (i) 2x – 3y = 6 and x + y = 1 Solution: Given, 2x – 3y = 6 ……. (i) x + y = 1……. (ii) For equation (i), ⇒ y = (2x – 6)/3 When x = 3, we have y = (2(3) – 6)/3= 0 When x = 0, we have y = (2(0) – 6)/3= 2 Thus we have the following table giving points on the line 2x – 3y = 6 x30y02 For equation (ii), We solve for y: ⇒ y = (1 – x) So, when x = 0 y = (1 – 0) = 1 And, when x = 1 ⇒ y = (1 – 1) = 0 Thus we have the following table giving points on the line x + y = 1 x01y10 Graph of the equations (i) and (ii) is as below: It’s seen clearly that the two lines intersect at one. Thus, we can conclude that the system of equations has a unique solution. (ii) 2y = 4x – 6 and 2x = y + 3 Solution: Given, 2y = 4x – 6……. (i) 2x = y + 3……. (ii) For equation (i), ⇒ y = (4x – 6)/2 When x = 1, we have y = (4(1) – 6)/2 = 1 When x = 4, we have y = (4(4) – 6)/2= 5 Thus we have the following table giving points on the line 2y = 4x – 6 x14y15 For equation (ii), We solve for y: ⇒ y = 2x – 3 So, when x = 2 y = 2(2) – 3 = 1 And, when x = 3 ⇒ y = 2(3) – 3 = 3 Thus we have the following table giving points on the line 2x = y + 3 x23y13 Graph of the equations (i) and (ii) is as below: We see that the two lines are coincident. And, hence it has infinitely many solutions. Therefore, the system of equations does not have a unique solution. Exercise 3.3 Page No: 3.44 Solve the following system of equations: 1. 11x + 15y + 23 = 0 7x – 2y – 20 = 0 Solution: The given pair of equations are: 11x +15y + 23 = 0 …………………………. (i) 7x – 2y – 20 = 0 …………………………….. (ii) From (ii) 2y = 7x – 20 ⇒ y = (7x −20)/2 ……………………………… (iii) Now, substituting y in equation (i) we get, ⇒ 11x + 15((7x−20)/2) + 23 = 0 ⇒ 11x + (105x − 300)/2 + 23 = 0 ⇒ (22x + 105x – 300 + 46) = 0 ⇒ 127x – 254 = 0 ⇒ x = 2 Next, putting the value of x in the equation (iii) we get, ⇒ y = (7(2) − 20)/2 ∴ y= 3 Thus, the value of x and y is found to be 2 and 3 respectively. 2. 3x – 7y + 10 = 0 y – 2x – 3 = 0 Solution: The given pair of equations are: 3x – 7y + 10 = 0 …………………………. (i) y – 2x – 3 = 0 ……………………………….. (ii) From (ii) y – 2x – 3 = 0 y = 2x+3 ……………………………… (iii) Now, substituting y in equation (i) we get, ⇒ 3x – 7(2x+3) + 10 = 0 ⇒ 3x – 14x – 21 + 10 = 0 ⇒ 11x = 11 ⇒ x = 1 Next, putting the value of x in the equation (iii) we get, ⇒ y = 2(1) + 3 ∴ y= 1 Thus, the value of x and y is found to be 1 and 1 respectively. 3. 0.4x + 0.3y = 1.7 0.7x – 0.2y = 0.8 Solution: The given pair of equations are: 0.4x + 0.3y = 1.7 0.7x – 0.2y = 0.8 Let’s, multiply LHS and RHS by 10 to make the coefficients as an integer 4x + 3y = 17 ……………………….. (i) 7x – 2y = 8 …………………………… (ii) From (ii) 7x – 2y = 8 x = (8 + 2y)/7……………………………… (iii) Now, substituting x in equation (i) we get, ⇒ 4[(8 + 2y)/7] + 3y = 17 ⇒ 32 + 8y + 21y = (17 x 7) ⇒ 29y = 87 ⇒ y = 3 Next, putting the value of y in the equation (iii) we get, ⇒ x = (8 + 2(3))/ 7 ⇒ x = 14/7 ∴ x = 2 Thus, the value of x and y is found to be 2 and 3 respectively. 4. x/2 + y = 0.8 7/(x+ y/2) = 10 Solution: The given pair of equations are: x/2 + y = 0.8 ⇒ x + 2y = 1.6…… (a) 7/(x + y/2) = 10 ⇒7 = 10(x + y/2) ⇒7 = 10x + 5y Let’s, multiply LHS and RHS of equation (a) by 10 for easy calculation So, we finally get 10x + 20y = 16 ……………………….. (i) And, 10x + 5y = 7 …………………………… (ii) Now, subtracting two equations we get, ⇒ (i) – (ii) 15y = 9 ⇒ y = 3/5 Next, putting the value of y in the equation (i) we get, x = [16 − 20(3/5)]/10 ⇒ (16 – 12)/10 = 4/10 ∴ x = 2/5 Thus, the value of x and y obtained are 2/5 and 3/5 respectively. 5. 7(y + 3) – 2(x + 2) = 14 4(y – 2) + 3(x – 3) = 2 Solution: The given pair of equations are: 7(y+3) – 2(x+2) = 14…………………………. (i) 4(y2) + 3(x3) = 2……………………………….. (ii) From (i), we get 7y + 21 – 2x – 4 = 14 7y = 14 + 4 – 21 + 2x ⇒ y = (2x – 3)/7 From (ii), we get 4y – 8 + 3x – 9 = 2 4y + 3x – 17 – 2 = 0 ⇒ 4y + 3x – 19 = 0 …………….. (iii) Now, substituting y in equation (iii) 4[(2x − 3)/7] + 3x – 19=0 8x – 12 + 21x – (19 x 17) = 0 [after taking LCM] 29x = 145 ⇒ x = 5 Now, putting the value of x and in the equation (ii) 4(y2) + 3(53) = 2 ⇒ 4y 8 + 6 = 2 ⇒ 4y = 4 ∴ y = 1 Thus, the value of x and y obtained are 5 and 1 respectively. 6. x/7 + y/3 = 5 x/2 – y/9 = 6 Solution: The given pair of equations are: x/7 + y/3 = 5…………………………. (i) x/2 – y/9 = 6………………………………..(ii) From (i), we get x/7 + y/3 = 5 ⇒3x + 7y = (5×21) [After taking LCM] ⇒ 3x =105 – 7y ⇒ x = (105 – 7y)/3……. (iv) From (ii), we get x/2 – y/9 = 6 ⇒ 9x – 2y = 108 ……………………… (iii) [After taking LCM] Now, substituting x in equation (iii) we get, 9[(105 − 7y)/3] – 2y = 108 ⇒ 945 – 63y – 6y = 324 [After taking LCM] ⇒ 945 – 324 = 69y ⇒ 69y = 621 ⇒ y = 9 Now, putting the value of y in the equation (iv) x = (105 − 7(9))/3 ⇒ x = (105 − 63)/3 = 42/3 ∴ x = 14 Thus, the value of x and y obtained are 14 and 9 respectively. 7. x/3 + y/4 = 11 5x/6 − y/3 = −7 Solution: The given pair of equations are: x/3 + y/4 = 11…………………………. (i) 5x/6 − y/3 = −7……………………………….. (ii) From (i), we get x/3 + y/4 = 11 ⇒4x + 3y = (11×12) [After taking LCM] ⇒ 4x =132 – 3y ⇒ x = (132 – 3y)/4……. (iv) From (ii), we get 5x/6 − y/3 = −7 ⇒ 5x – 2y = 42 ……………………… (iii) [After taking LCM] Now, substituting x in equation (iii) we get, 5[(132 − 3y)/4] – 2y = 42 ⇒ 660 – 15y – 8y = 42 x 4 [After taking LCM] ⇒ 660 + 168 = 23y ⇒ 23y = 828 ⇒ y = 36 Now, putting the value of y in the equation (iv) x = (132 – 3(36))/4 ⇒ x = (132 − 108)/4 = 24/4 ∴ x = 6 Thus, the value of x and y obtained are 6 and 36 respectively. 8. 4/x + 3y = 8 6/x −4y = −5 Solution: Taking 1/x = u Then the two equation becomes, 4u + 3y = 8…………………… (i) 6u – 4y = 5……………………. (ii) From (i), we get 4u = 8 – 3y ⇒ u = (8 − 3y)/4 …….. (iii) Substituting u in (ii) [6(8 − 3y)/4] – 4y = 5⇒ [3(8−3y)/2] − 4y = −5 ⇒ 24 − 9y −8y = −5 x 2 [After taking LCM] ⇒ 24 – 17y = 10 ⇒ 17y = 34 ⇒ y = 2 Putting y=2 in (iii) we get, u = (8 − 3(2))/4 ⇒ u = (8 − 6)/4 ⇒ u = 2/4 = 1/2 ⇒ x = 1/u = 2 ∴ x = 2 So, the solution of the pair of equations given is x=2 and y =2. 9. x + y/2 = 4 2y + x/3 = 5 Solution: The given pair of equations are: x + y/2 = 4 ……………………. (i) 2y + x/3 = 5……………………. (ii) From (i) we get, x + y/2 = 4 ⇒ 2x + y = 8 [After taking LCM] ⇒ y = 8 – 2x …..(iv) From (ii) we get, x + 6y = 15 ……………… (iii) [After taking LCM] Substituting y in (iii), we get x + 6(8 – 2x) = 15 ⇒ x + 48 – 12x = 15 ⇒ 11x = 15 – 48 ⇒ 11x = 33 ⇒ x = 3 Putting x = 3 in (iv), we get y = 8 – (2×3) ∴ y = 8 – 6 = 2 Hence, the solution of the given system of equation are x = 3 and y = 2 respectively. 10. x + 2y = 3/2 2x + y = 3/2 Solution: The given pair of equations are: x + 2y = 3/2 …………………. (i) 2x + y = 3/2…………………… (ii) Let us eliminate y from the given equations. The coefficients of y in the given equations are 2 and 1 respectively. The L.C.M of 2 and 1 is 2. So, we make the coefficient of y equal to 2 in the two equations. Multiplying equation (i)x1 and (ii)x2 ⇒ x + 2y = 3/2 ………………………. (iii) 4x + 2y = 3 ……………………………………………………. (iv) Subtracting equation (iii) from (iv) (4x – x) + (2y2y) = 3x = 3 – (3/2) ⇒ 3x = 3/2 ⇒ x = 1/2 Putting x = 1/2 in equation (iv) 4(1/2) + 2y = 3 ⇒ 2 + 2y = 3 ∴ y= 1/2 The solution of the system of equation is x = 1/2 and y = 1/2 11. √2x – √3y = 0 √3x − √8y = 0 Solution: The given pair of equations are: √2x – √3y = 0……………………….. (i) √3x − √8y = 0……………………….. (ii) From equation (i) x = √(3/2)y ……………..(iii) Substituting this value in equation (ii) we obtain √3x − √8y = 0 ⇒ √3(√(3/2)y) − √8y = 0 ⇒ (3/√2)y – √8y = 0 ⇒ 3y – 4y = 0 ⇒ y = 0 Now, substituting y in equation (iii) we obtain ⇒ x=0 Thus, the value of x and y obtained are 0 and 0 respectively. 12. 3x – (y + 7)/11 + 2 = 10 2y + (x + 11)/7 = 10 Solution: The given pair of equations are: 3x – (y + 7)/11 + 2 = 10……………….. (i) 2y + (x + 11)/7 = 10…………………….. (ii) From equation (i) 33x – y – 7 + 22 = (10 x 11) [After taking LCM] ⇒ 33x – y + 15 = 110 ⇒ 33x + 15 – 110 = y ⇒ y = 33x – 95………. (iv) From equation (ii) 14 + x + 11 = (10 x 7) [After taking LCM] ⇒ 14y + x + 11 = 70 ⇒ 14y + x = 70 – 11 ⇒ 14y + x = 59 …………………….. (iii) Substituting (iv) in (iii) we get, 14 (33x – 95) + x = 59 ⇒ 462x – 1330 + x = 59 ⇒ 463x = 1389 ⇒ x = 3 Putting x = 3 in (iii) we get, ⇒ y = 33(3) – 95 ∴ y= 4 The solution for the given pair of equations is x = 3 and y = 4 respectively. 13. 2x – (3/y) = 9 3x + (7/y) = 2 ,y ≠ 0 Solution: The given pair of equations are: 2x – (3/y) = 9……………………………. (i) 3x + (7/y) = 2…………………………… (ii) Substituting 1/y = u the above equations becomes, 2x – 3u = 9 ………………………..(iii) 3x + 7u = 2………………………..(iv) From (iii) 2x = 9 + 3u ⇒ x = (9+3u)/2 Substituting the value of x from above in the equation (iv) we get, 3[(9+3u)/2] + 7u = 2 ⇒ 27 + 9u + 14u = (2 x 2) ⇒ 27 + 23u = 4 ⇒ 23u = 23 ⇒ u = 1 So, y = 1/u = 1 And putting u = 1 in x = (9 + 3u)/2 we get, ⇒ x = [9 + 3(−1)]/2 = 6/2 ∴ x = 3 The solution of the pair of equations given are y = 3 and x = 1 respectively. 14. 0.5x + 0.7y = 0.74 0.3x + 0.5y = 0.5 Solution: The given pair of equations are: 0.5x + 0.7y = 0.74……………………… (i) 0.3x – 0.5y = 0.5 ………………………….. (ii) Now, let’s multiply LHS and RHS by 100 for both (i) and (ii) for making integral coefficients and constants. (i) x100 ⇒ 50x +70y = 74 ……………………….. (iii) (ii) x100 ⇒ 30x + 50y = 50 …………………………… (iv) From (iii) 50x = 74 – 70y x = (74−70y)/ 50 ……………………………… (v) Now, substituting x in equation (iv) we get, 30[(74−70y)/ 50] + 50y = 50 ⇒ 222 – 210y + 250y = 250 [After taking LCM] ⇒ 40y = 28 ⇒ y = 0.7 Now, by putting the value of y in the equation (v), we get ⇒ x = [74 − 70(0.7)]/ 50=0 ⇒ x =25/ 50 = 1/2 ∴ x = 0.5 Thus, the value of x and y so obtained are 0.5 and 0.7 respectively. 15. 1/(7x) + 1/(6y) = 3 1/(2x) – 1/(3y) = 5 Solution: The given pair of equations are: 1/(7x) + 1/(6y) = 3………………………….. (i) 1/(2x) – 1/(3y) = 5……………………………. (ii) Multiplying (ii) by 1/2 we get, 1/(4x) – 1/(6y) = 52……………………………. (iii) Now, solving equations (i) and (iii) 1/(7x) + 1/(6y) = 3………………………….. (i) 1/(4x) – 1/(6y) = 5/2……………………………. (iii) Adding (i) + (iii) we get, 1/x(1/7 + 1/4 ) = 3 + 5/2 ⇒ 1/x(11/28) = 11/2 ⇒ x = 1/14 Using x =1/ 14 we get, in (i) 1/[7(1/14)] + 1/(6y) = 3 ⇒ 2 + 1/(6y)=3 ⇒ 1/(6y) = 1 ⇒ y = 1/6 The solution for the given pair of equations is x=1/14 and y=1/6 respectively. 16. 1/(2x) + 1/(3y) = 2 1/(3x) + 1/(2y) = 13/6 Solution: Let 1/x = u and 1/y = v, So the given equations becomes, u/2 + v/3 = 2 ………………(i) u/3 + v/2 = 13/6 ……………(ii) From (i), we get u/2 + v/3 = 2 ⇒ 3u + 2v = 12 ⇒ u = (12 – 2v)/3 ………….(iii) Using (iii) in (ii) [(12 – 2v)/3]/3 + v/2 = 13/6⇒ (12 – 2v)/9 + v/2 = 13/6 ⇒ 24 – 4v + 9v = (13/6) x 18 [after taking LCM] ⇒ 24 + 5v = 39 ⇒ 5v = 15 ⇒ v = 3 Substituting v in (iii) u = (12 – 2(3))/3 ⇒ u = 2 Thus, x = 1/u ⇒ x = 1/2 and y = 1/v ⇒ y = 1/3 The solution for the given pair of equations is x = 1/2 and y = 1/3 respectively.
17. 15/u + 2/v = 17 1/u + 1/v = 36/5 Solution: Let 1/x = u and 1/y = v So, the given equations becomes 15x + 2y = 17 ………………………….. (i) x + y = 36/5………………………. (ii) From equation (i) we get, 2y = 17 – 15x =y = (17 − 15x)/ 2 …………………. (iii) Substituting (iii) in equation (ii) we get, = x + (17 − 15x)/ 2 = 36/5 2x + 17 – 15x = (36 x 2)/ 5 [after taking LCM] 13x = 72/5 – 17 = 13x = 13/5 ⇒ x = 1/5 ⇒ u = 1/x = 5 Putting x = 1/5in equation (ii) , we get 1/5 + y = 36/5 ⇒ y = 7 ⇒ v = 1/y = 1/7 The solution of the pair of equations given are u = 5 and v = 1/7 respectively. 18. 3/x – 1/y = −9 2/x + 3/y = 5 Solution: Let 1/x = u and 1/y = v So, the given equations becomes 3u – v = 9…………………..(i) 2u + 3v = 5 ……………………….(ii) Multiplying equation (i) x 3 and (ii) x 1 we get, 9u – 3v = 27 ………………………….. (iii) 2u + 3v = 5 ……………………………… (iv) Adding equation (iii) and (iv) we get , 9u + 2u – 3v + 3v = 27 + 5 ⇒ 11u = 22 ⇒ u = 2 Now putting u =2 in equation (iv) we get, 2(2) + 3v = 5 ⇒ 3v = 9 ⇒ v = 3 Hence, x = 1/u = −1/2 and, y = 1/v = 1/3 19. 2/x + 5/y = 1 60/x + 40/y = 19 Solution: Let 1/x = u and 1/y = v So, the given equations becomes 2u + 5v = 1…………………..(i) 60u + 40v = 19 ……………………….(ii) Multiplying equation (i) x 8 and (ii) x 1 we get, 16u + 40v = 8 ………………………….. (iii) 60u + 40v = 19 ……………………………… (iv) Subtracting equation (iii) from (iv) we get, 60u – 16u + 40v – 40v = 19 – 8 ⇒ 44u = 11 ⇒ u = 1/4 Now putting u = 1/4 in equation (iv) we get, 60(1/4) + 40v = 19 ⇒ 15 + 40v = 19 ⇒ v = 4/ 40 = 1/10 Hence, x = 1/u = 4 and, y = 1/v = 10 20. 1/(5x) + 1/(6y) = 12 1/(3x) – 3/(7y) = 8 Solution: Let 1/x = u and 1/y = v So, the given equations becomes u/5 + v/6 = 12…………………..(i) u/3 – 3v/7 = 8……………………….(ii) Taking LCM for both equations, we get 6u + 5v = 360………. (iii) 7u – 9v = 168……….. (iv) Subtracting (iii) from (iv) 7u – 9v – (6u + 5v) = 168 – 360 ⇒ u – 14v = 192 ⇒ u = (14v – 192)………. (v) Using (v) in equation (iii), we get 6(14v – 192) + 5v = 360 ⇒ 84v 1152 + 5v = 360 ⇒ 89v = 1512 ⇒ v = 1512/89 ⇒ y = 1/v = 89/1512 Now, substituting v in equation (v), we find u u = 14 x (1512/89) – 192 ⇒ u = 4080/89 ⇒ x = 1/u = 89/ 4080 Hence, the solution for the given system of equations is x = 89/4080 and y = 89/ 1512 21. 4/x + 3y = 14 3/x – 4y = 23 Solution: Taking 1/x = u, the given equation becomes 4u + 3y = 14…………………….. (i) 3u – 4y = 23…………………….. (ii) Adding (i) and (ii), we get 4u + 3y + 3u – 4y = 14 + 23 ⇒ 7u – y = 37 ⇒ y = 7u – 37……………………… (iii) Using (iii) in (i), 4u + 3(7u – 37) = 14 ⇒ 4u + 21u – 111 = 14 ⇒ 25u = 125 ⇒ u = 5 ⇒ x = 1/u = 1/5 Putting u= 5 in (iii), we find y y = 7(5) – 37 ⇒ y = 2 Hence, the solution for the given system of equations is x = 1/5 and y = 2 22. 4/x + 5y = 7 3/x + 4y = 5 Solution: Taking 1/x = u, the given equation becomes 4u + 5y = 7…………………….. (i) 3u + 4y = 5…………………….. (ii) Subtracting (ii) from (i), we get 4u + 5y – (3u + 4y) = 7 – 5 ⇒ u + y = 2 ⇒ u = 2 – y……………………… (iii) Using (iii) in (i), 4(2 – y) + 5y = 7 ⇒ 8 – 4y + 5y = 7 ⇒ y = 1 Putting y = 1 in (iii), we find u u = 2 – (1) ⇒ u = 3 ⇒ x = 1/u = 1/3 Hence, the solution for the given system of equations is x = 1/3 and y = 1 23. 2/x + 3/y = 13 5/x – 4/y = 2 Solution: Let 1/x = u and 1/y = v So, the given equations becomes 2u + 3v = 13………………….. (i) 5u – 4v = 2 ………………………. (ii) Adding equation (i) and (ii) we get, 2u + 3v + 5u – 4v = 13 – 2 ⇒ 7u – v = 11 ⇒ v = 7u – 11…….. (iii) Using (iii) in (i), we get 2u + 3(7u – 11) = 13 ⇒ 2u + 21u – 33 = 13 ⇒ 23u = 46 ⇒ u = 2 Substituting u = 2 in (iii), we find v v = 7(2) – 11 ⇒ v = 3 Hence, x = 1/u = 1/2 and, y = 1/v = 1/3 24. 2/x + 3/y = 2 4/x – 9/y = 1 Solution: Let 1/√x = u and 1/√y = v, So, the given equations becomes 2u + 3v = 2………………….. (i) 4u – 9v = 1 ………………………. (ii) Multiplying (ii) by 3 and Adding equation (i) and (ii)x3 we get, 6u + 9v + 4u – 9v = 6 – 1 ⇒ 10u = 5 ⇒ u = 1/2 Substituting u = 1/2 in (i), we find v 2(1/2) + 3v = 2 ⇒ 3v = 2 – 1 ⇒ v = 1/3 Since, 1/√x = u we get x = 1/u2 ⇒ x = 1/(1/2)2 = 4 And, 1/√y = v y = 1/v2 ⇒ y = 1/(1/3)2 = 9 Hence, the solution is x = 4 and y = 9. 25. (x + y)/xy = 2 (x – y)/xy = 6 Solution: The given pair of equations are: (x + y)/xy = 2 ⇒ 1/y + 1/x = 2……. (i) (x – y)/xy = 6 ⇒ 1/y – 1/x = 6………(ii) Let 1/x = u and 1/y = v, so the equation (i) and (ii) becomes v + u = 2……. (iii) v – u = 6……..(iv) Adding (iii) and (iv), we get 2v = 8 ⇒ v = 4 ⇒ y = 1/v = 1/4 Substituting v = 4 in (iii) to find x, 4 + u = 2 ⇒ u = 2 ⇒ x = 1/u = 1/2 Hence, the solution is x = 1/2 and y = 1/4. 26. 2/x + 3/y = 9/xy 4/x + 9/y = 21/xy Solution: Taking LCM for both the given equations, we have (2y + 3x)/ xy = 9/xy ⇒ 3x + 2y = 9………. (i) (4y + 9x)/ xy = 21/xy ⇒ 9x + 4y = 21………(ii) Performing (ii) – (i)x2⇒ 9x + 4y – 2(3x + 2y) = 21 – (9×2) ⇒ 3x = 3 ⇒ x = 1 Using x = 1 in (i), we find y 3(1) + 2y = 9 ⇒ y = 6/2 ⇒ y = 3 Thus, the solution for the given set of equations is x = 1 and y = 3. Exercise 3.4 Page No: 3.57 Solve each of the following systems of equations by the method of crossmultiplication: 1. x + 2y + 1 = 0 2x – 3y – 12 = 0 Solution: The given system of equations is x + 2y + 1 = 0 2x – 3y – 12 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 3 and y = 2. 2. 3x + 2y + 25 = 0 2x + y + 10 = 0 Solution: The given system of equations is 3x + 2y + 25 = 0 2x + y + 10 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 5 and y = 20. 3. 2x + y = 35, 3x + 4y = 65 Solution: The given system of equations can be written as 2x + y – 35 = 0 3x + 4y – 65 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 15 and y = 5. 4. 2x – y = 6, x – y = 2 Solution: The given system of equations can be written as 2x – y – 6 = 0 x – y – 2 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 4 and y = 2. 5. (x + y)/ xy = 2 (x – y)/ xy = 6 Solution: The given system of equations is (x + y)/ xy = 2 ⇒ 1/y + 1/x = 2…….. (i) (x – y)/ xy = 6 ⇒ 1/y – 1/x = 6……… (ii) Let 1/x = u and 1/y = v, so the equation becomes u + y = 2….. (iii) u – y = 6……(iv) For cross multiplication we use, Comparing the above two equations (iii) & (iv) with the general form, we get Hence, the solution for the given system of equations is x = 1/2 and y = 1/4. 6. ax + by = ab bx – ay = a+b Solution: The given system of equations can be written as ax + by – (ab) = 0 bx – ay – (a+b) = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 1 and y = 1. 7. x + ay = b ax + by = c Solution: The given system of equations can be written as x + ay – b = 0 ax + by – c = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = (b2 + ac)/(a2 + b2) and y = (c2 + ab)/(a2 + b2). 8. ax + by = a2 bx + ay = b2 Solution: The given system of equations can be written as ax + by – (a2) = 0 bx + ay – (b2) = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = (a2 + ab + b2)/(a + b) and y = ab / (a+ b). 9. 5/(x + y) – 2/(x y) = 1 15/(x + y) + 7/(x – y) = 10 Solution: Let’s substitute 1/(x + y) = u and 1/(x – y) = v, so the given equations becomes 5u – 2v = 1 15u + 7v = 10 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 3 and y = 2. 10. 2/x + 3/y = 13 5/x – 4/y = 2 Solution: Let 1/x = u and 1/y = v, so the equation becomes 2u + 3y = 13 ⇒ 2u + 3y – 13 = 0 5u – 4y = 2 ⇒ 5u – 4y + 2 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 1/2 and y = 1/3. 11. 57/(x + y) + 6/(x – y) = 5 38/(x + y) + 21/(x – y) = 9 Solution: Let’s substitute 1/(x + y) = u and 1/(x – y) = v, so the given equations becomes 57u + 6v = 5 ⇒ 57u + 6v – 5 = 0 38u + 21v = 9 ⇒ 38u + 21v – 9 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = 11 and y = 8. 12. xa – yb = 2 ax – by = a2b2 Solution: The given system of equations can be written as xa – yb – 2 = 0 ax – by – (a2b2) = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = a and y = b. 13. x/a + y/b = a + b x/a2 + y/b2 = 2 Solution: The given system of equations can be written as x/a + y/b – (a + b) = 0 x/a2 + y/b2 – 2 = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = a2 and y = b2. 14. x/a = y/b ax + by = a2 + b2 Solution: The given system of equations can be written as x/a – y/b = 0 ax + by – (a2 + b2) = 0 For cross multiplication we use, Comparing the above two equations with the general form, we get Hence, the solution for the given system of equations is x = a and y = b. Exercise 3.5 Page No: 3.73 In each of the following systems of equation determine whether the system has a unique solution, no solution or infinite solutions. In case there is a unique solution, find it from 1 to 4: 1. x − 3y = 3 3x − 9y = 2 Solution: The given system of equations is: x − 3y – 3 = 0 3x − 9y − 2 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 1, b1 = −3, c1 = −3 a2 = 3, b2 = −9, c2 = −2 So according to the question, we get a1 / a2 = 1/3 b1 / b2 = −3/ −9 = 1/3 and, c1 / c2 = −3/ −2 = 3/2 ⇒ a1 / a2 = b1/ b2 ≠ c1 / c2 Hence, we can conclude that the given system of equation has no solution. 2. 2x + y = 5 4x + 2y = 10 Solution:
The given system of equations is: 2x + y – 5 = 0 4x + 2y – 10 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 2, b1 = 1, c1 = −5 a2 = 4, b2 = 2, c2 = −10 So according to the question, we get a1 / a2 = 2/4 = 1/2 b1 / b2 = 1/ 2 and, c1 / c2 = −5/ −10 = 1/2 ⇒ a1 / a2 = b1/ b2 = c1 / c2 Hence, we can conclude that the given system of equation has infinity many solutions. 3. 3x – 5y = 20 6x – 10y = 40 Solution: The given system of equations is: 3x – 5y – 20 = 0 6x – 10y – 40 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 3, b1 = 5, c1 = −20 a2 = 6, b2 = 10, c2 = −40 So according to the question, we get a1 / a2 = 3/6 = 1/2 b1 / b2 = 5/ 10 = 1/2 and, c1 / c2 = 20/ −40 = 1/2 ⇒ a1 / a2 = b1/ b2 = c1 / c2 Hence, we can conclude that the given system of equation has infinity many solutions. 4. x – 2y = 8 5x – 10y = 10 Solution: The given system of equations is: x – 2y – 8 = 0 5x – 10y – 10 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 1, b1 = 2, c1 = −8 a2 = 5, b2 = 10, c2 = 10 So according to the question, we get a1 / a2 = 1/5 b1 / b2 = 2/ 10 = 1/5 and, c1 / c2 = 8/ −10 = 4/5 ⇒ a1 / a2 = b1/ b2 ≠ c1 / c2 Hence, we can conclude that the given system of equation has no solution. Find the value of k for which the following system of equations has a unique solution: (58) 5. kx + 2y = 5 3x + y = 1 Solution: The given system of equations is: kx + 2y – 5 = 0 3x + y – 1 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = k, b1 = 2, c1 = −5 a2 = 3, b2 = 1, c2 = 1 So according to the question, For unique solution, the condition is a1 / a2 ≠ b1 / b2 k/3 ≠ 2/1 ⇒ k ≠ 6 Hence, the given system of equations will have unique solution for all real values of k other than 6. 6. 4x + ky + 8 = 0 2x + 2y + 2 = 0 Solution: The given system of equations is: 4x + ky + 8 = 0 2x + 2y + 2 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 4, b1 = k, c1 = 8 a2 = 2, b2 = 2, c2 = 2 So according to the question, For unique solution, the condition is a1 / a2 ≠ b1 / b2 4/2 ≠ k/2 ⇒ k ≠ 4 Hence, the given system of equations will have unique solution for all real values of k other than 4. 7. 4x – 5y = k 2x – 3y = 12 Solution The given system of equations is: 4x – 5y – k = 0 2x – 3y – 12 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 4, b1 = 5, c1 = k a2 = 2, b2 = 3, c2 = 12 So according to the question, For unique solution, the condition is a1 / a2 ≠ b1 / b2 4/2 ≠ 5/3 ⇒k can have any real values. Hence, the given system of equations will have unique solution for all real values of k. 8. x + 2y = 3 5x + ky + 7 = 0 Solution: The given system of equations is: x + 2y – 3 = 0 5x + ky + 7 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 1, b1 = 2, c1 = 3 a2 = 5, b2 = k, c2 = 7 So according to the question, For unique solution, the condition is a1 / a2 ≠ b1 / b2 1/5 ≠ 2/k ⇒ k ≠ 10 Hence, the given system of equations will have unique solution for all real values of k other than 10. Find the value of k for which each of the following system of equations having infinitely many solution: (919) 9. 2x + 3y – 5 = 0 6x + ky – 15 = 0 Solution: The given system of equations is: 2x + 3y – 5 = 0 6x + ky – 15 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 2, b1 = 3, c1 = 5 a2 = 6, b2 = k, c2 = 15 So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 2/6 = 3/k ⇒ k = 9 Hence, the given system of equations will have infinitely many solutions, if k = 9. 10. 4x + 5y = 3 kx + 15y = 9 Solution: The given system of equations is: 4x + 5y – 3= 0 kx + 15y – 9 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 4, b1 = 5, c1 = 3 a2 = k, b2 = 15, c2 = 9 So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 4/ k = 5/ 15 = −3/ −9 4/ k = 1/ 3 ⇒k = 12 Hence, the given system of equations will have infinitely many solutions, if k = 12. 11. kx – 2y + 6 = 0 4x – 3y + 9 = 0 Solution: The given system of equations is: kx – 2y + 6 = 0 4x – 3y + 9 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = k, b1 = 2, c1 = 6 a2 = 4, b2 = 3, c2 = 9 So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 k/ 4 = −2/ −3 = 2/ 3 ⇒k = 8/ 3 Hence, the given system of equations will have infinitely many solutions, if k = 8/3. 12. 8x + 5y = 9 kx + 10y = 18 Solution: The given system of equations is: 8x + 5y – 9 = 0 kx + 10y – 18 = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 8, b1 = 5, c1 = 9 a2 = k, b2 = 10, c2 = 18 So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 8/k = 5/10 = −9/ −18 = 1/2 ⇒k=16 Hence, the given system of equations will have infinitely many solutions, if k = 16. 13. 2x – 3y = 7 (k+2)x – (2k+1)y = 3(2k1) Solution: The given system of equations is: 2x – 3y – 7 = 0 (k+2)x – (2k+1)y – 3(2k1) = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 2, b1 = 3, c1 = 7 a2 = (k+2), b2 = (2k+1), c2 = 3(2k1) So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 2/ (k+2) = −3/ −(2k+1) = −7/ −3(2k−1) 2/(k+2) = −3/ −(2k+1)and −3/ −(2k+1)= −7/ −3(2k−1 ⇒2(2k+1) = 3(k+2) and 3×3(2k−1) = 7(2k+1) ⇒4k+2 = 3k+6 and 18k – 9 = 14k + 7 ⇒k=4 and 4k = 16 ⇒k=4 Hence, the given system of equations will have infinitely many solutions, if k = 4. 14. 2x + 3y = 2 (k+2)x + (2k+1)y = 2(k1) Solution: The given system of equations is: 2x + 3y – 2= 0 (k+2)x + (2k+1)y – 2(k1) = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 2, b1 = 3, c1 = 5 a2 = (k+2), b2 = (2k+1), c2 = 2(k1) So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 2/ (k+2) = 3/ (2k+1) = −2/ −2(k−1) 2/ (k+2) = 3/ (2k+1) and 3/(2k+1) = 2/2(k−1) ⇒2(2k+1) = 3(k+2) and 3(k−1) = (2k+1) ⇒4k+2 = 3k+6 and 3k−3 = 2k+1 ⇒k = 4 and k = 4 Hence, the given system of equations will have infinitely many solutions, if k = 4. 15. x + (k+1)y = 4 (k+1)x + 9y = 5k + 2 Solution: The given system of equations is: x + (k+1)y – 4= 0 (k+1)x + 9y – (5k + 2) = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 1, b1 = (k+1), c1 = 4 a2 = (k+1), b2 = 9, c2 = (5k+2) So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 1/ k+1 = (k+1)/ 9 = −4/ −(5k+2) 1/ k+1 = k+1/ 9 and k+1/ 9 = 4/ 5k+2 ⇒9 = (k+1)2 and (k+1)(5k+2) = 36 ⇒9 = k2 + 2k + 1 and 5k2+2k+5k+2 = 36 ⇒k2+2k−8 = 0 and 5k2+7k−34 = 0 ⇒k2+4k−2k−8 = 0 and 5k2+17k−10k−34 = 0 ⇒k(k+4)−2(k+4) = 0 and (5k+17)−2(5k+17) = 0 ⇒(k+4)(k−2) = 0 and (5k+17) (k−2) = 0 ⇒k = −4 or k = 2 and k = −17/5 or k = 2 Its seen that k=2 satisfies both the condition. Hence, the given system of equations will have infinitely many solutions, if k = 9. 16. kx + 3y = 2k + 1 2(k+1)x + 9y = 7k + 1 Solution: The given system of equations is: kx + 3y – (2k + 1) = 0 2(k+1)x + 9y – (7k + 1) = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = k, b1 = 3, c1 = – (2k+1) a2 = 2(k+1), b2 = 9, c2 = – (7k+1) So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 k/ 2(k+1) = 3/ 9 and 3/ 9 = (2k+1)/ (7k+1) 3k = 2k +2 and 7k+1 = 3(2k+1) = 6k + 3 k = 2 and k = 2 Hence, the given system of equations will have infinitely many solutions, if k = 2. 17. 2x + (k2)y = k 6x + (2k1)y = 2k + 5 Solution: The given system of equations is: 2x + (k2)y – k = 0 6x + (2k1)y – (2k+5) = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 2, b1 = k2, c1 = – k a2 = 6, b2 = 2k1, c2 = 2k5 So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 2/6 = (k2)/ (2k1) and (k2)/ (2k1) = – k/ 2k5 4k 2 = 6k 12 and (k2)(2k+5) = k(2k1) 2k = 10 and 2k2 – 4k + 5k – 10 = 2k2 – k ⇒ k = 5 and 2k = 10 ⇒ k = 5 Hence, the given system of equations will have infinitely many solutions, if k = 5. 18. 2x + 3y = 7 (k+1)x + (2k1)y = 4k+1 Solution: The given system of equations is: 2x + 3y – 7= 0 (k+1)x + (2k1)y – (4k+1) = 0 The above equations are of the form a1 x + b1 y − c1 = 0 a2 x + b2 y − c2 = 0 Here, a1 = 2, b1 = 3, c1 = – 7 a2 = (k+1), b2 = 2k1, c2 = – (4k+1) So according to the question, For unique solution, the condition is a1 / a2 = b1 / b2 = c1 / c2 2/ (k+1) = 3/ (2k−1) = −7/ −(4k+1) 2/ (k+1) = 3/(2k−1) and 3/ (2k−1) = 7/(4k+1) 2(2k−1) = 3(k+1) and 3(4k+1) = 7(2k−1) ⇒4k−2 = 3k+3 and 12k + 3 = 14k − 7 ⇒k = 5 and 2k = 10 ⇒k = 5 and k = 5 Hence, the given system of equations will have infinitely many solutions, if k = 5. Exercise 3.6 Page No: 3.73 1. 5 pens and 6 pencils together cost ₹ 9 and 3 pens and 2 pencils cost ₹ 5. Find the cost of 1 pen and 1 pencil. Solution: Let’s assume the cost of a pen and pencil be ₹ x and ₹ y respectively. Then, forming equations according to the question 5x + 6y = 9 … (i) 3x + 2y = 5 … (ii) On multiplying equation (i) by 2 and equation (ii) by 6, we get 10x + 12y = 18 … (iii) 18x + 12y = 30 … (iv) Now on subtracting equation (iii) from equation (iv), we get 18x – 10x + 12y – 12y = 30 – 18 8x = 12 x = 3/2 = 1.5 Putting x = 1.5 in equation (i), we find y 5(1.5) + 6y = 9 6y = 9 – 7.5 y = (1.5)/ 6 = 0.25 Therefore, the cost of one pen = ₹ 1.50 and so the cost of one pencil = ₹ 0.25 2. 7 audio cassettes and 3 videocassettes cost ₹ 1110, while 5 audio cassettes and 4 videocassettes cost ₹ 1350. Find the cost of audio cassettes and a video cassette. Solution: Let’s assume the cost of an audio cassette and that of a video cassette be ₹ x and ₹ y, respectively. Then forming equations according to the question, we have 7x + 3y = 1110 … (i) 5x + 4y = 1350 … (ii) On multiplying equation (i) by 4 and equation (ii) by 3, We get, 28x + 12y = 4440 … (iii) 15x + 4y = 4050 … (iv) Subtracting equation (iv) from equation (iii), 28x – 13x + 12y – 12y = 4440 – 4050 13x = 390 ⇒ x = 30 On substituting x = 30 in equation (i) 7(30) + 3y = 1110 3y = 1110 – 210 y = 900/ 3 ⇒ y = 300 Therefore, it’s found that the cost of one audio cassette = ₹ 30 And the cost of one video cassette = ₹ 300 3. Reena has pens and pencils which together are 40 in number. If she has 5 more pencils and 5 less pens, then number of pencils would become 4 times the number of pens. Find the original number of pens and pencils. Solution: Let’s assume the number of pens and pencils be x and y, respectively. Forming equations according to the question, we have x + y = 40 … (i) (y+5) = 4(x5) y + 5 = 4x – 20 5 + 20 = 4x – y 4x – y = 25 … (ii) Adding equation (i) and (ii), We get, x + 4x = 40 + 25 5x = 65 ⇒ x = 13 Putting x=13 in equation (i), we get 13 + y = 40 ⇒ y = 40 – 13 = 27 Therefore, it’s found that the number of pens Reena has is 13 And, the number of pencils Reena has is 27. 4. 4 tables and 3 chairs, together, cost ₹ 2250 and 3 tables and 4 chairs cost ₹ 1950. Find the cost of 2 chairs and 1 table. Solution: Let’s assume the cost of 1 table is ₹ x and cost of 1 chair is ₹ y. Then, according to the question 4x + 3y = 2250 … (i) 3x + 4y = 1950 … (ii) On multiplying (i) with 3 and (ii) with 4, We get, 12x + 9y = 6750 … (iii) 12x + 16y = 7800 … (iv) Now, subtracting equation (iv) from (iii), We get, 7y = 1050 y = 150 Using y = 150 in (i), we find x 4x + 3(150) = 2250 4x = 2250 – 450 x = 1800/ 4 ⇒ x = 450 From the question, it’s required to find the value of (x + 2y) ⇒ 450 + 2(150) = 750 Therefore, the total cost of 2 chairs and 1 table is ₹ 750. 5. 3 bags and 4 pens together cost ₹ 257 whereas 4 bags and 3 pens together cost ₹324. Find the total cost of 1 bag and 10 pens. Solution: Let the cost of a bag and a pen be ₹ x and ₹ y, respectively. Then, according to the question 3x + 4y = 257 … (i) 4x + 3y = 324 … (ii) On multiplying equation (i) by 3 and (ii) by 4, We get, 9x + 12y = 770 … (iii) 16x + 12y = 1296 … (iv) Subtracting equation (iii) from (iv), we get 16x – 9x = 1296 – 771 7x = 525 x = 525/7 = 75 Hence, the cost of a bag = ₹ 75 Substituting x = 75 in equation (i), We get, 3 x 75 + 4y = 257 225 + 4y = 257 4y = 257 – 225 4y = 32 y = 32/4 = 8 Hence, the cost of a pen = ₹ 8 From the question, it’s required to find the value of (x + 10y) ⇒ 75 +10(8) = 20 Therefore, the total cost of 1 bag and 10 pens = 75 + 80 = ₹ 155. 6. 5 books and 7 pens together cost ₹ 79 whereas 7 books and 5 pens together cost ₹ 77. Find the total cost of 1 book and 2 pens. Solution: Let’s assume the cost of a book a pen be ₹ x and ₹ y, respectively. Then, according to the question 5x + 7y = 79 … (i) 7x + 5y = 77 … (ii) On multiplying equation (i) by 5 and (ii) by 7, We get, 25x + 35y = 395 … (iii) 49x + 35y = 539 … (iv) Subtracting equation (iii) from (iv), We have, 49x – 25x = 539 – 395 24x = 144 x = 144/24 = 6 Hence, the cost of a book = ₹ 6 Substituting, x= 6 in equation (i), We get, 5 (6) + 7y = 79 30 + 7y = 79 7y = 79 – 30 7y = 49 y = 49/ 7 = 7 Hence, the cost of a pen = ₹ 7 From the question, it’s required to find the value of (x + 2y) ⇒ 6 + 2(7) = 20 Therefore, the total cost of 1 book and 2 pens = 6 + 14= ₹ 20 7. Jamila sold a table and a chair for ₹ 1050, thereby making a profit of 10% on the table and 25% on the chair. If she had taken a profit of 25% on the table and 10% on the chair she would have got ₹ 1065. Find the cost price of each. Solution: Let the cost price of one table and one chair be ₹ x and ₹ y, respectively. So, The selling price of the table, when it’s sold at a profit of 10% = ₹ x + 10x/100 = ₹ 110x / 100 The selling price of the chair, when it’s sold at a profit of 25% = ₹ y + 25y/100 = ₹ 125y / 100 Hence, according to the question 110x / 100 + 125y / 100 = 1050 … (i) Similarly, The selling price of the table, when it’s sold at a profit of 25% = ₹ (x + 25x/100) = ₹ 125x/ 100 The selling price of the chair, when it’s sold at a profit of 10% = ₹ (y + 10y/100) = ₹ 110y / 100 Hence, again from the question 125x / 100 + 110y / 100 = 1065 … (ii) Re written (i) and (ii) with their simplest coefficients, 11x/10 + 5y/4 = 1050…….. (iii) 5x/4 + 11y/10 = 1065…….. (iv) Adding (iii) and (iv), we get (11/ 10 + 5/ 4)x + (5/ 4 + 11/ 10)y = 2115 47/ 20x + 47/ 20y = 2115 x + y = 2115(20/ 47) = 900 ⇒ x = 900 – y ……. (v) Using (v) in (iii), 11(900 – y)/10 + 5y/4 = 1050 2(9900 11y) +25y = 1050 x 20 [After taking LCM] 19800 – 22y + 25y = 21000 3y = 1200 ⇒ y = 400 Putting y = 400 in (v), we get x = 900 – 400 = 500 Therefore, the cost price of the table is ₹ 500 and that of the chair is ₹ 400. Exercise 3.7 Page No: 3.85 1. The sum of two numbers is 8. If their sum is four times their difference, find the numbers. Solution: Let’s assume the two numbers to be x and y. Also let’s consider that, x is greater than or equal to y. Now, according to the question The sum of the two numbers, x + y = 8…………. (i) Also given that, their sum is four times their difference. So, we can write; x + y = 4(x – y) ⇒ x + y = 4x4y ⇒ 4x – 4y – x – y = 0 ⇒ 3x – 5y = 0………………. (ii) Solving (i) and (ii), we can find x and y, so the required two numbers. On multiplying equation (i) by 5 and then add with equation (ii), we get here; 5 (x + y) + (3x – 5y) = 5 × 8 + 0 ⇒ 5x + 5y + 3x – 5y = 40 ⇒ 8x = 40 ⇒ x = 5 Putting the value of x in (i), we find y 5 + y = 8 ⇒ y = 8 – 5 ⇒ y = 3 Therefore, the two numbers are 5 and 3. 2. The sum of digits of a twodigit number is 13. If the number is subtracted from the one obtained by interchanging the digits, the result is 45. What is the number? Solution: Let’s assume the digit at the unit’s place as x and at ten’s place as y. Then the required number is 10y + x. Also it’s given that, the sum of the digits of the number is 13, So, x + y = 13………… (i) On interchanging the position of digits, the new number so formed will be 10x+y. Again is it’s given that, the difference between the new number so formed upon interchanging the digits and the original number is equal to 45. Therefore, this can be expressed as; (10x + y) – (10y + x) = 45 ⇒ 110x + y – 10y – x = 45 ⇒ 9x – 9y = 45 ⇒ 9(x – y) = 45 ⇒ x – y = 5………..(ii) Solving (i) and (ii) we can find x and y, Now, adding (i) and (ii), we get; (x + y) + (x – y) = 13 + 5 ⇒ x + y + x – y = 18 ⇒ 2x = 18 ⇒ x = 9 Putting the value of x in the equation (i), we find y; 9 + y = 13 ⇒ y = 13 – 9 ⇒ y = 4 Hence, the required number is, 10 × 4 + 9 = 49. 3. A number consists of two digits whose sum is five. When the digits are reversed, the number becomes greater by nine. Find the number. Solution: Let’s assume the digit at unit’s place as x and ten’s place as y. Thus, the number to be found is 10y + x. From the question it’s given as, the sum of the digits of the number is equal to 5. Thus we can write, x + y = 5 ………….. (i) On interchange the place of digits, the new number so formed will be 10x+ y. Again from the question it’s given as, the new number so obtained after interchanging the digits is greater by 9 from the original number. Therefore, this can be written as; 10x + y = 10y + x +9 ⇒ 10x + y – 10y – x = 9 ⇒ 9x – 9y = 9 ⇒ 9(x – y) = 9 ⇒ x – y = 1………………. (ii) Solving (i) and (ii), we can find x and y Adding the eq. 1 and 2, we get; (x + y) + (x – y) = 5+1 ⇒ x + y + x – y = 5+1 ⇒ 2x = 6 ⇒ x = 6/2 ⇒ x = 3 Putting the value of x in the equation 1, we get; 3 + y = 5 ⇒ y = 53 ⇒ y = 2 Hence, the required number is 10 × 2 + 3 = 23 4. The sum of digits of a twodigit number is 15. The number obtained by reversing the order of digits of the given number exceeds the given number by 9. Find the given number. Solution: Let the digits at unit’s place be x and ten’s place be y, respectively. Thus, the number we need to find is 10y + x. As per the given statement, the sum of the digits of the number is 15. Thus, we have; x+ y = 15 ……………(i) Upon interchanging the digit’s place, the new number will so be 10x + y. Also it’s given from the question that, the new number obtained exceeds from the original number by 9. Therefore, we can write this as; 10x + y = 10y + x + 9 ⇒ 10x + y – 10y –x = 9 ⇒ 9x – 9y = 9 ⇒ 9(x – y) = 9 ⇒ x – y = 9/9 ⇒ x – y = 1 ………………….. (ii) Solving (i) and (ii), we can find x and y Now, adding the equations (i) and (ii), we get; (x + y) + (x – y) = 15 + 1 ⇒ x + y + x – y = 16 ⇒ 2x = 16 ⇒ x = 16/2 ⇒ x = 8 Putting the value of x in the equation (i), to get y 8+ y = 5 ⇒ y = 15 – 8 ⇒ y = 7 Hence, the required number is, 10 × 7 + 8 = 78 5. The sum of a twodigit number and the number formed by reversing the order of digits is 66. If the two digits differ by 2, find the number. How many such numbers are there? Solution: Let’s assume the digit at unit’s place as x and ten’s place as y. Thus from the question, the number needed to be found is 10y + x. From the question it’s told as, the two digits of the number are differing by 2. Thus, we can write x – y = ±2………….. (i) Now after reversing the order of the digits, the number becomes 10x + y. Again from the question it’s given that, the sum of the numbers obtained by reversing the digits and the original number is 66. Thus, this can be written as; (10x+ y) + (10y+x) = 66 ⇒ 10x + y + 10y + x = 66 ⇒ 11x +11y = 66 ⇒ 11(x + y) = 66 ⇒ x + y = 66/11 ⇒ x + y = 6………….. (ii) Now, we have two sets of systems of simultaneous equations x – y = 2 and x + y = 6 x – y = 2 and x + y = 6 Let’s first solve the first set of system of equations; x – y = 2 …………. (iii) x + y = 6 ………….. (iv) On adding the equations (iii) and (iv), we get; (x – y) + (x + y) = 2+6 ⇒ x – y + x + y = 8 ⇒ 2x =8 ⇒ x = 8/2 ⇒ x = 4 Putting the value of x in equation (iii), we get 4 – y = 2 ⇒ y = 4 – 2 ⇒ y = 2 Hence, the required number is 10 × 2 +4 = 24 Now, let’s solve the second set of system of equations, x – y = 2 …………. (v) x + y = 6 ………….. (vi) On adding the equations (v) and (vi), we get (x – y)+(x + y )= 2 + 6 ⇒ x – y + x + y = 4 ⇒ 2x = 4 ⇒ x = 4/2 ⇒ x = 2 Putting the value of x in equation 5, we get; 2 – y = 2 ⇒ y = 2+2 ⇒ y = 4 Hence, the required number is 10×4+ 2 = 42 Therefore, there are two such possible numbers i.e, 24 and 42. 6. The sum of two numbers is 1000 and the difference between their square is 256000. Find the numbers. Solution: Let’s assume the two numbers be x and y. And also assume that x is greater than or equal to y. So as per the question, we can write the sum of the two numbers as x + y = 1000 ……….. (i) Again it’s given that, the difference between the squares of the two numbers, thus writing it x2 – y2 = 256000 ⇒ (x + y) (x – y) = 256000 ⇒ 1000(xy) = 256000 ⇒ x – y = 256000/1000 ⇒ x – y = 256 ………….. (ii) By solving (i) and (ii), we can find the two numbers On adding the equations (i) and (ii), we get; (x+ y) + (x y) = 1000 + 256 ⇒ x + y + x – y =1256 ⇒ 2x = 1256 ⇒ x = 1256/ 2 ⇒ x = 628 Now, putting the value of x in equation (i), we get 628 + y =1000 ⇒ y = 1000 – 628 ⇒ y = 372 Hence, the two required numbers are 628 and 372. 7. The sum of a two digit number and the number obtained by reversing the order of its digits is 99. If the digits differ by 3, find the number. Solution: Let’s assume the digit at unit’s place is x and ten’s place is y. Thus from the question, the number we need to find is 10y + x. From the question since the two digits of the number are differing by 3. Therefore, x – y = ±3 …………. (i) And, after reversing the digits, the number so obtained is 10x + y. Again it’s given from the question that, the sum of the numbers obtained by reversing the digit’s places and the original number is 99. Thus, this can be written as; (10x + y) + (I0y + x) = 99 ⇒ 10x + y + 10y + x = 99 ⇒ 11x + 11y = 99 ⇒ 11(x + y) = 99 ⇒ x + y = 99/11 ⇒ x + y = 9 …………… (ii) So, finally we have two sets of systems of equations to solve. Those are, x – y = 3 and x + y = 9 x – y = 3 and x + y = 9 Now, let’s solve the first set of system of equations; x – y = 3 ……….. (iii) x + y = 9 ………. (iv) Adding the equations (iii) and (iv), we get; (x – y) + (x + y) = 3 + 9 ⇒ x – y + x + y =12 ⇒ 2x = 12 ⇒ x = 12/2 ⇒ x = 6 Putting the value of x in equation (iii), we find y 6 – y = 3 ⇒ y = 6 – 3 ⇒ y = 3 Hence, when considering this set the required number should be 10×3 + 6 =36 Now, when solving the second set of system of equations, x – y = –3 ……….(v) x + y = 9 ………….. (vi) Adding the equations (v) and (vi), we get; (x – y) + (x + y) = –3 + 9 x – y + x + y = 6 2x = 6 x = 3 Putting the value of x in equation 5, we get; 3 – y = 3 ⇒ y = 3 + 3 ⇒ y = 6 Hence, when considering this set the required number should be 10×6+3=63 Therefore, there are two such numbers for the given question. 8. A two digit number is 4 times the sum of its digits. If 18 is added to the number, the digits are reversed. Find the number. Solution: Let’s assume the digit at unit’s place is x and at ten’s place is y. Thus from the question, the number we need to find is 10y + x. From the question since the number is 4 times the sum of the two digits. We can write, 10y + x = 4(x + y) ⇒ 10y + x = 4x+ 4y ⇒ 4x + 4y – 10y x = 0 ⇒ 3x – 6y = 0 ⇒ 3(x – 2y) = 0 ⇒ x – 2y = 0 ……………… (i) Secondly, after reversing the digits, the new number formed is 10x + y. Again it’s given from the question that if 18 is added to the original number, the digits are reversed. Thus, we have (10y+x) + 18 = 10x+y ⇒ 10x + y 10y – x = 18 ⇒ 9x – 9y = 18 ⇒ 9(x y) = 18 ⇒ x – y = 18/9 ⇒ xy =2 …………. (ii) Now by solving equation (i) and (ii) we can find the value of x and y and thus the number. On subtracting the equation (i) from equation (ii), we get; (x y) – (x – 2y) = 20 ⇒ x – y – x + 2y = 2 ⇒ y=2 Putting the value of y in the equation (i) to find x, we get x – 2 × 2=0 ⇒ x – 4=0 ⇒ x = 4 Hence, the required number is 10×2 +4 = 24 Exercise 3.8 Page No: 3.88 1. The numerator of a fraction is 4 less than the denominator. If the numerator is decreased by 2 and denominator is increased by 1, then the denominator is eight times the numerator. Find the fraction. Solution: Let’s assume the numerator of the fraction to be x and the denominator of the fraction to be y. So, the required fraction is x/y. From the question it’s given as, The numerator of the fraction is 4 less the denominator. Thus, the equation so formed is, x = y – 4 ⇒ x – y = −4 …… (i) And also it’s given in the question as, If the numerator is decreased by 2 and denominator is increased by 1, then the denominator is 8 times the numerator. Putting the above condition in an equation, we get y + 1 = 8(x2) ⇒ y + 1 = 8x–16 ⇒ 8x – y = 1 + 16 ⇒ 8x – y = 17 …… (ii) Solving (i) and (ii), Subtracting the equation (ii) from (i), we get (x – y) – (8x – y) = – 4 – 17 ⇒ x – y − 8x + y = −21 ⇒ −7x = −21 ⇒ x = 21/7 ⇒ x = 3 Substituting the value of x =3 in the equation (i), we find y 3 – y = – 4 ⇒ y = 3+4 ⇒ y = 7 Therefore, the fraction is 3/7. 2. A fraction becomes 9/ 11 if 2 is added to both numerator and the denominator. If 3 is added to both the numerator and the denominator it becomes 5/ 6. Find the fraction. Solution: Let’s assume the numerator of the fraction to be x and the denominator of the fraction to be y. So, the required fraction is x/y. From the question it’s given as, If 2 is added to both numerator and the denominator, the fraction becomes 9/ 11 . Thus, the equation so formed is, x + 2y + 2 = 9/ 11 ⇒ 11(x+2) = 9(y+2) ⇒ 11x + 22 = 9y+18 ⇒ 11x – 9y = 18 – 22 ⇒ 11x – 9y + 4 = 0 ……. (i) And also it’s given in the question as, If 3 is added to both numerator and the denominator, the fraction becomes 5/ 6, Expressing the above condition in an equation, we have x + 3y + 3 = 56 ⇒ 6(x+3) = 5(y+3) ⇒ 6x + 18 = 5y + 15 ⇒ 6x – 5y = 15 – 18 ⇒ 6x – 5y + 3 = 0…….. (ii) Solving (i) and (ii), to find the fraction By using crossmultiplication method, we have x = 7, y = 9 Hence, the required fraction is 7/ 9. 3. A fraction becomes 1/ 3 if 1 is subtracted from both its numerator and denominator. If 1 is added to both the numerator and denominator, it becomes 1/ 2. Find the fraction. Solution: Let’s assume the numerator of the fraction to be x and the denominator of the fraction to be y. So, the required fraction is x/y. From the question it’s given as, If 1 is subtracted from both numerator and the denominator, the fraction becomes 1/ 3. Thus, the equation so formed is, (x – 1)/ (y −1) = 1/ 3 ⇒ 3(x–1) = (y–1) ⇒ 3x – 3 = y – 1 ⇒ 3x – y – 2 = 0…. (i) And also it’s given in the question as, If 1 is added to both numerator and the denominator, the fraction becomes 12. Expressing the above condition in an equation, we have (x+1)/ (y+1) = 1/ 2 ⇒ 2(x+1) = (y+1) ⇒ 2x + 2 = y + 1 ⇒ 2x – y + 1 = 0 …….. (ii) Solving (i) and (ii), to find the fraction By using crossmultiplication, we have ⇒ x = 3, y = 7 Hence, the required fraction is 3/7. 4. If we add 1 to the numerator and subtract 1 from the denominator, a fraction becomes 1. It also becomes 1/2 if we only add 1 to the denominator. What is the fraction? Solution: Let’s assume the numerator of the fraction to be x and the denominator of the fraction to be y. So, the required fraction is x/y. From the question it’s given as, If 1 is added to the numerator and 1 is subtracted from the denominator, the fraction becomes 1. Thus, the equation so formed is, (x +1)/ (y−1) = 1 ⇒ (x+1) = (y–1) ⇒ x + 1 – y + 1 = 0 ⇒ x – y + 2 = 0 …….. (i) And also it’s given in the question as, If 1 is added to the denominator, the fraction becomes 12. Expressing the above condition in an equation, we have x/ (y+1) = 1/ 2 ⇒ 2x = (y+1) ⇒ 2x – y – 1 = 0 …… (ii) Solving (i) and (ii), to find the fraction By using crossmultiplication, we have ⇒x = 3, y = 5 Hence, the required fraction is 3/ 5. 5. The sum of the numerator and denominator of a fraction is 12. If the denominator is increased by 3, the fraction becomes 12. Find the fraction. Solution: Let’s assume the numerator of the fraction to be x and the denominator of the fraction to be y. So, the required fraction is x/y. From the question it’s given as, The sum of the numerator and denominator of the fraction is 12. Thus, the equation so formed is, x + y = 12 ⇒ x + y – 12 = 0 And also it’s given in the question as, If the denominator is increased by 3, the fraction becomes 1/2. Putting this as an equation, we get x/ (y+3) = 1/2 ⇒ 2x = (y+3) ⇒ 2x – y – 3 = 0 The two equations are, x + y – 12 = 0…… (i) 2x – y – 3 = 0…….. (ii) Adding (i) and (ii), we get x + y – 12 + (2x – y – 3) = 0 ⇒ 3x 15 = 0 ⇒ x = 5 Using x = 5 in (i), we find y 5 + y – 12 = 0 ⇒ y = 7 Therefore, the required fraction is 5/7. Exercise 3.9 Page No: 3.92 1. A father is three times as old as his son. After twelve years, his age will be twice as that of his son then. Find their present ages. Solution: Let’s assume the present ages of the father as x years and that of his son’s age as y years. From the question it’s given that, Father is 3 times as old as his son. (Present) So, the equation formed is x = 3y ⇒ x – 3y = 0……. (i) Also again from the question it’s given as, After 12 years, father’s age will be (x+12) years and son’s age will be (y+12) years. Furthermore, the relation between their ages after 12 years is given below x + 12 = 2(y + 12) ⇒ x + 12 = 2y + 24 ⇒ x – 2y – 12 = 0…… (ii) Solving (i) and (ii), we get the solution By using crossmultiplication, we have x = 36, y = 12 Hence, the present age of father is 36 years and the present age of son is 12 years. 2. Ten years later, A will be twice as old as B and five years ago, A was three times as old as B. What are the present ages of A and B. Solution: Let the present ages of A be x years and that of B be y years From the question it’s given that, After 10 years, A’s age will be (x +10) years and B’s age will be (y + 10) years. Furthermore, the relation between their ages after 10 years is given below x + 10 = 2(y + 10) ⇒ x + 10 = 2y + 20 ⇒ x – 2y 10 = 0…….. (i) Also again from the question it’s given as, Before 5 years, the age of A was (x – 5) years and the age of B was (y – 5) years. So, the equation formed is x – 5 = 3(y5) ⇒ x – 5 = 3y – 15 ⇒ x – 3y + 10 = 0…….. (ii) Thus, by solving (i) and (ii), we get the required solution Using crossmultiplication, we get, ⇒x = 50, y = 20 Hence, the present age of A is 50 years and the present age if B is 20 years. 3. A is elder to B by 2 years. A’s father F is twice as old as A and B is twice as old as his sister S. If the age of the father and sister differ by 40 years, find the age of A. Solution: Assuming that, the present age of A = x the present age of B = y the present age of F = z the present age of S = t It’s understood from the question that, A is elder to b by 2 years. ⇒ x = y + 2 F is twice as old as A. ⇒ z = 2x B is twice as old as S. ⇒ y = 2t Also given that the ages of F and S is differing by 40 years. ⇒ z – t = 40. So, the four equations are: x = y + 2 … (i) z = 2x … (ii) y = 2t … (iii) z – t = 40 …(iv) It’s clearly seen from the equations obtained that x, y, z and t are unknowns. And we have to find the value of x. So, by using equation (iii) in (i), (i) Becomes x = 2t + 2 From (iv), we have t = z – 40 Hence, we get x = 2(z – 40) + 2 = 2z – 80 + 2 = 2z – 78 Using the equation (ii), we have x = 2×2x – 78 ⇒ x = 4x − 78 ⇒ 4x – x = 78 ⇒ 3x = 78 ⇒ x = 78/3 ⇒ x = 26 Hence, the age of A is 26 years. 4. Six year hence a man’s age will be three times age of his son and three years ago, he was nine times as old as his son. Find their present ages. Solution: Let’s assume the present ages of the father as x years and that of his son’s age as y years. From the question it’s given that, After 6 years, the man’s age will be (x + 6) years and son’s age will be (y + 6) years. So, the equation formed is x + 6 = 3(y + 6) x + 6 = 3y + 18 x – 3y – 12 = 0……. (i) Also again from the question it’s given as, Before 3 years, the age of the man was (x – 3) years and the age of son’s was (y – 3) years. Furthermore, the relation between their 3 years ago is given below x – 3 = 9(y – 3) x – 3 = 9y – 27 x – 9y + 24 = 0……. (ii) Thus, by solving (i) and (ii), we get the required solution Using crossmultiplication, we get ⇒x = 30, y = 6 Hence, the present age of the man is 30 years and the present age of son is 6 years. 5. Ten years ago, a father was twelve times as old as his son and ten years hence, he will be twice as old as his son will be then. Find their present ages. Solution: Let’s assume the present ages of the father as x years and that of his son’s age as y years. From the question it’s given that, After 10 years, father’s age will be (x+10) years and son’s age will be (y + 10) years. So, the equation formed is x + 10 = 2(y + 10) x – 10 = 2y + 20 x – 2y – 10 = 0……… (i) Also again from the question it’s given as, Before 10 years, the age of father was (x – 10) years and the age of son was (y – 10) years. Furthermore, the relation between their 10 years ago is given below x – 10 = 12(y – 10) x – 10 = 12y – 120 x – 12y + 110 = 0……… (ii) Thus, by solving (i) and (ii), we get the required solution Using crossmultiplication, we have ⇒x = 34, y = 12 Hence, the present age of father is 34 years and the present age of the son is 12 years. 6. The present age of father is 3 years more than three times of the age of the son. Three years hence, father’s age will be 10 years more than twice the age of the son. Determine their present age. Solution: Let’s assume the present ages of the father as x years and that of his son’s age as y years. From the question it’s given that, The present age of father is three years more than three times the age of the son. So, the equation formed is x = 3y + 3 x – 3y 3 = 0 …….. (i) Also again from the question it’s given as, After 3 years, father’s age will be (x + 3) years and son’s age will be (y + 3) years. Furthermore, the relation between their ages after 3 years is given below x + 3 = 2(y + 3) + 10 x – 2y – 13 = 0 …….. (ii) Thus, by solving (i) and (ii), we get the required solution Using crossmultiplication, we have ⇒x = 33, y = 10 Hence, The present age of father = 33 years and the present age of his son = 10 years. Exercise 3.10 Page No: 3.101 1. Points A and B are 70km. apart on a highway. A car starts from A and another car starts from B simultaneously. If they travel in the same direction, they meet in 7hrs, but if they travel towards each other, they meet in one hour. Find the speed of two cars. Solution: Let’s consider the car starting from point A as X and its speed as x km/hr. And, the car starting from point B as Y and its speed as y km/hr. It’s seen that there are two cases in the question: # Case 1: Car X and Y are moving in the same direction # Case 2: Car X and Y are moving in the opposite direction Let’s assume that the meeting point in case 1 as P and in case 2 as Q. Now, solving for case 1: The distance travelled by car X = AP And, the distance travelled by car Y = BP As the time taken for both the cars to meet is 7 hours, The distance travelled by car X in 7 hours = 7x km [∵ distance = speed x time] ⇒ AP = 7x Similarly, The distance travelled by car Y in 7 hours = 7y km ⇒ BP = 7Y As the cars are moving in the same direction (i.e. away from each other), we can write AP – BP = AB So, 7x – 7y = 70 x – y = 10 ………………………. (i) [after taking 7 common out] Now, solving for case 2: In this case as it’s clearly seen that, The distance travelled by car X = AQ And, The distance travelled by car Y = BQ As the time taken for both the cars to meet is 1 hour, The distance travelled by car x in 1 hour = 1x km ⇒ AQ = 1x Similarly, The distance travelled by car y in 1 hour = 1y km ⇒ BQ = 1y Now, since the cars are moving in the opposite direction (i.e. towards each other), we can write AQ + BQ = AB ⇒ x + y = 70 …………… (ii) Hence, by solving (i) and (ii) we get the required solution From (i), we have x = 10 + y……. (iii) Substituting this value of x in (ii). ⇒ (10 + y) + y = 70 ⇒ y = 30 Now, using y = 30 in (iii), we get ⇒ x = 40 Therefore, – Speed of car X = 40km/hr. – Speed of car Y = 30 km/hr. 2. A sailor goes 8 km downstream in 40 minutes and returns in 1 hour. Determine the speed of the sailor in still water and the speed of the current. Solution:
The speed of the sailor in still water as x km/hr And, The speed of the current as y km/hr We know that, Speed of the sailor in upstream = (x – y) km/hr Speed of the sailor in downstream = (x + y) km/hr So, time taken to cover 8 km upstream = 8/ (x – y) hr [∵ time = distance/ speed] And, time taken to cover 8 km downstream = 8/ (x + y hr [∵ time = distance/ speed] It’s given that time taken to cover 8 km downstream in 40 minutes or, 40/ 60 hour or 2/3 hr. 8/ (x + y) = 2/3 8 × 3 = 2(x + y) 24 = 2x + 2y x + y = 12 …………………… (i) [After taking 2 common out and rearranging] Similarly, time taken to cover 8 km upstream in 1hour can be written as, 8/ (x – y) = 1 8 = 1(x – y) ⇒ x – y = 8 …………….. (ii) Hence, by solving (i) and (ii) we get the required solution On adding (i) and (ii) we get, 2x = 20 ⇒ x = 10 Now, putting the value of x in (i), we find y 10 + y = 12 ⇒ y = 2 Therefore, the speed of sailor is 10km/hr and the speed of the current is 2km/hr. 3. The boat goes 30km upstream and 44km downstream in 10 hours. In 13 hours, it can go 40km upstream and 55km downstream. Determine the speed of stream and that of the boat in still water. Solution: Let’s assume, The speed of the boat in still water as x km/hr And, The speed of the stream as y km/hr We know that, Speed of the boat in upstream = (x – y) km/hr Speed of the boat in downstream = (x + y) km/hr So, Time taken to cover 30 km upstream = 30/ (x − y) hr [∵ time = distance/ speed] Time taken to cover 44 km downstream =44/ (x + y) hr [∵ time = distance/ speed] It’s given that the total time of journey is 10 hours. So, this can expressed as 30/ (x – y) + 44/ (x + y) = 10 …….. (i) Similarly, Time taken to cover 40 km upstream = 40/ (x – y) hr [∵ time = distance/ speed] Time taken to cover 55 km downstream = 55/ (x + y) hr [∵ time = distance/ speed] And for this case the total time of the journey is given as 13 hours. Hence, we can write 40/ (x – y) + 55/ (x + y) = 13 ……. (ii) Hence, by solving (i) and (ii) we get the required solution Taking, 1/ (x – y) = u and 1/ (x + y) = v in equations (i) and (ii) we have 30u + 44v = 10 40u + 55v = 10 Which may be re written as, 30u + 44v – 10 = 0 ……. (iii) 40u + 55v – 13 = 0……… (iv) Solving these equations by cross multiplication we get, Now, 1/ (x – y) = 2/10 ⇒ 1 x 10 = 2(x – y) ⇒ 10 = 2x – 2y ⇒ x – y = 5 ……. (v) And, 1/ (x + y) = 1/11 ⇒ x + y = 11 ……. (vi) Again, solving (v) and (vi) Adding (v) and (vi), we get 2x = 16 ⇒ x = 8 Using x in (v), we find y 8 – y = 5 ⇒ y = 3 Therefore, the speed of the boat in still water is 8 km/hr and the speed of the stream is 3 km/hr. 4. A boat goes 24km upstream and 28km downstream in 6hrs. It goes 30km upstream and 21km downstream in 6.5 hours. Find the speed of the boat in still water and also speed of the stream. Solution:
The speed of the boat in still water as x km/hr And, The speed of the stream as y km/hr We know that, Speed of the boat in upstream = (x – y) km/hr Speed of the boat in downstream = (x + y) km/hr So, time taken to cover 28 km downstream = 28/ (x+y) hr [∵ time = distance/ speed] Time taken to cover 24 km upstream =24/ (x – y) hr [∵ time = distance/ speed] It’s given that the total time of journey is 6 hours. So, this can expressed as 24/ (x – y) + 28/ (x + y) = 6…… (i) Similarly, Time taken to cover 30 km upstream = 30/ (x − y) [∵ time = distance/ speed] Time taken to cover 21km downstream =21/ (x + y) [∵ time = distance/ speed] And for this case the total time of the journey is given as 6.5 i.e 13/2 hours. Hence, we can write 30/ (x – y) + 21/ (x + y) = 13/2 ….. (ii) Hence, by solving (i) and (ii) we get the required solution Taking, 1/ (x – y) = u and 1/ (x + y) = v in equations (i) and (ii) we have (after rearranging) 24u + 28v – 6 = 0 …… (iii) 30u + 21v – 13/2 = 0 ……. (iv) Solving these equations by cross multiplication we get, u = 1/6 and v = 1/14 Now, u = 1/ (x − y) = 1/ 6 x – y = 6 …. (v) v = 1/ (x + y) = 1/ 14 x + y = 14……. (vi) On Solving (v) and (vi) Adding (v) and (vi), we get 2x = 20 ⇒ x = 10 Using x = 10 in (v), we find y 10 + y = 14 ⇒ y = 4 Therefore, Speed of the stream = 4km/hr. Speed of boat = 10km/hr. 5. A man walks a certain distance with a certain speed. If he walks 1/2 km an hour faster, he takes 1 hour less. But, if he walks 1km an hour slower, he takes 3 more hours. Find the distance covered by the man and his original rate of walking. Solution: Let the actual speed of the man be x km/hr and y be the actual time taken by him in hours. So, we know that Distance covered = speed × distance ⇒ Distance = x × y = xy …………………………. (i) First condition from the question says that, If the speed of the man increase by 1/2 km/hr, the journey time will reduce by 1 hour. Showing this using variables, we have ⇒ When speed is (x + 1/2) km/hr, time of journey = y – 1 hours Now, Distance covered = (x + 1/2) x (y – 1) km Since the distance is the same i.e xy we can equate it, [from (i)] xy = (x + 1/2) x (y – 1) And we finally get, 2x + y – 1 = 0 ………………….. (ii) From the second condition of the question, we have If the speed reduces by 1 km/hr then the time of journey increases by 3 hours. ⇒ When speed is (x1) km/hr, time of journey is (y+3) hours Since, the distance covered = xy [from (i)] xy = (x1)(y+3) ⇒ xy = xy – 1y + 3x – 3 ⇒ xy = xy + 3x – 1y – 3 ⇒ 3x – y – 3 = 0 ……………… (iii) From (ii) and (iii), the value of x can be calculated by (ii) + (iii) ⇒ x – 4 = 0 x = 4 Now, y can be obtained by using x = 4 in (ii) 2(4) + y – 1 = 0 ⇒ y = 1 + 8 = 9 Hence, putting the value of x and y in equation (i), we find the distance Distance covered = xy = 4 × 9 = 36 km Thus, the distance is 36 km and the speed of walking is 4 km/hr. 6. A person rowing at the rate of 5km/h in still water, takes thrice as much as time in going 40 km upstream as in going 40km downstream. Find the speed of the stream. Solution: Let’s assume x to be the speed of the stream. So, we know that Speed of boat in downstream = (5 + x) and, Speed of boat in upstream = (5 – x) It is given that, The distance in one way is 40km. And, Time taken during upstream = 3 × time taken during the downstream Expressing it by equations, we have 40/ (5 – x) = 3 x 40/ (5 + x) [∵ time = distance/ speed] By cross multiplication, we get (5+x) = 3(5x) ⇒ 5 + x = 3(5 – x) ⇒ x + 3x = 15 – 5 ⇒ x = 10/4 = 2.5 Therefore, the speed of the stream is 2.5 km/hr. 7. Ramesh travels 760km to his home partly by train and partly by car. He takes 8 hours if he travels 160km by train and the rest by car. He takes 12 minutes more if he travels 240km by train and the rest by car. Find the speed of the train and car respectively. Solution: Let’s assume, The speed of the train be x km/hr The speed of the car = y km/hr From the question, it’s understood that there are two parts # Part 1: When Ramesh travels 160 Km by train and the rest by car. # Part 2: When Ramesh travels 240Km by train and the rest by car. Part 1, Time taken by Ramesh to travel 160 km by train = 160/x hrs [∵ time = distance/ speed] Time taken by Ramesh to travel the remaining (760 – 160) km i.e., 600 km by car =600/y hrs So, the total time taken by Ramesh to cover 760Km = 160/x hrs + 600/y hrs It’s given that, Total time taken for this journey = 8 hours So, by equations its 160/x + 600/y = 8 20/x + 75/y = 1 [on dividing previous equation by 8] …………………… (i) Part 2, Time taken by Ramesh to travel 240 km by train = 240/x hrs Time taken by Ramesh to travel (760 – 240) = 520km by car = 520/y hrs For this journey, it’s given that Ramesh will take a total of is 8 hours and 12 minutes to finish. 240/x + 520/y = 8hrs 12mins = 8 + (12/60) = 41/5 hr 240/x + 520/y = 41/5 6/x + 13/y = 41/200 ………. (ii) Solving (i) and (ii), we get the required solution Let’s take 1/x = u and 1/y = v, So, (i) and (ii) becomes, 20u + 75v = 1 ……….. (iii) 6u + 13v = 41/200 ……. (iv) On multiplying (iii) by 3 and (iv) by 10, 60u + 225v = 3 60u + 130v = 41/20 Subtracting the above two equations, we get (225 – 130)v = 3 – 41/20 95v = 19/ 20 ⇒ v = 19/ (20 x 95) = 1/100 ⇒ y = 1/v = 100 Using v = 1/100 in (iii) to find v, 20u + 75(1/100) = 1 20u = 1 – 75/100 ⇒ 20u = 25/100 = 1/4 ⇒ u = 1/80 ⇒ x = 1/u = 80 So, the speed of the train is 80km/hr and the speed of car is100km/hr. 8) A man travels 600 km partly by train and partly by car. If he covers 400km by train and the rest by car, it takes him 6 hours and 30 minutes. But, if he travels 200km by train and the rest by car, he takes half an hour longer. Find the speed of the train and the speed of the car. Solution: Let’s assume, The speed of the train be x km/hr The speed of the car = y km/hr From the question, it’s understood that there are two parts # Part 1: When the man travels 400 km by train and the rest by car. # Part 2: When Ramesh travels 200 km by train and the rest by car. Part 1, Time taken by the man to travel 400km by train = 400/x hrs [∵ time = distance/ speed] Time taken by the man to travel (600 – 400) = 200km by car = 200/y hrs Time taken by a man to cover 600km = 400/x hrs + 200/y hrs Total time taken for this journey = 6 hours + 30 mins = 6 + 1/2 = 13/2 So, by equations its 400/x + 200/y = 13/2 400/x + 200/y = 13/2 400/x + 200/y = 13/2 200 (2/x + 1/y) = 13/2 2/x + 1/y = 13/400 .…(i) Part 2, Time taken by the man to travel 200 km by train = 200/x hrs. [∵ time = distance/ speed] Time taken by the man to travel (600 – 200) = 400km by car = 200/y hrs For the part, the total time of the journey is given as 6hours 30 mins + 30 mins that is 7hrs, 200/x + 400/y = 7 200 (1/x + 2/y) = 7 1/x + 2/y = 7/200 …..(ii) Taking 1/x = u, and 1/y = v, So, the equations (i) and (ii) becomes, 2u + v = 13/400 ….. (iii) u + 2v = 7/200 ……. (iv) Solving (iii) and (iv), by (iv) x 2 – (iii) ⇒ 3v = 14/200 – 13/400 3v = 1/400 x (28 – 13) 3v = 15/400 v = 1/80 ⇒ y = 1/v = 80 Now, using v in (iii) we find u, 2u + (1/80) = 13/400 2u = 13/400 – 1/80 2u = 8/400 u = 1/100 ⇒ x = 1/u = 100 Hence, the speed of the train is 100km/hr and the speed of the car is 80km/hr. 9. Places A and B are 80km apart from each other on a highway. A car starts from A and other from B at the same time. If they move in the same direction, they meet in 8 hours and if they move in opposite direction, they meet in 1hour and 20 minutes. Find the speeds of the cars. Solution: Let’s consider the car starting from point A as X and its speed as x km/hr. And, the car starting from point B as Y and its speed as y km/hr. It’s seen that there are two cases in the question: # Case 1: Car X and Y are moving in the same direction # Case 2: Car X and Y are moving in the opposite direction Let’s assume that the meeting point in case 1 as P and in case 2 as Q. Now, solving for case 1: The distance travelled by car X = AP And, the distance travelled by car Y = BP As the time taken for both the cars to meet is 8 hours, The distance travelled by car X in 7 hours = 8x km [∵ distance = speed x time] ⇒ AP = 8x Similarly, The distance travelled by car Y in 8 hours = 8y km ⇒ BP = 8Y As the cars are moving in the same direction (i.e. away from each other), we can write AP – BP = AB So, 8x – 8y = 80 ⇒ x – y = 10 ………………………. (i) [After taking 8 common out] Now, solving for case 2: In this case as it’s clearly seen that, The distance travelled by car X = AQ And, The distance travelled by car Y = BQ As the time taken for both the cars to meet is 1 hour and 20 min, ⇒1 + (20/60) = 4/3 hr The distance travelled by car x in 4/3 hour = 4x/3 km ⇒ AQ = 4x/3 Similarly, The distance travelled by car y in 4/3 hour = 4y/3 km ⇒ BQ = 4y/3 Now, since the cars are moving in the opposite direction (i.e. towards each other), we can write AQ + BQ = AB ⇒ 4x/3 + 4y/3 = 80 ⇒ 4x + 4y = 240 ⇒ x + y = 60 …………… (ii) [After taking LCM] Hence, by solving (i) and (ii) we get the required solution From (i), we have x = 10 + y……. (iii) Substituting this value of x in (ii). ⇒ (10 + y) + y = 60 ⇒ 2y = 50 ⇒ y = 25 Now, using y = 30 in (iii), we get ⇒ x = 35 Therefore, – Speed of car X = 35 km/hr. – Speed of car Y = 25 km/hr. Exercise 3.11 Page No: 3.111 1. If in a rectangle, the length is increased and breadth reduced each by 2 units, the area is reduced by 28 square units. If, however the length is reduced by 1 unit and the breadth increased by 2 units, the area increases by 33 square units. Find the area of the rectangle. Solution: Let’s assume the length and breadth of the rectangle be x units and y units respectively. Hence, the area of rectangle = xy sq.units From the question we have the following cases, Case 1: Length is increased by 2 units ⇒ now, the new length is x+2 units Breadth is reduced by 2 units ⇒ now, the new breadth is y2 units And it’s given that the area is reduced by 28 square units i.e. = xy – 28 So, the equation becomes (x+2)(y−2) = xy − 28 ⇒ xy − 2x + 2y – 4 = xy − 28 ⇒ −2x + 2y – 4 + 28 = 0 ⇒ −2x + 2y + 24 = 0 ⇒ 2x − 2y – 24 = 0 ……… (i) Case 2: Length is reduced by 1 unit ⇒ now, the new length is x1 units Breadth is increased by 2 units ⇒ now, the new breadth is y+2 units And, it’s given that the area is increased by 33 square units i.e. = i.e. = xy + 33 So, the equation becomes (x−1)(y+2) = xy + 33 ⇒ xy + 2x – y – 2 = x + 33 ⇒ 2x – y − 2 − 33 = 0 ⇒ 2x – y −35 = 0 ……….. (ii) Solving (i) and (ii), By using cross multiplication, we get x = 46/2 x = 23 And, y = 22/2 y = 11 Hence, The length of the rectangle is 23 units. The breadth of the rectangle is 11 units. So, the area of the actual rectangle = length x breadth, = x×y = 23 x 11 = 253 sq. units Therefore, the area of rectangle is 253 sq. units. 2. The area of a rectangle remains the same if the length is increased by 7 metres and the breadth is decreased by 3 metres. The area remains unaffected if the length is decreased by 7 metres and the breadth is increased by 5 metres. Find the dimensions of the rectangle. Solution: Let’s assume the length and breadth of the rectangle be x units and y units respectively. Hence, the area of rectangle = xy sq.units From the question we have the following cases, Case 1 Length is increased by 7 metres ⇒ now, the new length is x+7 Breadth is decreased by 3 metres ⇒ now, the new breadth is y3 And it’s given, the area of the rectangle remains same i.e. = xy. So, the equation becomes xy = (x+7)(y−3) xy = xy + 7y − 3x − 21 3x – 7y + 21 = 0 ………. (i) Case 2: Length is decreased by 7 metres ⇒ now, the new length is x7 Breadth is increased by 5 metres ⇒ now, the new breadth is y+5 And it’s given that, the area of the rectangle still remains same i.e. = xy. So, the equation becomes xy = (x−7)(y+5) xy = xy − 7y + 5x − 35 5x – 7y – 35 = 0 ………. (ii) Solving (i) and (ii), By using crossmultiplication, we get, x = 392/14 x = 28 And, y = 210/14 y = 15 Therefore, the length of the rectangle is 28 m. and the breadth of the actual rectangle is 15 m. 3. In a rectangle, if the length is increased by 3 metres and breadth is decreased by 4 metres, the area of the triangle is reduced by 67 square metres. If length is reduced by 1 metre and breadth is increased by 4 metres, the area is increased by 89 sq. metres. Find the dimension of the rectangle. Solution: Let’s assume the length and breadth of the rectangle be x units and y units respectively. Hence, the area of rectangle = xy sq.units From the question we have the following cases, According to the question, Case 1: Length is increased by 3 metres ⇒ now, the new length is x+3 Breadth is reduced by 4 metres ⇒ now, the new breadth is y4 And it’s given, the area of the rectangle is reduced by 67 m2 = xy – 67. So, the equation becomes xy – 67 = (x + 3)(y – 4) xy – 67 = xy + 3y – 4x – 12 4xy – 3y – 67 + 12 = 0 4x – 3y – 55 = 0 —— (i) Case 2: Length is reduced by 1 m ⇒ now, the new length is x1 Breadth is increased by 4 metre ⇒ now, the new breadth is y+4 And it’s given, the area of the rectangle is increased by 89 m2 = xy + 89. Then, the equation becomes xy + 89 = (x 1)(y + 4) 4x – y – 93 = 0 —— (ii) Solving (i) and (ii), Using cross multiplication, we get x = 224/8 x = 28 And, y = 152/8 y = 19 Therefore, the length of rectangle is 28 m and the breadth of rectangle is 19 m. 4. The income of X and Y are in the ratio of 8: 7 and their expenditures are in the ratio 19: 16. If each saves ₹ 1250, find their incomes. Solution: Let the income be denoted by x and the expenditure be denoted by y. Then, from the question we have The income of X is ₹ 8x and the expenditure of X is 19y. The income of Y is ₹ 7x and the expenditure of Y is 16y. So, on calculating the savings, we get Saving of X = 8x – 19y = 1250 Saving of Y = 7x – 16y = 1250 Hence, the system of equations formed are 8x – 19y – 1250 = 0 —– (i) 7x – 16y – 1250 = 0 —– (ii) Using crossmultiplication method, we have x = 3750/5 x = 750 If, x = 750, then The income of X = 8x = 8 x 750 = 6000 The income of Y = 7x = 7 x 750 = 5250 Therefore, the income of X is ₹ 6000 and the income of Y is ₹ 5250 5. A and B each has some money. If A gives ₹ 30 to B, then B will have twice the money left with A. But, if B gives ₹ 10 to A, then A will have thrice as much as is left with B. How much money does each have? Solution: Let’s assume the money with A be ₹ x and the money with B be ₹ y. Then, from the question we have the following cases Case 1: If A gives ₹ 30 to B, then B will have twice the money left with A. So, the equation becomes y + 30 = 2(x – 30) y + 30 = 2x – 60 2x – y – 60 – 30 = 0 2x – y – 90 = 0 —— (i) Case 2: If B gives ₹ 10 to A, then A will have thrice as much as is left with B. x + 10 = 3(y – 10) x + 10 = 3y – 10 x – 3y + 10 + 30 = 0 x – 3y + 40 = 0 —— (ii) Solving (i) and (ii), On multiplying equation (ii) with 2, we get, 2x – 6y + 80 = 0 Subtract equation (ii) from (i), we get, 2x – y – 90 – (2x – 6y + 80) = 0 5y – 170 =0 y = 34 Now, on using y = 34 in equation (i), we find, x = 62 Hence, the money with A is ₹ 62 and the money with B be ₹ 34
7. 2 men and 7 boys can do a piece of work in 4 days. The same work is done in 3 days by 4 men and 4 boys. How long would it take one man and one boy to do it? Solution: Assuming that the time required for a man alone to finish the work be x days and also the time required for a boy alone to finish the work be y days. Then, we know The work done by a man in one day = 1/x The work done by a boy in one day = 1/y Similarly, The work done by 2 men in one day = 2/x The work done by 7 boys in one day = 7/y So, the condition given in the question states that, 2 men and 7 boys together can finish the work in 4 days 4(2/x + 7/y) = 1 8/x + 28/y = 1 ——–(i) And, the second condition from the question states that, 4 men and 4 boys can finish the work in 3 days For this, the equation so formed is 3(4/x + 4/y) = 1 12/x + 12/y = 1 ——–(ii) Hence, solving (i) and (ii) ⇒ Taking, 1/x = u and 1/y = v So, the equations (i) and (ii) becomes, 8u + 28v = 1 12u + 12v = 1 8u + 28v – 1 = 0 —— (iii) 12u + 12v – 1 = 0 —— (iv) By using cross multiplication, we get, u = 1/15 1/x = 1/15 x = 15 And, v = 1/60 1/y = 1/60 y = 60 Therefore, The time required for a man alone to finish the work is 15 days and the time required for a boy alone to finish the work is 60 days. 8. In a ΔABC, ∠A = xo, ∠B = (3x – 2)o, ∠C = yo. Also, ∠C – ∠B = 9o. Find the three angles. Solution: It’s given that, ∠A = xo, ∠B = (3x – 2)o, ∠C = yo Also given that, ∠C – ∠B = 9o ⇒ ∠C = 9∘ + ∠B ⇒ ∠C = 9∘ + 3x∘ − 2∘ ⇒ ∠C = 7∘ + 3x∘ Substituting the value for ∠C = yo in above equation we get, yo = 7o + 3xo We know that, ∠A + ∠B + ∠C = 180o (Angle sum property of a triangle) ⇒ x∘ + (3x∘ − 2∘) + (7∘ + 3x∘) = 180∘ ⇒ 7x∘ + 5∘ = 180∘ ⇒ 7x∘ = 175∘ ⇒ x∘ = 25∘ Hence, calculating for the individual angles we get, ∠A = xo = 25o ∠B = (3x – 2)o = 73o ∠C = (7 + 3x)o = 82o Therefore, ∠A = 25o, ∠B = 73o and ∠C = 82o . 9. In a cyclic quadrilateral ABCD, ∠A = (2x + 4)o, ∠B = (y + 3)o, ∠C = (2y + 10)o, ∠D = (4x – 5)o. Find the four angles. Solution: We know that, The sum of the opposite angles of cyclic quadrilateral should be 180o. And, in the cyclic quadrilateral ABCD, Angles ∠A and ∠C & angles ∠B and ∠D are the pairs of opposite angles. So, ∠A + ∠C = 180o and ∠B + ∠D = 180o Substituting the values given to the above two equations, we have For ∠A + ∠C = 180o ⇒ ∠A = (2x + 4)o and ∠C = (2y + 10)o 2x + 4 + 2y + 10 = 180o 2x + 2y + 14 = 180o 2x + 2y = 180o – 14o 2x + 2y = 166 —— (i) And for, ∠B + ∠D = 180o, we have ⇒ ∠B = (y+3)o and ∠D = (4x – 5)o y + 3 + 4x – 5 = 180o 4x + y – 5 + 3 = 180o 4x + y – 2 = 180o 4x + y = 180o + 2o 4x + y = 182o —— (ii) Now for solving (i) and (ii), we perform Multiplying equation (ii) by 2 to get, 8x + 2y = 364 —— (iii) And now, subtract equation (iii) from (i) to get 6x = 198 x = −198/ −6 ⇒ x = 33o Now, substituting the value of x = 33o in equation (ii) to find y 4x + y = 182 132 + y = 182 y = 182 – 132 ⇒ y = 50 Thus, calculating the angles of a cyclic quadrilateral we get: ∠A = 2x + 4 = 66 + 4 = 70o ∠B = y + 3 = 50 + 3 = 53o ∠C = 2y + 10 = 100 + 10 = 110o ∠D = 4x – 5 = 132 – 5 = 127o Therefore, the angles of the cyclic quadrilateral ABCD are ∠A = 70o, ∠B = 53o, ∠C = 110o and ∠D = 127o
10. Yash scored 40 marks in a test, getting 3 marks for each right answer and losing 1 mark for each wrong answer. Had 4 marks been awarded for each correct answer and 2 marks been deducted for each incorrect answer, then Yash would have scored 50 marks. How many questions were there in the test? Solution: Let’s assume that the total number of correct answers be x and the total number of incorrect answers be y. Hence, their sum will give the total number of questions in the test i.e. x + y Further from the question, we have two type of marking scheme: 1) When 3 marks is awarded for every right answer and 1 mark deducted for every wrong answer. According to this type, the total marks scored by Yash is 40. (Given) So, the equation formed will be 3x – 1y = 40 ….. (i) Next, 2) When 4 marks is awarded for every right answer and 2 marks deducted for every wrong answer. According to this type, the total marks scored by Yash is 50. (Given) So, the equation formed will be 4x – 2y = 50 …… (ii) Thus, by solving (i) and (ii) we obtained the values of x and y. From (i), we get y = 3x – 40 …….. (iii) Using (iii) in (ii) we get, 4x – 2(3x – 40) = 50 4x – 6x + 80 = 50 2x = 30 x = 15 Putting x = 14 in (iii) we get, y = 3(15) – 40 y = 5 So, x + y = 15 + 5 = 20 Therefore, the number of questions in the test were 20. 11. In a ΔABC, ∠A = xo, ∠B = 3xo, ∠C = yo. If 3y – 5x = 30, prove that the triangle is right angled. Solution: We need to prove that ΔABC is right angled. Given: ∠A = xo, ∠B = 3xo and ∠C = yo Sum of the three angles in a triangle is 180o (Angle sum property of a triangle) i.e., ∠A + ∠B + ∠C = 180o x + 3x + y = 180o 4x + y = 180 —— (i) From question it’s given that, 3y – 5x = 30 —– (ii) To solve (i) and (ii), we perform Multiplying equation (i) by 3 to get, 12x + 36y = 540 —– (iii) Now, subtracting equation (ii) from equation (iii) we get 17x = 510 x = 510/17 ⇒ x = 30o Substituting the value of x = 30o in equation (i) to find y 4x + y = 180 120 + y = 180 y = 180 – 120 ⇒ y = 60o Thus the angles ∠A, ∠B and ∠C are calculated to be ∠A = xo = 30o ∠B = 3xo = 90o ∠C = yo = 60o A right angled triangle is a triangle with any one side right angled to other, i.e., 90o to other. And here we have, ∠B = 90o. Therefore, the triangle ABC is right angled. Hence proved. 12. The car hire charges in a city comprise of a fixed charges together with the charge for the distance covered. For a journey of 12 km, the charge paid is ₹ 89 and for a journey of 20 km, the charge paid is ₹ 145. What will a person have to pay for travelling a distance of 30 km? Solution: Let the fixed charge of the car be ₹ x and, Let the variable charges of the car be ₹ y per km. So according to the question, we get 2 equations x + 12y = 89 —— (i) and, x + 20y = 145 —— (ii) Now, by solving (i) and (ii) we can find the charges. On subtraction of (i) from (ii), we get, 8y = 56 y = −56 − 8 ⇒ y = 7 So, substituting the value of y = 7 in equation (i) we get x + 12y = 89 x + 84 = 89 x = 89 – 84 ⇒ x = 5 Thus, the total charges for travelling a distance of 30 km can be calculated as: x + 30y ⇒ x + 30y = 5 + 210 = ₹ 215 Therefore, a person has to pay ₹ 215 for travelling a distance of 30 km by the car.
Frequently Asked Questions on RD Sharma Solutions for Class 10 Maths Chapter 3Where can I get the accurate solution for RD Sharma Solution for Class 10 Maths Chapter 3?At BYJU’S you can get the accurate solution in PDF format for RD Sharma Solution for Class 10 Maths Chapter 3. The RD Sharma Textbook Solutions for the chapter have been designed accurately by Mathematics experts at BYJU’S. All these solutions are provided by considering the new pattern of CBSE, so that students can get thorough knowledge for their exams. Is it necessary to solve each problem provided in the RD Sharma Solution for Class 10 Maths Chapter 3?Yes. Because these questions are important from an exam perspective. These questions are solved by experts to help the students to crack exercise very easily. These solutions help students to familiarize themselves with the integers. Solutions are available in PDF format on BYJU’S website. The questions present in this have been solved by BYJU’S experts in Maths, and this will help students solve the problems without any difficulties. For what value of K the following equations are inconsistent?k=−4 the given system of equations are inconsistent.
For what value of k for the equation 3x y 8 0 and 6x Ky =For what value of k do the equations 3x – y + 8 = 0 and 6x – ky = –16 represent coincident lines? So, k = 2.
For what value of k is the linear system consistent?For a linear system, you can have no solutions (so the system is inconsistent), one solution or an infinite number of solutions (in these two cases the system is consistent). So for the system to be consistent, we need k + 3h = 0, which is satisfied by (A).
For what value of k will the pair of linear equations KX 3y K 3 0 and 12x Ky k 0 have infinitely many solutions?For what values of k will the following pair of linear equations have infinitely many solutions? kx + 3y  (k – 3) = 0. 12x + ky  k = 0. The value of k which satisfies both the equations is 6.
