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Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10 PDF Download

Q 1: A father is 3 times as old as his son. After 12 years, his age will be twice as that of his son then. Find their present ages.

Sol. Let the present age of the father be x years. Father is 3 times as old as his son. Thus we have

X = 3y

⇒  x – 3y = 0

After 12 years, father’s age will be (x + 12) years and son’s age will be (y + 12) years. Thus using the given information, we have

x + 12 = 2(y + 12)

⇒  x + 12 = 2y + 24

⇒  x – 2y – 12 = 0

So, we have two equations

x – 3y = 0

x – 2y – 12 = 0

Here, x and y are unknowns. We have to solve the above equations for x and y.

By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

x/36 = −y/−12 = 1/1

x/36 = y/12 = 1

x = 36, y = 12

Hence, the present age of father is 36 years and the present age of son Is 12 years.

 

Q 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.

Sol. Let the present age of x years and the present age of B be y years.

After 10 years, A’s age will be (x + 10) years and B’s age will be (y + 10) years. Thus using the given information, we have

x – 5 = 3(y – 5)

⇒  x + 10 = 2y + 20

⇒  x – 2y – 10 = 0

Before 5 years, the age of A was (x – 5) years and the age of B was (y – 5) years. Thus using the given information, we have

x – 5 = 3(y – 5)

⇒  x – 5 = 3y – 15

⇒  x – 3y + 10 = 0

So, we have 2 equations

x – 2y – 10 = 0

x – 3y + 10 = 0

Here, x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/−50 = −y/20 = 1/−1

⇒ x/50 = y/20 = 1

⇒ x = 50,y = 20

Hence, the present age of A is 50 years and the present age if b is 20 years.

 

Q 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.

Sol. Let the present ages of A, B, F and S be x, y, z and t years respectively.

A is elder to b by 2 years. Thus, we have x = y + 2

F is twice as old as A. Thus, we have z = 2x

B is twice as old as S. Thus, we have y = 2t

The ages of F and S is differing by 40 years. Thus we have z – t = 40.

So, we have four equations

x = y + 2,…(1)

z = 2x,…(2)

y = 2t, …(3)

z – t = 40 …(4)

Here x, y, z and t are unknowns. We have to find the value of x. By using the third equation, the first equation becomes x = 2t + 2

From the third equation, the first equation becomes x = 2t + 2

From the fourth equation, we havet = z – 40

Hence, we have

x = 2(z – 40) + 2

= 2z – 80 + 2

= 2z – 78

Using the second equation, 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.

 

Q 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.

Sol. Let the present age of the man be x years and the present age of his son be y years.

After 6 years, the man’s age will be (x + 6) years and son’s age will be (y + 6) years. Thus using the given information, we have

x + 6 = 3(y + 6)

x + 6 = 3y + 18

x – 3y – 12 = 0

Before 3 years, the age of the man was (x – 3) years and the age of son’s was (y — 3) years. Thus using the given information, we have

x – 3 = 9(y – 3)

x – 3 = 9y – 27

x – 9y + 24 = 0

So, we have two equations

x – 3y – 12 = 0

x – 9y + 24 = 0

Here x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/−180 = −y/36 = 1/−9 + 3

⇒ x/180 = y/36 = 1/6

⇒ x = 180/6,y = 36/6

|⇒ x = 30,y = 6

Hence, the present age of the man is 30 years and the present age of son is 6 years.

 

Q 5: Ten years ago, a father was 12 times as old as his son and 10 years hence, he will be twice as old as his son will be then. Find their present ages.

Sol. Let the present age of father be x years and the present age of his son be y years.

After 10 years, father’s age will be (x + 10) years and son’s age will be (y + 10) years. Thus using the given information, we have

x + 10 = 2(y + 10)

x – 10 = 2y + 20

x – 2y – 10 = 0

Before 10 years, the age of father was (x – 10)years and the age of son was (y — 10) years. Thus using the given information, we have

x – 10 = 12(y – 10)

x – 10 = 12y—I20

x – 12y + 110 = 0

So, we have two equations

x – 2y – 10 = 0

x – 12y + 110 = 0

Here x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/−340 = −y/120 = 1/−10

⇒ x/340 = y/120 = 1/10

⇒ x = 340/10,y = 120/10

⇒ x = 34,y = 12

Hence, the present age of father is 34 years and the present age of the son is 12 years.

 

Q 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.

Sol. Let the present age of father be x years and the present age of his son be y years.

The present age of father is three years more than three times the age of the son. Thus, we have

x = 3y + 3 x – 3y – 3 = 0

After 3 years, father’s age will be (x + 3)years and son’s age will be (y + 3)years.

Thus using the given information, we have

x + 3 = 2(y – F3) + 10

x + 3 = 4 + 6 + 10

x — 2y – 13 = 0 So.

We have two equations

x – 3y – 3 = 0

x – 2y – 13 = 0

Here x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/33 = −y/−10 = 1/1

⇒ x/33 = y/10 = 1

⇒ x = x/33,y = y/10

⇒ x = 33,y = 10

 

Q 7. A father is 3 times as old as his son. In 12 years’ time, he will be twice as old as his son. Find the present ages of son and father.

Sol. Let the present age of father be x years and the present age of his son be y years.

The present age of father is three times the age of the son. Thus, we have

x = 3y

x – 3y = 0

After 12 years, father’s age will be (x + 12) years and son’s age will be (y + 12)years. Thus using the given information, we have

x + 12 = 2(y + 12)

x + 12 = 2y + 24

x – 2y – 12 = 0

So, we have two equations

x – 3y = 0

x – 2y – 12 = 0

Here x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/36 = −y/−12 = 1/1

⇒ x/36 = y/12 = 1

⇒ x/33 = y/10

⇒ x = 36,y = 12

Hence, the present age of the father is 36 years old and the present age of son is 12 years.

 

Q 8. Father’s age is three times the sum of age of his 2 children. After 5 years his age will be twice the sum of ages of two children. Find the age of father.

Sol. Let the present age of father be x years and the present ages of his two children’s be y and z years.

The present age of father is three times the sum of the ages of the two children’s. Thus, we have

x = 3(y + z)

y + z =  x/3

After 5 years, father’s age will be (x + 5) years and the children’s age will be (y + 5) and (z + 5) years. Thus using the given information, we have

x + 5 = 2{(y + 5) + (z + 5)}

x + 5 = 2(y + 5 + z + 5)

x = 2(y + z) + 20 – 5

x = 2(y + z) + I5

So, we have two equations

y + z =  x/3

x = 2(y + z) + 15

Here x, y and z are unknowns. We have to find the value of x.

Substituting the value of (y + z) from the first equation in the second equation, we have

By using cross – multiplication, we have

x =  2x/3 + 15

⇒ x – 2x/3 = 15

⇒ x(1 – 2/3) = 15

⇒ x/3 = 15

⇒ x = 15×3

⇒ x = 45

Hence, the present age of father is 45 years.

 

Q 9. Two years ago, a father was 5 times as old as his son. Two years later his age will be 8 more than 3 times the age of the son. Find the present ages of father and son.

Sol. Let the present age of father be x years and the present age of his son be y years.

After 2 years, father’s age will be (x + 2) years and the age of son will be (y + 2) years. Thus using the given information, we have

x + 2 = 3(y + 2) + 8

x + 2 = 3y + 6 + 8

x – 3y – 12 = 0

Before 2 years, the age of father was (x —2) years and the age of son was (y— 2) years. Thus using the given information, we have

x – 2 = 5(y – 2)

x – 2 = 5y – 10

x – 5y + 8 = 0

So, we have two equations

x – 3y – 12 = 0

x – 5y + 8 = 0

Here x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/−84 = −y/20 = 1/−2

⇒ x/84 = y/20 = 1/2

⇒ x = 84/2,y = 20/2

⇒ x = 42,y = 10

Hence, the present age of father is 42 years and the present age of son is 10 years.

 

Q 10. Five years ago, Nuri was thrice as old as Sonu. Ten years later, Nuri will be twice as old as Sonu. How old are Nuri and Sonu?

Sol. Let the present age of Nuri be x years and the present age of Sonu be y years.

After 10 years, Nuri’s age will be(x + 10) years and the age of Sonu will be(y + 10) years. Thus using the given information, we have

x + 10 = 2(y + 10)

x + 10 = 2y + 20

x – 2y – 10 = 0

Before 5 years, the age of Nuri was (x – 5)years and the age of Sonu was (y – 5)years. Thus using the given information, we have

x – 5 = 3(y – 5)

x – 5 = 3y – 15

x – 3y + 10 = 0

So, we have two equations

x – 2/y – 10 = 0

x – 3/y + 10 = 0

Here x and y are unknowns. We have to solve the above equations for x and y. By using cross – multiplication, we have

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10

⇒ x/−50 = −y/20 = 1/−1

⇒ x/50 = y/20 = 1

⇒ x = 50,y = 20

 

Q 11. The ages of two friends Ani and biju differ by 3 years. Ani’s father Dharam is twice as old as Ani and Biju as twice as old as his sister Cathy. The ages of Cathy and Dharam differ by 30 years. Find the ages of Ani and Biju.

 

Sol. Let the present ages of Ani, Biju, Dharam and Cathy be x, y, z and t years respectively.

The ages of Ani and Biju differ by 3 years. Thus, we have

x – y = ±3

x = y±3

Dharam is twice as old as Ani. Thus, we have

z = 2x

Biju is twice as old as Cathy. Thus, we have

y = 2t

The ages of Cathy and Dharam differ by 30 years. Clearly, Dharam is older than Cathy. Thus, we have

z – t = 30

So, we have two systems of simultaneous equations

(i)   x = y + 3,

z = 2x,

y = 2t,

z – t = 30

(ii) x = y – 3,

z = 2x,

y = 2t,

z – t = 30

Here x, y, z and t are unknowns. We have to find the value of x and y.

(i) By using the third equation, the first equation becomes x = 2t + 3

From the fourth equation, we have

t = z – 30

Hence, we have

x = 2(z – 30) + 3

= 2z – 60 + 3

= 2z – 57

Using the second equation, we have

x = 2×2x−57

x = 4x – 57

4x – x = 57

3x = 57

x = 57/3

x = 19

From the first equation, we have

x = y + 3

y = x – 3

y = 19 – 3

y = 16

Hence, the age of Ani is 19 years and the age of Biju is 16 years.

(ii) By using the third equation, the first equation becomes x = 2t – 3.

From the fourth equation, we have

t  = z – 30

Hence, we have

x = 2(z —30) – 3

= 2z – 60 – 3

= 2z – 63

Using the second equation, we have

x = 2×2x – 63

x = 4x – 63

4x – x = 63

3x = 63

x = 63/3

x = 21

From the first equation, we have

x = y – 3

y = x + 3

y = 2/1 + 3

y = 2/4

Hence, the age of Ani is 21 years and the age of Biju is 24 years.

Note that there are two possibilities.

The document Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions | Extra Documents, Videos & Tests for Class 10 is a part of the Class 10 Course Extra Documents, Videos & Tests for Class 10.
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FAQs on Ex-3.9 Pair Of Linear Equations In Two Variables, Class 10, Maths RD Sharma Solutions - Extra Documents, Videos & Tests for Class 10

1. What is the importance of studying pair of linear equations in two variables in Class 10 Maths?
Ans. Studying pair of linear equations in two variables is important in Class 10 Maths because it helps in understanding the concept of simultaneous equations. This concept is applicable in various real-life situations such as finding the price of two different items, determining the number of boys and girls in a classroom, or calculating the time taken by two vehicles to meet each other. It also lays the foundation for further studies in algebra and calculus.
2. How can I solve pair of linear equations in two variables using the graphical method?
Ans. To solve a pair of linear equations in two variables using the graphical method, follow these steps: 1. Plot the graph of each equation on a coordinate plane. 2. Determine the point of intersection of the two lines. 3. The coordinates of the point of intersection represent the solution to the pair of equations. 4. If the lines are parallel or coincident, it means there is no unique solution for the equations.
3. What is the substitution method to solve a pair of linear equations in two variables?
Ans. The substitution method is a technique used to solve a pair of linear equations in two variables. Follow these steps: 1. Solve one equation for one variable in terms of the other variable. 2. Substitute the value of the solved variable in the other equation. 3. Solve the resulting equation to find the value of the remaining variable. 4. Substitute the found value back into any one of the original equations to find the value of the other variable.
4. Is it possible for a pair of linear equations in two variables to have no solution?
Ans. Yes, it is possible for a pair of linear equations in two variables to have no solution. This occurs when the lines represented by the equations are parallel and never intersect. In such cases, the equations are said to be inconsistent, and there is no common solution for the variables.
5. Can a pair of linear equations in two variables have infinitely many solutions?
Ans. Yes, a pair of linear equations in two variables can have infinitely many solutions. This happens when the lines represented by the equations are coincident, meaning they are the same line. In such cases, every point on the line is a solution to the equations. The equations are called dependent, and the variables are not uniquely determined.
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