Let present age of Aftab be x years and present age of his daughter be y years.

Case I. Seven years ago,

Age of Aftab = (x - 7) years

Age of his daughter = (y - 7) years

According to question :

(x - 7) = 7 (y - 7)

⇒ x - 7 = 7y - 49

⇒ x - 7y = -42

Case II.

Three years later,

Age of Aftab = (x + 3) years

Age of his daughter = (y + 3) years

Accoring to questions,

x + 3 = 3 (y + 3)

⇒ x + 3 = 3y + 9

⇒ x — 3y = 6

So, algebraic expression be

x - 7y = -42    ...(i)

x - 3y = 6    ...(ii)

Graphical representation

For eq. (i), we have

x - 7y = -42

⇒    x — 7y — 42

Thus, we have following table :

From eqn. (ii), we have

x -3y = 6

⇒    x = 3y + 6

Thus, we have following table

When we plot the graph of equations. We find that both the lines intersect at the point (42, 12). Therefore, x = 42, y = 12 is the solution of the given system of equations.

Fig. 3.1.

Let the cost of 1 bat be Rs. x and cost of I ball be Rs.y

Case I. Cost of 3 bats = 3x

Cost of 6 balls = 6y

According to question,

3x + 6y = 3900

Case II. Cost of I bat = x

Cost of 3 more balls = 3y

According to question,

x + 3y = 1300

So, algebraically representation be

3x + 6y = 3900

x + 3y = 1300

Graphical representation :

We have,    3x + 6y = 3900

⇒    3(x + 2y) = 3900

⇒    x + 2y = 1300

⇒    a = 1300 - 2y

Thus, we have following table :

We have,    x + 3y = 1300

⇒    x = 1300 - 3y

Thus, we have following table :

When we plot the graph of equations, we find that both the lines intersect at the point (1300. 0). Therefore, a = 1300, y = 0 is the solution of the given system of equations.

Let the cost of 1 kg of apples be Rs. x and of 1 kg of grapes be Rs. y. So, algebraic representation

4x + 2y = 300

⇒ 2x + y = 150

Graphical representation, we have

2x + y = 160

⇒    y = 160 - 2x

We have,

2x + y = 150

⇒    y = 150 - 2x

When we plot the graph of the equation we find that two lines do not intersect i.e. they are parallel.

Fig. 3.3.

(i) Let the number of boys be x and number of girls be y.

Case I.    x + y = 10    ...(i)

Case II.    y = x + 4

⇒    x - y = -4    ...(ii)

We have, x + y = 10

⇒    x = 10 - y

Thus, we have following table :

Fig. 3.4.

We have, x - y = -4

⇒    x = y - 4

Thus we have following table :

When we plot the graph of the given equation, we find that both the lines intersect at me point (3, 7). So.r = 3,y = 7 is the required solution of the pair of linear equation.

Hence, the number of boys be 3 and the number of girls be 7, who took part in quiz.