We have received two good solutions to this problem.

Biren from The Heathland School approached it like this:

The question asks you to prove that a+b=c.

You already know that the two lines are parallel.This tells us that they have the same gradient.

To work out the gradients we should try to imagine we draw a right angled triangle under both lines.

We then divide the change in the y-axis by the change in the x-axis.

The change in the x-axis of the line AB is equal to b-a (small letters refer to the co-ordinates).

The change in the y-axis is equal to

b^{2} - a^{2}

(these letters also refer to the co-ordinates).

Thus the gradient of line AB is equal to:

$\frac{b^{2} - a^{2}}{b - a} = \frac{(b - a) (b + a)}{b - a} = b + a$

The change in the y-axis of the line OC is $c^{2} .$ The change in the x-axis is equal to c. Thus the gradient of the line OC is

$\frac{c^{2}}{c} = c$

We know that both lines, AB and OC are parallel, and so they must have the same gradient.

So b+a = c

Andrei from School No. 205 in Bucharest (Romania), approached it in a slightly different way:

Let y = mx + n be the equation of the line going through the points A(a, a ² ) and B(b, b ² ).

At A,

$a^{2} = ma + n$

At B,

$b^{2} = mb + n$

From this:

$a^{2} - b^{2} = ma - mb = m (a - b)$

Dividing by (a-b):

$m = \frac{a^{2} - b^{2}}{a - b} = \frac{(a + b) (a - b)}{a + b} = a - b$

The line OC passes through the origin and the point C(c, c ² ).

Because it passes through the origin, its equation is of the form:

$y = ux$

Because it is parallel to the line passing through A and B, u = m, so its equation is:

$y = (a + b) x$

Since it passes through C:

$c^{2} = (a + b) c$

or:

$c = a + b$

Well done to you both.