Are these for fun or are you getting answerers to do your homework for you?

Equation of L is y = (2/3)x + 3 if my memory is as good as I hope.
That's s starter for you/ him

Line L crosses the x-axis at (6,0), call this point D, and the y-axis at (0,9), point B. If the origin (0,0) is point O then for right-angled triangle DBO, OD is of length 6 and OB is of length 9. Its area is therefore (6 x 9)/2 = 27 and the length of BD (its hypotenuse) = √(6² + 9²) = √(36 + 81) = √117 = 3 x √13

Triangle ABC is similar to triangle DBO because they are both right-angled and have angle ABC in common. ABC's hypotenuse (AB) is of length 6 (difference in y-coordinates of B and A), so the dimensions of triangle ABC are 6/(3 x √13) = 2/√13 times the dimensions of triangle DBO. The area of triangle ABC is therefore (2/√13)² times the area of triangle DBO. So

Area of triangle ABC = (2/√13)² x 27 = (4/13) x 27 = 108/13 ≈ 8.3

Here's a diagram in case you're struggling to visualise the situation: https://ibb.co/cFzqzX9

Amazing how useful 'similar triangles' can be, isn't it? Saves having to formulate the equation of line M and solve for the coordinates of point C.

Well I got 108/13 without any pythagoras or similar triangles.
Just found where the lines crossed at (36/13,63/13) and then did area of triangle formula (6 x36/13)/2...

I wandered whether all this stuff would come in useful someday

or you could argue he's had a whole year more of schooling than his peer?

It's always been that way, my birthday is 1st August and my friend's is the 29th making us among the youngest in our year. The thing is that you all get the same amount of tuition

'His 'brain development' is playing catch up with some of the other pupils!!'

Assuming ever single teenager develops at the same rate.