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And I am going to pass it and get an A grade. And in two years’ time I am going to take A-level physics and get an A grade.
And then, when I’ve done that, I am going to go to university in another town. And it doesn’t have to be in London because I don’t like London and there are universities in lots of places and not all of them are in big cities. And I can live in a flat with a garden and a proper toilet. And I can take Sandy and my books and my computer.
And then I will get a First Class Honors degree and I will become a scientist.
And I know I can do this because I went to London on my own, and because I solved the mystery of Who Killed Wellington? and I found my mother and I was brave and I wrote a book and that means I can do anything.
Appendix
Question
Prove the following result:
A triangle with sides that can be written in the form n^2 + 1, n^2 – 1 and 2n (where n > 1) is right-angled.
Show, by means of a counterexample, that the converse is false.
Answer
First we must determine which is the longest side of a triangle with sides that can be written in the form n^2 + 1, n^2 – 1 and 2n (where n > 1)
n^2 + 1 – 2n = (n – 1)^2
and if n > 1 then (n – 1)^2 > 0
therefore n^2 + 1 – 2n > 0
therefore n^2 + 1 > 2n
Similarly (n^2 + 1) – (n^2 – 1) = 2
therefore n^2 + 1 > n^2 – 1
This means that n^2 + 1 is the longest side of a triangle with sides that can be written in the form n^2 + 1, n^2 – 1 and 2n (where n > 1).
This can also be shown by means of the following graph (but this doesn’t prove anything):
According to Pythagoras’s theorem, if the sum of the squares of the two shorter sides equals the square of the hypotenuse, then the triangle is right-angled. Therefore to prove that the triangle is right-angled we need to show that this is the case.
The sum of the squares of the shorter two sides is (n^2 – 1)^2 + (2n)^2
(n^2 – 1)^2 + (2n)^2 = n^4 – 2n^2 + 1 + 4n^2 = n^4 + 2n^2 + 1
The square of the hypotenuse is (n^2 + 1)^2
(n^2 + 1)^2 = n^4 + 2n^2 + 1
Therefore the sum of the squares of the shorter two sides is equal to the square of the hypotenuse and the triangle is right-angled.
And the converse of “A triangle with sides that can be written in the form n^2 + 1, n^2 – 1 and 2n (where n > 1) is right-angled” is “A triangle that is right-angled has sides whose lengths can be written in the form n^2 + 1, n^2 – 1 and 2n (where n > 1).”
And a counterexample means finding a triangle which is right-angled but whose sides ca
So let the hypotenuse of the right-angled triangle ABC be AB.
and let AB = 65
and let BC = 60
Then CA = v (AB2 – BC2) = v (652 – 602) = v (4225 – 3600) = v 625 = 25
Let AB = n^2 + 1 = 65
then n = v (65 – 1) = v 64 = 8
therefore (n^2 – 1) = 64 – 1 = 63 ? BC = 60 ? CA = 25
and 2n = 16 ? BC = 60 ? CA = 25
Therefore the triangle ABC is right-angled but it does not have sides which can be written in the form n^2 + 1, n^2 – 1 and 2n (where n > 1).