I assume you are working in a commutative ring with identity. The problem is to show that if two elements of a ring divide each other, then they are associates, i.e. the same up to a unit multiple. ...

You can write the derivative as 2(x-1)(2-x)^2-2(x-1)^2(2-x)=2(x-1)(2-x)((x-1)-(2-x))=2(x-1)(2-x)(2x-3) which makes it easy to see where the derivative is zero. As the function is very large when ...

There is an amazing trick called the Chinese Remainder Theorem. It lets you rewrite \mathbb{Z}_{mn} as \mathbb{Z}_m \times \mathbb{Z}_n as long as m, n are coprime. If m, n are coprime, you ...

Just factorise all the bases of powers in your expression as a product of primes and then collect the powers of the same prime together. So for your example: 25^2 * 10^{1/2} = (5^2)^2 * (2*5)^{1/2} = 5^4*2^{1/2}*5^{1/2} = 5^{9/2}*2^{1/2} ...

Your reasoning is correct. One suggestion for the notation, though: You should write (f\times g)^{-1}(\pi_1^{-1}(U)) instead of \color{red}{(f\times g)^{-1}\circ \pi_1^{-1}(U)} since you ...

Is this the correct procedure? Do I not need to recalculate the centre-of-mass position/velocity after each time step? I've made a big mistake somewhere; the planets are very unstable and either move ...