Note that p \equiv q \pmod{4}, so \frac{p-1}{2}\frac{q+1}{2} \equiv \frac{p-1}{2}\frac{p+1}{2} \equiv 0 \pmod{2}. \begin{align} ...

The columns of the matrix A are the components of the images of the basis vectors of E, i.e. A(u_i)= A\cdot u_i for some basis <u_1,...,u_n>=E. Now the null space \ker A=\{v\in E|\, A(v)=0\in F\} ...

p^3-q^5=(p+q)^2=p^2+2pq+q^2 So, p^3-q^5\ge 0, so p^3\ge q^5, so p>q. p^2(p-1)=p^3-p^2=q^5+2pq+q^2=q(q^4+2p+q) Hence, p^2 divides q^4+2p+q (as it can't divide q) and so q divides ...

The equation of the elliptic curve is y^2+a_1xy+a_3y=x^3+a_2x^2+a_4x+a_6.\tag{1} I'll first prove the result, under the additional hypothesis that Q=(0,0). For Q to lie on E, a_6=0. Then ...

Off the top of my head: H0 : all coins are fair H1 : at least one gives only heads I see it as a binomial where the experiment is "throwing a coin 3 times", with N=100, just like you suggested. Hence ...

Your condition is not sufficient. For example, let X=\mathbb R with the usual topology and x\sim y iff x-y\in\mathbb Z. Then X/{\sim} is a circle S^1. However, let A=[0,1). This satisfies ...