Here is an attempt to find a differential equation whose solutions are precisely the lines at distance p from the origin. We follow the question as far as y'=-\cot A and then we try to ...

A hint for i): By contradiction. Assume they are not pairwise disjoint. Then \exists q_1 , q_2 \in Q such that x \in (q_1 + C) \cap (q_2 + C). Then q_1 + c = x = q_2 + c^\prime. So q_1 - q_2 = c^\prime - c ...

You don't need a production scheme for all pythagorean triples to solves this problem. From a^2=c^2-b^2=(c+b)(c-b) it follows that any prime factor of c+b>1 must occur in a.

X,Y are independent of each other, so e^{tX} and e^{tY} are independent of each other. This gives M(t) = E[e^{tX}] = E[e^{tY}] Moreover, M(t) = E[e^{tX}] and M(-t) = E[e^{-tY}] are ...

This is easy. Denote by \operatorname{diag}(x) the diagonal matrix whose diagonal is the vector x. Assuming that A is diagonal, every valid triple (A,B,C) can be expressed as follows: ...

m is the (velocity independent) mass of the system. You would most likely call it rest mass (but there is no need to call it that way, as there is no other mass - just call it mass). So the kinetic ...