Note that p^2-q^2=(p-q)(p+q) From the definition of prime numbers, it follows that p-q=1. If p-q \neq 1, then p-q is a number that divides p^2-q^2 that is not 1 or p^2-q^2.

q2-64 Final result : (q + 8) • (q - 8) Step by step solution : Step  1  :Trying to factor as a Difference of Squares :  1.1      Factoring:  q2-64  Theory : A difference of two perfect squares, ...

q2=2q Two solutions were found :  q = 2  q = 0 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

Well the Periodic Table tells us that for polonium, \displaystyle{Z}={84} ..of course you don't have to remember this...you are expected to be able to look it up... Explanation: And when we write ...

Note that \sqrt{g(t)} is defined where g(t)\ge 0. In particular, note that 25-t^2\ge0\\5^2-t^2\ge0\\(5+t)(5-t)\ge0. The product of two real numbers a and b is nonnegative exactly when one ...

If you are only supposed to find one prime for each. The main idea seems to be that (a^k - 1)|(a^{km} -1) (as (a^k-1)(a^{(m-1)k} + ..... + 1) = (a^{km} - 1) . However if m is odd you can ...