Equating the coefficients of z^2, 4+pq+4=4\iff pq=-4 Equating the coefficients of z^3, -2=p+q So, p,q are the roots of t^2+2t-4=0

\displaystyle{2}{a}^{{2}}-{32}={2}{\left({a}-{4}\right)}{\left({a}+{4}\right)} Explanation: \displaystyle{2}{a}^{{2}}-{32}={2}{\left({a}^{{2}}-{16}\right)} (factoring out 2) \displaystyle={2}{\left({a}-{4}\right)}{\left({a}+{4}\right)} ...

2a4-32 Final result : 2 • (a2 + 4) • (a + 2) • (a - 2) Step by step solution : Step  1  :Equation at the end of step  1  : 2a4 - 32 Step  2  : Step  3  :Pulling out like terms :  3.1     Pull out ...

Alan P. Jun 18, 2018 \displaystyle{35}{a}{b}^{{4}}={\left({5}\times{7}\times{a}\times{b}\times{b}\times{b}\times{b}\right)}

You need divisibility by 2,3,5. a and a^3-1 are of different parity, so one of them is odd, one is even. Thie product is of course even. a^3\equiv a\pmod{3}, so one of numbers a^3-1, a, a^3+1 ...

If H is a normal subgroup of G = \operatorname{Gal}(L/\mathbb{Q}), then since |N| is prime, H \cap N = N or H \cap N = \{e\}. If H \cap N = \{e\}, let g = \sigma^m \tau^n be an arbitrary ...