(a+b)3+(a-b)3 Final result : 2a • (a2 + 3b2) Step by step solution : Step  1  : 1.1    Evaluate :  (a+b)3   =  a3+3a2b+3ab2+b3   1.2    Evaluate :  (a-b)3   =  a3-3a2b+3ab2-b3  Step  2  :Pulling out ...

-n2-4n-9=-4 Two solutions were found :  n =(4-√-4)/-2=2+i= -2.0000-1.0000i  n =(4+√-4)/-2=2-i= -2.0000+1.0000i Rearrange: Rearrange the equation by subtracting what is to the right of the equal ...

Given the current formulation we proceed as follows: Because x\ge 5 we know that a\ge 2 so that (a+1)^2-a^2 = 2a+1\ge 5, which gives us (a+1)^2>9 Then we can let y=(a+1)^2-x>0 by assumption. ...

As mentioned, use Vieta's root jumping technique. We know that (1, r) is a solution to the problem with ratio \frac {1^2 + r^2 - 1}{1 \times r} = r, but has the issue that a = 1 violates the ...

I think your method does work, although as you noticed, the derivation is quite complicated when trying to compute it directly. This result is due to Euler, in § 25–26 of this paper . Euler proves it ...

You can exclude the case where n has an odd divisor in the same way as you did for n odd: if d is an odd divisor, let P=p^{n/d},Q=q^{n/d}, write (2^{n/d})^d=P^d-Q^d and factor P^d-Q^d to ...