What you did is correct, and is what a student is expected to do with this problem. There is another way, but it requires certain familiarity with complex polynomials. We see two parts in u, one ...

Wataru Oct 26, 2014 Since the second term has the highest power \displaystyle{1}+{5}={6} , the degree is 6. I hope that this was helpful.

See a solution process below: Explanation: First, remove all of the terms from parenthesis. Be careful to handle the signs of each individual term correctly: \displaystyle{3}{x}^{{2}}{y}^{{3}}+{x}^{{2}}-{4}{x}^{{3}}{y}^{{2}}-{2}{x}^{{3}}{y}^{{2}}+{7}{y}^{{3}}-{5}{x}^{{2}} ...

I would go this way \eqalign{ & x^{\,n} - y^{\,n} = x^{\,n} \left( {1 - \left( {y/x} \right)^{\,n} } \right) = x^{\,n} \left( {1 - z^{\,n} } \right) = x^{\,n} \left( {1 - z} \right)\left( {{{1 - z^{\,n} } \over {1 - z}}} \right) = \cr & = x^{\,n} \left( {1 - z} \right)\left( {1 + z + \cdots z^{\,n - 1} } \right) = x\left( {1 - z} \right)x^{\,n - 1} \left( {1 + z + \cdots + z^{\,n - 1} } \right) = \cr & = \left( {x - y} \right)\left( {x^{\,n - 1} + x^{\,n - 2} y + \cdots + y^{\,n - 1} } \right) \cr}

This can be proved via a stars and bars argument. Say we have k stars and we want to put them in n bins, with some bins possibly empty. Theorem 2 in the article proves that the number of such ...

First, note that x^3 + y^3 = (x + y)^3 \iff 0 = xy(x + y). So, you need to choose x and y such that both x and y are nonzero, and x + y\neq 0. Can you show that you can always choose ...