If we abbreviate w=\sqrt[3]2, the left hand side is L=\frac1{\sqrt[3]9}(1-w+w^2). From (1+w)(1-w+w^2)=1+w^3=3 we see that L=\frac3{\sqrt[3]9(1+\sqrt[3]2)}, hence L^3=\frac{27}{9(1+w)^3}=\frac3{1+3w+3w^2+w^3}=\frac1{1+w+w^2} ...

First, note that if we have a single solution (a,b,c), then we can get another solution by multiplying all three coordinates by any constant. So, we can simplify the problem by taking c to be ...

Hint: \sqrt{10}+\sqrt{14}+\sqrt{15}+\sqrt{21} =\sqrt{2}(\sqrt{5}+\sqrt{7})+\sqrt{3}(\sqrt{5}+\sqrt{7}) =(\sqrt{5}+\sqrt{7})(\sqrt{2}+\sqrt{3}) Can you take it from here?

To complement the other answer: Hint: \frac12(\sqrt{n+4} - \sqrt{n+2}) + \frac12(\sqrt{n+2} - \sqrt{n}) = \frac12(\sqrt{n+4} - \sqrt{n}) + \frac12(\sqrt{n+2} - \sqrt{n+2}) = \frac12(\sqrt{n+4} - \sqrt{n}) ...

This should be doable fairly easily by hand, and you'll learn much more that way. I recommend doing the problem first for the real cubic field {\mathbb Q}(2^{1/3}), where you'll find that an ...

The familiar "exponent rules" http://mathworld.wolfram.com/ExponentLaws.html , are only valid if all quantities involved are real numbers. This subtlety is not taught when the rules are first ...