Let’s see: 353736=44217x8=4913x9x8=289x17x9x8=17x17x17x9x8. Cube root of product is product of cube roots. We have 3 17s, so we take them out the cbrt as a single 17. The cbrt of 8 is 2. So our ...

You can show by a direct calculation that \mathbb{Q}(\sqrt{5}+\sqrt{6})=\mathbb{Q}(\sqrt{5},\sqrt{6}). The latter is the splitting field of (x^2-5)(x^2-6) over \mathbb{Q}, hence is a Galois ...

Most people can give the right answer, but I want to show you a simple way to solve all problems similar to this. Look at the expression, you suspect it can be reduced to something like a \pm \sqrt{b} ...

Here is an extremely easy way of showing that \sqrt{2} \in \Bbb{Q}(\sqrt{2} + \sqrt[3]{2}). Write \alpha = \sqrt{2} + \sqrt[3]{2}. Then (\alpha-\sqrt{2})^3 = 2, so that \alpha^3 - 3\alpha^2(\sqrt{2}) + 6\alpha -2\sqrt{2} = 2. ...

In the standard notation by law of sines we obtain: \frac{\sin\beta}{\sin3\beta}=\frac{\sqrt3-1}{2} or \frac{1}{3-4\sin^2\beta}=\frac{\sqrt3-1}{2} or 3-4\sin^2\beta=\sqrt3+1 or 8\sin^2\beta=(\sqrt3-1)^2 ...

The trick is to convert the expression inside the square root into a perfect square, so that the value can be calculated fast. Perfect squares are of the form (a+b)^2 = a^2+2ab+b^2 Taking a hint ...