Claim: 7 > 3^{\sqrt 3}. Otherwise 7^\sqrt 3 \le 27 < 28 = 7*4 \\ 7^{\sqrt 3 - 1} < 4 \\ 48 < 7^2 < 4^{\sqrt 3 + 1} \text{(since }(7^{\sqrt 3 - 1})^{\sqrt 3 + 1} = 7^{(\sqrt 3 - 1)(\sqrt 3 + 1)} = 7^{(\sqrt 3)^2 - 1^2} = 7^2{)} \\ 3 < 4^{\sqrt 3 - 1} \: \text{(divide by 16)}\\ 3^{\sqrt 3 + 1} < 4^2 = 16 < 18 \\ 3^\sqrt 3 < 6 ...

13. This is one of those problems which admits a cute trick solution. (2 \pm \sqrt{3})^2 = 4 \pm 4 \sqrt{3} + 3 Adding the equations with + and -, (2+\sqrt{3})^2 + (2-\sqrt{3})^2 = 14 ...

\displaystyle={84}+{18}\sqrt{{3}} Explanation: Squaring a bracket means multiply it by itself. This is the square of a binomial because there are 2 terms in the brackets. The answer will be ...

Konstantinos Michailidis Mar 28, 2016 Assuming that \displaystyle{i} is the imaginary unit we have that \displaystyle{\left({2}+{i}\sqrt{{3}}\right)}\cdot{\left({2}+{i}\sqrt{{3}}\right)}={2}\cdot{2}+{2}{i}\sqrt{{3}}+{2}{i}\sqrt{{3}}+{\left({i}\sqrt{{3}}\right)}\cdot{\left({i}\sqrt{{3}}\right)}={4}+{4}{i}\sqrt{{3}}-{3}={1}+{4}{i}\sqrt{{3}} ...

The given equation always represents three lines. When we rotate the axes by an angle \alpha, in polar coordinates, r remains unchanged but \theta changes to \theta - \alpha. Thus the combined ...

Let a = 3 + \sqrt{10} and b = 3 - \sqrt{10}. Note that ab = 3^2 - 10 = -1. Now a^n + b^n is a positive integer, in fact c_n = a^n + b^n satisfies the recurrence c(n) = 6 c(n-1) + c(n-2) ...