sq.root of root 3 + root 2.

\displaystyle\sqrt{{{3}}} Explanation: \displaystyle\sqrt{{{12}}}-\sqrt{{{3}}} \displaystyle\sqrt{{{4}}}\cdot\sqrt{{{3}}}-\sqrt{{{3}}} \displaystyle{2}\cdot\sqrt{{{3}}}-{1}\cdot\sqrt{{{3}}} ...

\displaystyle{5}\sqrt{{3}} Explanation: \displaystyle\sqrt{{12}}=\sqrt{{4}}\times\sqrt{{3}} = \displaystyle{2}\sqrt{{3}} So \displaystyle\sqrt{{12}}+{3}\sqrt{{3}}={2}\sqrt{{3}}+{3}\sqrt{{3}}={5}\sqrt{{3}}

Suppose a solution exists. Then \sqrt a = c-\sqrt b a = c^2 + b -2\sqrt{b} \sqrt b = \frac{c^2+b-a}2 b=\left(\frac{c^2+b-a}2\right)^2 Which shows that either b is the square of some ...

Using the Euclidean algorithm we can show that \left(2x^2+3\right)\left(-\frac{6}{59}x^2+\frac{8}{59}x+\frac{9}{59}\right)-\left(x^3-2\right)\left(-\frac{12}{59}x+\frac{16}{59}\right)=1 now ...

(a+b)^2=18 (a-b)^2=14 Expanding these equations and subtracting one from the other we find 4ab=4. And therefore ab=1 and then log_b both sides. log_b(ab)=log_b(1) log_b(ab)=0 log_b(a)+log_b(b)=0 ...