See a solution process below: Explanation: First, solve for \displaystyle{w} \displaystyle\sqrt{{{u}}}+\sqrt{{{v}}}-\sqrt{{{w}}}={0} \displaystyle\sqrt{{{u}}}+\sqrt{{{v}}}-\sqrt{{{w}}}+\sqrt{{{w}}}={0}+\sqrt{{{w}}} ...

P dilip_k Dec 10, 2016 \displaystyle{z}={\left({2}{\left[{\cos{{\left({5}\frac{\pi}{{4}}\right)}}}+{i}{\sin{{\left({5}\frac{\pi}{{4}}\right)}}}\right]}\right)}^{{5}} \displaystyle\Rightarrow{z}={2}^{{5}}{\left[{\cos{{\left(\frac{{{5}\times{5}\pi}}{{4}}\right)}}}+{i}{\sin{{\left(\frac{{{5}\times{5}\pi}}{{4}}\right)}}}\right]} ...

Yes, it satisfies Pythagoras equation: \displaystyle{\left(\sqrt{{{12}}}\right)}^{{2}}={\left(\sqrt{{{5}}}\right)}^{{2}}+{\left(\sqrt{{{7}}}\right)}^{{2}} So this is a right angled triangle with ...

sqrt(2t-2)+sqrt(t)=7 One solution was found :                        t = 9 Radical Equation entered :      √2t-2+√t = 7 Step by step solution : Step  1  :Isolate a square root on the left hand ...

Nghi N. May 12, 2015 Reminder: i^2 = -1. = (9 - 2i^2) = (9 + 2) = 11

Let \alpha=\sqrt[3] {2} and suppose a+b\alpha+c\alpha^2=0 with a,b,c\in \mathbb Z, which we may assume coprime. Then a\alpha+b\alpha^2+2c=0 and a\alpha^2+2b+2c\alpha=0. This means that the ...