Convert each radical into decimal form. Explanation: \displaystyle-\sqrt{{\frac{{5}}{{6}}}}\approx-{0.913} \displaystyle-\sqrt{{\frac{{19}}{{7}}}}\approx-{1.648} \displaystyle-\sqrt{{\frac{{11}}{{4}}}}\approx-{1.658} ...

Calculation shows that\frac{-3+\sqrt{1+8m}}{2}=\phi(rad(m))for odd m= 4533219265101159492811716841910146257168839018970561These numbers have the form \frac{3^n(3^n+1)}{2}for ...

If you multiply the expression by 1/\sqrt{2} and push it inside each successive radical, you get the second radical. So you have x = \sqrt{1+x/\sqrt{2}}. When you solve for x, you get x=\sqrt{2}.

Hint: \dfrac{\sqrt{2-\sqrt3}}2=\dfrac{\sqrt3-1}{2\sqrt2}=\cos(45^\circ+30^\circ)=\cos75^\circ Similarly, \dfrac{\sqrt{2+\sqrt3}}2=\sin75^\circ Now for 0<A<90^\circ,(\cos A)^x,(\sin A)^x is ...

As per the request of the OP I am posting my comment as an answer. If you square the expression \sqrt{2+\sqrt{3}} + \sqrt{2-\sqrt{3}} you will find that this is \sqrt{6}. This method works for ...

Note that \sqrt{ab} = \sqrt{a}\sqrt{b} is true only for a \geq 0 or b \geq 0. On the other hand, if a,b < 0, then \sqrt{ab} = \sqrt{(-a)(-b)} = \sqrt{-a}\sqrt{-b} \sqrt{a}\sqrt{b} = i\sqrt{-a}\ \cdot i\sqrt{-b} = -\sqrt{-a}\sqrt{-b} ...