Hint Take into account that 20 = 45 -25. Develop \displaystyle\cos(45^\circ-25^\circ) and remember that \displaystyle\cos(45^\circ)=\sin(45^\circ)=\frac{\sqrt 2}2 and see what happens. I am sure ...

We have used here two facts \sin { \left( \alpha \right) =\cos { \left( 90^{ \circ }-\alpha \right) } } \\ \cos { \left( 2\alpha \right) =\cos ^{ 2 }{ \alpha -\sin ^{ 2 }{ \alpha } } =\cos ^{ 2 }{ \alpha -\left( 1-\cos ^{ 2 }{ \alpha } \right) =2\cos ^{ 2 }{ \alpha -1 } } } ...

First, the way many scientific calculators work is to calculate more digits than they show, and then they round the value before displaying it. This happens even if you calculate something like 1/7 \times 7 ...

Even easier: start with \cos50^\circ=\sin40^\circ as suggested by Sabayasachi, then \tan20^\circ\cos50^\circ+\cos40^\circ=\frac{\sin20^\circ}{\cos20^\circ}2\sin20^\circ\cos20^\circ+1-2\sin^220^\circ ...

If \alpha is a root of the polynomial p(x)=x^3+15x^2-198x+1 then \alpha^{1/5} is a root of the polynomial p(x^5)=(1-3x+x^3)\cdot q(x). If we manage to prove that (1-3x+x^3) is the minimal ...

Consider 2\sin50^\circ\sin10^\circ=\cos(50^\circ-10^\circ)-\cos(50^\circ+10^\circ)