Show that `sqrt(2+sqrt(2+sqrt(2+2cos 8theta)))=2cos theta`

sqrt(2+sqrt(2+2cos4theta))= …………

Prove that sqrt ((1+cos theta )/( 1-cos theta ) ) = cosec theta +cot theta , 0le theta le 90 ^(@)

z=i+sqrt(3)=r(cos theta+sin theta)

Show that (cosec theta -cot theta )^(2) =(1-cos theta )/( 1+cos theta )

If costheta + sin theta = sqrt2 cos theta , prove that cos theta - sin theta = sqrt2 sin theta .

Prove that, (2costheta+1)(2costheta-1) (2cos2theta-1)(2cos4theta-1)=2cos8theta+1

Show that the lines (1-cos theta tan alpha) y^2 -(2cos theta+sin ^2 theta tan alpha )xy +cos theta (cos theta+tan alpha )x^2=0 include an angle alpha between them .

Show that the two straight lines x^2(tan^2theta+cos^2theta)-2xy tantheta+y^2sin^2theta=0 Move with the axis of x angles such that the difference of their tangents is 2 .

If tan theta = sqrt2-1 then tan (2theta)=1 .

If cos 2 theta =(sqrt(2)+1)( cos theta -(1)/(sqrt(2))) , then the value of theta is