Prove the following identities, where the angles involved are acute angles for which the expressions are defined. : `(sintheta-2sin^3theta)/(2cos^3theta-costheta) =tantheta` .

Prove that the following identities, where the angles involved are acute angles for which the expressions are defined : (sin theta - 2 sin^(3) theta)/(2 cos^(3) theta - cos theta) = tan theta

Prove the following identities, where the angles involved are acute angles for which the expressions are defined. : (cosectheta-cottheta)^2=(1-costheta)/(1+costheta) .

Prove that (sintheta-2sin^3theta)/(2cos^3theta-costheta)=tantheta .

Prove the following identities, where the angles involved are acute angles for which the expressions are defined. : (tantheta)/(1-cottheta)+(cottheta)/(1-tantheta)=1+secthetacosectheta .

Prove the following identities, where the angles involved are acute angles for which the expressions are defined. : (1+secA)/(secA)=(sin^2A)/(1-cosA) .

Prove the following identities, where the angles involved are acute angles for which the expressions are defined. : (cosA)/(1+sinA)+(1+sinA)/(cosA)=2secA .

Prove the following identities, where the angles involved are acute angles for which the expressions are defined. : sqrt((1+sinA)/(1-sinA))=secA+tanA .