[tex]1-\cos^4\left(θ\right)=(1-\cos^2\left(θ\right))(1+\cos^2\left(θ\right))[/tex]
Given that: sin^2 θ = 1 - cos^2 θ, then
[tex]1-\cos^4\left(θ\right)=(1+\cos^2\left(θ\right))\sin^2\left(θ\right)=\sin^2\left(θ\right)+\sin^2\left(θ\right)\cos^2\left(θ\right)[/tex][tex]1-\cos^4\left(θ\right)=(1+\cos^2\left(θ\right))\sin^2\left(θ\right)=\sin^2\left(θ\right)+\sin^2\lparenθ)(1-\sin^2\lparenθ))[/tex][tex]1-\cos^4\left(θ\right)=\sin^2\left(θ\right)+\sin^2\lparenθ)(1-\sin^2\lparenθ))=\sin^2\left(θ\right)+\sin^2\lparenθ)-\sin^4\lparenθ)=2\sin^2-\sin^4\lparenθ)[/tex][tex]1-\cos^4\left(θ\right)=2\sin^2-\sin^4\lparenθ)[/tex]
So the answer is the first option.
