Find the general solution to dwdθ=sin(θ)\frac{dw}{d\theta} = \sin(\theta)dθdw=sin(θ).
w=cos(θ)+Cw = \cos(\theta) + Cw=cos(θ)+C
w=−cos(θ)+Cw = -\cos(\theta) + Cw=−cos(θ)+C
w=sin(θ)+Cw = \sin(\theta) + Cw=sin(θ)+C
w=−sin(θ)+Cw = -\sin(\theta) + Cw=−sin(θ)+C