When Evaluating the below definite integral $\int_{0}^{\pi}(2\sin\theta + \cos3\theta)\,d\theta$
I get this.$\left [-2\cos\theta + \frac{\sin3\theta}{3} \right ]_{0}^{\pi} $
In the above expression i see that $-2$ is a constant which was taken outside the integral sign while performing integration. Now the question is should $-2$ be distributed throughout or does it only apply to $\cos\theta$? This is what i mean. Is it $-2\left[\cos(\pi) + \frac{\sin3(\pi)}{3} - \left ( \cos(0) + \frac{\sin3(0)}{3} \right ) \right]?$ Or the $-2$ stays only with $\cos\theta$?