I'd like to simplify this equation: $ABC' + BC'D' + BC + C'D$ prove it to $B + C'D$
My attempt is : $$\begin{align} &= ABC' + BC'D'(A+A') + BC + C'D\\ &= ABC' + ABC'D' + A'BC'D' + BC + C'D\\ &= ABC'(1 + D') + A'BC'D' + BC + C'D\\ &= ABC' + A'BC'D' + BC + C'D\end{align}$$
and then i'm running out of idea.. can anyone help me what i suppose to do next step? Thank you