Evaluate ∫x2sin(x)dx\int x^2 \sin(x) dx∫x2sin(x)dx using integration by parts.
−x2cos(x)+2xsin(x)+2cos(x)+C-x^2 \cos(x) + 2x \sin(x) + 2 \cos(x) + C−x2cos(x)+2xsin(x)+2cos(x)+C
x2cos(x)−2xsin(x)+2cos(x)+Cx^2 \cos(x) - 2x \sin(x) + 2 \cos(x) + Cx2cos(x)−2xsin(x)+2cos(x)+C
−x2sin(x)+2xcos(x)+2sin(x)+C-x^2 \sin(x) + 2x \cos(x) + 2 \sin(x) + C−x2sin(x)+2xcos(x)+2sin(x)+C
−x2cos(x)−2xsin(x)+2cos(x)+C-x^2 \cos(x) - 2x \sin(x) + 2 \cos(x) + C−x2cos(x)−2xsin(x)+2cos(x)+C