The integral ∫0πsin(x)dx\int_0^{\pi} \sin(x) dx∫0πsin(x)dx represents:
The area under sin(x)\sin(x)sin(x) from 000 to π\piπ
The net signed area of sin(x)\sin(x)sin(x) from 000 to π\piπ
The volume of a solid of revolution
The average value of sin(x)\sin(x)sin(x)