\int_{0}^{2} (1-x)^2 dx = F(x) |_{0}^{2} while we should have \frac{\partial{F(x)}}{\partial x} = (1-x)^2. It is easy to show that (especially if you set u=x-1 and then using chain rule): F(x) = - \frac{1}{3} (1-x)^3 \Rightarrow \frac{\partial{F(x)}}{\partial x} = (1-x)^2 ...

The textbook says that \int\limits_0^2(x-x^3)dx does not represent the area under the curve y=x-x^3 because at x=1 the curve crosses the x-axis and becomes negative. Therefore, the area ...

In the expression, A=\oint_C (x\,dy-y\,dx) C represents a closed curve, oriented counter-clockwise, that bounds the region over which the area is calculated. In the problem of interest, we have ...

Such function does not exist. Use Wirtinger's inequality \pi^2\int_0^a|f(x)|^2dx\leq a^2\int_0^a |f'(x)|^2 dx to see this.

Here is a visualization I had previously made for myself when I was trying to get a "geometric intuition" for these integrals. I think it's useful to consider the one of the sums in the limit, \sum_{i} f(x_i) \Delta g(x_i) = \sum_{i} f(x_i) (g(x_{i+1}) - g(x_{i})) ...

Try a u substitution. Specifically, if we let u = x^2 , then du = 2xdx . Also, as x ranges between 0 and 6 in the second integral, u will range from 0 to 36 since u = x^2 ...