Hint: Partial Fractions: \frac{1}{(x+7)(x+3)}=\frac{A}{x+7}+\frac{B}{x+3} Now find A,B and use the linearity of the integral: \int \frac{1}{(x+7)(x+3)} dx=\int \frac{A}{x+7}dx+\int \frac{B}{x+3}dx ...

Because it is a definite integral. The indefinite integral is simply an antiderivative: \int f'(x)\,dx = f(x) + C For any C, f(x) + C is an antiderivative of f'(x). The definite integral ...

You can substitute x^2 as the variable, but you need to substitute it everywhere it appears. In the OP's example, you did not substitute it into the dx. \int x^2 d(x^2)=\int 2x^3dx=\frac{x^4}{2}+C

Define P(t):=\int_1^tp(x)dx=-\int_t^1p(x)dx Note that \dot P(t)=p(t) Then you can rewrite your problem as \min_{P(t)} \int_0^1 g(\dot P(t))f(t)dt-\int_0^1P(t)F(t)dt This is a standard ...

Let I(n) be given by the integral \begin{align} I(n)&=\int_0^1 \frac{1}{1+x^n}\,dx \tag 1\\\\ \end{align} Then, expanding the integrand of the integral on the right-hand side of (1) in the ...

Integration is a continuous version of the sum. So your sum is actually a discrete approximation of the integral. It will have the same leading term, but the next terms differ (the sum approximates a ...