Conveniently, your integration limits are (0,4) so the inside absolute value can be ignored. You are left with the following: \int_0^4 |x^2 - 2x| \ dx = \int_0^4x\cdot|x-2|\ dx = \int_0^2 x\cdot(2-x)\ dx + \int_2^4x\cdot(x-2) \ dx ...

The surface associated to your triangle is defined by: \lambda_1\in[0,1],\ \lambda_2\in[0,1] such that \lambda_1+\lambda_2\le 1 t(\lambda_1,\lambda_2)=\lambda_1(v_2-v_1)+\lambda_2(v_3-v_1)+v1=(4\lambda_2,4\lambda_1,1) ...

In this case the first part is 2c (area of the rectangle). Then calculate the integral of 2 e^{-4x} from c to infinity. That part will be in closed form {2\over{4}} -0. So calculate c as 2c+{1\over{2}} = 1 ...

Note that on the interval [0, 1], -3x^2 > (x^2 - 4x). So the "upper curve" we are interested in is -3x^2 and the lower curve (x^2 - 4x). Always subtract the curve that is UNDER, from the ...

These rules might come in handy: \int_{a}^{b} f(x)+g(x) dx=\int_{a}^{b} f(x)dx+\int_{a}^{b} g(x) dx c*\int_{a}^{b} f(x) dx=\int_{a}^{b} c*f(x) dx \int_{a}^{c} f(x) dx=\int_{a}^{b}f(x) dx+\int_{b}^{c}f(x) dx ...

Because the solid is rotated about a horizontal line, we note that to find the volume we can sum up a bunch of circles all passing through an axis parallel to the x-axis. The radius of any one of ...