Is \int u u_x dy = \frac{1}{2}\int \partial_x (u^2) dy = \frac{1}{2}\partial_x\int u^2 dy an identity? Yes, the order of differentiation in the x-direction and integration in the y-direction can ...

The function f(x)=\ln(a^2\sin^2x+b^2\cos^2x) is periodic of period \pi (we assume that a and b are such that a^2\sin^2x+b^2\cos^2x>0). Therefore, for t>0, \int_0^{t} f(x)dx=n\int_0^{\pi} f(x)dx+\int_0^{t-n\pi} f(x)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) ...

Letting t=x+y and s=x-y as in the standard treatment of the 1-D wave equation, the equation \alpha_{st}=\frac{m}{4} \alpha^2. If m>0, trying the trick of separation of variables does, ...

The standard method applies, as usual . To wit: Let u denote any bounded measurable function, then \mathrm E(u(Y))=\mathrm E(u(g(X)) hence \mathrm E(u(Y))=u(0)\mathrm P(X\leqslant0)+\int_0^1u(x^2)\frac14e^{-x}\mathrm dx+u(1)\mathrm P(X\geqslant1). ...

Cross section Shell method V = \int\limits_{r=1}^4 2 \pi r \sqrt{r} dr = \frac{124 \pi }{5} Washer method V = \int\limits_{z=0}^1 \pi (4^2 - 1^2)\ dz + \int\limits_{z=1}^2 \pi (4^2 - z^2)\ dz = \frac{124 \pi }{5}