The set C^1[-1,1] is that set of all real-valued functions whose domain is the interval [-1,1] and that are everywhere differentiable and whose derivatives are everywhere continuous. Such ...

Differentiating E(t)=\int_0^1 (u_t^2+u_x^2)\, dx with respect to t yields E'(t)=2\int_0^1 ( u_t u_{tt}+ u_x u_{xt})\, dx Your formula is missing 2 and has u_{xx} there. After ...

I've solved the two integral by two distinct methods, \int_{C_1}=\int_{0}^2(9x)dx+\int_0^2x^2d(9x)=\int_0^29x+x^2\cdot9dx=42. \int_{C_2}=\int_{2}^5(-x^2+8x+6)dx+\int_2^5x^2(-2x+8)dx =\int_2^{5}7x^2+8x+6-2x^3dx=383-\frac{625}{2}. ...

You approach gets off track when you factor \frac{i}{n} outside the sum: this is not possible, as the index i is "bound" to the sum and is not defined outside. This is clear at the very end, when ...

We have, for all a\in \mathbb{R} (for you a=10) \int_{-a}^a f(x) \text{d} x = \int_0^a f(x) \text{d} x + \int_{-a}^0 f(x) \text{d} x . But thanks to a change of variable u =-x \int_{-a}^0 f(x) \text{d} x = \int_a^0 -f(-u)\text{d} u = \int_0^a f(-u) \text{d} u. ...

Actually, by the definition of probability density function, p(x) only needs to be piecewise continuous because what we really care is its integral, so it is not a problem that p(x) is ...