Let f:[0,1]\to\mathbb R be the map x\mapsto mx+b and \mathcal P_n = \bigcup_{i=0}^n \left\{\frac in\right\}, n\in\mathbb N be a sequence of partitions of [0,1]. Assume without loss of ...

We equip the space of Riemann square integrable functions on [0,1] with the usual scalar product. Now we have \int_0^1(1-2x)f(x)dx=1-\frac{1}{3}=\frac{2}{3} Hence \frac{2}{3}=\int_0^{1/2}(1-2x)f(x)dx+\underbrace{\int_{1/2}^1(1-2x)f(x)dx}_{\leq 0} ...

Let \displaystyle\mathscr{P} = \left\{ 0,\frac{1}{n},\frac{2}{n},\cdots,\frac{n}{n}\right\} be a partiton of [0,1]. M(f;I_{k})= \sup \left\{\: f(x) \ : \ x \in I_{k}\ \right\} |I_{k}| =\text{Length of the interval ...

Your argument is wrong. You get nothing by differentiating the equation \int f^{2}=1 because there are no functions in this equation. Here is a correc t argument: \int_0^{1} xf(x)f'(x)\, dx=\frac 1 2 x(f(x)^{2}|_0^{1} -\frac 1 2\int_0 ^{1} f(x)^{2}\, dx=-\frac 1 2 ...

Since f(x) = x^2+1, then f''(x) = 2. Also a=0, b=1, then |\delta| \leq \frac{\max|f''(x)|(b-a)^3}{12n^2} = \frac{2}{12n^2} = \frac{1}{6n^2}. With an error less than 0.01 we have \frac{1}{6n^2} \leq 0.01 ...

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})) ...