First, let me start by saying that you should always use i=1 as your first index under the sum, not i=0. \displaystyle \lim_{n\to \infty}\sum_{i=1}^n{125i^2 - 10n^2\over n^3}\\ =\lim_{n\to \infty} \sum_{i=1}^n\bigg(\frac{125i^2}{n^3}-\frac{10n^2}{n^3}\bigg) \\ =\lim_{n\to \infty} \sum_{i=1}^n\frac{125i^2}{n^3}-\sum_{i=1}^n\frac{10}{n} \\ =\lim_{n\to \infty} \frac{125}{n^3}\sum_{i=1}^ni^2-\frac{10}{n}*n \\ =\lim_{n\to \infty} \frac{125}{n^3}\bigg(\frac{n(n+1)(2n+1)}{6}\bigg) -10\\ =\frac{250}{6}-10\\ =\frac{190}{6}\\ =\frac{95}{3} ...

\displaystyle{x}^{{3}}-{x}-{6} Explanation: Your antiderivative is going to be \displaystyle{t}^{{3}}-{t} Evaluate that at t = 2: \displaystyle{2}^{{3}}-{2}={6} Evaluate at t = x: \displaystyle{x}^{{3}}-{x} ...

\displaystyle{\int_{{\frac{{1}}{{2}}}}^{{1}}}{4}^{{x}}{\left.{d}{x}\right.}=\frac{{2}}{{\ln{{\left({4}\right)}}}} Explanation: The trick part about this integral is that we don't know the ...

Looking at your previous question it seems that you only need a result for a restricted class of functions. If f is piecewise continuous, then F has left and right derivatives at points where f ...

{d\over dt}\int_1^2 t^2\,dt={d\over dt}\left[{t^3\over 3}\right]\Bigg|_{t=1}^{t=2}={d\over dt}\left[{2^3\over 3}-{1^3\over 3}\right]={d\over dt}\left[{7\over 3}\right]=0. This should not be ...

Let's check with the simplest possible case: suppose that f(n) = 1, and take x = 10. Then the LHS is \sum_{n = 2}^{10} 1 = 9. The RHS is 1 - \sum_{n = 3}^9 1 + (20 - 1)\cdot 1 - 1\cdot(10 - 10) = 1 - 7 + 19 - 0 = 13. ...