The integral is \displaystyle{y}=-\frac{{1}}{{10}}{\left({t}-{1}\right)}^{{10}}+{C} . Explanation: Let \displaystyle{u}={1}-{t} . Then \displaystyle{d}{u}=-{1}{\left({\left.{d}{t}\right.}\right)}\to{\left.{d}{t}\right.}=\frac{{{d}{u}}}{{-{{1}}}}=-{\left({d}{u}\right)} ...

Note that differentiating either result gives you the original function. What this tells you is that the two functions differ by a constant. That "difference by a constant" is something we normally ...

With Weierstrass substitutions: \begin{cases} \tan\cfrac x2=u\\{}\\ \sin x=\cfrac{2u}{1+u^2}\\{}\\ dx=\cfrac{2\,du}{1+u^2}\end{cases}\;\;\implies \int\frac{\sin x}{1+\sin x}=\int\frac{\frac{2u}{1+u^2}}{1+\frac{2u}{1+u^2}}\cdot\frac{2\,du}{1+u^2}=\int\frac{4u}{(1+u)^2(1+u^2)}du= ...

The latter is not really an abuse of notation but the former is. Here is why. Suppose you want to compute the Lebesgue-Stieltjes integral \int H_s d[X,Y]_s for some process H. Now by that ...

We have \begin{align} \int(1-v^2)^ndv&=\int\sum_{k=0}^n\binom{n}{k}(-v^2)^{k}1^{n-k}dv\\ &=\sum_{k=0}^n\binom{n}{k}(-1)^k\int v^{2k}dv\\ &=\sum_{k=0}^n\binom{n}{k}\frac{(-1)^k}{2k+1}v^{2k+1} ...

You determined du=3\,dx, but substituted dx = 3\,du. So your answer is off by a factor of nine. \int \sin^3(3x) \cos(3x)\,dx = \int \sin^3(u) \cos(u)\cdot \frac{1}{3}\,du = \frac{1}{3}\int \sin^3(u) \cos(u)\,du ...