\displaystyle\sqrt{{\frac{{44}}{{9}}}}\cdot\sqrt{{\frac{{18}}{{7}}}}\cdot\sqrt{{\frac{{35}}{{72}}}}=\frac{{1}}{{3}}\sqrt{{55}} Explanation: \displaystyle\sqrt{{\frac{{44}}{{9}}}}\cdot\sqrt{{\frac{{18}}{{7}}}}\cdot\sqrt{{\frac{{35}}{{72}}}} ...

\frac{1}{2}<\frac{2}{3}, \frac{3}{4}<\frac{4}{5}, ......................... \frac{2n-1}{2n}<\frac{2n}{2n+1}, \frac{1}{2}\cdot\frac{3}{4}\cdots\frac{2n-1}{2n}<\frac{2}{3}\cdot\frac{4}{5}\cdots\frac{2n}{2n+1}/\cdot \left(\frac{1}{2}\cdot\frac{3}{4}\cdots\frac{2n-1}{2n}\right) ...

See a solution process below: Explanation: First, in order to add the fractions, we need to put the fractions over a common denominator by multiplying the fraction on the right by the appropriate ...

First, see that we have \int_0^n \sqrt{x} \;dx = \frac{4n}{6}\sqrt{n} which gives us a "part" of the demanded result. Moreover, it suggests that we should try to prove the following: \sum_{k=1}^n \int_0^1 \frac{t}{2\sqrt{t+k-1}} \;dt < \frac{3}{6}\sqrt{n} = \frac{1}{2}\sqrt{n} ...

Hint. Note that the double integral over that triangle can be written as iterated integrals in two ways. \begin{align*} \int_{x=0}^{\sqrt{\frac{\pi}{2}}}\left(\int_{y=x}^{\sqrt{\frac{\pi}{2}}} ...

You've got the right idea, but there are two places you erred: \int \frac{\frac{1}{2}\cdot4x-1+1}{\sqrt {4x-1}}\, \mathrm{d}x = \int \frac {2x - 1 + 1}{\sqrt{4x - 1}}\,dx \neq \frac{1}{2}\int \frac{4x-1+1}{\sqrt {4x-1}}\, \mathrm{d}x ...