The answer is \displaystyle=\frac{{422}}{{5}} Explanation: To evaluate this integral, we use \displaystyle\int{x}^{{n}}{\left.{d}{x}\right.}=\frac{{x}^{{{n}+{1}}}}{{{n}+{1}}}+{C} \displaystyle{x}\sqrt{{x}}={x}\cdot{x}^{{\frac{{1}}{{2}}}}={x}^{{\frac{{3}}{{2}}}} ...

\int{\sqrt{dx}} is an ambiguous symbolism, as already pointed out by several posters. The tone of the question draw me to think that you are looking for something like "fractionnal calculus", i.e. ...

Alan P. May 6, 2015 To approximate \displaystyle{\int_{{1}}^{{3}}}\sqrt{{{x}+{1}}}{\left.{d}{x}\right.} by a series of 4 trapezoids we need to evaluate \displaystyle\sqrt{{{x}+{1}}} ...

Hint . If what you mean is evaluating \int (1-x)\sqrt{x}\:dx then I suggest to rewrite it as \int (\sqrt{x}-x\sqrt{x})\:dx=\int x^{1/2}\:dx-\int x^{3/2}\:\:dx and make use of \int x^n\:dx=\frac1{n+1}x^{n+1},\quad n \neq-1. ...

\frac{x}{\sqrt{x}} = \frac{\sqrt{x}\sqrt{x}}{\sqrt{x}} = \sqrt{x} \int \sqrt{x}\ dx = \frac{2}{3}x^{3/2} + c Note that \sqrt{x} = x^{1/2} hence when you integrate it, just apply the ...

In your penultimate step, \frac 23.\frac 93 =\frac {18}{9} =2, not 6.