See a solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left(-\frac{{8}}{{21}}\times-\frac{{7}}{{16}}\right)}{\left({x}^{{2}}\times{x}\right)}{\left({y}^{{3}}\times{y}^{{2}}\right)}\Rightarrow ...

\displaystyle{32}{x}^{{-{{1}}}}{y} Explanation: Given, \displaystyle{\left[\frac{{{2}{x}^{{2}}{y}}}{{x}^{{3}}}\right]}^{{3}}.{\left[\frac{{y}^{{1}}}{{{2}{x}}}\right]}^{{-{{2}}}} \displaystyle\Rightarrow{\left[\frac{{{2}{y}}}{{x}}\right]}^{{3}}.{\left[\frac{{{2}{x}}}{{y}}\right]}^{{2}} ...

\displaystyle\frac{{{6}{x}}}{{{45}{y}^{{5}}}} Every step shown to aid understanding. As you become practised you will be able to skip steps. Explanation: Splitting the given expression down into ...

Try writing your last equation like this: 1=3(x+y\cdot7^{\frac{1}{3}}+z\cdot7^{\frac{2}{3}})+(5\cdot 7^{\frac{1}{3}})(x+y\cdot7^{\frac{1}{3}}+z\cdot7^{\frac{2}{3}})+(4\cdot 7^{\frac{2}{3}})(x+y\cdot7^{\frac{1}{3}}+z\cdot7^{\frac{2}{3}}) ...

Step 1: integrate wrt y. I=\int_1^2\int_1^2\frac{x}{x^2+y^2}\,dy\,dx=\int_1^2\left[\arctan\left(\frac yx\right)\right]_1^2\,dx=\int_1^2\arctan\left(\frac2x\right)-\arctan\left(\frac1x \right)\,dx ...

Using the same approach as izoec, we can arrive to\frac{n (n (p+q) \log (n p+q y)-q y)}{q^2}= \int e^{-b(x)} \, \mathrm{d} x = \xi (x) and the solution of y is y=- \frac {n} {q} \left(p+(p+q) W\left(-\frac{\left(e^{\frac{\xi(x) q^2}{n^2 p}-1}\right)^{\frac{p}{p+q}}}{n (p+q)}\right)\right) ...