All avatar noted; is completely the formal way for solving the problem. I wanted to show you another parallel approach. we know that \tan^{-1}(x)+\tan^{-1}(y)=\tan^{-1}\left(\frac{x+y}{1-xy}\right) ...

The coordinates of the midpoint of \displaystyle{Q}{R} is \displaystyle={\left(\frac{{17}}{{2}},\frac{{17}}{{4}}\right)} . The equation of the curve is \displaystyle{y}=-{4}{\left({6}-{2}{x}\right)}{)}^{{\frac{{1}}{{2}}}}+{16} ...

\sqrt{25-x^2} is an even function. So \boxed{\int_{-5}^5 \sqrt{25-x^2} dx=2\cdot \int_{0}^5 \sqrt{25-x^2} dx} Now proceed the way you have, by substitution with y and so on. You will get the ...

The Null Factor Law does not apply here. The law only applies to products, which, in the case of one multiplicand being 0, the whole expression is 0. This is not the case with addition; the law ...

Just as Hurkyl answered, start with (x-a)(x-b)=x^2 - (a+b)x + ab=\left( x-\frac{a+b}2\right)^2-\left(\frac{a-b}2 \right)^2 Now define x-\frac{a+b}2=\frac{a-b}2 t\implies x=\frac{a+b}2+\frac{a-b}2 t\implies dx=\frac{a-b}2 dt ...

Let u=-\sqrt{1-xy} , Then y=\dfrac{1-u^2}{x} \dfrac{dy}{dx}=\dfrac{u^2-1}{x^2}-\dfrac{2u}{x}\dfrac{du}{dx} \therefore\dfrac{u^2-1}{x^2}-\dfrac{2u}{x}\dfrac{du}{dx}=1-u \dfrac{2u}{x}\dfrac{du}{dx}=u-1+\dfrac{u^2-1}{x^2} ...