Tiger was unable to solve based on your input  10(sqrt(7/64))  Your input is presently not supported by the Square Root Simplifier Primarily, a sqrt simplification drill must begin with  "sqrt" ...

The number \sqrt{1-x}-\sqrt{x} can be negative and, in this case, the inequality doesn't hold. Squaring both sides can be done only if both sides are nonnegative. Thus your inequality becomes \begin{cases} 0\le x\le 1 \\[8px] \sqrt{1-x}-\sqrt{x}\ge0 \\[4px] 1-x-2\sqrt{x(1-x)}+x>\dfrac{1}{3} \end{cases} ...

Parametrize the curve C by \gamma : [0,2] \rightarrow \mathbb{R}^2 with \gamma(t) = \left( t, \frac{t^2}{2} \right). Then, \int_{\gamma} f(x,y) \mathrm{ds} = \int_0^2 f(\gamma(t)) ||\dot{\gamma}(t)|| dt = \int_0^2 \frac{t^3}{\frac{t^2}{2}} ||(1, t)|| dt = \int_0^2 2t \sqrt{1 + t^2} dt. ...

From the ratio test, the radius of convergence is |x| < \big[\lim_{n \rightarrow \infty} \frac{a_{n+1}}{a_n}\big]^{-1} =L^{-1} If the limit exists, then from the recursion L - 1= \lim\frac{a_{n+1}}{a_n}-1=\lim\frac{a_{n-1}}{a_n}= L^{-1} ...

Let AD and BD meet at G = gravity center. Remember that AG:GD =2:1 so AG=10. Area of the triangle ABD which is half of the area of whole triangle ABC is {EB \cdot AG \over 2} = {20 \cdot 10\over 2} =100 ...

Nothing. :) 10 \sqrt{\frac{2}{13}} = 10 \sqrt{\frac{4}{26}} = 10 \cdot \frac{2}{\sqrt{26}} = \frac{20}{\sqrt{26}}.