There are two same solutions \displaystyle{p}={1} Explanation: \displaystyle{p}=\sqrt{{{2}{p}-{1}}} or \displaystyle{p}^{{2}}={2}{p}-{1} or \displaystyle{p}^{{2}}-{2}{p}+{1}={0} ...

Let C,D be the point on x-axis such that AC\perp CP,BD\perp PD respectively. Then, \triangle{PAC},\triangle{PBD} are triangles with 30^\circ,60^\circ,90^\circ from which we have PA=\frac{2}{\sqrt 3}AC=\frac{2}{\sqrt{3}}|A_y|,\qquad PB=\frac{2}{\sqrt 3}|B_y| ...

p=sqrt(4p+8) One solution was found :                        p =  5.4641 Radical Equation entered :      p = √4p+8 Step by step solution : Step  1  :Isolate the square root on the left hand side ...

Take y=\left(\frac{x}{a}\right)^{3} , then I=\frac{a}{3}\int_{0}^{1}\sqrt{1+ya^{3}}y^{-\frac{2}{3}}dy and now we can recognize the integral representation of the Hypergeometric function I=a\,_{2}F_{1}\left(-\frac{1}{2},\frac{1}{3};\frac{4}{3};-a^{3}\right) ...

An idea: if you already have the lengths of \,\underline{u}:=\overrightarrow{AB}=(4,8,0)\,\,,\,\,\underline{v}:=\overrightarrow{AC}=(10,6,0) , why don't you use the trigonometric formula for a ...

If the side length of CB is x , then in \triangle ABC , we have length of AB =\sqrt {3}x . Now in \triangle ABD , we have BD =\sqrt {3}x \cot 30 =3x . Thus CD=2x . If the ...