It’s just not true that for real a and b, \sqrt{ab}=\sqrt{a}\sqrt{b}. The radical or square-root sign \sqrt{\ \ } refers to the principal square root. This means the positive square ...

\displaystyle\sqrt{{{2}{a}^{{2}}{b}}}\times\sqrt{{{4}{a}^{{2}}}}={2}{a}^{{2}}\sqrt{{{2}{b}}} Explanation: Square Roots distribute across multiplication, that is to say: \displaystyle\sqrt{{{a}{b}}}=\sqrt{{{a}}}\times\sqrt{{{b}}} ...

Between your third and fourth lines, you use \frac{\sqrt{a}}{\sqrt{b}}=\sqrt{\frac{a}{b}}. This is only (guaranteed to be) true when a\ge 0 and b>0. edit : As pointed out in the comments, what ...

If you want a number to be a perfect square, all its prime factors must be raise to an even power i.e. b^{2n}. So p = 2*3*5 because 480p=2^6*3^2*5^2 => \sqrt{480p}=\sqrt{2^6*3^2*5^2}=2^3*3*5 ...

There is some positive value m such that y=mx is tangent to y=-(x^2-3x+2). This value must make 0 the discriminant of the equation x^2-3x+2=-mx That is, m^2-6m+1=0 The least root of ...

\begin{align} \\ & \sqrt{10^2-(6.9\times 10^{-2})^2} \\ & = \sqrt{10^2\left[1 -\frac{1}{10^{2}}\left\{(6.9)^2\times 10^{-4}\right\}\right]} \\ & = \left[10^2\{1 -(6.9)^2\times 10^{-6}\}\right]^{\frac{1}{2}} \\ & \approx 10\left[1-\frac 1 2(6.9)^2\times10^{-6}\right] \,\,\,\,\,\,\,\,\,\,\,\,\, \text{using binomial approximation} \end{align} ...