\displaystyle{9.536} Explanation: \displaystyle{3}\times\sqrt{{5}}+{2}\times\sqrt{{2}} \displaystyle{3}\sqrt{{5}}+{2}\sqrt{{2}} \displaystyle\sqrt{{5}}={2.236} \displaystyle\sqrt{{2}}={1.414} ...

\displaystyle{72}\sqrt{{{6}}} Explanation: \displaystyle{\left({2}\sqrt{{{\left({27}\right)}}}\right)}\times{\left({3}\sqrt{{{\left({32}\right)}}}\right)} \displaystyle{\left(\text{XXX}\right)}={2}\times{3}\times\sqrt{{{\left({3}^{{3}}\right)}}}\times\sqrt{{{\left({2}^{{5}}\right)}}} ...

\displaystyle{3}\times\sqrt{{8}}+\sqrt{{18}}={9}\sqrt{{2}} Explanation: \displaystyle{3}\times\sqrt{{8}}+\sqrt{{18}} Factor \displaystyle\sqrt{{8}} . \displaystyle\sqrt{{{2}\times{2}\times{2}}}= ...

You can't use energy conservation when mass is removed. This has required energy that you are not taking into account. But you can use conservation of momentum . And this is usual, when one speed is ...

Is this the correct approach to solving the problem? The result you give for v can't be correct since, within the parenthesis, you're subtracting a number from a speed squared. There's a much ...

Here's what you mean: You said: (a+b)^2=(2d)^2+c^2 \Leftrightarrow (XY+XZ)^2=(XH+XH)^2+(HY+HZ)^2 \Leftrightarrow XY^2+XZ^2+2XY.XZ=XH^2+XH^2+2XH^2+HY^2+HZ^2+2HY.HZ \Leftrightarrow XY^2+XZ^2+2XY.XZ=(XH^2+HY^2)+(XH^2+HZ^2)+2(XH^2+HY.HZ) ...