\displaystyle{a}=\pm{11} Explanation: \displaystyle{a}=\sqrt{{{2}{a}^{{2}}-{121}}} Square both sides \displaystyle{a}^{{2}}={2}{a}^{{2}}-{121} Minus \displaystyle{a}^{{2}} and ...

With suggestions of @barak manos and @ Alqatrkapa I Noted that I can improve my post. Notice that 2+2\sqrt{28n^2+1} is an even integer. Also, 28n^2+1 is a perfect square of an odd integer say m ...

\displaystyle{\left({2}\sqrt{{2}}-\sqrt{{7}}\right)}^{{2}} simplifies to \displaystyle-{4}\sqrt{{{14}}}+{15} . Explanation: For the square of any binomial, it follows this general rule: \displaystyle{\left({x}-{y}\right)}^{{2}}={x}^{{2}}-{2}{x}{y}+{y}^{{2}} ...

This is because 6^2\cdot 162=54^2\cdot 2. (Your 5 should be 6.)

Here is a strategy - suppose the square roots are initially of a,b,c,d First take all the terms involving \sqrt a to one side, and everything else to the other, and square the resulting equation. ...

You have x^2 + (mx+c)^2 = a^2 \iff x^2 + m^2x^2 + 2mxc + c^2 = a^2 which simplifies to (1+m^2)x^2 + 2mcx + (c^2-a^2) = 0 But as y must be tangent, there must be a single solution to the above ...