\begin{align} & \sqrt{3.5^2+x^2}-\sqrt{3.0^2+x^2}=.25 \\ & \sqrt{3.5^2+x^2}=.25+\sqrt{3.0^2+x^2} \\ \end{align} Next, square both sides. You get: \begin{align} & 3.5^2+x^2=(.25+\sqrt{3.0^2+x^2})^2 \\ ...

I will assume you've made no mistakes in your work. Since -1 hasn't a fourth root in \Bbb Z_{11}, then the only way to reduce x^4+1 over \Bbb Z_{11} is as a product if quadratics. We may as ...

\left(\frac{\sqrt{3}\pm i}{2}\right)^2 = \frac{3-1\pm 2\sqrt{3}i}{4} = \frac{1\pm\sqrt{3}i}{2} \implies \underbrace{\sqrt{\frac{1\pm \sqrt{3}i}{2}} = \frac{\sqrt{3}\pm i}{2}}_{\text{assume taking principal branch of } \sqrt{\;}} \\ {\Huge\Downarrow} \\ \left(x \pm \sqrt{\frac{1 + \sqrt{3}i}{2}}\right) \left(x \pm \sqrt{\frac{1 - \sqrt{3}i}{2}}\right)\\ \| \\ x^2 \pm \left(\frac{\sqrt{3} + i}{2} + \frac{\sqrt{3} - i}{2}\right) + \left(\frac{\sqrt{3} + i}{2}\right)\left(\frac{\sqrt{3} - i}{2}\right)\\ \| \\ x^2 \pm \sqrt{3}x + 1

There's a trick here, that is useful in other circumstances. I will do it over the real numbers x^{4} + 1 = x^{4} + 2 x^{2} + 1 - 2 x^{2} = (x^{2} + 1)^{2} - (\sqrt{2} x)^{2} = (x^{2} + 1 - \sqrt{2} x) (x^{2} + 1 + \sqrt{2} x). ...

For the first one: Write it as \frac{2}{2 + x^2 + \sqrt{4x^2 + x^4}} and notice that x^2 is decreasing in interval (-\infty,0]. Use facts about compositions and sums of decreasing/increasing ...

There is a general procedure to solve quartic equations. The first step is to depress the polynomial, i.e. translate the variable to cancel the cubic term. Your polynomial is already in depressed ...