\displaystyle{x}\in{\left(\infty,-{6}\right]}\cup{\left[{6},\infty\right)} Explanation: \displaystyle{x}^{{2}}\ge{36} Let us take the equation first . \displaystyle{x}^{{2}}={36} \displaystyle{x}=\pm{6} ...

There is a range of a that works. It's reasonably clear that if a works then b>a\implies b works as well. Thus we are searching for the least a that works. We note, for instance, that a=1.01 ...

If x^2\ge a then |x|\ge \sqrt{a}. Not x\ge \sqrt{a}. Similarly, if x^2=a, |x|=\sqrt{a}. Not x=\sqrt{a}.

Since p(x)=(x^2-x)^2+(x-1)^2+(a-2)x^2=(x-1)^2(x^2+1)+(a-2)x^2 where (x-1)^2(x^2+1)>0 for all real number x it follows that (a-2)x^2 must be greater or equal to 0 for all real number x, ...

Answer to the first question: you are kind of wrong. I understand your logic, but it is not needed in the authors argument. You are forgetting the fact that, in this case, (x+\epsilon)^2>x^2. So ...

Your method to get the minimum gets in the entire plane, but you want the minimum on the unit circle x^2+y^2=1. You can use Lagrange multipliers. You could also parameterize the unit circle on one ...