To answer your first question. If f is nonnegative function, f and f^2 have the same local extrema because x\mapsto x^2 is strictly increasing on [0,+\infty). Now, |f(z)|^2 should ...

Make use of the formula z\bar{z}=|z|^2, then \left| \dfrac{z_1-2z_2}{2-z_1\bar{z_2}} \right|=1 just means that \dfrac{z_1-2z_2}{2-z_1\bar{z_2}}\dfrac{\bar{z_1}-2\bar{z_2}}{2-\bar{z_1}z_2}=1. ...

You have (x^2 +y^2 +x−2y+2)+(2x+y−2)i=0 so this complex number is identically zero, meaning that both real and imaginary parts must be zero. However, looking at the real part, you havex^2 +y^2 +x−2y+2=0 ...

I think you took a slightly inefficient way. H\in BC has to fulfill: H = (1-\lambda)(4,9)+\lambda (10,-3),\qquad AH\perp BC hence by imposing \langle A-H,B-C\rangle = 0 we get: -6(2+6\lambda)+12(6-12\lambda)=0 ...

I learned how to do this with a table, so let's see if I can format it all correctly here. (Sorry in advance, my LaTex friends) We know that rate (r) * time (t) = work , and that the work is the ...

For question 1, this is actually a slight reformulation of the definition of differentiability for a function of two variables (what it's saying is that u and v are approximated by linear maps). ...