Your transformation matrix: I will ignore the "t" coordinate \begin{align*} &\text{The position vector for a sphere is: } \\ &\vec{R_s}= \begin{bmatrix} x \\ y \\ z \\ ...

\begin{align} \sqrt{((a-1) - (a+1))^2 + ((2a-1) - (2a+3))^2} &= \sqrt{(a-1-a-1)^2 + (2a-1-2a-3)^2}\\[0.3cm] &= \sqrt{(-2)^2 + (-4)^2}\\[0.3cm] &= \sqrt{4 + 16}\\[0.3cm] &= ...

\left|-26-18i\right|=10\sqrt{10}=10^{3/2} and \text{Arg}\left(-26-18i\right)=\arctan\left(18/26\right)-\pi so that \begin{align*} z^{3} & =10^{3/2}e^{\left[\arctan\left(18/26\right)-\pi+2\pi ...

Plug x=1 , y=\pm i amd w=0 into the equation, to get: (1-0)^2+(\pm i-0)^2 = 0, which is obviously always true.

\begin{align}(x + y)^2 &= (x + y)(x+y) \\ &= x(x +y) + y(x +y) \\ &= (x^2 + xy) + (xy + y^2) \\ &= x^2 + 2xy + y^2\end{align} Now in your case x = -\sqrt{7 - 2b} and y = -2, so \begin{align}(-\sqrt{7 - 2b} + -2)^2 &= (-\sqrt{7 - 2b})^2 + 2(-\sqrt{7 - 2b})(-2) + (-2)^2\\&=(7 - 2b) + 4\sqrt{7 - 2b} + 4\\&=11 - 2b + 4\sqrt{7 - 2b} \end{align} ...

Hint: Use x^2+x<2 \iff (x+1/2)^2 < 9/4 \iff |x+1/2|<3/2 to prove that \sup (A) = 1 .