Hint Consider the bottom empty cone with so-far unknown height h' and radius r'. We know that is has half the volume of the whole cone, i.e. \frac{21 \pi}{2}= \frac{\pi (r')^2 h'}{3}. Also, ...

We know from the isoperimetric inequality that locally the surface must be a sphere (where we can include the plane as the limiting case of a sphere with infinite radius). Also, the surface must be ...

Hint Forget about h= \cdots from A. You have A= 2\pi rh + \pi r^2 which you want to minimize. But you also have V=\pi r^2h\implies h=\frac{V}{\pi r^2}\implies A=2 \frac V r+\pi r^2 ...

The voltage between a and b isIR=πr^2α/4. this is trivial it is a quarter of the Voltage. The Electric field is not generated from the -∇V but from -dA/dt

As the comments point out, the question doesn't make much sense as written. If the book means "circumference", then you're right, just compare the areas of the two circles. Note that your expression ...

You can compute the volume of a sphere using the area of a circle, but you need a different trick. Take a sphere of radius r with centre the origin, and slice it into circles along a diameter. Well, ...