Consider the sequence s_n = 2^{n^2} and observe that \begin{align} s_ns_m = 2^{n^2+m^2} \leq 2^{(m+n)^2}= s_{n+m} \end{align} but we see that \begin{align} \sqrt[n]{s_n} = 2^n\rightarrow \infty. ...

You didn't specify that the pyramid base must be on the equator of the sphere so you cannot use 2R=a\sqrt{2}. The image in general looks like this (the notation is different): Source: ...

But A\equiv J, which says that AJ=0. Indeed, AH\perp BC, AC\perp BH and AB\perp CH, which says that A is an ortocenter of \Delta BHC, which unique for all triangle.

The normal at p is \nabla f=(a\cos(ax+y^2),\cos(ax+y^2)2y,-1) at p. Plug in p=(0,\sqrt{\pi},0),we get normal n=(-a,-2\sqrt{\pi},-1). set the tangent plane as ax+2\sqrt{\pi}y+z=d, since p ...

We have a population mean of \mu=75 and variance of \sigma^2=25. So the distribution of the sample average form a sample of size n also has mean 75 and has a variance of \frac{25}{n}. So if ...

Yes. From the equations and the drawing given, it is evident that the circles have diameters 3 and 4, so their circumferences are 3\pi and 4\pi, respectively, adding up to 7\pi. To this ...