We know that the successive zeros of the cosine and sine functions alternate, i.e., they interlace...

We know that the sum of two concave functions is concave. Can you produce a univariate...

We know that the sum of two concave functions is concave. Can you produce a univariate example to show that the sum of two quasi-concave functions is no necessarily quasi-concave?

One way in which computers can compute the values of functions like the sine, cosine, logarithm...

One way in which computers can compute the values of functions like the sine, cosine, logarithm and so on is to use a power series expansion. This is an infinite series from which the first few terms are calculated and used to find an approximate value for the function. The series expansion for the exponential function is : ex = exp(x) = 1 + x + x2 /2! + x3/3! + x4 /4/! + … + xn /n! + …...

We know that Bohr model (i.e., the “old” quantum mechanics) for the hydrogen atom is a...

We know that Bohr model (i.e., the “old” quantum mechanics) for the hydrogen atom is a semiclassical model and is not (always) consistent with quantum mechanics. Specifically, it is not (always) consistent with the uncertainty principle. Show why.

In cases where we do not know the sample distribution and we have sufficiently large n,...

In cases where we do not know the sample distribution and we have sufficiently large n, then we can apply the Central Limit Theorem. That is to say, according to the CLT, x can have any distribution whatsoever, but as the sample size increases, the distribution of   will approach a normal distribution. The CLT formula is Where n is the sample size (n ≥ 30), μ is the mean of the x distribution, and σ is the standard deviation of...