Chapter 8.3, Problem 51E

(a)

To determine

The average weekly temperature at week $18$, where the average weekly temperature in Washington, D.C., $t$ weeks after the beginning of the year is $f\left(t\right)=54+23\sin \left[\frac{2\pi }{52}\left(t-12\right)\right]$ and the graph of this function is given as follows:

(b)

To determine

At week $20$, how fast is the temperature changing of the average weekly temperature in Washington, D.C., $t$ weeks after the beginning of the year whose function is, $f\left(t\right)=54+23\sin \left[\frac{2\pi }{52}\left(t-12\right)\right]$ and the graph of this function is given as follows:

(c)

To determine

The value of $t$ in weeks for average weekly temperature $39$ degrees, where the average weekly temperature in Washington, D.C., $t$ weeks after the beginning of the year is, $f\left(t\right)=54+23\sin \left[\frac{2\pi }{52}\left(t-12\right)\right]$ and the graph of this function is given as follows:

(d)

To determine

The value of $t$ in weeks for average weekly temperature falling at the rate of $1$ degrees per week, where the average weekly temperature in Washington, D.C., $t$ weeks after the beginning of the year is $f\left(t\right)=54+23\sin \left[\frac{2\pi }{52}\left(t-12\right)\right]$ and the graph of this function is given as follows:

(e)

To determine

The value of $t$ in weeks for average weekly temperature greatest and least, where the average weekly temperature in Washington, D.C., $t$ weeks after the beginning of the year is $f\left(t\right)=54+23\sin \left[\frac{2\pi }{52}\left(t-12\right)\right]$ and the graph of this function is given as follows:

(f)

To determine

The value of $t$ for the average weekly temperature increasing fastest and decreasing fastest, where the average weekly temperature in Washington, D.C., $t$ weeks after the beginning of the year is $f\left(t\right)=54+23\sin \left[\frac{2\pi }{52}\left(t-12\right)\right]$ and the graph of this function is given as follows: