Answer:
[tex]D = 45+19*sin(\frac{\pi}{12}*t)[/tex]
Step-by-step explanation:
The amplitude (A) and the mean (M) temperature are given by:
[tex]A=\frac{64-26}{2}\\ A= 19\\M=\frac{64+26}{2}\\ M= 45\\[/tex]
The mean temperature, 45 degrees. occurs at midnight (t=0) and the frequency is f=24h. Therefore, the temperature D, in degrees, as a function of t, in hours, is:
[tex]D = M+A*sin(\frac{2\pi}{24}*t)\\D = 45+19*sin(\frac{\pi}{12}*t)[/tex]
