Chapter 1 - Functions and Limits - 1.3 New Functions from Old Functions - 1.3 Exercises - Page 43: 25

$L(t)=12+2 sin[\frac{2\pi}{365}(t−80)]$

We can see that the average number of hours is 12 hours and the amplitude of the graph is 2 hours. We can write a function for the number of hours of sunlight: L(t)=12+2 sin[2π365(t−80)] We can check the model using March 31st, which is day 90 of the year: $L(t)=12+2 sin[\frac{2\pi}{365}(t−80)]$ $L=12+2 sin[\frac{2\pi}{365}(t−80)]$ $L=12.34 $ hours The data shows that the amount of sunlight on this day is 6:18 pm−5:51 am which is 12 h 27 min. Note that this is 12.45 hours