Answer:
a) The rate of change brightness after 't' years
[tex]\frac{dB}{dt} = 5.0+0.55cos( \frac{2\pi(t) }{4.7})(\frac{2\pi }{4.7})[/tex]
b) The rate of increase after five years
[tex](\frac{dB}{dt})_{t=5} = 0.67688[/tex]
Step-by-step explanation:
a) Given B(t) = 5.0+0.55sin([tex]\frac{2\pi(t) }{4.7}[/tex] .....(1)
The rate of change of the brightness after 't' days that is
[tex]\frac{dB}{dt}[/tex]
now differentiating equation (1) with respective to 't'
[tex]\frac{dB}{dt} = 5.0+0.55cos( \frac{2\pi(t) }{4.7})\frac{d}{dt} (\frac{2\pi(t) }{4.7})[/tex] { using d/dx(sin x) =cos x}
[tex]\frac{dB}{dt} = 5.0+0.55cos( \frac{2\pi(t) }{4.7})(\frac{2\pi }{4.7})[/tex]
b) The rate of increase after five days
substitute t = 5 in equation dB/d t
[tex]\frac{dB}{dt} = 5.0+0.55cos( \frac{2\pi(5) }{4.7})(\frac{2\pi }{4.7})[/tex]
after calculation [tex](\frac{dB}{dt})_{t=5} = 0.67688[/tex]
