The population of lemmings L(t) at the top of a cliff is increasing with the given formula. However, lemmings leap off the cliff at a rate equal to 0.1 L and pile up at the bottom.
a. Write a pure-time differential equation for the number of lemmings B(t) piled up at the bottom of the cliff.
b. Solve using the initial condition B(0) = 0.
c. Graph the number of lemmings at the top and the number at the bottom of the cliff.
d. Find the limit of the ratio B(t)/L(t) = at t approaches infinity.
L(t) = l000e0.05t.
DATE
Question answered on Jul 22, 2018
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Solution~000590249.zip (18.37 KB)
