Suppose that a certain population has a growth rate that varies with time and that this population satisfies the differential equation dy (0.5+sin(t))y Suppose that the term sin(t) in the differential equation is replaced by sin(2nt); that is, the variation in the growth rate has a substantially higher frequency. What effect does this have on the doubling time 7?

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Suppose that a certain population has a growth rate that varies with time and that this population satisfies the differential equation dy dt (0.5+sin(t))y 5 Suppose that the term sin(t) in the differential equation is replaced by sin(2nt); that is, the variation in the growth rate has a substantially higher frequency. What effect does this have on the doubling time T? O The doubling time gets smaller. Since the growth rate has a higher frequency, the population would get faster to double the original size. O The doubling time changes and gets almost three times as the original one. Since the growth rate changes so fast, the population changes from growth to decay too fast to have a significant growth. O The doubling time changes and get bigger. Since the frequency is bigger, the equation becomes non-linear, which makes the solution to grow slower than the original. O The doubling time is almost three times smaller. Since the frequency is higher, the growth would be faster and the doubling time would be smaller. O The doubling time remains almost the same. Since the average growth is the same, the doubling time would remain almost the same. O The doubling time remains the same. A higher frequency in the rate of growth does not affect the doubling time since the function is periodic.