Asked by Gio
The number of Sasquatch living t years after 2016 is given by the formula s(t)=(51t+84)/(3t+28).
-What value does the Sasquatch population approach in the long run? When will the population (rounded to the nearest Sasquatch) reach this value?
(This vale would never be an output value of s(t), but the outputs would be rounded to the nearest whole number. For example, if the limiting value were 53, you would determine when the function's output would first reach at least 52.5).
-What value does the Sasquatch population approach in the long run? When will the population (rounded to the nearest Sasquatch) reach this value?
(This vale would never be an output value of s(t), but the outputs would be rounded to the nearest whole number. For example, if the limiting value were 53, you would determine when the function's output would first reach at least 52.5).
Answers
Answered by
Damon
as t gets huge the 84 and the 28 are small potatoes
s ---> 51/3 = 17
16.5 = (51 t + 84)/(3t+28)
solve for t
s ---> 51/3 = 17
16.5 = (51 t + 84)/(3t+28)
solve for t
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