Time left 0:30:29The population y(t) of a certain microorganism grows continuously and follows an exponential behaviour over time. Itsquadrupling time is found to be 4.8 hours. What differential equation would you use to describe its growth?O a. y'(t) = 4.8yO b. y(t) = Ce^(4.8t)O c. y(t) = Ce^(-(log(4)/4.8)t)O d. y'(t) = (log(4)/4.8)yO e. y'(t) = -(log(2)/4.8)yO f. y(t) = Ce^((log(2)/4.8)tFirNext pageus pageworku.ca/eclass/mod/quiz/attempt.php?attempt=2789067&cmid=1250975&page=2223DIIF980F7FBF6F5F4F2F3

In this question, the concept of the derivative is applied. Derivative We can use a derivative to…

Answered: The population y(t) of a certain…

The population y(t) of a certain microorganism grows continuously and quadrupling time is found to be 4.8 hours. What differential equation w O a. y'(t) = 4.8y %3D

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

Time left 0:30:29
The population y(t) of a certain microorganism grows continuously and follows an exponential behaviour over time. Its
quadrupling time is found to be 4.8 hours. What differential equation would you use to describe its growth?
O a. y'(t) = 4.8y
O b. y(t) = Ce^(4.8t)
O c. y(t) = Ce^(-(log(4)/4.8)t)
O d. y'(t) = (log(4)/4.8)y
O e. y'(t) = -(log(2)/4.8)y
O f. y(t) = Ce^((log(2)/4.8)t
Fir
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