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9. The growth of mold in Specimen A can be modeled by A(t) = The growth
of mold in Specimen B can be modeled by B(t)

a. Find (A - B)(t).
b. Explain what the function (A - B)(t) represents

9 The Growth Of Mold In Specimen A Can Be Modeled By At The Growth Of Mold In Specimen B Can Be Modeled By Bt A Find A Bt B Explain What The Function A Bt Repre class=

Sagot :

Abidemiokinidn

The value of the difference of the functions is 3t^2/3

The difference in the growth of the specimen is 3t^2/3

Exponential functions

Expoenential functions are written in the form y= ab^x

Given the following expoenential functions

A(t) = 5/6t^2/3

B(t) = 1/3t^2/3

a) Determine the function (A-B(t)

(A-B)(t) = A(t) - B(t)

Substitute

(A-B)(t) = 5/6t^2/3 - 1/3t^2/3
(A-B)(t) = (5/6-1/3)t^2/3
(A-B)(t) = 9/3t^2/3
(A-B)(t) = = 3t^2/3

b) This means that the difference in the growth of the specimen is 3t^2/3

Learn more on exponential function here: https://brainly.com/question/12940982

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