The exponential function that models cell duplication in a lab is f(t) = 2^ t+2 where f(t) is the number of cells after time t (in hours). After how many hours has the number of…

Question

asked Sep 5, 2019 231k views

2 Answers

← Prev Question Next Question →

Ask a Question

Blagoj Atanasovski · Answer 1 · 2019-09-09T20:24:32+0000

ANSWER

$11.29 \: hours$

EXPLANATION

The exponential function that models cell duplication in the lab is given as

$f(t) = {2}^(t + 2)$

We want to determine the time it will take for the cells to increase to

10,000.

In other words, we want to find the value of

when

This gives us the equation,

$10,000 = {2}^(t + 2)$

Recall that,

${a}^(m + n) = {a}^(m) * {a}^(n)$

We apply this property to the right hand side to obtain,

$10,000 = {2}^(t) * {2}^(2)$

This implies that,

$10,000 =4 * {2}^(t)$

We divide both sides by 4 to get,

$2500 = {2}^(t)$

We take the antilogarithm of both sides to base 10 to get,

t = log_(2)(2500)

This implies that,

$t = 11.29 \: hours$
to the nearest hundredth.

The exponential function that models cell duplication in a lab is f(t) = 2^ t+2 where f(t) is the number of cells after time t (in hours). After how many hours has the number of…

Please log in or register to add a comment.

Please log in or register to answer this question.

2 Answers

Please log in or register to add a comment.

Please log in or register to add a comment.

No related questions found

Categories

Other Questions