Exponential Model Word Problems Practice: Practice Problems | Saylor Academy

Practice Problems

Exponential and logarithmic equations are often used in the sciences. Let's practice solving a few problems. There are hints and videos if you need help.

Noah borrows $\$2000$ from his father and agrees to repay the loan and any interest determined by his father as soon as he has the money.

The relationship between the amount of money, $A$ , in dollars that Noah owes his father (including interest), and the elapsed time, $t$ , in years, is modeled by the following equation.

$A=2000e^{0.1t}$

How long did it take Noah to pay off his loan if the amount he paid to his father was equal to $\$2450$ ?

Give an exact answer expressed as a natural logarithm.
Katya is a ranger at a nature reserve in Siberia, Russia, where she studies the changes in the reserve's bear population over time.

The relationship between the elapsed time $t$ , in years, since the beginning of the study and the bear population $B(t)$ , on the reserve is modeled by the following function.

$B(t)=5000 \cdot 2^{-0.05t}$

In how many years will the reserve's bear population be $2000$ ?

Round your answer, if necessary, to the nearest hundredth.
Harper uploaded a funny video of her dog onto a website.

The relationship between the elapsed time, $d$ , in days, since the video was first uploaded, and the total number of views, $V(d)$ , that the video received is modeled by the following function.

$V(d)=4^{{1.25d}}$

How many views will the video receive after $6$ days?

Round your answer, if necessary, to the nearest hundredth.
A huge ice glacier in the Himalayas initially covered an area of $45$ square kilometers. Because of changing weather patterns, this glacier begins to melt, and the area it covers begins to decrease exponentially.

The relationship between $A$ , the area of the glacier in square kilometers, and $t$ , the number of years the glacier has been melting, is modeled by the following equation.

$A=45e^{-0.05t}$

How many years will it take for the area of the glacier to decrease to $15$ square kilometers?

Give an exact answer expressed as a natural logarithm.