Solve the problem.
-The monthly costs for a small company to do business has been increasing over time in part due to inflation. The table gives the monthly cost y (in $) for the month of January for selected years. The Variable t represents the number of years since 2008.
$\begin{array}{c|c}
\begin{array}{c}
\text { Year } \
(t=\mathbf{0} \text { is 2008) }
\end{array} & \begin{array}{c}
\text { Monthly } \
\text { Costs (\$) } y
\end{array} \
\hline 0 & 14,000 \
1 & 14,200 \
2 & 14,400 \
3 & 14,600
\end{array}$

Monthly Cost (Jan.) for Selected Years

Year $( \mathrm { t } = 0$ represents $2008 )$

a. Use a graphing utility to find a model of the form $y = a b ^ { t }$.
b. Write the function from part (a) as an exponential function with base $e$.
c. Use the model to predict the monthly cost for January in the year 2,017 if this trend continues. Round to the nearest hundred dollars.

A) a. $y = 14,001 ( 0.0140 ) ^ { t }$ b. $y = 10 e ^ { 0.0140 t }$ c. $\$ 91,900$
B) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 14,001 e ^ { 0.0140 t }$ c. $\$ 15,900$
C) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 10 e ^ { 0.0140 t }$ c. $\$ 15,900$
D) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 10 e ^ { 1.014 t }$ c. $\$ 91,900$

Question

Solve the problem.
-The monthly costs for a small company to do business has been increasing over time in part due to inflation. The table gives the monthly cost y (in $) for the month of January for selected years. The Variable t represents the number of years since 2008.
 $\begin{array}{c|c}
\begin{array}{c}
\text { Year } \
(t=\mathbf{0} \text { is 2008) }
\end{array} & \begin{array}{c}
\text { Monthly } \
\text { Costs (\$) } y
\end{array} \
\hline 0 & 14,000 \
1 & 14,200 \
2 & 14,400 \
3 & 14,600
\end{array}$

Monthly Cost (Jan.) for Selected Years

Year $( \mathrm { t } = 0$ represents $2008 )$

a. Use a graphing utility to find a model of the form $y = a b ^ { t }$.
b. Write the function from part (a) as an exponential function with base $e$.
c. Use the model to predict the monthly cost for January in the year 2,017 if this trend continues. Round to the nearest hundred dollars.

A) a. $y = 14,001 ( 0.0140 ) ^ { t }$ b. $y = 10 e ^ { 0.0140 t }$ c. $\$ 91,900$ 
B) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 14,001 e ^ { 0.0140 t }$ c. $\$ 15,900$ 
C) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 10 e ^ { 0.0140 t }$ c. $\$ 15,900$ 
D) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 10 e ^ { 1.014 t }$ c. $\$ 91,900$

Quizplus · Accepted Answer

The Answer of Solve the problem.
-The monthly costs for a small company to do business has been increasing over time in part due to inflation. The table gives the monthly cost y (in $) for the month of January for selected years. The Variable t represents the number of years since 2008.
 $\begin{array}{c|c}
\begin{array}{c}
\text { Year } \
(t=\mathbf{0} \text { is 2008) }
\end{array} & \begin{array}{c}
\text { Monthly } \
\text { Costs (\$) } y
\end{array} \
\hline 0 & 14,000 \
1 & 14,200 \
2 & 14,400 \
3 & 14,600
\end{array}$

Monthly Cost (Jan.) for Selected Years

Year $( \mathrm { t } = 0$ represents $2008 )$

a. Use a graphing utility to find a model of the form $y = a b ^ { t }$.
b. Write the function from part (a) as an exponential function with base $e$.
c. Use the model to predict the monthly cost for January in the year 2,017 if this trend continues. Round to the nearest hundred dollars.

A) a. $y = 14,001 ( 0.0140 ) ^ { t }$ b. $y = 10 e ^ { 0.0140 t }$ c. $\$ 91,900$ 
B) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 14,001 e ^ { 0.0140 t }$ c. $\$ 15,900$ 
C) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 10 e ^ { 0.0140 t }$ c. $\$ 15,900$ 
D) a. $y = 14,001 ( 1.014 ) ^ { t }$ b. $y = 10 e ^ { 1.014 t }$ c. $\$ 91,900$

Solve the Problem Monthly Cost (Jan (t=0( \mathrm { t } = 0(t=0

Solve the Problem Monthly Cost (Jan $( \mathrm { t } = 0$