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35 votes
35 votes
Find the exponential equation that goes to the points (2, 48) and (3, 192)

User Schmelter
by
2.4k points

1 Answer

25 votes
25 votes

ANSWER:


y=3\cdot4^x

Explanation:

An exponential equation has the following form:


y=a\cdot b^x

We substitute each point to establish a system of equations:


\begin{gathered} 48=a\cdot b^2\rightarrow a=(48)/(b^2) \\ 192=a\cdot b^3\rightarrow a=(192)/(b^3) \end{gathered}

We can solve by equating both equations and solve for b:


\begin{gathered} (48)/(b^2)=(192)/(b^3) \\ 48\cdot b^3=192\cdot b^2 \\ (b^3)/(b^2)=(192)/(48) \\ b=4 \end{gathered}

Now, we can calculate the value of a by substituting in the previous equations:


\begin{gathered} a=(48)/(4^2)=(48)/(16) \\ a=3 \end{gathered}

Therefore, the exponential equation of the points would be:


y=3\cdot4^x

User Ckpwong
by
2.9k points
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