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25 votes
25 votes
Use the graph to answers the following 2 questions: 1. Write the equation in
y = {ab}^(x)form for this graph. 2. Using th equation from #1, what is the value when x=4?

Use the graph to answers the following 2 questions: 1. Write the equation in y = {ab-example-1
User Mehdi Karamosly
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1 Answer

19 votes
19 votes

y=ab^x

In a equation in the exponential general form you have:

a is the y-intercetp: the value of the function when x is 0)

For the given function the y intercept is (0,5), then

a=5


y=5b^x

Use the given point (2,45) to find the value of b

y=45

x=2


45=5b^2

Divide both sides of the equation into 5:


\begin{gathered} (45)/(5)=(5)/(5)b^2 \\ \\ 9=b^2 \end{gathered}

Find the square root in both sides of the equation:


\begin{gathered} \sqrt[]{9}=\sqrt[]{b^2} \\ \\ 3=b \end{gathered}

Then, for the given function you have the next equation:


y=5\cdot3^x

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To find the value of the function when x=4 use the equation above, substitute the x for 4 and evaluate:


\begin{gathered} y=5\cdot3^4 \\ y=5\cdot81 \\ y=405 \end{gathered}

Then, when x=4 the value of the function is 405

User Secmask
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