The graph of an exponential function is given. Select the func...

Question

The graph of an exponential function is given. Select the function for each graph from the following options:

$f(x) = 3^x, \quad g(x) = 3^{x-1}, \quad h(x) = 3^x - 1, \f(x) = -3^x, \quad G(x) = 3^{-x}, \quad H(x) = -3^{-x}.$

Accepted Answer

Hello. Today we're going to be identifying the function for the given graph. So what we are given is this exponential function that passes through the 0.1 comma five. And its horizontal assim tote is given to us as Y is equal to negative one. So the general form of an exponential function is F. Of X. Is equal to some constant B. Race in the power of X. And the shape of this graph is going to be some exponential function passing through the 0.0 comma one and having a horizontal assim tote at Y is equal to zero. The difference between this graph and the one given to us is that the ascent toad is that y is equal to negative one. So that means that we had to have shifted The given graph vertically down one unit. So we're going to have to give our general function a vertical shift of one unit down. And in order to do that we can go ahead and put -1 at the end of our function. That's going to give us F of X. is equal to B to the power of X -1. Now we need to identify what the value of B is going to be see, let's take a look at the given point of one. What this is saying is that if we plug in one into our function is going to give us the value of five. So if we plug in one to our general function we have F of one is equal to B to the power of one minus one is equal to five. And let's go ahead and use this statement here to sulfur B. B to the power of one is just going to give me b. So on the left hand side I have B -1 is equal to five. And if I add one to both sides of this equation, I get B is equal to six, which is going to be the value of my base for the exponential function. So if I plug in this value into our general function, what I get is f of X is equal to six to the power of X -1. And this is going to be the answer to this problem. And with that being said, the overall solution is going to be C. So I hope this video helps you in understanding how to approach this problem. And I'll go ahead and see you all in the next video.

The graph of an exponential function is given. Select the function for each graph from the following options:
$f(x) = 3^x, \quad g(x) = 3^{x-1}, \quad h(x) = 3^x - 1, \\f(x) = -3^x, \quad G(x) = 3^{-x}, \quad H(x) = -3^{-x}.$

Key Concepts

Exponential Functions and Their Graphs

Transformations of Exponential Functions

Horizontal Asymptotes in Exponential Functions

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