How to graph exponential functions with fractions

Graphing Exponential Functions


Graphing Exponential Functions 



It is important to know the general nature and shape of exponential graphs.  The actual values that may be plotted are relatively few, and an understanding of the general shape of a graph of growth or decay can help fill in the gaps.

Exponential Growth

An exponential growth function can be written in the form y = abx where a > 0 and b > 1.  The graph will curve upward, as shown in the example of f(x) = 2x below.

x
f(x) = 2x
−3
2−3 = 1/8
−2
2−2 = 1/4
−1
2−1 = 1/2
0
20 = 1
1
21 = 2
2
22 = 4
3
23 = 8


How to graph exponential functions with fractions


Notice that as x approaches negative infinity, the numbers become increasingly small.  That is because a negative exponent translates into increasingly small fractional numbers.  y = 0 is a horizontal asymptote, toward which the graph tends as the x-axis continues to the left.

Also note that the graph shoots upward rapidly as x increases.  This is because of the doubling behavior of the exponential.

Exponential Decay

In the form y = abx, if b is a number between 0 and 1, the function represents exponential decay.  The basic shape of an exponential decay function is shown below in the example of f(x) = 2−x.
  (This function can also be expressed as f(x) = (1/2)x.)

x
f(x) = 2−x
−3
2−(−3) = 8
−2
2−(−2) = 4
−1
2−(−1) = 2
0
20 = 1
1
2−1 = 1/2
2
2−2 = 1/4
3
2−3 = 1/8

How to graph exponential functions with fractions


Again, this graph has the line y = 0 as an asymptote.

Variations on the General Graph

Note that if b is negative, the curve will cu

rve downward as the x values increase.  Note that if the exponent is negative, the curve will tend upward in the negative x values.

Consider these basic forms for y = −2x and y = 2

−x respectively.
To graph a general exponential function in the form, 

y = abx − h + k



begin by sketching the graph of y = abx and then translate the graph horizontally by h units and vertically by k units.

Example

Graph 3(2x

−1) − 4

Solution

First lets sketch y =

3(2x) and notice that it passes through (0, 3) and (1, 6)

How to graph exponential functions with fractions

Then translate the graph one unit to the the right and 4 units down. Now the graph passes through (1, −1) and (2, 2)

How to graph exponential functions with fractions

The graph's domain is all real numbers, and the range is y > −4. We see the asymptote is the line y = −4.

Try it yourself

1.  Graph y = 3x

2.  Graph y =

−(3/2)x

3.  Graph  y = 2

× 5x

4.  Graph y =

−2 ÷ 5x

5.  Graph  y = 3x 

− 2 Answers
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How to graph exponential functions with fractions

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How to graph exponential functions with fractions

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How to graph exponential functions with fractions

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How to graph exponential functions with fractions

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How to graph exponential functions with fractions

Can exponential functions have fractions?

In a fractional exponent, the numerator is the power to which the number should be taken and the denominator is the root which should be taken.