In the investigation for this chapter we look at a special number, the mathematical constant, $e$e. We showed that $e$e is defined as $\lim_{n\rightarrow\infty}\left(1+\frac{1}{n}\right)^n$limn→∞(1+1n)n and is the irrational number $2.7128\dots$2.7128…. In our previous lesson we explored exponential functions of the form $y=a^x$y=ax, a very important member of this family of curves is $y=e^x$y=ex.
As a member of this family of curves we can see it has the same properties and sits between the functions $y=2^x$y=2x and $y=3^x$y=3x.
Graphs of $y=2^x$y=2x, $y=e^x$y=ex and $y=3^x$y=3x |
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Key features:
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The three functions above can be viewed as horizontal dilations of each other. Using transformations we can in fact write any exponential function with a base of $e$e. Using a base of $e$e will become fundamental in exponential applications involving calculus. The function $f\left(x\right)=e^x$f(x)=ex has the remarkable property that $f'\left(x\right)=f\left(x\right)$f′(x)=f(x) and we will see using a base of $e$e will often simplify required processes and calculations.
Just as with functions of the form $y=a^x$y=ax we can perform transformations on the graph $y=e^x$y=ex.
a) For the function $y=e^x$y=ex, describe the transformations required to obtain the graph of $y=2\times e^x+3$y=2×ex+3.
Think: For the function $y=A\times e^{\left(bx-h\right)}+k$y=A×e(bx−h)+k, what impact does each parameter have? Which parameters have been altered?
Do: We have $A=2$A=2 and $k=3$k=3, hence, the function has been vertically dilated by a factor of $2$2 and a vertical translation by a $3$3 units upwards.
b) Sketch the function.
Think: From the basic graph of $y=e^x$y=ex a vertical dilation by a factor of $2$2 will stretch each point away from the $x$x-axis by a factor of $2$2. Hence, the point $\left(0,1\right)$(0,1) becomes $\left(0,2\right)$(0,2), $\left(1,e\right)$(1,e) becomes $\left(1,2e\right)$(1,2e) and so forth. Then we can shift the graph $3$3 units vertically, each point moves up $3$3 units and the horizontal asymptote becomes $y=3$y=3.
Do:
Step 1. Dilate the graph by a factor of $2$2 from the $x$x-axis. | Step 2. Translate the graph upwards $3$3 units, this includes the horizontal asymptote. |
The functions $y=2^x$y=2x and $y=3^x$y=3x have been graphed on the same coordinate axes.
Using $e=2.718$e=2.718 and by considering the graph of $y=e^x$y=ex, complete the statement below:
For $x>\editable{}$x>, the graph of $y=e^x$y=ex will lie above the graph of $y=\left(\editable{}\right)^x$y=()x and below the graph of $y=\left(\editable{}\right)^x$y=()x.
For $x<\editable{}$x<, the graph of $y=e^x$y=ex will lie above the graph of $y=\left(\editable{}\right)^x$y=()x and below the graph of $y=\left(\editable{}\right)^x$y=()x.
Using a graphing calculator, graph the curves of $y=e^x$y=ex, $y=e^x+2$y=ex+2, and $y=e^x-3$y=ex−3 on the same screen.
Select the correct statement from the following:
The three graphs are the same.
The three graphs have the same shape.
The three graphs have the same $y$y-intercepts.
The three graphs have the same $x$x-intercepts.
Beginning with the equation $y=e^x$y=ex, we want to find the new function that results from the following transformations.
Starting from $y=e^x$y=ex, the function is first dilated by a factor of $3$3 vertically. What is the equation of the new function?
The function is then translated $2$2 units upwards. What is the equation of the new function?
What is the equation of the horizontal asymptote of the new function?
What is the value of the $y$y-intercept of the new function?
Using the previous parts, choose the correct graph of the transformed function.