The basic curve
The most basic exponential function is given by $y=b^x$y=bx, where $b$b is known as the base of the function.
The base is restricted to positive real numbers not equal to $1$1. By playing with the applet here, can you work out why the base of an exponential function is not 1?
Introducing A and k
We can introduce more variability to the basic curve by considering the function that includes two interesting constants. This new form is given by $y=A\times b^x+k$y=A×bx+k where $A$A is any non-zero real number and $k$k is any real number at all.
If $A$A is positive and the base is greater than $1$1, then the graph of the function $y=A\times b^x+k$y=A×bx+k monotonically rises ( that is, the curve continually rises across the whole domain). If $A$A is positive and the base is less than $1$1 then the curve monotonically falls.
Negative a
If $A$A is negative, the situation reverses. For example, the curve $y=-4\times3^x$y=−4×3x is a reflection across the $x$x-axis of the curve $y=4\times3^x$y=4×3x. This means that $y=-4\times3^x$y=−4×3x is a falling curve when $b$b is greater than $1$1, and a rising curve when $b$b is less than $1$1.
Use the applet below to draw the following graphs, so that you can see how things work. Be sure to make $k=0$k=0 before you start changing $A$A and $b$b.
| Graph $1$1 | $y=4\times\left(0.5\right)^x$y=4×(0.5)x |
|---|---|
| Graph $2$2 | $y=-4\times\left(0.5\right)^x$y=−4×(0.5)x |
| Graph $3$3 | $y=4\times3^x$y=4×3x |
| Graph $4$4 | $y=-4\times3^x$y=−4×3x |
The addition of the constant $k$k will lift the graph or pull it down (depending on the sign of $k$k).
So for example the monotonically rising function given by $y=5\times2^x+3$y=5×2x+3 will have a $y$y intercept of $5+3=8$5+3=8. Use the applet to verify this.
Introducing a horizontal translation
We can also make the exponential curve a little more general by including a translation constant into the equation. Thus a more general form is given by $y=A\times b^{x-c}+k$y=A×bx−c+k. The constant $c$c makes the whole graph move sideways (either left or right depending on the sign of $c$c). The technical name for this movement is a horizontal translation.
So for example the curve $y=4\times3^{x-2}$y=4×3x−2 is the same as $y=4\times3^x$y=4×3x except that it's positioned $2$2 units horizontally to the right of it.
Also, the curve $y=4\times3^{x-2}$y=4×3x−2 is the same as $y=4\times3^x$y=4×3x except that it's positioned $2$2 units to the left of it.
How does the exponential rise and fall?
Consider the graph given by $y=4\times3^{x-2}$y=4×3x−2. We can evaluate $y$y for any value of $x$x, and seven values are shown here in the table. Note that when the exponent $x-2$x−2 is negative we must utilise our exponent rules.
For example, for $x=-1$x=−1 we have $y=4\times3^{-1-2}=4\times3^{-3}=\frac{4}{3^3}=\frac{4}{27}$y=4×3−1−2=4×3−3=433=427.
| $x$x | $-1$−1 | $0$0 | $1$1 | $2$2 | $3$3 | $4$4 | $5$5 |
|---|---|---|---|---|---|---|---|
| $y$y | $\frac{4}{27}$427 | $\frac{4}{9}$49 | $\frac{4}{3}$43 | $4$4 | $12$12 | $36$36 | $108$108 |
Use the applet to construct the sketch. Then notice the following features:
Firstly, the $y$y values are all positive. This is because any power of $3$3 is positive, no matter whether the exponent involved is positive, negative or zero. Since $A=4$A=4, and there is no vertical translation constant $k$k in the equation, every value of $y$y must also be positive.
Secondly, the $y$y values are increasing from left to right (or decreasing from right to left). As $x$x increases in equal steps, the $y$y values increase as well, but in ever increasing steps. that is to say the rate of change of $y$y is quickening as $x$x increases. For example, the values of $x$x stepping up as $1$1, $2$2, $3$3, $4$4, $5$5 show $y$y values stepping up as $4$4, $12$12, $36$36 and $108$108.
Going the other way, the values of $y$y from right to left are getting closer and closer to zero, but never becoming zero. The curve seems to bend toward the $x$x-axis, forever getting closer and closer to it. An asymptote is a line that curve approaches but never reaches, and so the $x$x-axis (which is the line $y=0$y=0) is an asymptote for this curve.
Worked Examples
Question 1
Consider the expression $3^x$3x.
Evaluate the expression when $x=4$x=4.
Evaluate the expression when $x=-4$x=−4. Leave your answer in fractional form.
What happens to the value of $3^x$3x as $x$x gets larger?
it stays the same
Ait gets smaller, approaching zero
Bit gets larger, approaching infinity
CWhat happens to the value of $3^x$3x as $x$x gets smaller?
it gets larger, approaching infinity
Ait gets smaller, approaching zero
Bit stays the same
C
Question 2
Of the two functions $y=2^x$y=2x and $y=4\times2^x$y=4×2x, which is increasing more rapidly for $x>0$x>0?
$y=2^x$y=2x
A$y=4\times2^x$y=4×2x
B
Question 3
What is the equation of the curve in the following graph?