Exponential Function Reference
This is the general Exponential Function (see below for e x ):
a is any value greater than 0
Properties depend on value of "a"
- When a=1, the graph is a horizontal line at y=1
- Apart from that there are two cases to look at:
a between 0 and 1
Example: f(x) = (0.5) x
For a between 0 and 1
- As x increases, f(x) heads to 0
- As x decreases, f(x) heads to infinity
- It is a Strictly Decreasing function (and so is "Injective")
- It has a Horizontal Asymptote along the x-axis (y=0).
Example: f(x) = (2) x
For a above 1:
- As x increases, f(x) heads to infinity
- As x decreases, f(x) heads to 0
- it is a Strictly Increasing function (and so is "Injective")
- It has a Horizontal Asymptote along the x-axis (y=0).
Plot the graph here (use the "a" slider)
In General:
- It is always greater than 0, and never crosses the x-axis
- It always intersects the y-axis at y=1 . in other words it passes through (0,1)
- At x=1, f(x)=a . in other words it passes through (1,a)
- It is an Injective (one-to-one) function
Its Domain is the Real Numbers:
Its Range is the Positive Real Numbers: (0, +∞)
Inverse
So the Exponential Function can be "reversed" by the Logarithmic Function.
The Natural Exponential Function
This is the "Natural" Exponential Function:
Where e is "Eulers Number" = 2.718281828459. etc
Graph of f(x) = e x
The value e is important because it creates these useful properties:
At any point the slope of e x equals the value of e x :
when x=0, the value of e x = 1, and slope = 1
when x=1, the value of e x = e, and slope = e
etc.
The area up to any x-value is also equal to e x :
