Perhaps at that meeting they will be able to change the exponential function?

The standard example for this task is the exponential function.

A person can also look at the picture to see why the number e is important for exponential functions.

Another major problem is dealing with numbers that are not related to the exponential function.

For example, the exponential function applied to the number one, has a value of e.

The exponential function shows that learning increases at a constant rate in relationship to what is left to be learned.

Here is an example of a Padé table, for the exponential function.

One example of an exponential function in real life would be interest in a bank.

The exponential function is among the most useful of mathematical functions.

The number e is important to every exponential function.

The latter exception is illustrated by the exponential function, which never takes on the value 0.

Note, for example, that 0 is the only lacunary value of the complex exponential function.

This behavior is referred to as a "decaying" exponential function.

It is then possible to fit an exponential function to the data, and obtain the exchange constant.

The exponential function e can be characterized in a variety of equivalent ways.

Because and although exponential functions use exponentiation, they follow the same rules.

For example, both and are allowable extensions of the exponential function.

This varying density results in a curve similar to the exponential function.

"The greatest shortcoming of the human race is our inability to understand the exponential function".

One that grows more slowly than any exponential function of the form is called subexponential.

Because the bank now pays him interest on his interest, the amount of money is an exponential function.

This is the reason that the exponential function with the base e is special.

It is the exponential function, using complex numbers.

In mathematics, the exponential function can be characterized in many ways.

In many cases, attenuation is an exponential function of the path length through the medium.