Properties and Applications of Exponential Functions

Its slope is equal to its derivative.

Its slope is equal to the function itself.

It has a constant slope.

It is a linear function.

A constant rate of change.

A linear relationship between y and x.

A quadratic relationship between y and x.

An exponential growth where the rate of change is proportional to the function itself.

e^x grows faster than x^100.

e^x does not grow.

e^x grows at the same rate as x^100.

e^x grows slower than x^100.

A limiting process.

A polynomial equation.

A constant function.

A linear equation.

Because the terms increase rapidly.

Because it is a finite series.

Because the terms decrease rapidly due to the factorial in the denominator.

Because it is a geometric series.

The exponential series has no fractions.

The geometric series converges for all x.

The geometric series is always divergent.

The exponential series includes factorials in the denominator.

By summing the series 1 + x + x^2 + x^3 + ...

By summing the series 1 + x + 1/2! x^2 + 1/3! x^3 + ...

By multiplying the series 1 + x + x^2 + x^3 + ...

By dividing the series 1 + x + 1/2! x^2 + 1/3! x^3 + ...

Exactly 3

Approximately 2.7

Exactly 2

Approximately 2.5

It becomes 1.

It becomes 1/e^x.

It becomes a constant function.

It becomes 0.

y = e^(cx)

y = cx

y = c^x

y = e^x