To classify an exponential function we want to identify the constant factor, b, and determine if b>1 or 0<b<1.

In this function b=4. Since 4>1, we would classify this function as exponential growth.

In the general form of an exponential function, y=ab^x, the initial value is represented by the variable a, which is the factor, or coefficient, that does not have a variable exponent.

The initial value is \dfrac{1}{2}.

In the general form of an exponential function, y=ab^x, the growth or decay factor is represented by the variable b, which is the factor with a variable exponent.

The growth factor is 4.

We will start with the general form of an exponential function, f\left(x\right)=a(b)^x and input all known values to find the function.

The initial value of the function is 300 grams and half-life means that the function has a decay factor of \dfrac{1}{2} so we can start with the function A=300\left(\dfrac{1}{2}\right)^n. Since the decay factor is happening every 20 minutes we need to adjust the exponent of the function to be A=300\left(\dfrac{1}{2}\right)^\frac{n}{20}.

By using \dfrac{n}{20} in the exponent we can see that the function will halve its value once in 20 minutes since n=20 gives us \dfrac{20}{20}=1, twice in 40 minutes since n=40 gives us \dfrac{40}{20}=2, etc.

In this context n represents the time, in minutes, and the output represents the amount of the sample remaining. We will evaluate the function and apply these units to interpret the meaning of the solution.

A=300\left(\dfrac{1}{2}\right)^\frac{30}{20}\approx 106.1 which tells us that there were approximately 106.1 grams of carbon-11 remaining after 30 minutes had passed.