To apply the compound interest formula we need to identify which variables we have given information for. In this example we know that the principal is P=200, the rate is r=0.04 and the time is t=5. If the interest is compounded annually, then we also know n=1 since annually means once per year.

A=200\left(1+\dfrac{0.04}{1}\right)^{1\times5}=243.33.

Frasier will have \$243.33 after 5 years.

In this example we know the ending balance is A=300, the rate is still r=0.04, the time is still t=5 and the the interest is still compounded annually so n=1.

Substituting all given values into the formula gives us:

Frasier would need to invest \$246.58 to have an ending balance of \$300 after investing his money for 5 years at a rate of 4\% compounded annually.

Simple interest will take the form, A=P(1+rt) and compound interest will take the form A=P\left(1+\dfrac{r}{n}\right)^{nt}.

Compound interest, since the expression is exponential.

This is compound interest where P=500, r=0.02, n=1 and t=6.

Simple interest will take the form, A=P(1+rt) and compound interest will take the form A=P\left(1+\dfrac{r}{n}\right)^{nt}.

Simple interest, since the expression is linear.

This is simple interest where P=500, r=0.05 and t=3.