Question

Jay's bank account listed a balance of $3,667.50. He originally opened the account with a $3,070 deposit 2 1/4 years ago. If there were no deposits or withdrawals, what was the simple interest rate (to the nearest hundredth of a percent)?

Answer 1

See below.

Explanation:

If you just want the percentage of the total interest after 2.25 years.

`3667.50/3070xx100%=119.46%`

We started with 100%, this was our $3070.

The amount extra is:

`19.56%`

Below is a more realistic answer, since interest is calculated at specified periods. Often monthly, quarterly or yearly.

The amount of interest after 2.25 years is:

We can use the formula for compound interest, with 1 compound per year.

`FV=PV(1+r/n)^(nt)`

Where:

`FV="future value"`

`PV="principal value"`

`r="interest rate as a decimal"`

`n="compounding period"`

`t="time in years"`

Our future value is what we have now. $3667.50

Our principal value is what we started with $3070.00

Compounding period is `1` i.e. once a year.

Time is 2.25 years.

We need to find `bbr`, the interest rate.

Putting in our known values:

`3667.50=3070(1+r/1)^(2.25)`

Divide by 3070:

`3667.50/3070=(1+r)^(2.25)`

Taking logarithms of both sides:

`ln(3667.50/3070)=2.25ln(1+r)`

Divide by 2.25:

`(ln(3667.50/3070))/2.25=ln(1+r)`

Using the laws of logarithms:

`y=ln(b)=>e^y=b`

Using this idea. Raise `bbe` to the power of both sides:

`e^((ln(3667.50/3070))/2.25)=e^(ln(1+r))`

`(3667.50/3070)^(1/2.25)=1+r`

`r=(3667.50/3070)^(1/2.25)-1`

`r~~0.082244085`

This is in decimal form, so multiplying by 100.

`8.22%` percent per year.