A student has a savings account earning 9% simple interest. She must pay $1500 for first-semester tuition by September 1 and $1500 for second-semester tuition by January 1. How much must she earn in the summer (by September 1) to pay the first-semester bill on time and still have the remainder of her summer earnings grow to $1500 between September 1 and January 1?

Answer: $2956.31 in total by september 1st

Explanation:

Using the formula A = P (1 + rt)

our given dа ta:

Rate of simple interest = 9%

r = 0.03/12 per month

P = Money in the bank by Sep 1 and A = $1500

FOR t=4 means that there are four months between 1st September and 1st January

So, in order to have the remainder of summer earnings grow to $1500 between September 1 and January 1,

we have that A = P (1 + rt)

1500 = P [1 +.09 (4/12) ]

1500 = P (1 +.03) 1500 / 1.03 =

P = $1456.31

This implies that she needs to earn 1500 + 1456.31 = $2956.31 during summer to ensure that t she will have enough money to pay first semester on time in september and still have remainder of her earnings to grow by January 1st.