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33 votes
33 votes
Hannah would like to make an investment that will turn 8000 dollars into 33000 dollars in 7 years. What quarterly rate of interest, compounded four times per year, must she receive to reach her goal?

User Shinyatk
by
2.8k points

2 Answers

8 votes
8 votes

Answer:

20.76%

Explanation:


33000=8000(1+(i)/(4))^(4*7)\\4.125=(1+(i)/(4))^(28)\\\sqrt[28]{4.125}=1+(i)/(4) \\i= .207648169

which rounds to 20.76%

User Jean Claude Abela
by
3.2k points
9 votes
9 votes

Answer:

About 0.2076 or 20.76%.

Explanation:

Recall that compound interest is given by the formula:


\displaystyle A=P\left(1+(r)/(n)\right)^(nt)

Where A is the final amount, P is the principal, r is the interest rate, n is the number of times the interest is applied per year, and t is the number of years.

Since Hannah wants to turn an $8,000 investment into $33,000 in seven years compounded quarterly, we want to solve for r given that P = 8000, A = 33000, n = 4, and t = 7. Substitute:


\displaystyle \left(33000\right)=\left(8000\right)\left(1+(r)/(4)\right)^((4)(7))

Simplify and divide both sides by 8000:


\displaystyle (33)/(8)=\left(1+(r)/(4)\right)^(28)

Raise both sides to the 1/28th power:


\displaystyle \left((33)/(8)\right)^{{}^(1)\! / \! {}_(28)}= 1+(r)/(4)

Solve for r. Hence:


\displaystyle r= 4\left(\left((33)/(8)\right)^{{}^(1)\! / \! {}_(28)}-1\right)

Use a calculator. Hence:


r=0.2076...\approx 0.2076

So, the quarterly rate of interest must be 0.2076, or about 20.76%.

User Ddejohn
by
2.4k points