Question: {{all this is QUESTION WITH the answer I need it on Use the PVIF and FVIF tables and the simple interest formula to help answer
{{all this is QUESTION WITH the answer I need it on Use the PVIF and FVIF tables and the simple interest formula to help answer the items below.
- Joel is going to put $2500 in a savings account at a local bank. The savings account will earn Joel 8% annually, simple interest. How much will Joel have in his account if he leaves the money there for 5 years? 10 years?
- If Joel had put the $2500 in an account in which the interest compounded annually, how would his account balance differ from the balances in #1 (At 5 years and 10 years)
- Cade has $5000 available to invest. He has found an opportunity to invest this money at 12% annually. If Cade left this money to grow at this rate (compounding) for 10 years, how much would he have at the end of the 10th year?
- If Cade were able to leave it for 15 years, what would the balance be?
- Cameron wants to have $5000 for a down payment on a vehicle. He plans to purchase the vehicle in approximately 4 years (at the time he thinks hell need to get rid of his current vehicle). If he can earn 9% interest, how much must he deposit now in order to have the money in 4 years?
- What would the present value of an account be if the future value is $20,000 and it has been compounding at a rate of 6% for the past 5 years?
- What should Jeff be willing to invest now in order to have $20,000 in 15 years if his investment will compound at a rate of 10% annually.
- Jordan wants to accumulate $1000 two years from now. If he can earn 6% on his investment, how much should he invest now?
- Maria would like to know the difference in account values if she:
- Invested $10,000 for 5 years @ 8%, simple interest
- Invested $10,000 for 5 years @ 8%, compounding interest.......................this is the answer I need it on Use the PVIF and FVIF tables and the simple interest formula to help answer the items below.
- Chapter 9 Assignment this is the answer
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a) 2500 + (2500 x .08 x 5) = 3500 (5 years); 2500 + (2500 x .08 x 10) = 4500
b) 2500 x 1.469 = 3672.5; 2500 x 2.159 = 5397.5
c)5000 x 3.106 = 15,530
d) 5000 x 5.474 = 27,370
e) 5000 x .708 = 3540
f)20,000 x .747 = 14,940
g) 20,000 x .239 = 4780
h) 1000 x .890 = 890
i)a. 10,000 x 8% x 5 = 4000 : Balance = 14,000; b. 10,000 x 1.469 = 14, 690 ($690 difference)
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