Suppose Carmen places $2000 in an account that pays 8% interest compounded each year Assume that...
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Suppose that you do 30000 in a wings out that pays 9% annual interest with interest credited to the account at the end of each you. Antingen werdend that interest compounded computer (a) and (b) below (a) Find the balance in the counter 5 years Find the balance in the account her years and 10 months The amount of money in the court or 5 years in Round to the nearest as needed) The amount of money in the...
Question 15 O Mark this question Suppose an account pays 6% interest that is compounded annually. At the beginning of each year, $2,000 is deposited into the account (starting with $2,000 for the first year) What is the value of the account after the tenth deposit if no withdrawals or additional deposits are made? 0 $21,200.00 O $26,361.59 O $23,581.70 O $35,816.95 Suppose $15,000 is deposited into an account paying 6.5% interest, which is compounded annually. How much money is...
Today, an engineer deposited $34,000 into an account that pays interest at 8% per year compounded semiannually. If there is no interperiod compounding and withdrawals of $1150 in months 2.11 and 23 are already planned, what will be the future value at the end of 3 years? The future value would be $
Suppose $200,000 used to establish an annuity that earns 8%, compounded quarterly, and pays $5500 at the end of each quarter How long will it be until the account balance is $02 (Round your answer UP to the newest quarter.) quarters Find the present value of an annuity due that pays $2000 at the beginning of each quarter for the next 6 years. Assume that money is worth 6.6%, compounded quarterly. (Round your answer to the nearest cont.) $ Need...
Suppose that $1000 is deposited into an account that pays 5% interest per year, at the end of each year, the amount in the account is 1.05 times the amount at the beginning of the year. Write a MATLAB program with a for loop to calculate the amount in the account after 10, 20, and 30 years. Repeat problem 1, assuming that the interest is compounded quarterly; that is, one-fourth of the annual interest (1.25%) is added to the account...
40 equal end-of-year deposits are made into a savings account that pays 1% interest. Compute the amount of each deposit that will permit withdrawals of $20,000 at the ends of the last 5 years, leaving the account empty.
Taylor has a retirement account that pays 4% per year compounded monthly. Every month for 20 years, Taylor deposits $444, with the first deposit at the end of month 1 The day the last deposit is made, the interest rate increases to 6% per year compounded monthly. During retirement, Taylor plans to make equal monthly withdrawals for 15 years, thus depleting the account. The first withdrawal occurs one month after the last deposit. How much can be withdrawn each month?
8. Juan deposits $4,300 into a savings account that pays 6.9% per year, continuously compounded. What is the effective annual interest rate? Determine the value of his account at the end of four years. The effective annual interest rate is %. (Round to two decimal places.) The value of this account at the end of four years is $ (Round to the nearest dollar.)
Find the present value of an annuity due that pays $2000 at the beginning of each quarter for the next 6 years. Assume that money is worth 6.6%, compounded quarterly. (Round your answer to the nearest cent.) $ 2375701 X Need Help? To Me With a present value of $140,000, what is the size of the withdrawals that can be made at the end of each quarter for the next 10 years if money is worth 6.7%, compounded quarterly? (Round...
4) If a person deposits $2000 in to an account paying 6% compounded annually one year from now and then increases his deposits by 100$ each year for the next eight years, determine the amount of money that will be in the account at the end of eight years. 5) What is the equivalent present amount of a fifteen year period series of decreasing amounts if the interest rate is 12% compounded annually the first year amount is $35000 and...