Lee Holmes deposited $17,200 in a new savings account at 11% interest compounded semiannually. At the beginning of year 4, Lee deposits an additional $42,200 at 11% interest compounded semiannually.
At the end of 6 years, what is the balance in Lee’s account? (Do not round intermediate calculations. Round your answer to the nearest cent.)
We use the formula:
A=P(1+r/2)^2n
where
A=future value
P=present value
r=rate of interest
n=time period.
A=$17200*(1+0.11/2)^(2*6)+42200*(1+0.11/2)^(2*3)
=(17200*1.90120749)+(42200*1.37884281)
=$90887.94(Approx).
Lee Holmes deposited $17,200 in a new savings account at 11% interest compounded semiannually. At the...
Lee Holmes deposited $17.200 in a new savings account at 11% interest compounded semiannually. At the beginning of year Lee deposits an additional $42,200 at 11% Interest compounded semiannually. At the end of 6 years, what is the balance in Lee's account? (Do not round intermediate calculations. Round your answer to the nearest cent.)
Lee Holmes deposited $17,000 in a new savings account at 9% interest compounded semiannually. At the beginning of year 4, Lee deposits an additional $42,000 at 9% interest compounded semiannually. At the end of 6 years, what is the balance in Lee’s account? (Do not round intermediate calculations. Round your answer to the nearest cent.)
Lee Holmes deposited $15,500 in a new savings account at 10% interest compounded semiannually. At the beginning of year 4, Lee deposits an additional $40,500 at 10% interest compounded semiannually. At the end of 6 years, what is the balance in Lee's account? (Do not round intermediate calculations. Round your answer to the nearest cent.) & Answer is complete but not entirely correct. Balance $ 75,045.35
Lee Holmes deposited $17,500 in a new savings account at 7% interest compounded semiannually. At the beginning of year 4, Lee deposits an additional $42,500 at 7% interest compounded semiannually. At the end of 6 years, what is the balance in Lee’s account? (Use the Table provided.)
How much money should be deposited today in an account that earns 5% compounded semiannually so that it will accumulate to $8000 in three years? The amount of money that should be deposited is $ (Round up to the nearest cent.) You deposit $14,000 in an account that pays 5% interest compounded quarterly A. Find the future value after one year B. Use the future value formula for simple interest to determine the effective annual yield. A. The future value...
answers only please
How much must be deposited at the beginning of each year an account that pays 7%, compounded annually so that the account will contain $32,000 at the end of 5 years? (Round your answer to the nearest cent) $ Need Help? What is the size of the payments that be deposited at the beginning of each 6-month period in an account that pays 5.2%, compounded semiannually, so that the account will have a future value of $140,000...
Suppose $10,000 is deposited into a savings account earning 2% interest compounded quarterly. Find the balance in the account 5 years, rounded to the nearest cent. Use one of the formulas below to solve the problem. Future Value: Present Value: A = P (143) P = (1+ht $14,859.47 $51 097.53
1) If $4000 is deposited in a savings account that earns interest at an annual rate of 2.5% interest compounded continuously, what is the value of the account at the end of two years? 2) A trust fund for a 11-year-old child is being set up by a single payment so that at age 21 the child will receive $37,000. Find how much the payment is if an interest rate of 9% compounded semiannually is assumed. 3) A bank account...
Jacob Lee invested $600 in a savings account paying 8% interest compounded twice a year. What will be his interest at the end of the year? Round to the nearest dollar. $48 $24 $49- Not the answer $25
Suppose that money is deposited daily into a savings account at an annual rate of $1000. If the account pays 4% interest compounded continuously, estimate the balance in the account at the end of 3 years. The approximate balance in the account is $ (Round to the nearest dollar as needed.)