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150 if invested for three years at a 9 percent interest rate?
$194.25 if interest is compounded annually. A little more if compounded quarterly, monthly, or daily.
How much would 100 invested at 6 interest compounded annually be worth after 20 years?
320.71
How much would 250 invested at 10 percent interest compounded continuously be after 8 years?
556.34
How much interest will 10000 earn in 18 months if invested at 8 percent compounded semiannually?
1200
How much interest would you earn of a 30000 investment?
Depends on how you invested it and what rate of return that investment delivered.
How much would 15000 dollars invested at 8 percent interest compounded annually be worth after 6 months?
If the interest is compounded annually, then the first interest payment isn't added until the end of the first year. Until then, the investment is worth exactly $15,000.00 .
How do you work out interest accrued on spreadsheet for compound interest?
SupposeCapital invested = YAnnual Interest Rate = R%Period of investment = TThen if the interest is calculated (and compounded) n times a yeartotal value =Y*[1 + r/(100*n)]^(n*T)So interest accrued = Total value - YSupposeCapital invested = YAnnual Interest Rate = R%Period of investment = TThen if the interest is calculated (and compounded) n times a yeartotal value =Y*[1 + r/(100*n)]^(n*T)So interest accrued = Total value - YSupposeCapital invested = YAnnual Interest Rate = R%Period of investment = TThen if the interest is calculated (and compounded) n times a yeartotal value =Y*[1 + r/(100*n)]^(n*T)So interest accrued = Total value - YSupposeCapital invested = YAnnual Interest Rate = R%Period of investment = TThen if the interest is calculated (and compounded) n times a yeartotal value =Y*[1 + r/(100*n)]^(n*T)So interest accrued = Total value - Y
If $190 is invested at an interest rate of 11% per year and is compounded continuously, how much will the investment be worth in 4 years Use the continuous compound interest formula: A = Pert?
10001/999900
How much would 500 invested at 9 interest compounded annually be worth after 4 years?
Left alone, that investment would be worth 705.79 after four years.
Find the final amount for the investment 750 at 10 percent interest compounded quarterly for 10 years?
750 invested for 10 years at 10% pa would be 1,945
150 if invested for three years at a 9 percent interest rate?
$194.25 if interest is compounded annually. A little more if compounded quarterly, monthly, or daily.
What is the future value of 500 invested for 15 years at 5 percent?
It depends how the interest is calculated. If it's compounded, your initial 500 investment would be worth 638.15 after 5 years.
How much would 500 invested at 7 percent compounded annually be worth after 5 years?
500 invested for 5 years at 7% interest compounded annually becomes 701.28
How much would 140 invested at 6 percent interest compounded annually be worth after 15 years Round your answer to the nearest cent?
How much would $500 invested at 9% interest compounded annually be worth after 4 years? 705.79
How much would 200 invested at 6 interest compounded annually be worth after 6 years?
Compound Interest = P(1+r/100n)(nt) P = Original Investment r = Interest Rate n = How often the interest is compounded per year t = Number of years Interest = 200(1+6/100)6 = 200(1.06)6 =$283.70
If 1500 dollars is invested at an interest rate of 3 point 5 percent per year compounded continuously find the value of the investment after 3 6 and 18 years.?
If 1500 dollars is invested at an interest rate of 3.5 percent per year compounded continuously, after 3 years it's worth $1666.07, after 6 years it's $1850.52, and after 18 years it's worth $2816.42.
Can you provide me with compound interest formula sheets?
The compound interest formula is A P(1 r/n)(nt), where: A the future value of the investment P the principal amount (initial investment) r the annual interest rate (in decimal form) n the number of times interest is compounded per year t the number of years the money is invested for You can use this formula to calculate the future value of an investment with compound interest.
