How long will it take for an investment to triple, if interest is compounded continuously at %?
How long will it take for an investment to triple, if interest is compounded continuously at...
8.6.50 How long will it take for an investment to triple, if interest is compounded continuously at 7%? It will take years before the investment triples. (Round to the nearest tenth of a year.)
How long will it take for an investment to triple if it is compounded continuously at 9%? It will take about years to triple the investment (Round to two decimal places as needed.)
How long will it take for an investment to triple if it is compounded continuously at 4%? It will take about years to triple the Investment. (Round to two decimal places as needed.)
How long will it take for an investment to triple if it is compounded continuously at 13%? It will take about _______ years to triple the investment. (Round to two decimal places as needed)
How long will it take for a lump-sum investment to triple in value at an interest rate of 1.5% per six-months, compounded continuously? For the lump sum investment to triple in value at an interest rate of 1.5% per sx months compounded continuously, twill take time periods
Suppose $8000 is invested at 7% interest compounded continuously. How long will it take for the investment to grow to $16000? Use the model A(t) = Pe" and round your answer to the nearest hundredth of a year. It will take years for the investment to reach $16000.
how long would it take for 1000 to double to 2000 paying 2.4% interest compounded continuously
An investment of $10,000 is made at an annual rate of 6% compounded continuously. How long will it take for the investment to grow to $30,000?
A principal is invested at 10% interest compounded continuously. After how long will the initial investment be tripled?
(a) How long will it take an investment to double in value of the Interest rate is 6% compounded continuously? (Round your answer to one decimal place.) 11.6 years (b) What if the interest is compounded annually? (Round your answer to one decimal place.) x years