The formula below tells us how to obtain the maturity value on a simple discount loan if we are given the proceeds, the discount rate, and the term. If a loan's annual simple discount rate is 7.56%, how many years would it take for the debt to double? (This is called the doubling time of a loan). Round your answer to the nearest tenth of a year. Hint: divide both sides of the equation by P. If M is twice as much as P, what should the fraction on the left-hand side equal?
The formula below tells us how to obtain the maturity value on a simple discount loan if we are given the proceeds, the discount rate, and the term. If a loan's annual simple discount rate is 7.56%, how many years would it take for the debt to double? (This is called the doubling time of a loan). Round your answer to the nearest tenth of a year. Hint: divide both sides of the equation by P. If M is twice as much as P, what should the fraction on the left-hand side equal?
Chapter4: Time Value Of Money
Section4.17: Amortized Loans
Problem 1ST
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The formula below tells us how to obtain the maturity value on a simple discount loan if we are given the proceeds, the discount rate, and the term.
If a loan's annual simple discount rate is 7.56%, how many years would it take for the debt to double? (This is called the doubling time of a loan).
Round your answer to the nearest tenth of a year.
Hint: divide both sides of the equation by P. If M is twice as much as P, what should the fraction on the left-hand side equal?
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Simple discount rate = 7.56%
How many years for debt to double?
Assuming Debt = 100
Future Value = 2 times of debt = 200
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