What is the rate on an investment that doubles $5051 in 9 years? Assume interest is compounded quarterly.

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WaywardDelaney WaywardDelaney · Answer 1 · 2019-12-02T09:13:46+01:00

Answer:

The rate at which the investment gets double is 7.776

Step-by-step explanation:

Given as :

The principal investment = $ 5051

The time period of investment = 9 years

Let The rate of interest = R % compounded quarterly

The Amount gets double

So, From Compounded method

Amount = Principal ×[tex](1+\dfrac{rate}{4\times 100})^{4\times Time}[/tex]

Or, 2 × P = P × ( 1 + [tex]\dfrac{\textrm R}{400})^{\textrm 36}[/tex]

Or, 2 = ( 1 + [tex]\dfrac{\textrm R}{400})^{\textrm 36}[/tex]

Or, [tex]2^{\frac{1}{36}}[/tex] = 1 + [tex]\dfrac{\textrm R}{400}[/tex]

or, 1.01944 - 1 = [tex]\dfrac{\textrm R}{400}[/tex]

or, 0.01944 = [tex]\dfrac{\textrm R}{400}[/tex]

∴ R = 0.01944 × 400 = 7.776

Hence The rate at which the investment gets double is 7.776 Answer