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9 June, 01:34

Kevin opened a savings account with Texas National Bank. His account has an APR of 1.95% compounded quarterly. If Kevin opens his account with $2100, how long will it take for the account to earn $10500?

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  1. 9 June, 02:03
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    82 years and 3 quarters

    Step-by-step explanation:

    A = P (1 + r / n) ⁿˣ

    P = Principal amount

    r = Annual interest rate

    n = Number of compounds per year

    x = time in years

    A = Amount after time 'x'

    10500 = 2100 (1 + 0.0195 / 4) ⁴ˣ

    Divide the whole equation by 2100

    10500 / 2100 = ({2100 (1 + 0.004875) } / 2100) ⁴ˣ

    5 = (1.004875) ⁴ˣ

    Taking Natural logarithm (㏑) on both sides

    ㏑ 5 = ㏑ (1.004875) ⁴ˣ

    ㏑ 5 = 4x ㏑ (1.004875)

    1.6094 = 4x (0.004863)

    1.6094 = 0.01945x

    x = 82.75

    So, If compounded quarterly at an APR of 1.95% the amount deposited in savings account of $2100 will accumulate to $10500 in 82 years and 3 quarters.
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