Neema had a recurring deposit account in a bank and deposited ₹ 600 per month for 2(1/2) years. If the rate of interest was 10% per annum, find the maturity value of this account.

Mathematics

Neema had a recurring deposit account in a bank and deposited ₹ 600 per month for $2\dfrac{1}{2}$ years. If the rate of interest was 10% per annum, find the maturity value of this account.

Banking

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Answer

Given,

P = ₹600

n = $2\dfrac{1}{2}$ years = 2.5 years = 24 months + 6 months = 30 months

r = 10%

I = $P \times \dfrac{n(n+1)}{2 \times 12} \times \dfrac{r}{100}$

$\therefore I = 600\times \dfrac{30\times 31}{2 \times 12} \times \dfrac{10}{100} \\[1em] I = 600 \times \dfrac{930}{24} \times 0.1 \\[1em] I = 600 \times 38.75 \times 0.1 \\[1em] I = ₹2,325$

Sum deposited = ₹600 x 30 = ₹18,000

Maturity value = Sum deposited + Interest = ₹18,000 + ₹2,325 = ₹20,325

Hence, Neema got ₹20,325 at the time of maturity.

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Mathematics

Neema had a recurring deposit account in a bank and deposited ₹ 600 per month for $2\dfrac{1}{2}$ years. If the rate of interest was 10% per annum, find the maturity value of this account.

Banking

Answer

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