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I invest 10000$ every month for 15 year I want to know how much money I will get after 15 years if I have 10% interest compounded annually.Any formula to find this.Whats the amount i will receive at the end of 15th year including interest?

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It looks like you're investing some amount $T$ annually, and compounding once at the end of the year with an interest rate $r$. You'd like to find the value $v_n$ after the n$^\text{th}$ year, given that $v_{n+1} = (v_n + T)(1+r)$, and that $v_1 = T(1+r)$ (as there's no initial 0$^\text{th}$ month investment).

This guy's not so hard to solve by looking for patterns: $ v_{n+1} = v_1 (1+r)^n + T \sum_{k=1}^n (1+r)^k = T \frac{1+r}{r}\left((1+r)^{n+1}-1\right) ~~. $ The amount invested annually is $12\times\$10000$, the annual rate is $0.1$, and the number of years (above $n+1$) is $15$, so the value of the investment will be ...

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This link contains a lot about compound interest starting with basics.. http://www.math.hawaii.edu/~ramsey/CompoundInterest.html