If $a_r$ is the coefficient of $x^{10-r}$ in the Binomial expansion of $(1+x)^{10}$, then $\displaystyle\sum_{r=1}^{10} r^3\left(\frac{a_r}{a_{r-1}}\right)^2$ is equal to

Updated On: Jun 23, 2024

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a_{r} =^{10} C_{10 - r} =^{10} C_{r}

? r = 1 ? 10 r^{3} (\frac{^{10} C _{r}}{^{10} C _{r - 1}})^{2} = r = 1 ? 10 r^{3} (\frac{11 - r}{r})^{2} = r = 1 ? 10 r (11 - r)^{2}

= r = 1 ? 10 (121 r + r^{3} - 22 r^{2}) = 1210

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The binomial theorem formula is used in the expansion of any power of a binomial in the form of a series. The binomial theorem formula is

The number of coefficients in the binomial expansion of (x + y)ⁿ is equal to (n + 1).
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The first and the last terms are xⁿand yⁿ respectively.
From the beginning of the expansion, the powers of x, decrease from n up to 0, and the powers of a, increase from 0 up to n.
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