Question:
If the coefficients of $x^7$ and $x^8$ in $\left( 2 + \frac{x}{3} \right)^n$ are equal, then n is
If the coefficients of $x^7$ and $x^8$ in $\left( 2 + \frac{x}{3} \right)^n$ are equal, then n is
Updated On: Jul 6, 2022
- 56
- 55
- 49
- 50
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The Correct Option is B
Solution and Explanation
Since $T_{r+1} =^{n}C_{r} a^{n-r}x^{r}$ in expansion of $ \left(a+x\right)^{n}$
$ T_{8} = {^{n}C_{7}} \left(2\right)^{n-7} \left(\frac{x}{3}\right)^{7} = {^{n}C_{7}} \frac{2^{n-7}}{3^{7}} x^{7}$
and $ T_{9} = {^{n}C_{8}} \left(2\right)^{n-8} \left(\frac{x}{3}\right)^{8} = {^{n}C_{8}} \frac{2^{n-8}}{3^{8}} x^{8}$
Therefore, $ {^{n}C_{7}} \frac{2^{n-7}}{3^{7} } = {^{n}C_{8}} \frac{2^{n-8}}{3^{8}}$
(since it is given that coefficient of $x^7$ = coefficient $x^8$)
$ \Rightarrow \frac{n!}{7! \left(n-7\right)!} \times \frac{8! \left(n-8\right)!}{n!} = \frac{2^{n-8}}{3^{8}} . \frac{3^{7}}{2^{n-7}}$
$ \Rightarrow \frac{8}{n-7} = \frac{1}{6} \Rightarrow n = 55 $
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Concepts Used:
Binomial Theorem
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
Properties of Binomial Theorem
- The number of coefficients in the binomial expansion of (x + y)n is equal to (n + 1).
- There are (n+1) terms in the expansion of (x+y)n.
- The first and the last terms are xn and 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.
- The binomial coefficients in the expansion are arranged in an array, which is called Pascal's triangle. This pattern developed is summed up by the binomial theorem formula.