JEE Mains · Maths · STD 11 - 7. binomial theoram
Let the smallest value of \(k \in \mathbb{N}\), for which the coefficient of \(x^3\) in \((1+x)^3 + (1+x)^4 + (1+x)^5 + \ldots + (1+x)^{99} + (1+kx)^{100}\), \(x \neq 0\), is \(\left(43n + \dfrac{101}{4}\right)\left(^{100}C_3\right)\) for some \(n \in \mathbb{N}\), be \(p\). Then the value of \(p + n\) is:
- A \(10\)
- B \(11\)
- C \(12\)
- D \(13\)
Answer & Solution
Correct Answer
(B) \(11\)
Step-by-step Solution
Detailed explanation
The coefficient of \(x^3\) in the given expression is the sum of the coefficients of \(x^3\) in each term. The coefficient of \(x^3\) in \(\sum_{r=3}^{99} (1+x)^r + (1+kx)^{100}\) is: \(\sum_{r=3}^{99} {}^{r}C_3 + k^3 {}^{100}C_3\) Using the identity…
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