If a1,a2, a3, a4 be the coefficient of f...

If `a_1,a_2, a_3, a_4` be the coefficient of four consecutive terms in the expansion of `(1+x)^n ,` then prove that: `(a_1)/(a_1+a_2)+(a_3)/(a_3+a_4)=(2a_2)/(a_2+a_3)dot`

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To prove the given statement, we start by identifying the coefficients of the four consecutive terms in the binomial expansion of \((1+x)^n\). ### Step 1: Identify the coefficients The coefficients of the four consecutive terms can be represented as: - \(a_1 = \binom{n}{r}\) - \(a_2 = \binom{n}{r+1}\) - \(a_3 = \binom{n}{r+2}\) - \(a_4 = \binom{n}{r+3}\) ...

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