Let \(n \in N\) and \([x]\) denote the greatest integer less than or equal to \(x\). If the sum ....

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Let \(n \in N\) and \([x]\) denote the greatest integer less than or equal to \(x\). If the sum of \((n+1)\) terms \({ }^n C_0, 3 .{ }^n C_1, 5 .{ }^n C_2, 7 .{ }^n C_3, \ldots\) is equal to \(2^{100} .101\), then \(2\left[\frac{n-1}{2}\right]\) is equal to πŸ“²PW App Link - https://bit.ly/YTAI_PWAP 🌐PW Website - https://www.pw.live



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