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1.1.3 Evaluate \( \sum_{P=1}^{n} T_{P} \)

Ask by Rose Montgomery. in South Africa
Mar 16,2025

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The sum \( \sum_{P=1}^{n} T_{P} \) evaluates to \( \frac{n(n+1)(n+2)}{6} \).

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To evaluate \( \sum_{P=1}^{n} T_{P} \), we first need to identify what \( T_P \) represents. If \( T_P \) is the \( P \)-th term in a specific sequence or series, we need its explicit formula. Assuming \( T_P \) is defined as \( T_P = P \) (the simple case where \( T_P \) represents consecutive positive integers), we can compute the sum as follows: \[ \sum_{P=1}^{n} T_{P} = \sum_{P=1}^{n} P = \frac{n(n+1)}{2} \] This formula arises from the well-known formula for the sum of the first \( n \) integers. If \( T_P \) is something else (like a quadratic, geometric, or arithmetic sequence), the summation would involve different techniques and formulas. Please provide clarity on what \( T_P \) stands for for a more tailored evaluation!

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