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2. (a) Given the vectors \( p=\binom{m+3}{2-n}, \mathbf{q}=\binom{3 m-1}{n-8} \) and \( p=q \), find the values of \( m \) and \( n \).

Ask by Park French. in Ghana
Feb 13,2025

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\( m = 2 \) and \( n = 5 \).

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To solve the equation \( p=q \), we equate the corresponding components of the vectors \( p \) and \( \mathbf{q} \): 1. From the first component, we have: \[ m + 3 = 3m - 1 \] Rearranging gives: \[ 3 + 1 = 3m - m \implies 4 = 2m \implies m = 2 \] 2. From the second component, we have: \[ 2 - n = n - 8 \] Rearranging gives: \[ 2 + 8 = n + n \implies 10 = 2n \implies n = 5 \] Thus, the values are \( m = 2 \) and \( n = 5 \).

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