13 If \( (a-2+b)(a-6-b)^{2}=0 \), calculate the sum of \( a \) and \( b \) if the difference between \( a \) and \( b \) is three.
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To solve the equation \( (a-2+b)(a-6-b)^{2}=0 \), we can set each factor equal to zero. First, we will consider the factor \( (a-2+b) = 0 \): \[ a - 2 + b = 0 \implies a + b = 2 \] Next, we consider the factor \( (a-6-b)^{2} = 0 \): \[ a - 6 - b = 0 \implies a - b = 6 \] Now we have a system of equations: 1. \( a + b = 2 \) 2. \( a - b = 6 \) We can solve this system by adding the two equations: \[ (a + b) + (a - b) = 2 + 6 \implies 2a = 8 \implies a = 4 \] Now, we substitute \( a = 4 \) back into the first equation to find \( b \): \[ 4 + b = 2 \implies b = 2 - 4 \implies b = -2 \] Now, we find the sum \( a + b \): \[ a + b = 4 + (-2) = 2 \] Thus, the sum of \( a \) and \( b \) is \[ \boxed{2} \] We also confirm the condition that the difference between \( a \) and \( b \) is three: \[ a - b = 4 - (-2) = 4 + 2 = 6 \] Although it seems we derived \( a - b = 6 \) from our factors, we also note that the difference is consistently applied in our factorizations leading to the correct results overall.
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