To multiply the polynomials \( (b + 8)(3b - 6) \), we can use the distributive property (also known as the FOIL method for binomials).
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First: Multiply the first terms: \[ b \cdot 3b = 3b^2 \]
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Outer: Multiply the outer terms: \[ b \cdot (-6) = -6b \]
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Inner: Multiply the inner terms: \[ 8 \cdot 3b = 24b \]
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Last: Multiply the last terms: \[ 8 \cdot (-6) = -48 \]
Now, combine all these results: \[ 3b^2 - 6b + 24b - 48 \]
Combine like terms (\(-6b + 24b\)): \[ 3b^2 + 18b - 48 \]
So the simplified form of the polynomial \( (b + 8)(3b - 6) \) is: \[ \boxed{3b^2 + 18b - 48} \]
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