To determine which of the given points is part of the solution set for the inequality \( y \geq 3x - 1 \), we'll evaluate each point by substituting the \( x \) coordinate into the inequality and checking if the \( y \) coordinate satisfies it.
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For the point \( (-1, -5) \): \[ y \geq 3x - 1 \ -5 \geq 3(-1) - 1 \ -5 \geq -3 - 1 \ -5 \geq -4 \quad \text{(False)} \]
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For the point \( (2, 5) \): \[ y \geq 3x - 1 \ 5 \geq 3(2) - 1 \ 5 \geq 6 - 1 \ 5 \geq 5 \quad \text{(True)} \]
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For the point \( (-2.5, -9) \): \[ y \geq 3x - 1 \ -9 \geq 3(-2.5) - 1 \ -9 \geq -7.5 - 1 \ -9 \geq -8.5 \quad \text{(False)} \]
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For the point \( (1, 1) \): \[ y \geq 3x - 1 \ 1 \geq 3(1) - 1 \ 1 \geq 3 - 1 \ 1 \geq 2 \quad \text{(False)} \]
The only point that satisfies the inequality \( y \geq 3x - 1 \) is \( (2, 5) \).
So, the point that is part of the solution set for the inequality is (2, 5).
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