To determine if a point is a solution to the inequality \( y \leq 4x + 5 \), you can substitute the coordinates of the point into the inequality and check if it holds true.
For example, let's consider the point \( (1, 3) \):
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Substitute \( x = 1 \) into the inequality: \[ y \leq 4(1) + 5 \] \[ y \leq 4 + 5 \] \[ y \leq 9 \]
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Now substitute \( y = 3 \): \[ 3 \leq 9 \]
This is true, so the point \( (1, 3) \) is a solution to the inequality.
You can repeat this process with other points to verify if they satisfy the inequality. If you have specific points in mind, feel free to share them, and I can help you evaluate whether they are solutions.