To determine whether the point shown in the graph is a solution for the inequalities \( y > 6x - 4 \) and \( y \leq 3x + 2 \), we need to evaluate both inequalities at the coordinates of the point.
Let's break it down:
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For \( y > 6x - 4 \):
- Substitute the x and y coordinates of the point into the inequality.
- Check if the y-coordinate is greater than the value of \( 6x - 4 \).
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For \( y \leq 3x + 2 \):
- Similarly, substitute the x and y coordinates of the point into the inequality.
- Check if the y-coordinate is less than or equal to \( 3x + 2 \).
Without the actual coordinates of the point from the image, I can't perform the calculations directly.
- If the point satisfies both conditions (the first one being strict), then you would enter 1 (for yes).
- If the point does not satisfy both conditions, you would enter 2 (for no).
If you provide the coordinates of the point, I can help determine the correct answer!
1 answer