To determine which point is a solution to the simultaneous inequalities \( y < 12x \) and \( y > 13x + 3 \), we need to evaluate each point against both inequalities.
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Point (25, 12):
- For \( y < 12x \):
- \( 12 < 12(25) \)
- \( 12 < 300 \) (True)
- For \( y > 13x + 3 \):
- \( 12 > 13(25) + 3 \)
- \( 12 > 325 + 3 \)
- \( 12 > 328 \) (False)
- For \( y < 12x \):
-
Point (10, 5):
- For \( y < 12x \):
- \( 5 < 12(10) \)
- \( 5 < 120 \) (True)
- For \( y > 13x + 3 \):
- \( 5 > 13(10) + 3 \)
- \( 5 > 130 + 3 \)
- \( 5 > 133 \) (False)
- For \( y < 12x \):
-
Point (3, 6):
- For \( y < 12x \):
- \( 6 < 12(3) \)
- \( 6 < 36 \) (True)
- For \( y > 13x + 3 \):
- \( 6 > 13(3) + 3 \)
- \( 6 > 39 + 3 \)
- \( 6 > 42 \) (False)
- For \( y < 12x \):
-
Point (2, 2):
- For \( y < 12x \):
- \( 2 < 12(2) \)
- \( 2 < 24 \) (True)
- For \( y > 13x + 3 \):
- \( 2 > 13(2) + 3 \)
- \( 2 > 26 + 3 \)
- \( 2 > 29 \) (False)
- For \( y < 12x \):
None of the given points satisfy both inequalities simultaneously. If you are looking for a solution that fits both, a point would need to lie in the region defined by the intersection of the two inequalities. If you have any error or additional points to check, please provide that information!
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