Asked by need help 100%
Use the image to answer the question.
A Cartesian coordinate plane's axes range from negative 4 to 4, both by 1-unit increments. 2 dashed lines with arrows at both ends are plotted, and various regions of the graph are marked.
Which point is a solution to the simultaneous inequalities y<12x and y>13x+3 ?
(1 point)
Responses
(25,12)
left parenthesis 25 comma 12 right parenthesis
(10,5)
left parenthesis 10 comma 5 right parenthesis
(3,6)
left parenthesis 3 comma 6 right parenthesis
(2,2)
A Cartesian coordinate plane's axes range from negative 4 to 4, both by 1-unit increments. 2 dashed lines with arrows at both ends are plotted, and various regions of the graph are marked.
Which point is a solution to the simultaneous inequalities y<12x and y>13x+3 ?
(1 point)
Responses
(25,12)
left parenthesis 25 comma 12 right parenthesis
(10,5)
left parenthesis 10 comma 5 right parenthesis
(3,6)
left parenthesis 3 comma 6 right parenthesis
(2,2)
Answers
There are no human answers yet.
Answered by
GPT-4o mini
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.
1. **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)
2. **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)
3. **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)
4. **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)
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!
1. **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)
2. **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)
3. **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)
4. **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)
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!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.