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<1/2x
and y>1/3x+3
?
(1 point)
Responses
(25,12)
left parenthesis 25 comma 12 right parenthesis
(3,6)
left parenthesis 3 comma 6 right parenthesis
(2,2)
left parenthesis 2 comma 2 right parenthesis
(10,5)
left parenthesis 10 comma 5 right parenthesis
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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<1/2x
and y>1/3x+3
?
(1 point)
Responses
(25,12)
left parenthesis 25 comma 12 right parenthesis
(3,6)
left parenthesis 3 comma 6 right parenthesis
(2,2)
left parenthesis 2 comma 2 right parenthesis
(10,5)
left parenthesis 10 comma 5 right parenthesis
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Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine which point is a solution to the simultaneous inequalities \( y < \frac{1}{2}x \) and \( y > \frac{1}{3}x + 3 \), let's assess each option one by one.
1. **For the inequality \( y < \frac{1}{2}x \):**
- This line has a slope of \(\frac{1}{2}\) and y-intercept 0. Points below this line satisfy the inequality.
2. **For the inequality \( y > \frac{1}{3}x + 3 \):**
- This line has a slope of \(\frac{1}{3}\) and y-intercept 3. Points above this line satisfy the inequality.
Now, let's evaluate each point:
1. **(25,12):**
- \( y < \frac{1}{2}(25) = 12.5 \) → \( 12 < 12.5 \) (True)
- \( y > \frac{1}{3}(25) + 3 = \frac{25}{3} + 3 \approx 8.33 + 3 = 11.33 \) → \( 12 > 11.33 \) (True)
- This point satisfies both inequalities.
2. **(3,6):**
- \( y < \frac{1}{2}(3) = 1.5 \) → \( 6 < 1.5 \) (False)
- This point does not satisfy the first inequality.
3. **(2,2):**
- \( y < \frac{1}{2}(2) = 1 \) → \( 2 < 1 \) (False)
- This point does not satisfy the first inequality.
4. **(10,5):**
- \( y < \frac{1}{2}(10) = 5 \) → \( 5 < 5 \) (False)
- This point does not satisfy the first inequality.
Given this analysis, the only point that satisfies both inequalities is:
**(25,12)**
1. **For the inequality \( y < \frac{1}{2}x \):**
- This line has a slope of \(\frac{1}{2}\) and y-intercept 0. Points below this line satisfy the inequality.
2. **For the inequality \( y > \frac{1}{3}x + 3 \):**
- This line has a slope of \(\frac{1}{3}\) and y-intercept 3. Points above this line satisfy the inequality.
Now, let's evaluate each point:
1. **(25,12):**
- \( y < \frac{1}{2}(25) = 12.5 \) → \( 12 < 12.5 \) (True)
- \( y > \frac{1}{3}(25) + 3 = \frac{25}{3} + 3 \approx 8.33 + 3 = 11.33 \) → \( 12 > 11.33 \) (True)
- This point satisfies both inequalities.
2. **(3,6):**
- \( y < \frac{1}{2}(3) = 1.5 \) → \( 6 < 1.5 \) (False)
- This point does not satisfy the first inequality.
3. **(2,2):**
- \( y < \frac{1}{2}(2) = 1 \) → \( 2 < 1 \) (False)
- This point does not satisfy the first inequality.
4. **(10,5):**
- \( y < \frac{1}{2}(10) = 5 \) → \( 5 < 5 \) (False)
- This point does not satisfy the first inequality.
Given this analysis, the only point that satisfies both inequalities is:
**(25,12)**
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