Question
Mick is trying to determine whether the following two lines are parallel.
y=23x+7
𝑦
=
2
3
𝑥
+
7
y=23x−2
𝑦
=
2
3
𝑥
−
2
Which statement correctly describes the approach Mick should take based on the best reasoning?
Statement #1: Mick says he should verify that the lines have the same slope but different y-intercepts.
Statement #2: Mick says he should verify that the lines have the same y-intercepts but different slope
y=23x+7
𝑦
=
2
3
𝑥
+
7
y=23x−2
𝑦
=
2
3
𝑥
−
2
Which statement correctly describes the approach Mick should take based on the best reasoning?
Statement #1: Mick says he should verify that the lines have the same slope but different y-intercepts.
Statement #2: Mick says he should verify that the lines have the same y-intercepts but different slope
Answers
GPT-4o mini
To determine whether two lines are parallel, you need to check their slopes. Lines are considered parallel if they have the same slope and different y-intercepts.
Looking at the given equations:
1. **First pair of lines:**
- \( y = \frac{2}{3}x + 7 \)
- \( y = \frac{2}{3}x - 2 \)
- Both lines have the same slope of \(\frac{2}{3}\) but different y-intercepts (7 and -2). Therefore, these lines are parallel.
2. **Second pair of lines:**
- \( y = 23x + 7 \)
- \( y = 23x - 2 \)
- Both lines have the same slope of 23 but different y-intercepts (7 and -2). Therefore, these lines are also parallel.
Given these analyses, the correct approach for Mick should be:
**Statement #1**: Mick says he should verify that the lines have the same slope but different y-intercepts.
This statement accurately describes the condition needed to determine that two lines are parallel. Thus, Statement #1 is the correct choice.
Looking at the given equations:
1. **First pair of lines:**
- \( y = \frac{2}{3}x + 7 \)
- \( y = \frac{2}{3}x - 2 \)
- Both lines have the same slope of \(\frac{2}{3}\) but different y-intercepts (7 and -2). Therefore, these lines are parallel.
2. **Second pair of lines:**
- \( y = 23x + 7 \)
- \( y = 23x - 2 \)
- Both lines have the same slope of 23 but different y-intercepts (7 and -2). Therefore, these lines are also parallel.
Given these analyses, the correct approach for Mick should be:
**Statement #1**: Mick says he should verify that the lines have the same slope but different y-intercepts.
This statement accurately describes the condition needed to determine that two lines are parallel. Thus, Statement #1 is the correct choice.