Question
rite the equations for the system of linear equations graphed.
(1 point)
The equation of the solid line is y=
y
=
, and the equation of the dotted line is y=
y
=
.the solid line has no points but the dotted line has 0,0
(1 point)
The equation of the solid line is y=
y
=
, and the equation of the dotted line is y=
y
=
.the solid line has no points but the dotted line has 0,0
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To write the equations for the system of linear equations based on your description, we need to clarify a few things:
1. **Solid Line Equation**: The solid line doesn't have any intersection points with the dotted line in the graph you mentioned. We will represent its equation as \(y = mx + b\), where \(m\) is the slope and \(b\) is the y-intercept. However, you have not provided specific details about the slope or y-intercept.
2. **Dotted Line Equation**: The dotted line has a specific point (0,0), which means it passes through the origin. We can represent its equation as \(y = mx\). Again, you need to provide the value of \(m\) (the slope) for us to complete this equation.
To summarize, without specific numerical values for the slopes and y-intercepts:
- Solid line: \(y = m_1x + b_1\) (where \(m_1\) and \(b_1\) need to be specified).
- Dotted line: \(y = m_2x\) (where \(m_2\) also needs to be specified).
If you provide the slopes and y-intercepts or any points through which the lines pass, I can help generate the exact equations for you!
1. **Solid Line Equation**: The solid line doesn't have any intersection points with the dotted line in the graph you mentioned. We will represent its equation as \(y = mx + b\), where \(m\) is the slope and \(b\) is the y-intercept. However, you have not provided specific details about the slope or y-intercept.
2. **Dotted Line Equation**: The dotted line has a specific point (0,0), which means it passes through the origin. We can represent its equation as \(y = mx\). Again, you need to provide the value of \(m\) (the slope) for us to complete this equation.
To summarize, without specific numerical values for the slopes and y-intercepts:
- Solid line: \(y = m_1x + b_1\) (where \(m_1\) and \(b_1\) need to be specified).
- Dotted line: \(y = m_2x\) (where \(m_2\) also needs to be specified).
If you provide the slopes and y-intercepts or any points through which the lines pass, I can help generate the exact equations for you!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.