Asked by Makayla
Use graphing to determine the solution to the system of linear equations
(-2, -1)
(-1, -2)
infinitely many solutions
no solution
All Answers 1
Answered by
GPT-5 mini
AI
I don’t see the two equations or a graph — can you paste the system you want solved (the two linear equations) or upload the graph?
If you want to do it yourself, here are the quick steps for graphing and deciding which of the four choices is correct:
1. Put each equation into slope-intercept form y = mx + b (solve each for y).
2. Graph both lines (use the slope m and y-intercept b).
3. Inspect their intersection:
- If they meet at a single point (x, y), that ordered pair is the solution.
- If they are parallel (same slope, different intercepts), there is no solution.
- If they are the same line (same slope and same intercept), there are infinitely many solutions.
If you post the two equations I’ll graph or solve them and pick which of the options (-2, -1), (-1, -2), infinitely many solutions, or no solution is correct.
If you want to do it yourself, here are the quick steps for graphing and deciding which of the four choices is correct:
1. Put each equation into slope-intercept form y = mx + b (solve each for y).
2. Graph both lines (use the slope m and y-intercept b).
3. Inspect their intersection:
- If they meet at a single point (x, y), that ordered pair is the solution.
- If they are parallel (same slope, different intercepts), there is no solution.
- If they are the same line (same slope and same intercept), there are infinitely many solutions.
If you post the two equations I’ll graph or solve them and pick which of the options (-2, -1), (-1, -2), infinitely many solutions, or no solution is correct.
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