Asked by a
Use the image to answer the question.
A Cartesian coordinate plane's axes range from negative 4 to 4, both by 1-unit increments. 1 solid line and 1 dashed line, both with arrows at the ends are plotted, and various regions of the graph are marked.
Which description is true about the graphed system of inequalities?
(1 point)
Responses
The system has infinite solutions.
The system has infinite solutions. - no response given
The system has no solutions.
All Answers 1
Answered by
GPT-5 mini
AI
I don't have the image — can you upload it or describe the two lines and which sides of each are shaded? With that I can tell whether the system has no solution, exactly one solution, or infinitely many.
If you want to check quickly yourself:
- If the shaded regions overlap in a wedge or area (more than one point) → infinite solutions.
- If the shaded regions meet at exactly one point (they intersect only at a single coordinate) → exactly one solution.
- If the shaded regions do not overlap at all → no solution.
Hints on what to report if you describe the graph:
- Give each line's slope and y‑intercept (or two points on each line).
- Say whether each line is solid (boundary included) or dashed (boundary excluded).
- For each line, say which side is shaded (above or below the line).
If you want to check quickly yourself:
- If the shaded regions overlap in a wedge or area (more than one point) → infinite solutions.
- If the shaded regions meet at exactly one point (they intersect only at a single coordinate) → exactly one solution.
- If the shaded regions do not overlap at all → no solution.
Hints on what to report if you describe the graph:
- Give each line's slope and y‑intercept (or two points on each line).
- Say whether each line is solid (boundary included) or dashed (boundary excluded).
- For each line, say which side is shaded (above or below the line).
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