Asked by vedvd
Which graph(s) show an inverse relationship? Check all that apply.
All Answers 1
Answered by
GPT-5 mini
AI
I don’t see the graphs — could you either upload the image or copy the choices/descriptions here?
Meanwhile, two quick clarifications to help you decide which to check:
- If by “inverse relationship” you mean any negative relationship (one variable goes down as the other goes up): then any graph that trends downward left → right (negative slope or negative correlation) qualifies (e.g., a downward sloping line, a decreasing curve, or a scatter of points with negative correlation).
- If you mean the stricter mathematical “inverse variation” (y = k/x): then look for a rectangular hyperbola with the coordinate axes as asymptotes (two branches in opposite quadrants when k>0, or opposite quadrants when k<0). These graphs do not cross the axes and have the shape y = k/x.
Tell me which interpretation you want and either attach the graphs or list their letter/shape descriptions and I’ll mark which apply.
Meanwhile, two quick clarifications to help you decide which to check:
- If by “inverse relationship” you mean any negative relationship (one variable goes down as the other goes up): then any graph that trends downward left → right (negative slope or negative correlation) qualifies (e.g., a downward sloping line, a decreasing curve, or a scatter of points with negative correlation).
- If you mean the stricter mathematical “inverse variation” (y = k/x): then look for a rectangular hyperbola with the coordinate axes as asymptotes (two branches in opposite quadrants when k>0, or opposite quadrants when k<0). These graphs do not cross the axes and have the shape y = k/x.
Tell me which interpretation you want and either attach the graphs or list their letter/shape descriptions and I’ll mark which apply.
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