The proportional relationship between the cost of gasoline and the number of gallons of gasoline from Store A and Store B are displayed in the graphs. Use the graphs to interpret the store that has the cheaper cost of gasoline per gallon. (1 point) Responses Store B has the cheaper gasoline. The cost of gasoline at Store A is $100 per gallon. Store B has the cheaper gasoline. The cost of gasoline at Store A is $100 per gallon. Store B has the cheaper gasoline. The cost of gasoline is $3.50 per gallon. Store B has the cheaper gasoline. The cost of gasoline is $3.50 per gallon. Store B has the cheaper gasoline. The cost of gasoline at Store A is $5 per gallon. Store B has the cheaper gasoline. The cost of gasoline at Store A is $5 per gallon. Store A has the cheaper gasoline. The cost of gasoline is $0.25 per gallon.
Store B has the cheaper gasoline. The cost of gasoline at Store A is $5 per gallon, while the cost of gasoline at Store B is $3.50 per gallon.
Explain why the slope is positive or negative. (1 point) Responses The slope is positive because the line decreases as you move from left to right on the graph. The slope is positive because the line decreases as you move from left to right on the graph. The slope is negative because the line increases as you move from left to right on the graph. The slope is negative because the line increases as you move from left to right on the graph. The slope is negative because the line decreases as you move from left to right on the graph. The slope is negative because the line decreases as you move from left to right on the graph. The slope is positive because the line increases as you move from left to right on the graph. The slope is positive because the line increases as you move from left to right on the graph.
The slope is negative because the line decreases as you move from left to right on the graph.
