Use the graph to answer the following questions. You are helping to plan a community garden. Sprinklers need to be set up at each end of the garden plot for irrigation, plus one more at the midpoint. Question Which equation correctly solves for distance in this situation? (1 point) Responses Image with alt text: d equals start root left parenthesis 5 minus 1 right parenthesis squared plus left parenthesis 0 minus 5 right parenthesis squared end root line break equals start root left parenthesis 4 right parenthesis squared plus left parenthesis negative 5 right parenthesis squared end root Image with alt text: d equals start root left parenthesis 0 minus 5 right parenthesis squared times left parenthesis 5 minus 1 right parenthesis squared line break equals start root left parenthesis negative 5 right parenthesis squared times left parenthesis 4 right parenthesis squared Image with alt text: d equals start root left parenthesis 0 minus 5 right parenthesis squared minus left parenthesis 5 minus 1 right parenthesis squared end root line break equals start root left parenthesis negative 5 right parenthesis squared minus left parenthesis 4 right parenthesis squared end root
The correct equation that solves for distance in this situation is:
d = √((5 - 1)² + (0 - 5)²)
This equation calculates the distance between two points using the distance formula, which is √((x₂ - x₁)² + (y₂ - y₁)²). In this situation, the x-coordinates represent the endpoints of the garden plot and the y-coordinates represent the sprinkler locations.