The equation that correctly solves for distance in this situation is:
d = √(5-1)² + (0-5)²
This equation represents the distance between points J (1,5) and K (5,0) on a Cartesian plane using the formula for the distance between two points in a coordinate system.
Community garden. Sprinklers
need to be set up at each end
of the garden plot for irrigation,
plus one more at the midpoint.
-2 -1
6A
5
4
3
2
1
0
-1
01 2 3
J = (1,5)
(1 point)
4
K=(5,0)
6 7
III
Which equation correctly
solves for distance in this
situation?
5
d =
d =
= √(5-1)² + (0-5)²
= √(4)² + (−5)²
d = √(0-5)² x (5-1)²
= √√(-5)² × (4)²
d = √√(0-5)²-(5-1)²
= √√(-5)² – (4)²
(5-1)+(0-5)
1 answer