A hungry bunny rabbit hops 20 meters north and then turns and hops 8 meters west in search of tasty flowers to eat. what is the bunnys displacement
The bunny rabbit's displacement is the straight-line distance between its starting point and its ending point.
To find the displacement, we can use the Pythagorean theorem since the bunny rabbit hop 20 meters north and then 8 meters west.
The north and west directions form a right-angle triangle. The north distance is the vertical side, and the west distance is the horizontal side.
Using the Pythagorean theorem, we can calculate the displacement:
Displacement = √(20^2 + 8^2)
Displacement = √(400 + 64)
Displacement = √464
Displacement ≈ 21.54 meters
So, the bunny rabbit's displacement is approximately 21.54 meters.
To find the bunny's displacement, we need to determine the shortest straight-line distance between the starting point and the final point.
Using the Pythagorean theorem, we can calculate the displacement as follows:
Displacement = √((20)^2 + (8)^2)
= √(400 + 64)
= √464
≈ 21.54 meters
Therefore, the bunny's displacement is approximately 21.54 meters.
To calculate the displacement of the bunny, we need to determine the straight-line distance between its initial and final positions. We can use the Pythagorean theorem to find the displacement.
Firstly, let's represent the northward distance as positive and the westward distance as negative:
Northward distance = 20 meters (positive)
Westward distance = -8 meters (negative)
Now, we can calculate the displacement:
Displacement = √(Northward distance^2 + Westward distance^2)
Displacement = √(20^2 + (-8)^2)
Displacement = √(400 + 64)
Displacement = √464
Displacement ≈ 21.54 meters
Therefore, the bunny's displacement is approximately 21.54 meters.