A farmer moves along the boundry of square field of side 10m in 40s. What will be the magnitude of the displacement of the farmer at the end of 2 minutes and 20 second
Answers
Answer:Side of the square = 10 m
Perimeter of the square = 4×10 = 40 m
He completes 1 round in 40 s.
So, speed = 40/40 = 1 m/s
So, distance covered in 2 min 20 s or 140 s is = 140 × 1 = 140 m
Number of rounds of the square completed in moving through 140 m is = 140/40 = 3.5
In 3 rounds the displacement is zero. In 0.5 round the farmer reaches the diagonally opposite end of the square from his starting point.
Displacement = AC = (AB2 + BC2)1/2 = (100+100)1/2 = 10?2 m
Explanation:
Answer:
Explanation:
Here, Side of the given square field = 10m
so, perimeter of a square = 4*side = 10 m * 4 = 40 m
Farmer takes 40 s to move along the boundary.
Displacement after 2 minutes 20 s = 2 * 60 s + 20 s = 140 seconds
since in 40 s farmer moves 40 m
Therefore, in 1s the distance covered by farmer = 40 / 40 m = 1m
Therefore, in 140s distance covered by farmer = 1 � 140 m = 140 m. Now, number of rotation to cover 140 along the boundary= Total Distance / Perimeter
= 140 m / 40 m = 3.5 round
Thus, after 3.5 round farmer will at point C of the field.
Thus, after 2 min 20 seconds the displacement of farmer will be equal to 14.14 m north east from initial position.