Answer: 4,85 meters
Step-by-step explanation:
Using energy we get the velocity when the man gets to the bottom of the hill
mgh=1/2 m v^2
Then the velocity is the squareroot of two times the mass times the gravity constant =9,598 m/s2
Using energy again, we can get the velocity on the edge of the ledge (using the second mass, the one of the man plus the backpack)
1/2 M1 V1^2=1/2 M2 V2^2
We get V2=8,24 m/s2
Then we have to analyze the jump, horizontally, with constant velocity, and vertically, with constant acceleration equals to the gravity constant.
To get the time we analyze the vertical move
Y=1/2 g t^2
t=59 seconds
To get the horizontal distance we use
X= v t
X=4,85 meters.
