To find the initial speed at which the rock was thrown, we can use the principles of projectile motion. Since the rock was thrown horizontally, its initial vertical velocity component is zero. The only force acting on the rock is gravity, which causes it to accelerate downward.
The horizontal distance traveled by the rock, d=90.0 md = 90.0 , ext{m}d=90.0m, is the result of the horizontal velocity vxv_xvx and the time of flight ttt of the rock.
We can calculate the time of flight using the vertical motion of the rock. The vertical distance traveled by the rock, h=100.0 mh = 100.0 , ext{m}h=100.0m, can be used to find the time of flight. We'll use the equation:
h=12gt2h = frac{1}{2} g t^2h=21gt2
Where:
- hhh is the vertical distance traveled (100.0 m)
- ggg is the acceleration due to gravity (approximately 9.8 m/s²)
- ttt is the time of flight (unknown)
Rearranging the equation to solve for ttt:
t=2hgt = sqrt{frac{2h}{g}}t=g2h
Substituting the given values:
t=2⋅100.0 m9.8 m/s2t = sqrt{frac{2 cdot 100.0 , ext{m}}{9.8 , ext{m/s}^2}}t=<span class="m