Answer:
a) The range of the leap is 5.80 m.
b) The time that the greyhound is in the air is 0.600 s
Step-by-step explanation:
The position of the greyhound is given by the position vector "r":
r =(x0 + v0 · t · cos α, y0 + v0 · t · sin α + 1/2 · g · t²)
Where:
r = position vector at time "t".
x0 = initial horizontal position.
v0 = initial horizontal velocity.
y0 = initial vertical position
t = time.
α = leap angle.
g = acceleration due to gravity (-9.8 m/s² considering the upward direction as positive).
a) At the end of the leap, the position vector will be "r final" (see figure). The vector r final could be written as:
r final = (x, 0 m)
Where "x" is the range.
Then, using the equation for the vertical position we can obtain the time of flight of the leap. With that time, we can calculate the range using the equation for the horizontal position.
Then:
y = y0 + v0 · t · sin α + 1/2 · g · t²
0 m = 0 m + 10.1 m/s · t · sin 16.9° - 1/2 · 9.8 m/s² · t²
0 m = t (10.1 m/s · sin 16.9° - 4.9 m/s² · t)
0 m = 10.1 m/s · sin 16.9° - 4.9 m/s² · t
- 10.1 m/s · sin 16.9° / - 4.9 m/s² = t
t = 0.600 s
The x-component of the vector "r final" will be:
x = x0 + v0 · t · cos α
x = 0 m + 10.1 m/s · 0.600 s · cos 16.9°
x = 5.80 m
The range of the leap is 5.80 m.
b) The time that the greyhound is in the air is 0.600 s. It was calculated above using the equation for the y-component of the vector "r final".