Answer:
Option B, 93 cm
Explanation:
An diagram of the seed's motion is attached to this solution.
This is very close to a projectile motion question. And the quantity to be calculated, how far along the grant a seed released would travel is called the Range.
And this would be obtained from the equations of motion,
First of, the height of the plant is related to some quantities of the motion with this relation.
H = u(y) t + 0.5g(t^2)
U(y) = initial vertical component of velocity = 0 m/s, H = height at which motion began, = 20cm = 0.2 m
That means t = √(2H/g)
The horizontal distance covered, R,
R = u(x) t + 0.5g(t^2) = u(x) t (the second part of the equation goes to zero as the vertical component of the acceleration of this motion is 0)
(substituting the t = √(2H/g) derived from above
R = u(x) √(2H/g)
Where u(x) = the initial horizontal component of the bomb's velocity = maximum initial speed, that is, 4.6 m/s, H = vertical height at which the seed was released = 20 cm = 0.2 m, g = acceleration due to gravity = 9.8 m/s2
R = 4.6 √(2×0.2/9.8) = 0.929 m = 0.93 m = 93 cm. Option B.
QED!
Answer:
The Correct answer is C
2.2m
Explanation:
The seeds launched obey a projectile motion.
Since it was launched from an height,
Rmax = (u/g)sqrt(u^2 + 2gH)
For seed1, u = 2.3m/s H = 20cm = 0.2m, g = 9.8m/s.
Rmax = (2.3/9.8)*sqrt(2.3^2 + 2*9.8*0.2)
Rmax = 0.701m
For seed2, u = 4.6m/s H = 20cm = 0.2m, g = 9.8m/s.
Rmax = (4.6/9.8)*sqrt(4.6^2 + 2*9.8*0.2)
Rmax = 2.205m
Therefore, the seed launched with maximum initial speed of 4.6m/s, will land at 2.2m from the plant.
