An Estes toy rocket accelerates in a straight line direction from the ground at 34.0 m/s2, and at an angle of 51.0° above the horizontal while the engine is burning fuel. The rocket fuel burns out after 3.6 s and the rocket takes a projectile path to the ground.
Find its horizontal distance from the launch point to where it
hits the ground.
m
An Estes toy rocket accelerates in a straight line direction from the ground at 34.0 m/s2,...
An Estes toy rocket accelerates in a straight line direction from the ground at 31.0 m/s2, and at an angle of 51.0° above the horizontal while the engine is burning fuel. The rocket fuel burns out after 4.9 s and the rocket takes a projectile path to the ground. Find its horizontal distance from the launch point to where it hits the ground. (in meters please)
An Estes toy rocket accelerates in a straight line direction from the ground at 31.0 m/s2, and at an angle of 51.0° above the horizontal while the engine is burning fuel. The rocket fuel burns out after 4.9 s and the rocket takes a projectile path to the ground. Find its horizontal distance from the launch point to where it hits the ground. Answer in meters please.
An Estes toy rocket accelerates in a straight line direction from the ground at 32.0 m/s2, and at an angle of 54.0° above the horizontal while the engine is burning fuel. The rocket fuel burns out after 3.7 s and the rocket takes a projectile path to the ground. Find its horizontal distance from the launch point to where it hits the ground. (m)
An Estes toy rocket accelerates in a straight line direction from the ground at 27.0 m/s2, and at an angle of 53.0° above the horizontal while the engine is burning fuel. The rocket fuel burns out after 3.7 s and the rocket takes a projectile path to the ground. Find its horizontal distance from the launch point to where it hits the ground. in M
An Estes toy rocket accelerates in a straight line direction from the ground at 27.0 m/s2, and at an angle of 53.0° above the horizontal while the engine is burning fuel. The rocket fuel burns out after 3.7 s and the rocket takes a projectile path to the ground. Find its horizontal distance from the launch point to where it hits the ground.
A toy rocket is launched from rest at an angle of 43 degrees and follows a straight line path as long as the engine is burning. The engine burns for 9.4 seconds with an acceleration of 5.2 m/s^2. Once the engine turns off, the rocket is considered a projectile. How far from the launch point does the rocket land. Use the Kinematic Equations to solve the problem Xf=Xi+Vix(t)+1/2axt2 Vfx=Vix+axt Vfx2=Vix2+2ax (Xf -Xi)
A rocket, initially at rest on the ground, accelerates straight upward from rest with constant acceleration 49.0 m/s2 . The acceleration period lasts for time 7.00 s until the fuel is exhausted. After that, the rocket is in free fall. Find the maximum height ymax reached by the rocket. Ignore air resistance and assume a constant acceleration due to gravity equal to 9.80 m/s2 .
A rocket, initially at rest on the ground, accelerates straight upward from rest with constant acceleration 29.4m/s2 . The acceleration period lasts for time 9.00s until the fuel is exhausted. After that, the rocket is in free fall. Find the maximum height ymax reached by the rocket. Ignore air resistance and assume a constant acceleration due to gravity equal to 9.80 m/s2 . Write your answer numerically in units of meters.
A rocket, initially at rest on the ground, accelerates straight upward from rest with constant acceleration 53.9 m/s2m/s2 . The acceleration period lasts for time 8.00 ss until the fuel is exhausted. After that, the rocket is in free fall. Find the maximum height ymax reached by the rocket. Ignore air resistance and assume a constant acceleration due to gravity equal to 9.80 m/s2 . Write your answer numerically in units of meters.
A rocket, initially at rest on the ground, accelerates straight upward with constant net acceleration, from time t=0 until, at which time the fuel is exhausted. Neglect air resistance and assume that the rocket stays close enough to the ground that the acceleration due to gravity (after the rocket engine stops) is given by g. a) Find the maximum height, h, that the rocket reaches above the ground. b) Find the total time of flight, that the rocket is in...