In projectile motion, if you account for air resistance, which ball will travel faster? the plastic or a metal ball if they are the same size?
It will be same for both metal and plastic ball.
Beacuse drag force or force due to air resistance in projectile motion will depends on density of medium (air) and velocity of balls and some constant.
So all drag force does not depend on material property. So both will travel with same velocity.
In projectile motion, if you account for air resistance, which ball will travel faster? the plastic...
QUESTION 4 For the motion of a projectile with no air resistance. How does total flight time change if you double the mass of your projectile? The time of flight is doubled. The time of flight is halved. The time of flight is the same for both masses. The time of flight decreases proportionally to the inverse of the mass. QUESTION 5 Which of these quantities stay constant for the 2D motion of a projectile with no air resistance? Acceleration...
Ball 1 is thrown into the air and it follows the trajectory for projectile motion shown in the drawing. At the instant it is at the top of its trajectory, Ball 2 isdropped from rest at the same height. Which ball reaches the ground first?
For part (a) it is just Projectile motion w/o air resistance
which have been solved.
But i need help i with part b
b) Projectile motion with wind force but wlo air resistance (8%) Re-derive the math model adding in a wind force function, w(t), acting on the projectile during its trajectory. Considering an arbitrary w(t) that can be defined by the user, solve for the velocities using the RK4 numerical method in a program. Then, integrate numerically (eg. by...
Projectile Motion and Motion Diagrams 3.2 A ball rolls down a long ramp to a shoot where it is released as a projectile with an initial speed of 20 m/s at an angel of 42° above horizontal and 4.0 m above the ground. See diagram. BALL RAMP GROUND A. Draw a complete motiongrantee the motion of the ball from it leaving the shoot until reaching the ground. B What is the maximum height above pre ground reached by the ball?...
Assuming there is no air resistance, the horizontal velocity of an object in projectile motion is: A. Changing B. Constant C. Always zero, regardless of the initial horizontal velocity component
Use the model for projectile motion, assuming there is no air resistance and g = 32 feet per second per second. A baseball player at second base throws a ball 90 feet to the player at first base. The ball is released at a point 5 feet above the ground with an initial speed of 60 miles per hour and at an angle of 11° above the horizontal. At what height does the player at first base catch the ball? (Round...
2D Kinematics: Projectile Motion Two balls are thrown up in the air from the same level or floor as shown below in figure. Ball, A, is thrown up vertically in upward direction with velocity (v0). While Ball, B, is thrown up in projectile path with velocity (2v0) at an angle of 300 relative to horizontal axis. Determine which ball flies to the maximum height? Express your calculation in detail. 4
“Answer the following questions for projectile motion on level ground assuming negligible air resistance (the initial angle being neither nor ): (a) Is the acceleration ever zero? (b) When is the velocity a minimum? A Maximum? (c) Can the velocity ever be the same as the initial velocity at a time other than at t=0? (d) Can the speed ever be the same as the initial speed at a time other than at t=0?
Please help with Q1 a)b)c).
Question 1: In the lectures we considered simple projectile motion. Here we extend the description to include air resistance. For macroscopic objects in air, the dynamics equations including air resistance may be written V and ^- where m is the mass of the object, g is the acceleration due to gravity, y is the vertical direction, C is a dimensionless drag coefficient, A is the cross-sectional area of the object, pa 1.2kg/m3 is the density...
A volleyball is served overhand at an angle of 45 degrees from the horizontal at a speed of 9.8 m/s. Show that the ball will just barely make it over the net and just about 2 meters on the other side of the net (a very tough serve to receive). Use projectile motion and free-fall concepts to calculate.Here’s some HINTS:1) Find the Vx and Vy components of the volleyball’s intial motion2) Find the time it takes the ball to (horizontally)...