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Activity Number: 2.2
Activity Title: Projectile Motion
General Objective: Gain understanding of the concepts of motion in two-dimensions
Specific Objectives: (10 sessions)
1.1. Describe a projectile
1.2. Explain the motion of a projectile using coordinates
1.3. Differentiate semi-parabolic projectile from parabolic projectiles
1.4. Solve projectile problems using the principles of free-fall and the kinematical equations.
1.5. Cite applications of projectile motion.
Description:
This activity uses a demonstration-experiment on how projectile motion happens based on their understanding of acceleration and constant speed. Further explanation is given on motions in the text of the workbook to clarify further its meaning.
DIRECTION: Read the discussion, examples and fill-out the blanks on the tables given.
Projectile
| DEFINITION 2.2.1 missile or shell: an object that can be fired or launched by force. |
Projectile Motion
| DEFINITION 2.2.2 the motion or behavior exhibited by a projectile |
What objects exhibit projectile motion?
Projectile motion is exhibited by a body as it is propelled along its path. Below are illustrative examples of the motion of a projectile.
Anybody who has seen a ball shot in a basket in basketball games, or a football kicked such that it bounces up has seen a projectile in motion. All these motions are referred to as rectilinear motion or motion-in-two-dimensions. This motion happens to follow a parabolic trajectory. Due to the nature of forces acting on the object as it travels, the parabolic motion is the normal path of its travel. Examples of such motions besides thrown objects are shown below.
| Fig. 2.2.1 A welder cuts holes through a heavy metal construction beam with a hot torch. The sparks generated in the process follow parabolic paths. Parabolic paths are paths of projectiles |
| Fig. 2.2.2 Pyroclastic eruptions of volcanoes are streams of lava projected upwards. The lava trajectory follows a parabolic path characteristic of a projectile. |
Description of Motion
The motion of a projectile is best described in two separate equations. When a projectile is thrown, it must have two things in it: An initial velocity vi and an angle of projection θi. A third requirement is time, in order to fully plot the trajectory of the projectile.
| Fig. 2.2.3 |
These are as follows:
Motion along x-axis (along the ground)
Motion along y-axis (upward and downward motion)
Q1: Determine the x and y positions of a stone thrown 30˚ above the ground with an initial speed of 60 m/s. Use a separate sheet of bond paper to solve this problem.
Combining the motion of the two equations by eliminating the time t we come up with this typical x and y equation.
Q2. Derive the Equation 2.2.3 from 2.2.1 and 2.2.2. Use a separate sheet of paper to derive this.
Q3: A ball is thrown in such a way that its initial vertical and horizontal components of velocity are 40 m/s and 20 m/s, respectively. Estimate the total time of flight and the distance the ball is from its starting point when it lands. Use a separate sheet of paper to solve this.
Determining the Maximum Height and Maximum Range
Figure 2.2.4
A projectile fired from the origin at ti = 0 with an initial velocity vi. The maximum height of the projectile is h, and the horizontal range is R. At A, the peak of the trajectory, the particle has coordinates (R/2, h).
To obtain the maximum height of the projectile shown in Figure 2.2.4, we use this equation:
To obtain the maximum range (maximum horizontal displacement) of the projectile shown in Figure 2.2.4, we use this equation:
Q4: Derive the Equation 2.2.4 and 2.2.5 from Equation 2.2.3. Use a separate sheet to show this derivation.
Q5: A long-jumper leaves the ground at an angle of 20.0° above the horizontal and at a speed of 11.0 m/s. (a) How far does he jump in the horizontal direction? (Assume his motion is equivalent to that of a particle.) (b) What is the maximum height reached? Solve this on a separate sheet of paper.
A projectile fired from the origin with an initial speed of 50 m/s at various angles of projection.
Note that complementary values of θi result in the same value of x (range of the projectile).
Q6: Prove by calculation that the maximum range of an object thrown at 50 m/s is 45˚. Compare its ranges with that of 75˚, 60˚, 45˚, 30˚, 15˚. Solve this on a separate sheet of paper.
Figure 2.2.6
Q7: A stone is thrown from the top of a building upward at an angle of 30.0° to the horizontal and with an initial speed of 20.0 m/s, as shown in Figure 2.2.6. If the height of the building is 45.0 m, (a) how long is it before the stone hits the ground? Solve on a separate sheet of paper.
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