<< Chapter < Page Chapter >> Page >
Solving problems is an essential part of the understanding process.

Questions and their answers are presented here in the module text format as if it were an extension of the treatment of the topic. The idea is to provide a verbose explanation, detailing the application of theory. Solution presented is, therefore, treated as the part of the understanding process – not merely a Q/A session. The emphasis is to enforce ideas and concepts, which can not be completely absorbed unless they are put to real time situation.

Hints on solving problems

1: Identify projectile motion types. The possible variants are :

  • Projectile is thrown in horizontal direction. In this case, initial vertical component of velocity is zero. Consider horizontal direction as positive x-direction and vertically downward direction as positive y-direction.
  • Projectile is thrown above horizontal level. The projectile first goes up and then comes down below the level of projection
  • Projectile is thrown below horizontal level. Consider horizontal direction as positive x-direction and vertically downward direction as positive y-direction.

2: We can not use standard equations of time of flight, maximum height and horizontal range. We need to analyze the problem in vertical direction for time of flight and maximum height. Remember that determination of horizontal range will involve analysis in both vertical (for time of flight) and horizontal (for the horizontal range) directions.

3: However, if problem has information about motion in horizontal direction, then it is always advantageous to analyze motion in horizontal direction.

Representative problems and their solutions

We discuss problems, which highlight certain aspects of the study leading to the projectile motion types. The questions are categorized in terms of the characterizing features of the subject matter :

  • Time of flight
  • Range of flight
  • Initial velocity
  • Final velocity

Time of flight

Problem : A ball from a tower of height 30 m is projected down at an angle of 30° from the horizontal with a speed of 10 m/s. How long does ball take to reach the ground? (consider g = 10 m / s 2 )

Solution : Here, we consider a reference system whose origin coincides with the point of projection. Further, we consider that the downward direction is positive y - direction.

Projectile motion

Motion in vertical direction :

Here, u y = u sin θ = 10 sin 30 0 = 5 m / s ; y = 30 m ; . Using y = u y t + 1 2 a y t 2 , we have :

30 = 5 t + 1 2 10 t 2 t 2 + t - 6 = 0 t ( t + 3 ) - 2 ( t + 3 ) = 0 t = - 3 s or t = 2 s

Neglecting negative value of time, t = 2 s

Got questions? Get instant answers now!

Range of flight

Problem : A ball is thrown from a tower of height “h” in the horizontal direction at a speed “u”. Find the horizontal range of the projectile.

Solution : Here, we consider a reference system whose origin coincides with the point of projection. we consider that the downward direction is positive y - direction.

Projectile motion

x = R = u x T = u T

Motion in the vertical direction :

Here, u y = 0 and t = T (total time of flight)

h = 1 2 g T 2 T = ( 2 h g )

Putting expression of total time of flight in the expression for horizontal range, we have :

R = u ( 2 h g )

Got questions? Get instant answers now!

Get Jobilize Job Search Mobile App in your pocket Now!

Get it on Google Play Download on the App Store Now




Source:  OpenStax, Kinematics fundamentals. OpenStax CNX. Sep 28, 2008 Download for free at http://cnx.org/content/col10348/1.29
Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Kinematics fundamentals' conversation and receive update notifications?

Ask