Momentum of a Particle#
![../../../../../_images/Momentum.png](../../../../../_images/Momentum.png)
A particle has a mass of \(m = {{params_m}} \ \rm{kg}\) and has a velocity of \(v = {{params_v}} \ \rm{m/s}\). The force acting upon this particle is \(F = {{params_F}} \ \rm{N}\), and the position is given by \(({{params_x}} ,{{params_y}} ,{{params_z}} )\). What is the angular momentum about the origin and its time derivative?
Part 1#
What is \(H_x\)?
Answer Section#
Please enter in a numeric value in \(\rm{N-m-s}\).
Part 2#
What is \(H_y\)?
Answer Section#
Please enter in a numeric value in \(\rm{N-m-s}\).
Part 3#
What is \(H_z\)?
Answer Section#
Please enter in a numeric value in \(\rm{N-m-s}\).
Part 4#
What is \(\dot{H_x}\)?
Answer Section#
Please enter in a numeric value in \(\rm{N.m}\).
Part 5#
What is \(\dot{H_y}\)?
Answer Section#
Please enter in a numeric value in \(\rm{N.m}\).
Part 6#
What is \(\dot{H_z}\)?
Answer Section#
Please enter in a numeric value in \(\rm{N.m}\).
Attribution#
Problem is licensed under the CC-BY-NC-SA 4.0 license.