Momentum at High Speeds: Difference between revisions
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At Low velocities it is calculated using the formula | At Low velocities it is calculated using the formula | ||
[[File:Low_Velocities.png|200px|thumb alt text]] | [[File:Low_Velocities.png|200px|thumb alt text]] | ||
'''Einstein's Theory of Special Relativity''' | |||
They found that when you approached the quantum level, the old formula for energy at rest did not apply so it was adapted to quantum mechanics in the form: | They found that when you approached the quantum level, the old formula for energy at rest did not apply so it was adapted to quantum mechanics in the form: | ||
[[File:Einstein's_Theory_of_Special_Relativity.png|200px|thumb alt text]] | [[File:Einstein's_Theory_of_Special_Relativity.png|200px|thumb alt text]] | ||
Revision as of 15:25, 3 December 2015
Momentum at High Speeds
By: Dalton Snyder
Short Description of Topic
The Main Idea
State, in your own words, the main idea for this topic Electric Field of Capacitor
A Mathematical Model
Momentum at High Speeds is an adaptation of Einstein's formula for Energy at rest
At Low velocities it is calculated using the formula
Einstein's Theory of Special Relativity
They found that when you approached the quantum level, the old formula for energy at rest did not apply so it was adapted to quantum mechanics in the form:
The formula for Lambda is
Lambda Alternate formulas are
A Computational Model
How do we visualize or predict using this topic. Consider embedding some vpython code here Teach hands-on with GlowScript
Examples
Be sure to show all steps in your solution and include diagrams whenever possible