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| System: Any system that does not undergo significant changes in internal energy. — Interactions: Any interactions that can be parameterized as mechanical work. Notable exceptions include heat transfer or radiation. |
Introduction to the ModelDescription and AssumptionsIf we ignore non-mechanical processes like heat transfer, radiative losses, etc., then we arrive at a model involving only mechanical energy which changes due to the application (or extraction) of the work done by non-conservative forces The non-conservative forces can be external forces exerted on the system or internal forces resulting from the interactions between the elements inside the system. Learning ObjectivesStudents will be assumed to understand this model who can: Relevant Definitions| Section |
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Mechanical Energy | Latex |
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\begin{large}\[E = K + U\]\end{large} |
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Kinetic Energy | Latex |
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\begin{large}\[ K = \frac{1}{2}mv^{2} + \frac{1}{2}I\omega^{2}\]\end{large} |
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Work | Latex |
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\begin{large}\[W_{fi} = \int_{\rm path} \vec{F}(\vec{s}) \cdot d\vec{s} = \int_{t_{i}}^{t_{f}} \vec{F}(t) \cdot \vec{v}(t)\:dt\]\end{large} |
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The system potential energy is the sum of all the potential energies produced by interactions between system constituents. Even when there are two system constituents involved (for example in a double star) each interaction produces only one potential energy. |
S.I.M. Structure of the ModelCompatible SystemsOne or more point particles or rigid bodies, plus any conservative interactitons that can be accounted for as potential energies of the system. | Info |
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In mechanics, the only commonly encountered conservative interactions are gravity and springs. |
Relevant InteractionsAny external force that performs that perform work on the system must be considered, and also any internal non-conservative forces that perform work. Any internal conservative forces that are present should have their interaction represented by the associated potential energy rather than by the work. Law of ChangeMathematical Representation| Section |
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\begin{large}\[ \frac{dE}{dt} = \sum \left(\vec{F}^{\rm ext} + \vec{F}^{\rm NC}\right)\cdot \vec{v} \]\end{large} |
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\begin{large}\[ E_{f} = E_{i} + \sum W^{\rm ext}_{fi} + \sum W^{\rm NC}_{fi} \] \end{large} |
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Diagrammatic RepresentationsRelevant Examples Examples Involving Constant Mechanical Energy | Cloak |
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| | 50falsetrueANDconstant_energy,example_problem |
Examples Involving Non-Conservative Work | Cloak |
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| | 50falsetrueANDnon-conservative_work,example_problem |
Examples Involving Gravitational Potential Energy | Cloak |
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| | 50falsetrueANDgravitational_potential_energy,example_problem |
Examples Involving Elastic (Spring) Potential Energy | Cloak |
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| | 50falsetrueANDelastic_potential_energy,example_problem |
Examples Involving Rotational Kinetic Energy | Cloak |
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| | 50falsetrueANDrotational_energy,example_problem |
All Examples Using this Model | Cloak |
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| | 50falsetrueANDconstant_energy,example_problem 50falsetrueANDnon-conservative_work,example_problem |
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