potential energy

Examples of potential energy in the following topics:

• The Chain Rule

  • $U$ could be electric potential energy at a location $(x,y)$.
  • What we want to calculate is the rate of change of the potential energy $U$ as a function of time $t$.

• Conservative Vector Fields

  • A conservative vector field is a vector field which is the gradient of a function, known in this context as a scalar potential.
  • A conservative vector field is a vector field which is the gradient of a function, known in this context as a scalar potential.
  • When the above equation holds, $\varphi$ is called a scalar potential for $\mathbf{v}$.

• Applications of Multiple Integrals

  • The gravitational potential associated with a mass distribution given by a mass measure $dm$ on three-dimensional Euclidean space $R^3$ is:
  • If there is a continuous function $\rho(x)$ representing the density of the distribution at $x$, so that $dm(x) = \rho (x)d^3x$, where $d^3x$ is the Euclidean volume element, then the gravitational potential is:

• Fundamental Theorem for Line Integrals

  • By placing $\varphi$ as potential, $\nabla$ is a conservative field.
  • Electric field is a vector field which can be represented as a gradient of a scalar field, called electric potential.

• Essential Functions for Mathematical Modeling

  • Another example is a model of a particle in a potential-field.
  • The potential field is given by a function $V:R^3 \rightarrow R$ and the trajectory is a solution of a differential equation.

• Vector Fields

  • When a vector field represents force, the line integral of a vector field represents the work done by a force moving along a path, and, under this interpretation, conservation of energy is exhibited as a special case of the fundamental theorem of calculus.

• Work

  • Work done by the restoring force leads to increase in the kinetic energy of the object.

• Stokes' Theorem

  • The scalar field $\varphi$ in the case of electromagnetism is called electric potential.