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In physics, jerk, jolt (especially in British English), surge or lurch, is the rate of change of acceleration; that is, the derivative of acceleration with respect to time, the second derivative of velocity, or the third derivative of displacement. Jerk is defined by the following equation:
## Related concepts

## Footnotes

## References

## External links

- $vec\; j=frac\; \{mathrm\{d\}\; vec\; a\}\; \{mathrm\{d\}t\}=frac\; \{mathrm\{d\}^2\; vec\; v\}\; \{mathrm\{d\}t^2\}=frac\; \{mathrm\{d\}^3\; vec\; r\}\; \{mathrm\{d\}t^3\}$

- $vec\; a$ is acceleration,

- $vec\; v$ is velocity,

- $vec\; r$ is displacement

- $mathit\{t\}$ is time.

Jerk is a vector, and there is no generally used term to describe its scalar magnitude.

The units of jerk are metres per second cubed (Metres per second per second per second, m/s^{3} or ms^{-3}). There is no universal agreement on the symbol for jerk, but j is commonly used.

Yank is sometimes used as the analog of force with respect to jerk: mass times jerk, or equivalently, the derivative of force with respect to time.

Higher derivatives of displacement are rarely necessary, and hence lack agreed-on names. The fourth derivative of position was considered in development of the Hubble Space Telescope's pointing control system, and called jounce. Many other suggestions have been made, such as jilt, jouse, jolt, and delta jerk. As more distinct terms that start with letters other than "j", the term snap has been proposed for the 4th derivative of position, with "crackle" and "pop" having been suggested – facetiously – as names for the 5th and 6th derivatives.^{ }

- Sprott, Julien Clinton (2003).
*Chaos and Time-Series Analysis*. Oxford University Press. ISBN 0-19-850839-5 and ISBN 978-0-19-850839-7. - Am. J. Phys., Vol. 65, No. 6, Pg. 538, June 1997

- What is the term used for the third derivative of position?, description of jerk in the Usenet Physics FAQ

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Last updated on Wednesday October 08, 2008 at 13:45:53 PDT (GMT -0700)

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Last updated on Wednesday October 08, 2008 at 13:45:53 PDT (GMT -0700)

View this article at Wikipedia.org - Edit this article at Wikipedia.org - Donate to the Wikimedia Foundation

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