Difference between revisions of "Acceleration"
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==Etymology== | ==Etymology== | ||
[[Latin]] acceleratus, past participle of accelerare, from ad- + celer swift | [[Latin]] acceleratus, past participle of accelerare, from ad- + celer swift | ||
− | *Date: circa [ | + | *Date: circa [https://www.wikipedia.org/wiki/16th_Century 1530] |
==Definitions== | ==Definitions== | ||
*1 : to bring about at an earlier [[time]] <accelerate their departure> | *1 : to bring about at an earlier [[time]] <accelerate their departure> | ||
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*4 a : to enable (a student) to complete a [[course]] in less than usual [[time]] | *4 a : to enable (a student) to complete a [[course]] in less than usual [[time]] | ||
:b : to [[speed]] up (as a [[course]] of [[study]]) | :b : to [[speed]] up (as a [[course]] of [[study]]) | ||
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+ | <center>For lessons on the [[topic]] of '''''Acceleration''''', follow [https://nordan.daynal.org/wiki/index.php?title=Category:Acceleration '''''this link'''''].</center> | ||
==Description== | ==Description== | ||
In [[physics]], and more specifically [[kinematics]], '''acceleration''' is the [[change]] in [[velocity]] over time. Because velocity is a [[vector]], it can [[change]] in two ways: a change in [[magnitude]] and/or a change in direction. In one [[dimension]], i.e. a line, acceleration is the [[rate]] at which something [[speed]]s up. However, as a vector [[quantity]], acceleration is also the rate at which direction changes. Acceleration has the dimensions L T −2. In SI units, acceleration is [[measured]] in meters per second squared (m/s2). | In [[physics]], and more specifically [[kinematics]], '''acceleration''' is the [[change]] in [[velocity]] over time. Because velocity is a [[vector]], it can [[change]] in two ways: a change in [[magnitude]] and/or a change in direction. In one [[dimension]], i.e. a line, acceleration is the [[rate]] at which something [[speed]]s up. However, as a vector [[quantity]], acceleration is also the rate at which direction changes. Acceleration has the dimensions L T −2. In SI units, acceleration is [[measured]] in meters per second squared (m/s2). | ||
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[[File:Acceleration.jpg]] | [[File:Acceleration.jpg]] | ||
− | In [ | + | In [https://en.wikipedia.org/wiki/Classical_mechanics classical mechanics], for a [[body]] with constant [[mass]], the acceleration of the body is [[proportional]] to the resultant ([[total]]) [[force]] acting on it ([https://en.wikipedia.org/wiki/Newton%27s_laws_of_motion Newton's second law]) where F is the resultant [[force]] acting on the body, m is the mass of the body, and a is its acceleration.[https://en.wikipedia.org/wiki/Acceleration] |
[[Category: Physics]] | [[Category: Physics]] |
Latest revision as of 23:36, 12 December 2020
Etymology
Latin acceleratus, past participle of accelerare, from ad- + celer swift
- Date: circa 1530
Definitions
- 1 : to bring about at an earlier time <accelerate their departure>
- 2 : to cause to move faster <accelerated his steps>; also : to cause to undergo acceleration
- 3 a : to hasten the progress or development of <accelerate our efforts>
- b : increase <accelerate food production>
Description
In physics, and more specifically kinematics, acceleration is the change in velocity over time. Because velocity is a vector, it can change in two ways: a change in magnitude and/or a change in direction. In one dimension, i.e. a line, acceleration is the rate at which something speeds up. However, as a vector quantity, acceleration is also the rate at which direction changes. Acceleration has the dimensions L T −2. In SI units, acceleration is measured in meters per second squared (m/s2).
In common speech, the term acceleration commonly is used for an increase in speed (the magnitude of velocity); a decrease in speed is called deceleration. In physics, a change in the direction of velocity also is an acceleration: for rotary motion, the change in direction of velocity results in centripetal (toward the center) acceleration; where as the rate of change of speed is a tangential acceleration.
In classical mechanics, for a body with constant mass, the acceleration of the body is proportional to the resultant (total) force acting on it (Newton's second law) where F is the resultant force acting on the body, m is the mass of the body, and a is its acceleration.[1]