In geometry and mechanics, a displacement is a vector whose length is the shortest distance from the initial to the final position of a point P undergoing motion.[1] It quantifies both the distance and direction of the net or total motion along a straight line from the initial position to the final position of the point trajectory. A displacement may be identified with the translation that maps the initial position to the final position. Displacement is the shift in location when an object in motion changes from one position to another.[2]
Displacement versus distance travelled along a path
A displacement may also be described as a relative position (resulting from the motion), that is, as the final position xf of a point relative to its initial position xi. The corresponding displacement vector can be defined as the difference between the final and initial positions:
In considering motions of objects over time, the instantaneous velocity of the object is the rate of change of the displacement as a function of time. The instantaneous speed, then, is distinct from velocity, or the time rate of change of the distance travelled along a specific path. The velocity may be equivalently defined as the time rate of change of the position vector. If one considers a moving initial position, or equivalently a moving origin (e.g. an initial position or origin which is fixed to a train wagon, which in turn moves on its rail track), the velocity of P (e.g. a point representing the position of a passenger walking on the train) may be referred to as a relative velocity; this is opposed to an absolute velocity, which is computed with respect to a point and coordinate axes which are considered to be at rest (a inertial frame of reference such as, for instance, a point fixed on the floor of the train station and the usual vertical and horizontal directions).
For motion over a given interval of time, the displacement divided by the length of the time interval defines the average velocity, which is a vector, and differs thus from the average speed, which is a scalar quantity.
In dealing with the motion of a rigid body, the term displacement may also include the rotations of the body. In this case, the displacement of a particle of the body is called linear displacement (displacement along a line), while the rotation of the body is called angular displacement.[3]
For a position vector that is a function of time , the derivatives can be computed with respect to . The first two derivatives are frequently encountered in physics.
These common names correspond to terminology used in basic kinematics.[4] By extension, the higher order derivatives can be computed in a similar fashion. Study of these higher order derivatives can improve approximations of the original displacement function. Such higher-order terms are required in order to accurately represent the displacement function as a sum of an infinite series, enabling several analytical techniques in engineering and physics. The fourth order derivative is called jounce.
^Tom Henderson. "Describing Motion with Words". The Physics Classroom. Retrieved 2 January 2012.
^Moebs, William; Ling, Samuel J.; Sanny, Jeff (2016-09-19). "3.1 Position, Displacement, and Average Velocity - University Physics Volume 1 | OpenStax". openstax.org. Retrieved 2024-03-11.
^"Angular Displacement, Velocity, Acceleration". NASA Glenn Research Center. National Aeronautics and Space Administration. 13 May 2021. Retrieved 9 November 2023.
Media related to Displacement vector at Wikimedia Commons
April 14, 2024
displacement, geometry, geometry, mechanics, displacement, vector, whose, length, shortest, distance, from, initial, final, position, point, undergoing, motion, quantifies, both, distance, direction, total, motion, along, straight, line, from, initial, positio. In geometry and mechanics a displacement is a vector whose length is the shortest distance from the initial to the final position of a point P undergoing motion 1 It quantifies both the distance and direction of the net or total motion along a straight line from the initial position to the final position of the point trajectory A displacement may be identified with the translation that maps the initial position to the final position Displacement is the shift in location when an object in motion changes from one position to another 2 Displacement versus distance travelled along a pathA displacement may also be described as a relative position resulting from the motion that is as the final position xf of a point relative to its initial position xi The corresponding displacement vector can be defined as the difference between the final and initial positions s xf xi Dx displaystyle s x textrm f x textrm i Delta x In considering motions of objects over time the instantaneous velocity of the object is the rate of change of the displacement as a function of time The instantaneous speed then is distinct from velocity or the time rate of change of the distance travelled along a specific path The velocity may be equivalently defined as the time rate of change of the position vector If one considers a moving initial position or equivalently a moving origin e g an initial position or origin which is fixed to a train wagon which in turn moves on its rail track the velocity of P e g a point representing the position of a passenger walking on the train may be referred to as a relative velocity this is opposed to an absolute velocity which is computed with respect to a point and coordinate axes which are considered to be at rest a inertial frame of reference such as for instance a point fixed on the floor of the train station and the usual vertical and horizontal directions For motion over a given interval of time the displacement divided by the length of the time interval defines the average velocity which is a vector and differs thus from the average speed which is a scalar quantity Contents 1 Rigid body 2 Derivatives 3 See also 4 References 5 External linksRigid body editIn dealing with the motion of a rigid body the term displacement may also include the rotations of the body In this case the displacement of a particle of the body is called linear displacement displacement along a line while the rotation of the body is called angular displacement 3 Derivatives editSee also Position geometry Derivatives For a position vector s displaystyle mathbf s nbsp that is a function of time t displaystyle t nbsp the derivatives can be computed with respect to t displaystyle t nbsp The first two derivatives are frequently encountered in physics Velocity v dsdt displaystyle mathbf v frac d mathbf s mathrm d t nbsp Acceleration a dvdt d2sdt2 displaystyle mathbf a frac d mathbf v dt frac d 2 mathbf s dt 2 nbsp Jerk j dadt d2vdt2 d3sdt3 displaystyle mathbf j frac d mathbf a dt frac d 2 mathbf v dt 2 frac d 3 mathbf s dt 3 nbsp These common names correspond to terminology used in basic kinematics 4 By extension the higher order derivatives can be computed in a similar fashion Study of these higher order derivatives can improve approximations of the original displacement function Such higher order terms are required in order to accurately represent the displacement function as a sum of an infinite series enabling several analytical techniques in engineering and physics The fourth order derivative is called jounce See also edit nbsp Mathematics portal nbsp Physics portalAffine space Deformation mechanics Displacement field mechanics Equipollence geometry Motion vector Position vector Radial velocity Screw displacementReferences edit Tom Henderson Describing Motion with Words The Physics Classroom Retrieved 2 January 2012 Moebs William Ling Samuel J Sanny Jeff 2016 09 19 3 1 Position Displacement and Average Velocity University Physics Volume 1 OpenStax openstax org Retrieved 2024 03 11 Angular Displacement Velocity Acceleration NASA Glenn Research Center National Aeronautics and Space Administration 13 May 2021 Retrieved 9 November 2023 Stewart James 2001 2 8 The Derivative As A Function Calculus 2nd ed Brooks Cole ISBN 0 534 37718 1 External links edit nbsp Media related to Displacement vector at Wikimedia Commons Retrieved from https en wikipedia org w index php title Displacement geometry amp oldid 1215432780, wikipedia, wiki, book, books, library,
