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Equilibrium and Balance01:15

Equilibrium and Balance

5.1K
The inner ear assumes dual functionalities of auditory perception and equilibrium maintenance. The vestibule is the organ responsible for balance. This organ contains mechanoreceptors, specifically hair cells, endowed with stereocilia, which aid in deciphering information regarding the position and motion of our heads. Two intrinsic components, the utricle and saccule, help perceive head position, while the semicircular canals track head movement. Neurological messages initiated in the...
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Rigid Body Equilibrium Problems - II01:21

Rigid Body Equilibrium Problems - II

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A rigid body is in static equilibrium when the net force and the net torque acting on the system are equal to zero.
Consider two children sitting on a seesaw, which has negligible mass. The first child has a mass (m1) of 26 kg and sits at point A, which is 1.6 meters (r1) from the pivot point B; the second child has a mass (m2) of 32 kg and sits at point C. How far from the pivot point B should the second child sit (r2) to balance the seesaw?
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Dynamic Equilibrium02:20

Dynamic Equilibrium

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A reversible chemical reaction represents a chemical process that proceeds in both forward (left to right) and reverse (right to left) directions. When the rates of the forward and reverse reactions are equal, the concentrations of the reactant and product species remain constant over time and the system is at equilibrium. A special double arrow is used to emphasize the reversible nature of the reaction. The relative concentrations of reactants and products in equilibrium systems vary greatly;...
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Rigid Body Equilibrium Problems - I00:49

Rigid Body Equilibrium Problems - I

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A rigid body is said to be in static equilibrium when the net force and the net torque acting on the system is equal to zero. To solve for rigid body equilibrium problems, do the following steps.
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Oscillations about an Equilibrium Position01:04

Oscillations about an Equilibrium Position

5.6K
Stability is an important concept in oscillation. If an equilibrium point is stable, a slight disturbance of an object that is initially at the stable equilibrium point will cause the object to oscillate around that point. For an unstable equilibrium point, if the object is disturbed slightly, it will not return to the equilibrium point. There are three conditions for equilibrium points—stable, unstable, and half-stable. A half-stable equilibrium point is also unstable, but is named so...
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Static Equilibrium - I01:05

Static Equilibrium - I

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A rigid body is said to be in dynamic equilibrium when both its linear and angular acceleration are zero, relative to an inertial frame of reference. This means that a body in equilibrium can be moving, but only when its linear and angular velocities are constant. A rigid body is said to be in static equilibrium when it is at rest in the selected frame of reference. The distinction between static equilibrium (e.g., a state of rest) and dynamic equilibrium (e.g, a state of uniform motion) is...
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Updated: Sep 10, 2025

A Vibrotactile Feedback Device for Seated Balance Assessment and Training
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El equilibrio de Heider es una dinámica continua.

Krzysztof Kułakowski1

  • 1Faculty of Physics and Applied Computer Science, AGH University of Krakow, al. Mickiewicza 30, 30-059 Cracow, Poland.

Entropy (Basel, Switzerland)
|August 28, 2025
PubMed
Resumen

Esta revisión explora cómo la dinámica no lineal y las ecuaciones diferenciales ordinarias modelan el equilibrio de Heider, también conocido como equilibrio estructural, en los fenómenos sociales del mundo real.

Palabras clave:
disonancia cognitivaecuaciones diferencialessimulaciones sociales

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Área de la Ciencia:

  • Las dinámicas sociales
  • Modelado matemático
  • Sistemas complejos

Sus antecedentes:

  • La teoría del equilibrio de Heider explica la consistencia cognitiva en las relaciones sociales.
  • Los modelos tradicionales a menudo carecen de perspectivas dinámicas.
  • La integración de marcos matemáticos puede mejorar la comprensión de las estructuras sociales.

Objetivo del estudio:

  • Revisar las aplicaciones de la dinámica no lineal en la teoría del equilibrio estructural.
  • Para resaltar el uso de ecuaciones diferenciales ordinarias en el modelado de las ciencias sociales.
  • Para conectar los formalismos matemáticos con los fenómenos sociales observables.

Principales métodos:

  • Revisión de la literatura existente que aplica la dinámica no lineal.
  • Análisis de estudios que utilizan ecuaciones diferenciales ordinarias.
  • Examen de la investigación que conecta los modelos matemáticos con la psicología social.

Principales resultados:

  • Las dinámicas no lineales ofrecen un marco sólido para analizar el equilibrio estructural.
  • Las ecuaciones diferenciales ordinarias capturan efectivamente la evolución de los estados sociales.
  • Los modelos matemáticos proporcionan una visión de los fenómenos sociales reales.

Conclusiones:

  • Las dinámicas no lineales proporcionan herramientas poderosas para comprender el equilibrio social.
  • La aplicación de ecuaciones diferenciales une conceptos teóricos y observaciones empíricas.
  • Este enfoque mejora el estudio de las interacciones sociales complejas.