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Angle of Twist - Elastic Range01:13

Angle of Twist - Elastic Range

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Consider a cylindrical shaft with a length denoted by L and a consistent cross-sectional radius referred to as r. This shaft undergoes a torque at the free end. The highest shearing strain within the shaft is directly proportional to the twist angle and the radial distance from the shaft axis. When the shaft behaves elastically, this shearing strain can be articulated using variables such as the applied torque, radial distance, the polar moment of inertia, and the modulus of rigidity. By...
919
Angle of Twist: Problem Solving01:13

Angle of Twist: Problem Solving

874
An electric motor applies a torque of 700 N·m to an aluminum shaft, triggering a stable rotation. Two pulleys, B and C, are subjected to torques of 300 N·m and 400 N·m, respectively. The modulus of rigidity is provided as 25 GPa. With the knowledge of the length and diameter of each segment, the twist angle between the two pulleys can be computed. First, a section cut is made between pulleys B and C, and the cut cross-section is analyzed using a free-body diagram. Given that the torque...
874
Torsional Pendulum01:09

Torsional Pendulum

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A torsional pendulum involves the oscillation of a rigid body in which the restoring force is provided by the torsion in the string from which the rigid body is suspended. Ideally, the string should be massless; practically, its mass is much smaller than the rigid body's mass and is neglected.
As long as the rigid body's angular displacement is small, its oscillation can be modeled as a linear angular oscillation. The amplitude of the oscillation is an angle. The role of mass is played...
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Torsion of Noncircular Members01:16

Torsion of Noncircular Members

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Circular shafts undergoing torsional stress maintain their cross-sectional integrity due to their axisymmetric nature. This symmetry ensures an even distribution of stress, allowing the shaft to withstand torsion without distorting. In contrast, square bars, lacking this axial symmetry, experience significant distortion across their cross-sections when subjected to torsion, with the exception of along their diagonals and at lines connecting midpoints. A detailed examination of a cubic element...
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Basic Operations on Signals01:22

Basic Operations on Signals

1.3K
Basic signal operations include time reversal, time scaling, time shifting, and amplitude transformations. These operations are fundamental in signal processing and analysis.
Time Reversal mirrors a continuous-time signal about the vertical axis at t=0. This is achieved by substituting t with −t. For example, if a signal x(t) is considered, the time-reversed signal is x(−t). This operation can be graphically represented, showing the mirrored signal.
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Transfer function and Bode Plots-II01:23

Transfer function and Bode Plots-II

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In the standard form, the transfer function is shown in constant gain, poles/zeros at origin, simple poles/zeros, and quadratic poles/zeros; each contributing uniquely to the system's overall response. The term represents the magnitude of the simple zero:
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Related Experiment Video

Updated: Apr 8, 2026

Method to Measure Tone of Axial and Proximal Muscle
10:41

Method to Measure Tone of Axial and Proximal Muscle

Published on: December 14, 2011

18.1K

Twistors and amplitudes.

Andrew Hodges1

  • 1Mathematical Institute, University of Oxford, Radcliffe Observatory Quarter, Woodstock Road, Oxford OX2 6GG, UK hodges@maths.ox.ac.uk.

Philosophical Transactions. Series A, Mathematical, Physical, and Engineering Sciences
|July 1, 2015
PubMed
Summary
This summary is machine-generated.

Twistor geometry is crucial for understanding fundamental particle scattering amplitudes. This review highlights the twistor diagram formalism and its evolution into the amplituhedron.

Keywords:
amplituhedronscattering amplitudestwistor theory

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Last Updated: Apr 8, 2026

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Area of Science:

  • Theoretical Physics
  • High Energy Physics
  • Mathematical Physics

Background:

  • Scattering amplitudes are fundamental to particle physics.
  • Twistor geometry offers a novel framework for studying these amplitudes.
  • The twistor diagram formalism provides a powerful calculational tool.

Purpose of the Study:

  • To review the significance of twistor geometry in scattering amplitude theory.
  • To trace the development from Penrose's twistor diagrams to the amplituhedron.
  • To emphasize the geometric underpinnings of scattering amplitudes.

Main Methods:

  • Review of existing literature on twistor geometry and scattering amplitudes.
  • Focus on the historical development of the twistor diagram formalism.
  • Discussion of the recent definition of the amplituhedron.

Main Results:

  • Twistor geometry provides a unifying geometric perspective on scattering amplitudes.
  • The twistor diagram formalism has evolved into the amplituhedron concept.
  • This geometric approach simplifies complex calculations in quantum field theory.

Conclusions:

  • Twistor geometry is a central and increasingly important tool in modern scattering amplitude research.
  • The amplituhedron represents a significant advancement in understanding the structure of scattering amplitudes.
  • Further exploration of twistor-based methods promises new insights into fundamental particle interactions.