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Lami's theorem

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In physics, Lami's theorem is an equation relating the magnitudes of three coplanar, concurrent and non-collinear vectors, which keeps an object in static equilibrium, with the angles directly opposite to the corresponding vectors. According to the theorem,

v A sin α = v B sin β = v C sin γ {\displaystyle {\frac {v_{A}}{\sin \alpha }}={\frac {v_{B}}{\sin \beta }}={\frac {v_{C}}{\sin \gamma }}}

where v A , v B , v C {\displaystyle v_{A},v_{B},v_{C}} are the magnitudes of the three coplanar, concurrent and non-collinear vectors, v A , v B , v C {\displaystyle {\vec {v}}_{A},{\vec {v}}_{B},{\vec {v}}_{C}} , which keep the object in static equilibrium, and α , β , γ {\displaystyle \alpha ,\beta ,\gamma } are the angles directly opposite to the vectors, thus satisfying α + β + γ = 360 o {\displaystyle \alpha +\beta +\gamma =360^{o}} .

Lami's theorem is applied in static analysis of mechanical and structural systems. The theorem is named after Bernard Lamy.

Proof

As the vectors must balance v A + v B + v C = 0 {\displaystyle {\vec {v}}_{A}+{\vec {v}}_{B}+{\vec {v}}_{C}={\vec {0}}} , hence by making all the vectors touch its tip and tail the result is a triangle with sides v A , v B , v C {\displaystyle v_{A},v_{B},v_{C}} and angles 180 o α , 180 o β , 180 o γ {\displaystyle 180^{o}-\alpha ,180^{o}-\beta ,180^{o}-\gamma } ( α , β , γ {\displaystyle \alpha ,\beta ,\gamma } are the exterior angles).

By the law of sines then

v A sin ( 180 o α ) = v B sin ( 180 o β ) = v C sin ( 180 o γ ) . {\displaystyle {\frac {v_{A}}{\sin(180^{o}-\alpha )}}={\frac {v_{B}}{\sin(180^{o}-\beta )}}={\frac {v_{C}}{\sin(180^{o}-\gamma )}}.}

Then by applying that for any angle θ {\displaystyle \theta } , sin ( 180 o θ ) = sin θ {\displaystyle \sin(180^{o}-\theta )=\sin \theta } (supplementary angles have the same sine), and the result is

v A sin α = v B sin β = v C sin γ . {\displaystyle {\frac {v_{A}}{\sin \alpha }}={\frac {v_{B}}{\sin \beta }}={\frac {v_{C}}{\sin \gamma }}.}

See also

References

  1. ^ Dubey, N. H. (2013). Engineering Mechanics: Statics and Dynamics. Tata McGraw-Hill Education. ISBN 9780071072595.
  2. "Lami's Theorem - Oxford Reference". Retrieved 2018-10-03.

Further reading

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