State and prove Lami's Theorem.

0views

written 3.5 years ago by

teamques10 ★ 68k

STATEMENT:

It states, "If three forces acting at a point on a body keep it at rest, then each force is proportional to the sine of the angle between the other two forces.

Mathematically,

$\dfrac{P}{\sin\alpha}=\dfrac{Q}{\sin\beta}=\dfrac{R}{\sin\gamma}$

Where,

$\alpha$: Angle between $Q$ and $R$ $\beta $: Angle between $P$ and $R$ $\gamma$: Angle between $P$ and $Q$ $P, Q$ and $R$: Three concurrent forces. To prove: $\dfrac{P}{\sin\alpha}=\dfrac{Q}{\sin\beta}=\dfrac{R}{\sin\gamma}$ Proof: ![](data:image/png;base64,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) Construct a parallelogram OACB such that, $OA=P$ $OB=Q$ $OC=R$ In ΔOAC, applying sine rule, we get $\dfrac{OA}{\sin(\pi-\alpha)}=\dfrac{AC}{\sin(\pi-\beta)}=\dfrac{OC}{\sin(\pi-\gamma)}$ $\dfrac{P}{\sin\alpha}=\dfrac{Q}{\sin\beta}=\dfrac{R}{\sin\gamma}=k$ Where $k$ is a constant Therefore, $P=k\sin\alpha$ $Q=k\sin\beta$ $R=k\sin\gamma$

Hence, each force is proportional to the sine of the angle between the two other forces.

ADD COMMENT EDIT