1 Answer

Cyrus Zei · Answer 1 · 2021-11-17T07:46:02+0000

Answer:

The magnitude and direction of the resultant is 8.66 N and
$60^(\circ)$ south of East.

The magnitude and direction the equilibrant is 8.66 N and
$60^(\circ)$ North of West respectively.

Step-by-step explanation:

Let

$P=5\ \text{N}\ \text{south}$

$Q=5\ \text{N}\ 30^(\circ)\ \text{south of east}$

$\theta$ = Angle between P and Q =
$60^(\circ)$

Magnitude of resultant

$R=√(P^2+Q^2+2PQ\cos\theta)\\\Rightarrow R=\sqrt{5^2+5^2+2* 5* 5\cos60^(\circ)}\\\Rightarrow R=8.66\ \text{N}$

Direction is given by

$\theta=\tan^(-1)(Q\sin\theta)/(P+Q\sin\theta)\\\Rightarrow \theta=\tan^(-1)(5\sin60^(\circ))/(5+5\sin60^(\circ))\\\Rightarrow \theta=30^(\circ)$

The magnitude and direction of the resultant is 8.66 N and
$30^(\circ)+30^(\circ)=60^(\circ)$ south of East.

The magnitude and direction the equilibrant is 8.66 N and
$60^(\circ)$ North of West.

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