State triangle law of vectors addition. Give its expression to find the magnitude and direction of resultant vector by using this law.
Answers
Explanation:
Triangle law of vector addition is one of the vector addition law. Vector addition is defined as the geometrical sum of two or more vectors as they do not follow regular laws of algebra. The resultant vector is known as the composition of a vector.
There are few conditions that are applicable for any vector addition, they are:
Scalar and vectors can never be added.
For any two scalars to be added, they must be of the same nature. Example mass should be added with mass and not with time.
For any two vectors to be added, they must be of the same nature. Example velocity should be added with velocity and not with force.
There are two laws of vector addition, they are:
Triangle law of vector addition
Parallelogram law of vector addition
What is Triangle Law of Vector Addition?
Triangle law of vector addition states that when two vectors are represented as two sides of the triangle with the order of magnitude and direction, then the third side of the triangle represents the magnitude and direction of the resultant vector.
Triangle law of vector addition formula
→R=→A+→B

To obtain →R which is the resultant of the sum of →A and →B with the same order of magnitude and direction as shown in the figure.
Triangle Law of Vector Addition Derivation
Consider two vectors P and Q that are represented in the order of magnitude and direction by the sides OA and AB respectively of the triangle OAB. Let R be the resultant of vectors P and Q.

R=P+Q
From triangle OCB,
OB2=OC2+BC2 OB2=(OA+AC)2+BC2 (eq.1)
In triangle ACB with ϴ as the angle between P and Q
cosΘ=ACAB AC=ABcosΘ=QcosΘ sinΘ=BCAB BC=ABsinΘ=QsinΘ R2=(P+QcosΘ)2+(QsinΘ)2 (after substituting AC and BC in eq.1)
R2=P2+2PQcosΘ+Q2cos2Θ+Q2sin2Θ R2=P2+2PQcosΘ+Q2
therefore,
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