Q1.find the position of centre of mass if two Kg 3 kg and 4 kg masses are kept at vertex of equilateral triangle of side 50 centimetre
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Step-by-step explanation:
Answer
Step by Step Explanation:-
Let take a triangle and suppose the position of masses are shown in figure.
Now,
AB = BC = AC= 50 cm = 1/2 m
A = (0,0)
B = (1/2 , 0)
C = ( 1/4 , √3/4) [Explained later]
Draw a perpendicular from point C on AB.
E is mid-point of AB, So coordinates of E is (1/4 , 0)
Now, in ΔAEC ,
tan60° = EC/AE
√3 = EC/(1/4))
√3 = 4EC
EC = √3/4
Hence,
Coordinates of C is (1/4 , √3/4)
Now, again We define A , B and C
A = (x₁ , y₁ ) = (0 , 0)
B = (x₂ , y₂) = (1/2 , 0)
C = (x₃ , y₃) = (1/4 , √3/4)
m₁ = 2
m₂ = 3
m₃ = 4
We know that,We know that,
Similarly,
Hence coordinates of center of mass =
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