the center of mass of three particles having masses of 1,2,3 units located at points (-1,3),(2,1),(3,-1)respectively is located at...?
Answers
Answer:
Step-by-step explanation:
Let two of the equilateral triangle coordinates are as follow
B (-1,0) and C (1,0).
Since all sides are same, we can easily derive that the A coordinates are (0, √(3)).
The X and Y coordinates of point A, B, and C forming the equilateral triangle are respectively (0,√(3)), (-1,0), and (1,0).
Let the masses 1g, 2g, and 3g be located at A, B and C respectively.
(x1, y1) = (0, √(3), (x2, y2) = (-1,0) and (x3, y3) = (1,0)
m1 = 1, m2 = 2 and m3 = 3
The location of center mass can be calculated as follow
X coordinate is calculated as
x = (m1*x1 + m2*x2 + m3*x3)/(m1 + m2 + m3)
Substituting we get,
x = (1*0 + 2*-1 + 3*1)/(1 + 2 + 3) = 1/6
Y coordinate is calculated as
y = (m1*y1 + m2*y2 + m3*y3)/(m1 + m2 + m3)
Substituting we get,
y = (1*√(3) + 2*0 + 3*0)/(1 + 2 )
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Let two of the equilateral triangle coordinates are as follow
B (-1,0) and C (1,0).
Since all sides are same, we can easily derive that the A coordinates are (0, √(3)).
The X and Y coordinates of point A, B, and C forming the equilateral triangle are respectively (0,√(3)), (-1,0), and (1,0).
Let the masses 1g, 2g, and 3g be located at A, B and C respectively.
(x1, y1) = (0, √(3), (x2, y2) = (-1,0) and (x3, y3) = (1,0)
m1 = 1, m2 = 2 and m3 = 3
The location of center mass can be calculated as follow
X coordinate is calculated as
x = (m1×x1 + m2×x2 + m3×x3)/(m1 + m2 + m3)
Substituting we get,
x = (1×0 + 2×-1 + 3×1)/(1 + 2 + 3) = 1/6
Y coordinate is calculated as
y = (m1×y1 + m2×y2 + m3×y3)/(m1 + m2 + m3)
Substituting we get,
y = (1×√(3) + 2×0 + 3×0)/(1 + 2 )
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