Center of Gravity questions - Center of Area

AI Thread Summary
The discussion focuses on finding the centroid of a symmetrical T-shaped object. Participants emphasize using symmetry to determine the center of mass for the X-coordinate, while the Y-coordinate can be calculated using the equation Y_COM = Σ(m_ix_i) / Σ(m_i). There is some confusion regarding the variable M, which refers to the total mass of the object. The conversation highlights the importance of understanding both the geometric properties and the relevant equations for centroid calculations. Overall, the thread serves as a collaborative effort to clarify centroid determination for the given shape.
physicx_1
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Homework Statement


Find the problem of the centroid of each of the shapes

http://img29.imageshack.us/img29/7563/64279412.jpg


this makeshift diagram is not as accurate as it should be, but it is a plain T shape that is perfectly symmetrical.

Homework Equations



Not sure

The Attempt at a Solution



I know I should work out the distance to centroid from yy(x), as in the vertical length. and the distance to centroid from xx(y) that is the horizontal length. also I should find out about the moment of the area or something?

someone please help
 
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Hi physicx_1 :smile:
Welcome to PF !

From symmetry you can tell that COM will be at the central point for X COM

For YCOM use eqn:

Y_{COM} = \frac{\sum{m_ix_i}}{\sum{m_i}}

i.e.

Y_{COM} = \frac{\sum{m_ix_i}}{M}
 
cupid.callin said:
Hi physicx_1 :smile:
Welcome to PF !

From symmetry you can tell that COM will be at the central point for X COM

For YCOM use eqn:

Y_{COM} = \frac{\sum{m_ix_i}}{\sum{m_i}}

i.e.

Y_{COM} = \frac{\sum{m_ix_i}}{M}

Thanks. Looking forward to my stay here :)

So what does M stand for? Moment?
 
The total mass
 
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