What does ##\bar{x}_{\textrm{el}}## represent?

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In the context of centroids and moments, what do ##\bar{x}_{\textrm{el}}## and ##\bar{y}_{\textrm{el}}## represent?

For example:

$$\bar{x}L = \int \bar{x}_{\textrm{el}}dL$$
 
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mathman said:
I have no idea where this came from, so I can't go into any more detail.

Thanks for your response, mathman.

Here are some resources that utilize this notation:

  1. (page 1) http://www.sut.ac.th/engineering/Civil/CourseOnline/430201/pdf/05_review.pdf
  2. Vector Mechanics for Engineers:Statics and Dynamics by Ferdinand P. Beer & E. Russell Johnston J.
Below is an example problem Beer's

Qf4BF.png
 
END said:
In the context of centroids and moments, what do ##\bar{x}_{\textrm{el}}## and ##\bar{y}_{\textrm{el}}## represent?

For example:

$$\bar{x}L = \int \bar{x}_{\textrm{el}}dL$$

xEL and yEL represent the location of the centroid of a tiny element of length dL or a tiny element of area dA used to calculate the first moments of length or area.

Study pp. 1 and 2 of the link carefully. :wink: