The following sections of this BookRags Literature Study Guide is offprint from Gale's For Students Series: Presenting Analysis, Context, and Criticism on Commonly Studied Works: Introduction, Author Biography, Plot Summary, Characters, Themes, Style, Historical Context, Critical Overview, Criticism and Critical Essays, Media Adaptations, Topics for Further Study, Compare & Contrast, What Do I Read Next?, For Further Study, and Sources.
(c)1998-2002; (c)2002 by Gale. Gale is an imprint of The Gale Group, Inc., a division of Thomson Learning, Inc. Gale and Design and Thomson Learning are trademarks used herein under license.
The following sections, if they exist, are offprint from Beacham's Encyclopedia of Popular Fiction: "Social Concerns", "Thematic Overview", "Techniques", "Literary Precedents", "Key Questions", "Related Titles", "Adaptations", "Related Web Sites". (c)1994-2005, by Walton Beacham.
The following sections, if they exist, are offprint from Beacham's Guide to Literature for Young Adults: "About the Author", "Overview", "Setting", "Literary Qualities", "Social Sensitivity", "Topics for Discussion", "Ideas for Reports and Papers". (c)1994-2005, by Walton Beacham.
All other sections in this Literature Study Guide are owned and copyrighted by BookRags, Inc.
The centroid, also called the center of mass, is one of the ways of defining the geometric center of a planar figure or a solid. If the planar figure was cut out of stiff paper, the centroid would be the point at which you could balance the object on a pin. The centroid of a solid is not as easy to visualize, but its coordinates also provide a center of balance. It is the point at which there is an equal amount of the figure in each direction, for as many degrees of freedom as are allowed.
To calculate each coordinate centroid, one takes the integral of the density function multiplied by the coordinate over the entire area or volume in consideration, divided by the total "mass" of the shape. For figures that consist of discrete points rather than a continuous geometry, the integral may be replaced by a sum over the individual points with mass weighting for each, divided by the sum of the masses. For equal masses at all points, the centroid is simply the average position of the figure. The centroid also is the point at which the total travel from all vertices of the figure is minimized. The centroid of a triangle is the point at which medians (lines from a vertex to the opposite midpoint) meet; they always meet at one point, although it is not always within the triangle. The centroid of a uniform quadrilateral is found at the point where the bimedians (lines joining opposite midpoints) intersect. Other geometric figures have well-defined median positions, but these are more complex calculations and are used far less often.