{"id":471,"date":"2025-02-13T19:45:16","date_gmt":"2025-02-13T19:45:16","guid":{"rendered":"https:\/\/content.one.lumenlearning.com\/calculus2\/chapter\/moments-and-centers-of-mass-learn-it-1\/"},"modified":"2025-02-13T19:45:16","modified_gmt":"2025-02-13T19:45:16","slug":"moments-and-centers-of-mass-learn-it-1","status":"publish","type":"chapter","link":"https:\/\/content.one.lumenlearning.com\/calculus2\/chapter\/moments-and-centers-of-mass-learn-it-1\/","title":{"raw":"Moments and Centers of Mass: Learn It 1","rendered":"Moments and Centers of Mass: Learn It 1"},"content":{"raw":"\n<section class=\"textbox learningGoals\">\n<ul>\n\t<li>Find the balance point (center of mass) of straight objects and flat surfaces<\/li>\n\t<li>Utilize a shape\u2019s symmetry to find the centroid, or geometric center, of flat objects<\/li>\n\t<li>Use Pappus\u2019s theorem to calculate the volume of an object<\/li>\n<\/ul>\n<\/section>\n<h2>Center of Mass and Moments<\/h2>\n<p>The basic idea of the <strong>center of mass<\/strong> is the notion of a balancing point. Many of us have seen performers who spin plates on the ends of sticks. The performers try to keep several of them spinning without allowing any of them to drop. If we look at a single plate (without spinning it), there is a sweet spot on the plate where it balances perfectly on the stick. If we put the stick anywhere other than that sweet spot, the plate does not balance and it falls to the ground. Mathematically, that sweet spot is called the <em>center of mass of the plate<\/em>.<\/p>\n<h3>Center of Mass of Objects on a Line<\/h3>\n<p id=\"fs-id1167793961633\">Let\u2019s begin by looking at the center of mass in a one-dimensional context.<\/p>\n<p>Consider a long, thin wire or rod of negligible mass resting on a fulcrum, as shown in Figure 1(a). Now suppose we place objects having masses [latex]{m}_{1}[\/latex] and [latex]{m}_{2}[\/latex] at distances [latex]{d}_{1}[\/latex] and [latex]{d}_{2}[\/latex] from the fulcrum, respectively, as shown in Figure 1(b).<\/p>\n\n[caption id=\"\" align=\"aligncenter\" width=\"448\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2332\/2018\/01\/11213241\/CNX_Calc_Figure_06_06_001.jpg\" alt=\"This figure has two images. The first image is a horizontal line on top of an equilateral triangle. It represents a rod on a fulcrum. The second image is the same as the first with two squares on the line. They are labeled msub1 and msub2. The distance from msub1 to the fulcrum is dsub1. The distance from msub2 to the fulcrum is dsub2.\" width=\"448\" height=\"354\"> Figure 1. (a) A thin rod rests on a fulcrum. (b) Masses are placed on the rod.[\/caption]\n\n<section class=\"textbox example\">\n<p>The most common real-life example of a system like this is a playground seesaw, or teeter-totter, with children of different weights sitting at different distances from the center. On a seesaw, if one child sits at each end, the heavier child sinks down and the lighter child is lifted into the air. If the heavier child slides in toward the center, though, the seesaw balances<\/p>\n<\/section>\n<p id=\"fs-id1167794121480\">Applying this concept to the masses on the rod, we note that the masses balance each other if and only if [latex]{m}_{1}{d}_{1}={m}_{2}{d}_{2}.[\/latex]<\/p>\n<p id=\"fs-id1167793631454\">In the seesaw example, we balanced the system by moving the masses (children) with respect to the fulcrum. However, we are really interested in systems in which the masses are not allowed to move, and instead we balance the system by moving the fulcrum.<\/p>\n<p>Suppose we have two point masses, [latex]{m}_{1}[\/latex] and [latex]{m}_{2},[\/latex] located on a number line at points [latex]{x}_{1}[\/latex] and [latex]{x}_{2},[\/latex] respectively (Figure 2). The center of mass, [latex]\\overline{x},[\/latex] is the point where the fulcrum should be placed to make the system balance.<\/p>\n\n[caption id=\"\" align=\"aligncenter\" width=\"403\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2332\/2018\/01\/11213244\/CNX_Calc_Figure_06_06_002.jpg\" alt=\"This figure is an image of the x-axis. On the axis there is a point labeled x bar. Also on the axis there is a point xsub1 with a square above it. Inside of the square is the label msub1. There is also a point xsub2 on the axis. Above this point there is a square. Inside of the square is the label msub2.\" width=\"403\" height=\"81\"> Figure 2. The center of mass [latex]\\overline{x}[\/latex] is the balance point of the system.[\/caption]\n\n<p id=\"fs-id1167794042461\">Thus, we have<\/p>\n<div id=\"fs-id1167793267623\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{ccc}\\hfill {m}_{1}|{x}_{1}-\\overline{x}|&amp; =\\hfill &amp; {m}_{2}|{x}_{2}-\\overline{x}|\\hfill \\\\ \\hfill {m}_{1}(\\overline{x}-{x}_{1})&amp; =\\hfill &amp; {m}_{2}({x}_{2}-\\overline{x})\\hfill \\\\ \\hfill {m}_{1}\\overline{x}-{m}_{1}{x}_{1}&amp; =\\hfill &amp; {m}_{2}{x}_{2}-{m}_{2}\\overline{x}\\hfill \\\\ \\hfill \\overline{x}({m}_{1}+{m}_{2})&amp; =\\hfill &amp; {m}_{1}{x}_{1}+{m}_{2}{x}_{2}\\hfill \\\\ \\hfill \\overline{x}&amp; =\\hfill &amp; \\frac{{m}_{1}{x}_{1}+{m}_{2}{x}_{2}}{{m}_{1}+{m}_{2}}.\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167794126756\">The expression in the numerator, [latex]{m}_{1}{x}_{1}+{m}_{2}{x}_{2},[\/latex] is called the <em>first moment of the system with respect to the origin. <\/em>If the context is clear, we often drop the word \"first\" and just refer to this expression as the <strong>moment<\/strong> <strong>of the system<\/strong>.<\/p>\n<p>The expression in the denominator, [latex]{m}_{1}+{m}_{2},[\/latex] is the total mass of the system. Thus, the center of mass of the system is the point at which the total mass of the system could be concentrated without changing the moment.<\/p>\n<p id=\"fs-id1167793883536\">If there are more than two point masses, the center of mass is given by:<\/p>\n<div id=\"fs-id1167794296143\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\overline{x}=\\dfrac{\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}{x}_{i}}{\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}}[\/latex]<\/div>\n<section class=\"textbox keyTakeaway\">\n<h3>center of mass of objects on a line<\/h3>\n<p>Let [latex]{m}_{1},{m}_{2}\\text{,\u2026},{m}_{n}[\/latex] be point masses placed on a number line at points [latex]{x}_{1},{x}_{2}\\text{,\u2026},{x}_{n},[\/latex] respectively, and let [latex]m=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}[\/latex] denote the total mass of the system. Then, the moment of the system with respect to the origin is given by<\/p>\n<div id=\"fs-id1167793939667\" class=\"equation\" style=\"text-align: center;\">[latex]M=\\displaystyle\\sum_{i=1}^{n} {m}_{i}{x}_{i}[\/latex]<\/div>\n<p>&nbsp;<\/p>\n<p id=\"fs-id1167794049151\">and the center of mass of the system is given by<\/p>\n<div id=\"fs-id1167794002774\" class=\"equation\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{M}{m}.[\/latex]<\/div>\n<\/section>\n<section class=\"textbox example\">\n<p id=\"fs-id1167794314607\">Suppose four point masses are placed on a number line as follows:<\/p>\n<div id=\"fs-id1167794326988\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{cccc}{m}_{1}=30\\text{kg,}\\text{ placed a t}{x}_{1}=-2\\text{m}\\hfill &amp; &amp; &amp; {m}_{2}=5\\text{kg,}\\text{ placed at }{x}_{2}=3\\text{m}\\hfill \\\\ {m}_{3}=10\\text{kg,}\\text{ placed at }{x}_{3}=6\\text{m}\\hfill &amp; &amp; &amp; {m}_{4}=15\\text{kg,}\\text{ placed at }{x}_{4}=-3\\text{m}.\\hfill \\end{array}[\/latex]<\/div>\n<p>&nbsp;<\/p>\n<p>Find the moment of the system with respect to the origin and find the center of mass of the system.<\/p>\n\n[reveal-answer q=\"fs-id1167793416711\"]Show Solution[\/reveal-answer] [hidden-answer a=\"fs-id1167793416711\"]\n\n<p id=\"fs-id1167793416711\">First, we need to calculate the moment of the system:<\/p>\n<div id=\"fs-id1167794037693\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{cc}\\hfill M&amp; = {\\displaystyle\\sum _{i=1}^{4}{m}_{i}{x}_{i}}\\hfill \\\\ &amp; =-60+15+60-45=-30.\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793926787\">Now, to find the center of mass, we need the total mass of the system:<\/p>\n<div id=\"fs-id1167793918541\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{cc}\\hfill m&amp; = {\\displaystyle\\sum _{i=1}^{4}{m}_{i}} \\hfill \\\\ &amp; =30+5+10+15=60\\text{kg}\\text{.}\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793270685\">Then we have<\/p>\n<div id=\"fs-id1167794023334\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{M}{m}=\\frac{-30}{60}=-\\frac{1}{2}.[\/latex]<\/div>\n<p id=\"fs-id1167794040152\">The center of mass is located 1\/2 m to the left of the origin.<\/p>\n<p>[\/hidden-answer]<\/p>\n<\/section>\n<section class=\"textbox tryIt\">\n<p>[ohm_question hide_question_numbers=1]223354[\/ohm_question]<\/p>\n<\/section>\n<h3>Center of Mass of Objects in a Plane<\/h3>\n<p>We can generalize this concept to find the center of mass of a system of point masses in a plane.<\/p>\n<p>Let [latex]{m}_{1}[\/latex] be a point mass located at point [latex]({x}_{1},{y}_{1})[\/latex] in the plane. Then the moment [latex]{M}_{x}[\/latex] of the mass with respect to the [latex]x[\/latex]-axis is given by [latex]{M}_{x}={m}_{1}{y}_{1}.[\/latex] Similarly, the moment [latex]{M}_{y}[\/latex] with respect to the [latex]y[\/latex]-axis is given by [latex]{M}_{y}={m}_{1}{x}_{1}.[\/latex]<\/p>\n<section class=\"textbox proTip\">Notice that the [latex]x[\/latex]-coordinate of the point is used to calculate the moment with respect to the [latex]y[\/latex]-axis, and vice versa. The reason is that the [latex]x[\/latex]-coordinate gives the distance from the point mass to the [latex]y[\/latex]-axis, and the [latex]y[\/latex]-coordinate gives the distance to the [latex]x[\/latex]-axis.\n[caption id=\"\" align=\"aligncenter\" width=\"267\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2332\/2018\/01\/11213246\/CNX_Calc_Figure_06_06_003.jpg\" alt=\"This figure has the x and y axes labeled. There is a point in the first quadrant at (xsub1, ysub1). This point is labeled msub1.\" width=\"267\" height=\"235\"> Figure 3. Point mass [latex]{m}_{1}[\/latex] is located at point [latex]({x}_{1},{y}_{1})[\/latex] in the plane.[\/caption]\n<\/section>\n<p>If we have several point masses in the [latex]xy[\/latex]-plane, we can use the moments with respect to the [latex]x[\/latex]- and [latex]y[\/latex]-axes to calculate the [latex]x[\/latex]- and [latex]y[\/latex]-coordinates of the center of mass of the system.<\/p>\n<section class=\"textbox keyTakeaway\">\n<h3>center of mass of objects in a plane<\/h3>\n<p id=\"fs-id1167794022817\">Let [latex]{m}_{1},{m}_{2}\\text{,\u2026},{m}_{n}[\/latex] be point masses located in the <em>xy<\/em>-plane at points [latex]({x}_{1},{y}_{1}),({x}_{2},{y}_{2})\\text{,\u2026},({x}_{n},{y}_{n}),[\/latex] respectively, and let [latex]m=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}[\/latex] denote the total mass of the system. Then the moments [latex]{M}_{x}[\/latex] and [latex]{M}_{y}[\/latex] of the system with respect to the [latex]x[\/latex]- and [latex]y[\/latex]-axes, respectively, are given by<\/p>\n<div id=\"fs-id1167794000383\" class=\"equation\" style=\"text-align: center;\">[latex]{M}_{x}=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}{y}_{i}\\text{ and }{M}_{y}=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}{x}_{i}.[\/latex]<\/div>\n<p id=\"fs-id1167793571151\">Also, the coordinates of the center of mass [latex](\\overline{x},\\overline{y})[\/latex] of the system are<\/p>\n<div id=\"fs-id1167793638645\" class=\"equation\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{{M}_{y}}{m}\\text{ and }\\overline{y}=\\frac{{M}_{x}}{m}.[\/latex]<\/div>\n<\/section>\n<section class=\"textbox example\">\n<p>Suppose three point masses are placed in the <em>xy<\/em>-plane as follows (assume coordinates are given in meters):<\/p>\n<div id=\"fs-id1167794055621\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{c}{m}_{1}=2\\text{kg, placed at}(-1,3),\\hfill \\\\ {m}_{2}=6\\text{kg, placed at}(1,1),\\hfill \\\\ {m}_{3}=4\\text{kg, placed at}(2,-2).\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793370837\">Find the center of mass of the system.<\/p>\n\n[reveal-answer q=\"fs-id1167794064671\"]Show Solution[\/reveal-answer] [hidden-answer a=\"fs-id1167794064671\"]\n\n<p id=\"fs-id1167794064671\">First we calculate the total mass of the system:<\/p>\n<div id=\"fs-id1167793926093\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]m=\\sum _{i=1}^{3}{m}_{i}=2+6+4=12\\text{kg}\\text{.}[\/latex]<\/div>\n<p id=\"fs-id1167793254890\">Next we find the moments with respect to the [latex]x[\/latex]- and [latex]y[\/latex]-axes:<\/p>\n<div id=\"fs-id1167793604254\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{}\\\\ \\\\ {M}_{y}=\\sum _{i=1}^{3}{m}_{i}{x}_{i}=-2+6+8=12,\\hfill \\\\ {M}_{x}=\\sum _{i=1}^{3}{m}_{i}{y}_{i}=6+6-8=4.\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793277946\">Then we have<\/p>\n<div id=\"fs-id1167793639823\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{{M}_{y}}{m}=\\frac{12}{12}=1\\text{ and }\\overline{y}=\\frac{{M}_{x}}{m}=\\frac{4}{12}=\\frac{1}{3}.[\/latex]<\/div>\n<p id=\"fs-id1167794099730\">The center of mass of the system is [latex](1,1\\text{\/}3),[\/latex] in meters.<\/p>\n<p>[\/hidden-answer]<\/p>\n<\/section>\n","rendered":"<section class=\"textbox learningGoals\">\n<ul>\n<li>Find the balance point (center of mass) of straight objects and flat surfaces<\/li>\n<li>Utilize a shape\u2019s symmetry to find the centroid, or geometric center, of flat objects<\/li>\n<li>Use Pappus\u2019s theorem to calculate the volume of an object<\/li>\n<\/ul>\n<\/section>\n<h2>Center of Mass and Moments<\/h2>\n<p>The basic idea of the <strong>center of mass<\/strong> is the notion of a balancing point. Many of us have seen performers who spin plates on the ends of sticks. The performers try to keep several of them spinning without allowing any of them to drop. If we look at a single plate (without spinning it), there is a sweet spot on the plate where it balances perfectly on the stick. If we put the stick anywhere other than that sweet spot, the plate does not balance and it falls to the ground. Mathematically, that sweet spot is called the <em>center of mass of the plate<\/em>.<\/p>\n<h3>Center of Mass of Objects on a Line<\/h3>\n<p id=\"fs-id1167793961633\">Let\u2019s begin by looking at the center of mass in a one-dimensional context.<\/p>\n<p>Consider a long, thin wire or rod of negligible mass resting on a fulcrum, as shown in Figure 1(a). Now suppose we place objects having masses [latex]{m}_{1}[\/latex] and [latex]{m}_{2}[\/latex] at distances [latex]{d}_{1}[\/latex] and [latex]{d}_{2}[\/latex] from the fulcrum, respectively, as shown in Figure 1(b).<\/p>\n<figure style=\"width: 448px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2332\/2018\/01\/11213241\/CNX_Calc_Figure_06_06_001.jpg\" alt=\"This figure has two images. The first image is a horizontal line on top of an equilateral triangle. It represents a rod on a fulcrum. The second image is the same as the first with two squares on the line. They are labeled msub1 and msub2. The distance from msub1 to the fulcrum is dsub1. The distance from msub2 to the fulcrum is dsub2.\" width=\"448\" height=\"354\" \/><figcaption class=\"wp-caption-text\">Figure 1. (a) A thin rod rests on a fulcrum. (b) Masses are placed on the rod.<\/figcaption><\/figure>\n<section class=\"textbox example\">\n<p>The most common real-life example of a system like this is a playground seesaw, or teeter-totter, with children of different weights sitting at different distances from the center. On a seesaw, if one child sits at each end, the heavier child sinks down and the lighter child is lifted into the air. If the heavier child slides in toward the center, though, the seesaw balances<\/p>\n<\/section>\n<p id=\"fs-id1167794121480\">Applying this concept to the masses on the rod, we note that the masses balance each other if and only if [latex]{m}_{1}{d}_{1}={m}_{2}{d}_{2}.[\/latex]<\/p>\n<p id=\"fs-id1167793631454\">In the seesaw example, we balanced the system by moving the masses (children) with respect to the fulcrum. However, we are really interested in systems in which the masses are not allowed to move, and instead we balance the system by moving the fulcrum.<\/p>\n<p>Suppose we have two point masses, [latex]{m}_{1}[\/latex] and [latex]{m}_{2},[\/latex] located on a number line at points [latex]{x}_{1}[\/latex] and [latex]{x}_{2},[\/latex] respectively (Figure 2). The center of mass, [latex]\\overline{x},[\/latex] is the point where the fulcrum should be placed to make the system balance.<\/p>\n<figure style=\"width: 403px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2332\/2018\/01\/11213244\/CNX_Calc_Figure_06_06_002.jpg\" alt=\"This figure is an image of the x-axis. On the axis there is a point labeled x bar. Also on the axis there is a point xsub1 with a square above it. Inside of the square is the label msub1. There is also a point xsub2 on the axis. Above this point there is a square. Inside of the square is the label msub2.\" width=\"403\" height=\"81\" \/><figcaption class=\"wp-caption-text\">Figure 2. The center of mass [latex]\\overline{x}[\/latex] is the balance point of the system.<\/figcaption><\/figure>\n<p id=\"fs-id1167794042461\">Thus, we have<\/p>\n<div id=\"fs-id1167793267623\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{ccc}\\hfill {m}_{1}|{x}_{1}-\\overline{x}|& =\\hfill & {m}_{2}|{x}_{2}-\\overline{x}|\\hfill \\\\ \\hfill {m}_{1}(\\overline{x}-{x}_{1})& =\\hfill & {m}_{2}({x}_{2}-\\overline{x})\\hfill \\\\ \\hfill {m}_{1}\\overline{x}-{m}_{1}{x}_{1}& =\\hfill & {m}_{2}{x}_{2}-{m}_{2}\\overline{x}\\hfill \\\\ \\hfill \\overline{x}({m}_{1}+{m}_{2})& =\\hfill & {m}_{1}{x}_{1}+{m}_{2}{x}_{2}\\hfill \\\\ \\hfill \\overline{x}& =\\hfill & \\frac{{m}_{1}{x}_{1}+{m}_{2}{x}_{2}}{{m}_{1}+{m}_{2}}.\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167794126756\">The expression in the numerator, [latex]{m}_{1}{x}_{1}+{m}_{2}{x}_{2},[\/latex] is called the <em>first moment of the system with respect to the origin. <\/em>If the context is clear, we often drop the word &#8220;first&#8221; and just refer to this expression as the <strong>moment<\/strong> <strong>of the system<\/strong>.<\/p>\n<p>The expression in the denominator, [latex]{m}_{1}+{m}_{2},[\/latex] is the total mass of the system. Thus, the center of mass of the system is the point at which the total mass of the system could be concentrated without changing the moment.<\/p>\n<p id=\"fs-id1167793883536\">If there are more than two point masses, the center of mass is given by:<\/p>\n<div id=\"fs-id1167794296143\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\overline{x}=\\dfrac{\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}{x}_{i}}{\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}}[\/latex]<\/div>\n<section class=\"textbox keyTakeaway\">\n<h3>center of mass of objects on a line<\/h3>\n<p>Let [latex]{m}_{1},{m}_{2}\\text{,\u2026},{m}_{n}[\/latex] be point masses placed on a number line at points [latex]{x}_{1},{x}_{2}\\text{,\u2026},{x}_{n},[\/latex] respectively, and let [latex]m=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}[\/latex] denote the total mass of the system. Then, the moment of the system with respect to the origin is given by<\/p>\n<div id=\"fs-id1167793939667\" class=\"equation\" style=\"text-align: center;\">[latex]M=\\displaystyle\\sum_{i=1}^{n} {m}_{i}{x}_{i}[\/latex]<\/div>\n<p>&nbsp;<\/p>\n<p id=\"fs-id1167794049151\">and the center of mass of the system is given by<\/p>\n<div id=\"fs-id1167794002774\" class=\"equation\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{M}{m}.[\/latex]<\/div>\n<\/section>\n<section class=\"textbox example\">\n<p id=\"fs-id1167794314607\">Suppose four point masses are placed on a number line as follows:<\/p>\n<div id=\"fs-id1167794326988\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{cccc}{m}_{1}=30\\text{kg,}\\text{ placed a t}{x}_{1}=-2\\text{m}\\hfill & & & {m}_{2}=5\\text{kg,}\\text{ placed at }{x}_{2}=3\\text{m}\\hfill \\\\ {m}_{3}=10\\text{kg,}\\text{ placed at }{x}_{3}=6\\text{m}\\hfill & & & {m}_{4}=15\\text{kg,}\\text{ placed at }{x}_{4}=-3\\text{m}.\\hfill \\end{array}[\/latex]<\/div>\n<p>&nbsp;<\/p>\n<p>Find the moment of the system with respect to the origin and find the center of mass of the system.<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><button class=\"show-answer show-answer-button collapsed\" data-target=\"qfs-id1167793416711\">Show Solution<\/button> <\/p>\n<div id=\"qfs-id1167793416711\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167793416711\">First, we need to calculate the moment of the system:<\/p>\n<div id=\"fs-id1167794037693\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{cc}\\hfill M& = {\\displaystyle\\sum _{i=1}^{4}{m}_{i}{x}_{i}}\\hfill \\\\ & =-60+15+60-45=-30.\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793926787\">Now, to find the center of mass, we need the total mass of the system:<\/p>\n<div id=\"fs-id1167793918541\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{cc}\\hfill m& = {\\displaystyle\\sum _{i=1}^{4}{m}_{i}} \\hfill \\\\ & =30+5+10+15=60\\text{kg}\\text{.}\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793270685\">Then we have<\/p>\n<div id=\"fs-id1167794023334\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{M}{m}=\\frac{-30}{60}=-\\frac{1}{2}.[\/latex]<\/div>\n<p id=\"fs-id1167794040152\">The center of mass is located 1\/2 m to the left of the origin.<\/p>\n<\/div>\n<\/div>\n<\/section>\n<section class=\"textbox tryIt\">\n<iframe loading=\"lazy\" id=\"ohm223354\" class=\"resizable\" src=\"https:\/\/ohm.lumenlearning.com\/multiembedq.php?id=223354&theme=lumen&iframe_resize_id=ohm223354&source=tnh\" width=\"100%\" height=\"150\"><\/iframe><br \/>\n<\/section>\n<h3>Center of Mass of Objects in a Plane<\/h3>\n<p>We can generalize this concept to find the center of mass of a system of point masses in a plane.<\/p>\n<p>Let [latex]{m}_{1}[\/latex] be a point mass located at point [latex]({x}_{1},{y}_{1})[\/latex] in the plane. Then the moment [latex]{M}_{x}[\/latex] of the mass with respect to the [latex]x[\/latex]-axis is given by [latex]{M}_{x}={m}_{1}{y}_{1}.[\/latex] Similarly, the moment [latex]{M}_{y}[\/latex] with respect to the [latex]y[\/latex]-axis is given by [latex]{M}_{y}={m}_{1}{x}_{1}.[\/latex]<\/p>\n<section class=\"textbox proTip\">Notice that the [latex]x[\/latex]-coordinate of the point is used to calculate the moment with respect to the [latex]y[\/latex]-axis, and vice versa. The reason is that the [latex]x[\/latex]-coordinate gives the distance from the point mass to the [latex]y[\/latex]-axis, and the [latex]y[\/latex]-coordinate gives the distance to the [latex]x[\/latex]-axis.<\/p>\n<figure style=\"width: 267px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2332\/2018\/01\/11213246\/CNX_Calc_Figure_06_06_003.jpg\" alt=\"This figure has the x and y axes labeled. There is a point in the first quadrant at (xsub1, ysub1). This point is labeled msub1.\" width=\"267\" height=\"235\" \/><figcaption class=\"wp-caption-text\">Figure 3. Point mass [latex]{m}_{1}[\/latex] is located at point [latex]({x}_{1},{y}_{1})[\/latex] in the plane.<\/figcaption><\/figure>\n<\/section>\n<p>If we have several point masses in the [latex]xy[\/latex]-plane, we can use the moments with respect to the [latex]x[\/latex]&#8211; and [latex]y[\/latex]-axes to calculate the [latex]x[\/latex]&#8211; and [latex]y[\/latex]-coordinates of the center of mass of the system.<\/p>\n<section class=\"textbox keyTakeaway\">\n<h3>center of mass of objects in a plane<\/h3>\n<p id=\"fs-id1167794022817\">Let [latex]{m}_{1},{m}_{2}\\text{,\u2026},{m}_{n}[\/latex] be point masses located in the <em>xy<\/em>-plane at points [latex]({x}_{1},{y}_{1}),({x}_{2},{y}_{2})\\text{,\u2026},({x}_{n},{y}_{n}),[\/latex] respectively, and let [latex]m=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}[\/latex] denote the total mass of the system. Then the moments [latex]{M}_{x}[\/latex] and [latex]{M}_{y}[\/latex] of the system with respect to the [latex]x[\/latex]&#8211; and [latex]y[\/latex]-axes, respectively, are given by<\/p>\n<div id=\"fs-id1167794000383\" class=\"equation\" style=\"text-align: center;\">[latex]{M}_{x}=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}{y}_{i}\\text{ and }{M}_{y}=\\underset{i=1}{\\overset{n}{\\text{\u2211}}}{m}_{i}{x}_{i}.[\/latex]<\/div>\n<p id=\"fs-id1167793571151\">Also, the coordinates of the center of mass [latex](\\overline{x},\\overline{y})[\/latex] of the system are<\/p>\n<div id=\"fs-id1167793638645\" class=\"equation\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{{M}_{y}}{m}\\text{ and }\\overline{y}=\\frac{{M}_{x}}{m}.[\/latex]<\/div>\n<\/section>\n<section class=\"textbox example\">\n<p>Suppose three point masses are placed in the <em>xy<\/em>-plane as follows (assume coordinates are given in meters):<\/p>\n<div id=\"fs-id1167794055621\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{c}{m}_{1}=2\\text{kg, placed at}(-1,3),\\hfill \\\\ {m}_{2}=6\\text{kg, placed at}(1,1),\\hfill \\\\ {m}_{3}=4\\text{kg, placed at}(2,-2).\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793370837\">Find the center of mass of the system.<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><button class=\"show-answer show-answer-button collapsed\" data-target=\"qfs-id1167794064671\">Show Solution<\/button> <\/p>\n<div id=\"qfs-id1167794064671\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167794064671\">First we calculate the total mass of the system:<\/p>\n<div id=\"fs-id1167793926093\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]m=\\sum _{i=1}^{3}{m}_{i}=2+6+4=12\\text{kg}\\text{.}[\/latex]<\/div>\n<p id=\"fs-id1167793254890\">Next we find the moments with respect to the [latex]x[\/latex]&#8211; and [latex]y[\/latex]-axes:<\/p>\n<div id=\"fs-id1167793604254\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\begin{array}{}\\\\ \\\\ {M}_{y}=\\sum _{i=1}^{3}{m}_{i}{x}_{i}=-2+6+8=12,\\hfill \\\\ {M}_{x}=\\sum _{i=1}^{3}{m}_{i}{y}_{i}=6+6-8=4.\\hfill \\end{array}[\/latex]<\/div>\n<p id=\"fs-id1167793277946\">Then we have<\/p>\n<div id=\"fs-id1167793639823\" class=\"equation unnumbered\" style=\"text-align: center;\">[latex]\\overline{x}=\\frac{{M}_{y}}{m}=\\frac{12}{12}=1\\text{ and }\\overline{y}=\\frac{{M}_{x}}{m}=\\frac{4}{12}=\\frac{1}{3}.[\/latex]<\/div>\n<p id=\"fs-id1167794099730\">The center of mass of the system is [latex](1,1\\text{\/}3),[\/latex] in meters.<\/p>\n<\/div>\n<\/div>\n<\/section>\n","protected":false},"author":6,"menu_order":12,"template":"","meta":{"_candela_citation":"[{\"type\":\"cc\",\"description\":\"Calculus Volume 1\",\"author\":\"Gilbert Strang, Edwin (Jed) Herman\",\"organization\":\"OpenStax\",\"url\":\"https:\/\/openstax.org\/details\/books\/calculus-volume-1\",\"project\":\"\",\"license\":\"cc-by-nc-sa\",\"license_terms\":\"Access for free at https:\/\/openstax.org\/books\/calculus-volume-1\/pages\/1-introduction\"},{\"type\":\"original\",\"description\":\"2.6 Moments and Center of Mass\",\"author\":\"Ryan Melton\",\"organization\":\"\",\"url\":\"\",\"project\":\"\",\"license\":\"cc-by\",\"license_terms\":\"\"}]","pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":""},"chapter-type":[],"contributor":[],"license":[],"part":450,"module-header":"","content_attributions":[{"type":"cc","description":"Calculus Volume 1","author":"Gilbert Strang, Edwin (Jed) Herman","organization":"OpenStax","url":"https:\/\/openstax.org\/details\/books\/calculus-volume-1","project":"","license":"cc-by-nc-sa","license_terms":"Access for free at https:\/\/openstax.org\/books\/calculus-volume-1\/pages\/1-introduction"},{"type":"original","description":"2.6 Moments and Center of Mass","author":"Ryan Melton","organization":"","url":"","project":"","license":"cc-by","license_terms":""}],"internal_book_links":[],"video_content":null,"cc_video_embed_content":{"cc_scripts":"","media_targets":[]},"try_it_collection":null,"_links":{"self":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/pressbooks\/v2\/chapters\/471"}],"collection":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/pressbooks\/v2\/chapters"}],"about":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/wp\/v2\/types\/chapter"}],"author":[{"embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/wp\/v2\/users\/6"}],"version-history":[{"count":0,"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/pressbooks\/v2\/chapters\/471\/revisions"}],"part":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/pressbooks\/v2\/parts\/450"}],"metadata":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/pressbooks\/v2\/chapters\/471\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/wp\/v2\/media?parent=471"}],"wp:term":[{"taxonomy":"chapter-type","embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/pressbooks\/v2\/chapter-type?post=471"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/wp\/v2\/contributor?post=471"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus2\/wp-json\/wp\/v2\/license?post=471"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}