1 / 22

Centroid/CG/CM...so far

Centroid/CG/CM...so far. Apply to differential elements of mass (dm) dm can either be (assuming constant r) dA (for 2D problem) dl (for wire problem) dV (for volume problem) OR r (x,y,z) times any of above (for inhomogeneous density).

conlan
Download Presentation

Centroid/CG/CM...so far

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Centroid/CG/CM...so far • Apply to differential elements of mass (dm) • dm can either be (assuming constant r) • dA (for 2D problem) • dl (for wire problem) • dV (for volume problem) • OR r(x,y,z) times any of above (for inhomogeneous density)

  2. Given: The area as shown. Find: The x of the centroid. Plan: Follow the steps. Solution 1. Choose dA as a horizontal rectangular strip. (x1,,y) (x2,y) • 2. dA = ( x2– x1) dy • = ((2 – y) – y2) dy • 3. x = ( x1 + x2) / 2 • = 0.5 (( 2 – y) + y2 ) Example 2D Problem (dm = dA) ~

  3. ~ 4. x = ( A x dA ) / ( A dA ) 1 A dA = 0 ( 2 – y – y2) dy [ 2 y – y2 / 2 – y3 / 3] 1 = 1.167 m2 0 ~ 1 A x dA = 0 0.5 ( 2 – y + y2 ) ( 2 – y – y2 ) dy = 0.5 0 ( 4 – 4 y + y2 – y4 ) dy = 0.5 [ 4 y – 4 y2 / 2 + y3 / 3 – y5 / 5 ] 1 = 1.067 m3 1 0 x = 1.067 / 1.167 = 0.914 m Example 2D Problem (continued)

  4. Given: The wire segment shown. Find: The x of the centroid. • 2. dl=√ dx2+dy2 = √1 + dx2/dy2 dy • since y2=4x, dx = y/2 dy • dl = √1 + (y/2)2 dy = (½) √4 +y2 dy • 3. L = ʃ dl = ʃ (½) √4 +y2 dy = 5.92 • 4. x = ʃ x dl /L = ʃ (y2/4) (½) √4 +y2 dy/L = 1.64 Example 1D Problem (dm = dl) Solution 1. Choose dl as a tiny piece at (x,y) Mass dm = length of dl ~ x=x=y2/4 4 ~ 0 ~ 4 0

  5. HELP WITH INTEGRATION • 1D problems especially can be difficult • Use integral tables (link online) • or www.WolframAlpha.com (matlab, freemat also work, little more work)

  6. Given: The volume shown. Find: The y of the centroid. Solution 1. Choose dV as a vertical disk slice • 2. dV = π z2 dy • = π (y2 – 9 ) dy • 3. V = ʃdV= π ʃ (y2 – 9 ) dy = 46.08 • 4. y = ʃ y dV/ V = π ʃ y (y2 – 9 ) dy / V • = 4.36 (x1,,y) (x2,y) Example 3D Problem (dm = dV) 5 3 ~ 5 3

  7. COMPOSITE BODIES • Today’s Objective: • Students will be able to determine: • The location of the center of gravity. • The location of the center of mass. • The location of the centroid using the method of composite bodies. • In-Class Activities: • Check homework, if any • Reading Quiz • Applications • Method of Composite Bodies. • Concept Quiz • Group Problem Solving • Attention Quiz

  8. READING QUIZ • 1. A composite body in this section refers to a body made of ____. • A) carbon fibers and an epoxy matrix • B) steel and concrete • C) a collection of “simple” shaped parts or holes • D) a collection of “complex” shaped parts or holes • 2. The composite method for determining the location of the center of gravity of a composite body requires _______. • A) integration B) differentiation • C) simple arithmetic D) All of the above.

  9. APPLICATIONS The I-beam is commonly used in building structures. When doing a stress analysis on an I - beam, the location of the centroid is very important. How can we easily determine the location of the centroid for a given beam shape?

  10. APPLICATIONS (continued) Cars, trucks, bikes, etc., are assembled using many individual components. When designing for stability on the road, it is important to know the location of the bikes’ center of gravity (CG). If we know the weight and CG of individual components, how can we determine the location of the CG of the assembled unit?

  11. a b a e b e d d CONCEPT OF A COMPOSITE BODY Many industrial objects can be considered as composite bodies made up of a series of connected “simpler” shaped parts or holes, like a rectangle, triangle, and semicircle. Knowing the location of the centroid, C, or center of gravity, G, of the simpler shaped parts, we can easily determine the location of the C or G for the more complex composite body.

  12. a b a e b e d d CONCEPT OF A COMPOSITE BODY (continued) This can be done by considering each part as a “particle” and following the procedure as described in Section 9.1. This is a simple, effective, and practical method of determining the location of the centroid or center of gravity.

  13. 4. Sum the columns to get x, y, and z. Use formulas like x = (  xi Ai ) / (  Ai ) or x = (  xi Wi ) / (  Wi ) This approach will become clear by doing examples!   STEPS FOR ANALYSIS 1. Divide the body into pieces that are known shapes. Holes are considered as pieces with negative weight or size. 2. Make a table with the first column for segment number, the second column for weight, mass, or size (depending on the problem), the next set of columns for the moment arms, and, finally, several columns for recording results of simple intermediate calculations. 3. Fix the coordinate axes, determine the coordinates of the center of gravity of centroid of each piece, and then fill-in the table.

  14. a c b d EXAMPLE Given: The part shown. Find: The centroid of the part. Plan:Follow the steps for analysis. Solution: 1. This body can be divided into the following pieces: rectangle (a) + triangle (b) + quarter circular (c) – semicircular area (d)

  15. a c b d     Segment Area A(in2) x(in) y(in) A x( in3) A y( in3) RectangleTriangle Q. CircleSemi-Circle 184.59  / 4–  / 2 37– 4(3) / (3 )0 1.51 4(3) / (3 )4(1) / (3 ) 5431.5– 9 0 274.59 - 2/3  28.0 76.5 39.83 EXAMPLE (continued) Steps 2 & 3: Make up and fill the table using parts a, b, c, and d.

  16. · C  x = (  x A) / (  A ) = 76.5 in3/ 28.0 in2 = 2.73 in y = (  y A) / ( A ) = 39.83 in3 / 28.0 in2 = 1.42 in  EXAMPLE (continued) 4. Now use the table data and these formulas to find the coordinates of the centroid.

  17. 1 cm 3cm 1 cm 3cm C G 30º A B CONCEPT QUIZ 1. Based on the typical centroid information available in handbooks, what are the minimum number of segments you will have to consider for determing the centroid of the given area? 1, 2, 3, or 4 2. A storage box is tilted up to clean the rug underneath the box. It is tilted up by pulling the handle C, with edge A remaining on the ground. What is the maximum angle of tilt (measured between bottom AB and the ground) possible before the box tips over? A) 30° B) 45 ° C) 60 ° D) 90 °

  18. GROUP PROBLEM SOLVING Given: Two blocks of different materials are assembled as shown. The densities of the materials are: A = 150 lb / ft3 and B = 400 lb / ft3. Find: The center of gravity of this assembly. Plan: Follow the steps for analysis. Solution 1. In this problem, the blocks A and B can be considered as two segments.

  19.      Segment w (lb) x (in) y (in) z (in) w x (lb·in) w y (lb·in) wz (lb·in) A B 3.125 16.67 4 1 1 3 2 3 12.5 16.67 3.125 50.00 6.25 50.00  19.79 29.17 53.12 56.25 GROUP PROBLEM SOLVING (continued) Weight = w =  (Volume in ft3) wA = 150 (0.5) (6) (6) (2) / (12)3 = 3.125 lb wB = 400 (6) (6) (2) / (12)3 = 16.67 lb

  20. ~ x = ( x w) / ( w ) = 29.17/19.79 = 1.47 in y = ( y w) / ( w ) = 53.12/ 19.79 = 2.68 in z = ( z w) / ( w ) = 56.25 / 19.79 = 2.84 in ~ ~ GROUP PROBLEM SOLVING (continued)

  21. y 2cm 4cm x 2cm 2cm 2. For determining the centroid of the area, two square segments are considered; square ABCD and square DEFG. What are the coordinates (x, y ) of the centroid of square DEFG? A) (1, 1) m B) (1.25, 1.25) m C) (0.5, 0.5 ) m D) (1.5, 1.5) m y 1m 1m A D ~ ~ E 1m G F 1m x B C ATTENTION QUIZ 1. A rectangular area has semicircular and triangular cuts as shown. For determining the centroid, what is the minimum number of pieces that you can use? A) Two B) Three C) Four D) Five

  22. End of the Lecture Let Learning Continue

More Related