area moment of_intertia
TRANSCRIPT
12/2/2013
1
Area Moment of InertiaEngineering Mechanics- Distributed Forces
• Encounter in the engineering problems involving deflection, bending, buckling in statics
Moment of Inertia of an Area• Consider distributed forces F whose magnitudes are proportional to the
elemental areas on which they act and also vary linearly with the distance of from a given axis.
AA
2M y dA• The integral is already familiar from our study of centroids.
• The integral is known as the area moment of inertia, or more precisely, the second moment of the area.
y dA
y2 dA
Engineering Mechanics- Distributed Forces
12/2/2013
2
Moment of Inertia of an Area by Integration• Second moments or moments of inertia of
an area with respect to the x and y axes,
dAxIdAyI yx22
• Evaluation of the integrals is simplified by choosing dA to be a thin strip parallel to one of the coordinate axes.
• For a rectangular area,3
31
0
22 bhbdyydAyIh
x
• The formula for rectangular areas may also be applied to strips parallel to the axes,
dxyxdAxdIdxydI yx223
31
Engineering Mechanics- Distributed Forces
Polar Moment of Inertia
• The polar moment of inertia is an important parameter in problems involving torsion of cylindrical shafts and rotations of slabs.
dArJ 20
• The polar moment of inertia is related to the rectangular moments of inertia,
xy II
dAydAxdAyxdArJ
222220
Engineering Mechanics- Distributed Forces
12/2/2013
3
Radius of Gyration of an Area• Consider area A with moment of inertia
Ix. Imagine that the area is concentrated in a thin strip parallel to the x axis with equivalent Ix.
AIkAkI x
xxx 2
kx = radius of gyration with respect to the x axis
• Similarly,
AJkAkJ
AI
kAkI
OOOO
yyyy
2
2
222yxO kkk
Engineering Mechanics- Distributed Forces
Sample Problem
Determine the moment of inertia of a triangle with respect to its base.
SOLUTION:
• A differential strip parallel to the x axis is chosen for dA.dIx y2dA dA l dy
• For similar triangles,
lb h y
hl b h y
hdA b h y
hdy
• Integrating dIx from y = 0 to y = h,
h
hh
x
yyhhb
dyyhyhbdy
hyhbydAyI
0
43
0
32
0
22
43
12
3bhI x
Could a vertical strip have been chosen for the calculation? What is the disadvantage to that choice?
Engineering Mechanics- Distributed Forces
12/2/2013
4
Sample Problem
a) Determine the centroidal polar moment of inertia of a circular area by direct integration.
b) Using the result of part a, determine the moment of inertia of a circular area with respect to a diameter of the area.
SOLUTION:
• An annular differential area element is chosen,
dJ O u 2dA dA 2 u du
JO dJ O u 2 2 u du 0
r 2 u 3du
0
r
42
rJO
• From symmetry, Ix = Iy,
JO Ix Iy 2Ix2
r 4 2I x
44
rII xdiameter
Why was an annular differential area chosen? Would a rectangular area have worked?
Engineering Mechanics- Distributed Forces
Sample ProblemEngineering Mechanics- Distributed Forces
12/2/2013
5
Determine the moment of inertia of the area under the parabola about the x-axis
Engineering Mechanics- Distributed Forces
Sample Problem
Parallel Axis Theorem
• Consider moment of inertia I of an area Awith respect to the axis AA’
dAyI 2
• The axis BB’ passes through the area centroid and is called a centroidal axis.
dAddAyddAy
dAdydAyI22
22
2
2AdII parallel axis theorem
Engineering Mechanics- Distributed Forces
12/2/2013
6
Parallel Axis Theorem• Moment of inertia IT of a circular area with
respect to a tangent to the circle,
4
45
224412
r
rrrAdIIT
• Moment of inertia of a triangle with respect to a centroidal axis,
IA A I B B Ad 2
I B B IA A Ad 2 112 bh3 1
2 bh 13 h 2
136 bh3
Engineering Mechanics- Distributed Forces
Sample ProblemEngineering Mechanics- Distributed Forces
Determine the moment of inertia of the half circle with respect to the x-axis
12/2/2013
7
Moments of Inertia of Composite Areas• The moment of inertia of a composite area A about a given axis is
obtained by adding the moments of inertia of the component areas A1, A2, A3, ... , with respect to the same axis.
Engineering Mechanics- Distributed Forces
Sample Problem
Determine the moment of inertia of the shaded area with respect to the x axis.
SOLUTION:
• Compute the moments of inertia of the bounding rectangle and half-circle with respect to the x axis.
• The moment of inertia of the shaded area is obtained by subtracting the moment of inertia of the half-circle from the moment of inertia of the rectangle.
Engineering Mechanics- Distributed Forces
12/2/2013
8
Sample ProblemSOLUTION:• Compute the moments of inertia of the bounding
rectangle and half-circle with respect to the x axis.
Rectangle: 463
313
31 mm102138120240 .bhI x
Half-circle: Moment of inertia with respect to AA’,
464814
81 mm10762590 .rI AA
23
2212
21
mm1072.12
90
mm 81.8a-120b
mm 2.383
90434
rA
ra
Moment of inertia with respect to x’,
46
2362
mm10207)238(107212107625
....AaII AAx
Moment of inertia with respect to x,
46
2362
mm10392
88110721210207
....AbII xx
Engineering Mechanics- Distributed Forces
Sample Problem • The moment of inertia of the shaded area is obtained by
subtracting the moment of inertia of the half-circle from the moment of inertia of the rectangle.
46 mm109.45 xI
xI 46 mm102.138 46 mm103.92
Engineering Mechanics- Distributed Forces