tablas gere.pdf
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966
Notation: A area
x,y distances to centroid CIx,Iy moments of inertia with respect to thexandy axes,
respectively
Ixy product of inertia with respect to thexandy axes
IPIxIy polar moment of inertia with respect to the origin of
thexandy axes
IBB moment of inertia with respect to axisB-B
1 Rectangle (Origin of axes at centroid)
A bh x b
2 y
h
2
Ix b
1
h
2
3
Iy h
1
b
2
3
Ixy 0 IP b
1
h
2 (h2 b2)
2 Rectangle (Origin of axes at corner)
Ix b
3
h3 Iy
h
3
b3 Ixy
b2
4
h2 IP
b
3
h (h2 +b2)
IBB6(b
b2
3
h3
h2)
3 Triangle (Origin of axes at centroid)
A b
2
h x
b
3
c y
h
3
Ixb
3
h
6
3
Iy b
3
h
6 (b2 bc c2)
Ixyb
7
h
2
2
(b 2c) IP b
3
h
6 (h2 b2 bc c2)
y
c
h
b
C x
x
y
y
x
h
b
O
B
B
y
x
xhy
b
C
Properties of Plane Areas
D
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APPENDIX D Properties of Plane Areas 967
4 Triangle (Origin of axes at vertex)
Ixb
1
h
2
3
Iy b
1
h
2 (3b2 3bc c2)
Ixy b
2
h
4
2
(3b 2c) IBBb
4
h3
5 Isosceles triangle (Origin of axes at centroid)
A b
2
h x
b
2 y
h
3
Ix
b
3
h
6
3
Iy
h
4
b
8
3
Ixy 0
IP 1
b
4
h
4 (4h2 3b2) IBB
b
1
h
2
3
(Note: For an equilateral triangle, h3b/2.)
6 Right triangle (Origin of axes at centroid)
A b
2
h x
b
3
y h
3
Ixb
3
h
6
3
Iy h
3
b
6
3
Ixy b
7
2h
2
2
IP b
3
h
6 (h2 b2) IBB
b
1
h
2
3
7 Right triangle (Origin of axes at vertex)
Ix
b
1
h
2
3
Iy
h
1
b
2
3
Ixy
b
2
2h
4
2
IP b
1
h
2 (h2 b2) IBB
b
4
h3
8 Trapezoid (Origin of axes at centroid)
Ah(a
2
b) y
h
3
(
(
2
a
a
b
b
)
)
Ix
h3(a2
36
(a
4
ab
b
)
b2)
IBBh3(3
1
a
2
b)
y
y xh
b
a
B B
C
y
x
h
b
B B
O
y
y x
xh
b
BC
B
B B
C
y
x
b
h
y
x
yc
h
bO
B B
x
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APPENDIX D Properties of Plane Areas 969
14 Circular segment (Origin of axes at center of circle)
a angle in radians (a p/2)
A r2(a sina cosa) y 23r
a ssiinn
3
aacosa
Ix
r
4
4
(a sina cosa 2 sin3 acosa) Ixy 0
Iy 1
r
2
4
(3a 3 sin acosa 2 sin3 acosa)
15 Circle with core removed (Origin of axes at center of circle)
a angle in radians (a p/2)
a arccos a
r br2 a2 A 2r2a ar
b2
Ix r
6
4
3a 3ra2
b
2a
r4b3 Iy r2
4
a arb2
2a
r4b3 Ixy 0
16 Ellipse (Origin of axes at centroid)
A pab Ixpa
4
b3 Iy
pb
4
a3
Ixy 0 IPp
4
ab (b2 a2)
Circumferencep[1.5(a b)ab] (a/3 b a)
4.17b2
/a 4a (0 b a/3)
17 Parabolic semisegment (Origin of axes at corner)
y f(x) h1 bx2
2
A2
3
bh x
3
8
b y
2
5
h
Ix
1
1
6
0
b
5
h3
Iy
2
1
h
5
b3
Ixy
b
1
2h
2
2
y
x
b
a a
b
C
a
a
y
x
a
2a
br
b
C
a a
C
O
y
y
x
r
y =f(x)
y
x
y
x
C
O b
h
Vertex
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970 APPENDIX D Properties of Plane Areas
18 Parabolic spandrel (Origin of axes at vertex)
yf(x) h
b
x2
2
A b
3
h x
3
4
b y
3
1
h
0
Ixb
2
h
1
3
Iy h
5
b3 Ixy
b
1
2h
2
2
19 Semisegment of nth degree (Origin of axes at corner)
yf(x) h1 xbnn
(n 0)
A bhnn
1 xb2
(
(
n
n
1
2
)
) y
2n
h
n
1
Ix Iy3(
h
n
b
3n
3) Ixy
4(n
b2
1
h
)
2
(
n
n
2
2)
20 Spandrel of nth degree (Origin of axes at point of tangency)
yf(x) h
b
xn
n
(n 0)
An
b
h
1 x
b(
n
n
2
1) y
2
h
(
(
2
n
n
1
1
)
)
Ix3(3
b
n
h
3
1) Iy
n
h
b3
3 Ixy
4(n
b2
h2
1)
21 Sine wave (Origin of axes at centroid)
A
4
p
bh
y
p
8
h
Ix 98
p
1
p
6bh3 0.08659bh3 Iy p
4
p
323hb3 0.2412hb3
Ixy 0 IBB8
9
b
p
h3
22 Thin circular ring (Origin of axes at center)Approximate formulas for case when tis small
A 2prt pdt IxIy pr3t
p
8
d3t
Ixy 0 IP 2pr3t
pd
4
3t
y
x
t
C
r
d= 2r
2bh3n3
(n 1)(2n 1)(3n 1)
y
h
b
x
x
CO
Vertex
y =f(x)
C
O
y
y =f(x)
y
x
x
b
h
y
x
xh
b
OC y
y =f(x)
y
yh
b b
xB B
C
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APPENDIX D Properties of Plane Areas 971
23 Thin circular arc (Origin of axes at center of circle)Approximate formulas for case when tis small
b angle in radians (Note: For a semicircular arc, b p/2.)
A 2brt yrsi
b
nb
Ix r3t(b sinb cosb) Iy r
3t(b sin b cos b)
Ixy 0 IBB r3t2b2
sin2b
1 c
b
os2b
24 Thin rectangle (Origin of axes at centroid)
Approximate formulas for case when tis small
A bt
Ix t
1
b
2
3
sin2 b Iy t
1
b
2
3
cos2 b IBB tb
3
3
sin2 b
25 Regular polygon with n sides (Origin of axes at centroid)
C centroid (at center of polygon)
n number of sides (n 3) b length of a side
b central angle for a side a interior angle (or vertex angle)
b36
n
0 a nn
2180 a b 180
R1 radius of circumscribed circle (line CA) R2 radius of inscribed circle (line CB)
R1 b
2
csc b
2
R2 b
2
cot b
2
A n
4
b2 cot
b
2
Ic moment of inertia about any axis through C(the centroid Cis a principal point and
every axis through Cis a principal axis)
Ic 1
n
9
b
2
4
cotb23cot2 b
2 1 IP 2Ic
y
x
B B
C
b
t
b
y
y
x
B BC
b b
t
r
O
b
b
a
C
BA
R1 R2
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