VECTOR MECHANICS FOR ENGINEERS: STATICS
VECTOR MECHANICS FOR ENGINEERS: STATICS
12th Edition
ISBN: 9781260912814
Author: BEER
Publisher: MCG
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Chapter 5, Problem 5.138RP

5.137 and 5.138 Locate the centroid of the plane area shown.

Chapter 5, Problem 5.138RP, 5.137 and 5.138 Locate the centroid of the plane area shown. Fig. P5.137 Fig. P5.138 , example  1

Fig. P5.137

Chapter 5, Problem 5.138RP, 5.137 and 5.138 Locate the centroid of the plane area shown. Fig. P5.137 Fig. P5.138 , example  2

Fig. P5.138

Expert Solution & Answer
Check Mark
To determine

The centroid of the plane shown.

Answer to Problem 5.138RP

The centroid of the plane area (X¯,Y¯) is (92.0mm, 23.3mm).

Explanation of Solution

Refer Figures 1 and 2.

VECTOR MECHANICS FOR ENGINEERS: STATICS, Chapter 5, Problem 5.138RP , additional homework tip  1

Figure 1

VECTOR MECHANICS FOR ENGINEERS: STATICS, Chapter 5, Problem 5.138RP , additional homework tip  2

Figure 2

The plane is considered as three separate sections as in figure 1. Section 1 is a perpendicular triangle, section 2 is a square and section 3 is a quarter of a circle.

Write an expression to calculate the area of section 1.

A1=12bh (I)

Here, A1 is the area of section 1, b is the base of the triangle and h is the height of the triangle.

Write an expression to calculate the area of section 2.

A2=a2 (II)

Here, A2 is the area of section 2, a is one side of the square.

Write an expression to calculate the area of section 3.

A3=14(πr2) (III)

Here, A3 is the area of section 3 and r is the radius of the circle.

Write an expression to calculate the area of the plane.

A=A1+A2+A3 (IV)

Here, A is the area of the plane.

Write an expression to calculate the x component of the centroid of the plane.

X¯=1n(x¯iAi)A (V)

Here, X¯ is the x component of the centroid of the plane, Ai is the area of each section and x¯i is the centroid of each section.

There are three sections in the plane. Rewrite equation (V) according to the plane.

X¯=x1¯A1+x2¯A2+x3¯A3A (VI)

Here, x1¯ is the x component of the centroid of section 1, x2¯ is the x component of the centroid of section 2 and x3¯ is the x component of section 3.

Write an expression to calculate the y component of the centroid of the plane.

Y¯=1n(y¯iAi)A (VII)

Here, Y¯ is the y component of the centroid of the plane and y¯i is the centroid of each section.

There are two sections in the plane. Rewrite equation (VII) according to the plane.

Y¯=y1¯A1+y2¯A2+y3¯A3A (VIII)

Here, y1¯ is the y component of the centroid of section 1, y2¯ is the y component of the centroid of section 2 and y3¯ is the y component of section 3.

Conclusion:

Substitute 120mm for b, and 75mm for h in equation (I) to find A1.

A1=12(120mm)(75mm)=4500mm2

Substitute 75mm for a in equation (II) to find A2.

A2=(75mm)2=5625mm2

Substitute 75mm for r in equation (III) to find A3.

A3=14π(75mm)2=4417.9mm2

Substitute 4500mm2 for A1, 5625mm2 for A2, and 4417.9mm2 for A3 in equation (IV) to find A.

A=(4500mm2)+(5625mm2)+(4417.9mm2)=5707.1mm2

Substitute 80mm for x1¯, 4500mm2 for A1, 5625mm2 for A2, 157.5mm for x2¯, 163.169mm for x3¯, 4417.9mm2 for A3 and 5707.1mm2 for A in equation (VI) to find X¯.

X¯=(80mm)(4500mm2)+(157.5mm)(5625mm2)+(163.169mm)(4417.9mm2)5707.1mm2=360000mm3+885940mm3720860mm35707.1mm2=525080mm35707.1mm2=92.0mm

Substitute 25mm for y1¯, 4500mm2 for A1, 5625mm2 for A2, 37.5mm for y2¯, 43.169mm2 for y3¯, 4417.9mm2 for A3 and 5707.1mm2 for A in equation (VIII) to find Y¯.

X¯=(25mm)(4500mm2)+(37.5mm)(5625mm2)+(43.169mm)(4417.9mm2)5707.1mm2=112500mm3+210940mm3190716mm35707.1mm2=132724mm35707.1mm2=23.3mm

Thus, the centroid of the plane area (X¯,Y¯) is (92.0mm, 23.3mm).

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Chapter 5 Solutions

VECTOR MECHANICS FOR ENGINEERS: STATICS

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