Engineering Mechanics

(Joyce) #1

(^114) „„„„„ A Textbook of Engineering Mechanics
We know that distance between the centre of gravity of the section and bottom face,
11 2 2
12
(2000 50) (1200 10)
35 mm
2000 1200
ay a y
y
aa



  • ×+ ×
    == =
    ++
    We know that moment of inertia of rectangle (1) about an axis through its centre of gravity
    and parallel to X-X axis,
    3
    64
    1
    20 (100)
    1.667 10 mm
    G 12
    I
    ×
    ==×
    and distance of centre of gravity of rectangle (1) from X-X axis,
    h 1 = 50 – 35 = 15 mm
    ∴ Moment of inertia of rectangle (1) about X-X axis
    (^) =+ =IahG 1126 (1. 6 6 7× + ×10 ) [ 20 0 0 (1 5) ]^2 = 2.117 × 10^6 mm^4
    Similarly, moment of inertia of rectangle (2) about an axis through its centre of gravity and
    parallel to X-X axis,
    3
    64
    2
    60 (20)
    0.04 10 mm
    12
    IG
    ×

    and distance of centre of gravity of rectangle (2) from X-X axis,
    h 2 = 35 – 10 = 25 mm
    ∴ Moment of inertia of rectangle (2) about X-X axis
    (^) =+= × + ×IahG 2226 (0.04 10 ) [1200 (25) ]^2 = 0.79 × 10^6 mm^4
    Now moment of inertia of the whole section about X-X axis,
    IXX = (2.117 × 10^6 ) + (0.79 × 10^6 ) = 2.907 × 10^6 mm^4 Ans.
    Moment of inertia about centroidal Y-Y axis
    Let left face of the angle section be the axis of reference.
    Rectangle (1)
    a 1 = 2000 mm^2 ...(As before)
    and 1
    20
    10 mm
    2
    x ==
    Rectangle (2)
    a 2 = 1200 mm^2 ...(As before)
    and 2
    60
    20 50 mm
    2
    x =+ =
    We know that distance between the centre of gravity of the section and left face,
    11 2 2
    12
    (2000 10) (1200 50)
    25 mm
    2000 1200
    ax a x
    x
    aa

  • ×+ ×
    == =
    ++
    We know that moment of inertia of rectangle (1) about an axis through its centre of gravity
    and parallel to Y-Y axis,
    3
    64
    1
    100 (20)
    0.067 10 mm
    12
    IG
    ×
    ==×
    and distance of centre of gravity of rectangle (1) from Y-Y axis,
    h 1 = 25 – 10 = 15 mm
    ∴ Moment of inertia of rectangle (1) about Y-Y axis
    (^) =+ =IahG 11126 (0.067× +10 ) [2000×(15) ]^2 = 0.517 × 10^6 mm^4

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