Engineering Mechanics

(Joyce) #1

(^334) „„„„„ A Textbook of Engineering Mechanics
l 1 = Horizontal length between A and C, and
l 2 = Horizontal length between C and B.
Let us imagine the portion CB of the string to be extended to CB 1 , such that the new support B 1
is at the same level as that of A. Similarly, imagine the portion AC of the cable to be cut short to A 1 C,
such that the new support A 1 is at the same level as that of B. From the geometry of the figure, we find
that the cable ACB 1 has a span of 2l 1 and a central dip of (yc + d), whereas the cable A 1 CB has a span
of 2l 2 and a central dip of yc.
We have discussed in Art. 15.8 that the length of the cable,
8 2
3
Ll yc
l
=+
∴ Length of the cable ACB 1 ,
22
11 1
11
8( ) 8( )
22
32 6
Ll ydcclyd
ll
++
=+ =+
× ...(i)
Similarly, length of the cable A 1 CB,
22
22 2
22
88
22
32 6
Ll yyccl
ll
=+ =+
×
...(ii)
Now total length of the cable ACB,
2 2
12
12
12
1 8( ) 8
22
22 6 6
Ll lLL ydccy
ll



  • ⎛⎞+
    ==+⎜⎟⎜⎟++
    ⎝⎠
    2 2
    12
    12
    2( ) 2
    33
    llydccy
    ll


  • =+ + +
    2 2
    12
    2( ) 2
    33
    l ydccy
    ll




  • =+ + ...(Q l
    1 + l 2 = l)
    Note. While using the above relation for the length of the curve, first of all position of the
    point C is to be located.
    Example 15.7. A foot bridge is carried over a river of span 60 m. If the supports are 3 m
    and 12 m higher than the lowest point of the cable, find the length of the cable AB
    Solution. Given : Span (l) = 60 m ; Depth of the lowest point from the support B (yc) = 3 m
    or difference between the levels of the supports (d) = 12 – 3 = 9 m
    Fig. 15.12.
    Let l 1 = Horizontal length AC, and
    l 2 = Horizontal length CB



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