3. Introduction
• The straight distance between the two poles gives
the shortest distance. Therefore to minimise the
length of conductor, one may stretch conductor to
make it straight.
• But we also look after that the conductors are in safe
tension. in order to permit safe tension in the
conductors, they are not fully stretched but are
allowed to have some dip.
• Thus the difference in level points of supports and
lowest point on the conductor is called as Sag.
6. Continued…
• The tension on the conductor depends on the
following factors:
Weight of the conductor
Wind effects
Ice loading
Temperature variation
7. Continued…
When the
supports are
at equal
ground level
While calculating the sag there are two
consideration
When the
supports are
at unequal
ground level
9. Continued…
• Refer fig. in which ‘O’ is the lowest point of the
conductor spacing.
• L=length of span in meters
• W=weight of the conductor per unit length
• T=tension on the conductor
• Consider any point ‘P’ on the conductor whose
coordinate are ‘x’ and ‘y’.
• There are two forces acting on the portion ‘OP’
1. Weight of the portion ‘OP’ acting downward at a
distance x/2 from origin ‘O’.
2. Tangential tension T acting at points ‘O’.
13. Continued….
• Fig. shows the position of lowest points ‘O’ of
conductor which is not exactly at centre of distance
l.
• Therefore
‘x1’ is the distance of support at lower level from
lowest point ‘O’.
‘x2’ is the distance of support at high level from lowest
point ‘O’
‘l’ is span length = x1 + x2
17. String chart
• Stringing chart is useful in knowing the sag and
tension at any temperature. Stringing chart gives the
data per sag to be allowed and the tension to be
allowed for a particular temperature.
• Stringing chart prepared by calculating the sag and
tension on the conductor under worst conditions
such as maximum wind pressure and minimum
temperature by asuming a suitable factor safety.
18. Equation for determining string chart
• Let L1, T1, t1, W1 are the total length of conductor,
tension, temperature and total load per meter under
first set of physical conditions respectively.
• Similarly L2, T2, t2, W2 are the same quantities under
the second set of physical conditions.
• Increase to tension from T1 to T2 elongates the
conductor by L1(T2-T1)/aE
where, a = conductor cross sectional area
E = Young’s modulus of elasticity
21. Graph
• Now the graph of tension
verses temperature and sag
verses temperature can be
plotted as shown in fig.
• This graph is plotted for a
fixed span and is called as
stringing chart.
