Suppose that a uniformly distributed load of intensity
From the force diagram of Fig. 1c we have:
In most practical problems we will know the span of the cable, i.e., the horizontal distance between supports, and we will wish to know the relationship between the maximum force in the cable and the vertical sag of the cable. We shall work out this relationship for the case in which the two ends of the cable are supported at the same level as in Fig. 2. Using the same coordinate system used in the development of Equation (1) above, we note that when
Then the maximum force in the cable, at the support, is found from Equation (2).
Another relationship often required is that between the span
In order to put this into a more convenient form for computation, let us expand each term in a series. The series expansions for these functions are:
Expressing these in terms of the “sag ratio”
This ratio will ordinarily be sufficiently small so that the above series expansions will converge rapidly, and only the first few terms of the series need be retained. Thus:
From this expression the length of the cable can be determined when the span and sag are known.
6.14.1 PROBLEMS
1. The force in a cable which is suspended from two points 50 ft apart on the same level is to be limited to 10,000 lb. What is the maximum total load which the cable can support, if the load is uniformly distributed horizontally, and if the sag is 10 ft?
Answer
2. A cable 100 ft long is suspended from two points which are on the same level and which are 95 ft apart. If the cable supports a total load of 10,000 lb, uniformly distributed along the horizontal, what is the maximum force in the cable?
Answer
3. A uniformly distributed horizontal load of 7500 lb is supported by a cable as shown in the diagram. Find the maximum force in the cable.
Answer
5460 lb
