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Fall factor

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Title: Fall factor  
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Subject: Dynamic rope, Ice screw, Climbing, Rope drag, Lead climbing
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Fall factor

The climber will fall about the same height h in both cases, but she will be subjected to a greater force at position 1, due to the greater fall factor.

In lead climbing using a dynamic rope, the fall factor (f) is the ratio of the height (h) a climber falls before the climber's rope begins to stretch and the rope length (L) available to absorb the energy of the fall.

f = \frac{h}{L}

Contents

  • Impact force 1
  • Lead climbing 2
  • Fall factors above two 3
  • See also 4
  • References 5
  • External links 6

Impact force

The impact force is defined as the maximum tension in the rope when a climber falls. Using the common rope model of an undamped harmonic oscillator (HO) the impact force Fmax in the rope is given by:

F_{max} = mg + \sqrt{(mg)^2 + 2mghk} = mg + \sqrt{(mg)^2 + 2mgEqf}

where mg is the climber's weight, h is the fall height and k is the spring constant of the rope. Using the elastic modulus E = k L/q which is a material constant, the impact force depends only on the fall factor f, i.e. on the ratio h/L, the cross section q of the rope, and the climber’s weight. The more rope is available, the softer the rope becomes which is just compensating the higher fall energy. The maximum force on the climber is Fmax reduced by the climber’s weight mg. The above formula can be easily obtained by the law of conservation of energy at the time of maximum tension resp. maximum elongation xmax of the rope:

mgh = \frac{1}{2}kx_{max}^2 - mgx_{max}\ ; \ F_{max} = k x_{max}

Using the HO model to obtain the impact force of real climbing ropes as a function of fall height h and climber's weight mg, one must know the experimental value for E of a given rope. However, rope manufacturers give only the rope’s impact force F0 and its static and dynamic elongations that are measured under standard UIAA fall conditions: A fall height h0 of 2 x 2.3 m with an available rope length L0 = 2.6m leads to a fall factor f0 = h0/L0 = 1.77 and a fall velocity v0 = (2gh0)1/2 = 9.5 m/s at the end of falling the distance h0. The mass m0 used in the fall is 80 kg. Using these values to eliminate the unknown quantity E leads to an expression of the impact force as a function of arbitrary fall heights h and arbitrary fall factors f of the form:[1]

F_{max} = mg + \sqrt{(mg)^2 + F_0(F_0-2m_0g)\frac{m}{m_0}\frac{f}{f_0}}
Impact force as a function of dynamic elongation^(-1) for different friction constants κ.

This simple undamped harmonic oscillator model of a rope, however, cannot explain real ropes. First, it is evident that real ropes hardly oscillate after a fall. After one period the rope has settled and stopped oscillating. The HO also cannot explain correctly the experimental values of a climbing rope such as its static and dynamic elongation and the correct relations to its impact force. This can be corrected only by considering friction in the rope. On the basis of a Viscoelastic Standard Linear Solid model one gets more complicated expressions for impact force and static and dynamic elongations.[1] Friction in the rope leads to energy dissipation and thus to a reduction of the impact force compared to the undamped harmonic oscillator model. It also leads to an additional elongation of the rope. The diagram shows how the impact forces of real climbing ropes under standard UIAA fall conditions relate to their measured dynamic elongations. It also shows that the HO model cannot explain these dependencies of real climbing ropes.

When the rope is clipped into several carabiners between the climber and the belayer, an additional type of friction occurs, the so-called dry friction between the rope and particularly the last clipped carabiner. Dry friction leads to an effective rope length smaller than the available length L and thus increases the impact force.[2] Dry friction is also responsible for the rope drag a climber has to overcome in order to move forward. It can be expressed by an effective mass of the rope that the climber has to pull which is always larger than the rope mass itself. It depends exponentially on the sum of the angles of the direction changes the climber has made.[2]

Lead climbing

A fall factor of two is the maximum that is possible in a lead climbing fall, since the length of an arrested fall cannot exceed two times the length of the rope. Normally, a factor-2 fall can occur only when a lead climber who has placed no protection falls past the belayer (two times the distance of the rope length between them), or the anchor if the climber is solo climbing the route using a self-belay. As soon as the climber clips the rope into protection above the belay, the distance of the potential fall as a function of rope length is lessened, and the fall factor drops below 2.

A fall of 20 feet exerts more force on the climber and climbing equipment if it occurs with 10 feet of rope out (i.e. the climber has placed no protection and falls from 10 feet above the belayer to 10 feet below—a factor 2 fall) than if it occurs 100 feet above the belayer (a fall factor of 0.2), in which case the stretch of the rope more effectively cushions the fall.

Fall factors above two

In falls occurring on a via ferrata, fall factors can be much higher. This is possible because the length of rope between harness and carabiner is short and fixed, while the distance the climber can fall depends on the gaps between anchor points of the safety cable.

See also

References

  1. ^ a b Ulrich Leuthäusser (2010):"Viscoelastic theory of climbing ropes". Retrieved 2010-12-02. Retrieved December 2, 2010
  2. ^ a b Ulrich Leuthäusser (2011):"Physics of climbing ropes: impact forces, fall factors and rope drag" (PDF). Retrieved 2011-01-15. Retrieved January 15, 2011

External links

  • Goldstone, Richard (December 27, 2006). "The Standard Equation for Impact Force". Retrieved 2009-04-17. 
  • Busch, Wayne. "Climbing Physics - Understanding Fall Factors". Retrieved 2008-06-14. 
  • "UKC - Understanding fall factors". 
  • "Rock Climbing Fall Impact Force". Contains full derivation of equation in Notes. vCalc. 2014-04-11. Retrieved 2014-04-11. 
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