7.1: Sight Distance

Stopping Sight Distance

Stopping Sight Distance (SSD) is the viewable distance required for a driver to see so that he or she can make a complete stop in the event of an unforeseen hazard. SSD is made up of two components: (1) Braking Distance and (2) Perception-Reaction Time.

For highway design, analysis of braking is simplified by assuming that deceleration is caused by the resisting force of friction against skidding tires. This is applicable to both an uphill or a downhill situation. A vehicle can be modeled as an object with mass \(m\) sliding on a surface inclined at angle \(\theta\).

While the force of gravity pulls the vehicle down, the force of friction resists that movement. The forces acting this vehicle can be simplified to:

\[F=W(sin (\theta)-fcos(\theta))\]

where

• \(W=mg\) = object’s weight,
• \(f\) = coefficient of friction.

Using Newton’s second law we can conclude then that the acceleration (\(a\)) of the object is

\[a=g(sin(\theta))-fcos(\theta))\]

Using our basic equations to solve for braking distance (\(d_b\)) in terms of initial speed (\(v_i\)) and ending speed (\(v_e\)) gives

\[d_b=\frac{v_i^2-v_e^2}{-2a}\]

and substituting for the acceleration yields

\[d_b=\frac{v_i^2-v_e^2}{2g(fcos(\theta)-sin(\theta))}\]

For angles commonly encountered on roads, \(cos(\theta) \approx 1\) and \(sin(\theta) \approx tan(\theta)=G\), where \(G\) is called the road’s grade. This gives

\[d_b=\frac{v_i^2-v_e^2}{2g(f \pm G)\]

Using simply the braking formula assumes that a driver reacts instantaneously to a hazard. However, there is an inherent delay between the time a driver identifies a hazard and when he or she mentally determines an appropriate reaction. This amount of time is called perception-reaction time. For a vehicle in motion, this inherent delay translates to a distance covered in the meanwhile. This extra distance must be accounted for.

For a vehicle traveling at a constant rate, distance \(d_r\) covered by a specific velocity \(v\) and a certain perception-reaction time \(t_r\) can be computed using simple dynamics:

\[d_r=(vt_r)\]

Finally, combining these two elements together and incorporating unit conversion, the AASHTO stopping sight distance formula is produced. The unit conversions convert the problem to metric, with \(v_i\) in kilometers per hour and \(d_s\) in meters.

\[d_s=d_r+d_b=0.278t_rv_i+\frac{(0.278v_i)^2}{19.6(f \pm G)}\]

Passing Sight Distance

Passing Sight Distance (PSD) is the minimum sight distance that is required on a highway, generally a two-lane, two-directional one, that will allow a driver to pass another vehicle without colliding with a vehicle in the opposing lane. This distance also allows the driver to abort the passing maneuver if desired. AASHTO defines PSD as having three main distance components: (1) Distance traveled during perception-reaction time and accleration into the opposing lane, (2) Distance required to pass in the opposing lane, (3) Distance necessary to clear the slower vehicle.

The first distance component \(d_1\) is defined as:

\[d_1=1000t_1 \left( u-m+\frac{at_1}{2} \right)\]

where

• \(t_1\) = time for initial maneuver,
• \(a\) = acceleration (km/h/sec),
• \(u\) = average speed of passing vehicle (km/hr),
• \(m\) = difference in speeds of passing and impeder vehicles (km/hr).

The second distance component \(d_2\) is defined as:

\[d_2=(1000ut_2)\]

where

• \(t_2\) = time passing vehicle is traveling in opposing lane,
• \(u\) = average speed of passing vehicle (km/hr).

The third distance component \(d_3\) is more of a rule of thumb than a calculation. Lengths to complete this maneuver vary between 30 and 90 meters.

With these values, the total passing sight distance (PSD) can be calculated by simply taking the summation of all three distances.

\[d_p=(d_1+d_2+d_3)\]