In building construction, roof pitch is the steepness of a roof quantified as a ratio or as number of angular degrees that one 'exposure' surface deviates from horizontal level. A roof surface may be either 'functionally flat' or pitched.
The pitch of a roof is its vertical 'rise' over its horizontal 'span'. However, most often a ratio of "pitch" (also fraction) is slang used for the (more useful) 'slope' (of rise over 'run') of just one side (half the span) of a dual pitched roof. This is the 'slope' of geometry, stairways and other construction disciplines, or the trigonometric arctangent function of its decimal fraction. In the imperial measurement systems, "pitch" is usually expressed with the rise first and run second (in the USA, run is held to number 12). In the USA the rise is rationalized to a ratio of so many measuring units rise to each 12 measuring units of run (e.g., 3:12, 4:12, 5:12). Places that use metric measurement systems use a degree angle, or what fall there is per unit of run, and expressed as a '1 in _' slope (a '1 in 1' equals 45°). Where convenient, the least common multiple is used (e.g., a '3 in 4' slope, for a '9 in 12' or '1 in 1 1/3').
The pitch matters for a variety of reasons, including the type of roofing material used, walkability, proportions to the building as a whole (which is sometimes a critical factor in some architectural styles such as a steep pitch in Gothic architecture and a low pitch in Classical architecture), and combinations of pitches form distinctive roof shapes such as a gambrel roof. The basic ranges of pitch are not uniformly defined, but range from flat, which are not perfectly flat but sloped to drain water up to 1/2:12 to 2:12 ( 1 in 24 to 1 in 6); low-slope roofing, which requires special materials and techniques to avoid leaks and ranges from 1:12 (2:12) to 4:12 (1 in 3); conventional from 4:12 (1 in 3) to 9:12 (3 in 4); and steep-slope roofing, which is above 9:12 (3 in 4) (21:12) (7 in 4) and may require extra fasteners.
US convention is to use whole numbers when even (e.g. "three in twelve") or the nearest single or two-digit fraction when not (e.g. either "five and a quarter in twelve" or "five point two-five in twelve", each expressed numerically as 5.25:12).
The exact roof slope in degrees is given by the arctangent. For example: arctan(3/12)=14.0°
The primary purpose of pitching a roof is to redirect water and snow. Thus, pitch is typically greater in areas of high rain or snowfall. The steep roof of the tropical Papua New Guinea longhouse, for example, sweeps almost to the ground. The high, steeply-pitched gabled roofs of northern Europe are typical in regions of heavy snowfall. In some areas building codes require a minimum slope. Buffalo, New York and Montreal, Quebec, Canada, specify 6 in 12, a pitch of approximately 26.6 degrees.
Commonly used roof pitches were given names such as:-
- Greek: the ridge height is 1/9 to 1/7th the span (an angle of 12.5° to 16°);
- Roman: the ridge height is 2/9ths to 1/3 the span (an angle of 24° to 34°);
- Common: the rafter length is 3/4 the span (about 48°);
- Gothic: the rafters equal the span (60°); and
- Elizabethan: the rafters are longer than the span (more than 60°).
- "Roof Slope Multiplier". Roof Online. Retrieved 2018-05-19.
- "Pitch" Sturgis, Russell. A dictionary of architecture and building: biographical, historical, and descriptive. New York: The Macmillan Co. ;, 1901. 152. Print.
- "Slope" def. 1. Schmid, Karl F.. Concise encyclopedia of construction terms and phrases. New York: Momentum, 2014. Print.
- Dictionary of Architecture & Construction, C.M.Harris.
- "Pitch" def. 24.c. Oxford English Dictionary Second Edition on CD-ROM (v. 4.0) © Oxford University Press 2009
- "Pitch" def. 2. Knight, Edward Henry. Knight's American mechanical dictionary: being a description of tools, instruments, machines, processes, and engineering; history of inventions; general technological vocabulary; and digest of mechanical appliances in science and the arts.. vol. 2. New York: J.B. Ford and Co., 1874. 1719. Print.