After the roof design is selected, the next decision is the type of roof construction-- trusses or stick built. Trusses. Less labor to install trusses than to stick build roof. Factory built Better quality control Reduced construction cost Hauled to site and lifted into place Computers allow complex designs. Stick built Higher labor costs for complex roofs More variability in quality High level of skill required to produce complex rafters Requires more scaffolding and other supports for construction
Different types of trusses can be used for roofs. The type used will be determined by the use of the building, size of the building and/or the owners preferences. Most trusses are custom built for the building. Trusses can be wood or metal Truss nomenclature: Bottom Cord Webs Posts Gussets Rafters
Scissors Higher center clearance Spans 20 to 40 ft Mono (single slope) Sheds attached to buildings Spans 20 to 30 ft Fink Poplar efficient design Spans 20 to 50 ft Wowe Heavier ceiling loads than fink truss Spans 20 to 50 ft Different types of roof trusses are available. Truss manufacturers custom build trusses for each building
Pratt Used with or without ceilings Spans 20 to 60 ft Belgian Extended fink truss Spans up to 80 ft Bowstring Difficult to construct Spans 40 to 120 ft
Whether using roof trusses or stick building the roof, the pitch of the roof must be selected. Pitch is the slope of the roof. Roof pitch is indicated by a fraction(1/3, 1/4, Etc.) or slope triangle. When a fraction is used, it is the rise over the span. When a slope triangle is used, it is rise over run. What factors influence the best roof pitch for a building?
Determine the rise for the rafter in the illustration for a 1/3 pitch.
A triangle (slope triangle) is also used to indicate roof slope. A slope triangle indicates the rise/run. The slope triangle in the illustration indicates that for every 12 inches of run there will be 3 inches of rise. –Because a ratio is used, the 3 and 12 can have any units as long as they are both the same. Three (3) feet & twelve (12) feet would have the same rafter slope as 3 inches and 12 inches. The use of the slope triangle reinforces the concept the a rafter is the hypotenuse of a right triangle.
Determine the rise for the rafter in the illustration.
A common rafter is the hypotenuse of a right triangle. The plumb cut is made so that the ends of two rafters will fit together. They are fitted flush when used in a rafter truss. A ridge board is used when the rafters are “stick built”.
The tail cut can be left several ways. Common types are:
The birds mouth is used to increase the contact area between the rafter and the top plate. Must not extend more than 1/2 way through the dimension of the board. Excessive depth can cause the rafter to split.
Four (4) steps in laying out a common rafter. 1. Mark the angle at the ridge board end (plumb cut) of the rafter. 2. Determine the rafter length. 3. Mark the location and size of the birds mouth. 4. Mark the angle of the rafter at the overhang.
or a speed square can be used. The angle at the end of a rafter is determined by the pitch. The angle can be calculated in degrees and laid out with a protractor. Because a rafter is the hypotenuse of a right triangle, a framing square
Mark the plumb cut on the rafter. Place the 12 inch mark on the body of the square on one edge of the board. Rotate the square until the inches of rise is on the tongue of the square and on the same edge of the board. Mark along the edge of the tongue. Remember: the same edge of the square must be on the same edge of the board. In this example the rise per foot of run is 8 inches.
Opposite sides of the square are used. Yes because both edges of the square are on the same edge of the board. The square marks are on two different edges of the board. Why are these two illustrations examples of incorrect square use? Does this illustration show correct use?
The second step is determining the length of the rafter. –The length is the distance from the peak of the roof to the outside edge of the top plate. –One half the thickness of the ridge board must be deducted when it is used. The rafter length can be determined by calculation or by stepping. Determining rafter length by calculation: –Pythagorean Theorem
Determine the total length of a common rafter for a building with a span of 12 ft. 6 in. and a 1/3 pitch. The building will use a 2 x 6 ridge board and a 6 in. overhang. Rafter length = Subtracting 1/2 of ridge = Length of overhang = Total length = Overhang rise = Rafter rise = Answer: 8 ft
The stepping process uses the rise and run. Works best with a span that is an even foot. A building has eight (8) inches of rise per foot of run and the run is five (5) feet. It will use a 12 inch overhang. –The square is aligned like making a plumb cut. In this case 12 and 8 are used. –A line is drawn for the plumb cut and the 12 inch mark on the square is marked on the board. Step a rafter for a building with a 12:8 slope and a 10 foot span.
The square is “stepped” along the board for each foot of run.
Process is continued until the width of the run is “stepped” off.
At this point the length of the rafter will be correct for a building with a run of five (5) feet. If an overhang is used, the additional length must be “stepped off” for the overhang. If a ridge board is used, the rafter length must be adjusted.
If the rafter did not have an overhang, it would be cut off plumb with the back of the birds mouth.
Laying out the overhang requires two (2) steps. In the first step the 12 inch distance of the overhang is marked.
The second step is to mark the end cut. In this example it is a plumb cut. The same ratio is used. If a square cut is desired, a line square with the edge would be marked.