A 'beam' is a
structural element that carries
load primarily in
bending (flexure). Beams generally carry
vertical gravitational forces but can also be used to carry
horizontal loads (i.e. loads due to an
earthquake or wind). The loads carried by a beam are transferred to
columns,
walls, or
girders, which then transfer the force to adjacent structural
compression members. In
Light frame construction the
joists rest on the beam.
Beams are characterized by their (the shape of their cross-section), their length, and their
material. In contemporary
construction, beams are typically made of
steel,
reinforced concrete, or
wood. One of the most common types of steel beam is the
I-beam or wide-
flange beam (also known as a "universal beam" or, for stouter sections, a "universal column"). This is commonly used in steel-frame buildings and
bridges. Other common beam profiles are the
C-channel, the
hollow structural section beam, the
pipe, and the
angle.
Structural Characteristics
Internally, beams experience
compressive,
tensile and
shear stresses as a result of the loads applied to them. Typically, under gravity loads, the original length of the beam is slightly reduced to enclose a smaller radius arc at the top of the beam, resulting in compression, while the same original beam length at the bottom of the beam is slightly stretched to enclose a larger radius arc, and so is under tension. The same original length of the middle of the beam, generally halfway between the top and bottom, is the same as the radial arc of bending, and so it is under neither compression nor tension, and defines the neutral axis (dotted line in the beam figure). Above the supports, the beam is exposed to
shear stress. There are some reinforced concrete beams that are entirely in compression. These beams are known as
prestressed concrete beams, and are fabricated to produce a compression more than the expected tension under loading conditions. High strength steel tendons are stretched while the beam is cast over them. Then, when the concrete has begun to cure, the tendons are released and the beam is immediately under eccentric axial loads. This eccentric loading creates an internal moment, and, in turn, increases the moment carrying capacity of the beam. They are commonly used on highway bridges.
The primary tool for structural analysis of beams is the
Euler-Bernoulli beam equation. Other mathematical methods for determining the
deflection of beams include "method of
virtual work" and the "slope deflection method". Engineers are interested in determining deflections because the beam may be in direct contact with a
brittle material such as glass. Beam deflections are also minimised for aesthetic reasons. A visibly sagging beam, though structurally safe, is unsightly and to be avoided. A
stiffer beam (high
modulus of elasticity and high
second moment of area) produces less deflection. Mathematical methods for determining the beam forces (internal forces of the beam and the forces that are imposed on the beam support) include the "
moment distribution method", the force or
flexibility method and the
matrix stiffness method.
General Shapes
Diagram of stiffness of a simple square beam (A) and I-beam (B). The I-beam flange sections are three times further apart than the solid beam's upper and lower halves. The second moment of inertia of the I-beam is nine times that of the square beam of equal cross section (I-beam web ignored for simplification)
Mostly the beams have rectangular cross sections in
reinforced concrete buildings, but the most efficient cross-section is an I-shaped beam. The fact that most of the material is placed away from the
neutral axis (axis of symmetry in case of I beams) increases the
second moment of area of the beam which in turn increases the stiffness.
An I-beam is only the most efficient shape in one direction of bending: up and down looking at the profile as an I. If the beam is bent side to side , it functions as an H and is less efficient. The most efficient shape for both directions in 2D is a box (a square shell) however the most efficient shape for bending in any direction is a cylindrical shell or tube. But, for unidirectional bending, the I beam is king.
Efficiency means that for the same cross sectional area (Volume of beam per length) subjected to the same loading conditions, the beam deflects less.
Other shapes, like L (angles), C (Channels) or tubes, are also used in construction when there are special requirements.
See also
★
Bending and
Bending Moment
★
Bridge
★
Building code
★
Cantilever
★
Classical mechanics
★
Compression member
★
Deflection
★
Elastic modulus or Modulus of elasticity
★
Elasticity (physics) and
Plasticity (physics)
★
Free body diagram
★
I-beam
★
Joist
★
Light-frame construction
★
Materials science and
Strength of materials
★
Moment (physics)
★
Finite element method in structural mechanics
★
Poisson's ratio
★
Post and lintel
★
Second moment of area, sometimes referred to as the moment of inertia
★
Shear strength and
Shear stress
★
Span (architecture)
★
Statics and
Statically indeterminate
★
Stress (physics) and
Strain (materials science)
★
Structural analysis and
Structural load
★
Tensile strength,
Tensile stress and
Hooke's law
★
Thin-shell structure
★
Truss
★
Yield (engineering)
External Links
★
David Childs Ltd Consulting Civil Engineers:
Tutorials
★
★
Steel Beam Design
★
★
Prestressed Concrete Beam Design Tutorial
★
American Wood Council:
Free Download Library Wood Construction Data
★
★
Wood Structural Design Data (pdf file)
★
★
online Span Calculator
★
Introduction to Structural Design, U. Virginia Dept. Architecture
★
★
Glossary
★
★
Course Sampler Lectures, Projects, Tests
★
★
Beams and Bending review points (follow using ''next'' buttons)
★
★
Structural Behavior and Design Approaches lectures (follow using ''next'' buttons)
★
U. Maryland, J.A. Clark School of Engineering:
HAMLET engineering simulations and models
★
★
BeamAnalysis
★
U. Wisconsin-Stout, Strength of Materials online lectures, problems, tests/solutions, links, software
★
★
Beams I - Shear Forces and Bending Moments
★
★
Beams II - Bending Stress
References
★ 'Introduction to mechanics of solids', Egor P. Popov, Prentice-Hall, 1968
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