Müller-Breslau principle

Müller-Breslau principle

The Müller-Breslau principle is a method to determine influence lines. The principle states that the influence lines of an action (force or moment) assumes the scaled formed of the deflection that the structure displays after removing the restraint on the point where the action is evaluated and applying a point that causes a unit displacement.

Example of Using the Müller-Breslau Principle to Find Qualitative Influence Lines

Muller-Breslau Principle - Influence Lines.JPG

Part a of the figure to the right shows a simply supported beam with a unit load traveling across it. The structure is a statically determinate therefore all influence lines will be straight lines.

Part b and c of the figure shows the influence lines for the reactions in the y-direction. Releasing the vertical reaction for A allows the beam to rotate to Δ. Likewise for part c. Δ is typically taken as positive upwards.

Part d of the figure shows the influence line for shear at point B. Using the beam sign convention and cutting the beam at B, we can deduce the figure shown.

Part e of the figure shows the influence line for the bending moment at point B. Again making a cut through the beam at point B and using the beam sign convention, we can deduce the figure shown.

The procedure for applying the Muller-Breslau Principle is as follows:

  1. Remove the constraint at the point of interest for the function of interest. This means if the influence line for a Reaction is asked for simply start by pretending the beam is no longer attached to the reaction in question and is free to rotate about the other support. If the influence line for a moment is desired pretend the point in question is a hinge and the subsequent two sides can rotate about their supports. If the influence line for shear is desired again pretend the point in question is a shear release, again where both sides can rotate about their supports.
  2. Consider the remaining portion of the beam to have infinite rigidity, so it is a strait line free to rotate about the support.
  3. Lastly rotate whatever is free to rotate in its positive direction, but only enough to crate a deflection of 1 unit total. This means if the moment IL is in question and an imaginary hinge is splitting the beam in two pieces, the two angles created between each rotated side and the original beam must add to equal 1. Similarly if the shear IL is in question the two sides will have opposite directions of rotation. So at the shear release the right side will typically be rotated upwards and left side will be rotated downward- as this is the sign convention for shear. The total displacement between the two sides of the shear release must equal 1.



Wikimedia Foundation. 2010.

Игры ⚽ Поможем написать реферат

Look at other dictionaries:

  • Energy principles in structural mechanics — express the relationships between stresses, strains or deformations, displacements, material properties, and external effects in the form of energy or work done by internal and external forces. Since energy is a scalar quantity, these… …   Wikipedia

  • medicine, history of — Introduction  the development of the prevention and treatment of disease from prehistoric and ancient times to the 20th century. Medicine and surgery before 1800 Primitive (primitive culture) medicine and folklore       Unwritten history is not… …   Universalium

  • Bonhoeffer-Kreis — Dietrich Bonhoeffer im August 1939[1] …   Deutsch Wikipedia

  • Von guten Mächten — Dietrich Bonhoeffer im August 1939[1] …   Deutsch Wikipedia

  • Von guten Mächten treu und still umgeben — Dietrich Bonhoeffer im August 1939[1] …   Deutsch Wikipedia

  • Von guten Mächten wunderbar geborgen — Dietrich Bonhoeffer im August 1939[1] …   Deutsch Wikipedia

  • History of Medicine —     History of Medicine     † Catholic Encyclopedia ► History of Medicine     The history of medical science, considered as a part of the general history of civilization, should logically begin in Mesopotamia, where tradition and philological… …   Catholic encyclopedia

  • Dietrich Bonhoeffer — (* 4. Februar 1906 in Breslau; † 9. April 1945 im KZ Flossenbürg) war ein lutherischer Theologe, profilierter Vertreter der Bekennenden Kirche und Teilnehmer am deutschen Widerstand gegen den Nationalsozialismus. Mit 24 Jahren habilitiert, wurde… …   Deutsch Wikipedia

  • Eugen Rosenstock-Huessy — Infobox Person name = Eugen Rosenstock Huessy image size = caption = Eugen Rosenstock Huessy. Photo courtesy of Mariot Huessy, Eugen Rosenstock Huessy Fund birth name = Eugen Friedrich Moritz Rosenstock birth date = July 6, 1888 birth place =… …   Wikipedia

  • BIBLE — THE CANON, TEXT, AND EDITIONS canon general titles the canon the significance of the canon the process of canonization contents and titles of the books the tripartite canon …   Encyclopedia of Judaism

Share the article and excerpts

Direct link
Do a right-click on the link above
and select “Copy Link”