Formulas for structural dynamics : tables, graphs, and solutions / Igor A. Karnovsky, Olga I. Lebed.

Format:

Book

Author/Creator:

Karnovskiĭ, I. A. (Igorʹ Alekseevich), author.

Contributor:

Lebed, Olga I.

Series:

McGraw-Hill's AccessEngineering

Language:

English

Subjects (All):

Structural dynamics.

Structural analysis (Engineering).

Vibration.

Girders.

Girders--Mathematical models.

Girders, Continuous.

Structural frames.

Rotational motion (Rigid dynamics).

Structural stresses.

Elasticity.

Axial loads.

Arches.

Frames.

Genre:

Electronic books.

Physical Description:

1 online resource

Edition:

First edition.

Place of Publication:

New York, N.Y. : McGraw-Hill Education, [2001]

Language Note:

In English.

Biography/History:

Contributor biographical information: http://www.loc.gov/catdir/bios/mh041/00062451.html

Summary:

The objective of this text is to provide an up to date reference source of known solutions to a wide range of vibration problems found in beams, arches and frames. The solutions offered apply to bridges, highways, buildings, and tunnels.

Contents:

Transverse Vibration Equations

Average values and resolving equations

Fundamental theories and approaches

Analysis Methods

Reciprocal theorems

Displacement computation techniques

Analysis methods

Fundamental Equations of Classical Beam Theory

Mathematical models for transversal vibrations of uniform beams

Boundary conditions

Compatibility conditions

Energy expressions

Properties of eigenfunctions

Orthogonal eigenfunctions in interval z[subscript 1]

z[subscript 2]

Mechanical models of elastic systems

Models of materials

Mechanical impedance of boundary conditions

Fundamental functions of the vibrating beams

Special Functions for the Dynamical Calculation of Beams and Frames

Krylov-Duncan functions

Dynamical reactions of massless elements with one lumped mass

Dynamical reactions of beams with distributed masses

Dynamical reactions of beams with distributed masses and one lumped mass

Frequency functions (Hohenemser-Prager's functions)

Displacement influence functions

Bernoulli-Euler Uniform Beams with Classical Boundary Conditions

Classical methods of analysis

One-span beams

One-span beams with overhang

Fundamental integrals

Love and Bernoulli-Euler beams, frequency equations and numerical results

Bernoulli-Euler Uniform One-Span Beams with Elastic Supports

Beams with elastic supports at both ends

Beams with a translational spring at the free end

Beams with translational and torsional springs at one end.

Notes:

Print version c2001.

Includes bibliographical references and index.

Electronic reproduction. New York, N.Y. : McGraw Hill, 2001. Mode of access: World Wide Web. System requirements: Web browser. Access may be restricted to users at subscribing institutions.

Description based on cover image and table of contents, viewed on April 26, 2007.

Contains:

Transverse vibration equations.

Analysis methods.

Fundamental equations of classical beam theory.

Special functions for the dynamical calculation of beams and frames.

Bernoulli-Euler uniform beams with classical boundary conditions.

Bernoulli-Euler uniform one-span beams with elastic supports.

Bernoulli-Euler beams with lumped and rotational masses.

Bernoulli-Euler beams on elastic linear foundation.

Bernoulli-Euler multispan beams.

Prismatic beams under compressive and tensile axial loads.

Bress-Timoshenko uniform prismatic beams.

Non-uniform one-span beams.

Optimal designed beams.

Nonlinear transverse vibrations.

Arches.

Frames.

Other Format:

Print version: Formulas for structural dynamics : tables, graphs, and solutions.

ISBN:

0071367128 (print-ISBN)

0071450106

9780071367127

OCLC:

173314668

Access Restriction:

Restricted for use by site license.