Mechanics of MaterialsThis text provides a clear, comprehensive presentation of both the theory and applications of mechanics of materials. The text examines the physical behaviour of materials under load, then proceeds to model this behaviour to development theory. The contents of each chapter are organized into well-defined units that allow instructors great flexibility in course emphasis. writing style, cohesive organization, and exercises, examples, and free body diagrams to help prepare tomorrow's engineers. The book contains over 1,700 homework problems depicting realistic situations students are likely to encounter as engineers. These illustrated problems are designed to stimulate student interest and enable them to reduce problems from a physical description to a model or symbolic representation to which the theoretical principles may be applied. The problems balance FPS and SI units and are arranged in an increasing order of difficulty so students can evaluate their understanding of the material. |
From inside the book
Results 1-3 of 76
Page 132
... vertical force P 20 kN is applied to the ring F , determine the vertical displacement of point F. En = 350 GPa . = 0.8 m B D ADC = 45 mm2 2 m ABA = 60 mm2 2 m B 5 kN A E 0.5 m 0.75 m 1.5 m AEF = 75 mm2 C F C 0.8 m Probs . 4-11 / 12 0.6 ...
... vertical force P 20 kN is applied to the ring F , determine the vertical displacement of point F. En = 350 GPa . = 0.8 m B D ADC = 45 mm2 2 m ABA = 60 mm2 2 m B 5 kN A E 0.5 m 0.75 m 1.5 m AEF = 75 mm2 C F C 0.8 m Probs . 4-11 / 12 0.6 ...
Page 440
... vertical reactions of the beam that is loaded as shown . If the load is transferred uniformly to each strap of the hanger , determine the state of stress at points C and D of the strap at B. Assume the vertical reaction F at this end ...
... vertical reactions of the beam that is loaded as shown . If the load is transferred uniformly to each strap of the hanger , determine the state of stress at points C and D of the strap at B. Assume the vertical reaction F at this end ...
Page 608
... vertical deviation dt of the tangents on each side of the differential element dx . This deviation is caused by the curvature of the element and has been measured along a vertical line passing through point A located on the elastic ...
... vertical deviation dt of the tangents on each side of the differential element dx . This deviation is caused by the curvature of the element and has been measured along a vertical line passing through point A located on the elastic ...
Common terms and phrases
allowable shear stress aluminum angle of twist Applying Eq average normal stress average shear stress axial force axial load beam beam's bolt caused centroid column compressive computed constant cross section cross-sectional area deflection deformation Determine the average determine the maximum displacement distributed load elastic curve example factor of safety free-body diagram ft Prob Hooke's law in² internal torque kN·m kN/m length linear-elastic loading shown material maximum shear stress mm² modulus of elasticity Mohr's circle moment of inertia neutral axis plane plastic positive principal stresses radius sectional area segment shear force shear strain shear-stress distribution shown in Fig sign convention slope SOLUTION statically indeterminate stress acting stress components stress developed stress distribution stress is Tallow stress-strain diagram subjected Tallow Tavg tensile tensile stress thickness tion Tmax torque torsional tube vertical wire yield zero ΕΙ