Strength of Materials
Last updated 6/2024
Duration: 13h48m | .MP4 1280x720, 30 fps(r) | AAC, 44100 Hz, 2ch | 894 MB
Genre: eLearning | Language: English
Last updated 6/2024
Duration: 13h48m | .MP4 1280x720, 30 fps(r) | AAC, 44100 Hz, 2ch | 894 MB
Genre: eLearning | Language: English
Derivations ,Stress & strain , Mohr's circle, Shear & Bending moment diagram, Slope & deflection etc.
What you'll learn
Useful videos on Stress & strain, Shear diagram & bending moment diagram,Slope & deflection, Mohr's circle, bending stress, Shear stress maximum bending moment
You will be able to understand how to draw Mohr's circle.
You will be able to understand how to draw S.F.D. & B.M.D.
You will be able to calculate slope & deflection.
You will be able to calculate maximum bending moment & bending stresses in beams.
You will be able to calculate shear stresses in beams.
You will be able to calculate the beam reactions.
Requirements
Basics of types of beam,support reactions & equilibrium concept
Description
In this course you will learn all the important derivations in Strength of Materials like Flexural formula, Torsion formula, Principle stress derivations, Relation between various moduli of elasticity and many more …
You will be able to learn about how to draw Mohr's circle, How to draw shear force diagram and bending moment diagram , concept of beam reactions , concept of Stress and Strain & stresses in beams.
Animated videos on graphic statics & beam reaction !!! How to find beam reaction in case of a simply supported beam with point load, u.d.l. , uvl , end moment.
How to draw shear diagram & Bending moment diagram in case of a simply supported beam and Cantilever beam with point loads, u.d.l. and u.v.l.
This course explains how to find out the beam reactions in case of simply supported beam carrying uniformly distributed load & point loads.
This course explains how to find out the beam reactions in case of simply supported beam carrying uniformly varying load , uniformly distributed load & point loads.
In case of u.d.l. , it is a rectangular distribution & hence it can be converted into point load acting at a center. In case of u.v.l. , it is a triangular distribution & hence it can be converted into a point load acting at centroid of triangle i.e. at a distance of 2b/3 from apex.
This topic is from Applied Mechanics & Strength of materials or Mechanics of materials.
This course will also explains how to find out beam reactions graphically (GRAPHIC STATICS ). The graphical method includes space diagram, vector or polar diagram & funicular polygon.
This course is about how to find out the reactions offered by a support to the beam by applying conditions of equilibrium !!! Simply supported beam with point load is considered for analysis purpose . Useful for those preparing for GATE examination !!! Beam reaction problem in Engineering Mechanics has great significance. The beam reaction problems can be solved by using both analytical method as well as graphical method.
Who this course is for:
This course is for Mechanical , Civil & structural Engineering students & professionals.
More Info