Young's modulus
K(bulk modulus of elasticity)=-{[Pressure x volume]/change in volume}
1,500,000 to 1,600,000 psi.
Young's Modulus (modulus of elasticity) describes the stress-strain behavior of a material under monotonic loading. The dynamic modulus of elasticity describes the same behavior under cyclic or vibratory loading.
Because liquid is not malleable and ductile.
velocity of sound is proportional to modulus of elasticity of the medium. Metals have greater modulus of elasticity compared to that of air. Hence the result
Young's modulus
the dimensions of Young's Modulus of Elasticity = (M).(L)^(-1).(T)^(-2)
Young's modulus
Modulus of elasticity will be 2.06*10^5 N/mm2
there are different types of modulus it depends on what types of stress is acting on the material if its direct stress then then there is modulus of elasticity,if tis shear stress then its modulus of rigidity and when its volumetric stress it is bulk modulus and so on
K(bulk modulus of elasticity)=-{[Pressure x volume]/change in volume}
The modulus of elasticity is the slope of the linear portion of the curve (the elastic region).
the world
30000000psi
IN MACHINE design modulus of elasticity place an important role. from the value of modolus of elasticity we come to know about maximum value of load that can be to the given material upto which the material is assume to follow the hook's law.
Youngs Modulus