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.
The modulus of elasticity is an intensive property. It is a material constant that describes the relationship between stress and strain in a material, regardless of the amount of material present. Intensive properties do not depend on the size or extent of the material, while extensive properties do. Therefore, the modulus of elasticity remains the same regardless of how much of the material you have.
Yes, Young's Modulus is the same as Modulus of Elasticity.
Yes, the modulus of elasticity is the same as Young's modulus.
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
Yes, the tensile modulus is the same as the modulus of elasticity. Both terms refer to a material's ability to resist deformation under tensile stress.
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 modulus of elasticity (also known as Young's modulus) is calculated using the formula E = stress/strain, where E is the modulus of elasticity, stress is the force applied per unit area, and strain is the resulting deformation or elongation.