Chandana P Dev
NSS College of Engineering (NSSCE), Palakkad
Chandana P Dev has created this Calculator and 200+ more calculators!
Mithila Muthamma PA
Coorg Institute of Technology (CIT), Coorg
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6 Other formulas that you can solve using the same Inputs

Normal Stress
Normal stress on thin shells=(Unit normal force/Shell thickness)+((Unit bending moment*Distance from middle surface)/(Shell thickness^(3)/12)) Go
Twisting Moments When Shearing Stress is Given
Twisting moments on shells=(((Shearing stress on shells*Shell thickness)-Central shear)*Shell thickness^2)/(12*Distance from middle surface) Go
Shearing Stresses on Shells
Shearing stress on shells=((Central shear/Shell thickness)+(Twisting moments on shells*Distance from middle surface*12/Shell thickness^3)) Go
Central Shear When Shearing Stress is Given
Central shear=(Shearing stress on shells-(12*Twisting moments on shells*Distance from middle surface/Shell thickness^3))*Shell thickness Go
Distance from Middle Surface When Normal Shearing Stress is Given
Distance from middle surface=sqrt((Shell thickness^(2)/4)-((Normal shearing stress*Shell thickness^3)/(6*Unit normal force))) Go
Normal Shearing Stresses
Normal shearing stress=(6*Unit shear force/Shell thickness^(3))*((Shell thickness^(2))/4)-(Distance from middle surface^2) Go

1 Other formulas that calculate the same Output

Distance from Middle Surface When Normal Shearing Stress is Given
Distance from middle surface=sqrt((Shell thickness^(2)/4)-((Normal shearing stress*Shell thickness^3)/(6*Unit normal force))) Go

Distance from Middle Surface When Normal Stress is Given Formula

Distance from middle surface=(Shell thickness^(2)/(12*Unit bending moment))*((Normal stress on thin shells*Shell thickness)-(Unit normal force))
z=(t^(2)/(12*M<sub>x</sub>))*((f<sub>x</sub>*t)-(N<sub>x</sub>))
More formulas
Normal Stress Go
Shearing Stresses on Shells Go
Central Shear When Shearing Stress is Given Go
Twisting Moments When Shearing Stress is Given Go
Normal Shearing Stresses Go
Distance from Middle Surface When Normal Shearing Stress is Given Go

What is Shell Theory?

Shell Theories are based on the assumption that the strains in the shell are small enough to be discarded in comparison with unity. It is also assumed that the shell is thin enough that quantities, such as the thickness/radius ratio may be discarded in comparison with unity. The theorem says that, a spherically symmetric body affects external objects gravitationally as though all of its mass were concentrated at a point at its center.

How to Calculate Distance from Middle Surface When Normal Stress is Given?

Distance from Middle Surface When Normal Stress is Given calculator uses Distance from middle surface=(Shell thickness^(2)/(12*Unit bending moment))*((Normal stress on thin shells*Shell thickness)-(Unit normal force)) to calculate the Distance from middle surface, The Distance from Middle Surface When Normal Stress is Given is connecting the relation between the unit normal force and stress and the bending moment on the shell surface. . Distance from middle surface and is denoted by z symbol.

How to calculate Distance from Middle Surface When Normal Stress is Given using this online calculator? To use this online calculator for Distance from Middle Surface When Normal Stress is Given, enter Shell thickness (t), Unit bending moment (Mx), Normal stress on thin shells (fx) and Unit normal force (Nx) and hit the calculate button. Here is how the Distance from Middle Surface When Normal Stress is Given calculation can be explained with given input values -> 166666.6 = (20^(2)/(12*200000))*((50000000*20)-(100)).

FAQ

What is Distance from Middle Surface When Normal Stress is Given?
The Distance from Middle Surface When Normal Stress is Given is connecting the relation between the unit normal force and stress and the bending moment on the shell surface. and is represented as z=(t^(2)/(12*Mx))*((fx*t)-(Nx)) or Distance from middle surface=(Shell thickness^(2)/(12*Unit bending moment))*((Normal stress on thin shells*Shell thickness)-(Unit normal force)). Shell thickness is the the distance through the shell. , Unit bending moment is the external force or moment acting on a member which allows the member to bend whose magnitude is unity, Normal stress on thin shells is the stress caused on the thin shell due to the normal force (axial load) on the surface. and Unit normal force is the force acting perpendicular to the surface in contact with each other whose magnitude is unity. .
How to calculate Distance from Middle Surface When Normal Stress is Given?
The Distance from Middle Surface When Normal Stress is Given is connecting the relation between the unit normal force and stress and the bending moment on the shell surface. is calculated using Distance from middle surface=(Shell thickness^(2)/(12*Unit bending moment))*((Normal stress on thin shells*Shell thickness)-(Unit normal force)). To calculate Distance from Middle Surface When Normal Stress is Given, you need Shell thickness (t), Unit bending moment (Mx), Normal stress on thin shells (fx) and Unit normal force (Nx). With our tool, you need to enter the respective value for Shell thickness, Unit bending moment, Normal stress on thin shells and Unit normal force and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Distance from middle surface?
In this formula, Distance from middle surface uses Shell thickness, Unit bending moment, Normal stress on thin shells and Unit normal force. We can use 1 other way(s) to calculate the same, which is/are as follows -
  • Distance from middle surface=sqrt((Shell thickness^(2)/4)-((Normal shearing stress*Shell thickness^3)/(6*Unit normal force)))
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