Volume of thin cylindrical shell given circumferential and longitudinal strain Solution

STEP 0: Pre-Calculation Summary
Formula Used
Volume of Thin Cylindrical Shell = Change in Volume/((2*Circumferential strain Thin Shell)+Longitudinal Strain)
VT = ∆V/((2*e1)+εlongitudinal)
This formula uses 4 Variables
Variables Used
Volume of Thin Cylindrical Shell - (Measured in Cubic Meter) - Volume of Thin Cylindrical Shell is the amount of space that a substance or object occupies or that is enclosed within a container.
Change in Volume - (Measured in Cubic Meter) - The Change in volume is difference of initial and final volume.
Circumferential strain Thin Shell - Circumferential strain Thin Shell represents the change in length.
Longitudinal Strain - The Longitudinal Strain is ratio of change in length to original length.
STEP 1: Convert Input(s) to Base Unit
Change in Volume: 56 Cubic Meter --> 56 Cubic Meter No Conversion Required
Circumferential strain Thin Shell: 2.5 --> No Conversion Required
Longitudinal Strain: 40 --> No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
VT = ∆V/((2*e1)+εlongitudinal) --> 56/((2*2.5)+40)
Evaluating ... ...
VT = 1.24444444444444
STEP 3: Convert Result to Output's Unit
1.24444444444444 Cubic Meter --> No Conversion Required
FINAL ANSWER
1.24444444444444 1.244444 Cubic Meter <-- Volume of Thin Cylindrical Shell
(Calculation completed in 00.004 seconds)

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23 Effect of Internal Pressure on Dimension of Thin Cylindrical Shell Calculators

Diameter of cylindrical shell given change in length of cylindrical shell
Go Diameter of Shell = (Change in Length*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/(((Internal Pressure in thin shell*Length Of Cylindrical Shell))*((1/2)-Poisson's Ratio))
Length of cylindrical shell given change in length of cylindrical shell
Go Length Of Cylindrical Shell = (Change in Length*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/(((Internal Pressure in thin shell*Diameter of Shell))*((1/2)-Poisson's Ratio))
Internal fluid pressure given change in length of cylindrical shell
Go Internal Pressure in thin shell = (Change in Length*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/(((Diameter of Shell*Length Of Cylindrical Shell))*((1/2)-Poisson's Ratio))
Internal diameter of thin cylindrical vessel given circumferential strain
Go Inner Diameter of Cylinder = (Circumferential strain Thin Shell*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/(((Internal Pressure in thin shell))*((1/2)-Poisson's Ratio))
Internal fluid pressure given circumferential strain
Go Internal Pressure in thin shell = (Circumferential strain Thin Shell*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/(((Inner Diameter of Cylinder))*((1/2)-Poisson's Ratio))
Internal fluid pressure in thin cylindrical vessel given change in diameter
Go Internal Pressure in thin shell = (Change in Diameter*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/((((Inner Diameter of Cylinder^2)))*(1-(Poisson's Ratio/2)))
Internal fluid pressure in thin cylindrical vessel given longitudinal strain
Go Internal Pressure in thin shell = (Longitudinal Strain*2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell)/((Inner Diameter of Cylinder)*((1/2)-Poisson's Ratio))
Internal diameter of thin cylindrical vessel given longitudinal strain
Go Inner Diameter of Cylinder = (Longitudinal Strain*2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell)/((Internal Pressure in thin shell)*((1/2)-Poisson's Ratio))
Original diameter of vessel given change in diameter
Go Original Diameter = (Change in Diameter*(2*Thickness Of Thin Shell*Modulus of Elasticity Of Thin Shell))/(((Internal Pressure in thin shell))*(1-(Poisson's Ratio/2)))^(1/2)
Length of cylindrical shell given change in volume of cylindrical shell
Go Length Of Cylindrical Shell = ((Change in Volume/(pi/4))-(Change in Length*(Diameter of Shell^2)))/(2*Diameter of Shell*Change in Diameter)
Diameter of thin cylindrical shell given volumetric strain
Go Diameter of Shell = (Volumetric Strain*2*Modulus of Elasticity Of Thin Shell*Thickness Of Thin Shell)/((Internal Pressure in thin shell)*((5/2)-Poisson's Ratio))
Internal fluid pressure in shell given volumetric strain
Go Internal Pressure in thin shell = (Volumetric Strain*2*Modulus of Elasticity Of Thin Shell*Thickness Of Thin Shell)/((Diameter of Shell)*((5/2)-Poisson's Ratio))
Longitudinal stress given circumferential strain
Go Longitudinal Stress Thick Shell = (Hoop Stress in Thin shell-(Circumferential strain Thin Shell*Modulus of Elasticity Of Thin Shell))/Poisson's Ratio
Hoop stress given circumferential strain
Go Hoop Stress in Thin shell = (Circumferential strain Thin Shell*Modulus of Elasticity Of Thin Shell)+(Poisson's Ratio*Longitudinal Stress Thick Shell)
Hoop stress in thin cylindrical vessel given Longitudinal strain
Go Hoop Stress in Thin shell = (-(Longitudinal Strain*Modulus of Elasticity Of Thin Shell)+Longitudinal Stress Thick Shell)/(Poisson's Ratio)
Longitudinal stress in thin cylindrical vessel given Longitudinal strain
Go Longitudinal Stress Thick Shell = ((Longitudinal Strain*Modulus of Elasticity Of Thin Shell))+(Poisson's Ratio*Hoop Stress in Thin shell)
Diameter of thin cylindrical strain given volumetric strain
Go Diameter of Shell = 2*Change in Distance/(Volumetric Strain-(Change in Length/Length Of Cylindrical Shell))
Length of thin cylindrical strain given volumetric strain
Go Length Of Cylindrical Shell = Change in Length/(Volumetric Strain-(2*Change in Diameter/Diameter of Shell))
Volume of thin cylindrical shell given circumferential and longitudinal strain
Go Volume of Thin Cylindrical Shell = Change in Volume/((2*Circumferential strain Thin Shell)+Longitudinal Strain)
Original circumference of thin cylindrical vessel given circumferential strain
Go Original Circumference = Change in circumference/Circumferential strain Thin Shell
Original diameter of thin cylindrical vessel given circumferential strain
Go Original Diameter = Change in Diameter/Circumferential strain Thin Shell
Original length of vessel given longitudinal strain
Go Initial Length = Change in Length/Longitudinal Strain
Original volume of cylindrical shell given volumetric strain
Go Original Volume = Change in Volume/Volumetric Strain

Volume of thin cylindrical shell given circumferential and longitudinal strain Formula

Volume of Thin Cylindrical Shell = Change in Volume/((2*Circumferential strain Thin Shell)+Longitudinal Strain)
VT = ∆V/((2*e1)+εlongitudinal)

What is tensile strength with example?

Tensile strength is a measurement of the force required to pull something such as rope, wire, or a structural beam to the point where it breaks. The tensile strength of a material is the maximum amount of tensile stress that it can take before failure, for example breaking.

How to Calculate Volume of thin cylindrical shell given circumferential and longitudinal strain?

Volume of thin cylindrical shell given circumferential and longitudinal strain calculator uses Volume of Thin Cylindrical Shell = Change in Volume/((2*Circumferential strain Thin Shell)+Longitudinal Strain) to calculate the Volume of Thin Cylindrical Shell, The Volume of thin cylindrical shell given circumferential and longitudinal strain formula is defined as the quantity of three-dimensional space enclosed by a closed surface. Volume of Thin Cylindrical Shell is denoted by VT symbol.

How to calculate Volume of thin cylindrical shell given circumferential and longitudinal strain using this online calculator? To use this online calculator for Volume of thin cylindrical shell given circumferential and longitudinal strain, enter Change in Volume (∆V), Circumferential strain Thin Shell (e1) & Longitudinal Strain longitudinal) and hit the calculate button. Here is how the Volume of thin cylindrical shell given circumferential and longitudinal strain calculation can be explained with given input values -> 1.244444 = 56/((2*2.5)+40).

FAQ

What is Volume of thin cylindrical shell given circumferential and longitudinal strain?
The Volume of thin cylindrical shell given circumferential and longitudinal strain formula is defined as the quantity of three-dimensional space enclosed by a closed surface and is represented as VT = ∆V/((2*e1)+εlongitudinal) or Volume of Thin Cylindrical Shell = Change in Volume/((2*Circumferential strain Thin Shell)+Longitudinal Strain). The Change in volume is difference of initial and final volume, Circumferential strain Thin Shell represents the change in length & The Longitudinal Strain is ratio of change in length to original length.
How to calculate Volume of thin cylindrical shell given circumferential and longitudinal strain?
The Volume of thin cylindrical shell given circumferential and longitudinal strain formula is defined as the quantity of three-dimensional space enclosed by a closed surface is calculated using Volume of Thin Cylindrical Shell = Change in Volume/((2*Circumferential strain Thin Shell)+Longitudinal Strain). To calculate Volume of thin cylindrical shell given circumferential and longitudinal strain, you need Change in Volume (∆V), Circumferential strain Thin Shell (e1) & Longitudinal Strain longitudinal). With our tool, you need to enter the respective value for Change in Volume, Circumferential strain Thin Shell & Longitudinal Strain and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
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