Stress due to Longitudinal Bending at Top most Fibre of Cross Section Solution

STEP 0: Pre-Calculation Summary
Formula Used
Stress Bending Moment at Topmost of Cross Section = Bending Moment at Support/(Value of k1 depending on Saddle Angle*pi*(Shell Radius)^(2)*Shell Thickness)
f1 = M1/(k1*pi*(R)^(2)*t)
This formula uses 1 Constants, 5 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Variables Used
Stress Bending Moment at Topmost of Cross Section - (Measured in Pascal) - The Stress Bending Moment at Topmost of Cross Section refers to the amount of stress that develops at the outermost or topmost layer of a vessel.
Bending Moment at Support - (Measured in Newton Meter) - Bending Moment at Support refers to the maximum moment or torque that is experienced by a structural member, such as a beam or column, at the point where it is supported.
Value of k1 depending on Saddle Angle - Value of k1 depending on Saddle Angle is used in the calculation of the bending moment due to the weight of the vessel.
Shell Radius - (Measured in Meter) - Shell Radius refers to the distance from the center of the vessel to its outermost point on the cylindrical or spherical shell.
Shell Thickness - (Measured in Meter) - Shell thickness is the the distance through the shell.
STEP 1: Convert Input(s) to Base Unit
Bending Moment at Support: 1000000 Newton Millimeter --> 1000 Newton Meter (Check conversion ​here)
Value of k1 depending on Saddle Angle: 0.107 --> No Conversion Required
Shell Radius: 1380 Millimeter --> 1.38 Meter (Check conversion ​here)
Shell Thickness: 200 Millimeter --> 0.2 Meter (Check conversion ​here)
STEP 2: Evaluate Formula
Substituting Input Values in Formula
f1 = M1/(k1*pi*(R)^(2)*t) --> 1000/(0.107*pi*(1.38)^(2)*0.2)
Evaluating ... ...
f1 = 7810.48820988558
STEP 3: Convert Result to Output's Unit
7810.48820988558 Pascal -->0.00781048820988558 Newton per Square Millimeter (Check conversion ​here)
FINAL ANSWER
0.00781048820988558 0.00781 Newton per Square Millimeter <-- Stress Bending Moment at Topmost of Cross Section
(Calculation completed in 00.020 seconds)

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Saddle Support Calculators

Bending Moment at Support
​ LaTeX ​ Go Bending Moment at Support = Total Load per Saddle*Distance from Tangent Line to Saddle Centre*((1)-((1-(Distance from Tangent Line to Saddle Centre/Tangent to Tangent Length of Vessel)+(((Vessel Radius)^(2)-(Depth of Head)^(2))/(2*Distance from Tangent Line to Saddle Centre*Tangent to Tangent Length of Vessel)))/(1+(4/3)*(Depth of Head/Tangent to Tangent Length of Vessel))))
Combined Stresses at Topmost Fibre of Cross Section
​ LaTeX ​ Go Combined Stresses Topmost Fibre Cross Section = Stress due to Internal Pressure+Stress Bending Moment at Topmost of Cross Section
Combined Stresses at Bottommost Fibre of Cross Section
​ LaTeX ​ Go Combined Stresses Bottommost Fibre Cross Section = Stress due to Internal Pressure-Stress at Bottom most Fibre of Cross Section
Combined Stresses at Mid Span
​ LaTeX ​ Go Combined Stresses at Mid Span = Stress due to Internal Pressure+Stress due to Longitudinal Bending at Mid-Span

Stress due to Longitudinal Bending at Top most Fibre of Cross Section Formula

​LaTeX ​Go
Stress Bending Moment at Topmost of Cross Section = Bending Moment at Support/(Value of k1 depending on Saddle Angle*pi*(Shell Radius)^(2)*Shell Thickness)
f1 = M1/(k1*pi*(R)^(2)*t)

What is Cross Section?

Cross section refers to a two-dimensional view of an object or structure that has been sliced perpendicular to its axis or central line. The resulting view reveals the internal structure of the object or structure and shows its shape and dimensions. Cross sections are commonly used in engineering and science to study the internal structure of materials, components, and structures. For example, a cross section of a tree trunk can reveal its growth rings and internal structure, while a cross section of a bridge beam can show its internal reinforcing bars and other features.

How to Calculate Stress due to Longitudinal Bending at Top most Fibre of Cross Section?

Stress due to Longitudinal Bending at Top most Fibre of Cross Section calculator uses Stress Bending Moment at Topmost of Cross Section = Bending Moment at Support/(Value of k1 depending on Saddle Angle*pi*(Shell Radius)^(2)*Shell Thickness) to calculate the Stress Bending Moment at Topmost of Cross Section, Stress due to Longitudinal Bending at Top most Fibre of Cross Section refers to the amount of stress that develops at the outermost or topmost layer of a beam or structural element when a bending moment is applied. Stress Bending Moment at Topmost of Cross Section is denoted by f1 symbol.

How to calculate Stress due to Longitudinal Bending at Top most Fibre of Cross Section using this online calculator? To use this online calculator for Stress due to Longitudinal Bending at Top most Fibre of Cross Section, enter Bending Moment at Support (M1), Value of k1 depending on Saddle Angle (k1), Shell Radius (R) & Shell Thickness (t) and hit the calculate button. Here is how the Stress due to Longitudinal Bending at Top most Fibre of Cross Section calculation can be explained with given input values -> 7.8E-9 = 1000/(0.107*pi*(1.38)^(2)*0.2).

FAQ

What is Stress due to Longitudinal Bending at Top most Fibre of Cross Section?
Stress due to Longitudinal Bending at Top most Fibre of Cross Section refers to the amount of stress that develops at the outermost or topmost layer of a beam or structural element when a bending moment is applied and is represented as f1 = M1/(k1*pi*(R)^(2)*t) or Stress Bending Moment at Topmost of Cross Section = Bending Moment at Support/(Value of k1 depending on Saddle Angle*pi*(Shell Radius)^(2)*Shell Thickness). Bending Moment at Support refers to the maximum moment or torque that is experienced by a structural member, such as a beam or column, at the point where it is supported, Value of k1 depending on Saddle Angle is used in the calculation of the bending moment due to the weight of the vessel, Shell Radius refers to the distance from the center of the vessel to its outermost point on the cylindrical or spherical shell & Shell thickness is the the distance through the shell.
How to calculate Stress due to Longitudinal Bending at Top most Fibre of Cross Section?
Stress due to Longitudinal Bending at Top most Fibre of Cross Section refers to the amount of stress that develops at the outermost or topmost layer of a beam or structural element when a bending moment is applied is calculated using Stress Bending Moment at Topmost of Cross Section = Bending Moment at Support/(Value of k1 depending on Saddle Angle*pi*(Shell Radius)^(2)*Shell Thickness). To calculate Stress due to Longitudinal Bending at Top most Fibre of Cross Section, you need Bending Moment at Support (M1), Value of k1 depending on Saddle Angle (k1), Shell Radius (R) & Shell Thickness (t). With our tool, you need to enter the respective value for Bending Moment at Support, Value of k1 depending on Saddle Angle, Shell Radius & Shell Thickness 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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