Maximum Stress in Unsymmetrical Bending Solution

STEP 0: Pre-Calculation Summary
Formula Used
Maximum Stress = ((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis)+((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis)
fMax = ((Mx*y)/Ix)+((My*x)/Iy)
This formula uses 7 Variables
Variables Used
Maximum Stress - (Measured in Newton per Square Meter) - Maximum Stress is defined as force per unit area that the force acts upon.
Bending Moment about X-Axis - (Measured in Newton Meter) - Bending Moment about X-Axis is defined as the bending moment about principal axis XX.
Distance from Point to XX Axis - (Measured in Millimeter) - Distance from Point to XX Axis is the distance of the point to XX axis where stress is to be computed.
Moment of Inertia about X-Axis - (Measured in Kilogram Square Meter) - Moment of Inertia about X-Axis is defined as the moment of inertia of cross-section about XX.
Bending Moment about Y-Axis - (Measured in Newton Meter) - Bending Moment about Y-Axis is defined as the bending moment about principal axis YY.
Distance from Point to YY Axis - (Measured in Millimeter) - Distance from Point to YY Axis is the distance from the point to the YY axis where stress is to be computed.
Moment of Inertia about Y-Axis - (Measured in Kilogram Square Meter) - Moment of Inertia about Y-Axis is defined as the moment of inertia of cross-section about YY.
STEP 1: Convert Input(s) to Base Unit
Bending Moment about X-Axis: 239 Newton Meter --> 239 Newton Meter No Conversion Required
Distance from Point to XX Axis: 169 Millimeter --> 169 Millimeter No Conversion Required
Moment of Inertia about X-Axis: 51 Kilogram Square Meter --> 51 Kilogram Square Meter No Conversion Required
Bending Moment about Y-Axis: 307 Newton Meter --> 307 Newton Meter No Conversion Required
Distance from Point to YY Axis: 104 Millimeter --> 104 Millimeter No Conversion Required
Moment of Inertia about Y-Axis: 50 Kilogram Square Meter --> 50 Kilogram Square Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
fMax = ((Mx*y)/Ix)+((My*x)/Iy) --> ((239*169)/51)+((307*104)/50)
Evaluating ... ...
fMax = 1430.54039215686
STEP 3: Convert Result to Output's Unit
1430.54039215686 Pascal -->1430.54039215686 Newton per Square Meter (Check conversion ​here)
FINAL ANSWER
1430.54039215686 1430.54 Newton per Square Meter <-- Maximum Stress
(Calculation completed in 00.004 seconds)

Credits

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Created by Kethavath Srinath
Osmania University (OU), Hyderabad
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Verified by Rudrani Tidke
Cummins College of Engineering for Women (CCEW), Pune
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Unsymmetrical Bending Calculators

Bending Moment about Axis XX given Maximum Stress in Unsymmetrical Bending
​ LaTeX ​ Go Bending Moment about X-Axis = (Maximum Stress-((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis))*Moment of Inertia about X-Axis/(Distance from Point to XX Axis)
Bending Moment about Axis YY given Maximum Stress in Unsymmetrical Bending
​ LaTeX ​ Go Bending Moment about Y-Axis = (Maximum Stress-((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis))*Moment of Inertia about Y-Axis/(Distance from Point to YY Axis)
Maximum Stress in Unsymmetrical Bending
​ LaTeX ​ Go Maximum Stress = ((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis)+((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis)
Distance from YY axis to stress point given Maximum Stress in Unsymmetrical Bending
​ LaTeX ​ Go Distance from Point to YY Axis = (Maximum Stress-((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis))*Moment of Inertia about Y-Axis/Bending Moment about Y-Axis

Maximum Stress in Unsymmetrical Bending Formula

​LaTeX ​Go
Maximum Stress = ((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis)+((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis)
fMax = ((Mx*y)/Ix)+((My*x)/Iy)

Define Stress

Stress, in physical sciences and engineering, force per unit area within materials that arises from externally applied forces, uneven heating, or permanent deformation and that permits an accurate description and prediction of elastic, plastic, and fluid behaviour. Stress is expressed as a quotient of a force divided by an area.

How to Calculate Maximum Stress in Unsymmetrical Bending?

Maximum Stress in Unsymmetrical Bending calculator uses Maximum Stress = ((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis)+((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis) to calculate the Maximum Stress, The Maximum Stress in Unsymmetrical Bending formula is defined as the force acting on the unit area of a material. The effect of stress on a body is named strain. Maximum Stress is denoted by fMax symbol.

How to calculate Maximum Stress in Unsymmetrical Bending using this online calculator? To use this online calculator for Maximum Stress in Unsymmetrical Bending, enter Bending Moment about X-Axis (Mx), Distance from Point to XX Axis (y), Moment of Inertia about X-Axis (Ix), Bending Moment about Y-Axis (My), Distance from Point to YY Axis (x) & Moment of Inertia about Y-Axis (Iy) and hit the calculate button. Here is how the Maximum Stress in Unsymmetrical Bending calculation can be explained with given input values -> 1430.54 = ((239*0.169)/51)+((307*0.104)/50).

FAQ

What is Maximum Stress in Unsymmetrical Bending?
The Maximum Stress in Unsymmetrical Bending formula is defined as the force acting on the unit area of a material. The effect of stress on a body is named strain and is represented as fMax = ((Mx*y)/Ix)+((My*x)/Iy) or Maximum Stress = ((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis)+((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis). Bending Moment about X-Axis is defined as the bending moment about principal axis XX, Distance from Point to XX Axis is the distance of the point to XX axis where stress is to be computed, Moment of Inertia about X-Axis is defined as the moment of inertia of cross-section about XX, Bending Moment about Y-Axis is defined as the bending moment about principal axis YY, Distance from Point to YY Axis is the distance from the point to the YY axis where stress is to be computed & Moment of Inertia about Y-Axis is defined as the moment of inertia of cross-section about YY.
How to calculate Maximum Stress in Unsymmetrical Bending?
The Maximum Stress in Unsymmetrical Bending formula is defined as the force acting on the unit area of a material. The effect of stress on a body is named strain is calculated using Maximum Stress = ((Bending Moment about X-Axis*Distance from Point to XX Axis)/Moment of Inertia about X-Axis)+((Bending Moment about Y-Axis*Distance from Point to YY Axis)/Moment of Inertia about Y-Axis). To calculate Maximum Stress in Unsymmetrical Bending, you need Bending Moment about X-Axis (Mx), Distance from Point to XX Axis (y), Moment of Inertia about X-Axis (Ix), Bending Moment about Y-Axis (My), Distance from Point to YY Axis (x) & Moment of Inertia about Y-Axis (Iy). With our tool, you need to enter the respective value for Bending Moment about X-Axis, Distance from Point to XX Axis, Moment of Inertia about X-Axis, Bending Moment about Y-Axis, Distance from Point to YY Axis & Moment of Inertia about Y-Axis 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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