Bending Moment Simply Supported Beam Subjected to a Concentrated Load Calculator

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✖Point Load acting on the Beam is a force applied at a single point at a set distance from the ends of the beam.ⓘ Point Load acting on the Beam [P]			+10% -10%
✖Distance from end A is the distance of the concentrated load from end A.ⓘ Distance from end A [a]			+10% -10%
✖Distance from end B is the distance of the concentrated load from end Bⓘ Distance from end B [b]			+10% -10%
✖Length is the measurement or extent of something from end to end.ⓘ Length [l]			+10% -10%

✖Bending Moment is the reaction induced in a structural element when an external force or moment is applied to the element, causing the element to bend.ⓘ Bending Moment Simply Supported Beam Subjected to a Concentrated Load [M]

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Bending Moment Simply Supported Beam Subjected to a Concentrated Load

Alithea Fernandes

Don Bosco College of Engineering (DBCE), Goa

Alithea Fernandes has created this Calculator and 100+ more calculators!

Venkata Sai Prasanna Aradhyula

Birla Institute of Technology & Science (BITS), Hyderabad

Venkata Sai Prasanna Aradhyula has verified this Calculator and 10+ more calculators!

< 11 Other formulas that you can solve using the same Inputs

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Surface Area=2*(Length*Width+Length*Height+Width*Height) GO

Perimeter of a rectangle when diagonal and length are given

Perimeter=2*(Length+sqrt((Diagonal)^2-(Length)^2)) GO

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Magnetic Flux=Magnetic Field*Length*Breadth*cos(θ) GO

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Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2) GO

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Area=Length*(sqrt((Diagonal)^2-(Length)^2)) GO

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Diagonal=sqrt(Length^2+Breadth^2) GO

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Strain=Change In Length/Length GO

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Surface Tension=Force/Length GO

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Perimeter=2*Length+2*Width GO

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Volume=Width*Height*Length GO

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Area=Length*Breadth GO

< 6 Other formulas that calculate the same Output

Bending Moment When Stress is Applied at Point y in a Curved Beam

Bending Moment =((Stress*Cross sectional area*Radius of Centroidal Axis)/(1+(Distance of Point from Centroidal Axis/(Cross-Section Property*(Radius of Centroidal Axis+Distance of Point from Centroidal Axis))))) GO

Bending Moment of Overhanging Beam Subjected to a Concentrated Load at Free End

Bending Moment =-Point Load acting on the Beam*Length of Overhang GO

Bending Moment of a Cantilever Subject to UDL Over its Entire Span

Bending Moment =(-Uniformly Distributed Load*Length^2)/2 GO

Bending Moment of Simply Supported Beams with Point Load at Centre

Bending Moment =(Point Load acting on the Beam*Length)/4 GO

Bending Moment of Simply Supported Beams with Uniformly Distributed Load

Bending Moment =(Uniformly Distributed Load*Length^2)/8 GO

Bending Moment of Cantilever Beam subjected to Point Load at Free End

Bending Moment =(-Point Load acting on the Beam*Length) GO

Bending Moment Simply Supported Beam Subjected to a Concentrated Load Formula

Bending Moment =(Point Load acting on the Beam*Distance from end A*Distance from end B)/Length
M=(P*a*b)/l

More formulas

Bending Moment of Simply Supported Beams with Point Load at Centre GO

Bending Moment of Simply Supported Beams with Uniformly Distributed Load GO

Bending Moment of Cantilever Beam subjected to Point Load at Free End GO

Bending Moment of a Cantilever Subject to UDL Over its Entire Span GO

Bending Moment of Overhanging Beam Subjected to a Concentrated Load at Free End GO

Fixed End Moment of a Fixed Beam having Point Load at Center GO

Fixed End Moment of a Fixed Beam having UDL over its entire Length GO

Fixed End Moment of a Fixed Beam carrying point load GO

Fixed End Moment of a Fixed Beam carrying Right Angled Triangular Load at Right Angled End A GO

Fixed End Moment of a Fixed Beam carrying Triangular Loading GO

Fixed End Moment of a Fixed Beam carrying two Equispaced Point Loads GO

Fixed End Moment of a Fixed Beam carrying three Equispaced Point Loads GO

Fixed End Moment of a Fixed Beam with Couple Moment GO

What is Bending Moment Simply Supported Beam Subjected to a Concentrated Load?

bending moment is the reaction induced in a structural element when a concentrated point load is applied to the beam, causing the beam to sag.

How to Calculate Bending Moment Simply Supported Beam Subjected to a Concentrated Load?

Bending Moment Simply Supported Beam Subjected to a Concentrated Load calculator uses Bending Moment =(Point Load acting on the Beam*Distance from end A*Distance from end B)/Length to calculate the Bending Moment , The Bending Moment Simply Supported Beam Subjected to a Concentrated Load formula is defined as (point load acting on beam*distance from end a*distance from end b)/length of the beam. Bending Moment and is denoted by M symbol.

How to calculate Bending Moment Simply Supported Beam Subjected to a Concentrated Load using this online calculator? To use this online calculator for Bending Moment Simply Supported Beam Subjected to a Concentrated Load, enter Point Load acting on the Beam (P), Distance from end A (a), Distance from end B (b) and Length (l) and hit the calculate button. Here is how the Bending Moment Simply Supported Beam Subjected to a Concentrated Load calculation can be explained with given input values -> 333.3333 = (10000*10*10)/3.

FAQ

What is Bending Moment Simply Supported Beam Subjected to a Concentrated Load?

The Bending Moment Simply Supported Beam Subjected to a Concentrated Load formula is defined as (point load acting on beam*distance from end a*distance from end b)/length of the beam and is represented as M=(P*a*b)/l or Bending Moment =(Point Load acting on the Beam*Distance from end A*Distance from end B)/Length. Point Load acting on the Beam is a force applied at a single point at a set distance from the ends of the beam, Distance from end A is the distance of the concentrated load from end A, Distance from end B is the distance of the concentrated load from end B and Length is the measurement or extent of something from end to end.

How to calculate Bending Moment Simply Supported Beam Subjected to a Concentrated Load?

The Bending Moment Simply Supported Beam Subjected to a Concentrated Load formula is defined as (point load acting on beam*distance from end a*distance from end b)/length of the beam is calculated using Bending Moment =(Point Load acting on the Beam*Distance from end A*Distance from end B)/Length. To calculate Bending Moment Simply Supported Beam Subjected to a Concentrated Load, you need Point Load acting on the Beam (P), Distance from end A (a), Distance from end B (b) and Length (l). With our tool, you need to enter the respective value for Point Load acting on the Beam, Distance from end A, Distance from end B and Length 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 Bending Moment ?

In this formula, Bending Moment uses Point Load acting on the Beam, Distance from end A, Distance from end B and Length. We can use 6 other way(s) to calculate the same, which is/are as follows -

Bending Moment =(Point Load acting on the Beam*Length)/4
Bending Moment =(Uniformly Distributed Load*Length^2)/8
Bending Moment =((Stress*Cross sectional area*Radius of Centroidal Axis)/(1+(Distance of Point from Centroidal Axis/(Cross-Section Property*(Radius of Centroidal Axis+Distance of Point from Centroidal Axis)))))
Bending Moment =(-Point Load acting on the Beam*Length)
Bending Moment =(-Uniformly Distributed Load*Length^2)/2
Bending Moment =-Point Load acting on the Beam*Length of Overhang

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