Alithea Fernandes
Don Bosco College of Engineering (DBCE), Goa
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Rushi Shah
K J Somaiya College of Engineering (K J Somaiya), Mumbai
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11 Other formulas that you can solve using the same Inputs

Surface Area of a Rectangular Prism
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
Magnetic Flux
Magnetic Flux=Magnetic Field*Length*Breadth*cos(θ) GO
Diagonal of a Rectangle when length and area are given
Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2) GO
Area of a Rectangle when length and diagonal are given
Area=Length*(sqrt((Diagonal)^2-(Length)^2)) GO
Diagonal of a Rectangle when length and breadth are given
Diagonal=sqrt(Length^2+Breadth^2) GO
Strain
Strain=Change In Length/Length GO
Surface Tension
Surface Tension=Force/Length GO
Perimeter of a rectangle when length and width are given
Perimeter=2*Length+2*Width GO
Volume of a Rectangular Prism
Volume=Width*Height*Length GO
Area of a Rectangle when length and breadth are given
Area=Length*Breadth GO

6 Other formulas that calculate the same Output

Maximum and Center Deflection of Cantilever Beam carrying Point Load at any point
Deflection=(Point Load acting on the Beam*(Distance from end A^2)*(3*Length-Distance from end A))/(6*Modulus Of Elasticity*Area Moment of Inertia) GO
Maximum and Center Deflection of Simply Supported Beam carrying UDL over its entire Length
Deflection=(5*Uniformly Distributed Load*(Length^4))/(384*Modulus Of Elasticity*Area Moment of Inertia) GO
Maximum and Center Deflection of Simply Supported Beam carrying Point Load at Center
Deflection=(Point Load acting on the Beam*(Length^3))/(48*Modulus Of Elasticity*Area Moment of Inertia) GO
Maximum and Center Deflection of Cantilever Beam with Couple Moment at Free End
Deflection=(Couple Moment*(Length^2))/(2*Modulus Of Elasticity*Area Moment of Inertia) GO
Deflection of fixed beam with load at center
Deflection=-Width*(Length^3)/(192*Elastic Modulus*Moment of Inertia) GO
Deflection of fixed beam with uniformly distributed load
Deflection=-Width*Length^4/(384*Elastic Modulus*Moment of Inertia) GO

Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End Formula

Deflection=(Point Load acting on the Beam*(Length^3))/(3*Modulus Of Elasticity*Area Moment of Inertia)
𝜕 =(P*(l^3))/(3*E*I)
More formulas
Maximum and Center Deflection of Simply Supported Beam carrying Point Load at Center GO
Maximum and Center Deflection of Simply Supported Beam carrying UDL over its entire Length GO
Maximum and Center Deflection of Cantilever Beam carrying Point Load at any point GO
Maximum and Center Deflection of Cantilever Beam with Couple Moment at Free End GO

What is Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End?

Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End is the degree to which a Cantilever beam is displaced under a Point load at free end.

How to Calculate Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End?

Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End calculator uses Deflection=(Point Load acting on the Beam*(Length^3))/(3*Modulus Of Elasticity*Area Moment of Inertia) to calculate the Deflection, The Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End formula is defined as (Point load acting on Beam*(length^3))/(3*Modulus of Elasticity*Area Moment of Inertia). Deflection and is denoted by 𝜕 symbol.

How to calculate Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End using this online calculator? To use this online calculator for Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End, enter Point Load acting on the Beam (P), Length (l), Modulus Of Elasticity (E) and Area Moment of Inertia (I) and hit the calculate button. Here is how the Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End calculation can be explained with given input values -> 0.09 = (10000*(3^3))/(3*10000*100).

FAQ

What is Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End?
The Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End formula is defined as (Point load acting on Beam*(length^3))/(3*Modulus of Elasticity*Area Moment of Inertia) and is represented as 𝜕 =(P*(l^3))/(3*E*I) or Deflection=(Point Load acting on the Beam*(Length^3))/(3*Modulus Of Elasticity*Area Moment of Inertia). Point Load acting on the Beam is a force applied at a single point at a set distance from the ends of the beam, Length is the measurement or extent of something from end to end, Modulus Of Elasticity is a quantity that measures an object or substance's resistance to being deformed elastically when a stress is applied to it and Area moment of inertia is a property of a two-dimensional plane shape which characterizes its deflection under loading.
How to calculate Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End?
The Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End formula is defined as (Point load acting on Beam*(length^3))/(3*Modulus of Elasticity*Area Moment of Inertia) is calculated using Deflection=(Point Load acting on the Beam*(Length^3))/(3*Modulus Of Elasticity*Area Moment of Inertia). To calculate Maximum and Center Deflection of Cantilever Beam carrying Point Load at Free End, you need Point Load acting on the Beam (P), Length (l), Modulus Of Elasticity (E) and Area Moment of Inertia (I). With our tool, you need to enter the respective value for Point Load acting on the Beam, Length, Modulus Of Elasticity and Area Moment of Inertia 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 Deflection?
In this formula, Deflection uses Point Load acting on the Beam, Length, Modulus Of Elasticity and Area Moment of Inertia. We can use 6 other way(s) to calculate the same, which is/are as follows -
  • Deflection=-Width*(Length^3)/(192*Elastic Modulus*Moment of Inertia)
  • Deflection=-Width*Length^4/(384*Elastic Modulus*Moment of Inertia)
  • Deflection=(Point Load acting on the Beam*(Length^3))/(48*Modulus Of Elasticity*Area Moment of Inertia)
  • Deflection=(5*Uniformly Distributed Load*(Length^4))/(384*Modulus Of Elasticity*Area Moment of Inertia)
  • Deflection=(Point Load acting on the Beam*(Distance from end A^2)*(3*Length-Distance from end A))/(6*Modulus Of Elasticity*Area Moment of Inertia)
  • Deflection=(Couple Moment*(Length^2))/(2*Modulus Of Elasticity*Area Moment of Inertia)
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