Saiju Shah
Jayawant Shikshan Prasarak Mandal (JSPM), Pune
Saiju Shah has created this Calculator and 500+ more calculators!
Himanshi Sharma
Bhilai Institute of Technology (BIT), Raipur
Himanshi Sharma has verified this Calculator and 500+ more calculators!

11 Other formulas that you can solve using the same Inputs

Circumference of an ellipse
Circumference of an ellipse=((pi*Major axis*Minor axis+(Major axis-Minor axis)^2))/(Major axis/2+Minor axis/2) GO
Focal parameter of an ellipse
Focal parameter of an ellipse=Minor axis^2/Major axis GO
Eccentricity of an ellipse (a>b)
Eccentricity=sqrt(1-((Minor axis)^2/(Major axis)^2)) GO
Eccentricity of an ellipse (b>a)
Eccentricity=sqrt(1-((Minor axis)^2/(Major axis)^2)) GO
Exradius of an ellipse
Radius of the Circumscribed circle=Major axis/2 GO
Flattening of an ellipse
Flattening=(Major axis-Minor axis)/Minor axis GO
Latus Rectum of an ellipse (a>b)
Latus Rectum=2*(Minor axis)^2/(Major axis) GO
Latus Rectum of an ellipse (b>a)
Latus Rectum=2*(Minor axis)^2/Major axis GO
Directrix of an ellipse(a>b)
Directrix=Major axis/Eccentricity GO
Directrix of an ellipse(b>a)
Directrix=Major axis/Eccentricity GO
Area of an ellipse
Area=(pi*Major axis*Minor axis)/4 GO

11 Other formulas that calculate the same Output

Length over which Deformation Takes Place when Strain Energy in Torsion is Given
Length=sqrt(2*Strain Energy*Polar moment of Inertia*Shear Modulus of Elasticity/Torque^2) GO
Length over which Deformation Takes Place when Strain Energy in Bending is Given
Length=Strain Energy*(2*Modulus Of Elasticity*Moment of Inertia)/(Bending moment^2) GO
Length over which Deformation Takes Place when Strain Energy in Shear is Given
Length=2*Strain Energy*Shear Area*Shear Modulus of Elasticity/(Shear Force^2) GO
Length of rectangle when diagonal and breadth are given
Length=sqrt(Diagonal^2-Breadth^2) GO
Length of rectangle when perimeter and breadth are given
Length=(Perimeter-2*Breadth)/2 GO
Length of rectangle when diagonal and angle between two diagonal are given
Length=Diagonal*sin(sinϑ/2) GO
Length of a rectangle in terms of diagonal and angle between diagonal and breadth
Length=Diagonal*sin(sinϑ) GO
Length of rectangle when area and breadth are given
Length=Area/Breadth GO
Length of major axis of an ellipse (a>b)
Length=2*Major axis GO
Length of minor axis of an ellipse (a>b)
Length=2*Minor axis GO
Length of minor axis of an ellipse (b>a)
Length=2*Minor axis GO

Length of the major axis of an ellipse (b>a) Formula

Length=2*Major axis
l=2*a
More formulas
Eccentricity of an ellipse (a>b) GO
Eccentricity of an ellipse (b>a) GO
Directrix of an ellipse(a>b) GO
Directrix of an ellipse(b>a) GO
Latus Rectum of an ellipse (a>b) GO
Latus Rectum of an ellipse (b>a) GO
Length of major axis of an ellipse (a>b) GO
Length of minor axis of an ellipse (a>b) GO
Length of minor axis of an ellipse (b>a) GO
Linear eccentricity of an ellipse GO
Semi-latus rectum of an ellipse GO
Eccentricity of an ellipse when linear eccentricity is given GO
Semi-major axis of an ellipse GO
Semi-minor axis of an ellipse GO
Latus rectum of an ellipse when focal parameter is given GO
Linear eccentricity of ellipse when eccentricity and major axis are given GO
Linear eccentricity of an ellipse when eccentricity and semimajor axis are given GO
Semi-latus rectum of an ellipse when eccentricity is given GO
Area of Ellipse GO
Circumference of Ellipse GO
Axis 'a' of Ellipse when Area is given GO
Axis 'b' of Ellipse when area is given GO
Length of radius vector from center in given direction whose angle is theta in ellipse GO

What is major axis of an ellipse and how it is calculated?

The major axis is the long axis of an ellipse, passing through its foci. It is also the width of an ellipse. It an ellipse (b>a) it is calculated by the expression L = 2b where L denotes the length of the major axis, b is the major axis.

How to Calculate Length of the major axis of an ellipse (b>a)?

Length of the major axis of an ellipse (b>a) calculator uses Length=2*Major axis to calculate the Length, Length of the major axis of an ellipse (b>a) is the long axis of an ellipse, passing through its foci. Length and is denoted by l symbol.

How to calculate Length of the major axis of an ellipse (b>a) using this online calculator? To use this online calculator for Length of the major axis of an ellipse (b>a), enter Major axis (a) and hit the calculate button. Here is how the Length of the major axis of an ellipse (b>a) calculation can be explained with given input values -> 0.2 = 2*0.1.

FAQ

What is Length of the major axis of an ellipse (b>a)?
Length of the major axis of an ellipse (b>a) is the long axis of an ellipse, passing through its foci and is represented as l=2*a or Length=2*Major axis. Major axis is the line segment that crosses both the focal points of the ellipse.
How to calculate Length of the major axis of an ellipse (b>a)?
Length of the major axis of an ellipse (b>a) is the long axis of an ellipse, passing through its foci is calculated using Length=2*Major axis. To calculate Length of the major axis of an ellipse (b>a), you need Major axis (a). With our tool, you need to enter the respective value for Major axis 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 Length?
In this formula, Length uses Major axis. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Length=sqrt(Diagonal^2-Breadth^2)
  • Length=Area/Breadth
  • Length=(Perimeter-2*Breadth)/2
  • Length=Diagonal*sin(sinϑ)
  • Length=Diagonal*sin(sinϑ/2)
  • Length=2*Major axis
  • Length=2*Minor axis
  • Length=2*Minor axis
  • Length=2*Strain Energy*Shear Area*Shear Modulus of Elasticity/(Shear Force^2)
  • Length=sqrt(2*Strain Energy*Polar moment of Inertia*Shear Modulus of Elasticity/Torque^2)
  • Length=Strain Energy*(2*Modulus Of Elasticity*Moment of Inertia)/(Bending moment^2)
Share Image
Let Others Know
Facebook
Twitter
Reddit
LinkedIn
Email
WhatsApp
Copied!