4 Other formulas that calculate the same Output

Latus rectum of an ellipse when focal parameter is given
Latus Rectum=Focal parameter of an ellipse*Eccentricity GO
Latus Rectum of hyperbola
Latus Rectum=(2*(Minor axis)^2)/(Major 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

Length of latus rectum of parabola Formula

Latus Rectum=4*Focus
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Inscribed angle of the circle when the central angle of the circle is given GO
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Arc length of the circle when central angle and radius are given GO
Area of the sector when radius and central angle are given GO
Area of sector when radius and central angle are given GO
Heron's formula GO
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 the major axis of an ellipse (b>a) 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
Eccentricity of hyperbola GO
Linear eccentricity of the hyperbola GO
Semi-latus rectum of hyperbola GO
Focal parameter of the hyperbola GO
Latus Rectum of hyperbola GO
Length of transverse axis of hyperbola GO
Length of conjugate axis of the hyperbola GO
Eccentricity of hyperbola when linear eccentricity is given GO
Number of diagonal of a regular polygon with given number of sides GO

What is latus rectum of parabola ?

Latus rectum of a parabola is a line segment perpendicular to the axis of the parabola, through the focus and whose endpoints lie on the parabola. It is calculated by the equation L= 4a.

How to Calculate Length of latus rectum of parabola?

Length of latus rectum of parabola calculator uses Latus Rectum=4*Focus to calculate the Latus Rectum, Length of latus rectum of parabola is a line segment perpendicular to the axis of the parabola, through the focus and whose endpoints lie on the parabola. Latus Rectum and is denoted by L symbol.

How to calculate Length of latus rectum of parabola using this online calculator? To use this online calculator for Length of latus rectum of parabola, enter Focus (f) and hit the calculate button. Here is how the Length of latus rectum of parabola calculation can be explained with given input values -> 0.4 = 4*0.1.

FAQ

What is Length of latus rectum of parabola?
Length of latus rectum of parabola is a line segment perpendicular to the axis of the parabola, through the focus and whose endpoints lie on the parabola and is represented as L=4*f or Latus Rectum=4*Focus. Focus, are special points with reference to which any of a variety of curves is constructed.
How to calculate Length of latus rectum of parabola?
Length of latus rectum of parabola is a line segment perpendicular to the axis of the parabola, through the focus and whose endpoints lie on the parabola is calculated using Latus Rectum=4*Focus. To calculate Length of latus rectum of parabola, you need Focus (f). With our tool, you need to enter the respective value for Focus 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 Latus Rectum?
In this formula, Latus Rectum uses Focus. We can use 4 other way(s) to calculate the same, which is/are as follows -
  • Latus Rectum=2*(Minor axis)^2/(Major axis)
  • Latus Rectum=2*(Minor axis)^2/Major axis
  • Latus Rectum=Focal parameter of an ellipse*Eccentricity
  • Latus Rectum=(2*(Minor axis)^2)/(Major axis)
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