Semi Latus Rectum of Ellipse given Major and Minor Axes Calculator

✖Minor Axis of Ellipse is the length of the longest chord which is perpendicular to the line joining the foci of the Ellipse.ⓘ Minor Axis of Ellipse [2b]			+10% -10%
✖Major Axis of Ellipse is the length of the chord which passing through both foci of the Ellipse.ⓘ Major Axis of Ellipse [2a]			+10% -10%

✖Semi Latus Rectum of Ellipse is half of the line segment passing through any of the foci and perpendicular to the major axis whose ends are on the Ellipse.ⓘ Semi Latus Rectum of Ellipse given Major and Minor Axes [l]

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Semi Latus Rectum of Ellipse given Major and Minor Axes Solution

STEP 0: Pre-Calculation Summary

Formula Used

Semi Latus Rectum of Ellipse = (Minor Axis of Ellipse)^2/(2*Major Axis of Ellipse)
l = (2b)^2/(2*2a)
This formula uses 3 Variables

Variables Used

Semi Latus Rectum of Ellipse - (Measured in Meter) - Semi Latus Rectum of Ellipse is half of the line segment passing through any of the foci and perpendicular to the major axis whose ends are on the Ellipse.
Minor Axis of Ellipse - (Measured in Meter) - Minor Axis of Ellipse is the length of the longest chord which is perpendicular to the line joining the foci of the Ellipse.
Major Axis of Ellipse - (Measured in Meter) - Major Axis of Ellipse is the length of the chord which passing through both foci of the Ellipse.

STEP 1: Convert Input(s) to Base Unit

Minor Axis of Ellipse: 12 Meter --> 12 Meter No Conversion Required
Major Axis of Ellipse: 20 Meter --> 20 Meter No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

l = (2b)^2/(2*2a) --> (12)^2/(2*20)

Evaluating ... ...

l = 3.6

STEP 3: Convert Result to Output's Unit

3.6 Meter --> No Conversion Required

FINAL ANSWER

3.6 Meter <-- Semi Latus Rectum of Ellipse

(Calculation completed in 00.015 seconds)

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< Latus Rectum of Ellipse Calculators

Semi Latus Rectum of Ellipse

LaTeX Go Semi Latus Rectum of Ellipse = (Semi Minor Axis of Ellipse^2)/Semi Major Axis of Ellipse

Latus Rectum of Ellipse

LaTeX Go Latus Rectum of Ellipse = 2*(Semi Minor Axis of Ellipse^2)/(Semi Major Axis of Ellipse)

Latus Rectum of Ellipse given Major and Minor Axes

LaTeX Go Latus Rectum of Ellipse = (Minor Axis of Ellipse)^2/Major Axis of Ellipse

Latus Rectum of Ellipse given Semi Latus Rectum

LaTeX Go Latus Rectum of Ellipse = 2*Semi Latus Rectum of Ellipse

Semi Latus Rectum of Ellipse given Major and Minor Axes Formula

LaTeX Go

Semi Latus Rectum of Ellipse = (Minor Axis of Ellipse)^2/(2*Major Axis of Ellipse)
l = (2b)^2/(2*2a)

What is an Ellipse?

An Ellipse is basically a conic section. If we cut a right circular cone using a plane at an angle greater than the semi angle of cone. Geometrically an Ellipse is the collection of all points in a plane such that the sum of the distances to them from two fixed points is a constant. Those fixed points are the foci of the Ellipse. The largest chord of the Ellipse is the major axis and the chord which passing through the center and perpendicular to the major axis is the minor axis of the ellipse. Circle is a special case of Ellipse in which both foci coincide at the center and so both major and minor axes become equal in length which is called the diameter of the circle.

How to Calculate Semi Latus Rectum of Ellipse given Major and Minor Axes?

Semi Latus Rectum of Ellipse given Major and Minor Axes calculator uses Semi Latus Rectum of Ellipse = (Minor Axis of Ellipse)^2/(2*Major Axis of Ellipse) to calculate the Semi Latus Rectum of Ellipse, Semi Latus Rectum of Ellipse given Major and Minor Axes formula is defined as half of the line segment passing through any of the foci and perpendicular to the major axis whose ends are on the Ellipse and calculated using major and minor axes of the Ellipse. Semi Latus Rectum of Ellipse is denoted by l symbol.

How to calculate Semi Latus Rectum of Ellipse given Major and Minor Axes using this online calculator? To use this online calculator for Semi Latus Rectum of Ellipse given Major and Minor Axes, enter Minor Axis of Ellipse (2b) & Major Axis of Ellipse (2a) and hit the calculate button. Here is how the Semi Latus Rectum of Ellipse given Major and Minor Axes calculation can be explained with given input values -> 3.6 = (12)^2/(2*20).

FAQ

What is Semi Latus Rectum of Ellipse given Major and Minor Axes?

Semi Latus Rectum of Ellipse given Major and Minor Axes formula is defined as half of the line segment passing through any of the foci and perpendicular to the major axis whose ends are on the Ellipse and calculated using major and minor axes of the Ellipse and is represented as l = (2b)^2/(2*2a) or Semi Latus Rectum of Ellipse = (Minor Axis of Ellipse)^2/(2*Major Axis of Ellipse). Minor Axis of Ellipse is the length of the longest chord which is perpendicular to the line joining the foci of the Ellipse & Major Axis of Ellipse is the length of the chord which passing through both foci of the Ellipse.

How to calculate Semi Latus Rectum of Ellipse given Major and Minor Axes?

Semi Latus Rectum of Ellipse given Major and Minor Axes formula is defined as half of the line segment passing through any of the foci and perpendicular to the major axis whose ends are on the Ellipse and calculated using major and minor axes of the Ellipse is calculated using Semi Latus Rectum of Ellipse = (Minor Axis of Ellipse)^2/(2*Major Axis of Ellipse). To calculate Semi Latus Rectum of Ellipse given Major and Minor Axes, you need Minor Axis of Ellipse (2b) & Major Axis of Ellipse (2a). With our tool, you need to enter the respective value for Minor Axis of Ellipse & Major Axis of Ellipse 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 Semi Latus Rectum of Ellipse?

In this formula, Semi Latus Rectum of Ellipse uses Minor Axis of Ellipse & Major Axis of Ellipse. We can use 2 other way(s) to calculate the same, which is/are as follows -

Semi Latus Rectum of Ellipse = (Semi Minor Axis of Ellipse^2)/Semi Major Axis of Ellipse
Semi Latus Rectum of Ellipse = Latus Rectum of Ellipse/2

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