Chord Length from Radius and Angle (Degrees): 50 units Radius; 270 deg Central Angle (Degrees)

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Dr. Nadia Petrov

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Serbian biomedical engineer trained at Imperial College London, developing low-cost prosthetics for conflict zones

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Dr. Isabella Rossi

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Italian neuroscientist at Sapienza University of Rome, studying the neural mechanisms of bilingual language processing

Last updatedFebruary 22, 2026

PublishedFebruary 22, 2026

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50 units Radius; 270 deg Central Angle (Degrees) converts to

70.710678 units

Use this as a quick reference for Chord Length from Radius and Angle (Degrees).

Value Details

Input: 50 units Radius; 270 deg Central Angle (Degrees)

Output: 70.710678 units

Browse all reference values for Chord Length from Radius and Angle (Degrees)

Chord Length from Radius and Angle (Degrees)

Calculate chord length from circle radius and central angle in degrees.

Calculated Result

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Nearby Reference Values

Chord Length from Radius and Angle (Degrees) values near 50 units Radius; 270 deg Central Angle (Degrees)
Scenario	Chord Length
50 units Radius; 15 deg Central Angle (Degrees)	13.052619 units
50 units Radius; 30 deg Central Angle (Degrees)	25.881905 units
50 units Radius; 45 deg Central Angle (Degrees)	38.268343 units
50 units Radius; 60 deg Central Angle (Degrees)	50 units
50 units Radius; 90 deg Central Angle (Degrees)	70.710678 units
50 units Radius; 120 deg Central Angle (Degrees)	86.60254 units
50 units Radius; 150 deg Central Angle (Degrees)	96.592583 units
50 units Radius; 180 deg Central Angle (Degrees)	100 units
50 units Radius; 210 deg Central Angle (Degrees)	96.592583 units
50 units Radius; 240 deg Central Angle (Degrees)	86.60254 units
50 units Radius; 270 deg Central Angle (Degrees)	70.710678 units
50 units Radius; 300 deg Central Angle (Degrees)	50 units
50 units Radius; 330 deg Central Angle (Degrees)	25.881905 units
50 units Radius; 360 deg Central Angle (Degrees)	0 units

Frequently Asked Questions

Common questions about Chord Length from Radius and Angle (Degrees), formulas, and expected usage.

What does the Chord Length from Radius and Angle (Degrees) calculator do?

It helps with finding straight-line span across a circle from radius and central angle.

What formula does the Chord Length from Radius and Angle (Degrees) calculator use?

Chord length = 2r sin(θ/2), with θ in degrees.

What inputs are valid?

Radius must be non-negative and the central angle is limited to 0-360° in this calculator.

When would I use this?

finding straight-line span across a circle from radius and central angle

Methodology and Review

This page is generated from the same conversion definition used by the main calculator page, which keeps the calculator, reference table rows, and FAQ schema aligned.

Reviewer and update metadata are shown above and included in structured data. See our editorial policy, review process, and corrections policy.

Use this page as a fast lookup reference, then confirm final project values using applicable standards and manufacturer documentation.