Cissoid of Diocles Definition - Calculus II Key Term

Definition

The Cissoid of Diocles is a type of plane curve historically used for solving the problem of doubling the cube. In polar coordinates, its equation can be given as $r = 2a \sin\theta \tan\theta$.

5 Must Know Facts For Your Next Test

The Cissoid of Diocles is defined by the equation $r = 2a \sin\theta \tan\theta$ in polar coordinates.
It was originally used to solve the problem of duplicating the cube, an ancient Greek mathematical challenge.
The curve has a cusp at the origin and extends infinitely in one direction.
When parameterized, it can be expressed as $(x,y) = (t^2, t(2a - t^2))$ where $t$ is a parameter.
The area under one arch of the cissoid can be calculated using definite integrals.

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Related terms

Polar Coordinates:

A coordinate system where each point on a plane is determined by an angle and a distance from a reference point.

Parametric Equations:

Equations that express coordinates as functions of one or more parameters instead of as implicit relationships between variables.

Area Under a Curve:

A concept in integral calculus representing the total area between a curve and the x-axis over a given interval.

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Cissoid of Diocles

Definition

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