Difference between revisions of "Curvature Command"
From GeoGebra Manual
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: Calculates the curvature of the curve in the given point. | : Calculates the curvature of the curve in the given point. | ||
:{{example|1=<code><nowiki>Curvature[(0, 0), Curve[cos(t), sin(2t), t, 0, π]]</nowiki></code> yields ''0''.}} | :{{example|1=<code><nowiki>Curvature[(0, 0), Curve[cos(t), sin(2t), t, 0, π]]</nowiki></code> yields ''0''.}} | ||
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;Curvature[ <Point>, <Object> ] | ;Curvature[ <Point>, <Object> ] | ||
: Yields the curvature of the object (function, curve, conic) in the given point. | : Yields the curvature of the object (function, curve, conic) in the given point. |
Revision as of 14:06, 26 August 2015
- Curvature[ <Point>, <Function> ]
- Calculates the curvature of the function in the given point.
- Example:
Curvature[(0 ,0), x^2]
yields 2.
- Curvature[ <Point>, <Curve> ]
- Calculates the curvature of the curve in the given point.
- Example:
Curvature[(0, 0), Curve[cos(t), sin(2t), t, 0, π]]
yields 0.
- Curvature[ <Point>, <Object> ]
- Yields the curvature of the object (function, curve, conic) in the given point.
- Examples:
Curvature[(0 ,0), x^2]
yields 2Curvature[(0, 0), Curve[cos(t), sin(2t), t, 0, π]]
yields 0Curvature[(-1, 0), Conic[{1, 1, 1, 2, 2, 3}]]
yields 2