Difference between revisions of "Tangent Command"

Revision as of 13:47, 30 July 2014

Tangent[ <Point>, <Conic> ]: Creates (all) tangents through the point to the conic section.; Example:
Tangent[(5, 4), 4x^2 - 5y^2 = 20] yields x - y = 1.

Tangent[ <Point>, <Function> ]: Creates the tangent to the function at x = x(A).; Note: x(A) is the x-coordinate of the given point A.; Example:
Tangent[(1, 0), x^2] yields y = 2x - 1.

Tangent[ <Point on Curve>, <Curve> ]: Creates the tangent to the curve in the given point.; Example:
Tangent[(0, 1), Curve[cos(t), sin(t), t, 0, π]] yields y = 1.

Tangent[ <x-Value>, <Function> ]: Creates the tangent to the function at x-Value.; Example:
Tangent[1, x^2] yields y = 2x - 1.

Tangent[ <Line>, <Conic> ]: Creates (all) tangents to the conic section that are parallel to the given line.; Example:
Tangent[y = 4, x^2 + y^2 = 4] yields y = 2 and y = -2.

Tangent[ <Circle>, <Circle> ]: Creates the common tangents to the two Circles (up to 4).; Example:
Tangent[x^2 + y^2 = 4, (x - 6)^2 + y^2 = 4] yields y = 2, y = -2, 1.49x + 1.67y = 4.47 and -1.49x + 1.67y = -4.47.

Note: See also

Following text is about a feature that is supported only in GeoGebra 5.0.

Tangent[ <Point>, <Spline> ]: Creates the tangent to the spline in the given point.; Example:
Let A = (0, 1), B = (1, 1) and C = (0, 4). Tangent[B, Spline[{A, B, C}] yields line a: y = 2x - 1.

@@ Line 21: / Line 21: @@
 :{{example|1=<div><code><nowiki>Tangent[x^2 + y^2 = 4, (x - 6)^2 + y^2 = 4]</nowiki></code> yields ''y = 2'', ''y = -2'', ''1.49x + 1.67y = 4.47'' and ''-1.49x + 1.67y = -4.47''.</div>}}
 {{Note| See also  [[Image:Tool Tangents.gif]] [[Tangents Tool|Tangents]] tool.}}
+{{betamanual|version=5.0|;Tangent[ <Point>, <Spline> ]
+:Creates the tangent to the spline in the given point.
+:{{example|1=<div>Let ''A = (0, 1)'', ''B = (1, 1)'' and ''C = (0, 4)''. <code><nowiki>Tangent[B, Spline[{A, B, C}]</nowiki></code> yields line ''a'': ''y'' = ''2x - 1''.</div>}}
+}}