Difference between revisions of "IntegralSymbolic Command"
From GeoGebra Manual
(Created page with "<noinclude>{{Manual Page|version=5.0}}</noinclude>{{command|function}} ;IntegralSymbolic(<Function>) :Gives the indefinite symbolic integral, so that the unknown constant c i...") |
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;IntegralSymbolic(<Function>, <Variable>) | ;IntegralSymbolic(<Function>, <Variable>) | ||
:Gives the partial symbolic integral, so that the unknown constant c is not automatically a slider, with respect to the given variable. | :Gives the partial symbolic integral, so that the unknown constant c is not automatically a slider, with respect to the given variable. | ||
− | :{{Example|1=<code><nowiki>IntegralSymbolic(x³+3x y, x)</nowiki></code> gives'' <math> \frac{1}{4}x^4</math> + <math>\frac{3}{2} | + | :{{Example|1=<code><nowiki>IntegralSymbolic(x³+3x y, x)</nowiki></code> gives'' <math> \frac{1}{4}x^4</math> + <math>\frac{3}{2} x² y+c_{1} </math>'' .}} |
Revision as of 16:42, 23 September 2020
- IntegralSymbolic(<Function>)
- Gives the indefinite symbolic integral, so that the unknown constant c is not automatically a slider, with respect to the main variable.
- Example:
IntegralSymbolic(3x^2)
yields x^3+c_{1}.
- IntegralSymbolic(<Function>, <Variable>)
- Gives the partial symbolic integral, so that the unknown constant c is not automatically a slider, with respect to the given variable.
- Example:
IntegralSymbolic(x³+3x y, x)
gives \frac{1}{4}x^4 + \frac{3}{2} x² y+c_{1} .