"Intiggrali" : Diffirenzi ntrê virsioni
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Riga 3:
L'intiggrali eni l'inversu di na [[dirivata]s.<br>
<!-- A '''derivative''' helps to find the steepness of a graph.-->
Chissu eni lu simmulu di l'intigrazzioni: <math>\int_{\,}^{\,}</math>
A statu usatu ppa prima vota ri [[Gottfried Wilhelm Leibniz]] ca a utilizzau comu ''s'' stilizzata (ppi ''summa'', [[lincua latina|Latinu]] ppi [[somma]]).
L'inticcrali e li dirivati venunu sturiati comu na discipplina ca si ciama [[calculu]] e chi fa parti ra [[matimatica]].<br>
Integration helps when trying to [[multiply]] units into a problem. For example, if a problem with [[rate]] (<math>distance \over time</math>) needs an answer with just distance, one solution is to integrate with respect to time. This means multiplying in time (to cancel the time in <math>distance \over time</math>). This is done by adding small slices of the rate graph together. The slices are close to zero in width, but adding them forever makes them add up to a whole. This is called a [[Riemann Sum]].
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