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- L'hospital's rule for 0/0 forms
- Boucher, Chris
- One form of L'Hospital's rule states that if f(x)tends to 0 and g(x)tends to 0 as x tends to a, then lim of f(x)/g(x) when x tends to a is egual to lim of (f'(x))/(g'(x)) when x tends to a. In this Demonstration, you can choose from a variety of functions with roots at 1 to form the numerator and denominator of a quotient. These functions are plotted as dashed curves and their quotient is plotted as a solid gold curve. The application of L'Hospital's rule to compute the limit of the quotient at 1 is shown above the plot
- Componente Curricular::Educação Superior::Ciências Exatas e da Terra::Matemática
- Wolfram Demonstration Project
- Educação Superior::Ciências Exatas e da Terra::Matemática::Álgebra Comutativa
- College mathematics
- The application of L'Hospital's rule to compute the limit of the quotient at 1 is shown above the plot
- This demonstration needs the "MathematicaPlayer.exe" to run. Found in http://objetoseducacionais2.mec.gov.br/handle/mec/4737
- Demonstration freeware using Mathematica Player
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