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4.1 Continuidad en un punto 4.2 Tipos de discontinuidades 4.3 Continuidad en intervalos
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1. Comprender el concepto de continuidad de una función en un punto. 2. Determinar y clasificar las discontinuidades de una función. 3. Bosquejar la gráfica de funciones continuas y discontinuas.
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4. Determinar los valores apropiados de ciertos parámetros que aseguran la continuidad en un punto para una función definida por partes. 5. Comprender el concepto de continuidad de una función en intervalos.
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6. Aplicar el teorema del Valor Intermedio para la existencia de raíces de una función continua.
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4.1 Continuidad en un punto 4.2 Tipos de discontinuidades 4.3 Continuidad en intervalos
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4.1 Continuidad en un punto 4.2 Tipos de discontinuidades 4.3 Continuidad en intervalos
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4.1 Continuidad en un punto 4.2 Tipos de discontinuidades 4.3 Continuidad en intervalos
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Intermediate value theorem The intermediate value theorem is an existence theorem, based on the real number property of completeness, and states: If the real-valued function f is continuous on the closed interval [a, b] and k is some number between f(a) and f(b), then there is some number c in [a, b] such that f(c) = k. For example, if a child grows from 1m to 1.5m between the ages of 2 years and 6 years, then, at some time between 2 years and 6 years of age, the child's height must have been 1.25m. As a consequence, if f is continuous on [a, b] and f(a) and f(b) differ in sign, then, at some point c in [a, b], f(c) must equal zero.
![Intermediate value theorem The intermediate value theorem is an existence theorem, based on the real number property of completeness, and states: If the real-valued function f is continuous on the closed interval [a, b] and k is some number between f(a) and f(b), then there is some number c in [a, b] such that f(c) = k.](http://images.slideplayer.es/13/3926805/slides/slide_194.jpg "For example, if a child grows from 1m to 1.5m between the ages of 2 years and 6 years, then, at some time between 2 years and 6 years of age, the child s height must have been 1.25m. As a consequence, if f is continuous on [a, b] and f(a) and f(b) differ in sign, then, at some point c in [a, b], f(c) must equal zero..")
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Extreme value theorem The extreme value theorem states that if a function f is defined on a closed interval [a,b] (or any closed and bounded set) and is continuous there, then the function attains its maximum, i.e. there exists c ∈ [a,b] with f(c) ≥ f(x) for all x ∈ [a,b]. The same is true of the minimum of f. These statements are not, in general, true if the function is defined on an open interval (a,b) (or any set that is not both closed and bounded), as, for example, the continuous function f(x) = 1/x, defined on the open interval (0,1), does not attain a maximum, being unbounded above.
![Extreme value theorem The extreme value theorem states that if a function f is defined on a closed interval [a,b] (or any closed and bounded set) and is continuous there, then the function attains its maximum, i.e.](http://images.slideplayer.es/13/3926805/slides/slide_232.jpg "there exists c ∈ [a,b] with f(c) ≥ f(x) for all x ∈ [a,b]. The same is true of the minimum of f. These statements are not, in general, true if the function is defined on an open interval (a,b) (or any set that is not both closed and bounded), as, for example, the continuous function f(x) = 1/x, defined on the open interval (0,1), does not attain a maximum, being unbounded above..")
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Gracias, espero que hayan aprendido algo. Fue un placer trabajar con ustedes. Hasta luego.
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