Dominio e Imagen

Dominio
[b][i]Sabiendo que el dominio de una función f(x) es el conjunto de valores de x para los cuales la función esta definida.[/i][/b]
Dominio
[b][i]Observa el comportamiento de las funciones graficadas f(x) y g(x). ¿Cuál es el dominio de la funcion f(x) ?¿y el de la función g(x) ?¿Encontras diferencia en los dominios?[/i][/b]
[i][b][color=#0000ff]Sabiendo que la imagen de una función f(x) es el conjunto de resultados que se obtienen al aplicar f(x) a todos los valores del dominio.[/color][/b][/i]
Imagen
[b][i]Enunciar la imagen de ambas funciones[/i][/b]
Comparando las funciones
[b][i]¿Qué diferencia encontras entre la función f(x) y g(x)?[/i][/b]
Definición de módulo!!!
[b][i]Recordemos la definición de:[/i][/b][br][img]data:image/png;base64,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[/img]
¡¡¡Dominio e Imagen!!
[b][i]Mirando la definición de la función módulo: Explicar porque la gráfica de la función g(x)=|x| tiene forma de V[br][/i][/b]Ayuda: hace un cuadro poniendo valores positivos y negativos a x y fíjate que resultados te devuelve la función.
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