Nessa seção exploraremos as funções de Ângulo, Distância e Área

[list][*]Com a ferramenta [icon]/images/ggb/toolbar/mode_angle.png[/icon] [i]Ângulo [/i]selecione duas retas ou três ponto na Janela de Visualização[/*][*]O mesmo pode ser feito através de comandos. Além disso, com o campo de entrada na Janela de Álgebra obtemos uma variedade maior de possibilidades para a medida de ângulos[/*][/list][br]      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[/img]

[list][*]Com a barra de ferramentas, obtenha o ângulo entre as retas f e g[/*][*]Através dos comandos, obtenha o ângulo entre as retas h e i[/*][/list]

[b]Observação:[/b] Note que a ordem de escolha dos objetos interfere na determinação do ângulo

[list][/list][list][*]Com a ferramenta [icon]https://www.geogebra.org/images/ggb/toolbar/mode_distance.png[/icon] [i]Distância, Comprimento ou Perímetro [/i]selecione dois pontos, um segmento, um polígono ou um círculo, assim você obterá a distância entre dois pontos, o comprimento de um segmento ou o perímetro de um polígono ou de um círculo [/*][*]O mesmo pode ser feito com os comandos:[/*][/list]Distância(<Ponto>, <Objeto>)[br]Distância(<Reta> , <Reta>)[br]Comprimento(<Objeto>)[br]Perímetro(<Polígono>)[br]Perímetro(<Cônica>)[br]

[list][*]Através da Barra de Ferramentas, obtenha a distância entre os pontos A e B[/*][*]Através dos comandos, obtenha o comprimento do segmento f, o perímetro do polígono pol1 e a distância entre as retas i e j[/*][/list]

[list][*]Com a ferramenta [icon]/images/ggb/toolbar/mode_area.png[/icon] [i]Área [/i]selecione um polígono, um círculo ou uma elipse[/*][*]O mesmo pode ser feito com os comandos: Área( <Polígono> ) ou Área( <Cônica> )[/*][/list]

[list][*]Com a Barra de Ferramentas obtenha a área do polígono pol1[/*][*]Com os comandos obtenha as áreas do polígono pol2, do círculo p e da elipse q[/*][/list]

Materiais que podem contribuir com seu aprendizado:[br][url=https://www.geogebra.org/m/XUv5mXTm#material/jjudfh2c]Tutorial GeoGebra Teams: 'Triangle inequalities' (Desigualdade triangular)[/url][br][url=https://www.geogebra.org/m/XUv5mXTm#material/vdpt7nm5]Tutorial GeoGebra Teams: "Angle sum in a triangle" (Soma de ângulos em um triângulo)[/url][br]