As construções realizadas através da barra de ferramentas podem ser também reproduzidas através da Janela de Álgebra[br][img]data:image/png;base64,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[/img]

Os pontos no GeoGebra são representados pelas letras maiúsculas do nosso alfabeto. Para construir um ponto, basta digitar suas coordenadas entre parênteses e separadas por virgula. Ao apertar a tecla enter note que uma letra maiúscula é atribuída pra denominar o ponto gerado. Caso prefira, você pode determinar a letra que representará o ponto. [br][br][b]Observação: [/b]No GeoGebra utiliza-se o ponto e não a vírgula para representar os número decimais

[list][*]Construa o ponto C=(0.5,2).[/*][/list]

Para construir um reta através da janela de álgebra você deverá digitar o seguinte comando: Reta < (Ponto) (Ponto) >[br]Você pode escolher dois pontos já existentes, ou criar novos pontos para determinar a reta.[br]Exemplo: para construir a reta através dos pontos (0,2) e (1,1) basta digitar: [br][img]data:image/png;base64,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[/img][br]Note que uma letra minúscula é determinada para representar a reta.

[list][*]Construa a reta r a partir dos ponto A=(2,5) e B=(1,3).[/*][/list]

Para construir um polígono através da Janela de Álgebra deve ser digitado o seguinte comando: Polígono(<Ponto,....,Ponto>) [br]Você poderá construir o polígono a partir de pontos ja existentes:[br][img]data:image/png;base64,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[/img][br]Ou poderá determinar os pontos:[br][img]data:image/png;base64,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[/img]

[list][*]Construa o polígono a partir dos pontos A=(1,3), B=(3,1), C=(4,1) e D=(3,3).[/*][/list]

[list][*]Para alterar elementos já criados basta clicar na entrada a ser alterada e editar o comando desejado.[/*][*]Para renomear um elemento você poderá seguir o comando descrito anteriormente e editar o nome desejado. [/*][/list]

Através da janela de álgebra altere os seguintes elementos:[br][list][*]Altere as coordenadas do ponto A para A=(2,3).[/*][*]Altere o nome da reta f pra s.[/*][*]Altere o polígono (E,B,C,D) criando o polígono (F,B,C,D).[/*][/list]

Materiais que podem contribuir com seu aprendizado:[br][url=https://www.geogebra.org/m/XUv5mXTm#material/wkcc8ne3]Tutorial GeoGebra Teams: "Tips and tricks for algebraic input" (Dicas para entrada algébrica)[/url][br][url=https://www.geogebra.org/m/XUv5mXTm#material/kgfffdfj]Tutorial GeoGebra Teams: "Commands" (Comandos)[/url]