[table][tr][td][b][color=#0000ff]ANTES DEBES SABER...[/color][br]Que son rectas perpendiculares[/b][br]Dos rectas son perpendiculares si al cortarse forman cuatro ángulos rectos. [/td][/tr][/table] [img]data:image/png;base64,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[/img][br]Para representar puntos en el plano se utilizaran dos rectas numéricas perpendiculares, denominadas [b]ejes de coordenadas. [/b][br][br]Un [b]sistema de coordenadas cartesianas [/b]esta formado por:[br][list][*][b]Eje de abscisas[/b], que es la recta horizontal y se representa por[b] X[/b][/*][*][b]Eje de ordenadas[/b], que es la recta vertical y se representa por [b]Y[/b] [/*][*][b]Origen de coordenadas[/b], que es el punto de corte de los ejes y se representa por [b]O[/b]. El origen de coordenadas coincide con el O de ambas rectas numéricas. [/*][/list][br] 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[/img][br]Un punto P del plano queda determinado por un par de números, [math]\left(a,b\right)[/math], llamados[b] coordenadas cartesianas[/b] del punto P, y se escribe [math]P\left(a,b\right)[/math].[br][list][*]El número [math]a[/math] es la [b]abscisa [/b]del punto P y se mide en el eje horizontal.[/*][*]El número [math]b[/math] es la [b]ordenada[/b] del punto P y se mide en el eje vertical ç[/*][*]El punto [b]O[/b] representa el punto (0,0).[/*][/list][br] Los ejes de coordenadas dividen el plano en cuatro partes, cada una de las cuales se llama[b] cuadrante.[/b] [br][br] [img]data:image/png;base64,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[/img]

Escribe las coordenadas de este punto [br][u]Solución: [/u][br]Abscisa 5 a la izquierda del origen de coordenadas [br]Ordenada:3 por encima del origen.[br]Por lo tanto, A(-5,3)[br] 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7gX1BuM6DUbUYbCRpShsBFlKGxEGQobUYbCRpShP30odDKvAPGTEqTON3o1obARZejXKFEE+G+TzAEnwgK7XgAAAABJRU5ErkJggg==[/img]

[list=1][*]Representa los puntos e indica en que cuadrante se encuentran [/*][/list]A(-2,5) B(3,5) C(7,2) D(-4,5) [br]

2. Gráfica las coordenadas cartesianas de estos puntos y responde ¿Qué características común tiene los puntos del primer y segundo cuadrante?[br][br][left][/left][table][tr][td][b]Punto[/b][/td][td][b]Primera Coordenada [/b][/td][/tr][tr][td][b]A[/b][/td][td][b]3[/b][/td][/tr][tr][td][b]B[/b][/td][td][b]-1[/b][/td][/tr][tr][td][b]C[/b][/td][td][b]-4[/b][/td][/tr][/table] [br][table][tr][td][b]Punto[/b][/td][td][b]Segunda Coordenada [/b][/td][/tr][tr][td][b]A[/b][/td][td][b]2[/b][/td][/tr][tr][td][b]B[/b][/td][td][b]3[/b][/td][/tr][tr][td][b]C[/b][/td][td][b]-2[/b][/td][/tr][/table] [br]