[size=100][size=150]Вот графики, представляющие три линейные зависимости. Эти функции могут быть представлены формулами. Для каждого приведенного ниже утверждения решите, верно оно или нет.[/size][/size]
Линейная функция. Часть 2.
Задание 1. Для каждой пары точек найдите наклон прямой, проходящей через эти точки. Если вы испытываете затруднения , попробуйте нанести точки на этом апплете и провести через них прямую линию.
a) [math](1,1)[/math] и [math](7,5)[/math]
b) [math](1,1)[/math] и [math](5,7)[/math]
c) [math](2,5)[/math] и [math](-1,2)[/math]
d) [math](2,5)[/math] и [math](-7,-4)[/math]
Задание 2. Прямая l изображена на координатной плоскости. Дано АВ=5 ед., ВС=10 ед.
[img]data:image/png;base64,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[/img][br][br]a) Какие координаты точки [math]B[/math]?
b) Какие координаты точки [math]C[/math]?
b) Какие координаты точки [math]D[/math]?
c) Принадлежит ли точка [math](16,31)[/math] прямой [math]\ell[/math]?
Объясните свой ответ.
d) Принадлежит ли точка [math](20,24)[/math] прямой [math]\ell[/math]?
Объясните свой ответ.
f) Напишите правило, которое позволит вам проверить, принадлежит ли точка [math](x,y)[/math] прямой [math]\ell[/math].
Задание 3
а)
Точка с координатами (4, 0) принадлежит прямой m.
Объясните свой ответ.
б)
Точка G принадлежит двум прямым .
в)
Прямая m задана уравнением у= -х + 4
г)
У прямой n начальная ордината равна 0
г)
У прямой m начальная ордината равна -4