2 Дан параллелепипед ABCDA,B,CD: ј найдите вектор AB + С, В, + BD, ; 2 найдите вектор ВА - DA - CC: з представьте вектор BA, ввидeрaзнoсти двух векторов один из которых-вектор D, В.
Радиус перпендикулярен касательной в точке касания. Касательные из одной точки к окружности равны. Отрезки, соединяющие центр окружности и точку, из которой проведены касательные являются биссектрисами углов между этими касательными и углов между радиусами, проведенными к этим касательным в точки касания. Сумма острых углов прямоугольного треугольника равна 90°. Сумма всех углов с вершиной в центре окружности равна 360°. Следовательно:
At the beginning of the day, Margaret had 72 ice cream cones. By noon, she had $\frac{2}{3}$ as many cones as she had at the beginning of the day. By the end of the day, she only had $\frac{2}{3}$ as many cones as she had at noon. How many ice cream cones does she have at the end of the day?
Объяснение:
At the beginning of the day, Margaret had 72 ice cream cones. By noon, she had $\frac{2}{3}$ as many cones as she had at the beginning of the day. By the end of the day, she only had $\frac{2}{3}$ as many cones as she had at noon. How many ice cream cones does she have at the end of the day?
Радиус перпендикулярен касательной в точке касания. Касательные из одной точки к окружности равны. Отрезки, соединяющие центр окружности и точку, из которой проведены касательные являются биссектрисами углов между этими касательными и углов между радиусами, проведенными к этим касательным в точки касания. Сумма острых углов прямоугольного треугольника равна 90°. Сумма всех углов с вершиной в центре окружности равна 360°. Следовательно:
<NML=2*28=56°, <MNL=2*31=62°, <NLM=180-56-62=62°, <AOM=90-28=62°, <AON=90-31=59°, <NOB=<AON=59°, <MOC=<AOM=62°, <AOC=2*<AOM=124°, <AOB=2*<AON=118°, <COB=360-124-118=118°, <COL=<BOL=<COB:2 = 59°.
At the beginning of the day, Margaret had 72 ice cream cones. By noon, she had $\frac{2}{3}$ as many cones as she had at the beginning of the day. By the end of the day, she only had $\frac{2}{3}$ as many cones as she had at noon. How many ice cream cones does she have at the end of the day?
Объяснение:
At the beginning of the day, Margaret had 72 ice cream cones. By noon, she had $\frac{2}{3}$ as many cones as she had at the beginning of the day. By the end of the day, she only had $\frac{2}{3}$ as many cones as she had at noon. How many ice cream cones does she have at the end of the day?