Задание 4
![](data:image/png;base64,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)
| На рисунке — схема дорог, связывающих города A, B, C, D, E, F, G. По каждой дороге можно двигаться только в одном направлении, указанном стрелкой. Сколько существует различных путей из города А в город G?
| ПРАКТИЧЕСКАЯ РАБОТА
ГРАФИЧЕСКИЕ ИНФОРМАЦИОННЫЕ МОДЕЛИ. ВАРИАНТ 2.
Задание 1
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)
| На рисунке — схема дорог, связывающих города А, Б, В, Г, Д, Е, Ж и К. По каждой дороге можно двигаться только в одном направлении, указанном стрелкой. Сколько существует различных путей из города А в город К?
| Задание 2
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)
| На рисунке — схема дорог, связывающих города А, Б, В, Г, Д, Е, К. По каждой дороге можно двигаться только в одном направлении, указанном стрелкой. Сколько существует различных путей из города А в город К?
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