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ПР графические модели. Практическая работа
ПРАКТИЧЕСКАЯ РАБОТА
ГРАФИЧЕСКИЕ ИНФОРМАЦИОННЫЕ МОДЕЛИ. ВАРИАНТ 1.
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?
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Задание 2
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)
| На рисунке — схема дорог, связывающих города А, Б, В, Г, Д, Е и К. По каждой дороге можно двигаться только в одном направлении, указанном стрелкой. Сколько существует различных путей из города А в город К?
| Задание 3
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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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