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Консультация № 190057
17.11.2016, 22:34
0.00 руб.
0
5
1
Здравствуйте, уважаемые эксперты! Прошу вас ответить на следующий вопрос:
Биатлонисту необходимо разбить 5 мишеней .Какова вероятность того,что для этого потребуется ровно 7 патронов ,если вероятность промаха при каждом выстреле равна 0,2?
Биатлонисту необходимо разбить 5 мишеней .Какова вероятность того,что для этого потребуется ровно 7 патронов ,если вероятность промаха при каждом выстреле равна 0,2?
Обсуждение
17.11.2016, 22:43
общий
18.11.2016, 16:59
это ответ
Здравствуйте, A!
Нужно немного по-другому прочитать задачу: нужно выстрелить ровно семь раз и попасть ровно пять раз. Задача на применение формулы Бернулли, в которой р=0,8, q=0,2 , n=7, k=5
Нужно немного по-другому прочитать задачу: нужно выстрелить ровно семь раз и попасть ровно пять раз. Задача на применение формулы Бернулли, в которой р=0,8, q=0,2 , n=7, k=5
18.11.2016, 12:32
общий
Адресаты:
Ну и где решение? 
Об авторе:
"Если вы заметили, что вы на стороне большинства, —
это верный признак того, что пора меняться." Марк Твен
"Если вы заметили, что вы на стороне большинства, —
это верный признак того, что пора меняться." Марк Твен
18.11.2016, 16:40
общий
А вот и решение, просто я подумал, что в формулу-то уж цифры можно и самому подставить
Прикрепленные файлы:
23.11.2016, 00:54
общий
По данной задаче отмечу, что в условии можно выделить ещё одно ограничение: потратить ровно 7 патронов на 5 целей означает поразить пятую мишень седьмым выстрелом. Вариант с промахом на последнем выстреле невозможен, потому что, если все цели поражены до него, этот выстрел не будет произведён
Тогда условие означает 4 попадания и 2 промаха из первых шести выстрелов в произвольном порядке и попадание на седьмом выстреле
C64[$183$]0.84[$183$]0.22[$183$]0.8=C64[$183$]0.85[$183$]0.22=0.197
Тогда условие означает 4 попадания и 2 промаха из первых шести выстрелов в произвольном порядке и попадание на седьмом выстреле
C64[$183$]0.84[$183$]0.22[$183$]0.8=C64[$183$]0.85[$183$]0.22=0.197
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