Шешуі:
а) айырмашылығы тек элементтерінің орналасу ретінде ғана болатын 7!
алмастырулар жасауға болады. Сонда
ә) тең мүмкіндікті барлық оқиғалар саны болады. Бұлардың ішінде
«ШЫМКЕНТ» сөзінің шығу ықтималдығы біреу, демек оның ықтималдығы
![](data:image/png;base64,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)
Преферанс ойынында 32 картаны он-оннан 3 адамға таратып, екеуін төңкеріп қояды. Осы төңкеріп қойылған карталардың екеуінің де тұз болу ықтималдығы неге тең?
Достарыңызбен бөлісу: |