Полигон және гистограмма. Статистикалық үлестіруді толық түсіну үшін, оларды полигон және гистограммамен көрсетуге болады. Бұл екі ұғымның экономикалық процесстерді зерттеуде үлкен маңызы бар. Полигон жиіліктің және салыстырмалы жиіліктің полигоны болып екіге бөлінеді. Жазықтықта нүктелерін сынық сызықпен қосқанда пайда болған көпбұрыш жиілік полигоны деп аталады. Салыстырмалы жиілік полигоны деп жазықтықта нүктелерін сынық сызықпен қосқанда пайда болатын көпбұрышты атайды. Жиілік гистограммасы деп табандары h, биіктігі (жиілік тығыздығы) болатын тік төртбұрыштардан тұратын сатылы фигураны атайды. Салыстырмалы жиілік гистограммасы деп табандары h, биіктігі (салыстырмалы жиілік тығыздығы) болатын тік төртбұрыштардан тұратын сатылы фигураны атайды.
Таңдаманың ковариациясы және корреляция коэффициенті
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)
Do'stlaringiz bilan baham: |