Эконометрика (2 задания) "Имеются следующие данные об уровне цифровизации производственной деятельности х " (Решение → 5666)

Описание

Вариант 1

Имеются данные о доли расходов на товары длительного пользования у<sub>i</sub> от среднемесячного дохода семьи x<sub>i</sub>. Предполагается, что эта зависимость носит характер y = a / x + b . Необходимо:

1. В соответствии с методом наименьших квадратов найти уравнение линейной регрессии y = a / x + b .

2. Найти парный коэффициент корреляции и с доверительной вероятности p = 0,9 проверить его значимость.

Оглавление

Вариант 1

Имеются данные о доли расходов на товары длительного пользования у<sub>i</sub> от среднемесячного дохода семьи x<sub>i</sub>. Предполагается, что эта зависимость носит характер y = a / x + b . Необходимо:

1. В соответствии с методом наименьших квадратов найти уравнение линейной регрессии y = a / x + b .

2. Найти парный коэффициент корреляции и с доверительной вероятности p = 0,9 проверить его значимость.

<img 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">;

Эконометрика (2 задания) Имеются следующие данные об уровне цифровизации производственной деятельности х (Решение → 5666)

Эконометрика (2 задания) Имеются следующие данные об уровне цифровизации производственной деятельности х (Решение → 5666)

Описание Вариант 1 Имеются данные о доли расходов на товары длительного пользования у&lt;sub&gt;i&lt;/sub&gt; от среднемесячного дохода семьи x&lt;sub&gt;i&lt;/sub&gt;. Предполагается, что эта зависимость носит характер y = a / x + b . Необходимо:1. В соответствии с методом наименьших квадратов найти уравнение линейной регрессии y = a / x + b .2. Найти парный коэффициент корреляции и с доверительной вероятности p = 0,9 проверить его значимость. Оглавление Вариант 1 Имеются данные о доли расходов на товары длительного пользования у&lt;sub&gt;i&lt;/sub&gt; от среднемесячного дохода семьи x&lt;sub&gt;i&lt;/sub&gt;. Предполагается, что эта зависимость носит характер y = a / x + b . Необходимо:1. В соответствии с методом наименьших квадратов найти уравнение линейной регрессии y = a / x + b .2. Найти парный коэффициент корреляции и с доверительной вероятности p = 0,9 проверить его значимость.&lt;img 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&gt;; Эконометрика в.1 Имеются данные о доли расходов на товары длительного пользования уi от среднемесячного дохода семьи xi. Предполагается, что эта зависимость носит характер y = a / x + b . Эконометрика Вариант 1 Задача 1 ИЭиУЭконометрика Задание 32 Имеются данные о Численности безработных по методологии МОТ (тысяча человек) – x и Числе преступлений, совершенных в сфере экономики (единица) – yЭконометрика. Задача 13 из практикума Елисеевой И.И. (2003 г.) раздел 1 Парная регрессия и корреляцияЭконометрика Задача 1 Вариант 1.4 (решение в Excel)Эконометрика задача 1 Вариант 4Эконометрика задача 1 Вариант 7Шестидесятилетний Савельев работал в ОАО «Строймаш» инструктором по технике безопасности и уволился по собственному желанию в связи с уходом на пенсиюштатное расписание ООО «Диод»Шум на улице достигает уровня 80 дБ. Такой шум приводит к ухудшению физиологического состояния коров и, в частности, к падению их молочной продуктивности. ЭДС элемента (-) Pt,H2|HCl || HCl |H2,Pt(+)при 298 К равна 0,020 В. Принимая средний коэффициент активности HCl в 0,01 М растворе равным 0,92, определите средний коэффициент активности HCl в 0,1 М растворе. Найти pH для каждого раствора. Учесть дифЭкологическое право (задача)Экология ВСЕ ЗАДАНИЯ Экология задача