Мультипериодический закон эволюции - В. Н. Сафронов

Скачать книгу

отражает относительную частоту периода всего ряда данных.

      Второй столбик отражает частоту периода, выраженного в миллиметрах диаметра или в сантиметрах окружности дерева, на основании первого столбика. Третий столбец отражает примерный календарный период, рассчитанный на основании второго столбика и таблиц хода роста по конкретной древесной породе [17]. Достоверные значения выявленных гармоник цикличности обозначены серым.

      Конец ознакомительного фрагмента.

      Текст предоставлен ООО «ЛитРес».

      Прочитайте эту книгу целиком, купив полную легальную версию на ЛитРес.

      Безопасно оплатить книгу можно банковской картой Visa, MasterCard, Maestro, со счета мобильного телефона, с платежного терминала, в салоне МТС или Связной, через PayPal, WebMoney, Яндекс.Деньги, QIWI Кошелек, бонусными картами или другим удобным Вам способом.

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

Скачать книгу