Digital Matematika - 5 класс - Деление в столбик на двузначные числа

Теория: Деление в столбик на двузначные числа

Задание

Выполните деление чисел в столбик:

Решение

Сначала составим таблицу умножения на \(\displaystyle 31\) для чисел от \(\displaystyle 1 \) до \(\displaystyle 9{\small : } \)

Таблица умножения на \(\displaystyle 31\)

Теперь начнем сам процесс деления \(\displaystyle 2015\) на \(\displaystyle 31{\small . } \)

Заметим, что в числе \(\displaystyle 2015 \) первая цифра \(\displaystyle 2\) меньше \(\displaystyle 31{\small . }\)

Далее, следующие две цифры дают число \(\displaystyle 20{\small , } \) которое также меньше \(\displaystyle 31{\small . } \)

Значит, берем сразу три первых цифры вместе, то есть число \(\displaystyle 201{\small . }\)

Шаг 1.

Делим \(\displaystyle \color{orange}{201}\) на \(\displaystyle 31\) с остатком

1. Делим \(\displaystyle 201\) на \(\displaystyle 31\) с остатком.

Найдем, какое максимальное количество \(\displaystyle \color{blue}{31}\) можно забрать из \(\displaystyle 201{\small .}\)

То есть найдем неполное частное при делении \(\displaystyle 201\) на \(\displaystyle \color{blue}{31}\) с остатком.

Так как

\(\displaystyle 201=\color{green}{6} \cdot \color{blue}{31}+15{\small ,}\)

то \(\displaystyle 31 \) можно забрать \(\displaystyle \color{green}{6}\) раз.

Поэтому пишем \(\displaystyle \color{green}{6}\) в частное:

\(\displaystyle -\)	\(\displaystyle \small 2\)	\(\displaystyle \small 0\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small 31\)
\(\displaystyle -\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)		\(\displaystyle \small \color{green}{6}\)	\(\displaystyle \small ?\)
	\(\displaystyle -\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)
	\(\displaystyle -\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)
				\(\displaystyle \small 0\)

2. Далее, вычитаем в столбик из \(\displaystyle 201\) произведение \(\displaystyle \color{blue}{31}\cdot \color{green}{6}=\color{green}{186}{\small : }\)

\(\displaystyle -\)	\(\displaystyle \small \color{orange}{2}\)	\(\displaystyle \small \color{orange}{0}\)	\(\displaystyle \small \color{orange}{1}\)	\(\displaystyle \small 5\)	\(\displaystyle \small 31\)
\(\displaystyle -\)	\(\displaystyle \small \color{green}{ 1}\)	\(\displaystyle \small \color{green}{ 8}\)	\(\displaystyle \small \color{green}{ 6}\)		\(\displaystyle \small \color{green}{ 6}\)	\(\displaystyle \small ?\)
	\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small ?\)
	\(\displaystyle -\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)
				\(\displaystyle \small 0\)

3. Сносим цифру из разряда единиц \(\displaystyle 201{\underline 5}{\small : }\)

\(\displaystyle -\)	\(\displaystyle \small 2\)	\(\displaystyle \small 0\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small 31\)
\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 8\)	\(\displaystyle \small 6\)		\(\displaystyle \small 6\)	\(\displaystyle \small ?\)
	\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small \bf 5\)
	\(\displaystyle -\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)
				\(\displaystyle \small 0\)

Получили число \(\displaystyle 155{\small .}\)

Шаг 2.

Делим \(\displaystyle \color{cyan}{155}\) на \(\displaystyle 31\) с остатком

1. Делим \(\displaystyle 155\) на \(\displaystyle 31{\small .}\)

Найдем, какое максимальное количество \(\displaystyle \color{blue}{31}\) можно забрать из \(\displaystyle 155{\small .}\)

То есть найдем частное при делении \(\displaystyle 155\) на \(\displaystyle \color{blue}{31}{\small .}\)

Так как

\(\displaystyle 155=\color{green}{5} \cdot \color{blue}{31}{\small ,}\)

то \(\displaystyle 31 \) можно забрать \(\displaystyle \color{green}{5}\) раз.

Поэтому пишем \(\displaystyle \color{green}{5}\) следующей цифрой в частное:

\(\displaystyle -\)	\(\displaystyle \small 2\)	\(\displaystyle \small 0\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small 31\)
\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 8\)	\(\displaystyle \small 6\)		\(\displaystyle \small 6\)	\(\displaystyle \small \color{green}{ 5}\)
	\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small 5\)
	\(\displaystyle -\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)	\(\displaystyle \small ?\)
				\(\displaystyle \small 0\)

2. Далее, вычитаем в столбик из \(\displaystyle 155\) произведение \(\displaystyle \color{blue}{31}\cdot \color{green}{5}=\color{green}{155}{\small : }\)

\(\displaystyle -\)	\(\displaystyle \small 2\)	\(\displaystyle \small 0\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small 31\)
\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 8\)	\(\displaystyle \small 6\)		\(\displaystyle \small 6\)	\(\displaystyle \small \color{green}{ 5}\)
	\(\displaystyle -\)	\(\displaystyle \small \color{cyan}{1}\)	\(\displaystyle \small \color{cyan}{5}\)	\(\displaystyle \small \color{cyan}{5}\)
	\(\displaystyle -\)	\(\displaystyle \small \color{green}{ 1}\)	\(\displaystyle \small \color{green}{ 5}\)	\(\displaystyle \small \color{green}{ 5}\)
				\(\displaystyle \small 0\)

Получили \(\displaystyle 0{\small , }\) процес деления закончен.

Таким образом,

\(\displaystyle -\)	\(\displaystyle \small \color{orange}{2}\)	\(\displaystyle \small \color{orange}{0}\)	\(\displaystyle \small \color{orange}{1}\)	\(\displaystyle \small 5\)	\(\displaystyle \small 31\)
\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 8\)	\(\displaystyle \small 6\)		\(\displaystyle \small 6\)	\(\displaystyle \small 5\)
	\(\displaystyle -\)	\(\displaystyle \small \color{cyan}{1}\)	\(\displaystyle \small \color{cyan}{5}\)	\(\displaystyle \small \color{cyan}{5}\)
	\(\displaystyle -\)	\(\displaystyle \small 1\)	\(\displaystyle \small 5\)	\(\displaystyle \small 5\)
				\(\displaystyle \small 0\)

	\(\displaystyle 1\)	\(\displaystyle 2\)	\(\displaystyle 3\)	\(\displaystyle 4\)	\(\displaystyle 5\)	\(\displaystyle 6\)	\(\displaystyle 7\)	\(\displaystyle 8\)	\(\displaystyle 9\)
\(\displaystyle \color{blue}{31}\)	\(\displaystyle 31\)	\(\displaystyle 62\)	\(\displaystyle 93\)	\(\displaystyle 124\)	\(\displaystyle 155\)	\(\displaystyle 186\)	\(\displaystyle 217\)	\(\displaystyle 248\)	\(\displaystyle 279\)

\(\displaystyle -\)

\(\displaystyle 2\)

\(\displaystyle 0\)

\(\displaystyle 1\)

\(\displaystyle 5\)

\(\displaystyle 31\)

\(\displaystyle -\)

\(\displaystyle -\)

\(\displaystyle -\)

\(\displaystyle 0\)