Introduction to integer divisors:
The Division method can be done using the symbol ÷ Division. Otherwise, it can say that the reverse of multiplication. One of the basic operations in math is a division operation. The Division, a ÷ b = c, that the "mission" they say that dividend and "b" are saying that the divisor and c say privately. The letter "c" indicates a separation from b. c result Here answer ' say privately. Let's see, the divisors of an integer in this article.
Integer divisors of the number eighty
The rooms that can be divided into eighty-eighty-dividers is considered.
Let us suppose that eighty can be divided into 2, 4, 5, 8 and 10.
Example 1:
Integer divide 80 ÷ 2
Solution:
Let us write the given number eighty in the Division bracket. The divisor can put it in the left side of the Division I bracket.
2) 80 ()
Number 2 should go in 8 in 4 times. Thus put 4 on the right side of the bracket.
(2) 80 40
8
---------------
0000
0000
-------------------
Zero can be posted only about 4 in a private place.
The decision to divide eighty on 2-40.
Example 2:
Integer divide 80 ÷ 4
Solution:
Let us write the given number eighty in the Division bracket. The divisor can put it in the left side of the Division I bracket.
4) 80 ()
Number 4 should go in 8 for 2 times. So put 2 on the right side of the bracket.
(4) 80 20
8
---------------
0000
0000
-------------------
Zero can be posted only about 2 in a private place.
The decision to divide eighty, 4-20.
More problems in practice for finding dividers for eighty
Example 3:
Integer divide 80 ÷ 5
Solution:
Let us write the given number eighty in the Division bracket. The divisor can put it in the left side of the Division I bracket.
5) 80 ()
The number 5 to 8 should go to 1 again. So put on the right side of the Division 1 bracket.
80 (5) 1
5
---------------
30
-------------------
Then the number 5 must go in 30 6 times. So put simply 6 1 next to a private place.
(5) 80 16
5
---------------
30
30
----------------
0
----------------
The decision to divide the 80 5-16.
Example 4:
Integer divide 80 ÷ 8
Solution:
Let us write the given number eighty in the Division bracket. The divisor can put it in the left side of the Division I bracket.
10) 80 ()
Number 8 should go to 8 to 1 times. Therefore put on the right side of the Division 1 bracket.
(8) 80 10
8
---------------
0000
----------------
Zero can only be placed near 1 private place.
The decision to divide eighty on 8-10.
Example 5:
Split 80 ÷ 10
Solution:
Let us write the given number eighty in the Division bracket. The divisor can put it in the left side of the Division I bracket.
10) 80 ()
Number 10 should go in 8 0 times. So accept the figure as two digits in the specified number of Division bracket.
Then number 10 should go in eighty for 8 times. Therefore, put 8 on the right side of the Division I bracket.
80 (10) 8.
80
---------------
0
-------------------
The decision to divide eighty on 10-8.
Therefore, the dividers for whole number eighty, 2 are 4, 5, 8 and 10.
No comments:
Post a Comment