Divide Into Two Parts

      In mathematics, especially in elementary arithmetic, division (÷) is the arithmetic operation that is the inverse of multiplication.

Specifically, if c times b equals a, written:

       c x b = a

where b is not zero, then a divided by b equals c, written:

a/b =c

For instance,

6/3 = 2

since

      2 x 3=6

In the above expression, a is called the dividend, b the divisor and c the quotient.

 

The divide into two parts basic concept and its example problems are given as follow:

 

Concept of divide into two parts:

 

The important concept of divide into two parts is given as follow:

The size of each group formed, quotient of a,b and c. Quantitative division consist a group of size a and creating groups of size b. The number of terms size that can be created in c, is the quotient of a and b.

Divide into two parts algorithm

        The division of two parts algorithm is the theorem that accurately expresses the output of the division process of integers. The theorem has quotient and integers q,remainder r that are exist and it has the unique a and divisor d, with d ≠ 0.

        The divide two parts algorithm as follows: There exist exclusive integer’s q and r such that a = q d + r and 0 ≤ r < | d |, where | d | denotes the absolute value of d.

 

Examples problems for divide into two parts:

 

The example problems of divide into two parts are given as follow:

1. Solve the following division

42 ÷ 7

Solution:

42 ÷ 7

= (7 * 6) ÷ 7

Answer is:  7

2. Solve the following division,

     54 ÷ 6

Solution:

      54 ÷ 6

          = (9 * 6) ÷ 6

          Answer is: 9

 

3. Solve the following division,

        25 ÷ 5

Solution:

25 ÷ 5

= (5 * 5) ÷ 5

Answer is : 5

Practice problem for division math facts: 

1.      - 50 ÷ 5 = -10

2.      56 ÷ 8 = 7

3.      49 ÷ 7= 7

4.      21 ÷ 3 = 7