Answer :
We are given the dividend
[tex]$$891$$[/tex]
and the divisor
[tex]$$62.$$[/tex]
Let's perform the long division step by step.
1. First, look at the first two digits of the dividend, which form the number 89. Since
[tex]$$62 \times 1 = 62,$$[/tex]
and
[tex]$$62 \times 2 = 124$$[/tex]
is too large, we see that 62 goes into 89 only 1 time.
2. Multiply the divisor by 1:
[tex]$$1 \times 62 = 62.$$[/tex]
Then subtract:
[tex]$$89 - 62 = 27.$$[/tex]
3. Next, bring down the next digit of the dividend (which is 1) to join the remainder 27. This gives us 271.
4. Now, determine how many times 62 fits into 271. Trying the multiplication:
[tex]$$62 \times 4 = 248,$$[/tex]
while
[tex]$$62 \times 5 = 310$$[/tex]
is too large. Therefore, 62 goes into 271 exactly 4 times.
5. Multiply the divisor by 4:
[tex]$$4 \times 62 = 248.$$[/tex]
Then subtract:
[tex]$$271 - 248 = 23.$$[/tex]
Since there are no more digits to bring down, the division is complete.
The quotient is calculated by combining the partial quotients from each step:
[tex]$$\text{Quotient} = 14,$$[/tex]
and the final remainder is
[tex]$$23.$$[/tex]
Thus, the final answer to the sub-strand division is:
[tex]$$\text{Quotient} = 14 \quad \text{and} \quad \text{Remainder} = 23.$$[/tex]
[tex]$$891$$[/tex]
and the divisor
[tex]$$62.$$[/tex]
Let's perform the long division step by step.
1. First, look at the first two digits of the dividend, which form the number 89. Since
[tex]$$62 \times 1 = 62,$$[/tex]
and
[tex]$$62 \times 2 = 124$$[/tex]
is too large, we see that 62 goes into 89 only 1 time.
2. Multiply the divisor by 1:
[tex]$$1 \times 62 = 62.$$[/tex]
Then subtract:
[tex]$$89 - 62 = 27.$$[/tex]
3. Next, bring down the next digit of the dividend (which is 1) to join the remainder 27. This gives us 271.
4. Now, determine how many times 62 fits into 271. Trying the multiplication:
[tex]$$62 \times 4 = 248,$$[/tex]
while
[tex]$$62 \times 5 = 310$$[/tex]
is too large. Therefore, 62 goes into 271 exactly 4 times.
5. Multiply the divisor by 4:
[tex]$$4 \times 62 = 248.$$[/tex]
Then subtract:
[tex]$$271 - 248 = 23.$$[/tex]
Since there are no more digits to bring down, the division is complete.
The quotient is calculated by combining the partial quotients from each step:
[tex]$$\text{Quotient} = 14,$$[/tex]
and the final remainder is
[tex]$$23.$$[/tex]
Thus, the final answer to the sub-strand division is:
[tex]$$\text{Quotient} = 14 \quad \text{and} \quad \text{Remainder} = 23.$$[/tex]
