Answer :
Sure! Let's go through the first step in solving the division problem [tex]\(8 \div 6288\)[/tex].
1. Look at the First Two Digits: In long division, we start by looking at the numbers from the left. So we take the first two digits of 6288, which are 62.
2. Determine How Many Times 8 Fits into 62: We need to see how many times 8 can go into 62 without exceeding it.
3. Calculate the Result: When we divide 62 by 8, we find that 8 fits into 62 exactly 7 times. This is because [tex]\(8 \times 7 = 56\)[/tex], which is the largest product of 8 that is less than 62.
So, the first step is to divide 62 by 8, which gives us 7. This is the result for the initial part of this division process.
1. Look at the First Two Digits: In long division, we start by looking at the numbers from the left. So we take the first two digits of 6288, which are 62.
2. Determine How Many Times 8 Fits into 62: We need to see how many times 8 can go into 62 without exceeding it.
3. Calculate the Result: When we divide 62 by 8, we find that 8 fits into 62 exactly 7 times. This is because [tex]\(8 \times 7 = 56\)[/tex], which is the largest product of 8 that is less than 62.
So, the first step is to divide 62 by 8, which gives us 7. This is the result for the initial part of this division process.
