Math

posted by .

Predict the number of digits in the quotient for 9,010 divided by 8

  • Math -

    What do you think?

  • Math -

    round 8 to 9 and 9010 round to 9000 so 9000%9 =1000 so 4 digit

Respond to this Question

First Name
School Subject
Your Answer

Similar Questions

  1. math , algebra

    Can someone correct these (1) -5^2-3 25-3 22 (2) The sum of m and n, divided by the difference of m and n. My answer: (m+n)/ (m-n) (3) The quotient when 3 more than a number is divided by 3 less than that same number My answer: (x+3)/(x-3) …
  2. math

    talk math explain how you can tell without dividing a 3-digit number divided by a 1-digit will have a quotient of 2 or 3 digits.
  3. Math

    The difference between my digits is 7. When you divide me by the sum of my digits, the quotient is the sum of my digits. That makes me a perfect you know what! Which number am I?
  4. Math

    If a number of 2 digits is divided by the sum of its digits, the quotient is 2 and the remainder is 2. If it's multiplied by the sum of its digits, the result is 112. Find the number.
  5. Math

    What are the steps to show the quotient in simplest form?
  6. Estimation decimal quotient

    Use compatible numbers to find the each quotient ,2.90 divided by 29,48 divided by 3.2, 0.18 divided by 0.33,152 divided by 5.12,41.9 divided by 19,33.90 divided by 10.2, 502 divided by 9.5, 180.8 divided by 6 , 48 divided by 3.33, …
  7. Estimating decimal quotient

    Use compatible to find the following quotient 180.8 divided by 6 182divided by 11 55divided by 10.7 117.8divided by 0.12 0.6 divided by 5 145 divided by 0.3 60 divided by 5.9 1.8 divided by 20
  8. math

    find two numbers the quotient is between. Then estimate the quotient. 2. 41 divided by 3 3. 192 divided by 5.
  9. algebra

    a number of two digits divided by the sum of the digits the quotient is 7 and the remainder is 6 . if the digits of the number are interchanged, the resulting number exceeds three times the sum of the digits by 5.
  10. 9th grade alegbra - geometric sequence

    Can you explain how to find explicit and recursive formula of geometric sequence given 2 terms?

More Similar Questions