Multiply and Divide Whole Numbers
Selected Reading
- Quotient and Remainder (Word problems)
- Quotient and Remainder: Problem type 2
- Quotient and Remainder: Problem type 1
- Division With Trailing Zeros: Problem Type 2
- Division With Trailing Zeros: Problem Type 1
- Whole Number Division: 3-digit by 2-digit, No Remainder
- Whole Number Division: 2-digit by 2-digit, No Remainder
- Division Involving Zero
- Division With Carry
- Division Without Carry
- Unit Rates and Ratios of Whole Numbers (Word problems)
- Multiplication and Addition or Subtraction of Whole numbers (Word problems)
- Multiplication or Division of Whole Numbers (Word problems)
- Fact Families for Multiplication and Division
- Division Facts
- Multiples Problem Type 2
- Multiples Problem Type 1
- Multiplication of Large Numbers
- Multiplication of a Single Digit Number With Large Numbers
- Multiplication of 2-digit Numbers With 2-digit Numbers
- Multiplication With Trailing Zeros: Problem Type 2
- Multiplication With Trailing Zeros: Problem Type 1
- Multiplication With Carry
- Multiplication Without Carry
- Multiplication by 10, 100, and 1000
- Single Digit Multiplication
- Multiplication as Repeated Addition
- Home
Selected Reading
- Who is Who
- Computer Glossary
- HR Interview Questions
- Effective Resume Writing
- Questions and Answers
- UPSC IAS Exams Notes
Quotient and Remainder (Word problems)
Quotient and Remainder
Loretta has 16 candies. She wants to give same number of candies to each of her five friends. How many candies can she give to each of her friends? How many candies will Loretta have remaining?
Solution
Step 1:
The problem can be written as a spanision statement 16 ÷ 5. The largest multiple of 5 that is less than 16 is 5 × 3 = 15.
So 3 is the quotient and 16 – 15 = 1 is the remainder.
Step 2:
So 16 ÷ 5 = 3 R 1.
So Loretta can give 3 candies each to her five friends and have 1 candy left over with her.
Phil has 31 playing cards. He wants to deal same number of cards to each of four players. How many cards can he deal to each of the four players? How many cards will be remaining with Phil?
Solution
Step 1:
The problem can be written as a spanision statement 31 ÷ 4. The largest multiple of 4 that is less than 31 is 4 × 7 = 28.
So 7 is the quotient and 31 – 28 = 3 is the remainder.
Step 2:
So 31 ÷ 4 = 7 R 3.
So Phil can deal 7 cards each to the four players and have 3 cards left over with him.