Math Division Workbook : Double Digit Division: Grade Levels 3rd - 7th, 2 Digit Division Worksheets, Problems with Solutions, 8.5 X 11 Inches - Free Printable
Educational worksheet: Math Division Workbook : Double Digit Division: Grade Levels 3rd - 7th, 2 Digit Division Worksheets, Problems with Solutions, 8.5 X 11 Inches. Download and print for classroom or home learning activities.
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Step-by-step solution for: Math Division Workbook : Double Digit Division: Grade Levels 3rd - 7th, 2 Digit Division Worksheets, Problems with Solutions, 8.5 X 11 Inches
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Show Answer Key & Explanations
Step-by-step solution for: Math Division Workbook : Double Digit Division: Grade Levels 3rd - 7th, 2 Digit Division Worksheets, Problems with Solutions, 8.5 X 11 Inches
The image shows a set of double-digit division problems. Below, I will solve each problem step by step and provide the solutions.
---
1. Set up the division:
\[
98 \div 90
\]
2. Determine how many times 90 goes into 98:
- 90 goes into 98 exactly once because \( 90 \times 1 = 90 \).
3. Subtract to find the remainder:
\[
98 - 90 = 8
\]
4. Write the quotient and remainder:
\[
98 \div 90 = 1 \text{ R } 8
\]
Solution for 1282:
\[
\boxed{1 \text{ R } 8}
\]
---
1. Set up the division:
\[
71 \div 21
\]
2. Determine how many times 21 goes into 71:
- 21 goes into 71 three times because \( 21 \times 3 = 63 \).
3. Subtract to find the remainder:
\[
71 - 63 = 8
\]
4. Write the quotient and remainder:
\[
71 \div 21 = 3 \text{ R } 8
\]
Solution for 1283:
\[
\boxed{3 \text{ R } 8}
\]
---
1. Set up the division:
\[
74 \div 72
\]
2. Determine how many times 72 goes into 74:
- 72 goes into 74 once because \( 72 \times 1 = 72 \).
3. Subtract to find the remainder:
\[
74 - 72 = 2
\]
4. Write the quotient and remainder:
\[
74 \div 72 = 1 \text{ R } 2
\]
Solution for 1284:
\[
\boxed{1 \text{ R } 2}
\]
---
1. Set up the division:
\[
87 \div 25
\]
2. Determine how many times 25 goes into 87:
- 25 goes into 87 three times because \( 25 \times 3 = 75 \).
3. Subtract to find the remainder:
\[
87 - 75 = 12
\]
4. Write the quotient and remainder:
\[
87 \div 25 = 3 \text{ R } 12
\]
Solution for 1285:
\[
\boxed{3 \text{ R } 12}
\]
---
1. Set up the division:
\[
96 \div 16
\]
2. Determine how many times 16 goes into 96:
- 16 goes into 96 six times because \( 16 \times 6 = 96 \).
3. Subtract to find the remainder:
\[
96 - 96 = 0
\]
4. Write the quotient and remainder:
\[
96 \div 16 = 6 \text{ R } 0
\]
Solution for 1286:
\[
\boxed{6 \text{ R } 0}
\]
---
1. Set up the division:
\[
51 \div 37
\]
2. Determine how many times 37 goes into 51:
- 37 goes into 51 once because \( 37 \times 1 = 37 \).
3. Subtract to find the remainder:
\[
51 - 37 = 14
\]
4. Write the quotient and remainder:
\[
51 \div 37 = 1 \text{ R } 14
\]
Solution for 1287:
\[
\boxed{1 \text{ R } 14}
\]
---
1. Set up the division:
\[
59 \div 55
\]
2. Determine how many times 55 goes into 59:
- 55 goes into 59 once because \( 55 \times 1 = 55 \).
3. Subtract to find the remainder:
\[
59 - 55 = 4
\]
4. Write the quotient and remainder:
\[
59 \div 55 = 1 \text{ R } 4
\]
Solution for 1288:
\[
\boxed{1 \text{ R } 4}
\]
---
1. Set up the division:
\[
57 \div 12
\]
2. Determine how many times 12 goes into 57:
- 12 goes into 57 four times because \( 12 \times 4 = 48 \).
3. Subtract to find the remainder:
\[
57 - 48 = 9
\]
4. Write the quotient and remainder:
\[
57 \div 12 = 4 \text{ R } 9
\]
Solution for 1289:
\[
\boxed{4 \text{ R } 9}
\]
---
1. Set up the division:
\[
82 \div 74
\]
2. Determine how many times 74 goes into 82:
- 74 goes into 82 once because \( 74 \times 1 = 74 \).
3. Subtract to find the remainder:
\[
82 - 74 = 8
\]
4. Write the quotient and remainder:
\[
82 \div 74 = 1 \text{ R } 8
\]
Solution for 1290:
\[
\boxed{1 \text{ R } 8}
\]
---
1. 1282: \( \boxed{1 \text{ R } 8} \)
2. 1283: \( \boxed{3 \text{ R } 8} \)
3. 1284: \( \boxed{1 \text{ R } 2} \)
4. 1285: \( \boxed{3 \text{ R } 12} \)
5. 1286: \( \boxed{6 \text{ R } 0} \)
6. 1287: \( \boxed{1 \text{ R } 14} \)
7. 1288: \( \boxed{1 \text{ R } 4} \)
8. 1289: \( \boxed{4 \text{ R } 9} \)
9. 1290: \( \boxed{1 \text{ R } 8} \)
---
These are the solutions to all the problems in the image. If you have any further questions, feel free to ask!
---
Problem 1282: \( 98 \div 90 \)
1. Set up the division:
\[
98 \div 90
\]
2. Determine how many times 90 goes into 98:
- 90 goes into 98 exactly once because \( 90 \times 1 = 90 \).
3. Subtract to find the remainder:
\[
98 - 90 = 8
\]
4. Write the quotient and remainder:
\[
98 \div 90 = 1 \text{ R } 8
\]
Solution for 1282:
\[
\boxed{1 \text{ R } 8}
\]
---
Problem 1283: \( 71 \div 21 \)
1. Set up the division:
\[
71 \div 21
\]
2. Determine how many times 21 goes into 71:
- 21 goes into 71 three times because \( 21 \times 3 = 63 \).
3. Subtract to find the remainder:
\[
71 - 63 = 8
\]
4. Write the quotient and remainder:
\[
71 \div 21 = 3 \text{ R } 8
\]
Solution for 1283:
\[
\boxed{3 \text{ R } 8}
\]
---
Problem 1284: \( 74 \div 72 \)
1. Set up the division:
\[
74 \div 72
\]
2. Determine how many times 72 goes into 74:
- 72 goes into 74 once because \( 72 \times 1 = 72 \).
3. Subtract to find the remainder:
\[
74 - 72 = 2
\]
4. Write the quotient and remainder:
\[
74 \div 72 = 1 \text{ R } 2
\]
Solution for 1284:
\[
\boxed{1 \text{ R } 2}
\]
---
Problem 1285: \( 87 \div 25 \)
1. Set up the division:
\[
87 \div 25
\]
2. Determine how many times 25 goes into 87:
- 25 goes into 87 three times because \( 25 \times 3 = 75 \).
3. Subtract to find the remainder:
\[
87 - 75 = 12
\]
4. Write the quotient and remainder:
\[
87 \div 25 = 3 \text{ R } 12
\]
Solution for 1285:
\[
\boxed{3 \text{ R } 12}
\]
---
Problem 1286: \( 96 \div 16 \)
1. Set up the division:
\[
96 \div 16
\]
2. Determine how many times 16 goes into 96:
- 16 goes into 96 six times because \( 16 \times 6 = 96 \).
3. Subtract to find the remainder:
\[
96 - 96 = 0
\]
4. Write the quotient and remainder:
\[
96 \div 16 = 6 \text{ R } 0
\]
Solution for 1286:
\[
\boxed{6 \text{ R } 0}
\]
---
Problem 1287: \( 51 \div 37 \)
1. Set up the division:
\[
51 \div 37
\]
2. Determine how many times 37 goes into 51:
- 37 goes into 51 once because \( 37 \times 1 = 37 \).
3. Subtract to find the remainder:
\[
51 - 37 = 14
\]
4. Write the quotient and remainder:
\[
51 \div 37 = 1 \text{ R } 14
\]
Solution for 1287:
\[
\boxed{1 \text{ R } 14}
\]
---
Problem 1288: \( 59 \div 55 \)
1. Set up the division:
\[
59 \div 55
\]
2. Determine how many times 55 goes into 59:
- 55 goes into 59 once because \( 55 \times 1 = 55 \).
3. Subtract to find the remainder:
\[
59 - 55 = 4
\]
4. Write the quotient and remainder:
\[
59 \div 55 = 1 \text{ R } 4
\]
Solution for 1288:
\[
\boxed{1 \text{ R } 4}
\]
---
Problem 1289: \( 57 \div 12 \)
1. Set up the division:
\[
57 \div 12
\]
2. Determine how many times 12 goes into 57:
- 12 goes into 57 four times because \( 12 \times 4 = 48 \).
3. Subtract to find the remainder:
\[
57 - 48 = 9
\]
4. Write the quotient and remainder:
\[
57 \div 12 = 4 \text{ R } 9
\]
Solution for 1289:
\[
\boxed{4 \text{ R } 9}
\]
---
Problem 1290: \( 82 \div 74 \)
1. Set up the division:
\[
82 \div 74
\]
2. Determine how many times 74 goes into 82:
- 74 goes into 82 once because \( 74 \times 1 = 74 \).
3. Subtract to find the remainder:
\[
82 - 74 = 8
\]
4. Write the quotient and remainder:
\[
82 \div 74 = 1 \text{ R } 8
\]
Solution for 1290:
\[
\boxed{1 \text{ R } 8}
\]
---
Final Answers
1. 1282: \( \boxed{1 \text{ R } 8} \)
2. 1283: \( \boxed{3 \text{ R } 8} \)
3. 1284: \( \boxed{1 \text{ R } 2} \)
4. 1285: \( \boxed{3 \text{ R } 12} \)
5. 1286: \( \boxed{6 \text{ R } 0} \)
6. 1287: \( \boxed{1 \text{ R } 14} \)
7. 1288: \( \boxed{1 \text{ R } 4} \)
8. 1289: \( \boxed{4 \text{ R } 9} \)
9. 1290: \( \boxed{1 \text{ R } 8} \)
---
These are the solutions to all the problems in the image. If you have any further questions, feel free to ask!
Parent Tip: Review the logic above to help your child master the concept of math division books.