• Texas Go Math
  • Big Ideas Math
  • Engageny Math
  • McGraw Hill My Math
  • enVision Math
  • 180 Days of Math
  • Math in Focus Answer Key
  • Math Expressions Answer Key
  • Privacy Policy

CCSS Math Answers

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key

Engage ny eureka math 4th grade module 2 lesson 5 answer key, eureka math grade 4 module 2 lesson 5 sprint answer key.

Eureka Math Grade 4 Module 2 Lesson 5 Sprint Answer Key 1

Question 1. 2,000 g = 2 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  2,000 g = 2 X 1000 g ÷ 1000 = 2 kg 0 g.

Question 2. 3,000 g = 3 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,000 g = 3 X 1000 g ÷ 1000 = 3 kg 0 g.

Question 3. 4,000 g = 4 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,000 g = 4 X 1000 g ÷ 1000 = 4 kg 0 g.

Question 4. 9,000 g = 9 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  9,000 g = 9 X 1000 g ÷ 1000 = 9 kg 0 g.

Question 5. 6,000 g = 6 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,000 g = 6 X 1000 g ÷ 1000 = 6 kg 0 g.

Question 6. 1,000 g = 1 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  1,000 g = 1 X 1000 g ÷ 1000 = 1 kg 0 g.

Question 7. 8,000 g = 8 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  8,000 g = 8 X 1000 g ÷ 1000 = 8 kg 0 g.

Question 8. 5,000 g = 5 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,000 g = 5 X 1000 g ÷ 1000 = 5 kg 0 g.

Question 9. 7,000 g = 7 kg 0 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,000 g = 7 X 1000 g ÷ 1000 = 7 kg 0 g.

Question 10. 6,100 g = 6 kg 100 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,100 g = 6,100 g ÷ 1000 = 6 kg 100 g.

Question 11. 6,110 g = 6 kg 110 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,110 g = 6 ,110 g ÷ 1000 = 6 kg 110 g.

Question 12. 6,101 g = 6 kg 101 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,101 g = 6,101 g ÷ 1000 = 6 kg 101 g.

Question 13. 6,010 g = 6 kg 10 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,010 g = 6,010 g ÷ 1000 = 6 kg 10 g.

Question 14. 6,011 g = 6 kg 11 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,011 g = 6,011 g ÷ 1000 = 6 kg 11 g.

Question 15. 6,001 g = 6 kg 1 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,001 g = 6,001 g ÷ 1000 = 6 kg 1 g.

Question 16. 8,002 g = 8 kg 2 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  8,002 g = 8,002 g ÷ 1000 = 8 kg 2 g.

Question 17. 8,020 g = 8 kg 20 g,

Question 18. 8,200 g = 8 kg 200 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  8,200 g = 8,200 g ÷ 1000 = 8 kg 200 g.

Question 19. 8,022 g = 8 kg 22 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  8,022 g = 8,022 g ÷ 1000 = 8 kg 22 g.

Question 20. 8,220 g = 8 kg  220 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  8,220 g = 8,220 g ÷ 1000 = 8 kg 220 g.

Question 21. 8,222 g = 8 kg 222 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  8,222 g = 8,222 g ÷ 1000 = 8 kg 222 g.

Question 22. 7,256 g = 7 kg 256 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,256 g = 7,256 g ÷ 1000 = 7 kg 256 g.

Question 23. 3,800 g = 3 kg 800 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,800 g = 3,800 g ÷ 1000 = 3 kg 800 g.

Question 24. 4,770 g = 4 kg 770 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,770 g = 4,770 g ÷ 1000 = 4 kg 770 g.

Question 25. 4,807 g = 4 kg 807 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,807 g = 4,807 g ÷ 1000 = 4 kg 807 g.

Question 26. 5,065 g = 5 kg 065 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,065 g = 5,065 g ÷ 1000 = 5 kg 065 g.

Question 27. 5,040 g = 5 kg 40 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,040 g = 5,040 g ÷ 1000 = 5 kg 40 g.

Question 28. 6,007 g = 6 kg 7 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  6,007 g = 6,007 g ÷ 1000 = 6 kg 7 g.

Question 29. 2,003 g = 2 kg 3 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  2,003 g = 2,003 g ÷ 1000 = 2 kg 3 g.

Question 30. 1,090 g = 1 kg 90 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  1,090 g = 1,090 g ÷ 1000 = 1 kg 90 g.

Question 31. 1,055 g = 1 kg 55 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  1,055 g = 1,055 g ÷ 1000 = 1 kg 55 g.

Question 32. 9,404 g = 9 kg 404 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  9,404 g = 9,404 g ÷ 1000 = 9 kg 404 g.

Question 33. 9,330 g = 9 kg 330 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 9,330 g = 9,330 g ÷ 1000 = 9 kg 330 g.

Question 34. 3,400 g = 3 kg 400 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,400 g = 3,400 g ÷ 1000 = 3 kg 400 g.

Question 35. 4,000 g + 2,000 g = 6 kg 0 g,

Explanation: Given 4,000 g + 2,000 g = 6,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 4,000 g + 2,000 g = 6,000 g = 6,000 g ÷ 1000 = 6 kg 0 g.

Question 36. 5,000 g + 3,000 g = 8 kg 0 g,

Explanation: Given 5,000 g + 3,000 g = 8,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 5,000 g + 3,000 g = 8,000 g = 8,000 g ÷ 1000 = 8 kg 0 g.

Question 37. 4,000 g + 4,000 g = 8 kg 0 g,

Explanation: Given 4,000 g + 4,000 g = 8,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,000 g + 4,000 g = 8,000 g = 8,000 g ÷ 1000 = 8 kg 0 g.

Question 38. 8 × 7,000 g = 56 kg 0 g,

Explanation: Given 8 X 7,000 g = 56,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 8 × 7,000 g = 56,000 g = 56,000 g ÷ 1000 = 56 kg 0 g.

Question 39. 49,000 g ÷ 7 = 7 kg 0 g,

Explanation: Given 49,000 g ÷ 7 = 7,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 49,000 g ÷ 7 = 7,000 g = 7,000 g ÷ 1000 = 7 kg 0 g.

Question 40. 16,000 g × 5 = 80 kg 0 g,

Explanation: Given 16,000 g X 5 = 80,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 16,000 g X 5 = 80,000 g = 80,000 g ÷ 1000 = 80 kg 0 g.

Question 41. 63,000 g ÷ 7 = 9 kg 0 g,

Explanation: Given 63,000 g ÷ 7 = 9,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 63,000 g ÷ 7 = 9,000 g = 9,000 g ÷ 1000 = 9 kg 0 g.

Question 42. 17 × 4,000 g = 68 kg 0 g,

Explanation: Given 17 X 4,000 g  = 68,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 17 X 4,000 g = 68,000 g = 68,000 g ÷ 1000 = 68 kg 0 g.

Question 43. 13,000 g × 5 = 65 kg 0 g,

Explanation: Given 13,000 g X 5 = 65,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 13,000 g X 5 = 65,000 g = 65,000 g ÷ 1000 = 65 kg 0 g.

Question 44. 84,000 g ÷ 7 = 12 kg 0 g,

Explanation: Given 84,000 g ÷ 7 = 12,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 84,000 g ÷ 7 = 12,000 g = 12,000 g ÷ 1000 = 12 kg 0 g.

Eureka Math Grade 4 Module 2 Lesson 5 Sprint Answer Key 3

Question 2. 2,000 g = 2 kg 0 g,

Question 3. 3,000 g = 3 kg 0 g,

Question 4. 8,000 g = 8 kg 0 g,

Question 6. 9,000 g = 9 kg 0 g,

Question 7. 4,000 g = 4 kg 0 g,

Question 8. 7,000 g = 7 kg 0 g,

Question 9. 5,000 g = 5 kg 0 g,

Question 10. 5,100 g = 5 kg 100 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,100 g = 5,100 g ÷ 1000 = 5 kg 100 g.

Question 11. 5,110 g = 5 kg 110 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,110 g = 5 ,110 g ÷ 1000 = 5 kg 110 g.

Question 12. 5,101 g = 5 kg 101 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,101 g = 5,101 g ÷ 1000 = 5 kg 101 g.

Question 13. 5,010 g = 5 kg 10 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,010 g = 5,010 g ÷ 1000 = 5 kg 10 g.

Question 14. 5,011 g = 5 kg 11 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,011 g = 5,011 g ÷ 1000 = 5 kg 11 g.

Question 15. 5,001 g = 5 kg 1 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,001 g = 5,001 g ÷ 1000 = 5 kg 1 g.

Question 16. 7,002 g = 7 kg 2 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,002 g = 7,002 g ÷ 1000 = 7 kg 2 g.

Question 17. 7,020 g = 7kg 20 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,020 g = 7,020 g ÷ 1000 = 7 kg 20 g.

Question 18. 7,200 g = 7 kg 200 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,200 g = 7,200 g ÷ 1000 = 7 kg 200 g.

Question 19. 7,022 g = 7 kg 22 g, 7,022 g = 7 kg 22 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,022 g = 7,022 g ÷ 1000 = 7 kg 22 g.

Question 20. 7,220 g = 7 kg 220 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,220 g = 7,220 g ÷ 1000 = 7 kg 220 g.

Question 21. 7,222 g = 7 kg 222 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  7,222 g = 7,222 g ÷ 1000 = 7 kg 222 g.

Question 22. 4,378 g = 4 kg 378 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,378 g = 4,378 g ÷ 1000 = 4 kg 378 g.

Question 23. 2,700 g = 2 kg 700 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  2,700 g = 2,700 g ÷ 1000 = 2 kg 700 g.

Question 24. 3,660 g = 3 kg 660 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,660 g = 3,660 g ÷ 1000 = 3 kg 660 g.

Question 25. 3,706 g = 3 kg 706 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,706 g = 3,706 g ÷ 1000 = 3 kg 706 g.

Question 26. 4,095 g = 4 kg 95 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,095 g = 4,095 g ÷ 1000 = 4 kg 95 g.

Question 27. 4,030 g = 4 kg 30 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,030 g = 4,030 g ÷ 1000 = 4 kg 30 g.

Question 28. 5,006 g = 5 kg 6 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  5,006 g = 5,006 g ÷ 1000 = 5 kg 6 g.

Question 29. 3,004 g = 3 kg 4 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,004 g = 3,004 g ÷ 1000 = 3 kg 4 g.

Question 30. 2,010 g = 2 kg 10 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  2,010 g = 2,010 g ÷ 1000 = 2 kg 10 g.

Question 31. 2,075 g = 2 kg 75 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  2,075 g = 2,075 g ÷ 1000 = 2 kg 75 g.

Question 32. 1,504 g = 1 kg 504 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  1,504 g = 1,504 g ÷ 1000 = 1 kg 504 g.

Question 33. 1,440 g = 1 kg 440 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  1,440 g = 1,440 g ÷ 1000 = 1 kg 440 g.

Question 34. 4,500 g = 4 kg 500 g,

Explanation: Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  4,500 g = 4,500 g ÷ 1000 = 4 kg 500 g.

Question 35. 3,000 g + 2,000 g = 5 kg 0 g,

Explanation: Given 3,000 g + 2,000 g = 5,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So  3,000 g + 2,000 g = 5,000 g 5,000 g ÷ 1000 = 5 kg 0 g.

Question 36. 4,000 g + 3,000 g = 7 kg 0 g,

Explanation: Given 4,000 g + 3,000 g = 7,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 4,000 g + 3,000 g = 7,000 g = 7,000 g ÷ 1000 = 7 kg 0 g.

Question 37. 5,000 g + 4,000 g = 9 kg 0 g,

Explanation: Given 5,000 g + 4,000 g = 9,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 5,000 g + 4,000 g = 9,000 g = 9,000 g ÷ 1000 = 9 kg 0 g.

Question 38. 9 × 8,000 g = 72 kg 0 g,

Explanation: Given 9 X 8,000 g = 72,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 9 × 8,000 g = 72,000 g = 72,000 g ÷ 1000 = 72 kg 0 g.

Question 39. 64,000 g ÷ 8 = 8 kg 0 g,

Explanation: Given 64,000 g ÷ 8 = 8,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 64,000 g ÷ 8 = 8,000 g = 8,000 g ÷ 1000 = 8 kg 0 g.

Question 40. 17,000 g × 5 = 85 kg 0 g,

Explanation: Given  17,000 g X 5  = 85,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 17,000 g X 5 = 85,000 g = 85,000 g ÷ 1000 = 85 kg 0 g.

Question 41. 54,000 g ÷ 6 = 9 kg 0 g,

Explanation: Given 54,000 g ÷ 6 = 9,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 54,000 g ÷ 6 = 9,000 g = 9,000 g ÷ 1000 = 9 kg 0 g.

Question 42. 18,000 g × 4 = 72 kg 0 g,

Explanation: Given  18,000 g X 4  = 72,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 18,000 g X 4 = 72,000 g = 72,000 g ÷ 1000 = 72 kg 0 g.

Question 43. 14 × 5,000 g = 70 kg 0 g,

Explanation: Given  14 X 5,000 g  = 70,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 14 X 5,000 g = 70,000 g = 70,000 g ÷ 1000 = 70 kg 0 g.

Question 44. 96,000 g ÷ 8 = 12 kg 0 g,

Explanation: Given 96,000 g ÷ 8 = 12,000 g Converted the conversion table as shown above as We know 1000 g or 10 3  = 1 kg, So 96,000 g ÷ 8 = 12,000 g = 12,000 g ÷ 1000 = 12 kg 0 g.

Eureka Math Grade 4 Module 2 Lesson 5 Problem Set Answer Key

Model each problem with a tape diagram. Solve and answer with a statement.

Eureka Math Grade 4 Module 2 Lesson 5 Problem Set Answer Key 10

Explanation: Given the potatoes Beth bought weighed 3 kilograms 420 grams. Her onions weighed 1,050 grams less than the potatoes. So onions wiegh is 3 kg 420 g – 1,050 g = 3 X 1000 g + 420 g = 3,420 g, now 3,420 g – 1,050 g = 2,370 g, So the potatoes and onions weigh together are 3,420 g + 2,370 g = 5,790 g or 5,790 ÷ 1,000 = 5 kg 790 g, Therefore, the potatoes and onions weigh together 5,790 g or 5 kg 790 g, Modeled  problem with a tape diagram as shown above and statement is both the potatoes and onions wiegh together are five thousand seven hundred ninety grams or five kilograms and seven hundred ninety grams.

Eureka Math Grade 4 Module 2 Lesson 5 Problem Set Answer Key 11

Explanation: Given Adele let out 18 meters 46 centimeters of string to fly her kite. She then let out 13 meters 78 centimeters more before reeling back in 590 centimeters. So Adele string length after reeling it in is 18 m 46 cm + 13 m 78 cm – 590 cm = as 18 m 46 cm = 18 x 100 cm + 46 cm = 18,00 cm + 46 cm = 18,46 cm and 13 m 78 cm = 13  X 100 cm + 78 cm = 13,00 cm + 78 cm = 13,78 cm. Now (18,46 cm + 13,78 cm) – 590 cm = 32,24 cm – 590 cm = 26,34 cm or  26,34 cm ÷ 100 = 26 m 34 cm, Therefore, Adele string is 26,34 centimeters or 26 meters 34 centimeters long after reeling it in. Modeled  problem with a tape diagram as shown above and statement is Adele string is twenty six thousand thirty centimeters or twenty six meters and thirty centimeters long after reeling it in.

Question 3. Shyan’s barrel contained 6 liters 775 milliliters of paint. She poured in 1 liter 118 milliliters more. The first day, Shyan used 2 liters 125 milliliters of the paint. At the end of the second day, there were 1,769 milliliters of paint remaining in the barrel. How much paint did Shyan use on the second day?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-7

Explanation: Given Shyan’s barrel contained 6 liters 775 milliliters of paint. She poured in 1 liter 118 milliliters more. The first day, Shyan used 2 liters 125 milliliters of the paint. At the end of the second day, there were 1,769 milliliters of paint remaining in the barrel. Total amount of the paint is 6 L 775 mL + 1 L 118 mL = 7 L 893 mL, Paint left after first day is 7 L 893 mL – 2 L 125 mL = 7 L 893 mL = 7 X 1000 mL + 893 mL = 7,893 mL, 2 L 125 mL = 2 X 1000 mL + 125 mL = 2,125 mL, So 7,893 mL – 2,125 mL = 5,768 mL paint is left after first day, Now Second day paint used is 5,768 mL – 1,769 mL = 3,999 mL or 3,999 mL ÷ 1000 = 3 L 999 mL paint has been used on the second day by Shyan. Modeled  problem with a tape diagram as shown above and statement Shyan on the second day uses three thousand nine hundred ninety nine milliliters or 3 liters and nine hundred ninety nine milliliters of the paint.

Eureka Math Grade 4 Module 2 Lesson 5 Problem Set Answer Key 12

Explanation: Given On Thursday, the pizzeria used less 2 kilograms 180 grams less flour than they used on Friday. On Friday, they used 12 kilograms 240 grams. On Saturday, they used 1,888 grams more than on Friday. So on Thursday they used 12 kg 240 g – 2 kg 180 g = 12 X 1000 g + 240 g = 12,240 g, 2 X 1000 + 180 g = 2,180g, 12,240 g – 2,180 g = 10,060 g on Thursday, On Saturday they used 1,888 g + 12,240 g = 14,128 g, Now the total amount of flour used over the three days is 10,060 g + 12,240 g + 14,128 g = 36,428 g or 36,428 g ÷ 1000 = 36 kg 428 g. Therefore the total amount of flour used over three days is 36,428 grams or 36 kilograms 428 grams, Modeled problem with a tape diagram as shown above and statement is the total amount of flour used over three days is thirty six thousand four hundred twenty eight grams or thirty six kilograms and four hundred twenty eight grams.

Question 5. The gas tank in Zachary’s car has a capacity of 60 liters. He adds 23 liters 825 milliliters of gas to the tank, which already has 2,050 milliliters of gas. How much more gas can Zachary add to the gas tank?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-9

Explanation: Given the gas tank in Zachary’s car has a capacity of 60 liters. He adds 23 liters 825 milliliters of gas to the tank, which already has 2,050 milliliters of gas. So  the gas tank has  23 L 825 mL + 2,050 mL = as 23 L 825 mL = 23 X 1000 mL + 825 mL = 23,000 mL + 825 mL = 23,825 mL gas, Now 23,825 mL + 2,050 mL = 25,875 mL More gas can Zachary add to the gas tank is 60 L – 25,875 mL = as 60 L = 60 X 1,000 mL = 60,000 mL, So 60,000 – 25,875 mL = 34,125 mL or 34,125 mL ÷ 1000 = 34 L 125 mL, therefore, more 34,125 milliliters or 34 L 125 mL gas can Zachary add to the gas tank. Modeled problem with a tape diagram as shown above and statement is more thirty four thousand one hundred twenty five milliliters or thirty four liters and one hundred twenty five milliliters gas can Zachary add to the gas tank.

Question 6. A giraffe is 5 meters 20 centimeters tall. An elephant is 1 meter 77 centimeters shorter than a giraffe. A rhinoceros is 1 meter 58 centimeters shorter than an elephant. How tall are the rhinoceros?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-10

Explanation: Given A giraffe is 5 meters 20 centimeters tall. An elephant is 1 meter 77 centimeters shorter than the giraffe and A rhinoceros is 1 meter 58 centimeters shorter than the elephant. So height of rhinoceros is first we see height of elephant as 5 m 20 cm – 1 m 77 cm = as 5 X 100 cm + 20 cm = 5,20 cm and 1 m 77 cm = 1 X 100 cm +77 cm = 1,77 cm, so 520 cm – 177 cm = 343 cm, Now rhinoceros is 343 cm – 1 m 58 cm = as 1 m 58 cm = 1 X 100 cm + 58 cm = 158 cm so 343 cm – 158 cm = 185 cm or 185 cm ÷ 100 = 1 m 85 cm, therefore the rhinoceros is 185 centimeters tall or 1 meter 85 centimeters tall, modeled problem with a tape diagram as shown above and statement is the rhinoceros is one hundred eighty five centimeters tall or one meter eighty five centimeters tall.

Eureka Math Grade 4 Module 2 Lesson 5 Exit Ticket Answer Key

Engage NY Math 4th Grade Module 2 Lesson 5 Exit Ticket Answer Key 20

Explanation: Given Jeff places a pineapple with a mass of 890 grams on a balance scale. He balances the scale by placing two oranges, an apple, and a lemon on the other side. Each orange weighs 280 grams. The lemon weighs 195 grams less than each orange. So the lemon weighs 280 g – 195 g =  85 grams, Now weigh of two oranges is 280 g + 280 g = 560 grams, given  2 oranges + lemon + apple = 890 grams, therefore weigh of apple = 890 g – (560g + 85 g) = 890 g – 645 g = 245 g, therefore, the mass of the apple is 245 g, modeled problem with a tape diagram as shown above and statement is mass of apple is two hundred fortyy five grams.

Question 2. Brian is 1 meter 87 centimeters tall. Bonnie is 58 centimeters shorter than Brian. Betina is 26 centimeters taller than Bonnie. How tall is Betina?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-12

Explanation: Given Brian is 1 meter 87 centimeters tall. Bonnie is 58 centimeters shorter than Brian means Bonnie is 1 m 87 cm – 58 = as 1 m 87 cm = 1 X 100 cm + 87 cm = 187 cm, 187 cm – 58 cm = 129 cm, Bonnie is 129 cm and Betina is 26 centimeters taller than Bonnie means Betina is 129 cm + 26 cm = 155 cm or 155  cm ÷ 100 = 1 m 55 cm, So Betina is 155 cm or 1 m 55 cm tall, modeled problem with a tape diagram as shown above and statement is Betina is one hundred fifty five centimeters or one meter fifty five centimeters tall.

Eureka Math Grade 4 Module 2 Lesson 5 Homework Answer Key

Question 1. The capacity of Jose’s vase is 2,419 milliliters of water. He poured 1 liter 299 milliliters of water into the empty vase. Then, he added 398 milliliters. How much more water will the vase hold?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-13

Explanation: Given the capacity of Jose’s vase is 2,419 milliliters of water. He poured 1 liter 299 milliliters of water into the empty vase. Then, he added 398 milliliters. So now water in the vase is 1 L 299 mL + 398 mL as 1 L 299 mL = 1 X 1000 mL + 299 mL = 1,299 mL +  398 mL = 1,697 mL of water, Now we can pour more is 2,419 mL – 1,697 mL = 722 mL more, therefore, Jose’s vase can hold more 722 milliliters of water, modeled problem with a tape diagram as shown above and statement is Jose’s vase can hold more seven hundred twenty two milliliters of water.

Question 2. Eric biked 1 kilometer 125 meters on Monday. On Tuesday, he biked 375 meters less than on Monday. How far did he bike both days?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-14

Explanation: Given Eric biked 1 kilometer 125 meters on Monday. On Tuesday, he biked 375 meters less than on Monday. So on Tuesday he biked 1 k 125 m – 375 m = as 1 X 1000 m + 125 m = 1,125 m , 1125 m – 375 m = 750 m, therefore Eric biked on Monday and Tuesday is 1,125 m + 750 m = 1,875 m or 1,875 m ÷ 1,000 = 1 k 875 m, therefore, Eric biked both days as 1,875 meters or 1 kilometer 875 meters, modeled problem with a tape diagram as shown above and statement is Eric biked both days as one thousand eight hundred seventy five meters or one kilometer eight hundred seventy five meters.

Question 3. Zachary weighs 37 kilograms 95 grams. Gabe weighs 4,650 grams less than Zachary. Harry weighs 2,905 grams less than Gabe. How much does Harry weigh?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-15

Explanation: Given Zachary weighs 37 kilograms 95 grams. Gabe weighs 4,650 grams less than Zachary and Harry weighs 2,905 grams less than Gabe. So Gabe weigh’s 37 kg 95 g – 4,650 g as 37 kg 95 g = 37 X 1000 g + 95 g = 37,095 g so Gabe is 37,095 g – 4,650 g = 32,445 g, Now Harry weigh’s 32,445 g – 2,905 g = 29,540 grams or 29,540 g ÷ 1,000 = 29 kilograms 540 grams, therefore, Harry weigh 29,540 grams or 29 kilogram 540 grams, modeled problem with a tape diagram as shown above and statement is Harry weigh’s twenty-nine thousand five hundred forty grams or twenty nine kilograms five hundredforty grams.

Question 4. A Springer Spaniel weighs 20 kilograms 490 grams. A Cocker Spaniel weighs 7,590 grams less than a Springer Spaniel. A Newfoundland weighs 52 kilograms 656 grams more than a Cocker Spaniel. What is the difference, in grams, between the weights of the Newfoundland and the Springer Spaniel?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-16

Explanation: Given a Springer Spaniel weighs 20 kilograms 490 grams. A Cocker Spaniel weighs 7,590 grams less than a Springer Spaniel. A Newfoundland weighs 52 kilograms 656 grams more than a Cocker Spaniel. So Cocker spaniel weigh’s 20 kg 490 g – 7,590 g as 20 kg 490 g = 20 X 1000 g + 490 g = 20,490 g, So 20,490 g – 7,590 g = 12,900 g, Now Newfoundland weighs 52 kg 656 g +12,900 g as 52 kg 656 g = 52 X 1000 g + 656 g = 52,656 g, 52,656 g + 12,900 g = 65,556 g, Now the difference in grams, between the weights of the Newfoundland and the Springer Spaniel is 65,556 g – 20,490 g = 45,066 grams, modeled problem with a tape diagram as shown above and statement is the difference in grams, between the weights of the Newfoundland and the Springer Spaniel is forty five thousand sixty six grams.

Question 5. Marsha has three rugs. The first rug is 2 meters 87 centimeters long. The second rug has a length 98 centimeters less than the first. The third rug is 111 centimeters longer than the second rug. What is the difference in centimeters between the length of the first rug and the third rug?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-17

Explanation: Given Marsha has three rugs. The first rug is 2 meters 87 centimeters long. The second rug has a length 98 centimeters less than the first. The third rug is 111 centimeters longer than the second rug so the second rug is 2 m 87 cm – 98 cm as 2 m 87 cm = 2 X 100 cm + 87 cm = 287 cm, Now 287 cm – 98 cm = 189 cm and the third rug is 189 cm + 111 cm = 300 cm, first rug is 287 cm, second rug is 189 cm and third rug is 300 cm, Now the difference in centimeters between the length of the first rug and the third rug is 300 cm – 287 cm = 13 cm, modeled problem with a tape diagram as shown above and statement is the difference in centimeters between the length of the first rug and the third rug is thirteen centimeters.

Question 6. One barrel held 60 liters 868 milliliters of sap. A second barrel held 20,089 milliliters more sap than the first. A third barrel held 40 liters 82 milliliters less sap than the second. If the sap from the three barrels was poured into a larger container, how much sap would there be in all ?

Eureka Math Grade 4 Module 2 Lesson 5 Answer Key-18

Explanation: Given one barrel held 60 liters 868 milliliters of sap. A second barrel held 20,089 milliliters more sap than the first. A third barrel held 40 liters 82 milliliters less sap than the second. Second barrel holds 60 L 868 mL + 20,089 mL as 60 L 868 mL = 60 X 1000 mL + 868 mL = 60,868 mL, 60,868 mL + 20,089 mL = 80,957 mL, Third barrel holds 80,957 mL – 40 L 82 mL as 40 L 82 mL = 40 X 1000 mL + 82 mL = 40,082 mL, so 80,957 mL – 40,082 mL = 40,875 mL, First barrel holds 60,868 mL, Second barrel holds 80,957 mL, Third barrel holds 40,875 mL, Now if the sap from the three barrels was poured into a larger container it will contain 60,868 mL + 80,957 mL + 40,875 mL = 182,700 mL, modeled problem with a tape diagram as shown above and statement is one lakh eighty two thousand seven hundred milliliters or one hundred eighty two liters and seven hundred milliliters of sap would be there in all.

Eureka Math Grade 4 Module 2 Answer Key

Leave a comment cancel reply.

You must be logged in to post a comment.

IMAGES

  1. EngageNY (Eureka Math) Grade 4 Module 2 Answer Key by MathVillage

    eureka math grade 4 module 2 lesson 5 homework

  2. Eureka Math Grade 4 Module 2 Lesson 5 by Teachingwithmslee

    eureka math grade 4 module 2 lesson 5 homework

  3. EngageNY (Eureka Math) Grade 4 Module 2 Answer Key by MathVillage

    eureka math grade 4 module 2 lesson 5 homework

  4. EngageNY (Eureka Math) Grade 4 Module 2 Answer Key by MathVillage

    eureka math grade 4 module 2 lesson 5 homework

  5. Eureka Math Homework Helpers Grade 4 : See a Problem?

    eureka math grade 4 module 2 lesson 5 homework

  6. Grade 4 Module 2 Lessons 1–5 Eureka Math™ Homework Helper

    eureka math grade 4 module 2 lesson 5 homework

VIDEO

  1. Eureka math grade 5 module 2 lesson 24 homework

  2. Eureka math grade 5 module 4 lesson 12 homework

  3. Eureka math grade 5 module 4 lesson 19 homework

  4. Eureka math grade 5 module 4 lesson 22 homework

  5. Engage NY // Eureka Math Grade 5 Module 4 Lesson 29 Homework

  6. Engage NY // Eureka Math Grade 5 Module 2 Lesson 4 Homework