Contents
Place Value Concepts for Addition and Subtraction
numbers to 1,000,000 in standard form and word form.
Demonstrate that a digit represents 10 times the value of what it represents in the place to its right.
Write numbers to 1,000,000 in unit form and expanded form by using place value structure.
© Great Minds PBC 2 4 ▸ M1 EUREKA MATH2 New York Next Gen
A Multiplication as Multiplicative Comparison Lesson 1 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 5 Interpret multiplication as multiplicative comparison. Lesson 2 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 17 Solve multiplicative comparison problems with unknowns in various positions. Lesson 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 23 Describe relationships between measurements
multiplicative comparison. Lesson 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 29 Represent the composition of larger units of
comparison.
Place
Lesson 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 39 Organize,
and
Lesson 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 49
Lesson 7 61
Lesson 8 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 71
Lesson 9 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 79 Compare numbers within 1,000,000 by using >, =, and <
Rounding Multi-Digit Whole Numbers Lesson 10 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 89 Name numbers by using place value understanding. Lesson 11 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 97 Find 1, 10, and 100 thousand more than and less than a given number. Lesson 12 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 105 Round to the nearest thousand. Lesson 13 111 Round to the nearest ten thousand and hundred thousand. Lesson 14 117 Round multi-digit numbers to any place. Lesson 15 129 Apply estimation to real-world situations by using rounding.
Topic
by using
money by using multiplicative
Topic B
Value and Comparison Within 1,000,000
count,
represent a collection of objects.
Write
Topic C
3 © Great Minds PBC EUREKA MATH2 New York Next Gen 4 ▸ M1
Multi-Digit Whole Number Addition and Subtraction Lesson 16 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 135 Add by using the standard algorithm. Lesson 17 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 141 Solve multi-step addition word problems by using the standard algorithm. Lesson 18 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 149 Subtract by using the standard algorithm, decomposing larger units once. Lesson 19 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 155 Subtract by using the standard algorithm, decomposing larger units up to 3 times. Lesson 20 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 167 Subtract by using the standard algorithm, decomposing larger units multiple times. Lesson 21 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 175 Solve two-step word problems by using addition and subtraction. Lesson 22 181 Solve multi-step word problems by using addition and subtraction.
Metric Measurement Conversion Tables Lesson 23 189 Express metric measurements of length in terms of smaller units. Lesson 24 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 195 Express metric measurements of mass and liquid volume in terms of smaller units. Credits 205 Acknowledgments 206
Topic D
Topic E
Name Date
Write a rule for each pattern.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 1 © Great Minds PBC 5 1
1.
Figure A
Figure B
Figure C
Figure D
Rule:
Rule:
Draw sticky notes to represent 4 times as many. Then fill in the blanks.
Partner B
= ×
Partner B has times as many sticky notes as partner A. is times as many as
4 ▸ M1 ▸ TA ▸ Lesson 1 EUREKA MATH2 New York Next Gen © Great Minds PBC 6 LESSON
2.
Figure M
Figure L
Figure N
Figure O
3. Partner A
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 1 © Great Minds PBC 7 LESSON
to
in the
Partner A Partner B 4 4444
Partner A Partner B
7777
Partner A Partner B
Use the pictures
fill
blanks. 4.
= × is times as many as 5.
7
= × is times as many as . 6.
9 9999 = × is times as many as
7. Draw a tape diagram to represent 36 is 4 times as many as 9. Then complete the equation.
Use the tape diagram to fill in the blanks. Then complete the equation and statement.
8. 30
6 = × is times as many as .
4 ▸ M1 ▸ TA ▸ Lesson 1 EUREKA MATH2 New York Next Gen © Great Minds PBC 8 LESSON
= ×
= × is times as many as
= × is times as many as .
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 1 © Great Minds PBC 9 LESSON 9.
8
32
10.
7
42
Name Date
1. Liz draws circles by using this rule: Multiply the number of circles by 2
a. How many circles should Liz draw for figure D? How do you know?
b. Complete the statements and equation to match the figures.
There are times as many circles in figure B than in figure A.
is times as many as 5.
= × 5
There are times as many circles in figure C than in figure B.
is times as many as 10.
= × 10
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 1 © Great Minds PBC 11 1
Figure A
Figure B
Figure C
Figure D
4 ▸ M1 ▸ TA ▸ Lesson 1 EUREKA MATH2 New York Next Gen © Great Minds PBC 12 PROBLEM SET
2. 20 5 5555 20 is times as many as 5. = × 5 3. 6 2 2 is times as many as 2. = × 4. 60 10 is times as many as . = ×
Complete the statement and equation to match the tape diagram.
Draw tape diagrams to represent each statement. Then complete the equation.
5. 12 is 3 times as many as 4. 12 = × 4
6. 28 is 4 times as many as 7.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 1 © Great Minds PBC 13 PROBLEM SET
28
= ×
7. 5 times as many as 3 is 15.
8. 6 times as many as 8 is 48.
9. There are 9 tables in the cafeteria. There are 8 times as many chairs as tables. How many chairs are in the cafeteria?
4 ▸ M1 ▸ TA ▸ Lesson 1 EUREKA MATH2 New York Next Gen © Great Minds PBC 14 PROBLEM SET
× =
× =
Name Date
Draw a model to represent the statement. Then complete the equation.
15 is 3 times as many as 5.
15 = ×
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Use the tape diagrams to complete the statement and equations.
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1. ? 6 is 3 times as many as 6 = 3 × 6 2. 20 ? 20 is 4 times as many as 20 ÷ 4 = 20 = 4 × 3. ? times as many 72 9 9. . . 72 is times as many as 9 72 ÷ 9 = × 9 72 =
Draw a tape diagram to represent each statement.
Then write an equation to find the unknown and complete the statement.
4. is 2 times as many as 8.
5. 27 is 3 times as many as .
6. 35 is times as many as 7.
4 ▸ M1 ▸ TA ▸ Lesson 2 EUREKA MATH2 New York Next Gen © Great Minds PBC 18 PROBLEM SET
?
7. Ivan draws a tape diagram to represent a statement with an unknown. 48
a. Circle the statement that Ivan’s tape diagram represents.
48 is ? times as many as 8.
? is 6 times as many as 8.
48 is 6 times as many as ? .
b. Explain how Ivan’s tape diagram represents the statement you circled in part (a).
c. Write an equation to represent Ivan’s tape diagram.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 2 © Great Minds PBC 19 PROBLEM SET
Use the Read–Draw–Write process to solve each problem.
8. Mia scores 3 times as many points as Shen during a basketball game. Mia scores 21 points. How many points does Shen score?
9. Adam picks 9 apples. His mom picks 54 apples. Adam says, “My mom picked 7 times as many apples as I did.” Do you agree with Adam? Why?
4 ▸ M1 ▸ TA ▸ Lesson 2 EUREKA MATH2 New York Next Gen © Great Minds PBC 20 PROBLEM SET
Name
Date
Fill in the blanks to make true statements. Write an equation to show how you found each unknown.
1. is 4 times as many as 8.
2. 30 is times as many as 6.
3. 63 is 9 times as many as .
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Record each measurement. Then complete the statement and the equation.
grams grams
The paint is 5 times as as the marker. g = 5 × g
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1. 0 10 20 30 40 50 g 0 10 20 30 40 50 g
The caterpillar is 3 times as as the ant. cm = × cm
4 ▸ M1 ▸ TA ▸ Lesson 3 EUREKA MATH2 New York Next Gen © Great Minds PBC 24 PROBLEM SET 2. 1 2 3 4 5 6 7 8 9 10 11 12 Inch 12 34 5 67 89 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 0 CM 1 2 3 4 5 6 7 8 9 10 11 12 Inch 12 34 5 67 89 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 0 CM centimeters 1 2 3 4 5 6 7 8 9 10 11 12 Inch 12 34 5 67 89 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 0 CM 1 2 3 4 5 6 7 8 9 10 11 12 Inch 12 34 5 67 89 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 0 CM
centimeters
Container B has times as water as container A.
The tape diagram represents the heights of the library and the school. ?
How many times as tall as the library is the school? Complete the equation and the comparison statement.
15 ÷ 5 =
The school is times as as the library.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 3 © Great Minds PBC 25 PROBLEM SET 3. 30 mL 20 mL Container B 10 mL 20 mL 30 mL 40 mL 10 mL 0 mL 50 mL Container A 10 mL 20 mL 30 mL 40 mL 50 mL milliliters milliliters
mL =
× mL
as
15 m 5 m Librar y School . . . 5
4.
times
tall
Use the Read–Draw–Write process to solve each problem.
5. Carla and Luke draw rectangles. The width of Luke’s rectangle is 3 centimeters. Carla’s rectangle is 4 times as wide as Luke’s rectangle. What is the width of Carla’s rectangle?
6. Fish tank A has 6 times as much water as fish tank B. There are 42 liters of water in fish tank A. How many liters of water are in fish tank B?
7. Eva weighs her dog and her cat. Her dog weighs 32 kilograms and her cat weighs 4 kilograms. How many times as heavy as Eva’s cat is her dog?
4 ▸ M1 ▸ TA ▸ Lesson 3 EUREKA MATH2 New York Next Gen © Great Minds PBC 26 PROBLEM SET
Name
Use the Read–Draw–Write process to solve the problem.
Date
Casey’s dog weighs 3 times as much as Luke’s dog. Luke’s dog weighs 8 kilograms. How much does Casey’s dog weigh?
Casey’s dog weighs kilograms.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 3 © Great Minds PBC 27 3
Name
Date
1. Bundle pennies to show how to compose a larger unit.
dollars dimes pennies
2. Complete the chart to show how to use multiplication to compose a larger unit. dollars dimes pennies
Complete the statement and multiplication equations to show how you composed a larger unit.
1 dime is worth times as much as 1 penny.
1 dime = × 1 penny
10¢ = × 1¢
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 4 © Great Minds PBC 29 4
×
3. Bundle dimes to show how to compose a larger unit.
dollars dimes pennies
4. Complete the chart to show how to use multiplication to compose a larger unit.
dollars dimes pennies × Complete the statement and multiplication equations to show how you composed a larger unit.
1 dollar is worth times as much as 1 dime.
1 dollar = × 1 dime
$1 = × 10¢
4 ▸ M1 ▸ TA ▸ Lesson 4 EUREKA MATH2 New York Next Gen © Great Minds PBC 30 LESSON
Use the Read–Draw–Write process to solve the problem.
5. Ivan and Zara play a game with money. Ivan hides 2 coins. He gives Zara the following clues. One of the coins is a penny. The other coin is worth 10 times as much as the penny. What is the other coin?
Use the Read–Draw–Write process to solve the problem.
6. Eva and Gabe both find money. Eva finds 1 dime. Gabe says, “The bill I found is worth 10 times as much as your dime.” What bill did Gabe find?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 4 © Great Minds PBC 31 LESSON
Name Date
Bundle coins to make a new unit. Then complete the statement and equations.
1. dollars dimes pennies
2. dollars dimes pennies
1 dime is worth times as much as 1 penny.
1 dime = × 1 penny
10¢ = × 1¢
1 dollar is worth times as much as 1 dime.
1 dollar = × 1 dime
$1 = × 10¢
Complete the charts to show how to make a new unit. Then complete the statements and equations.
3. dollars dimes pennies
× 1 is worth times as much as 1 penny.
1 = × 1 penny
¢ = × 1¢
4. dollars dimes pennies
× 1 is worth times as much as 1 dime.
1 = × 1 dime
$ = × 10¢
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Label the tape diagrams. Then complete the statements and equations.
5. ¢ or penny
¢ has the same value as dime
1 dime is worth times as much as 1 .
1 dime = × 1 10¢ = × 1¢
6. ¢ or dime
¢ has the same value as dollar
1 is worth 10 times as much as 1 .
1 = 10 × 1
$ = 10 × ¢
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7. James says that since 1 dime is worth 10 times as much as 1 penny, 3 dimes must be worth 10 times as much as 3 pennies. Do you agree with James? Why?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TA ▸ Lesson 4 © Great Minds PBC 35 PROBLEM SET
Name Date
Jayla and Miss Diaz draw on charts to show the relationship between the values of a dime and a penny.
Use the charts to help you answer parts (a) and (b).
Jayla’s Chart
Miss Diaz’s Chart dollars dimes pennies × 10 dollars dimes pennies 10¢
a. What is similar about the charts?
b. What is different about the charts?
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EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 5 ▸ Partial Place Value Chart to Millions © Great Minds PBC 39
10 ones 1
thousands 1,000 hundreds 100 tens
Name Date
For this counting collection, I am partners with .
We are counting .
We think they have a value of . This is how we organized and counted the collection:
We counted altogether. This is an equation that describes how we counted.
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Self-Reflection
Write one thing that worked well for you and your partner. Explain why it worked well.
Write one challenge you had. How did you work through the challenge?
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EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 5 © Great Minds PBC 45 5 Name Date Use the place value disks to help you complete the equation. 1. ten = 10 ones 10 11 11 11 11 11 2. 100 10 10 10 10 10 10 10 10 10 10 hundred = 10 tens 3. 1,000 100 100 100 100 100 100 100 100 100 100 1 = 10 hundreds 4. 10,000 1,000 1,000 1,000 1,000 1,000 1,000 1,000 1,000 1,000 1,000 ten thousand = 10 thousands 5. 100,000 10,000 10,000 10,000 10,000 10,000 10,000 10,000 10,000 10,000 10,000 1 = 10 ten thousands 6. 1,000,000 100,000 100,000 100,000 100,000 100,000 100,000 100,000 100,000 100,000 100,000 1 = 10 hundred thousands
7. Write the correct unit names on the place value chart.
tens ones
4 ▸ M1 ▸ TB ▸ Lesson 5 EUREKA MATH2 New York Next Gen © Great Minds PBC 46 PROBLEM SET
Name Date
1. What strategy did you use to count? How did it help you?
2. Explain another student’s strategy. What did you like about it?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 5 © Great Minds PBC 47 5
Name millions hundred thousands ten thousands thousands hundreds tens ones
10 times as much as 1 one is 1 .
10 times as much as 1 ten is 1 .
10 times as much as 1 hundred is 1 .
10 times as much as 1 thousand is 1
10 times as much as 1 ten thousand is 1 .
10 times as much as 1 hundred thousand is 1 .
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 6 ▸ 10 Times as Much Chart © Great Minds PBC 49
Draw and record 10 times as much
ten thousands
thousands ten thousands hundreds tens ones
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 6 © Great Minds PBC 51 6 Name Date
1. thousands
hundredstensones 10 × 1 thousand = 10 × 1,000 = 10 × 1 hundred = 10 × 100 = 10 × 1 ten = 10 × 10 = 10 × 1 one = 10 × 1 =
2. 10 × 2 thousands = 10 × 2,000 = 10 × 2 hundreds = 10 × 200 = 10 × 2 tens = 10 × 20 = 10 × 2 ones = 10 × 2 =
4 ▸ M1 ▸ TB ▸ Lesson 6 EUREKA MATH2 New York Next Gen © Great Minds PBC 52 LESSON thousands ten thousands hundreds tens ones 3. 10 × 9,000 = 10 × 900 = 10 × 90 = 10 × 9 = thousands ten thousands hundredstensones 4. 90,000 = 10 × 90,000 ÷ 10 = 9,000 = 10 × 9,000 ÷ 10 = 900 = 10 × 900 ÷ 10 = 90 = 10 × 90 ÷ 10 =
Name Date
Bundle 10 disks to make a new unit. Then complete the statement and equations.
1.
10 times as much as 1 one is ten.
10 × 1 one = ten
10 × 1 =
10 times as much as 1 ten is hundred.
10 × 1 ten = hundred
10 × 10 =
10 times as much as 1 hundred is thousand.
10 × 1 hundred = thousand
10 × 100 =
10 times as much as 1 thousand is ten thousand.
10 × 1 thousand = ten thousand
10 × 1,000 =
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 6 © Great Minds PBC 53 6
2.
3.
4.
Use the place value chart to complete the statements and equations.
5. thousands hundreds tens ones × 10
6. thousands hundreds tens ones × 10
10 times as much as 1 one is 1 .
10 × 1 =
1 ten is 10 times as much as 1 .
10 = 10 ×
7. thousands hundreds tens ones × 10
10 times as much as 1 ten is 1 .
10 × 10 =
1 hundred is 10 times as much as 1 .
100 = 10 ×
8. thousands hundreds tens ones × 10
10 times as much as 3 tens is 3 . 10 × 30 =
10 times as much as 8 hundreds is 8 .
10 × 800 =
3 hundreds is 10 times as much as 3 .
300 = 10 ×
8 thousands is 10 times as much as 8 .
8,000 = 10 ×
4 ▸ M1 ▸ TB ▸ Lesson 6 EUREKA MATH2 New York Next Gen © Great Minds PBC 54 PROBLEM SET
Use the place value chart to complete the equation.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 6 © Great Minds PBC 55 PROBLEM SET
tens ones ÷ 10 10 ÷ 10 =
9. thousands ten thousands hundreds
tens ones ÷ 10 10,000 ÷ 10 =
÷ 10 50 ÷ 10 =
10. thousands ten thousands hundreds
11. thousands ten thousands hundreds tens ones
÷ 10 70,000 ÷ 10 =
12. thousands ten thousands hundreds tens ones
Complete each statement by drawing a line to the correct value.
13. 2 thousands is 10 times as much as .
14. 2 tens ÷ 10 =
15. 10 times as much as 2 ones is .
16. 10 × 4 ones =
2 ones
2 tens
2 hundreds
4 ones
4 tens 18. 4,000 ÷ 10 =
17. 4 tens is 10 times as much as .
4 hundreds
4 ▸ M1 ▸ TB ▸ Lesson 6 EUREKA MATH2 New York Next Gen © Great Minds PBC 56 PROBLEM SET
Use the Read–Draw–Write process to solve the problem.
19. In the morning, there is $700 in the cash register. At the end of the day, 10 times as much money is in the cash register.
a. How much money is in the cash register at the end of the day?
b. Explain your thinking.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 6 © Great Minds PBC 57 PROBLEM SET
Name Date
a. Fill in the blank to make a true statement.
1 ten thousand is times as much as 1 thousand.
b. Explain how you know your answer is correct.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 6 © Great Minds PBC 59 6
Name Date
Draw dots in the place value chart to represent the number. Then fill in the blanks to identify how many of each unit.
1. 270,364
millions hundred thousands ten thousands thousandshundredstensones
2. 1,056,230 millions
hundred thousands ten thousandshundreds tens ones thousands
hundred thousands ten thousands thousandshundredstensones
million hundred thousands ten thousandshundreds tens ones thousands
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 7 © Great Minds PBC 61 7
Express each number in expanded form in two ways.
4 ▸ M1 ▸ TB ▸ Lesson 7 EUREKA MATH2 New York Next Gen © Great Minds PBC 62 LESSON
80,000 + + + ( × 10,000) + ( × 1,000) + ( × 10) + ( × 1)
3.
83,015
+ + + ( × ) + ( × ) + ( × ) + ( × )
4. 620,409
Count the number of place value disks in each column of the chart.
Write the number at the bottom of the column.
Then fill in the blanks to write the unit form of the number represented in the chart. The first one has been started for you.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 7 © Great Minds PBC 63 7 Name Date
3253 1,000 1,000 1,000 10 10 10 10 10 1 1 1 100 100 thousands hundreds tens ones
42261 10,000 10,000 10,000 10,000 1,000 1,000 100 10 10 10 10 10 10 100 1 ten thousands thousands hundreds tens one
1.
2.
4 ▸ M1 ▸ TB ▸ Lesson 7 EUREKA MATH2 New York Next Gen © Great Minds PBC 64 PROBLEM SET 3. 10,000 10,000 10,000 1,000 1,000 1,000 1,000 1,000 1,000 1,000 100,000 100,000 100 100 100 100 100 1 1 1 1 hundred thousands ten thousands thousands hundreds tens ones 4. 1,000,000 100,000 1,000 100 10 1 1 1 1 1 1 1 1 10 100 100 100 100 100 100,000 100,000 100,000
million hundred thousands ten thousands thousand hundreds tens ones
Use the numbers on the place value chart to complete the expanded form.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 7 © Great Minds PBC 65 PROBLEM SET
5. millions hundred thousands ten thousands thousands hundreds tens ones 3 1 8 5 Expanded form: 3,000 + + + 6. millions hundred thousands ten thousands thousands hundreds tens ones 4 9 0 1 7 Expanded form: + 9,000 + + 7. millions hundred thousands ten thousands thousands hundreds tens ones 7 0 2 9 4 3 Expanded form: + + + +
8. millions hundred thousands ten thousands thousands hundreds tens ones
Expanded form:
Fill in the blanks to write each number in expanded form in two ways.
4 ▸ M1 ▸ TB ▸ Lesson 7 EUREKA MATH2 New York Next Gen © Great Minds PBC 66 PROBLEM SET
2 4 0 6 0 2
Standard Form Expanded Form 9. 4,923 4,000 + + 20 + (4 × ) + (9 × 100) + (2 × 10) + ( × 1) 10. 63,485 + 3,000 + 400 + + 5 ( × 10,000) + (3 × + (4 × 100) + (8 × 10) + (5 × ) 11. 10,604 10,000 + + 4 (1 × ) + ( × 100) + (4 × ) 12. 871,507
13. Miss Diaz buys a fishing boat. The picture shows the amount of money she pays.
Pablo says the number of dollars is 30,000 + 5,000 + 40.
Amy says the number of dollars is 30 ten thousands 5 hundreds 4 tens.
Who is correct? Who made a mistake? Explain your thinking.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 7 © Great Minds PBC 67 PROBLEM SET
$10,000 $10,000 $10,000 $10 $10 $10 $10 $100 $100 $100 $100 $100
Write the number 26,518 in expanded form in two different ways.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 7 © Great Minds PBC 69 7
Name Date
ones
tens
hundreds
thousands
ten thousands
hundred thousands
millions
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 8 ▸ Place Value Chart to Millions © Great Minds PBC 71
Express the following numbers in standard form by using commas.
1. 4168
2. 72035
3. 183119
4. 6455007
5. 29301248
Use the place value disks on each chart to complete the table.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 8 © Great Minds PBC 73 8
Name Date
Chart Expanded Form Standard Form
6.
7.
Fill in the blank to make a true number sentence.
8. 1,000 + 400 + 60 + 2 =
9. 400,000 + + 900 + 8 = 407, 908
10. = 35 thousands + 6 tens + 1 one
11. 920,902 = 900,000 + 900 + 2 +
Express each number in standard form.
12. 1 ten thousand 4 thousands 8 tens
13. 2 hundred thousands 6 thousands 9 hundreds 3 ones
14. Sixty-one thousand, forty-eight
15. Five hundred thousand, five hundred five
Express each number in word form.
16. 3,627
17. 84,100
4 ▸ M1 ▸ TB ▸ Lesson 8 EUREKA MATH2 New York Next Gen © Great Minds PBC 74 PROBLEM SET
18. 570,016
19. 900,509
20. Mrs. Smith sees a home for sale. Use pictures, numbers, or words to express the cost of the home in two other ways. FOR SA LE $396,000
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 8 © Great Minds PBC 75 PROBLEM SET
Name Date
Complete the table. Use commas in both standard form and word form.
Standard Form
Unit Form
9 thousands 3 hundreds 4 ones
Word Form
Sixty-two thousand, seven hundred eighty-nine
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 8 © Great Minds PBC 77 8
ones
tens
hundreds
thousands
ten thousands
hundred thousands
millions
© Great Minds PBC 79 EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 9 ▸ Place Value Chart to Millions
5. Use problems 1–4 for parts (a) and (b).
a. In which number is the value of the 8 ten times as much as the value of the 8 in 368? Circle your answer.
b. Explain your thinking.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 9 © Great Minds PBC 81 9 Name Date Write the value of the digit 8 for each number.
58,267
839,415
1. 5,813 2.
3. 12,984 4.
5,813 58,267 12,984 839,415
Write the value of each digit.
6. 5, 18 4 7.
Fill in the blanks to make the statement true.
8. In 6,274, the value of the digit 6 is
9. In 91,307, the digit is in the ten thousands place.
10. In 520,841, the digit in the hundreds place is and the digit in the hundred thousands place is
4 ▸ M1 ▸ TB ▸ Lesson 9 EUREKA MATH2 New York Next Gen © Great Minds PBC 82 PROBLEM SET
72,0 49
Represent each number with digits on the place value chart. Then circle the number that is greater. 11. millions hundred thousands ten thousands thousands hundreds tens ones
Use >, =, or < to compare the numbers. Explain your thinking.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 9 © Great Minds PBC 83 PROBLEM SET
3,685 4,162 12.
500,273 59,372 13.
840,790 840,970
millions hundred thousands ten thousands thousands hundreds tens ones
millions hundred thousands ten thousands thousands hundreds tens ones
14. 5,813 10,300
4 ▸ M1 ▸ TB ▸ Lesson 9 EUREKA MATH2 New York Next Gen © Great Minds PBC 84 PROBLEM SET 15. 17,209 17,200 Use >, =, or < to compare the numbers. 16. 7,613 8,210 17. 2,351 2,513 18. 49,071 9,999 19. 38,014 38,104 20. 635,240 635,090 21. 500,661 501,007 22. 5 thousands 9 tens 3 ones 5,093 23. 20,000 + 8,000 + 40 + 6 20,846 24. 910,091 ninety-one thousand, ninety-one 25. 170,052 170 thousands 52 tens
Arrange the numbers from least to greatest.
26. 16,832, 26,081, 26,108, 16,283 , , ,
27. 704,129, 710,009, 800,100, 704,219 , , ,
28. Robin has $8,615 in the bank. Deepa has $8,061 in the bank. Who has more money in the bank? Explain how you know.
29. Miss Wong asks her students to compare 37,605 and 37,065.
Jayla says 37,605 is less than 37,065.
Ray says 37,065 is less than 37,605
Who is correct? Explain how you know.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 9 © Great Minds PBC 85 PROBLEM SET
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TB ▸ Lesson 9 © Great Minds PBC 87 9 Name Date Compare the numbers by using >, =, or <. Explain how you know. 510,304 501,304
Name Date
1. Rename 4,215 in different ways. thousands hundreds tens ones 4 2 1 5
a. thousands hundreds ten ones
b. hundreds ten ones
c. tens ones
d. ones
2. Rename 23,048 in different ways.
a. ten thousands thousands hundreds tens ones
b. thousands hundreds tens ones
c. hundreds tens ones
d. tens ones
e. ones
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 10 © Great Minds PBC 89 10
3. Rename 847,520 in different ways.
a. ten thousands thousands hundreds tens ones
b. 83 ten thousands thousands hundreds tens ones
c. thousands 5 hundreds tens ones
d. thousands hundreds tens ones
4. Use unit form to rename 905,438 in different ways.
4 ▸ M1 ▸ TC ▸ Lesson 10 EUREKA MATH2 New York Next Gen © Great Minds PBC 90 LESSON
Name Date
1. Represent 1,315 on the place value chart to match the given unit form.
a. 1 thousand 3 hundreds 1 ten 5 ones
hundredstensones thousands
b. 13 hundreds 1 ten 5 ones
hundredstensones thousands
2. Rename 4,628 in different ways. thousands hundreds tens ones hundreds tens ones tens ones ones
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 10 © Great Minds PBC 91 10
3. Rename 73,905 in different ways.
ten thousands thousands hundreds tens ones thousands hundreds tens ones hundreds tens ones tens ones ones
Write the answer for each question.
4. How many thousands are in the thousands place in 83,106? thousands
5. How many thousands are in 83,106? thousands
6. How many ten thousands are in the ten thousands place in 251,472? ten thousands
7. How many ten thousands are in 251,472? ten thousands
4 ▸ M1 ▸ TC ▸ Lesson 10 EUREKA MATH2 New York Next Gen © Great Minds PBC 92 PROBLEM SET
8. Oka wants to represent 12,751 on a place value chart. Write two different ways Oka can show the number.
Find the mystery number and write it in standard form. Explain your thinking with pictures, numbers, or words.
9. I have 6 ones, 550 thousands, and 12 hundreds. What number am I?
10. I have 11 thousands, 8 ten thousands, 36 ones, and 9 hundreds. What number am I?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 10 © Great Minds PBC 93 PROBLEM SET
Name Date
Think about the number 2,437
a. Which choice does not represent 2,437?
A. 2 thousands 4 hundreds 3 tens 7 ones
B. 24 hundreds 3 tens 7 ones
C. 24 tens 37 ones
D. 2,437 ones
b. Explain how you know.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 10 © Great Minds PBC 95 10
ones
tens
hundreds
thousands
ten thousands
hundred thousands
millions
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 11 ▸ Place Value Chart to Millions © Great Minds PBC 97
Draw or cross out disks on the chart to match the statement. Then complete the statement.
1 thousand more than 74,236 is
1 ten thousand less than 850,314 is .
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 11 © Great Minds PBC 99 11 Name Date
1.
10,000 1,000 1,000 1,000 1,000 10,000 10,000 10,000 10,000 10,000 10,000 100 100 10 10 10 1 1 1 1 1 1
2.
10,000 10,000 10,000 10,000 10,000 10 1 1 1 1 100 100 100 100,000 100,000 100,000 100,000 100,000 100,000 100,000 100,000
Complete each statement and equation.
3. 1,000 more than 82,764 is .
82,764 + 1,000 =
5. 10,000 less than 60,230 is
60,230 − 10,000 =
Use the rule to complete the number pattern.
7. Rule: Add 1,000 68,381
8. Rule: Subtract 10,000 821,049
4. is 10,000 more than 51,093. = 51,093 + 10,000
6. is 100,000 less than 579,018 = 579,018 − 100,000
4 ▸ M1 ▸ TC ▸ Lesson 11 EUREKA MATH2 New York Next Gen © Great Minds PBC 100 PROBLEM SET
13. What is the rule for problem 12? Explain how you found the rule.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 11 © Great Minds PBC 101 PROBLEM SET Complete the number pattern. 9. 14,293 15,293 16,293 10. 850,187 550,187 450,187 11. 6,405 7,405 9,405 12. 122,017 112,017 92,017
Use the Read–Draw–Write process to solve each problem.
14. 359,286 people attended a music festival this year. That amount is 100,000 more people than last year. How many people attended the music festival last year?
15. Casey completes the pattern below by using this rule: Subtract 100,000. Explain Casey’s error.
4 ▸ M1 ▸ TC ▸ Lesson 11 EUREKA MATH2 New York Next Gen © Great Minds PBC 102 PROBLEM SET
392 ,201 382,201 37 2,201 362,201 36
Name Date
Complete each statement.
1. 1,000 more than 341,268 is .
2. 100,000 less than 753,722 is .
Use the rule to complete each number pattern.
3. Rule: Add 1,000 23,500
4. Rule: Subtract 10,000
649,015
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 11 © Great Minds PBC 103 11
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 12 © Great Minds PBC 105 12 Name Date Round to the nearest thousand. Show your thinking on the number line. The first one is started for you. 1. 2,400 ≈ 2,500 = 2 thousands 5 hundreds 3,000 = 3 thousands 2,000 = 2 thousands 2. 7,380 ≈ 7,500 = 7 thousands 5 hundreds 3. 12,603 ≈ 4. 59,099 ≈
Round to the nearest thousand. Draw a number line to show your thinking.
4 ▸ M1 ▸ TC ▸ Lesson 12 EUREKA MATH2 New York Next Gen © Great Minds PBC 106 PROBLEM SET
5. 189,735 ≈
6. 503,500 ≈
7. 99,631 ≈
8. 475,582 ≈
9. The Toy Company made 344,499 toys last year. To the nearest thousand, about how many toys did they make?
10. Mr. Davis buys 55,555 kilograms of gravel. He asks Shen and Zara to round the weight to the nearest thousand. Shen says 60,000 kilograms. Zara says 56,000 kilograms. Who is correct? Explain your thinking.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 12 © Great Minds PBC 107 PROBLEM SET
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 12 © Great Minds PBC 109 12 Name Date Round to the nearest thousand. Draw a vertical number line to show your thinking. 1. 6,215 ≈ 2. 14,805 ≈
Round to the nearest ten thousand. Show your thinking on the number line. The first one is started for you.
62,012 ≈ 65,000 = 6 ten thousands 5 thousands
70,000 = 7 ten thousands
60,000 = 6 ten thousands
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 13 © Great Minds PBC 111 13
Name Date
1.
2. 37,159 ≈
3. 155,401 ≈
4. 809,253 ≈
Round to the nearest hundred thousand. Use the number line to show your thinking. The first one is started for you.
340,762
400,000 = 4 hundred thousands
350,000 = 3 hundred thousands 5 ten thousands
300,000 = 3 hundred thousands
4 ▸ M1 ▸ TC ▸ Lesson 13 EUREKA MATH2 New York Next Gen © Great Minds PBC 112 PROBLEM SET
5.
≈
6. 549,999 ≈
7. 92,103 ≈
8. 995,246 ≈
9. 899,604 people live in Sun City. About how many people live in Sun City? Round to the nearest ten thousand.
10. Mr. Lopez writes a number. He asks three students to round it to the nearest hundred thousand.
a. Which student correctly rounded the number to the nearest hundred thousand? Explain how you know.
b. Circle the mistakes and explain what the other students did that was incorrect.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 13 © Great Minds PBC 113 PROBLEM SET
97 6, 831 900,000 980, 000 1, 000,000 Liz Carla Adam
Round to the nearest ten thousand. Draw a vertical number line to show your thinking.
a. 51,578 ≈
b. 35,124 ≈
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 13 © Great Minds PBC 115 13
Name Date
Sprint
Write the sum or difference.
1. 260 + 1 =
2. 260 − 10 =
3. 260 + 100 =
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ Sprint ▸ 1, 10, 100, and 1,000 More or Less © Great Minds PBC 117
Number Correct: Write
4 ▸ M1 ▸ Sprint ▸ 1, 10, 100, and 1,000 More or Less EUREKA MATH2 New York Next Gen © Great Minds PBC 118
A
the sum or difference.
5 + 1 =
5 + 10 =
5 + 100 = 4. 59 + 1 = 5. 59 + 10 = 6. 59 + 100 = 7. 509 + 1 = 8. 509 + 10 = 9. 509 + 100 = 10. 591 + 1 = 11. 591 + 10 = 12. 591 + 100 = 13. 894 − 1 = 14. 894 − 10 = 15. 894 − 100 = 16. 804 − 1 = 17. 804 − 10 = 18. 804 − 100 = 19. 810 − 1 = 20. 810 − 10 = 21. 810 − 100 = 22. 710 − 100 = 23. 499 + 1 = 24. 499 − 1 = 25. 499 + 10 = 26. 499 − 10 = 27. 499 + 100 = 28. 499 − 100 = 29. 999 + 1 = 30. 999 − 1 = 31. 999 + 10 = 32. 999 − 10 = 33. 999 + 100 = 34. 999 − 100 = 35. 25 + 1 = 36. 25 − 1 = 37. 7,938 + 100 = 38. 7,938 − 100 = 39. 7,938 + 1,000 = 40. 7,938 − 1,000 = 41. 9,999 + 1,000 = 42. 9,999 − 1,000 = 43. 29,999 + 1,000 = 44. 29,999 − 1,000 =
1.
2.
3.
Number Correct:
Improvement:
4 ▸ M1 ▸ Sprint ▸ 1, 10, 100, and 1,000 More or Less
2 New York Next Gen © Great Minds PBC 120
EUREKA MATH
Bthe sum or difference.
4 + 1 = 2. 4 + 10 = 3. 4 + 100 = 4. 49 + 1 = 5. 49 + 10 = 6. 49 + 100 = 7. 409 + 1 = 8. 409 + 10 = 9. 409 + 100 = 10. 491 + 1 = 11. 491 + 10 = 12. 491 + 100 = 13. 794 − 1 = 14. 794 − 10 = 15. 794 − 100 = 16. 704 − 1 = 17. 704 − 10 = 18. 704 − 100 = 19. 710 − 1 = 20. 710 − 10 = 21. 710 − 100 = 22. 610 − 100 = 23. 399 + 1 = 24. 399 − 1 = 25. 399 + 10 = 26. 399 − 10 = 27. 399 + 100 = 28. 399 − 100 = 29. 999 + 1 = 30. 999 − 1 = 31. 999 + 10 = 32. 999 − 10 = 33. 999 + 100 = 34. 999 − 100 = 35. 24 + 1 = 36. 24 − 1 = 37. 6,938 + 100 = 38. 6,938 − 100 = 39. 6,938 + 1,000 = 40. 6,938 − 1,000 = 41. 9,999 + 1,000 = 42. 9,999 − 1,000 = 43. 19,999 + 1,000 = 44. 19,999 − 1,000 =
Write
1.
Name
1. Round 870,215 to each given place value.
a. Nearest hundred thousand 870,215 ≈
b. Nearest ten thousand 870,215 ≈
c. Nearest thousand 870,215 ≈
2. Round 97,513 to each given place value.
a. Nearest ten thousand 97,513 ≈
b. Nearest thousand 97,513 ≈
c. Nearest hundred 97,513 ≈
3. A stadium has 97,513 seats.
a. About how many seats does the stadium have?
Date
b. What place value unit did you choose for rounding? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 14 © Great Minds PBC 121 14
Name Date
Round each number to the given place. Show your thinking on a number line.
1. 123,400
a. Nearest hundred thousand
b. Nearest ten thousand 123,400
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 14 © Great Minds PBC 123 14
123,400 ≈
≈
4 ▸ M1 ▸ TC ▸ Lesson 14 EUREKA MATH2 New York Next Gen © Great Minds PBC 124 PROBLEM SET
2. 262,048
262,048 ≈
a. Nearest thousand
262,048 ≈
b. Nearest ten thousand
3. 99,909
99,909 ≈
a. Nearest thousand
99,909 ≈
b. Nearest ten thousand
Round
4. 53,604
Nearest hundred thousand
5. 489,025
Nearest hundred thousand
Nearest ten thousand
Nearest ten thousand
Nearest thousand
Nearest thousand
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 14 © Great Minds PBC 125 PROBLEM SET
the numbers to the given place.
correct rounded number. Statement True or False Correct Rounded Number
Write True or False for each statement. If you choose False, then write the
6. 4,509 rounded to the nearest thousand is 4,000
7. 17,360 rounded to the nearest thousand is 20,000.
8. 34,911 rounded to the nearest ten thousand is 30,000.
9. 628,903 rounded to the nearest ten thousand is 630,000.
10. 554,207 rounded to the nearest hundred thousand is 500,000
11. Miss Diaz thinks of a number. She asks four students to determine the number. She tells them that the number is the lowest possible number that rounds to 40,000
Who is correct? Explain your answer.
4 ▸ M1 ▸ TC ▸ Lesson 14 EUREKA MATH2 New York Next Gen © Great Minds PBC 126 PROBLEM SET
39,999 35, 000 33,500 Mia DavidOka Pablo 44,999 ,999
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 14 © Great Minds PBC 127 14 Name Date Round 764,903 to the given place. Number Rounded to the Nearest Thousand Rounded to the Nearest Ten Thousand Rounded to the Nearest Hundred Thousand 764,903
Name Date
1. Company A needs to order computers for 7,165 people. It rounds 7,165 to the nearest hundred to estimate how many computers to order. Will there be enough computers for each person to get 1 computer? Explain.
2. Eva’s swimming pool has a capacity of 9,327 gallons. Eva’s parents each round the number of gallons needed to fill the pool.
Her dad rounds to the nearest thousand and her mom rounds to the nearest hundred.
Whose estimate is more accurate? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 15 © Great Minds PBC 129 15
3. Gabe has $70. He wants to buy a book bag that costs $34, a book that costs $19, and a calculator that costs $24.
a. Gabe estimates the total cost of all three items by rounding each price to the nearest ten. What is his estimate?
b. Gabe thinks he has enough money. What is the actual total cost of the three items?
c. Does Gabe have enough money?
d. To make sure he has enough money, what strategy could Gabe use to estimate?
4 ▸ M1 ▸ TC ▸ Lesson 15 EUREKA MATH2 New York Next Gen © Great Minds PBC 130 PROBLEM SET
4. Amy will win a prize if she sells 300 boxes of cookies. She sells 51 boxes in January and 104 boxes in February. Should Amy round to the nearest hundred or nearest ten to estimate the number of boxes she still needs to sell? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 15 © Great Minds PBC 131 PROBLEM SET
Name Date
Mr. Lopez plans to buy snacks for his students. He has 24 students in his first class, 18 students in his second class, and 23 students in his third class.
Estimate how many snacks Mr. Lopez should buy. Explain how you estimated and why.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TC ▸ Lesson 15 © Great Minds PBC 133 15
ones
tens
hundreds
thousands
ten thousands
hundred thousands
millions
© Great Minds PBC 135 EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 16 ▸ Place Value Chart to Millions
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 16 © Great Minds PBC 137 16 Name Date Add by using the standard algorithm. 1. 5, 21 2 + 367 2. 5, 1, 21 2 + 367 3. 5, 1, 215 +3 67 4. 5, 2, 21 2 + 392 5. 8, 2, 21 5 + 392 6. 3, 3, 268 +5 73 1 7. 73,097 + 5,047 8. 24,697 + 81,950 9. 633,912 + 267,334 10. 426 + 264 + 642 11. 2,063 + 5,820 + 2,207 12. 47,194 + 5,265 + 531,576
Use the Read–Draw–Write process to solve each problem.
13. At a fair, 5,862 tickets were sold on Saturday. 3,977 tickets were sold on Sunday.
How many total tickets were sold on the two days?
14. Deepa and Ivan are playing a video game. Deepa scores 108,572 points and Ivan scores 86,029 points.
How many points do they score altogether?
15. A national park had 496,625 visitors in June. There were 220,837 more visitors in July than in June.
How many visitors did the park have in July?
4 ▸ M1 ▸ TD ▸ Lesson 16 EUREKA MATH2 New York Next Gen © Great Minds PBC 138 PROBLEM SET
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 16 © Great Minds PBC 139 16 Name Date
5, 2, 98 3 + 097 2. 3, 2, 607 +3 07 2
Add by using the standard algorithm. 1.
3. 524,726 + 96,415
Name Date
Use the Read–Draw–Write process to solve the problem.
1. A flower shop sold 14,976 lilies in one year. They sold 7,488 more roses than lilies that year. How many flowers did the shop sell altogether?
Lilies Roses
Use the Read–Draw–Write process to solve the problem.
2. On Saturday, 125,649 more packages were delivered than were delivered on Sunday. On Sunday, 293,848 packages were delivered. How many packages were delivered on both days combined?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 17 © Great Minds PBC 141 17
Use the Read–Draw–Write process to solve the problem.
3. A shoe factory made 218,050 pairs of men’s shoes. The factory made 83,960 more pairs of women’s shoes than men’s shoes. They also made 74,308 more pairs of children’s shoes than men’s shoes. How many pairs of shoes did the factory make altogether?
4 ▸ M1 ▸ TD ▸ Lesson 17 EUREKA MATH2 New York Next Gen © Great Minds PBC 142 LESSON
Name Date
Use the Read–Draw–Write process to solve each problem.
1. A fish market sold 1,618 tunas. They sold 857 more salmon than tuna.
a. About how many fish did the fish market sell?
Estimate by rounding each number to the nearest hundred before adding.
b. Exactly how many fish did the fish market sell altogether?
c. Is your answer reasonable? Compare your estimate from part (a) to your answer from part (b).
Explain your reasoning.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 17 © Great Minds PBC 143 17
2. A museum has 273 Spanish stamps. It has 829 more French stamps than Spanish stamps. It has 605 Italian stamps.
a. About how many stamps does the museum have from all three countries? Round each number to the nearest hundred to find your estimate.
b. Exactly how many stamps does the museum have from all three countries?
c. Determine whether your answer in part (b) is reasonable. Use your estimate from part (a) to explain.
4 ▸ M1 ▸ TD ▸ Lesson 17 EUREKA MATH2 New York Next Gen © Great Minds PBC 144 PROBLEM SET
3. A national park had 17,842 visitors in December 2019. There were 9,002 more visitors in December 2018 than in December 2019.
How many visitors did the park have in December 2018 and 2019 combined? Is your answer reasonable? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 17 © Great Minds PBC 145 PROBLEM SET
4. Casey has 3,746 baseball cards. Jayla has 1,578 more baseball cards than Casey.
Zara has 1,096 more baseball cards than Casey. How many baseball cards do they have altogether?
Is your answer reasonable? Explain.
4 ▸ M1 ▸ TD ▸ Lesson 17 EUREKA MATH2 New York Next Gen © Great Minds PBC 146 PROBLEM SET
Name
Use the Read–Draw–Write process to solve the problem.
Date
An ice cream company sold their product and earned money.
• They earned $7,228 in January.
• They earned $2,999 more in February than in January.
• They earned the same amount in March as they did in February.
How much money did the ice cream company earn altogether? Is your answer reasonable? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 17 © Great Minds PBC 147 17
ones
tens
hundreds
thousands
ten thousands
hundred thousands
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 18 ▸ Place Value Chart to Hundred Thousands © Great Minds PBC 149
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 18 © Great Minds PBC 151 18 Name Date Subtract
1. 8, 4, 63 6 – 602 2. 8, 4, 63 16 –6 02 1 3. 24 7, 5, 6 –5 18 4. 7 24 5, – 534 5. 6 00 7, – 580 6. 7, 0 26 –5 4, 02 7. 34,750 − 25,740 8. 541,837 − 204,717 9. 319,926 − 222,506
by using the standard algorithm.
Use the Read–Draw–Write process to solve each problem.
10. The sum of two numbers is 25,286. One number is 4,983. What is the other number?
11. Mount Everest is the highest mountain on Earth. It has a height of 29,029 feet. Denali is the highest mountain in the United States. It has a height of 20,310 feet. How many feet higher than Denali is Mount Everest?
12. There are 105,894 people at a football game. 31,792 of them are children and the rest are adults. How many adults are at the football game?
4 ▸ M1 ▸ TD ▸ Lesson 18 EUREKA MATH2 New York Next Gen © Great Minds PBC 152 PROBLEM SET
Subtract by using the standard algorithm.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 18 © Great Minds PBC 153 18 Name Date
1. 2 5 4, 9 7 1 2, 1 2. 3, 4 2 22 5 1, 11 0 –
73,658
8,052
3.
−
Sprint
Write the sum.
1. 300 + 500
2. 30,000 + 20,000
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ Sprint ▸ Add in Standard Form © Great Minds PBC 155
Number Correct:
4 ▸ M1 ▸ Sprint ▸ Add in Standard Form EUREKA MATH2 New York Next Gen © Great Minds PBC 156
A
Write the sum. 1. 1 + 2 2. 2 + 4 3. 3 + 6 4. 4 + 6 5. 10 + 30 6. 20 + 50 7. 30 + 60 8. 40 + 60 9. 100 + 200 10. 200 + 400 11. 300 + 600 12. 400 + 600 13. 1,000 + 3,000 14. 2,000 + 5,000 15. 3,000 + 6,000 16. 4,000 + 6,000 17. 5,000 + 5,000 18. 10,000 + 20,000 19. 20,000 + 40,000 20. 30,000 + 60,000 21. 40,000 + 60,000 22. 50,000 + 50,000 23. 100 + 200 24. 1,000 + 4,000 25. 10,000 + 60,000 26. 100,000 + 800,000 27. 700 + 200 28. 5,000 + 2,000 29. 30,000 + 20,000 30. 600,000 + 200,000 31. 300 + 700 32. 7,000 + 3,000 33. 30,000 + 70,000 34. 700,000 + 300,000 35. 10 + 20 36. 10 + 30 37. 90 + 10 38. 90 + 30 39. 200 + 800 40. 500 + 800 41. 6,000 + 4,000 42. 6,000 + 8,000 43. 500,000 + 500,000 44. 500,000 + 700,000
Number Correct: Improvement:
B© Great Minds PBC 158 4 ▸ M1 ▸ Sprint ▸ Add in Standard Form
MATH2 New York Next Gen
EUREKA
Write the sum. 1. 1 + 1 2. 2 + 3 3. 3 + 6 4. 4 + 6 5. 10 + 20 6. 20 + 40 7. 30 + 60 8. 40 + 60 9. 100 + 100 10. 200 + 300 11. 300 + 600 12. 400 + 600 13. 1,000 + 2,000 14. 2,000 + 4,000 15. 3,000 + 6,000 16. 4,000 + 6,000 17. 5,000 + 5,000 18. 10,000 + 10,000 19. 20,000 + 30,000 20. 30,000 + 60,000 21. 40,000 + 60,000 22. 50,000 + 50,000 23. 100 + 100 24. 1,000 + 3,000 25. 10,000 + 50,000 26. 100,000 + 700,000 27. 600 + 200 28. 4,000 + 2,000 29. 20,000 + 20,000 30. 500,000 + 200,000 31. 700 + 300 32. 3,000 + 7,000 33. 70,000 + 30,000 34. 300,000 + 700,000 35. 10 + 10 36. 10 + 20 37. 90 + 10 38. 90 + 20 39. 200 + 800 40. 400 + 800 41. 6,000 + 4,000 42. 6,000 + 7,000 43. 500,000 + 500,000 44. 500,000 + 600,000
ones
tens
hundreds
thousands
ten thousands
hundred thousands
© Great Minds PBC 159 EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 19 ▸ Place Value Chart to Hundred Thousands
by using the standard algorithm.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 19 © Great Minds PBC 161 19 Name Date Subtract
1. 57 0 3, 2, –4 90 2. 3, 57 0 2, – 590 3. 9 6, 87 3 4 –8,9 00 4. 3, 57 0 2, –5 92 5. 6, 97 3 9 4, –0 4 8 6. 3 1 5, 40 7 1, 4 –1 18 7. 135,070 − 41,118 8. 96,873 − 49,904 9. 135,007 − 131,118
Use the Read–Draw–Write process to solve each problem.
10. What number must be added to 7,918 to result in a sum of 14,739?
11. Building A is 1,776 feet tall. Building B is 2,717 feet tall. How many feet taller is building B than building A?
4 ▸ M1 ▸ TD ▸ Lesson 19 EUREKA MATH2 New York Next Gen © Great Minds PBC 162 PROBLEM SET
12. Mr. Endo’s company earned $79,075 in its first year. His company earned $305,608 in its second year.
How much more money did Mr. Endo’s company earn in the second year than in the first year?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 19 © Great Minds PBC 163 PROBLEM SET
Subtract by using the standard algorithm.
1. 50 9, 3 1 5, –7 61
2. 32,480 − 2,546
Use the Read–Draw–Write process to solve the problem.
3. A donut shop sold 1,232 donuts in one day. 876 of the donuts were sold in the morning. How many donuts were sold during the rest of the day?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 19 © Great Minds PBC 165 19
Date
Name
ones
tens
hundreds
thousands
ten thousands
hundred thousands
millions
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 20 ▸ Place Value Chart to Millions © Great Minds PBC 167
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 20 © Great Minds PBC 169 20 Name Date Subtract by using the standard algorithm. 1. 1 01,7 70 –9 1, 79 0 2. 1 01,7 70 –9,8 90 3. 3 53,1 67 –5,57 02 4. 3 53,1 67 –5,89 86 5. 0 7 0, 6 75 –3, 9 66 68 6. 0 0 0, 0 70 –3, 9 66 68 7. 1,000,000 − 693,000 8. 1,000,000 − 693,600
Use
9. A school raised $17,852 during its fall fundraiser and $35,106 during its spring fundraiser. How much more money did the school raise in the spring than in the fall?
10. Robin’s website had 439,028 visitors. Luke’s website had 500,903 visitors. How many more visitors did Luke’s website have than Robin’s?
4 ▸ M1 ▸ TD ▸ Lesson 20 EUREKA MATH2 New York Next Gen © Great Minds PBC 170 PROBLEM SET
the Read–Draw–Write process to solve each problem.
11. A book company sells 306,428 copies of a new book. The company’s goal is to sell 1 million copies.
How many more copies does the company need to sell to reach the goal?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 20 © Great Minds PBC 171 PROBLEM SET
Name
1. Subtract.
Date
956,204 − 780,169
Use the Read–Draw–Write process to solve the problem.
2. A construction company is building a brick school. 100,000 bricks were delivered. The company uses 15,631 bricks during the first day. How many bricks are left?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 20 © Great Minds PBC 173 20
Name Date
Use the Read–Draw–Write process to solve each problem.
1. A farmer sold 16,308 pounds of corn on Monday. She sold 27,062 pounds of corn on Tuesday. She sold some more corn on Wednesday. In all, she sold 73,940 pounds of corn.
a. Estimate the number of pounds of corn the farmer sold on Wednesday. Round each value to the nearest thousand.
b. Find the number of pounds of corn the farmer sold on Wednesday.
c. Is your answer reasonable? Use your estimate from part (a) to explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 21 © Great Minds PBC 175 21
2. In June, a farmer sold 342,651 liters of milk. In July, the farmer sold 113,110 fewer liters than in June.
a. Estimate the total number of liters of milk the farmer sold in June and July. Round each value to the nearest hundred thousand.
b. How many total liters of milk did the farmer sell in June and July?
c. Is your answer reasonable? Use your estimate from part (a) to explain.
4 ▸ M1 ▸ TD ▸ Lesson 21 EUREKA MATH2 New York Next Gen © Great Minds PBC 176 PROBLEM SET
3. A tuna fishing company’s boat costs $316,875. It costs $95,300 more than the catfish company’s boat.
What is the combined cost of the tuna company’s boat and the catfish company’s boat? Is your answer reasonable? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 21 © Great Minds PBC 177 PROBLEM SET
4. A shirt company made a total of 300,000 shirts on Monday and Tuesday. On Monday, the company made 141,284 shirts.
How many more shirts did the company make on Tuesday than on Monday? Is your answer reasonable? Explain.
4 ▸ M1 ▸ TD ▸ Lesson 21 EUREKA MATH2 New York Next Gen © Great Minds PBC 178 PROBLEM SET
Name Date
Use the Read–Draw–Write process to solve the problem.
A company sold 74,002 pillows last week.
They sold 15,235 pillows on Monday. They sold 14,827 pillows on Tuesday. How many pillows did they sell during the rest of the week?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 21 © Great Minds PBC 179 21
Name Date
Use the Read–Draw–Write process to solve the problem.
1. A factory has rolls of wire.
There is 10,650 feet of blue wire.
There is 3,780 fewer feet of red wire than blue wire.
There is 1,945 fewer feet of green wire than red wire. How much wire does the factory have altogether?
© Great Minds PBC 181 EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 22 22
Use the Read–Draw–Write process to solve the problem.
2. A water park had 240,140 visitors in the spring.
There were 81,394 more visitors in the summer than in the spring.
The water park is closed in the winter.
There were 708,488 total visitors for the year.
How many visitors were there in the fall?
4 ▸ M1 ▸ TD ▸ Lesson 22 EUREKA MATH2 New York Next Gen © Great Minds PBC 182 LESSON
Name Date Use
1. A school uses 52,540 sheets of white paper. It uses 9,680 fewer sheets of blue paper than white paper. It uses 18,900 fewer sheets of yellow paper than blue paper. How many sheets of paper does the school use?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 22 © Great Minds PBC 183 22
the Read–Draw–Write
to solve each
process
problem.
2. A company sells 13,463 friendship cards and 8,029 get well cards. It sells 1,774 more wedding cards than get well cards. It sells 868 more thank you cards than friendship cards.
What was the total number of cards sold?
4 ▸ M1 ▸ TD ▸ Lesson 22 EUREKA MATH2 New York Next Gen © Great Minds PBC 184 PROBLEM SET
3. A company has 3 locations.
Location A has 29,785 employees.
Location B has 2,089 fewer employees than location A.
The company has 81,802 total employees.
How many employees are at location C?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 22 © Great Minds PBC 185 PROBLEM SET
Name
Use the Read–Draw–Write process to solve the problem.
Park A covers an area of 3,837 square kilometers.
Park A is 1,954 square kilometers larger than Park B.
Park C is 2,108 square kilometers larger than Park A.
Date
What is the total area of all three parks? Is your answer reasonable? Explain.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TD ▸ Lesson 22 © Great Minds PBC 187 22
Use the charts to complete the statements and equations.
1. 10 cm 1 cm 10 0 cm (1 m) × 10 0
2. 10 0 m10 m 1,000 m (1 km) × 1,000
1 m
1 meter is times as long as 1 centimeter.
1 m = × 1 cm 1 meter = centimeters
1 kilometer is times as long as 1 meter.
1 km = × 1 m
1 kilometer = meters Complete the conversion tables.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 23 © Great Minds PBC 189 23
Name Date
3. Meters Centimeters 1 2 5 8 9 4. Kilometers Meters 1 2 4 7 10
4 ▸ M1 ▸ TE ▸ Lesson 23 EUREKA MATH2 New York Next Gen © Great Minds PBC 190 PROBLEM SET Convert. 5. 4 m = cm 6. 14 m = cm 7. cm = 938 m 8. 6 km = m 9. 16 km = m 10. m = 527 km 11. 7 m 35 cm = cm 12. cm = 81 m 2 cm 13. 9 km 200 m = m 14. m = 13 km 94 m Add or subtract. 15. 3 m 77 cm 50 cm = 16. 6 m 83 cm + 41 cm = 17. 5 km 409 m + 2 km = 18. 8 km 46 m 300 m =
Use the Read–Draw–Write process to solve each problem.
19. James is 138 centimeters tall. A giraffe is 4 meters 5 centimeters tall. How much taller is the giraffe than James?
20. Mrs. Smith has a red ribbon and a blue ribbon. The red ribbon is 9 meters 60 centimeters long. The blue ribbon is 264 centimeters long. What is the total length of both ribbons?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 23 © Great Minds PBC 191 PROBLEM SET
21. Ray, Zara, and Shen run a combined distance of 10 kilometers. Ray runs 4,970 meters.
Zara runs 3 kilometers 98 meters. How far does Shen run?
4 ▸ M1 ▸ TE ▸ Lesson 23 EUREKA MATH2 New York Next Gen © Great Minds PBC 192 PROBLEM SET
1. Complete the conversion table.
Use the Read–Draw–Write process to solve the problem.
2. Gabe hikes a trail that is 4 kilometers 578 meters long. The next day, he hikes a trail that is 3 kilometers 154 meters long. How far did Gabe hike altogether?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 23 © Great Minds PBC 193 23 Name Date
Meters Centimeters 1 3 6 8 9
Grade 4 Mathematics Reference Sheet
Metric Conversions
1 kilogram = 1,000 grams 1 liter = 1,000 milliliters
Customary Conversions
1 yard = 3 feet 1 pound = 16 ounces
1 pint = 2 cups
1 quart = 2 pints
1 gallon = 4 quarts
Time Conversions
1 day = 24 hours
1 week = 7 days
1 year = 365 days
195 EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 24 ▸ Mathematics Reference Sheet © Great Minds PBC
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 24 © Great Minds PBC 197 24 Name Date 1. 1 L = mL 2. 1 L 500 mL = mL 3. 2 L = mL 4. 2 L 800 mL = mL 1 L 2 L 3 L Convert. 5. 6 kg 15 g = g
Use the Read–Draw–Write process to solve the problem.
6. Mrs. Smith mixes iced tea and lemonade for a party. She combines 2,250 mL of iced tea with 1 L 750 mL of lemonade. How much iced tea and lemonade does she have altogether?
Use the Read–Draw–Write process to solve the problem.
7. A bag of dog food weighs 13 kg. Eva’s dog has already eaten 11 kg 75 g of the food. How many grams of dog food are left?
4 ▸ M1 ▸ TE ▸ Lesson 24 EUREKA MATH2 New York Next Gen © Great Minds PBC 198 LESSON
Use the charts to complete the statements and equations.
Complete the conversion tables.
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 24 © Great Minds PBC 199 24 Name Date
100 g10 g 1,000 g (1 kg) × 1,000 1 g
kilogram
kilogram
2. 100 mL 10 mL 1,000 mL (1 L) × 1,000 1 mL
1.
1
is times as heavy as 1 gram. 1 kg = × 1 g 1
= grams
1 liter is times as much as 1 milliliter. 1 L = × 1 mL 1 liter = milliliters
3. Kilograms Grams 5 15 137 4. Liters Milliliters 8 18 109
4 ▸ M1 ▸ TE ▸ Lesson 24 EUREKA MATH2 New York Next Gen © Great Minds PBC 200 PROBLEM SET Convert. 5. 49 kg 256 g = g 6. g = 218 kg 709 g 7. 21 L 73 mL = mL 8. mL = 505 L 6 mL Add or subtract. 9. 4 kg 140 g + 3 kg = 10. 8 L 57 mL − 11 mL = 11. 10 kg 359 g + 7 kg 748 g = 12. 9 L 48 mL − 2 L 204 mL =
Use the Read–Draw–Write process to solve each problem.
13. The table shows the weights of 3 dogs. What is the difference in weight between the heaviest dog and lightest dog? Dog
14. Amy drinks 2 L 80 mL of water. She drinks 265 mL more than Oka. How much water does Oka drink?
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 24 © Great Minds PBC 201 PROBLEM SET
Weight Spot 24
Duke 2,458
24
kg 9 g
g Teddy
kg 50 g
15. A baker has 50 kilograms of flour. He uses 19 kilograms 50 grams for cupcakes and 7,860 grams for pretzels. He uses the rest for bread. How much flour does the baker use for bread?
4 ▸ M1 ▸ TE ▸ Lesson 24 EUREKA MATH2 New York Next Gen © Great Minds PBC 202 PROBLEM SET
1. Complete the conversion table. Use the reference sheet if needed.
2. Convert. 5 L 375 mL = mL
EUREKA MATH2 New York Next Gen 4 ▸ M1 ▸ TE ▸ Lesson 24 © Great Minds PBC 203 24 Name Date
Kilograms Grams 3 12 27
Use the Read–Draw–Write process to solve the problem.
3. A watermelon weighs 8 kilograms 749 grams. Another watermelon weighs 10 kilograms 239 grams. What is the difference in weight between the two watermelons?
4 ▸ M1 ▸ TE ▸ Lesson 24 EUREKA MATH2 New York Next Gen © Great Minds PBC 204 EXIT TICKET
Credits
Great Minds® has made every effort to obtain permission for the reprinting of all copyrighted material. If any owner of copyrighted material is not acknowledged herein, please contact Great Minds for proper acknowledgment in all future editions and reprints of this module.
All United States currency images Courtesy the United States Mint and the National Numismatic Collection, National Museum of American History.
Cover, Frank Stella (b. 1936), Tahkt-I-Sulayman Variation II, 1969, acrylic on canvas. Minneapolis Institute of Arts, MN. Gift of Bruce B. Dayton/Bridgeman Images. © 2020 Frank Stella/Artists Rights Society (ARS), New York; All other images are the property of Great Minds.
For a complete list of credits, visit http://eurmath.link/media-credits.
205 © Great Minds PBC EUREKA MATH2 New York Next Gen 4 ▸ M1
