Practice · Compare place by place to bound an unknown digit · Sensim Math

Variant 1 answer: 0, 1, 2, 3, 4, 5, 6, 7, 8

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$1{,}592{,}604 > 1{,}5\square7{,}088$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 1,592,604 is greater than the boxed number.

Givens

The fixed number is 1,592,604 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 1,592,604 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

1\,5\,9\,2\,6\,0\,4 \;\text{vs}\; 1\,5\,\square\,7\,0\,8\,8

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 9 there. To keep 1,592,604 the bigger number, 9 must be at least as large as the box.

9 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 9, the compared number is 1,597,088. Comparing 1,592,604 with 1,597,088, the fixed number is < the compared one, so box = 9 fails.

1{,}592{,}604 < 1{,}597{,}088

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3, 4, 5, 6, 7, 8. The largest that works is 8, giving 1,587,088 < 1,592,604.

\square \in \{0,1,2,3,4,5,6,7,8\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3, 4, 5, 6, 7, 8

Review

With box = 8, the compared number 1,587,088 < 1,592,604 (true). With box = 9 it is 1,597,088, which is < 1,592,604. The cutoff is correct, so 0, 1, 2, 3, 4, 5, 6, 7, 8 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 2 answer: 0, 1, 2, 3, 4

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$9{,}052{,}678 > 9{,}0\square6{,}155$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 9,052,678 is greater than the boxed number.

Givens

The fixed number is 9,052,678 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 9,052,678 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

9\,0\,5\,2\,6\,7\,8 \;\text{vs}\; 9\,0\,\square\,6\,1\,5\,5

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 5 there. To keep 9,052,678 the bigger number, 5 must be at least as large as the box.

5 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 5, the compared number is 9,056,155. Comparing 9,052,678 with 9,056,155, the fixed number is < the compared one, so box = 5 fails.

9{,}052{,}678 < 9{,}056{,}155

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3, 4. The largest that works is 4, giving 9,046,155 < 9,052,678.

\square \in \{0,1,2,3,4\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3, 4

Review

With box = 4, the compared number 9,046,155 < 9,052,678 (true). With box = 5 it is 9,056,155, which is < 9,052,678. The cutoff is correct, so 0, 1, 2, 3, 4 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 3 answer: 0, 1, 2, 3

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$8{,}147{,}329 > 8{,}1\square9{,}620$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 8,147,329 is greater than the boxed number.

Givens

The fixed number is 8,147,329 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 8,147,329 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

8\,1\,4\,7\,3\,2\,9 \;\text{vs}\; 8\,1\,\square\,9\,6\,2\,0

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 4 there. To keep 8,147,329 the bigger number, 4 must be at least as large as the box.

4 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 4, the compared number is 8,149,620. Comparing 8,147,329 with 8,149,620, the fixed number is < the compared one, so box = 4 fails.

8{,}147{,}329 < 8{,}149{,}620

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3. The largest that works is 3, giving 8,139,620 < 8,147,329.

\square \in \{0,1,2,3\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3

Review

With box = 3, the compared number 8,139,620 < 8,147,329 (true). With box = 4 it is 8,149,620, which is < 8,147,329. The cutoff is correct, so 0, 1, 2, 3 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 4 answer: 0, 1, 2, 3, 4, 5, 6, 7

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$2{,}685{,}310 > 2{,}6\square7{,}444$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 2,685,310 is greater than the boxed number.

Givens

The fixed number is 2,685,310 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 2,685,310 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

2\,6\,8\,5\,3\,1\,0 \;\text{vs}\; 2\,6\,\square\,7\,4\,4\,4

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 8 there. To keep 2,685,310 the bigger number, 8 must be at least as large as the box.

8 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 8, the compared number is 2,687,444. Comparing 2,685,310 with 2,687,444, the fixed number is < the compared one, so box = 8 fails.

2{,}685{,}310 < 2{,}687{,}444

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3, 4, 5, 6, 7. The largest that works is 7, giving 2,677,444 < 2,685,310.

\square \in \{0,1,2,3,4,5,6,7\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3, 4, 5, 6, 7

Review

With box = 7, the compared number 2,677,444 < 2,685,310 (true). With box = 8 it is 2,687,444, which is < 2,685,310. The cutoff is correct, so 0, 1, 2, 3, 4, 5, 6, 7 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 5 answer: 0, 1, 2, 3, 4, 5, 6

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$3{,}271{,}045 > 3{,}2\square8{,}400$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 3,271,045 is greater than the boxed number.

Givens

The fixed number is 3,271,045 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 3,271,045 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

3\,2\,7\,1\,0\,4\,5 \;\text{vs}\; 3\,2\,\square\,8\,4\,0\,0

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 7 there. To keep 3,271,045 the bigger number, 7 must be at least as large as the box.

7 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 7, the compared number is 3,278,400. Comparing 3,271,045 with 3,278,400, the fixed number is < the compared one, so box = 7 fails.

3{,}271{,}045 < 3{,}278{,}400

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3, 4, 5, 6. The largest that works is 6, giving 3,268,400 < 3,271,045.

\square \in \{0,1,2,3,4,5,6\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3, 4, 5, 6

Review

With box = 6, the compared number 3,268,400 < 3,271,045 (true). With box = 7 it is 3,278,400, which is < 3,271,045. The cutoff is correct, so 0, 1, 2, 3, 4, 5, 6 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 6 answer: 0, 1, 2, 3, 4, 5

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$4{,}360{,}092 > 4{,}3\square8{,}517$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 4,360,092 is greater than the boxed number.

Givens

The fixed number is 4,360,092 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 4,360,092 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

4\,3\,6\,0\,0\,9\,2 \;\text{vs}\; 4\,3\,\square\,8\,5\,1\,7

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 6 there. To keep 4,360,092 the bigger number, 6 must be at least as large as the box.

6 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 6, the compared number is 4,368,517. Comparing 4,360,092 with 4,368,517, the fixed number is < the compared one, so box = 6 fails.

4{,}360{,}092 < 4{,}368{,}517

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3, 4, 5. The largest that works is 5, giving 4,358,517 < 4,360,092.

\square \in \{0,1,2,3,4,5\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3, 4, 5

Review

With box = 5, the compared number 4,358,517 < 4,360,092 (true). With box = 6 it is 4,368,517, which is < 4,360,092. The cutoff is correct, so 0, 1, 2, 3, 4, 5 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 7 answer: 0, 1, 2, 3

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$4{,}541{,}592 > 4{,}5\square6{,}719$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 4,541,592 is greater than the boxed number.

Givens

The fixed number is 4,541,592 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 4,541,592 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

4\,5\,4\,1\,5\,9\,2 \;\text{vs}\; 4\,5\,\square\,6\,7\,1\,9

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 4 there. To keep 4,541,592 the bigger number, 4 must be at least as large as the box.

4 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 4, the compared number is 4,546,719. Comparing 4,541,592 with 4,546,719, the fixed number is < the compared one, so box = 4 fails.

4{,}541{,}592 < 4{,}546{,}719

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3. The largest that works is 3, giving 4,536,719 < 4,541,592.

\square \in \{0,1,2,3\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3

Review

With box = 3, the compared number 4,536,719 < 4,541,592 (true). With box = 4 it is 4,546,719, which is < 4,541,592. The cutoff is correct, so 0, 1, 2, 3 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 8 answer: 0, 1, 2, 3, 4

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$6{,}845{,}999 > 6{,}8\square4{,}113$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 6,845,999 is greater than the boxed number.

Givens

The fixed number is 6,845,999 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 6,845,999 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

6\,8\,4\,5\,9\,9\,9 \;\text{vs}\; 6\,8\,\square\,4\,1\,1\,3

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 4 there. To keep 6,845,999 the bigger number, 4 must be at least as large as the box.

4 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 4, the compared number is 6,844,113. Comparing 6,845,999 with 6,844,113, the fixed number is > the compared one, so box = 4 works.

6{,}845{,}999 > 6{,}844{,}113

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2, 3, 4. The largest that works is 4, giving 6,844,113 < 6,845,999.

\square \in \{0,1,2,3,4\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2, 3, 4

Review

With box = 4, the compared number 6,844,113 < 6,845,999 (true). With box = 4 it is 6,844,113, which is > 6,845,999. The cutoff is correct, so 0, 1, 2, 3, 4 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 9 answer: 0, 1

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$5{,}119{,}860 > 5{,}1\square7{,}203$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 5,119,860 is greater than the boxed number.

Givens

The fixed number is 5,119,860 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 5,119,860 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

5\,1\,1\,9\,8\,6\,0 \;\text{vs}\; 5\,1\,\square\,7\,2\,0\,3

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 1 there. To keep 5,119,860 the bigger number, 1 must be at least as large as the box.

1 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 1, the compared number is 5,117,203. Comparing 5,119,860 with 5,117,203, the fixed number is > the compared one, so box = 1 works.

5{,}119{,}860 > 5{,}117{,}203

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1. The largest that works is 1, giving 5,117,203 < 5,119,860.

\square \in \{0,1\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1

Review

With box = 1, the compared number 5,117,203 < 5,119,860 (true). With box = 1 it is 5,117,203, which is > 5,119,860. The cutoff is correct, so 0, 1 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Variant 10 answer: 0, 1, 2

Find every digit $0$ to $9$ that can go in the $\square$ to make the statement true.

$7{,}430{,}556 > 7{,}4\square9{,}001$

Show solution

Understand

Find every single digit 0-9 that can replace the box so that 7,430,556 is greater than the boxed number.

Givens

The fixed number is 7,430,556 (7 digits).
The compared number has one unknown digit in the ten-thousands place.
We need 7,430,556 > the compared number.

Unknowns

All digits 0-9 that make the inequality true

Constraints

The box holds a single digit from 0 to 9.

Plan

#2 Make a Systematic List · also uses: #1 Draw a Diagram

Both numbers have the same number of digits, so I line them up place by place from the left and compare; the first place where they differ decides which is larger, which bounds the box digit. I then list every digit that fits.

Execute

#1 Draw a Diagram 4.NBT.A.2

Both numbers are 7 digits long. Compare from the highest place, moving right until a place differs.

7\,4\,3\,0\,5\,5\,6 \;\text{vs}\; 7\,4\,\square\,9\,0\,0\,1

When two numbers have the same length, you compare digit by digit from the left, exactly like reading them aloud.

#2 Make a Systematic List 4.NBT.A.2

The places to the left of the box match, so the ten-thousands place (the box) decides. The fixed number has 3 there. To keep 7,430,556 the bigger number, 3 must be at least as large as the box.

3 \;?\; \square

The leftmost place where two numbers differ is the one that decides which is larger.

#2 Make a Systematic List 4.NBT.A.2

If the box is 3, the compared number is 7,439,001. Comparing 7,430,556 with 7,439,001, the fixed number is < the compared one, so box = 3 fails.

7{,}430{,}556 < 7{,}439{,}001

If the deciding digits tie, you peek at the next place to break the tie.

#2 Make a Systematic List 4.NBT.A.2

Trying each digit 0-9 in the box, the inequality holds exactly for 0, 1, 2. The largest that works is 2, giving 7,429,001 < 7,430,556.

\square \in \{0,1,2\}

Any box digit small enough keeps the compared number below the fixed number.

Answer: 0, 1, 2

Review

With box = 2, the compared number 7,429,001 < 7,430,556 (true). With box = 3 it is 7,439,001, which is < 7,430,556. The cutoff is correct, so 0, 1, 2 are exactly the digits that work.

Guess and check (tool 6): plug each digit 0-9 into the box and compare; the inequality holds only for the listed digits.

Standards · min grade 4

4.NBT.A.2 Read and write multi-digit whole numbers and compare using symbols — Comparing two equal-length numbers place by place to bound the unknown digit.

💡 This only needs Grade 4 comparing: line the numbers up and the first place they differ tells you the answer!

Compare place by place to bound an unknown digit · 10 practice problems

Generated variants — 10

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Standards · min grade 4

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Standards · min grade 4

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Standards · min grade 4

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Standards · min grade 4

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Standards · min grade 4