 # Worksheet on Number in Expanded Form | Writing Numbers in Expanded Form Worksheets

If you are looking for a worksheet on numbers in expanded form, You have reached the correct page. You can also use these extra questions like expanded form with integers. Follow the detailed steps of writing numbers in expanded form worksheets for grade 2. Follow the below sections to know the models and questions of the expanded forms.

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## Expanded Form Worksheets with Answers

Problem 1:
Write 14,897 in the expanded form?

Solution:

As given in the question,
The number is 14,897
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
7 – ones
9 – tens
8 – hundreds
4 – thousands
1 – ten thousand
We write the numbers as
7 – 7 * 1
9 – 9 * 10
8 – 8 * 100
4 – 4 * 1000
1 – 1 * 10000
The expansion of the number is
(7 * 1) + (9* 10) + (8 * 100) + (4 * 1000) + (1 * 10000)
7 + 90 + 800 + 4000 + 10000
Therefore, the expanded form of the number is 14, 897 is 7 + 90 + 800 + 4000 + 10000

Problem 2:
Write the number 9,7452 in the expanded form?

Solution:

As given in the question,
The number is 9,7452
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
2 – ones
5 – tens
4 – hundreds
7 – thousands
9 – ten thousand
We write the numbers as
2 – 2 * 1
5 – 5 * 10
4 – 4 * 100
7 – 7 * 1000
9 – 9 * 10000
The expansion of the number is
(2* 1) + (5 * 10) + (4 * 100) + (7 * 1000) + (9 * 10000)
2 + 50 + 400 + 7000 + 90000
Therefore, the expanded form of the number is 2 + 50 + 400 + 7000 + 90000

Problem 3:
Write the number 54276 in the expanded form?

Solution:

As given in the question,
The number is 54276
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
6 – ones
7 – tens
2 – hundreds
4 – thousands
5 – ten thousand
We write the numbers as
6 – 6 * 1
7 – 7 * 10
2 – 2 * 100
4 – 4 * 1000
5 – 5 * 10000
The expansion of the number is
(6 * 1) + ( 7 * 10) + (2 * 100) + (4 * 1000) + (5 * 10000)
6 + 70 + 200 + 4000 + 50000
Therefore, the expanded form of the number is 6 + 70 + 200 + 4000 + 50000

Problem 4:
Write the number 827173 in the expanded form?

Solution:

As given in the question,
The number is 827173
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
3 – ones
7 – tens
1 – hundreds
7 – thousands
2 – ten thousand
8 – lakhs
We write the numbers as
3 – 3 * 1
7 – 7 * 10
1 – 1 * 100
7 – 7 * 1000
2 – 2 * 10000
8 – 8 * 800000
The expansion of the number is
(3 * 1) + (7 * 10) + (1 * 100) + (7 * 1000) + (2 * 10000) + (8 * 100000)
3 + 70 + 100 + 7000 + 20000 + 800000
Therefore, the expanded form of the number 82717 is 3 + 70 + 100 + 7000 + 20000 + 800000

Problem 5:
Write the number 682472 in the expanded form?

Solution:

As given in the question,
The number is 682472
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
2 – ones
7 – tens
4 – hundreds
2 – thousands
8 – ten thousand
6 – lakhs
We write the numbers as
2 – 2 * 1
7 – 7 * 10
4 – 4 * 100
2 – 2 * 1000
8 – 8 * 10000
6 – 6 * 100000
The expansion of the number is
(2 * 1) + (7* 10) + (4* 100)+ (2*1000) + (8 * 10000) + (6 * 100000)
2 + 70 + 400 + 2000 + 80000 + 600000
Therefore, the expanded form of the number 682472 is 2 + 70 + 400 + 2000 + 80000 + 600000

Problem 6:
Write the number 5129693 in the expanded form?

Solution:

As given in the question,
The number is 5129693
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
3 – ones
9 – tens
6 – hundreds
9 – thousands
2 – ten thousand
1 – lakhs
5 – ten lakhs
We write the numbers as
3 – 3 * 1
9 – 9 * 10
6 – 6 * 100
9 – 9 * 1000
2 – 2 * 10000
1 – 1 * 100000
5 – 5 * 1000000
The expansion of the number is
(3 * 1) + (9 * 10) + (6 * 100) + (9 * 1000) + (2 * 10000) + (1 * 100000) + (5 * 1000000)
3 + 90 + 9000 + 20000 + 100000 + 5000000
Therefore, the expanded form of the number 5129693 is 3 + 90 + 9000 + 20000 + 100000 + 5000000

Problem 7:
Write the number 146.963 in the expanded form?

Solution:

As given in the question,
The number is 146.963
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
3 – thousandths
6 – hundredths
9 – tenths
6 – ones
4 – tens
1 – hundreds
We write the numbers as
3 – 3 * $$\frac { 1 }{ 1000 }$$
6 – 6 * $$\frac { 1 }{ 100 }$$
9 – 9 * $$\frac { 1 }{ 10 }$$
6 – 6 * 1
4 – 4 * 10
1 – 1 * 100
The expansion of the number is
(1 * 100) + (4 * 10) + (6 * 1) + 9 * $$\frac { 1 }{ 10 }$$ + 6 * $$\frac { 1 }{ 100 }$$ + $$\frac { 1 }{ 1000 }$$
100 + 40 + 6 + 0.9 + 0.06 + 0.003
Therefore, the expanded form of the number 146.963 is 100 + 40 + 6 + 0.9 + 0.06 + 0.003

Problem 8:
Write the number 58519 in the expanded form?

Solution:

As given in the question,
The number is 58519
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
9 – ones
1 – tens
5 – hundreds
8 – thousands
5 – ten thousand
We write the numbers as
9 – 9 * 1
1 – 1 * 10
5 – 5 * 100
8 – 8 * 1000
5 – 5 * 10000
The expansion of the number is
(9 * 1) + (1 * 10) + (5 * 100) + (8 * 1000) + (5 * 10000)
9 + 10 + 500 + 8000 + 50000
Therefore, the expanded form of the number 58519 is 9 + 10 + 500 + 8000 + 50000

Problem 9:
Write the number 123.456 in the expanded form?

Solution:

As given in the question,
The number is 123.456
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
6 – thousandths
5 – hundredths
4 – tenths
3 – ones
2 – tens
1 – hundreds
We write the numbers as
6 – 6 * $$\frac { 1 }{ 1000 }$$
5 – 5 * $$\frac { 1 }{ 100 }$$
4 – 4 * $$\frac { 1 }{ 10 }$$
3 – 3 * 1
2 – 2 * 10
1 – 1 * 100
The expansion of the number is
(1 * 100) + (2 * 10) + (3 * 1) + (4 * $$\frac { 1 }{ 10 }$$) + ($$\frac { 1 }{ 100 }$$) + ($$\frac { 1 }{ 1000 }$$)
100 + 20 + 3 + $$\frac { 4 }{ 10 }$$ + $$\frac { 5 }{ 100 }$$ + $$\frac { 6 }{ 1000 }$$
Therefore, the expanded form of the number 123.456 is 100 + 20 + $$\frac { 4 }{ 10 }$$ + $$\frac { 5 }{ 100 }$$ + $$\frac { 6 }{ 1000 }$$
The expanded form in the decimal format = 100 + 20 + 0.4 + 0.05 + 0.006

Problem 10:
Write the number 181.813 in the expanded form?

Solution:

As given in the question,
The number is 181.813
To write the number in its expanded form, we have to find the units of the numbers and divide them by their multiple.
The units place of numbers are
3 – thousandths
1 – hundredths
8 – tenths
1 – ones
8 – tens
1 – hundreds
We write the numbers as
3 – 3 * $$\frac { 1 }{ 1000 }$$
1 – 1 * $$\frac { 1 }{ 100 }$$
8 – 8 * $$\frac { 1 }{ 10 }$$
1 – 1 * 1
8 – 8 * 10
1 – 1 * 100
The expansion of the number is
(1 * 100) + (8 * 10) + (1 * 1) + (8 * $$\frac { 1 }{ 10 }$$) + (1 * $$\frac { 1 }{ 100 }$$) + (3 * $$\frac { 1 }{ 1000 }$$)
100 + 80 + 1 + $$\frac { 8 }{ 10 }$$ + $$\frac { 3 }{ 100 }$$ + $$\frac { 1 }{ 1000 }$$
Therefore, the expanded form of the number 181.813 is 100 + 80 + 1 + $$\frac { 8 }{ 10 }$$ + $$\frac { 3 }{ 100 }$$ + $$\frac { 1 }{ 1000 }$$
The expanded form in the decimal format = 100 + 80 + 1 + 0.8 + 0.03 + 0.001

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