Round 475 to the nearest hundred.

Compare using words and symbols

1,235 _______1,325

What is the value of the six in 4,063

Estimate the sum 345 + 39. Rounded to the nearest ten.

Write a probability statement for this spinner.

Round to the 2,754 to the nearest hundred.

Write these numbers in order from LEAST to GREATEST.

2,395

2,388

2,598

Name the place and value of the four in

4,923

Ms. Guerrero has 3,012 pencils and Ms. Castro has 378 pencils.  How many pencils do they have combined?

<img data-fr-image-pasted="true" src="data:image/jpeg;base64,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

Round 2,045 to the nearest ten and the nearest hundred.

345

3,231

3,023

Put 2,782 in expanded form

Mark bought a toy that costs $3.18.  He paid with a $5 bill.  How much change did he get back?

Write a probability statement for these marbles in a a bag.