Smith Unit 1 Review Grade 3

Writing large numbers in expanded form using exponents

Approximation and rounding of large numbers

Multiples and Factors

Prime Factorization using exponents

Order of operations

100

245000

(2x10⁵) + (4x10⁴) + (5 x 10³)

100

How many thousands are there in 32,456

100

The Greatest Common Factor of 24 and 64

100

Write the prime factorization of 120

2³X3x5

100

(4+7)²-3x21=

200

1,000,203

(1x10⁶) + (2x10²) + (3x10⁰)

200

3,602,540 rounded to the nearest thousand

3,603,000

200

This is the 5th multiple of 16

200

The prime factorization of 72

2³x3²

200

8x6-3²x5=

300

The smallest number that, when rounded to the nearest hundred, is 16500

16450

300

65,050,994 rounded to the nearest 100 thousand

65,100,000

300

The greatest common factor of 36, 72, 108

300

The prime factorization is 2²x5³

500

300

9+9x3-9/3+7=

400

The smallest number of busses that can fit up to 8 passengers (equal number of adults in each car and equal number of students in each vehicle) that can hold 32 teachers and 94 students

16 busses

400

Round 2,350 and 64,370,649 to the nearest thousand and find the sum

2000 + 64371000 = 64,373,000

400

The sum of the factors of 6 is the second multiple of this number

400

The prime factorization of 144

2⁴x3²

400

13+7-6x2+(4+2)²=

500

6 billion + 49 ten thousands + 12 hundred

6,000,491,200

(6x10⁹) + (4 x 10⁵) + (9 x 10⁴) + (1 x 10³) + (2 x 10²)

500

The largest number that can be rounded to 1 million when rounding to the nearest 100 thousand

1,049,999

500

The factors of 280

1,2,4,5,7,8,10,14,20,28,35,40,56,70,140,280

500

The prime factorization of 87

3x29

500

3+4/2 + 6x8/2 -1=