Primes
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Patterns and proofs
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100

This is the only even prime number.

2

100

Give the full prime factorization of 60.

2² × 3 × 5

100

True or false: every prime number greater than 2 is odd.

True

100

Find the GCF of 24 and 36.

12

100

How many total divisors does 36 have?

9:  1, 2, 3, 4, 6, 9, 12, 18, 36

200

Of 51 and 53, only one is prime. Which one, and why isn't the other?

53, 17x3=51

200

How many distinct prime factors does 210 have?

4 (2, 3, 5, and 7)

200

Primes are defined as having exactly two divisors. Explain why 1 doesn't count.

1 has only one divisor (itself), not two, so it fails the definition.

200

Find the LCM of 8 and 12.

24

200

A rectangular garden has an area of 84 sq ft. Both whole-number sides exceed 2 ft, and length ≠ width. Give one valid pair of dimensions.

For example, 6 × 14 (7 × 12 and 4 × 21 also work)

300

Find the twin prime pair (two primes differing by exactly 2) that lies between 40 and 45.

41 and 43

300

What is the smallest positive integer with exactly 3 distinct prime factors?

30 (2 × 3 × 5)

300

Name the next prime number after 97.

101

300

Two numbers have a GCF of 6 and an LCM of 72. One of them is 24. Find the other.

18, since GCF × LCM = product of the numbers: 6 × 72 ÷ 24 = 18

300

48 cookies must be split evenly into more than 1 box, with more than 1 cookie per box. What's the largest possible number of cookies per box?

24 cookies per box (2 boxes)

400

Find the only set of three primes of the form n, n+2, n+4 (three numbers each 2 apart).

3, 5, and 7

400

A number's prime factorization is 2³ × 3². How many total divisors does it have?

12, since (3+1)(2+1) = 12

400

Find the smallest number greater than 1 that leaves a remainder of 1 when divided by 2, 3, 5, and 7.

211, one more than 2×3×5×7 = 210

400

Two numbers have a GCF of 8 and an LCM of 96. One number is 32 — find the other.

24, since 8 × 96 ÷ 32 = 24

400

A number under 100 has exactly 8 factors and exactly 2 distinct prime factors. What's the largest such number?

88 = 2³ × 11, which has (3+1)(1+1) = 8 factors

500

Explain why 3, 5, 7 is the only prime triplet of that form that will ever exist.

Among any three numbers spaced 2 apart, one is always a multiple of 3. Unless that multiple of 3 is 3 itself, it can't be prime so every other attempt fails.

500

Find the smallest positive integer with exactly 12 divisors.

60 = 2² × 3 × 5, giving (2+1)(1+1)(1+1) = 12 divisors

500

Write 100 as a sum of two primes, in two different ways.

For example, 3 + 97 and 47 + 53 (several correct pairs exist)

500

Explain why no number N can satisfy both GCF(N, 18) = 6 and GCF(N, 30) = 15 at the same time.

GCF with 18 = 6 forces N to be even. GCF with 30 = 15 forces N to be odd, since 15 has no factor of 2 even though 30 does. N can't be both.

500

A locker code is the product of three different primes, each less than 20. Find the three primes that make the product as large as possible without going over 1000.

3, 17, and 19: their product is 969, the closest you can get to 1000 without exceeding it