FREE AIME Number Theory Questions and Answers
What is the smallest positive integer 𝑥 such that 𝑥 ≡ 2 (mod 3) and 𝑥 ≡ 3 (mod5)?
To find 𝑥 we solve the system of congruences. Starting with x=3k+2, we substitute into the second congruence 3k+2 ≡ 3(mod5), giving 3𝑘 ≡ 1(mod5).
Solving for 𝑘, we find 𝑘 ≡ 2(mod5), so 𝑘 = 5m+2. Substituting back, 𝑥 = 3(5m+2)+2=15m+8, and the smallest positive 𝑥 is 8.
If 𝑎 and 𝑏 are relatively prime, which of the following statements is true?
Relatively prime numbers have a GCD of 1, meaning they share no common factors other than 1.
What is the greatest common divisor (GCD) of 252 and 198?
To find the GCD, we can use the Euclidean algorithm. We divide 252 by 198, then 198 by the remainder, and repeat until the remainder is 0. The GCD is the last non-zero remainder.
How many positive divisors does the number 360 have?
The prime factorization of 360 is 22 ⋅ 32 ⋅ 5 The number of divisors is (3+1)(2+1)(1+1)=4×3×2=24.
Find the least positive integer 𝑛 such that 𝑛 is congruent to 1 modulo 4, 2 modulo 5, and 3 modulo 6.
We need to solve the system of congruences. Let 𝑛 = 4k+1. Substituting into the second congruence, 4k+1≡2 (mod5), we get 4𝑘 ≡ 1 (mod5). Since 4 and 5 are coprime, we find 𝑘 (mod5), so 𝑘 = 5m+4.
Substituting into the third congruence, 𝑛 = 4(5m+4)+1=20m+17, we solve 20m+17 ≡ 3(mod6), giving 20m ≡ −14 ≡ 4(mod6). Thus 2m ≡ 2(mod3), so 𝑚 ≡ 1 (mod3). The smallest positive 𝑚 is 1, so 𝑘 = 5(3p+1)+4. Substituting back, we get 𝑛 = 20×3×p+17, and the smallest positive 𝑛 is 58.