A) 5 B) 4 C) 3 D) 6
A) 8 B) 9 C) 7 D) 6
A) 28 B) 32 C) 30 D) 26
A) Depends on the country B) No C) Maybe D) Yes
A) Euclid B) Pierre de Fermat C) Paul Erdős D) Carl Friedrich Gauss
A) 21 B) 19 C) 20 D) 22
A) A formula for calculating prime numbers B) A theory about irrational numbers C) A method for factoring large numbers D) Every even integer greater than 2 can be expressed as the sum of two prime numbers
A) Bernhard Riemann B) Isaac Newton C) Leonhard Euler D) Pythagoras
A) 35 B) 24 C) 30 D) 40
A) A method for solving linear equations B) An equation to find prime roots C) Every integer greater than 1 can be uniquely represented as a product of prime numbers D) A geometric proof involving prime numbers
A) They are not relevant in cryptography B) They are used for generating secure keys in encryption C) They are used for predicting weather patterns D) They are used for drawing geometric shapes
A) It is the largest prime number B) It is the only even prime number C) It has the most factors D) It is divisible by all numbers
A) 23 * 32 B) 6 * 12 C) 2 * 3 * 4 D) 9 * 8
A) A prime number that ends in 9 B) A prime number that is one less than a power of two C) A prime number that is a perfect square D) A prime number that is divisible by 2
A) Ancient Egyptians B) Ancient Greeks C) Mayans D) Romans
A) Archimedes B) Newton C) Euclid D) Pythagoras
A) 12 B) 10 C) 8 D) 6 |