determine conditions on integers a and b for which ab is even. then prove that the...

Prove: Let a and b be integers. Prove that integers a and b are both even...

Prove: Let a and b be integers. Prove that integers a and b are both even or odd if and only if 2/(a-b)

4. Let a, b, c be integers. (a) Prove if gcd(ab, c) = 1, then gcd(a,...

4. Let a, b, c be integers. (a) Prove if gcd(ab, c) = 1, then gcd(a, c) = 1 and gcd(b, c) = 1. (Hint: use the GCD characterization theorem.) (b) Prove if gcd(a, c) = 1 and gcd(b, c) = 1, then gcd(ab, c) = 1. (Hint: you can use the GCD characterization theorem again but you may need to multiply equations.) (c) You have now proved that “gcd(a, c) = 1 and gcd(b, c) = 1 if and...

Prove by contradiction that: For all integers a and b, if a is even and b...

Prove by contradiction that: For all integers a and b, if a is even and b is odd, then 4 does not divide (a^2+ 2b^2).

prove that if n is composite then there are integers a and b such that n...

prove that if n is composite then there are integers a and b such that n divides ab, but n does not divide either a or b.

prove that the sum of two odd integers is even

prove that the sum of two odd integers is even

Prove that the cardinality of of 2Z (the set of even integers) is ℵ0.

Prove that the cardinality of of 2Z (the set of even integers) is ℵ0.

1)Let ? be an integer. Prove that ?^2 is even if and only if ? is...

1)Let ? be an integer. Prove that ?^2 is even if and only if ? is even. (hint: to prove that ?⇔? is true, you may instead prove ?: ?⇒? and ?: ? ⇒ ? are true.) 2) Determine the truth value for each of the following statements where x and y are integers. State why it is true or false. ∃x ∀y x+y is odd.

(a) If a and b are positive integers, then show that lcm(a, b) ≤ ab. (b)...

(a) If a and b are positive integers, then show that lcm(a, b) ≤ ab. (b) If a and b are positive integers, then show that lcm(a, b) is a multiple of gcd(a, b).

If for integers a, b we define a ∗ b = ab + 1, then: (a)...

If for integers a, b we define a ∗ b = ab + 1, then: (a) The operation ∗ is commutative ? (b) The operation ∗ is associative ? Modern Algebra

If for integers a, b we define a ∗ b = ab + 1, then: (a)...

If for integers a, b we define a ∗ b = ab + 1, then: (a) The operation ∗ is commutative ? (b) The operation ∗ is associative ? Modern Abstract Algebra, please explain, thanx