For n ∈ Z, n is even if and only if n 2 is even

Show that Z/2Z × Z/nZ is cyclic if and only if n is even. Abstract Algebra

Show that Z/2Z × Z/nZ is cyclic if and only if n is even. Abstract Algebra

(b) If n is an arbitrary element of Z, prove directly that n is even iff...

(b) If n is an arbitrary element of Z, prove directly that n is even iff n + 1 is odd. iff is read as “if and only if”

Definition of Even: An integer n ∈ Z is even if there exists an integer q...

Definition of Even: An integer n ∈ Z is even if there exists an integer q ∈ Z such that n = 2q. Definition of Odd: An integer n ∈ Z is odd if there exists an integer q ∈ Z such that n = 2q + 1. Use these definitions to prove the following: Prove that zero is not odd. (Proof by contradiction)

For all x∈Z, x is even if and only if x^3 is even.

For all x∈Z, x is even if and only if x^3 is even.

Let n be an even integer. Prove that Dn/Z(Dn) is isomorphic to D(n/2). Prove this using...

Let n be an even integer. Prove that Dn/Z(Dn) is isomorphic to D(n/2). Prove this using the First Isomorphism Theorem

Let x, y ∈Z. Prove that (x+1)y^2 is even if and only if x is odd...

Let x, y ∈Z. Prove that (x+1)y^2 is even if and only if x is odd and y is even.

Let n ∈ Z. Show that 2 | (n4 − 7) if and only if 4...

Let n ∈ Z. Show that 2 | (n4 − 7) if and only if 4 | (n2 + 3).

3. Prove by contrapositive: Let n ∈ N. If n^3−5n−10>0,then n ≥ 3. 4. Prove: Letx∈Z....

3. Prove by contrapositive: Let n ∈ N. If n^3−5n−10>0,then n ≥ 3. 4. Prove: Letx∈Z. Then5x−11 is even if and only if x is odd. 4. Prove: Letx∈Z. Then 5x−11 is even if and only if x is odd.

Let a,b ∈ Z. Prove that a−b is even if and only if x and y...

Let a,b ∈ Z. Prove that a−b is even if and only if x and y are of the same parity.

Prove the following: Let n∈Z. Then n2 is odd if and only if n is odd.

Prove the following: Let n∈Z. Then n2 is odd if and only if n is odd.