Prove or deprove the following sentences: a . ? – ? = ? ∩ ? b....

Prove the following two statements. a. |b| < a if and only if -a < b...

Prove the following two statements. a. |b| < a if and only if -a < b < a b. |a - b| < c if and only if b - c < a < b + c

Prove the following: • A'∩(A∪B)=A'∩B • A'∪(A∩B) = A'∪B • if A ⊆ B then B...

Prove the following: • A'∩(A∪B)=A'∩B • A'∪(A∩B) = A'∪B • if A ⊆ B then B ⊆ A • A−(B−A)=A

Prove the following identity on languages A, B, C: A(B ∪ C) = AB ∪ AC...

Prove the following identity on languages A, B, C: A(B ∪ C) = AB ∪ AC Find a counterexample to the following identity on languages A, B: A* ∩ B* = (A∩B)*

Prove the following using Field Axioms of Real Numbers. prove (b^(−1))^−1=b

Prove the following using Field Axioms of Real Numbers. prove (b^(−1))^−1=b

(7) Prove the following statements. (c) If A is invertible and similar to B, then B...

(7) Prove the following statements. (c) If A is invertible and similar to B, then B is invertible and A−1 is similar to B−1 . (d) The trace of a square matrix is the sum of the diagonal entries in A and is denoted by tr A. It can be verified that tr(F G)=tr(GF) for any two n × n matrices F and G. Prove that if A and B are similar, then tr A = tr B

8. Let a, b be integers. (a) Prove or disprove: a|b ⇒ a ≤ b. (b)...

8. Let a, b be integers. (a) Prove or disprove: a|b ⇒ a ≤ b. (b) Find a condition on a and/or b such that a|b ⇒ a ≤ b. Prove your assertion! (c) Prove that if a, b are not both zero, and c is a common divisor of a, b, then c ≤ gcd(a, b).

Prove: Let (a,b,c) be a primitive pythagorean triple. then we have the following 1. gcd(c-b, c+b)...

Prove: Let (a,b,c) be a primitive pythagorean triple. then we have the following 1. gcd(c-b, c+b) =1 2. c-b and c+b are squares

Consider subsets A, B ⊆ X and C ⊆ Y . Prove the following equality. (Argue...

Consider subsets A, B ⊆ X and C ⊆ Y . Prove the following equality. (Argue straight from the definitions – don’t use any results.) (A ∪ B) × C = (A × C) ∪ (B × C)

Prove that for all sets A, B, C, A ∩ (B ∩ C) = (A ∩...

Prove that for all sets A, B, C, A ∩ (B ∩ C) = (A ∩ B) ∩ C Prove that for all sets A, B, A \ (A \ B) = A ∩ B.

Prove the following statement: Suppose that (a, b),(c, d),(m, n),(pq,) ∈ S. If (a, b) ∼...

Prove the following statement: Suppose that (a, b),(c, d),(m, n),(pq,) ∈ S. If (a, b) ∼ (c, d) and (m, n) ∼ (p, q) then (an + bm, bn) ∼ (cq + dp, pq).