A⋃(B⋂C)= (A⋃B) ∩(A⋃C)

for any sets A,B,C, prove that A∩(B⊕C)=(A∩B)⊕(B∩C)

for any sets A,B,C, prove that A∩(B⊕C)=(A∩B)⊕(B∩C)

Let L be a lattice. Show that a∨(b∧c)≼(a∨b)∧(a∨b) (a∧b)∨(a∧c)≼a∧(b∨c) For all a,b,c ϵ L.

Let L be a lattice. Show that a∨(b∧c)≼(a∨b)∧(a∨b) (a∧b)∨(a∧c)≼a∧(b∨c) For all a,b,c ϵ L.

Let A,B and C be sets, show(Prove) that (A-B)-C = (A-C)-(B-C).

Let A,B and C be sets, show(Prove) that (A-B)-C = (A-C)-(B-C).

Consider parents with the following genotypes: A/A ; B/b ; c/c A/a ; B/b ; C/c...

Consider parents with the following genotypes: A/A ; B/b ; c/c A/a ; B/b ; C/c How many different gametes are possible from each parent? How many different genotypes are possible in offspring of these individuals? How many different phenotypes are possible in offspring of these individuals (assume complete dominance for all genes)?

If A, B and C are sets, then (A − B) ∪ (A − C) =...

If A, B and C are sets, then (A − B) ∪ (A − C) = A − (B ∪ C)

Prove that A∩(B∩Cc)=(A∩B)∩(A∩C)c . Is the equality A∪B∩Cc=(A∪B)∩(A∪C)c always true?

Prove that A∩(B∩Cc)=(A∩B)∩(A∩C)c . Is the equality A∪B∩Cc=(A∪B)∩(A∪C)c always true?

Let [a],[b],[c] be a subset of Zn. Show that if [a]+[b]=[a]+[c], then [b]=[c].

Let [a],[b],[c] be a subset of Zn. Show that if [a]+[b]=[a]+[c], then [b]=[c].

Given A*B*C and A*C * D. Prove that B * C * D and A* B...

Given A*B*C and A*C * D. Prove that B * C * D and A* B * D. . .

Consider the statement that min(a, min(b, c)) = min(min(a, b), c) whenever a, b, and c...

Consider the statement that min(a, min(b, c)) = min(min(a, b), c) whenever a, b, and c are real numbers. Identify the set of cases that are required to prove the given statement using proof by cases. Multiple Choice. Choose correct one. a ≤ b ≤ c, a ≤ c ≤ b, b ≤ a ≤ c, b ≤ c ≤ a, c ≤ a ≤ b, c ≤ b ≤ a a>b>c, a>c>b, b>a>c, b>c>a, c>a>b, c>b>a.a>b>c, a>c>b, b>a>c, b>c>a,...

Show 3 | (a − b)(b − c)(c − d)(a − c)(b − d)(a − d)...

Show 3 | (a − b)(b − c)(c − d)(a − c)(b − d)(a − d) knowing a,b,c,d are arbitrary integers that are positive.