If the vertices of a square are a,b,c,d, prove that the center of the square is...

A square pyramid has vertices at A (1,0,0), B (0,1,0), C (-1,0,0) and D (0,-1,0) and...

A square pyramid has vertices at A (1,0,0), B (0,1,0), C (-1,0,0) and D (0,-1,0) and E (0,0,-1). Find the angle between the face ABE and the base. Find the angle between the faces ABE and ADE.

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. . .

Suppose that A≈C and B≈D. Prove that A⊕B≈C⊕D.

Suppose that A≈C and B≈D. Prove that A⊕B≈C⊕D.

Let A, B, C and D be sets. Prove that A\B ⊆ C \D if and...

Let A, B, C and D be sets. Prove that A\B ⊆ C \D if and only if A ⊆ B ∪C and A∩D ⊆ B

Prove: If n≡3 (mod 8) and n=a^2+b^2+c^2+d^2, then exactly one of a, b, c, d is...

Prove: If n≡3 (mod 8) and n=a^2+b^2+c^2+d^2, then exactly one of a, b, c, d is even. (Hint: What can each square be modulo 8?)

Let A, B, C and D be sets. Prove that A \ B and C \...

Let A, B, C and D be sets. Prove that A \ B and C \ D are disjoint if and only if A ∩ C ⊆ B ∪ D.

(a) Prove that there does not exist a graph with 5 vertices with degree equal to...

(a) Prove that there does not exist a graph with 5 vertices with degree equal to 4,4,4,4,2. (b) Prove that there exists a graph with 2n vertices with degrees 1,1,2,2,3,3,..., n-1,n-1,n,n.

Prove that the order of complete graph on n ≥ 2 vertices is (n−1)n 2 by......

Prove that the order of complete graph on n ≥ 2 vertices is (n−1)n 2 by... a) Using theorem Ʃv∈V = d(v) = 2|E|. b) Using induction on the number of vertices, n for n ≥ 2.

Evaluate ∮C(6y−3y2+x)dx+yx3dy where C is the boundary of the parallelogram with vertices A(−1,−1),B(1,1),C(−1,2) and D(1,4)

Evaluate ∮C(6y−3y2+x)dx+yx3dy where C is the boundary of the parallelogram with vertices A(−1,−1),B(1,1),C(−1,2) and D(1,4)

(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