Let △ ??? be a triangle. Prove that ? = 2? if and only if △...

Let triangle ABC be a triangle with excenters Ia, Ib, and Ic. Assume that triangle IaIbIc...

Let triangle ABC be a triangle with excenters Ia, Ib, and Ic. Assume that triangle IaIbIc is equilateral and show triangle ABC is equilateral.

Let △ ??? be a triangle with centroid ? and medians ??′, ??′, and ??′. Prove...

Let △ ??? be a triangle with centroid ? and medians ??′, ??′, and ??′. Prove that the six triangles △ ??′?, △ ???′, △ ??′?, △ ???′, △ ??′?, and △ ???′ all have equal areas. Please prove with an image and numbered style

Prove: That in an equilateral triangle the distances from a point are always the same value

Prove: That in an equilateral triangle the distances from a point are always the same value

Problem 2: (i) Let a be an integer. Prove that 2|a if and only if 2|a3....

Problem 2: (i) Let a be an integer. Prove that 2|a if and only if 2|a3. (ii) Prove that 3√2 (cube root) is irrational. Problem 3: Let p and q be prime numbers. (i) Prove by contradiction that if p+q is prime, then p = 2 or q = 2 (ii) Prove using the method of subsection 2.2.3 in our book that if p+q is prime, then p = 2 or q = 2 Proposition 2.2.3. For all n ∈...

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.

2)      Let a, b and c be any integers that form a perfect triangle, i.e. satisfy...

2)      Let a, b and c be any integers that form a perfect triangle, i.e. satisfy the relationship . Prove that at least one of the three integers must be even.

Let O be the center of circumscribed circle of ABC triangle. Let a, b, c be...

Let O be the center of circumscribed circle of ABC triangle. Let a, b, c be the vectors pointing from O to the vertexes. Let M be the endpoint of a + b + c measured from O. Prove that M is the orthocenter of ABC triangle.

Let 4ABC be an isosceles triangle, where the congruent sides are AB and AC. Let M...

Let 4ABC be an isosceles triangle, where the congruent sides are AB and AC. Let M and N denote points on AB and AC respectively such that AM ∼= AN. Let H denote the intersection point of MC with NB. Prove that the triangle 4MNH is isosceles

Prove that equilateral triangles exist in neutral geometry (that is, describe a construction that will yield...

Prove that equilateral triangles exist in neutral geometry (that is, describe a construction that will yield an equilateral triangle). note that all the interior angles of an equilateral triangle will be congruent, but you don’t know that the measures of those interior angles is 60◦.Also, not allowed to use circles.

Let A be square matrix prove that A^2 = I if and only if rank(I+A)+rank(I-A)=n

Let A be square matrix prove that A^2 = I if and only if rank(I+A)+rank(I-A)=n