The triangle ABC is given by A(2;0), B(0;3), C(-5;0). Prove by calculation: The three heights intersect...

Consider the triangle ABC. Suppose that the perpendicular bisectors of line segments AB and BC intersect...

Consider the triangle ABC. Suppose that the perpendicular bisectors of line segments AB and BC intersect at point X. Prove that X is on the perpendicular bisector of line segment AC.

Given △ABC, extend sides AB and AC to rays AB and AC forming exterior angles. Let...

Given △ABC, extend sides AB and AC to rays AB and AC forming exterior angles. Let the line rA be the angle bisector ∠BAC, let line rB be the angle bisector of the exterior angle at B, and let line rC be the angle bisector of the exterior angle at C. • Prove that these three rays are concurrent; that is, that they intersect at a single point. Call this point EA • Prove that EA is the center of...

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.

Three parallel lines are such that one passes through each vertex of a triangle ABC, and...

Three parallel lines are such that one passes through each vertex of a triangle ABC, and they are not parallel to any of the triangles sides. The line through A meets BC (extended if necessary) in X, the lines through B and C meet CA and AB in Y and Z respectively. Prove that area(XYZ) = 2xArea(ABC)

Prove that given △ABC and △A′B′C′, if we have AB ≡ A′B′ and BC≡B′C′,then B<B′ if...

Prove that given △ABC and △A′B′C′, if we have AB ≡ A′B′ and BC≡B′C′,then B<B′ if and only if AC<A′C′. You cannot use measures.

Suppose in triangle ABC ma and mb are the lengthsof the medians from A and B...

Suppose in triangle ABC ma and mb are the lengthsof the medians from A and B respectively. Prove that if a≥b then ma≤mb (recall the convention that in triangle ABC, a=BC and b=AC

Triangle ABC is a right angle triangle in which ∠B = 90 degree, AB = 5...

Triangle ABC is a right angle triangle in which ∠B = 90 degree, AB = 5 units , BC = 12 units. CD and AE are the angle bisectors of ∠C and ∠A respectively which intersects each other at point I. Find the area of the triangle DIE.

Using Euclid's Propositions I.1-I.17, solve the following questions: (a) One of the angles of triangle ABC...

Using Euclid's Propositions I.1-I.17, solve the following questions: (a) One of the angles of triangle ABC is obtuse. Prove that the other two are acute. (b) Prove that the angles at the base of an isoscles triangle are acute (c) Prove that every triangle has at least one altitude that is interior to it.

Let A=(0,0), B=(1,1), C=(-1,1), A'(2,0),B'(4,0), C'(2,-2).Show that triangle ABC and triangle A'B'C' satisfy the hypothesis of...

Let A=(0,0), B=(1,1), C=(-1,1), A'(2,0),B'(4,0), C'(2,-2).Show that triangle ABC and triangle A'B'C' satisfy the hypothesis of Proposition 2.3.4 in taxicab geometry but are not congruent in it

Given ∠B below, construct the triangle △ABC with D on AC so that BD bisects ∠B...

Given ∠B below, construct the triangle △ABC with D on AC so that BD bisects ∠B and has length bd and satisfies AD/DC=4/5. Show the steps.