Let O ∈ (AB) and C /∈ AB. Prove that there is a point D on...

Let A, O, B be collinear with O ∈ (AB), C, O, D also collinear with...

Let A, O, B be collinear with O ∈ (AB), C, O, D also collinear with O ∈ (CD) E in the interior of the ∠AOC and F in the interior of the ∠BOD such that O ∈ (EF). If (OE is the bisector of the ∠AOC prove that (OF is the bisector of the ∠BOD

given a line AB and a point C not on AB, prove that there is a...

given a line AB and a point C not on AB, prove that there is a Ray AD such that AC is between AB and AD

prove that if C is an element of ray AB and C is not equal to...

prove that if C is an element of ray AB and C is not equal to A, then ray AB = ray AC using any of the following corollarys 3.2.18.) Let, A, B, and C be three points such that B lies on ray AC. Then A * B * C if and only if AB < AC. 3.2.19.) If A, B, and C are three distinct collinear points, then exactly one of them lies between the other two. 3.2.20.)...

ABC is a right-angled triangle with right angle at A, and AB > AC. Let D...

ABC is a right-angled triangle with right angle at A, and AB > AC. Let D be the midpoint of the side BC, and let L be the bisector of the right angle at A. Draw a perpendicular line to BC at D, which meets the line L at point E. Prove that (a) AD=DE; and (b) ∠DAE=1/2(∠C−∠B) Hint: Draw a line from A perpendicular to BC, which meets BC in the point F

4. Let a, b, c be integers. (a) Prove if gcd(ab, c) = 1, then gcd(a,...

4. Let a, b, c be integers. (a) Prove if gcd(ab, c) = 1, then gcd(a, c) = 1 and gcd(b, c) = 1. (Hint: use the GCD characterization theorem.) (b) Prove if gcd(a, c) = 1 and gcd(b, c) = 1, then gcd(ab, c) = 1. (Hint: you can use the GCD characterization theorem again but you may need to multiply equations.) (c) You have now proved that “gcd(a, c) = 1 and gcd(b, c) = 1 if and...

Prove If segment AB = segment CD, then {A,B}={C,D}.

Prove If segment AB = segment CD, then {A,B}={C,D}.

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.

Consider a cicle with AB as diameter and P another point on the circle. Let M...

Consider a cicle with AB as diameter and P another point on the circle. Let M be the foot of the perpendicular from P to AB. Draw the circles which have AM and M B respectively as diameters, which meet AP at Q are BP are R. Prove that QR is tangent to both circles. Hint: As well as the line QR, draw in the line segments M Q and M R.

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

In neutral geometry: Let R = rl ◦rm be a rotation given by reflection in a...

In neutral geometry: Let R = rl ◦rm be a rotation given by reflection in a line m followed by reflection in a line l (m and l are distinct lines). Let O = m∩l be the fixed point of R. Let θ = m AOR(A) for some point A not equal to O. Let X be a point distinct from O on the line m and let Y be a point distinct from O on the line l. Suppose...