Suppose △ABC and △A'B'C' are triangles such that line AB || to line A'B', line BC...

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.

5. Suppose that the incenter I of ABC is on the triangle’s Euler line. Show that...

5. Suppose that the incenter I of ABC is on the triangle’s Euler line. Show that the triangle is isosceles. 6. Suppose that three circles of equal radius pass through a common point P, and denote by A, B, and C the three other points where some two of these circles cross. Show that the unique circle passing through A, B, and C has the same radius as the original three circles. 7. Suppose A, B, and C are distinct...

solve the logical expression (a'b XOR ab) + a'b'c reduce to IDNF expression

solve the logical expression (a'b XOR ab) + a'b'c reduce to IDNF expression

i have the following problem boolean simplfication A'BC' + BC + AB'C' +AB'C I can do...

i have the following problem boolean simplfication A'BC' + BC + AB'C' +AB'C I can do it two different ways factor AB' out of the 3rd and 4rth terms giving me A'B'C' +BC + AB'(C'+C) then using the boolean rules that says C'+ C =1 and the rule that says anything anded with 1 is it's self i have A'B'C' + BC + AB' comuntive law AB' + A'B'C + BC now factoring B' out of the first two terms...

represent the simplest reduction of (ab' + ac)' a) a' + bc' b) a' + b'c...

represent the simplest reduction of (ab' + ac)' a) a' + bc' b) a' + b'c c) a + bc' d) a + bc

Suppose that the incircle of triangle ABC touches AB at Z, BC at X, and AC...

Suppose that the incircle of triangle ABC touches AB at Z, BC at X, and AC at Y . Show that AX, BY , and CZ are concurrent.

A parallelogram ABCD is called a rhombus if AB = BC = CD = DA. Suppose...

A parallelogram ABCD is called a rhombus if AB = BC = CD = DA. Suppose ABCD is a rhombus. Prove that AC is perpendicular to BD.

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.

In △ABC, AB = 15 cm, BC = 10 cm, and AC = 6 cm. Find...

In △ABC, AB = 15 cm, BC = 10 cm, and AC = 6 cm. Find the measure of angle B to the nearest degree.

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