If a diameter of a circle is perpendicular to one of two parallel chords of the...

If two chords intersect in the interior of a circle, then the product of the lengths...

If two chords intersect in the interior of a circle, then the product of the lengths of the segments of one chord equals the product of the lengths of the segments of the other chord. Each product equals r2-d2, where r is the radius of the circle and d is the distance from the point of intersection of the chords to the center.

Prove that perpendicular drop to a chord from the center of a circle bisects the chord.

Prove that perpendicular drop to a chord from the center of a circle bisects the chord.

Draw a circle with your compass. Draw in a diameter. Construct a perpendicular bisector of the...

Draw a circle with your compass. Draw in a diameter. Construct a perpendicular bisector of the diameter. Construct angle bisectors of all four angles at the center of the circle. Mark where all these lines intersect the circle. Connect these points. Prove that the shape you have constructed is a regular octagon.

Task 3 Print Circle Theorems In this unit, you learned about some of the important properties...

Task 3 Print Circle Theorems In this unit, you learned about some of the important properties of circles. Let’s take a look at a property of circles that might be new to you. You will use GeoGebra to demonstrate a theorem about chords and radii. Open GeoGebra, and complete each step below. Part A Construct a circle of any radius, and draw a chord on it. Then construct the radius of the circle that bisects the chord. Measure the angle...

Prove that the intersection of any two perpendicular bisectors of the sises of a triangle is...

Prove that the intersection of any two perpendicular bisectors of the sises of a triangle is the center of a circumscribing circle.

Two circles with different radii have chords A B ¯ and C D ¯, such that...

Two circles with different radii have chords A B ¯ and C D ¯, such that A B ¯ is congruent to C D ¯. Are the arcs intersected by these chords also congruent? Explain. 5 points for the correct answer 5 points for a thoughtful and correct explanation Hint: It would be helpful to draw two circles and label them according to the given information, then evaluate possible arc measures. Consider the type of triangle that may be drawn...

From a point P outside a given circle, construct, using a straight edge only, the perpendicular...

From a point P outside a given circle, construct, using a straight edge only, the perpendicular to a given diameter of the circle

Parallel wires exert magnetic forces on each other. What about perpendicular wires? Imagine two wires oriented...

Parallel wires exert magnetic forces on each other. What about perpendicular wires? Imagine two wires oriented perpendicular to each other and almost touching. Each wire carries a current. Is there a force between the wires? Explain what happens in this situation.

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.

Two vertices of an equilateral triangle lie on a diameter of a circle whose area is...

Two vertices of an equilateral triangle lie on a diameter of a circle whose area is 36p cm2, and the third vertex lies on the circle. What is the largest possible area of the triangle?