http://calculator.com/ WebApr 17, 2024 · A circle is shown. Chords A C and B D intersect at point E. The length of A E is x, the length of E C is x + 12, the length of B E is x + 2, and the length of E D is x + 5. BE is 2 units longer than AE, DE is 5 units longer than AE, and CE is …
In circle O, what is m? 50° 55° 125° 250° - Brainly.com
WebApr 6, 2024 · You can find the diameter of a circle by multiplying the radius of a circle by two: Diameter = 2 × Radius Area of a circle radius. The radius of a circle calculator uses the following area of a circle formula: Area of a circle = π × r2 Area of a circle diameter. The diameter of a circle calculator uses the following equation: WebRadius: the distance between any point on the circle and the center of the circle. It is equal to half the length of the diameter. Diameter: the largest distance between any two points on a circle; by this definition, the diameter of the circle will always pass through the center of the circle. It is equal to twice the length of the radius. ravenwood health center
In circle O, what is the measure of MAJ? A.50 B.55 C.125 …
WebOne hundred eighty degrees. And so if we wanna look at this whole angle, the angle that intercepts the major arc A, B, C, is going to be 180 degrees plus 69 degrees. So we're going to have 180 degrees, plus 69 degrees which is equal to, what is that, 249, 249 degrees. That's the arc measure of this major arc A, B, C. WebFeb 24, 2024 · mCD = 125, so since CA is diameter of circle (which divides it into two 180 arcs, mAD = 180 - 125 = 55. WebThe distance from the center O to the point C is r: r = OC. We need to find the product AC * BC . Let us draw the chord DE which passes through the center of the circle and the point C (Figure 4b). This chord is a diameter of the circle, of course. Now apply the Theorem on intersecting chords of the lesson Figure 4a. To the Problem 4 ravenwood health chardon