When segments intersect outside a circle, what is the relationship between the angle of intersection and the intercepted arcs?

THERE HAVE ALOT OF RELATIONSHIP
It'll be clearer if you are spefic by giving a sketch of what you mean.
1). if their angle of intersection is 90 degrees, then the arcs where sustended by the diameter of the circle
2). [ the angle of intersection of the segments is equal but opposite to the angle of the intersected arcs which is directly proportional to the lengths of the arcs.
3). If the

intersection occurs at the centre of the circle, the length of the arc produced is a function of the radius of the circle.
]

When segments intersect outside a circle, what is the relationship between the angle of intersection and the intercepted arcs?

Original conversation

User: When segments intersect outside a circle, what is the relationship between the angle of intersection and the intercepted arcs?

Weegy: THERE HAVE ALOT OF RELATIONSHIP
It'll be clearer if you are spefic by giving a sketch of what you mean.
1). if their angle of intersection is 90 degrees, then the arcs where sustended by the diameter of the circle
2). [ the angle of intersection of the segments is equal but opposite to the angle of the intersected arcs which is directly proportional to the lengths of the arcs.
3). If the intersection occurs at the centre of the circle, the length of the arc produced is a function of the radius of the circle.
] selymi|Points 10276|

User: When segments intersect outside a circle, what is the relationship between the angle of intersection and the intercepted arcs?

Weegy: When segments intersect outside a circle, what is the relationship between the angle of intersection and the intercepted arcs? answer is Half the difference Expert answered|Marvel2|Points 128|

Weegy: THERE HAVE ALOT OF RELATIONSHIP
It'll be clearer if you are spefic by giving a sketch of what you mean.
1). if their angle of intersection is 90 degrees, then the arcs where sustended by the diameter of the circle
2). [ the angle of intersection of the segments is equal but opposite to the angle of the intersected arcs which is directly proportional to the lengths of the arcs.
3). If the intersection occurs at the centre of the circle, the length of the arc produced is a function of the radius of the circle.
] (More)

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