QUESTION IMAGE
Question
consider the following procedure.
- from a point a outside a circle, draw a line to the circles center, c.
- construct the perpendicular bisector of $overline{ac}$, and label the midpoint of $overline{ac}$ as point e.
- place the compass point at point e, and set the width to ea.
- draw an arc that intersects the circle, and label the point of intersection as point x.
- draw $overline{ax}$.
what has been constructed by the above procedure?
a. a tangent to the circle
b. a perpendicular bisector of the diameter
c. an inscribed angle with a measurement of 90°
d. concentric circles centered at point x
When we follow the given construction steps, we are creating a line from an external point A to a point X on the circle. The key geometric property here is that the angle formed between the radius (CX) and the line AX is 90 degrees. This is a characteristic property of a tangent - a line that touches a circle at exactly one point and is perpendicular to the radius at that point.
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A. A tangent to the circle