Angles, Tangents, and Secants in Circles

A quadrilateral with opposite sides parallel

A quadrilateral with all sides equal

A quadrilateral with all angles equal

A quadrilateral with all vertices on the circumference of a circle

They form an obtuse angle

They are perpendicular

They form an acute angle

They are parallel

The point where the tangent meets the circle

The endpoint of the radius

The center of the circle

The midpoint of the tangent

A line that cuts the circle at two points

A line that is perpendicular to the radius

A line that is parallel to the circle

A line that touches the circle at one point

Equilateral triangle

Scalene triangle

Isosceles triangle

Right triangle

It remains unchanged

It becomes 90 degrees

It becomes 45 degrees

It becomes 180 degrees

It represents the angle between two tangents

It represents the angle at the center of the circle

It represents the angle between the radius and the tangent

It represents the angle between the radius and the secant

360 degrees

180 degrees

90 degrees

0 degrees

To calculate the exact length of the tangent

To show how the angle approaches a specific value

To find the area of the circle

To determine the radius of the circle

It remains the same

It decreases

It becomes undefined

It increases