Angle K measures 67º and angle L measures 119°.





Circle K is shown. Tangents S T and U T intersect at point T outside of the circle. A line is drawn from point T to point R on the opposite side of the circle. It goes through center point K. Lines are drawn from points S and U to center point K.





In quadrilateral QRST, measures (5x+15)°. Angle TQR measures (4x+3)°.

UV and RV are secant segments that intersect at point V.



Arc QVT measures 156°.

All tangents to the circle are congruent and form a square. The perimeter of square ACEG is 24 cm.

Line EF is tangent to circle G at point A.

Given: Circle O; intercepts ; D intercepts Prove:


Line segment BD passes through the center of circle C, BH = a, and HD = 8.

Did you find these answers helpful?