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10.4 Other Angles Relationships In Circles

10.4 Other Angles Relationships In Circles. Theorem. A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc. Theorem. A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc. Theorem.

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10.4 Other Angles Relationships In Circles

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  1. 10.4 Other Angles Relationships In Circles

  2. Theorem A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc.

  3. Theorem A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc.

  4. Theorem A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc.

  5. Theorem If two chords intersect in the circle, then the angles made are ½ the sum of the intercept arcs.

  6. Theorem If two chords intersect in the circle, then the angles made are ½ the sum of the intercept arcs.

  7. Theorem A tangent and a secant make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcAC-arcBC)

  8. Theorem A tangent and a secant make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcAC-arcBC)

  9. Theorem A tangent and a secant make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcAC-arcBC)

  10. Theorem Two tangents make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcACB-arcAB)

  11. Theorem Two tangents make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcACB-arcAB)

  12. Theorem Two secants make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcAC - arcBD)

  13. Theorem Two secants make two intercept arc, the angle made is ½ ( the big arc minus the small arc) ½(arcAC - arcBD)

  14. Homework Page 624 – 627 # 8 – 34, 42, 46, 47, 49 – 51 Thank you http://literacy.calumet.purdue.edu/student/bakerl3/10_5tutorial.html

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