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Angle relationships in circles.
Module 15 Graphic Organizer Name: _____________________________________ Angle relationships in circles. β π΄πΆπ΅ is a ______________ angle; its measure is ____________ the measure of π΄π΅ . β π΄π·π΅ is an ______________ angle; its measure is ____________ the measure of the minor arc π΄π΅ . Opposite angles of an inscribed quadrilateral are always: ________________. πβ π΄+πβ πΆ = _____________ πβ π΅+πβ π· = _____________ β πΈ is created by the intersection of ____________ AB and CD. πβ πΆπΈπ΄ is equal to π π΄πΆ ____ π π΅π· divided by 2. β πΈ is created by the intersection of ____________ AE and CE. πβ πΈ is equal to π π΄πΆ ____ π π΅π· divided by 2. β πΆ is created by the intersection of ____________ AC and ____________DC. πβ πΆ is equal to π π΄π· ____ π π΅π· divided by 2.
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Segment relationships in circles.
Segments AX and BX are both called ________________. Segment AX and BX are _______________. Segments AC and BC are both called ________________. Segment AC and BC are _______________. Both β π΄ and β π΅ have a measure of ___________. β π and β πΆ are __________________. Segments CD and AB are both called ________________. ______ x ______ = ______ x _______ Segments AE and CE are both called ________________. ______ x ______ = ______ x _______ Segment AC is called a ________________. Segment DC is called a ________________. ______ x ______ = ______ 2
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