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@ems REVISION CIRCLE THEOREMS THE ANGLE IN A SEMI CIRCLE IS 90⁰° @ems REVISION CIRCLE THEOREMS 60° 120° THE ANGLE AT THE CIRCUMFERENCE IS HALF THE ANGLE AT THE CENTRE @ems REVISION CIRCLE THEOREMS 32° 32° THE ANGLES IN THE SAME SEGMENT FROM A COMMON CHORD ARE EQUAL @ems REVISION CIRCLE THEOREMS 80° 100° 75° 105° THE OPPOSITE ANGLES IN A CYCLIC QUADRILATERAL ADD TO 180° @ems REVISION CIRCLE THEOREMS 90° THE ANGLES BETWEEN A RADIUS AND A TANGENT IS 90° @ems REVISION CIRCLE THEOREMS 90° THE RADIUS THROUGH THE MIDPOINT OF A CHORD WILL BISECT THE CHORD AT 90° @ems REVISION CIRCLE THEOREMS 70° 60° 60° 70° THE ANGLE BETWEEN THE CHORD AND THE TANGENT IS EQUAL TO OPPOSITE ANGLE INSIDE THE TRIANGLE @ems REVISION CIRCLE THEOREMS с B TANGENTS TO A CIRCLE FROM THE SAME POINT WILL BE EQUAL LENGTH
iOS User
Stefan S, iOS User
SuSSan, iOS User
🔷 Mathematics - Shapes
159 Followers
0
The seven circle theorems with drawings and how to describe them:)
9
Poster on main angle facts and all circle theorems needed for GCSE
67
Contains all the circle theorems and reasonings.
203
Hopefully this helps anyone!
0
337
NOTES
@ems REVISION CIRCLE THEOREMS THE ANGLE IN A SEMI CIRCLE IS 90⁰° @ems REVISION CIRCLE THEOREMS 60° 120° THE ANGLE AT THE CIRCUMFERENCE IS HALF THE ANGLE AT THE CENTRE @ems REVISION CIRCLE THEOREMS 32° 32° THE ANGLES IN THE SAME SEGMENT FROM A COMMON CHORD ARE EQUAL @ems REVISION CIRCLE THEOREMS 80° 100° 75° 105° THE OPPOSITE ANGLES IN A CYCLIC QUADRILATERAL ADD TO 180° @ems REVISION CIRCLE THEOREMS 90° THE ANGLES BETWEEN A RADIUS AND A TANGENT IS 90° @ems REVISION CIRCLE THEOREMS 90° THE RADIUS THROUGH THE MIDPOINT OF A CHORD WILL BISECT THE CHORD AT 90° @ems REVISION CIRCLE THEOREMS 70° 60° 60° 70° THE ANGLE BETWEEN THE CHORD AND THE TANGENT IS EQUAL TO OPPOSITE ANGLE INSIDE THE TRIANGLE @ems REVISION CIRCLE THEOREMS с B TANGENTS TO A CIRCLE FROM THE SAME POINT WILL BE EQUAL LENGTH
@ems REVISION CIRCLE THEOREMS THE ANGLE IN A SEMI CIRCLE IS 90⁰° @ems REVISION CIRCLE THEOREMS 60° 120° THE ANGLE AT THE CIRCUMFERENCE IS HALF THE ANGLE AT THE CENTRE @ems REVISION CIRCLE THEOREMS 32° 32° THE ANGLES IN THE SAME SEGMENT FROM A COMMON CHORD ARE EQUAL @ems REVISION CIRCLE THEOREMS 80° 100° 75° 105° THE OPPOSITE ANGLES IN A CYCLIC QUADRILATERAL ADD TO 180° @ems REVISION CIRCLE THEOREMS 90° THE ANGLES BETWEEN A RADIUS AND A TANGENT IS 90° @ems REVISION CIRCLE THEOREMS 90° THE RADIUS THROUGH THE MIDPOINT OF A CHORD WILL BISECT THE CHORD AT 90° @ems REVISION CIRCLE THEOREMS 70° 60° 60° 70° THE ANGLE BETWEEN THE CHORD AND THE TANGENT IS EQUAL TO OPPOSITE ANGLE INSIDE THE TRIANGLE @ems REVISION CIRCLE THEOREMS с B TANGENTS TO A CIRCLE FROM THE SAME POINT WILL BE EQUAL LENGTH
iOS User
Stefan S, iOS User
SuSSan, iOS User