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If the measure of a tangent-chord angle is 54 degrees then what is the measure of the intercepted arc inside the angle?
108 ;)
The measure of a tangent chord angle is 54 then what is the measure of the intercepted arc inside the angle?
108 degrees
If the measure of a tangent angle is 36 then what is the measure of the intercepted arc inside the angle?
72
The measure of an angle formed by two secants intersecting inside the circle equals?
½ the sum of the intercepted arcs.
Why do some shapes make tilings and some do not?
It all matters what the inside angles measure up to. If the inside angles measure up to 360 degrees, the shape will tile. If the inside angles do not add up to 360 degrees, the shape won't tile.
If the measure of a tangent-chord angle is 54 degrees then what is the measure of the intercepted arc inside the angle?
108 ;)
The measure of a tangent chord angle is 54 then what is the measure of the intercepted arc inside the angle?
108 degrees
If the measure of a tangent-chord angle is 68 degrees then what is the measure of the intercepted arc inside the angle?
136
The measure of a tangent chord angle is 68 then what is the measure of the intercepted arc inside the angle?
136 degrees
If Measure of tangent-chord angle is 74 degrees then what is the intercepted arc inside the angle?
148
If the measure of a tangent angle is 36 then what is the measure of the intercepted arc inside the angle?
72
If the measure of a tangent-chord angle is 74 then what is the measure of the intercepted arc inside the angle?
DK
If the measure of a tangent chord angle is 54 then what is the measure of the intercepted arc inside the angle?
108
The measure of a tangent-chord angle is half the measure of the intercepted arc inside the angle?
True -
The measure of a tangent chord angle is twice the measure of the intercepted arc inside the angle?
false
Is it true or false that the measure of a tangent-chord angle is twice the measure of the intercepted arc inside the angle?
It is true that the measure of a tangent-chord angle is half the measure of the intercepted arc inside the angle. When a tangent line intersects a chord of a circle, it creates an angle between the tangent line and the chord, known as the tangent-chord angle. If we draw a segment from the center of the circle to the midpoint of the chord, it will bisect the chord, and the tangent-chord angle will be formed by two smaller angles, one at each end of this segment. Now, the intercepted arc inside the tangent-chord angle is the arc that lies between the endpoints of the chord and is inside the angle. The measure of this arc is half the measure of the central angle that subtends the same arc, which is equal to the measure of the angle formed by the two smaller angles at the ends of the segment that bisects the chord. Therefore, we can conclude that the measure of a tangent-chord angle is half the measure of the intercepted arc inside the angle.
If the measure of a tangent chord angle is 74 then what is the measure of the intercepted arc inside the angle?
Through construction I make it to 148° of the circle or 2,583 radians 90 - 74 = 16 180 - (2*16) = 148 148/180 * pi = 2,583
