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The measure of a tangent-tangent angle is half the difference of the measures of the intercepted arcs?
True
How do you find the degree measure of a central angle in a circle if both the radius and the length of the intercepted arc are known?
-- Circumference of the circle = (pi) x (radius) -- length of the intercepted arc/circumference = degree measure of the central angle/360 degrees
An angle measures 16 degrees what is the measure of a complementary angle?
74 degrees
What supplementary angle to a 76 degrees angle has a measure of?
It measures 104 degrees
The angle measures 53 degrees What is the measure of its compliment?
37o
If an inscribed angle measures 67 and deg how would you find intercepted arc?
To find the measure of the intercepted arc for an inscribed angle, you can use the formula that states the measure of the intercepted arc is twice the measure of the inscribed angle. In this case, if the inscribed angle measures 67 degrees, you would calculate the intercepted arc as 2 × 67 degrees, which equals 134 degrees. Therefore, the intercepted arc would measure 134 degrees.
What is the measure of an arc that is intercepted by an inscribed angle of 30 degrees?
60 degrees
How do you find the measure of inscribed angles?
To find the measure of an inscribed angle in a circle, you can use the property that the inscribed angle is half the measure of the intercepted arc. Specifically, if the inscribed angle intercepts an arc measuring ( m ) degrees, then the inscribed angle measures ( \frac{m}{2} ) degrees. Additionally, if you know two inscribed angles that intercept the same arc, they will be congruent.
Is the measure of each inscribed angle?
The measure of each inscribed angle in a circle is half the measure of the intercepted arc that it subtends. This means that if an inscribed angle intercepts an arc measuring ( x ) degrees, the angle itself measures ( \frac{x}{2} ) degrees. Inscribed angles that intercept the same arc or are subtended by the same chord are equal.
What is the measure of an arc that is intercepted by an inscribed angle of 31 degrees?
That will depend on the circumference of the circle which has not been given
If an angle that has a measure of 51.4 degrees is inscribed in a circle what is the measure of its intercepted?
102.8 degrees I think but it depends. If the angle is a central angle it is 51.4 degrees but other than that I think it would be 102.8 degrees.
How does the measure of an inscribed angle relate to the measure of its intercepted arc?
The measure of an inscribed angle is half the measure of its intercepted arc. This means that if you know the degree measure of the arc that lies between the two points on the circle where the inscribed angle's rays intersect the circle, you can find the angle's measure by dividing the arc's measure by two. This relationship holds true for any inscribed angle and its corresponding intercepted arc in a circle.
What is the relationship between a central angle and its intercepted arc?
The central angle of a circle is formed by two radii that extend from the center of the circle to its circumference. The intercepted arc is the part of the circle's circumference that lies between the two points where the radii intersect the circle. The measure of the central angle is equal to the measure of the intercepted arc in degrees. Thus, if the central angle measures θ degrees, the intercepted arc also measures θ degrees.
The measure of an inscribed angle in a circle is the measure of the intercepted arc.?
Answer this question… half
Segment DC is a diameter of circle A in the figure below. If angle DAB measures 34 degrees what is the measure of arc BC?
In a circle, the measure of an angle formed by a chord and a tangent at a point on the circle is half the measure of the intercepted arc. Since segment DC is a diameter, angle DAB is an inscribed angle that intercepts arc DB. Therefore, the measure of arc DB is twice the measure of angle DAB, which is 68 degrees. Since arc BC is the remainder of the circle, arc BC measures 360 degrees - 68 degrees = 292 degrees.
The measure of an inscribed angle in a circle is the measure of the intercepted arc?
The lengthÊof an inscribed angle placed in a circle based on on the measurement of a intercepted arc is called a Theorem 70. The formula is a m with a less than symbol with a uppercase C.
If the measure of a tangent chord is 74 degrees then what os the measure if the intercepted arc inside the angle?
The measure of the intercepted arc is twice the measure of the tangent chord's angle. Therefore, if the measure of the tangent chord is 74 degrees, the measure of the intercepted arc would be 2 × 74 degrees, which equals 148 degrees.
