true
40, 100 and 83, 143.
150
When the vertex of an angle is located outside a circle, the measure of the angle is determined by the difference of the measures of the intercepted arcs. Specifically, if the angle intercepts arcs A and B, the angle's measure can be calculated using the formula: (\text{Angle} = \frac{1}{2} (m\overarc{A} - m\overarc{B})), where (m\overarc{A}) and (m\overarc{B}) are the measures of the intercepted arcs. This relationship holds true for both secant and tangent lines that intersect the circle.
74, 164 36, 126 18, 108
True
It is the measure of half the intercepted arc.
Examples to show how to use the property that the measure of a central angle is equal to the measure of its intercepted arc to find the missing measures of arcs and angles in given figures.
true
40, 100 and 83, 143.
150
The answer is half the measure, 62°. Have a nice day!
56, 126,40, 110,and 77, 147.
74, 164 36, 126 18, 108
4/9*pi*r where r is the radius of the circle.
GDP Gap measures the percent difference in Real and Potential GDP
The measure of the angle formed by two secants intersecting outside the circle is one-half the difference of the intercepted arcs. Example: Major intercepted arc is 200o and the minor intercepted arc is 120o. 1/2 (200-120) = 40o ... The measurement of the angle formed by the two secants is 40o. I HOPE THIS CAN HELP YOU :))