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To find the arc length of a minor arc, you can use the formula: ( L = \frac{\theta}{360} \times 2\pi r ), where ( L ) is the arc length, ( \theta ) is the central angle in degrees, and ( r ) is the radius. For a minor arc with a central angle of 120 degrees and a radius of 8, substitute the values into the formula: ( L = \frac{120}{360} \times 2\pi \times 8 ). This simplifies to ( L = \frac{1}{3} \times 16\pi ), resulting in an arc length of approximately ( 16.76 ) units.
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What is the arc length of the minor arc of 120 degrees and 8 radius?
To find the arc length of a minor arc, you can use the formula: ( \text{Arc Length} = \frac{\theta}{360} \times 2\pi r ), where ( \theta ) is the angle in degrees and ( r ) is the radius. For a 120-degree arc with an 8-unit radius, the arc length is ( \frac{120}{360} \times 2\pi \times 8 = \frac{1}{3} \times 16\pi = \frac{16\pi}{3} ). Thus, the arc length is approximately 16.76 units.
How do you find the measure of major arc?
To find the measure of a major arc in a circle, first determine the measure of the corresponding minor arc, which is the smaller arc connecting the same two endpoints. The measure of the major arc is then calculated by subtracting the measure of the minor arc from 360 degrees. For example, if the minor arc measures 120 degrees, the major arc would measure 360 - 120 = 240 degrees.
What is the arc length of the minor arc of 120 degrees and the radius of 7?
circumference = 2*pi*7 = 43.98229715 arc = (120/360)*43.98229715 = 14.66076572 or 14.661 units rounded to 3 dp
The length of the major arc is 10 the minor arc is 30 degrees find the length of the minor arc?
Since the minor arc is 30 degrees, the major arc is 330 degrees (360 - 30). So we have: 330 degrees : arc length 10 30 degrees : arc length x 330/30 = 10/x 11/1 = 10/x x = 10/11 x = 0.9 approximately So the length of the minor arc is approximately 0.9 units.
How do you find the arc length of a minor arc?
The answer depends on the information that you have. If the arc subtends an angle of x radians in a circle with radius r cm, then the arc length is r*x cm.
What is the arc length of the minor arc of 95 and 18.84?
find the arc length of minor arc 95 c= 18.84
What is the arc length of minor arc 120 degrees?
It will be 1/3 of the circle's circumference
What is the arc length of the minor arc of 120 degrees and the radius of 8?
Arc length = pi*r*theta/180 = 17.76 units of length.
What is the arc length of the minor arc of 120 degrees and 8 radius?
To find the arc length of a minor arc, you can use the formula: ( \text{Arc Length} = \frac{\theta}{360} \times 2\pi r ), where ( \theta ) is the angle in degrees and ( r ) is the radius. For a 120-degree arc with an 8-unit radius, the arc length is ( \frac{120}{360} \times 2\pi \times 8 = \frac{1}{3} \times 16\pi = \frac{16\pi}{3} ). Thus, the arc length is approximately 16.76 units.
Find the arc length of the minor arc?
5.23
How do you find the arc ABC length 120 degrees 10?
An arc length of 120 degrees is 1/3 of the circumference of a circle
How do you find the minor arc length when the minor arc is 150 degrees and c 31.4?
13.08
Find the arc length of the minor arc if the radius is 13 and the sector is 85?
19.28
How do you find the measure of major arc?
To find the measure of a major arc in a circle, first determine the measure of the corresponding minor arc, which is the smaller arc connecting the same two endpoints. The measure of the major arc is then calculated by subtracting the measure of the minor arc from 360 degrees. For example, if the minor arc measures 120 degrees, the major arc would measure 360 - 120 = 240 degrees.
What is the arc length of the minor arc of 120 degrees and the radius of 7?
circumference = 2*pi*7 = 43.98229715 arc = (120/360)*43.98229715 = 14.66076572 or 14.661 units rounded to 3 dp
The circumference of Z is 72 in What is the length of the minor arc?
It is: 72-lenghth of major arc = length of minor arc
The length of the major arc is 10 the minor arc is 30 degrees find the length of the minor arc?
Since the minor arc is 30 degrees, the major arc is 330 degrees (360 - 30). So we have: 330 degrees : arc length 10 30 degrees : arc length x 330/30 = 10/x 11/1 = 10/x x = 10/11 x = 0.9 approximately So the length of the minor arc is approximately 0.9 units.
