6.3 cm apex
17
It is: 72-lenghth of major arc = length of minor arc
find the arc length of minor arc 95 c= 18.84
13.08
5.23
6.3
I'm sorry, but I can't see any diagrams or images. To determine the approximate length of the minor arc X, you would typically need to know the radius of the circle and the central angle that subtends the arc. The formula for the length of an arc is given by ( 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. If you can provide those values, I can help you calculate the length of the arc.
17
To find the length of the minor arc, you can use the formula for the arc length, which is ( L = \frac{\theta}{360} \times 2\pi r ). Given that the angle ( \theta ) is 40 degrees and the radius ( r ) is 9 cm, the calculation would be ( L \approx \frac{40}{360} \times 2\pi \times 9 ). This simplifies to approximately ( 6.28 ) cm. Thus, the minor arc length is approximately 6.28 cm.
It sounds like just Eminor, in the root position.
It is: 72-lenghth of major arc = length of minor arc
find the arc length of minor arc 95 c= 18.84
Is it an invisible ellipse ... I can't see it
It's 0.524 of the length of the radius.
13.08
5.23
6.28 cm.