Consider circle O, in which arc XY measures 16π cm. The length of a radius of the circle is 32 cm.What is the measure of central angle XOY

Respuesta :

Paounn

Answer:

The angle measures [tex]\frac\pi2[/tex] radians, or 90°

Step-by-step explanation:

In radians, the measure of an angle is defined as the length of the arc divide by the radius of the circle of which that arc is part of. In our case

[tex]\angle XOY = \frac {\overarc{XY}}{OX} = \frac{16\pi}{32} = \frac\pi2[/tex]

Answer:

angle XOY = [tex]\frac{\pi}{2}[/tex] (in radians) or 90° (in degrees)

Step-by-step explanation:

So firstly we need to consider that the unit of measurement is radians, not degrees, as represented by the 'measures 16π cm'.

Next, since we have the length of arc XY given as 16π cm, we can apply the formula for the length of an arc, in radians, which is [tex]l=r\theta[/tex].

I'm assuming that you know how to derive the formula for arc length since you are getting questions about arc length like this, but if not, then you can just search on the internet: "derivation for the formula of arc length in radians"

Therefore: we should let ∠XOY = ∅ and so,

[tex]l=16\pi[/tex] and [tex]r=32[/tex]

[tex]16\pi =32\theta\\\frac{16\pi}{32}=\theta\\ \frac{\pi}{2}=\theta[/tex]

∴∠XOY = [tex]\frac{\pi}{2}\\[/tex] radians

(Unless otherwise stated, return your answer in the same unit of measurement as the measurements in the question)