find the 0° theta of the sector if circle is divided into four equal sectors
Share
find the 0° theta of the sector if circle is divided into four equal sectors
Sign Up to our social questions and Answers Engine to ask questions, answer people’s questions, and connect with other people.
Login to our social questions & Answers Engine to ask questions answer people’s questions & connect with other people.
The theta of a sector if circle is divided into 4 equal sectors are 0.785 R where R is the radius of a circle.
We know that a full circle is 360° in measurement ( angle is 360). As the circle is divided into four equal sectors so the angle is 90°.
similarly, The area of a circle is given as π multiplied by the square of its radius length.
So if a sector of any circle of radius r measures θ, the area of the sector can be shown as,
As the circle is divided into four equal sectors so the angle is 90°
And let the circle with center O and radius R,
and the Area of the circular region is πR².
Area of the sector = [tex]\frac{90}{360}[/tex] ×π ×R²
[tex]\frac{90}{360}[/tex] ×3.14 ×R²
⇒ 0°=0.785 R
to know more about sector of circle use the following link
https://www.google.com/url?sa=t&source=web&rct=j&url=https://brainly.com/question/22972014