CUTTING A CIRCLE INTO EQUAL SECTION OF A SMALL CENTRAL ANGLE TO FIND THE AREA OF A CIRCLE BY USING THE FORMULA A=PIE R2

What is your question?

find the diameter of a circle if the radius is 12.7

hey aswathy im searchin 4 d asme thing if u get nythin temme!!!!!!

To cut a circle into equal sections of a small central angle, you will need to follow these steps:

1. Determine the number of sections you want. Let's say you want to cut the circle into n equal sections.

2. Divide the circle into n equal angles. To do this, divide 360 degrees (a full circle) by n. This will give you the size of each angle.

3. Use a protractor or compass to measure or mark the desired angle at the center of the circle. Ensure that each angle is the same size.

4. Draw lines from the center of the circle to the edges, using the marked angles as a guide. This will divide the circle into n equal sections.

5. Now, to calculate the area of the circle, use the formula A = πr², where A represents the area and r represents the radius of the circle.

6. Measure the radius of the circle. The radius is the distance from the center of the circle to any point on its circumference.

7. Square the radius by multiplying it by itself (r²).

8. Multiply the squared radius (r²) by π (3.14159 or use a more accurate value if needed).

9. The result will give you the area of the whole circle.

10. Finally, to find the area of each equal section, divide the total area of the circle by the number of sections (n). This will give you the area of each section.

Remember, when measuring and dividing, accuracy is essential for obtaining the correct results.