**The Measure Of Central Angle Xyz Is 1.25 Radians. What Is The Area Of The Shaded Sector?**. What is the area of the shaded sector? Calculate the area of a sector:

A sector is a fraction of a circle, determined by the measure of its central angle over the complete revolution that is a circle, that is 2. The measure of central angle xyz is 1.25 radians. Enter central angle =63.8 then click calculate and your answer is arc length = 4.0087.

### Sector R S T Is Shaded.

Line segment r t is a diameter. Units 72 so, the piece is 1/5 of the pie Angle p q r is 45 degrees.

### The Area Of A Circle Depends On The Length Of The Radius.

A circle sub tends 2Ï€ radians. What is the area of the shaded sector? Subtract 62 from each side.

### The Area Of The Shaded Sector Depends On The Length Of The Radius.

Find the sector area (shaded region) since the radius is 12 units, the area of the entire circle is then, (converting radians/degrees) (12 units)2 144 sq. This implies that the bigger the central angle, the larger is the area of the sector. The area of the shaded sector depends on the length of the radius.

### Which Statements Are True About Circle Q?

Then you can now input the converted value to. Pieces of a circle with radius r are rearranged. Or area of a sector = (Î¸ / 360) Ã— Ï€r 2 where Î¸ is in degrees.

### The Area Of The Shaded Sector Is 4 Units2.

What is the area of the shaded sector? The measure of central angle xyz is 1.25 radians. The area of the shaded sector depends on the length of the radius.