What Is The Sector Area Created By The Hands Of A Clock With A Radius Of 9 Inches When The Time Is 4:00? 6.75Π In.2 20.25Π In.2 27Π In.2 81Π In.2

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What Is The Sector Area Created By The Hands Of A Clock With A Radius Of 9 Inches When The Time Is 4:00? 6.75Π In.2 20.25Π In.2 27Π In.2 81Π In.2. Given that the clock is having a radius of 9 inches and the time shown is 4: But where does it come from?

The Hour Hand Of A Clock Moves From 12 To 5 at Janice Moore blog
The Hour Hand Of A Clock Moves From 12 To 5 at Janice Moore blog from giompslro.blob.core.windows.net

Identify the angle formed by the hands at 4:00: The clock has 12 hours shown from 1 to 12. I'm assuming that you want the arc length and area of the sector from 12 to 4.

To Find The Area Of The Sector Created By The Hands Of A Clock At 4:00, Follow These Steps:


Given that the clock is having a radius of 9 inches and the time shown is 4: The clock has 12 hours shown from 1 to 12. Area of the sector = 27 pi square inches.

But Where Does It Come From?


You can find it by using. Identify the angle formed by the hands at 4:00: Sector area = r² × α / 2;

The Area Created By The Clock When It's At 4:00 Is 84.83In^2.


I'm assuming that you want the arc length and area of the sector from 12 to 4. A clock has a radius of 9 inches. The answer is 27π in.^2 and the web page explains.

The Web Page Shows The Formula, Calculation And Answer For The Sector Area Of A Clock With A Radius Of 9 Inches When The Time Is 4:00.


The area of a sector is given as [tex]a = \frac{\theta}{360} *. If it's 4:00, what's the arc length and the area of the sector of this time?

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