AT&T

]]>Although degrees have been used since the time of the ancient Babylonians, radians are the angle measure of choice for advanced mathematics.

For example the gradient function for sin is given by d(sin x)/dx = cos x only when the angle x is measured in radians.

What you have discovered is the result of the way radians are defined.

A radian is just under 60 degrees (one sixth of the circle), so your result does not seem unreasonable. If pi= 3 then the whole circle is 3r^2 so one sixth is 3r^2/6 =(r^2)/2 So an approximate calculation confirms the result.

Bob

]]>given:

a circle, radius = r;

a sector, angle = 1 radian;

What is the area?

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(1) Area of the circle = pi . r^2

(2) Area of a sector of one radian = 1 Rad

(3) If a circle has 2.pi.rad

then

Area of the circle = 2.pi.Rad

From (1) and (3) => pi . r^2 = 2 . pi . Rad <=> r^2 = 2 . Rad <=>

<=> Rad = 1/2 . r^2

It turns out that Area of a sector of one radian is half a square.

I do not know what to think.

AT&T

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