A circle has a chord that goes from $( pi)/6$ to $(5 pi) / 6$ radians on the circle. If the area of the circle is $18 pi$ , what is the length of the chord?

Question

How many degrees does the hour hand of a clock turn in 5 minutes?
A circle has a center at $(3 ,1 )$ and passes through $(2 ,1 )$ . What is the length...
A circle has a center at $(7 ,6 )$ and passes through $(2 ,1 )$ . What is the length...
A circle has a center at $(7 ,6 )$ and passes through $(2 ,1 )$ . What is the length...
A circle has a center at $(7 ,6 )$ and passes through $(2 ,1 )$ . What is the length...
A circle has a center at $(7 ,3 )$ and passes through $(2 ,7 )$ . What is the length of...
A circle has a center at $(1 ,3 )$ and passes through $(2 ,4 )$ . What is the length of...
A circle has a center at $(1 ,3 )$ and passes through $(2 ,4 )$ . What is the length of...
A circle has a center at $(1 ,3 )$ and passes through $(2 ,1 )$ . What is the length of...
A circle has a center at $(1 ,2 )$ and passes through $(4 ,7 )$ . What is the length of...

1277 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-04-20T17:28:10

$c = sqrt(54)$

We can compute the radius from the area of the circle:

$pir^2=18pi$

$r = sqrt18$

To radii and the chord form a triangle. The angle between the two radii is:

$theta = (5pi)/6-pi/6= (2pi)/3$

If we use the angle and the length of the two radii, we can use the Law of Cosines:

$c^2=a^2+b^2-2(a)(b)cos(theta)$

where $a = b = r = sqrt18 and theta = (2pi)/3$

$c = sqrt((sqrt18)^2+(sqrt18)^2-2(sqrt18)(sqrt18)cos((2pi)/3)$

$c = sqrt(54)$

A circle has a chord that goes from ( pi)/6 ( pi)/6 to (5 pi) / 6 (5 pi) / 6 radians on the circle. If the area of the circle is 18 pi 18 pi , what is the length of the chord?