Length of Chord in Circle
By Anthony Cardell Tony on Wednesday,
January 02, 2002 - 03:25 am:
I was wondering if anyone could help me with the solution to
this problem:
An a-degree arc makes a chord of 22 cm (radius of circle upon
which chord is constructed is not given). A 3a degree arc makes a
chord 20 centimeters shorter than a 2a degree arc. What is the
length of the 3a degree chord?
Thanks in advance
By Kerwin Hui on Wednesday, January 02,
2002 - 05:55 pm:
Let r be the radius of the circle.
We have the conditions
2rsina = 22
2rsin2a-2r sin3a = 20
where a = a/2. Now the second equation can be written as
2rsinacosa-rsina(3-4sin2a)=10
i.e. 22cosa-11(4cos2a-1)=10
i.e. 1+22cosa-44cos2a = 0
and now solve for cosa. From here, it is easy to find the length of
our chord.
Kerwin
By Anthony Cardell Tony on Thursday,
January 03, 2002 - 03:13 am:
Thanks for the help!
I just have one question about the solution.
Once you have cosa, do you just go find the values of everything
else (radius, cos2a etc.) based on this, and then plug that into the
final answer, or is there a shortcut that I don't see?
By Kerwin Hui on Thursday, January 03,
2002 - 07:17 am:
The chord has length 2rsin3a and recall that
r=11/sina. You need not find the sines of the angles, since
sin3a = sina(4cos2a-1)
Kerwin