Biot-Savart Law Difficult Problem

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Homework Statement


A short, straight wire segment of length l carries current I and is oriented so that it makes an angle of 30° with the horizontal. Point P is a distance r below the wire segment.

Which expression below is the best approximation for the magnetic field caused by the wire segment at point P?

http://online.physics.uiuc.edu/cgi/courses/shell/common/showme.pl?courses/phys212/oldexams/exam2/fa09/fig15.gif

(a) (μoIlcos30°) / (4π^2)
(b) (μoIlsin30°) / (4π^2)
(c) (μoIl) / (4π^2)

Homework Equations



dB = (μo Idl x r(unit vector)) / (4πr^2)

The Attempt at a Solution



It seems I have to integrate to get the answer, however the geometry behind this problem is really confusing me. I believe I have to integrate r from when it touches the beginning of the wire segment to the end of the wire segment, however I can't figure out how to manipulate the Biot-Svart law to do that. This is what I have so far:

(μo I)/(4π) = S sin(theta)ds/r^2 (S = integral :p)

Now, what do I do with ds?
Can anyone help me out, help would be greatly appreciated :]!

Btw π = pi and μo = mu(0), don't know if you can tell.
 
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You can keep r fixed. Resolve current element I*l into two components, I*l*cos(theta) and I*l*sin(theta). The point P lies on equatorial line to I*l*cos(theta). So it contributes to magnetic field.
The point P lies on axial line to I*l*sin(theta). So it does contributes to magnetic field.
 
Ok, but then where does the pi^2 term come from in the denominator?
Also, the answer is (a) which makes since for the cos, but the pi^2 is what I don't get...
 
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Ok, I know the answer just by looking at the choices. What I am trying to figure out is where part of that answer comes from. I don't see where that pi^2 in the denominator comes from.