I need to find the area bounded by the curves :
$$ x^2 + y^2 = 1, \ y^2= x\sqrt3, \ x \geqslant \frac{y^2}{\sqrt3} $$
My attempt:
$$ \int^{\frac{\pi}{2}}_{\frac{3\pi}{2}} \int^{\text{some complicated number}}_{-\text{some complicated number}} \left( r\sin{\theta^2} -\sqrt3r\cos{\theta} \right)\ \mathrm{d}r \ \mathrm{d}\theta $$
I think that plus or minus $$ \text{some complicated number}$$
is a point where $$x^2 + y^2 = 1$$ and $$ y^2= x\sqrt3$$
intersect.
Am I on the right track with this question? Don't give me the answer please I want to figure it out myself, but I'd like to know if I am on the right track.
My understanding is that this is a circle, with a hill shape cut into the side of it and I'm integrating the area between the circle and the other shape.
The first integral refers to the quadrant of the area, the second integral is the specific area in the quadrant being integrated (i.e. the limits) and the function (i.e. the hill) gets turned into the polar coordinates function.

This integral is easy to calculate. However, If you don't want to calculate the first one by using the standard integration, we can write it as