I have a parabola y = x^2 and a circle x^2 + y^2 - 5/2y + 9/16 = 0
Parabola and circle have a common tangent in the point with the x-coordinate of sqrt(3)/2.
I need to find the tangent's equation.
So far, I found the circles' center (0, 5/4) and radius = 1
You are given the x-coordinate of the shared point of tangency. Plug this into either one of the original equations to find the y-coordinate, and thus the coordinates of that point.
For a line to be "tangent" to another figure, it must just touch the figure, rather that crossing it. For a circle, this means that the tangent line at a point must be perpendicular to the radius line at that point. (Otherwise, the line would pass through the circle, rather than only touching it.)
You have the center and the point of tangency. What is the slope
between these two points? What then is the perpendicular slope?
Plug this perpendicular slope
and the point of tangency
into the point-slope formula
to find your line equation.
If you get stuck, please reply showing how far you have gotten. Thank you!