The tangents from origin to the parabola y2+4=4x are inclined at.
Given parabola is,
y2=4x−4
=4(x−1)
The tangent at a point (x1,y1) is given by
yy1=4(x+x12−1)
This passes through (0,0)
0=4.[x12−1]
x1=2
y21=4.[1]
y1=±2
∴ points of contact of tangent are (2,2),(2,-2)
slopes of tangents, m1=1,m2=−1
∴ Angle betwwen the tangents=90∘