If the line 2x + √6y = 2 is tangent to the hyperbola x2 − 2y2 = 4 then the point of contact is.
There is a set of questions in which we can compare 2 equations representing the same curve and find the parameters. This question is one among them.
We are asked the point of contact. We know the standard form of a tangent at a point (x1, y1). This equation can be compared with the given equation of tangent to
find out the point of contact.
The given hyperbola is,
x2 − 2y2 = 4
the tangent at a point (x1, y1) is,
xx1 − 2yy1 − 4 = 0
Now we compare it with the given tangent which is said to be the same after making the constant term the same by multiplying with a constant number if needed.
2x+√6y−2=0
i.e.,4x+2√6y−4=0
x1=4
−2y1=2√6
y1=−√6
∴(x1, y1)=(4,−√6)