Question

How do you find the unit vector, in the first quadrant, that is parallel to the line tangent to the parabola y = x^2 at the point (4, 16)?

Answer 1

(1/sqrt 65, 8/sqrt 65)

Explanation:

The slope of the tangent `tan psi` = y', at x=4, = 2 x, at x=4, =8 > 0..

So, the principal value of `psi` is in `(0. pi/2)`.

And so,`cos psi=1/sqrt 65 and sin psi =8/sqrt 65`.

For the opposite direction, `psi=psi+pi`, and both sin and cos will

be < 0... .

The unit vector for inclination `psi` to the x-axis is

`(cos psi, sin psi)=(1/sqrt 65, 8/sqrt 65)`

The unit vector in this direction could be anywhere in the plane.

The reference to first quadrant, for its presence, is not necessary..