Show that for any quadratic function of the from y=a(x-p)(x-q), the tangents at the x-intercepts always intersect at the axis of symmetry. (Answer: x = (p + q) / 2)
-
I answered a question very similar to this just a few minutes ago, but asking for y-coordinate of point where tangents at x-intercepts intersect.
Did you ask that question, because I can't find it anymore.
I'm leery about answering another such question if it's just going to get deleted (not a nice thing to do to someone)
Ματπmφm
Did you ask that question, because I can't find it anymore.
I'm leery about answering another such question if it's just going to get deleted (not a nice thing to do to someone)
Ματπmφm