What is the vertex form of #y= x^2 -x - 11 #?

1 Answer
A. S. Adikesavan
Sep 27, 2016

Vertex form is #(x-1)^2=y+45/4#.
The vertex or this parabola is #V(1, -45/4)#

Explanation:

The equation #(x-alpha)^2=4a(y-beta)# represents the parabola with

vertex at #V( alpha, beta)#, axis VS along #x = alpha#, focus at

#S(alpha, beta+a)# and directrix as #y=beta-a#

Here, the given equation can be standardized as

#(x-1)^2=y+45/4#. giving #a = 1'4, alpha = 1 and beta =-45/4#.

Vertex is #V(1, -45/4)#

Axis is x=1.

Focus is S(1, -11).

Directrix is #y=-49/4#

Related questions
See all questions in Vertex Form of a Quadratic Equation
Impact of this question
2077 views around the world
You can reuse this answer
Creative Commons License