How do you sketch the graph of #y=(x-9)^2+5# and describe the transformation?

1 Answer
Robert W. · EZ as pi
Jul 8, 2017

Translation of #y=x^2#

Explanation:

When a quadratic is in the form #y=(x-p)^2+q# such as this, the negative of #p# tells us the #x# coordinate of the vertex of the graph and #q# tells us the #y# coordinate.

ie vertex is #(-p, q)#

Consider the graph #y=x^2# and you will notice that it has shifted (translation) #9# units to the right #-(-9) and 5# units up. We often write this in column vector form:

#((9),(5))#

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