How do you graph #f(x)=-(x-3)^2-2# and identify the x intercepts, vertex?

1 Answer
Jan 4, 2017

#f(x) = -(x-3)^2-2#

Please remember that
#f(x) = a(x-p)^2+p#,
means a = -ve, graph has max point and if a =+ve, graph has minimum point. The max or min point is at (p,q)

Therefore,
-ve sign infront of (x-3) means that it has a maximum point and it point / vertex is at (3,-2).

x intercept when f(x) =0.
therefore,

#0 = -(x-3)^2-2#
#(x-3)^2 =-2#
#(x-3) = sqrt(-2)#

This equation unable to determine, therefore there is no x-intercept or we can say that there is no real root for this equation.