SOLUTION: f(x)=-3X^2+6x-2, x<2, (x/2)+1, x>=2
As a pair in f(x)
Find and state (x,y) coordinates for any relative max an min accurate to 1 decimal
identify the intervals of the doma
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-> SOLUTION: f(x)=-3X^2+6x-2, x<2, (x/2)+1, x>=2
As a pair in f(x)
Find and state (x,y) coordinates for any relative max an min accurate to 1 decimal
identify the intervals of the doma
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Question 1051428: f(x)=-3X^2+6x-2, x<2, (x/2)+1, x>=2
As a pair in f(x)
Find and state (x,y) coordinates for any relative max an min accurate to 1 decimal
identify the intervals of the domain where its increasing and decreasing.
The TI-89 is saying define? Answer by ewatrrr(24785) (Show Source):
You can put this solution on YOUR website! Need to Know:
the vertex form of a Parabola opening up(a>0) or down(a<0),
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f(x)=-3x^2+6x-2
f(x)=-3(x^2-2x + 1) -3 -2
f(x)=-3(x - 1)^2 -5
Parabola opening Downward -3 < 0
(1, -5) relative max
check graph for increasing and decreasing:
