Answer to Question #7551 in Algebra for emmaa

Question #7551
sketching parabola of the form ax2+bx+c
y=5x2-30x+25
1
Expert's answer
2012-03-20T09:19:58-0400
How to graph parabolas you can find out from our video on the topic:



Also you can find additional information here:


Graph of your parabola is the following:
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