00:01
This problem shows us the image of a graph and its behavior around the x -axis and its in -behaviors, but no actual values.
00:07
And we want to fill in the blanks that we are given based off this information.
00:10
So with the first statement when we're talking about the degree, the main thing that we can focus on and figure out from the degree, or for the degree, based off of a graph that we see with no other information for the x values, is if it's even or odd.
00:24
Since we have end behaviors that are doing two different things, that automatically means that we have, have an odd degree.
00:32
So when we now look at the leading coefficient, that also is based off of how the end behaviors are shown, because if we want the leading coefficient and we just want the sign, if it's positive or negative, the way we figure that out is by looking at the in behaviors compared to the original positive orientation of a degree that is odd.
00:53
And an easy one to remember is x cubed.
00:56
And x cubed with a positive leading coefficient would have the left hand go.
01:00
Down and the right hand rise or go up as you move from left to right...