4th Period Polynomial Graphing by Lisa Austin

4th Period Polynomial Graphing by Lisa Austin https://padlet.com/laustin6/p5yyvoobn720 Made with ♥ en-us 2016-12-01 17:17:09 UTC 2016-12-01 17:39:13 UTC hello@padlet.com Table 7 https://padlet.com/laustin6/p5yyvoobn720/wish/141185748 -The smaller the a value, the wider the graph
-when it has an odd degree that is negative, the graph contains weird tiny dips
-the number of binomial factors is the number of dips in the graph
-if you put all of the graphs together on desmos it looks like art
-if the a value is negative, the graph opens down
-All even-degree polynomials behave, on their ends, like quadratics, and all odd-degree polynomials behave, on their ends, like cubics

]]> 2016-12-01 17:20:07 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141185748 Table 1 gboldt19 https://padlet.com/laustin6/p5yyvoobn720/wish/141185874 If the polynomial has a degree n then the graph will have no more than n-1 turning points
If the polynomial has a degree n, and it is odd, then the graph will both increase and decrease]]> 2016-12-01 17:20:20 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141185874 Table 3 https://padlet.com/laustin6/p5yyvoobn720/wish/141185899 - Graphs of polynomials with even degrees have end that both diverge in the same direction. The ends of odd degree graphs diverge in opposite directions
- Larger coefficient leads to sharper curves in the graph
- Some polynomial graphs are combinations of graphs, made by connecting the graphs of their factors with degrees greater than one]]> 2016-12-01 17:20:23 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141185899 Table 5 https://padlet.com/laustin6/p5yyvoobn720/wish/141185922 - The leading degree of the polynomial determines the shape of the graph. If it is even, then both ends of the graph will go in the same direction. If it is odd, then the ends will travel separate ways.

]]> 2016-12-01 17:20:25 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141185922 Table 6 mjavellana19 https://padlet.com/laustin6/p5yyvoobn720/wish/141186183 -Each of the roots, e.g. (x-6) are where the graph hits 0
-If the leading coefficient is positive, the graph opens upwards, and if negative, the graph opens downwards

]]> 2016-12-01 17:20:59 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141186183 Table 2 hyoder19 https://padlet.com/laustin6/p5yyvoobn720/wish/141186633 If the leading coefficient is positive, then the last line on the graph opens up, and if it is negative the last line on the graph opens down. The exponent determines the number of dips. ]]> 2016-12-01 17:21:58 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141186633 Table 4 https://padlet.com/laustin6/p5yyvoobn720/wish/141188255 - the exponent determines the number of arcs.
- the leading coefficient determines the width of the graph.
- the number of x's determine the number of zeros
- the more exponents the shorter the "wavelength" is ]]> 2016-12-01 17:25:47 UTC https://padlet.com/laustin6/p5yyvoobn720/wish/141188255