1.  Given the function y = x 2, copy and complete the table below for the values of this function. Then sketch these points on a coordinate plane. WARM UP SEPT. 11 TH XY -3 -2 0 1 2 3

2. September 11 th PROPERTIES OF QUADRATIC EQUATIONS

3.  This is the math term for the u-shape of a quadratic function.  Any quadratic function (one with an x 2 term), will have this same basic shape. PARABOLA

4. y = Ax 2 + Bx + C STANDARD FORM OF QUADRATIC FUNCTIONS

5.  Direction of opening- which way the open side of the parabola is facing.  y-intercept- where the graph crosses the y-axis. WHAT INFORMATION CAN I FIND FROM THE GRAPH OF A PARABOLA?

6. Take a look at the graphs of y = x 2 and y = -x 2. THINK/PAIR/SHARE: What is different about the two equations? How does this affect the graph? WE CAN ALSO FIND OUT INFORMATION ABOUT A PARABOLA FROM ITS EQUATION

7. Direction of opening: If a>0, the direction of opening is UP. If a<0, the direction of opening is DOWN. Example: y = 5x 2 + 10x – 7 WE CAN ALSO FIND OUT INFORMATION ABOUT A PARABOLA FROM ITS EQUATION

8.  Y-intercept: in standard form, c gives us the y-intercept. y = ax 2 + bx + c  Example: y = 5x 2 + 10x – 7 WE CAN ALSO FIND OUT INFORMATION ABOUT A PARABOLA FROM ITS EQUATION

9.  y = -8x 2 + 2x + 1  y = 6x 2 – 24x - 4 GIVE THE DIRECTION OF OPENING AND Y- INTERCEPT OF THE FOLLOWING:

10.  Vertex- the point where your graph changes directions. (h, k) it is the same as your min or max value.  Axis of Symmetry- vertical line through the vertex that cuts the graph in half. WHAT INFORMATION CAN I FIND FROM THE GRAPH OF A PARABOLA?

11.  Axis of symmetry: we can use the formula to find the AOS.  Vertex: plug the AOS in for x and find the y value of the vertex.  Example: y = 5x 2 + 10x – 7 WE CAN ALSO FIND OUT INFORMATION ABOUT A PARABOLA FROM ITS EQUATION

12.  y = -8x 2 + 2x + 1  y = 6x 2 – 24x - 4 FIND THE AXIS OF SYMMETRY AND VERTEX OF EACH OF THE FOLLOWING:

13.  Vertex: (1, 2)  The axis of symmetry is the vertical line that cuts the parabola in half. The equation of the AOS is the x-value of the vertex. WE CAN ALSO USE THE VERTEX TO FIND THE AXIS OF SYMMETRY AOS: Min. value:

14.  Maximum or minimum value- highest or lowest point of the graph  The max/min is the y-value of the vertex WHAT INFORMATION CAN I FIND FROM THE GRAPH OF A PARABOLA?

15.  Direction of opening  Y-intercept  Vertex  AOS  Max/Min LET’S TAKE A LOOK AT A FEW PARABOLAS

16. DIRECTION OF OPENING, Y-INTERCEPT, VERTEX, AOS, MAX/MIN

17.  Find the y-intercept, direction of opening, vertex, AOS, and max/min value of the following function. Write these on your sticky note then put it on the board. STICKY NOTE PROBLEM

18.  What would the graph do if we expanded the view further left and right?  We use the parabola’s direction of the opening. END BEHAVIOR

19.  Sketch the graph of the parabolas below:  y = -7x 2 + 15x - 2  y = 3x 2 + 4x + 2  What do you predict will happen as the graph continues to the left and right? PREDICTIONS

20.  If a>0, the end behavior will be that the graph goes “up to the left and up to the right”  If a<0, the end behavior will be that the graph goes “down to the left and down to the right” END BEHAVIOR

21.  y = x 2 - 10x - 11  y = -x 2 + 8x + 12  y = -2x 2 + 6x + 56  y = 4x 2 - 4x - 32 DESCRIBE THE END BEHAVIOR OF THE GRAPHS WITH THE FOLLOWING EQUATIONS

22.  Graphing: visually identify the intersections.  Factoring: factor the equation then set each set of parentheses equal to 0 and solve for x.  Quadratic Formula: plug A, B and C into the formula and simplify. ZEROS, ROOTS, X-INTERCEPTS

23.  The x-values that show where the parabola crosses the x-axis  We will find these values by graphing, factoring, or using the quadratic formula. ZEROS, ROOTS, X-INTERCEPTS

24. IDENTIFY THE ZEROS IN THE GRAPHS

25.  y = x 2 - 10x - 11  y = -3x 2 + 12  y = -2x 2 + 6x + 56  y = 4x 2 - 8x - 32 FACTOR TO FIND THE ZEROS

26.  Worksheet  Complete the table  You may not be able to find zeros for each row if graph is not clear HOMEWORK

27.  Sketch the graph, and identify the following:  Direction of opening  Y-intercept  Vertex  AOS  Zeros (factor)  Max or Min WARM UPSEPT. 12 TH f(x) = 2x 2 – 10x + 12

28. Sept. 12 th INCREASING, DECREASING, & INTERVAL NOTATION

30.  The direction of the curve of a parabola  Don’t forget about your end behavior!! INCREASING VS. DECREASING

31.  We can show the region of the graph that is increasing by an interval.  Intervals describe the range of x-values that meet the given requirement. INTERVALS

32.  In this graph, the interval where the parabola is increasing is from -  to -1.  The graph is decreasing from _____ to _____. INCREASING VS. DECREASING

33.  Describe where the graphs are increasing and where they are decreasing INCREASING VS. DECREASING

34.  We use interval notation to abbreviate the description.  List the starting and ending points of your interval, separated by a comma.  -  to -1 will look like: - , -1  Then we decide if there should be parentheses () or brackets []  Parentheses indicate that the graph does not include the endpoint  Brackets indicate that the graph does include the endpoint  On a graph, we can see this with open and closed circles  Open Circles indicate we are NOT including the point: ()  Closed Circles indicate that we ARE including the point: [] INTERVAL NOTATION

35.  Use interval notation to describe where the graphs are increasing and decreasing INTERVAL NOTATION

36. TRY SOME WITH CIRCLES

37.  Sometimes we have graphs that increase in more than one place.  Rather than write out the word “and” we use the symbol “  ”  We call this a Union. TRANSLATION:

38.  Using our new math vocabulary and our knowledge of interval notation, describe the increasing and decreasing parts of the graph. LET’S LOOK AT THIS GRAPH AGAIN…

39.  Find the interval notation, set notation, and graph on a number line  With a partner! INTERVAL NOTATION WORKSHEET

40.  Worksheet  ODDS HOMEWORK

41.  Sketch the graph, and identify the following:  Direction of opening  Y-intercept  Vertex  AOS  Zeros (factor)  Max or Min  Increasing and decreasing intervals WARM UPSEPT. 13 TH F(x) = -2x 2 + 8x – 3

42.  You need to make 2 posters today!  You will work TOGETHER with 1-2 other people.  This is not an individual task that multiple names get put on.  I will have up what is needed for every poster.  This is a QUIZ grade! So use your time wisely and work your hardest! POSTERS

43. 1.Equation 2.Table of x and y values 3.Sketch the graph 4.Find and label the y -intercept 5.Find and label the vertex 6.Give the axis of symmetry 7.Give the min/max value 8.Give the direction of opening 9.Zeros if you can identify them. 10.Interval notation for increasing and decreasing curves ON YOUR POSTER YOU SHOULD INCLUDE THE FOLLOWING:

44.  Worksheet from yesterday  EVENS HOMEWORK