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5-2 Properties of Parabolas Hubarth Algebra II. The graph of a quadratic function is a U-shaped curve called a parabola. You can fold a parabola so that.

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Presentation on theme: "5-2 Properties of Parabolas Hubarth Algebra II. The graph of a quadratic function is a U-shaped curve called a parabola. You can fold a parabola so that."— Presentation transcript:

1 5-2 Properties of Parabolas Hubarth Algebra II

2 The graph of a quadratic function is a U-shaped curve called a parabola. You can fold a parabola so that the two sides match exactly. This property is called symmetry. The fold or line that divides the parabola into two matching halves is called the axis of symmetry. The highest or lowest point of a parabola is its vertex, which is a point on the axis of symmetry.

3 The vertex is the minimum point or the lowest point of the parabola. The vertex is the maximum point or highest point of the parabola. When the quadratic is in these two forms the vertex are always as follows

4 Ex 1 Identifying a Vertex Identify the vertex of each graph. Tell whether the vertex is a minimum or a maximum. a. The vertex is (1, 2). b. The vertex is (2, –4). It is a maximum.It is a minimum.

5 Make a table of values and graph the quadratic function y = x 2. 1313 x y = x 2 (x, y) 1313 0 (0) 2 = 0 (0, 0) 1313 2 (2) 2 = 1 (2, 1 ) 1313 1313 1313 3 (3) 2 = 3 (3, 3) 1313

6 Use the graphs below. Order the quadratic functions  (x) = –x 2,  (x) = –3x 2, and  (x) = x 2 from widest to narrowest graph. 1212  (x) = –x 2  (x) = x 2 1212 Of the three graphs,  (x) = x 2 is the widest and  (x) = –3x 2 is the narrowest. So, the order from widest to narrowest is  (x) = x 2,  (x) = –x 2,  (x) = –3x 2. 1212 1212  (x) = –3x 2 Ex 3 Comparing Widths of Parabolas

7 Graph the quadratic functions y = 3x 2 and y = 3x 2 – 2. Compare the graphs. The graph of y = 3x 2 – 2 has the same shape as the graph of y = 3x 2, but it is shifted down 2 units. x y = 3x 2 y = 3x 2 – 2 212 10 13 1 00  2 –1 3 1 212 10

8

9 Graph the function y = 2x 2 + 4x – 3. Step 1: Find the equation of the axis of symmetry and the coordinates of the vertex. Find the equation of the axis of symmetry.x = b2ab2a – = –4 2(2) = – 1 The axis of symmetry is x = –1. The vertex is (–1, –5). y = 2x 2 + 4x – 3 To find the y-coordinate of the vertex, substitute –1 for x. y = 2(–1) 2 + 4(–1) – 3 = –5

10 Step 2: Find two other points on the graph. For x = 0, y = –3, so one point is (0, –3). Use the 0 and -2 The other point is -2 Let x = -2 Find the y-coordinate for x = -2. y = 2(-2) 2 + 4(-2) – 3 = -3 For x = -2, y = -3, so another point is (-2, -3).

11 Step 3: Plot (0, –3) and (-2, -3) and the vertex (-1, -5)...

12 Step 4 Draw the parabola.

13 Practice v(1, 8). v(3, 0).

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