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Shifting.

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Presentation on theme: "Shifting."— Presentation transcript:

1 Shifting

2 x f(x) 1 or -1 1 2 or -2 4 3 or -3 9 4 or -4 16 x f(x) + 3 3 1 or -1 4 2 or -2 7 3 or -3 12 4 or -4 19

3 (4, 19) (4, 16)

4 Vertical Shifting If c is positive, then a graph of y = f(x) + c will be shifted c units vertically upward. If c is positive, then a graph of y = f(x) – c will be shifted c units vertically downward.

5 x f(x) 1 or -1 1 2 or -2 4 3 or -3 9 4 or -4 16 x f(x) -3 -4 or -2 1 -5 or -1 4 -6 or 0 9 - 7 or 1 16

6 (4, 16) (1, 16)

7 x f(x) 1 or -1 1 2 or -2 4 3 or -3 9 4 or -4 16 x f(x) 3 2 or 4 1 1 or 5 4 0 or 6 9 -1 or 7 16

8 (4, 16) (7, 16)

9 Horizontal Shifting If c > 0, the graph of y = f(x – c) will be shifted horizontally c units right from the graph of y = f(x). If c > 0, the graph of y = f(x + c) will be shifted horizontally c units left from the graph of y = f(x).

10 REFLECTIONS

11 x f(x) 1 or -1 1 2 or -2 4 3 or -3 9 4 or -4 16 x f(x) 1 or -1 -1 2 or -2 -4 3 or -3 -9 4 or -4 -16

12 (4, 16) (4, -16)

13 Vertical Reflection The graph of y = -f(x) will be reflected vertically over the x-axis from y = f(x).

14 x f(x) 1 4 2 9 3 16

15 x f(x) -1 1 -4 2 -9 3 -16 4

16 (4, 2) (-4, 2)

17 Horizontal Reflection
The graph of y = f(-x) would be reflected horizontally about the y-axis from y = f(x).

18 STRETCHING/COMPRESSING

19 x f(x) 1 or -1 1 2 or -2 4 3 or -3 9 4 or -4 16 x f(x) 1 or -1 2 2 or -2 8 3 or -3 18 4 or -4 32

20 (2, 8) (2, 4)

21 x f(x) 1 or -1 2 or -2 2 3 or -3 9/2 4 or -4 8

22 (4, 16) (4, 8)

23 Vertical Stretch or Compression
If c > 1, the graph of y = c f(x) will be stretched vertically by a factor of c from the graph of y = f(x). If 0 < c < 1, the graph of y = c f(x) will be compressed vertically by a factor of c from the graph of y = f(x).

24 x f(x) 1 4 2 9 3 16 x f(x) 1 2 9/2 3 8 4

25 (4, 2) (2, 2)

26 x f(x) 1 4 2 9 3 16 x f(x) 2 1 8 18 3 32 4

27 (4, 2) (8, 2)

28 Horizontal Stretch or Compression
If c > 1, the graph of y = f(cx) will be horizontally compressed by a factor of 1/c from the graph of f(x). If 0 < 1/c < 1, the graph of y = f((1/c)x) will be horizontally stretched by a factor of c from the graph of f(x).

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