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11X1 T10 02 quadratics and other methods (2011)

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Nigel Simmons
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Quadratics and Completing the Square
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12   x  4  4 2
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12   x  4  4 2  vertex is  4, 4 
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12 x intercepts   x  4  4 2  vertex is  4, 4 
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts   x  4  4 2  vertex is  4, 4 
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4 
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0 
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)   y  k  x  5  3 2
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)   y  k  x  5  3 2  2,0  : 0  k  2  5   3 2
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)   y  k  x  5  3 2 9k  3  2,0  : 0  k  2  5   3 1 k  2 3
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)  2  y  k  x  5  3 9k  3 1  y    x  5  3 3 2     2,0  : 0  k  2  5  3 2 k  1 3
Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)  2  y  k  x  5  3 9k  3 1  y    x  5  3 3 2     2,0  : 0  k  2  5  3 2 k  1 3 y    x  10 x  16  1 2 3
Quadratics and the Discriminant
Quadratics and the Discriminant   b 2  4ac
Quadratics and the Discriminant   b 2  4ac b  vertex   ,     2a 4a 
Quadratics and the Discriminant   b 2  4ac b  vertex   ,     2a 4a  b   zeroes  2a
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a  b   zeroes  2a
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b   zeroes  2a
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16   8 ,  16   vertex     2 4
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16   8 ,  16   vertex     2 4   4, 4 
Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16 Exercise 8B; 1cfi, 2bd, 3c, 4b, 6bei, 10b,   8 ,  16  11d, 16, 17, 20*  vertex     2 4 Exercise 8C; 1adg, 2adg, 3ad, 5ac, 8ac,   4, 4  10, 13*

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11X1 T04 05 sine rule (2011)
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11X1 T07 01 radian measure (2011)
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11X1 T10 05 curve sketching (2011)
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11X1 T04 06 cosine rule (2011)
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X2 T06 04 uniform circular motion (2011)
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11X1 T02 02 rational & irrational (2011)
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X2 T01 02 complex equations (2011)
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12X1 T04 03 further growth & decay (2011)
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X2 T01 03 argand diagram (2011)
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11X1 T05 04 probability & counting techniques (2011)
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11X1 T10 01 first derivative (2011)
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11X1 T15 05 polynomial results (2011)
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11 x1 t15 02 sketching polynomials (2013)
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12X1 t01 03 integrating derivative on function (2012)
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11x1 t07 01 angle theorems - 2012
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12 x1 t04 04 travel graphs (2012)
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11X1 T13 04 converse theorems (2011)
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11X1 T10 02 quadratics and other methods (2011)

  • 2. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12
  • 3. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12
  • 4. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12   x  4  4 2
  • 5. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12   x  4  4 2  vertex is  4, 4 
  • 6. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12 y  x 2  8 x  12 x intercepts   x  4  4 2  vertex is  4, 4 
  • 7. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts   x  4  4 2  vertex is  4, 4 
  • 8. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4 
  • 9. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2
  • 10. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2
  • 11. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0 
  • 12. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)
  • 13. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)   y  k  x  5  3 2
  • 14. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)   y  k  x  5  3 2  2,0  : 0  k  2  5   3 2
  • 15. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)   y  k  x  5  3 2 9k  3  2,0  : 0  k  2  5   3 1 k  2 3
  • 16. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)  2  y  k  x  5  3 9k  3 1  y    x  5  3 3 2     2,0  : 0  k  2  5  3 2 k  1 3
  • 17. Quadratics and Completing the Square e.g. Sketch the parabola y  x 2  8 x  12  x  4  4  0 2 y  x 2  8 x  12 x intercepts  x  4  4 2   x  4  4 2  vertex is  4, 4  x  4  2 x  4  2 x  6 or x  2  x intercepts are  6,0  and  2,0  (ii) Write down the quadratic with roots 2 and 8 and vertex (5,3)  2  y  k  x  5  3 9k  3 1  y    x  5  3 3 2     2,0  : 0  k  2  5  3 2 k  1 3 y    x  10 x  16  1 2 3
  • 18. Quadratics and the Discriminant
  • 19. Quadratics and the Discriminant   b 2  4ac
  • 20. Quadratics and the Discriminant   b 2  4ac b  vertex   ,     2a 4a 
  • 21. Quadratics and the Discriminant   b 2  4ac b  vertex   ,     2a 4a  b   zeroes  2a
  • 22. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a  b   zeroes  2a
  • 23. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b   zeroes  2a
  • 24. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a
  • 25. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12
  • 26. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16
  • 27. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16   8 ,  16   vertex     2 4
  • 28. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16   8 ,  16   vertex     2 4   4, 4 
  • 29. Quadratics and the Discriminant   b 2  4ac b  vertex   ,    Note: if   0, no x intercepts  2a 4a    0, one x intercept b     0, two x intercepts zeroes  2a e.g. Sketch the parabola y  x 2  8 x  12   82  4 112   16 Exercise 8B; 1cfi, 2bd, 3c, 4b, 6bei, 10b,   8 ,  16  11d, 16, 17, 20*  vertex     2 4 Exercise 8C; 1adg, 2adg, 3ad, 5ac, 8ac,   4, 4  10, 13*