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11 x1 t11 06 tangents & normals ii (2012)

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Nigel Simmons
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Tangents & Normals (ii) Using Cartesian
Tangents & Normals (ii) Using Cartesian (1) Tangent
Tangents & Normals (ii) Using Cartesian (1) Tangent y x 2  4ay x
Tangents & Normals (ii) Using Cartesian (1) Tangent y x 2  4ay P( x1 , y1 ) x
Tangents & Normals (ii) Using Cartesian (1) Tangent y x 2  4ay P( x1 , y1 ) x
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a P( x1 , y1 ) x
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a P( x1 , y1 ) x
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a 2ay  2ay1  xx1  x12
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a 2ay  2ay1  xx1  x12 2ay  2ay1  xx1  4ay1
Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a 2ay  2ay1  xx1  x12 2ay  2ay1  xx1  4ay1 xx1  2a y  y1 
(2) Normal
(2) Normal y x 2  4ay x
(2) Normal y x 2  4ay P( x1 , y1 ) x
(2) Normal y x 2  4ay P( x1 , y1 ) x
(2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a x
(2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1
(2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1  2a y  y1   x  x1  x1
(2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1  2a y  y1   x  x1  x1 x1 y  x1 y1  2ax  2ax1
(2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1  2a y  y1   x  x1  x1 x1 y  x1 y1  2ax  2ax1 2ax  x1 y  2ax1  x1 y1
(3) Line cutting/touching/missing parabola
(3) Line cutting/touching/missing parabola y x 2  4ay x
(3) Line cutting/touching/missing parabola y x 2  4ay x
(3) Line cutting/touching/missing parabola y x 2  4ay x
(3) Line cutting/touching/missing parabola y x 2  4ay y  mx  b x
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 x
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 x
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b 
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0 one solution (touches) when am2  b  0
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0 one solution (touches) when am2  b  0 (common idea)
(3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0 one solution (touches) when am2  b  0 (common idea) no solutions (misses) when am2  b  0
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2).
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m 
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0 m  1 or m  2
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0 m  1 or m  2  tangents are y  x  1 and y  2 x  4
e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 Exercise 9G; 1ac, 2ac, 3a, 4, 7, 9, 11, 12, line is a tangent if   0 13, 15, 17, 18  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0 m  1 or m  2  tangents are y  x  1 and y  2 x  4

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  • 1. Tangents & Normals (ii) Using Cartesian
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  • 3. Tangents & Normals (ii) Using Cartesian (1) Tangent y x 2  4ay x
  • 4. Tangents & Normals (ii) Using Cartesian (1) Tangent y x 2  4ay P( x1 , y1 ) x
  • 5. Tangents & Normals (ii) Using Cartesian (1) Tangent y x 2  4ay P( x1 , y1 ) x
  • 6. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a P( x1 , y1 ) x
  • 7. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a P( x1 , y1 ) x
  • 8. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x
  • 9. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a
  • 10. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a
  • 11. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a 2ay  2ay1  xx1  x12
  • 12. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a 2ay  2ay1  xx1  x12 2ay  2ay1  xx1  4ay1
  • 13. Tangents & Normals (ii) Using Cartesian (1) Tangent x2 y x 2  4ay y 4a dy x  dx 2a dy x1 P( x1 , y1 ) when x  x1 ,  dx 2a x x1  slope of tangent is 2a x y  y1  1  x  x1  2a 2ay  2ay1  xx1  x12 2ay  2ay1  xx1  4ay1 xx1  2a y  y1 
  • 15. (2) Normal y x 2  4ay x
  • 16. (2) Normal y x 2  4ay P( x1 , y1 ) x
  • 17. (2) Normal y x 2  4ay P( x1 , y1 ) x
  • 18. (2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a x
  • 19. (2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1
  • 20. (2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1  2a y  y1   x  x1  x1
  • 21. (2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1  2a y  y1   x  x1  x1 x1 y  x1 y1  2ax  2ax1
  • 22. (2) Normal y x 2  4ay P( x1 , y1 ) x1 1 Show the slope of tangent at P is 2a 2a x 2  slope of normal is  x1  2a y  y1   x  x1  x1 x1 y  x1 y1  2ax  2ax1 2ax  x1 y  2ax1  x1 y1
  • 24. (3) Line cutting/touching/missing parabola y x 2  4ay x
  • 25. (3) Line cutting/touching/missing parabola y x 2  4ay x
  • 26. (3) Line cutting/touching/missing parabola y x 2  4ay x
  • 27. (3) Line cutting/touching/missing parabola y x 2  4ay y  mx  b x
  • 28. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x
  • 29. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x
  • 30. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 x
  • 31. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 x
  • 32. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x
  • 33. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0
  • 34. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac
  • 35. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2
  • 36. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b 
  • 37. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0
  • 38. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0 one solution (touches) when am2  b  0
  • 39. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0 one solution (touches) when am2  b  0 (common idea)
  • 40. (3) Line cutting/touching/missing parabola y x 2  4ay parabola and tangent meet when; y  mx  b x 2  4a  mx  b  x 2  4amx  4ab  0 two solutions (cuts) when   0 one solution (touches) when   0 x no solutions (misses) when   0   b2  4ac   4am   4 1 4ab  2  16a 2 m 2  16ab  16a  am 2  b   two solutions (cuts) when am2  b  0 one solution (touches) when am2  b  0 (common idea) no solutions (misses) when am2  b  0
  • 41. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2).
  • 42. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b
  • 43. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b
  • 44. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m
  • 45. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m
  • 46. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y
  • 47. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m 
  • 48. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0
  • 49. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0
  • 50. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2
  • 51. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0
  • 52. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0
  • 53. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0 m  1 or m  2
  • 54. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 line is a tangent if   0  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0 m  1 or m  2  tangents are y  x  1 and y  2 x  4
  • 55. e.g. Find the equation of the two tangents to the parabola x 2  4 y passing through the point (3,2). tangent will be of the form y = mx + b  2  3m  b b  2  3m tangents are y  mx  2  3m x2  4 y x 2  4  mx  2  3m  x 2  4mx  12m  8  0 Exercise 9G; 1ac, 2ac, 3a, 4, 7, 9, 11, 12, line is a tangent if   0 13, 15, 17, 18  4m   4 112m  8  0 2 16m2  48m  32  0 m2  3m  2  0  m  1 m  2   0 m  1 or m  2  tangents are y  x  1 and y  2 x  4