11X1 T12 05 curve sketching (2010)

Curve Sketching
Look for; 1
 points of discontinu ity e.g. y  , x  0, y  0
x

Curve Sketching
Look for; 1
x
1
 asymptotes e.g. y  x  , x  0, y  x
x

Curve Sketching
Look for; 1
x
1
x
On the curve y  f  x 

Curve Sketching
Look for; 1
x
1
x
1 stationary points occur when f  x   0

Curve Sketching
Look for; 1
x
1
x
2 maximum turning point if f  x   0, f  x   0

Curve Sketching
Look for; 1
x
1
x
3 minimum turning point if f  x   0, f  x   0

Curve Sketching
Look for; 1
x
1
x
4 point of inflection if f  x   0 and there is a change in
concavity  f  x   0

Curve Sketching
Look for; 1
x
1
x
A curve is;

Curve Sketching
Look for; 1
x
1
x
A curve is;  increasing if f  x   0

Curve Sketching
Look for; 1
x
1
x
A curve is;  increasing if f  x   0
 decreasing if f  x   0

Curve Sketching
Look for; 1
x
1
x
A curve is;  increasing if f  x   0  concave up if f  x   0
 decreasing if f  x   0

Curve Sketching
Look for; 1
x
1
x
A curve is;  increasing if f  x   0  concave up if f  x   0
 decreasing if f  x   0  concave down if f  x   0

e.g. Sketch the curve y  x 3  6 x 2  9 x  5

dy
 3x 2  12 x  9
dx

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx dy
Stationary points occur when  0
dx

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx dy
dx
i.e. 3x 2  12 x  9  0

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx dy
dx
i.e. 3x 2  12 x  9  0
x2  4x  3  0
 x  1 x  3  0

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx dy
dx
i.e. 3x 2  12 x  9  0
x2  4x  3  0
 x  1 x  3  0
x  1 or x  3

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx dy
dx
i.e. 3x 2  12 x  9  0
x2  4x  3  0
 x  1 x  3  0
2
x  1 or x  3
d y
when x  1, 2  61  12
dx
 6  0

dy
 3x 2  12 x  9
dx
d2y
2
 6 x  12
dx
d3y
3
6
dx dy
dx
i.e. 3x 2  12 x  9  0
x2  4x  3  0
 x  1 x  3  0
2
x  1 or x  3
d y
when x  1, 2  61  12
dx
 6  0
 1,  1 is a maximum turning point

d2y
when x  3, 2  63  12
dx
60

d2y
when x  3, 2  63  12
dx
60
 3,  5 is a minimum turning point

d2y
when x  3, 2  63  12
dx
60
d2y
Possible points of inflection occur when 2  0
dx

d2y
when x  3, 2  63  12
dx
60
d2y
dx
i.e. 6 x  12  0

d2y
when x  3, 2  63  12
dx
60
d2y
dx
i.e. 6 x  12  0
x2

d2y
when x  3, 2  63  12
dx
60
d2y
dx
i.e. 6 x  12  0
x2
d3y
when x  2, 3  6  0
dx

d2y
when x  3, 2  63  12
dx
60
d2y
dx
i.e. 6 x  12  0
x2
d3y
when x  2, 3  6  0
dx
 2,  3 is a point of inflection

y

x
1,  1

5
3,  5

y

x
1,  1

2,  3

3,  5

y

x
1,  1

2,  3

5
3,  5

y

x
1,  1

2,  3 y  x3  6 x 2  9 x  5

5
3,  5

y

x
1,  1

Exercise 10F;
1bdf, 2, 4b, 2,  3 y  x3  6 x 2  9 x  5
5ace etc, 6bd

Exercise 10G
1, 2ace, 4b, 5c
5
3,  5

11X1 T12 05 curve sketching (2010)

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