11X1 T10 05 curve sketching (2011)

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 T10 05 curve sketching (2011)

Recommended

Recommended

More Related Content

What's hot

What's hot (9)

Similar to 11X1 T10 05 curve sketching (2011)

Similar to 11X1 T10 05 curve sketching (2011) (20)

More from Nigel Simmons

More from Nigel Simmons (20)

Recently uploaded

Recently uploaded (20)

11X1 T10 05 curve sketching (2011)