Teaching Limits so that Students will Understand Limits
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Transcript of Teaching Limits so that Students will Understand Limits
Teaching Limits so that Students will Understand
Limits
Presented by
Lin McMullinNational Math and Science Initiative
3 24 6
2
x x xf x
x
ContinuityContinuity
What happens at x = 2?
What is f(2)?
What happens near x = 2?
f(x) is near 3
What happens as x approaches 2?
f(x) approaches 3
What happens at x = 1?
What happens near x = 1?
As x approaches 1, g increases without bound, or g approaches infinity.
As x increases without bound, g approaches 0.
As x approaches infinity g approaches 0.
AsymptotesAsymptotes
2
1
1g x
x
The Area ProblemThe Area Problem
21
0
1
3
h x x
j x
x
x
What is the area of the outlined region?
As the number of rectangles increases with out bound, the area of the
rectangles approaches the area of the region.
The Tangent Line ProblemThe Tangent Line Problem
What is the slope of the black line?
As the red point approaches the black point, the red secant line approaches the black tangent line, and
The slope of the secant line approaches the slope of the tangent line.
As x approaches 1, (5 – 2x) approaches ? As x approaches 1, (5 – 2x) approaches ?
f(x) within 0.08 units of 3
x within 0.04 units of 1
f(x) within 0.16 units of 3
x within 0.08 units of 1
0.90 3.20
0.91 3.18
0.92 3.16
0.93 3.14
0.94 3.12
0.95 3.10
0.96 3.08
0.97 3.06
0.98 3.04
0.99 3.02
1.00 3.00
1.01 2.98
1.02 2.96
1.03 2.94
1.04 2.92
1.05 2.90
1.06 2.88
1.07 2.86
1.08 2.84
1.09 2.82
x 5 2x
1
lim 5 2 3x
x
12
2 2
2 2
5 2 3
5 2 3
x
x
x
x
x
f x L
1 or 1 12 2 2
x x
5 2 3
or
3 5 2 3
x
x
1
lim 5 2 3x
x
1
lim 5 2 3x
x
2
4
When the values successively attributed to a variable approach indefinitely to a fixed value, in a manner so as to end by differing from it as little as one wishes, this last is called the limit of all the others. Augustin-Louis Cauchy (1789 – 1857)
The Definition of Limit at a Point The Definition of Limit at a Point
lim if, and only if, for any number 0
there is a number 0 such
if 0 ,
t
then
hat x a
x
L
f x L
f
a
x
The Definition of Limit at a Point The Definition of Limit at a Point
Karl Weierstrass (1815 – 1897)
lim if, and only if, for any number 0
there is a number 0 such
if 0 ,
t
then
hat x a
x
L
f x L
f
a
x
lim if, and only if, for any number 0
there is a numb
i
er 0 and such t
f , then
hat x a
a x a L f x L
f x L
x a
The Definition of Limit at a Point The Definition of Limit at a Point
Karl Weierstrass (1815 – 1897)
lim 0 0 such that
, whenever 0
x af x L
f x L x a
Footnote: The Definition of Limit at a PointFootnote: The Definition of Limit at a Point
Footnote:The Definition of Limit at a Point Footnote:The Definition of Limit at a Point
lim 0 0 such
whe
that
, 0never
x af x L
f x L x a
f(x) within 0.08 units of 3
x within 0.04 units of 1
f(x) within 0.16 units of 3
x within 0.08 units of 1
0.90 3.20
0.91 3.18
0.92 3.16
0.93 3.14
0.94 3.12
0.95 3.10
0.96 3.08
0.97 3.06
0.98 3.04
0.99 3.02
1.00 3.00
1.01 2.98
1.02 2.96
1.03 2.94
1.04 2.92
1.05 2.90
1.06 2.88
1.07 2.86
1.08 2.84
1.09 2.82
x 5 2x
1
lim 5 2 3x
x
x a
f x L
1
lim 5 2 3x
x
lim if, and only if,
for any number 0 there is a
number 0 such that if
0 , then
x af x L
x a f x L
2
3lim 9x
x
2 9
3 3
x
x x
2
3lim 9x
x
2 9
3 3
x
x x
Near 3, specifically in (2,4), 5 3 7x x
2
3lim 9x
x
2 9
3 3
x
x x
Near 3, specifically in (2,4), 5 3 7x x
7 3
37
x
x
2
3lim 9x
x
2 9
3 3
x
x x
Near 3, specifically in (2,4), 5 3 7x x
7 3
37
x
x
the smaller of 1 and 7
lim if, and only if, for any number 0
there is a number 0 such that
if 0 , then
lim if, and only if, for any number 0
there is a number 0 such that
if 0 , t
a
a
x
x
f x L
f xx a L
f x L
a x
hen f x L
One-sided Limits One-sided Limits
Limits Equal to InfinityLimits Equal to Infinity
lim if, and only if, for any number
there is a number such that
if
0
Graphically this is a vertical asymptote
0 , then
x aM
f x M M
f x
x a f x
lim if, and only if, for any number
there is a number such that
if 0 , then
0
x af x
x
M
f xa M
Limit as x Approaches InfinityLimit as x Approaches Infinity
lim if, and only if, for any number 0
there is a number suc
Graphically, this is a horizontal a
h that
if , then
sym t
0
p ote
xf x L
M f x L
M
x
lim if, and only if, for any number 0
there is a number such that
if , then
0
x
M
x
f x L
f x LM
Limit TheoremsLimit Theorems
Almost all limit are actually found by substituting the values into the expression, simplifying, and coming up with a number, the limit.
The theorems on limits of sums, products, powers, etc. justify the substituting.
Those that don’t simplify can often be found with more advanced theorems such as L'Hôpital's Rule
The Area ProblemThe Area Problem
21
0
1
3
h x x
j x
x
x
The Area ProblemThe Area Problem
2
2 2 2 2
22 2
1
22 2
1
length 1
3 1 2width
x-coordinates = 1,1 ,1 2 ,1 3 , ...,1
Area 1 1
32Area = lim 1 1
3
n n n n
n
n ni
n
n nni
h x j x x
b a
n n n
n
i
i
The Area ProblemThe Area Problem
2
2 3
2 22 2 2 2 4 2 4
1 1 1 1
1 1 2 18 842 6
83
323
lim 1 1 lim 2 lim lim
lim lim lim
4 4
n n n n
n n n n n n ni n n ni i i i
n n n n nn n nn n n
i i i
n
,P a x f a x
,T a f a
x
f a x f a
y f a x am
The Tangent Line ProblemThe Tangent Line Problem
As 0 x
P T
?f a x f a
a x a
0
limx
f a x f a
a am
x
,P a x f a x
,T a f a
x
f a x f a
y f a x am
The Tangent Line ProblemThe Tangent Line Problem
As 0 x P T
0limx
f a
af
x
x aa
f a
,P a x f a x
,T a f a
x
f a x f a
ay f a x af
The Tangent Line ProblemThe Tangent Line Problem
As 0 x
P T
Lin McMullinNational Math and Science Initiative
325 North St. Paul St. Dallas, Texas 75201
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www.LinMcMullin.net Click: AP Calculus