Lesson 4: Limits Involving Infinity

Section 2.5
Limits Involving Inﬁnity

Math 1a

February 4, 2008

Announcements
Syllabus available on course website
All HW on website now
No class Monday 2/18
ALEKS due Wednesday 2/20

Outline

Infinite Limits
Vertical Asymptotes
Infinite Limits we Know
Limit “Laws” with Infinite Limits
Indeterminate Limits

Limits at Infinity
Algebraic rates of growth
Exponential rates of growth
Rationalizing to get a limit

Worksheet

Infinite Limits

Definition
The notation
lim f (x) = ∞
x→a

means that the values of f (x) can be made arbitrarily large (as
large as we please) by taking x sufficiently close to a but not equal
to a.

Definition
The notation
lim f (x) = −∞
x→a

means that the values of f (x) can be made arbitrarily large
negative by taking x sufficiently close to a but not equal to a.
Of course we have definitions for left- and right-hand infinite limits.

Vertical Asymptotes

Deﬁnition
The line x = a is called a vertical asymptote of the curve
y = f (x) if at least one of the following is true:

lim f (x) = ∞ lim f (x) = −∞
x→a x→a
lim f (x) = ∞ lim f (x) = −∞
x→a+ x→a+
lim f (x) = ∞ lim f (x) = −∞
x→a− x→a−

Inﬁnite Limits we Know

1
lim =∞
x→0+ x
1
lim = −∞
x→0− x
1
lim 2 = ∞
x→0 x

Finding limits at trouble spots

Example
Let
t2 + 2
f (t) =
t 2 − 3t + 2
Find lim f (t) and lim+ f (t) for each a at which f is not
t→a− t→a
continuous.

Finding limits at trouble spots

Example
Let
t2 + 2
f (t) =
t 2 − 3t + 2
Find lim f (t) and lim+ f (t) for each a at which f is not
t→a− t→a
continuous.

Solution
The denominator factors as (t − 1)(t − 2). We can record the
signs of the factors on the number line.

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)

f (t)
1 2

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)
+
f (t)
1 2

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)
+ ±∞
f (t)
1 2

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)
+ ±∞ −
f (t)
1 2

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)
+ ±∞ − ∞
f (t)
1 2

− 0 +
(t − 1)
1
− 0 +
(t − 2)
2
+
(t 2 + 2)
+ ±∞ − ∞ +
f (t)
1 2

Limit Laws with infinite limits
To aid your intuition

The sum of positive infinite limits is ∞. That is

∞+∞=∞

The sum of negative infinite limits is −∞.

−∞ − ∞ = −∞

The sum of a finite limit and an infinite limit is infinite.

a+∞=∞
a − ∞ = −∞

Rules of Thumb with infinite limits
Don’t try this at home!

The sum of positive infinite limits is ∞. That is

∞+∞=∞

The sum of negative infinite limits is −∞.

−∞ − ∞ = −∞

The sum of a finite limit and an infinite limit is infinite.

a+∞=∞
a − ∞ = −∞

Rules of Thumb with infinite limits
The product of a finite limit and an infinite limit is infinite if
the finite limit is not 0.
∞ if a > 0
a·∞=
−∞ if a < 0.
−∞ if a > 0
a · (−∞) =
∞ if a < 0.
The product of two infinite limits is infinite.
∞·∞=∞
∞ · (−∞) = −∞
(−∞) · (−∞) = ∞

The quotient of a finite limit by an infinite limit is zero:
a
= 0.
∞


Limits of the form 0 · ∞ and ∞ − ∞ are indeterminate. There
is no rule for evaluating such a form; the limit must be
examined more closely.


Limits of the form 0 · ∞ and ∞ − ∞ are indeterminate. There
is no rule for evaluating such a form; the limit must be
examined more closely.
1
Limits of the form are also indeterminate.
0

Definition
Let f be a function defined on some interval (a, ∞). Then

lim f (x) = L
x→∞

means that the values of f (x) can be made as close to L as we
like, by taking x sufficiently large.

Deﬁnition

lim f (x) = L
x→∞


Deﬁnition
The line y = L is a called a horizontal asymptote of the curve
y = f (x) if either

lim f (x) = L or lim f (x) = L.
x→∞ x→−∞

Deﬁnition

lim f (x) = L
x→∞


Deﬁnition
The line y = L is a called a horizontal asymptote of the curve
y = f (x) if either

lim f (x) = L or lim f (x) = L.
x→∞ x→−∞

y = L is a horizontal line!

Theorem
Let n be a positive integer. Then
1
lim n = 0
x→∞ x
1
lim =0
x→−∞ x n

Using the limit laws to compute limits at ∞

Example
Find
2x 3 + 3x + 1
lim
x→∞ 4x 3 + 5x 2 + 7

if it exists.
A does not exist
B 1/2
C 0
D ∞

Solution
Factor out the largest power of x from the numerator and
denominator. We have
2x 3 + 3x + 1 x 3 (2 + 3/x 2 + 1/x 3 )
= 3
4x 3 + 5x 2 + 7 x (4 + 5/x + 7/x 3 )
2x 3 + 3x + 1 2 + 3/x 2 + 1/x 3
lim = lim
x→∞ 4x 3 + 5x 2 + 7 x→∞ 4 + 5/x + 7/x 3
2+0+0 1
= =
4+0+0 2

Solution
Factor out the largest power of x from the numerator and
denominator. We have
2x 3 + 3x + 1 x 3 (2 + 3/x 2 + 1/x 3 )
= 3
4x 3 + 5x 2 + 7 x (4 + 5/x + 7/x 3 )
2x 3 + 3x + 1 2 + 3/x 2 + 1/x 3
lim = lim
x→∞ 4x 3 + 5x 2 + 7 x→∞ 4 + 5/x + 7/x 3
2+0+0 1
= =
4+0+0 2

Upshot
When ﬁnding limits of algebraic expressions at inﬁnitely, look at
the highest degree terms.

Another Example

Example
Find √
3x 4 + 7
lim
x→∞ x2 + 3

Another Example

Example
Find √
3x 4 + 7
lim
x→∞ x2 + 3

Solution √
The limit is 3.

Example
x2
Make a conjecture about lim .
x→∞ 2x

Example
x2
Make a conjecture about lim .
x→∞ 2x

Solution
The limit is zero. Exponential growth is inﬁnitely faster than
geometric growth


Example
Compute lim 4x 2 + 17 − 2x .
x→∞


Example
Compute lim 4x 2 + 17 − 2x .
x→∞

Solution
This limit is of the form ∞ − ∞, which we cannot use. So we
rationalize the numerator (the denominator is 1) to get an
expression that we can use the limit laws on.

Lesson 4: Limits Involving Infinity

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Lesson 4: Limits Involving Infinity