MA 3972-MA-Book May 7, 2018 9:52Limits and Continuity 1056.7 Solutions to Practice Problems
Part A The use of a calculator is not
allowed.- Using the product rule,
limx→ 0 (x−5)(cosx)=
[
limx→ 0 (x−5)
][
limx→ 0 (cosx)]=(0−5)(cos 0)=(−5)(1)=−5.
(Note that cos 0=1.)- Rewrite lim
x→b
x^3 −b^3
x^6 −b^6aslim
x→bx^3 −b^3
(x^3 −b^3 )(x^3 +b^3 )
=lim
x→b1
x^3 +b^3.
Substitutex=band obtain1
b^3 +b^3=
1
2 b^3.
- Substitutingx=0 into the expression
2 −
√
4 −x
x
leads to 0/0, which is an
indeterminate form. Thus, multiply both
the numerator and denominator by the
conjugate(
2 +√
4 −x)
and obtainlimx→ 02 −
√
4 −x
x(
2 +√
4 −x
2 +√
4 −x)=limx→ 0
4 −(4−x)
x(
2 +√
4 −x)=limx→ 0
x
x(
2 +√
4 −x)=limx→ 01
(
2 +√
4 −x)=
1
(
2 +√
4 −(0))=1
4
.
- Since the degree of the polynomial in the
numerator is the same as the degree of the
polynomial in the denominator,
xlim→∞5 − 6 x
2 x+ 11=−
6
2
=−3.
- Since the degree of the polynomial in the
numerator is 2 and the degree of the
polynomial in the denominator is 3,
lim
x→−∞x^2 + 2 x− 3
x^3 + 2 x^2=0.
- The degree of the monomial in the
numerator is 2, and the degree of the
binomial in the denominator is 1. Thus,
xlim→∞3 x^2
5 x+ 8=∞.
- Divide every term in both the numerator
and denominator by the highest power of
x. In this case, it isx. Thus, you have
lim
x→−∞3 x
√x
x^2 − 4
x.Asx→−∞,x=−√
x^2.Since the denominator involves a radical,
rewrite the expression asx→lim−∞3 x
√x
x^2 − 4
−√
x^2=xlim→−∞3
−
√
1 −4
x^2=3
−
√
1 − 0=− 3.
- limx→ 1 +f(x)=limx→ 1 +(x^2 ex)=eand
limx→ 1 −f(x)=limx→ 1 −(ex)=e. Thus, limx→ 1 f(x)=e. - limx→∞ex=∞and limx→∞(1−x^3 )=∞.
However, asx→∞, the rate of increase
ofexis much greater than the rate of
decrease of (1−x^3 ). Thus,
xlim→∞ex
1 −x^3=−∞.
- Divide both numerator and denominator
byxand obtain limx→ 0sin 3x
x
sin 4x
x. Now rewrite
the limit as limx→ 03
sin 3x
3 x
4
sin 4x
4 x=
3
4
limx→ 0sin 3x
3 x
sin 4x
4 x.
Asxapproaches 0, so do 3xand 4x.