MA 3972-MA-Book April 11, 2018 12:11Take a Diagnostic Exam 27- f(x)=
∣∣
2 xex∣∣
={
2 xex ifx≥ 0
− 2 xex ifx< 0
Ifx≥0,f′(x)= 2 ex+ex( 2 x)= 2 ex+ 2 xex
xlim→ 0 +f′(x)=xlim→ 0 +(^2 ex+^2 xex)=^2 e^0 +^0 =^2Chapter 7
- ByL’Hôpital’sRule, limx→π
ex−eπ
xe−πe
=xlim→π
ex
exe−^1
=xlim→π
ex−^1
xe−^1=
eπ−^1
πe−^1.
- y=(x+1)(x−3)^2 ;
dy
dx
=(1)(x−3)^2 +2(x−3)(x+1)
=(x−3)^2 +2(x−3)(x+1)
dy
dx∣∣
∣
∣x=− 1 =(−^1 −3)(^2) +2(− 1 −3)(− 1 +1)
=(−4)^2 + 0 = 16
- f′(x 1 )= lim
Δx→ 0
f(x 1 +Δx)−f(x 1 )
ΔxThus, lim
Δx→ 0tan(
π
4
+Δx)
−tan(
π
4)Δx
=
d
dx
(tanx)atx=
π
4=sec^2(
π
4)
=(√
2)^2 =2.Chapter 8
- See the graph shown at next column.
- I. Since the graph ofgis decreasing and
then increasing, it is not monotonic.
II. Since the graph ofgis a smooth curve,
g′is continuous.
III. Since the graph ofgis concave upward,
g′′>0.
Thus, only statements II and III are true. - The graph indicates that (1)f(10)=0,
(2)f′(10)<0, sincef is decreasing; and
(3) f′′(10)>0, sincef is concave upward.
Thus,f′(10)< f(10)< f′′(10), choice (C).
Graph for Question 13.[[[[aadb0 e b
f′ +f′′f′0 − +0− +f incr.fdecr. incr.decr. incr.Concave downward
Concave
upwardaexy0 d bA possible graph of f′Based on the graph of f:- See the figure below.
The graph off is concave upward forx<x 2.
x 2f′ incr.f′′fdecr.+ −
Concave
upwardConcave
downward- See the figure below.
Entery^1 =sin(x^2 ). Using the [Inflection]
function of your calculator, you obtain four
points of inflection on [0, π]. The points of
inflection occur atx= 0 .81, 1.81, 2.52, and
3.07. Sincey 1 =sin (x^2 ) is an even function,