Post on 19-Jan-2016
description
Find the particular solution of the differential equation
that satisfies the initial condition.
' 0 (0) 4xyy e y
5.8 Inverse Trig Functionsand Differentiation
2
2
2
' 0 (0) 4
2
2 16 2
2 14
x
x
x
x
x
xy
yy e y
ydy e dx
ydy e dx
ye C
e
y e C C
5.8 Inverse Trig Functionsand Differentiation
Definition of Inverse Trig FunctionsFunction Domain Range
arcsin siny x y x 1,1 / 2, / 2
arccos cosy x y x 1,1 0,arctan tany x y x , / 2, / 2
cot coty arc x y x sec secy arc x y x csc cscy arc x y x
, 0,1x 0, , / 2y 1x / 2, / 2 , 0y
"The angle whose secanse t is "c arc x x
problemarcsecant
Function: y = arcsin x y = arccos x y = arctan x
Defined by: x = sin y x = cos y x = tan y
Domain:
Range:
Graph:
The Inverse Trig FCTNS
Function: y = arccot1 x y = arcsec1 x y = arccsc1 x
Defined b: x = cot y x = sec y x = csc y
Domain:
Range:
Graph:
The Inverse Trig FCTNS
5.8 Inverse Trig Functionsand Differentiation
1arcsin
2
DEFINITION
6
arccos0 2
arctan 3 3
arcsin(0.3) ????? Calculator
The restricted domain of / 2, / 2
this is the only solution.
5.8 Inverse Trig Functionsand Differentiation
Solve arctan 2 34
x
2 3 tan4
x
2 3 1x
2x
5.8 Inverse Trig Functionsand Differentiation
Given arcsin , where 0 / 2, find cos .y x y y sin y x
y
1 x
b2 2 21 x b 21b x
2cos 1y x
SohCahToa
5.8 Inverse Trig Functionsand Differentiation
5 /Gi 2ven arcsec , find tan .y y
y
5b
22 2 25 2 b
tan 1/ 2y
cos secADJ HYP
x xHYP ADJ
5sec
2y
1b
5.8 Inverse Trig Functionsand Differentiation
2 2
2 2
2
Derivatives of the Inverse Trig Functions
Let be a differentiable function of .
' 'arcsin arccos
1 1' '
arctan arccot1 1
' 'arcsec ar ccsc
1
u x
d u d uu u
dx dxu ud u d u
u udx dxu ud u d u
u udx dxu u u u
2 1
Problem
5.8 Inverse Trig Functionsand Differentiation
arcsin 2d
xdx
2
'arcsin
1
d uu
dx u
2
2
1 4x
arctan 3d
xdx
2
'arctan
1
d uu
dx u
2
3
1 9x
5.8 Inverse Trig Functionsand Differentiation
arcsind
xdx
1
2
/ 2 1
1 2 1
1/
2
1 2x
x x xx x
2
'arcsin
1
d uu
dx u
2 4
2
2 2( )
2
1
2
1
x
x x xe e e
e
5.8 Inverse Trig Functionsand Differentiation
2arcsec xde
dx
2
'arcsec
1
d uu
dx u u
5.8 Inverse Trig Functionsand Differentiation
2 arcsin 1Differentiate y x x x
2
'arcsin
1
d uu
dx u
1/ 22
22 2
2 2
2
2
2
2 1' 1 2
2
2 112
1
1
11
1
11 1
y x x x
x
xx
x x
x xx
x
A photographer is taking a picture of a 4' painting.
The camera lens is 1' below the lower edge of the painting.
How far should the camera be from the painting to
maximize the angle subtended by the camera lens?
Sol.
cot cot5 1
x x
cot cot
5
xarc arc x
2 21 / 25
1/ 5 1
1x
d
dx x
cot cot5
xarc arc x
2
'arccot
1
d uu
dx u
22
2
2
2
2 2
2
2
2 2
1/ 5 1
125 /
5 1
5 5 25
2
25
25
5 1
1
0
2 1
42
5
xx
x x
x x
x
x
x
x
x
Problem
2
2 2
4 5
25 1
x
x x
5x
is the location of a relative extrema.
'( 4) 0 '( 6) 0f f 5x yields a maximum value of .
2.236 feetx
Basic Differentiation Rules for Elementary Functions
HW 5.8/1,3,7,9,15,19,21,25,29,35,41,
45-55odd,59,67-70
False: arccos 1/ 23. / 33 1
9. arctan "The # whose tangent is "3 3
x
21
3 / 6x
secy x
1
2
1x in 0, , / 2y y secy arc x
1 1
Definitions
15. arcsec 1.269
1.269 sec
1/1.269 cos
arccos 1/1.269 0.6632
x
x
x
x
19. sin arctan 3/ 4
x
53
4
3
5
sec arcsin 4 / 5
x
54
3
5
3
25. sin ar csecy x
x2 1b x
1
2 1xy
x
because secant may be negative from 0 to
and sine is positive.
x
siny xsecy x
41. arcsin 2 arccos
2 sin arccos
1
3
2 1
2 1
x x
x x
x x
x x
x
1
1b x
x
41. arcsin 2 arccosx x
12x
2 221 2
1 2 1/
'07
3
J
x x
ake Gabl
x
e
x x
1
x
2 22
45. 3arccos / 2
1/ 2 1/ 2' 3 3
1 / 4 4 /
3
44
g x x
g xx x x
2
'arccos
1
d uu
dx u
2 2 2 2 2 2 2
47. arctan /
1/ 1/'
1 / /
g x x a
a ag x
x
a
xx aa a a
2
'arctan
1
d uu
dx u
2
2
2
2
2
2 2
arcsin 349.
3 /( 1 9 ) arcsin 3 1'
3 / 1 9 arcs
3 arcsin 3
in 3
1 9
1 9
xg x
x
x x xg x
x
x x x
x
x x x
x x
2
'arcsin
1
d uu
dx u
2
2
51. sin arccos
1' cos ar os
1
cc1
h t
t
t
t
h t tt
2
'arccos
1
d uu
dx u
2
'arctan
1
d uu
dx u
2
2 2
2 2
2 2
44
1 1 1 1 1 153. ln arctan ln arctan
2 2 1 4 1 2
1 1ln 1 ln 1 arctan
4 21 1 1 1 1
'4 1 1 2 1
1 11 1 1
4 21 1
1 1
2 1 2 1
1 1 1
1
1
2 1 1
x xy x x
x x
y x x x
yx x x
x x
x x
x x
x x
xx
4x
2
2 2 2
4 2
2
59. arcsec
1' 1 0
1
1 1 1 1
1 0
1 1 4 1 1 1 5
2 2
1 51.272
2
f x x x
f xx x
x x x x
x x
x
x
2
'arcsec
1
d uu
dx u u
Solve without a calculator:
3sin arctan
4
Quiz
53
4
sin 3/ 5
2
3 2
2
2
4 212)
3 21
20) ln 121
22) ln4
24) 1/2
126) ln 2
2
1 339) a. sin b. cos
2 2
x x
x x x
x C
x C
140) a. cot 2 tan
2
1b. sec 5 cos
5
3
3/ 22
2
2
1/
2 2
1
51) 1
53) ' sec1
55) ' arcsin
63) 6.93%
66)
168) ln
21
70) 3
x
x x
x
x
xy arc x
x x
y x
r
e C
e e C
e C
2
2
83) 3ln2
85) x
xy x C
y Ce
Chapter Review
89) a. Graph b. Greatest when 0, Least when 1
c. sin , / 2 / 2
y y
y x c x c
92) 7.79
Red Review for 5.6-5.8
2
2
83. Solve the differential Equation.
3
3l
3
n2
'
3
xy dy x dx
x x
dy
xy x
dx
C
x x
2
2
85. Solve the differential Equation.
' 2 0 2 2
2
ln
x
dy dyy xy xy xdx
dx y
dyxdx
y
y x
y Ce
C
2
2
2
2
2
89. ' 1
1
1
1
1
ar
Greatest 0
Least 1
csin
'arcsin
i
2
1
s n
y y
dyy
dxdy
dx
d u
y
y
y
y x C
dy dxy
y x C
udx u
x C
0
18,000
18,000
0.000038508
92.
0 30 30
30
18,000 30 15
1
2ln 0.5
0.00003850818,000
30
35,000 7.79
kh
kh
k
k
h
P h Ce
P Ce C
P h e
P e
e
P
k
P h e