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Lesson 16: Inverse Trigonometric Functions
1. Section 3.5
Inverse Trigonometric
Functions
V63.0121.002.2010Su, Calculus I
New York University
June 7, 2010
Announcements
Exams not graded yet
Written HW due tomorrow
Quiz 3 on Thursday covering 3.3, 3.4, 3.5, 3.7
2. Announcements
Exams not graded yet
Written HW due tomorrow
Quiz 3 on Thursday covering
3.3, 3.4, 3.5, 3.7
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 2 / 30
3. Objectives
Know the definitions,
domains, ranges, and other
properties of the inverse
trignometric functions:
arcsin, arccos, arctan,
arcsec, arccsc, arccot.
Know the derivatives of the
inverse trignometric
functions.
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 3 / 30
4. What is an inverse function?
Definition
Let f be a function with domain D and range E . The inverse of f is the
function f −1 defined by:
f −1 (b) = a,
where a is chosen so that f (a) = b.
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 4 / 30
5. What is an inverse function?
Definition
Let f be a function with domain D and range E . The inverse of f is the
function f −1 defined by:
f −1 (b) = a,
where a is chosen so that f (a) = b.
So
f −1 (f (x)) = x, f (f −1 (x)) = x
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 4 / 30
6. What functions are invertible?
In order for f −1 to be a function, there must be only one a in D
corresponding to each b in E .
Such a function is called one-to-one
The graph of such a function passes the horizontal line test: any
horizontal line intersects the graph in exactly one point if at all.
If f is continuous, then f −1 is continuous.
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 5 / 30
7. Outline
Inverse Trigonometric Functions
Derivatives of Inverse Trigonometric Functions
Arcsine
Arccosine
Arctangent
Arcsecant
Applications
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 6 / 30
8. arcsin
Arcsin is the inverse of the sine function after restriction to [−π/2, π/2].
y
x
π π sin
−
2 2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 7 / 30
9. arcsin
Arcsin is the inverse of the sine function after restriction to [−π/2, π/2].
y
x
π π sin
−
2 2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 7 / 30
10. arcsin
Arcsin is the inverse of the sine function after restriction to [−π/2, π/2].
y
y =x
x
π π sin
−
2 2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 7 / 30
11. arcsin
Arcsin is the inverse of the sine function after restriction to [−π/2, π/2].
y
arcsin
x
π π sin
−
2 2
The domain of arcsin is [−1, 1]
π π
The range of arcsin is − ,
2 2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 7 / 30
12. arccos
Arccos is the inverse of the cosine function after restriction to [0, π]
y
cos
x
0 π
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 8 / 30
13. arccos
Arccos is the inverse of the cosine function after restriction to [0, π]
y
cos
x
0 π
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 8 / 30
14. arccos
Arccos is the inverse of the cosine function after restriction to [0, π]
y
y =x
cos
x
0 π
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 8 / 30
15. arccos
Arccos is the inverse of the cosine function after restriction to [0, π]
arccos
y
cos
x
0 π
The domain of arccos is [−1, 1]
The range of arccos is [0, π]
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 8 / 30
16. arctan
Arctan is the inverse of the tangent yfunction after restriction to [−π/2, π/2].
x
3π π π 3π
− −
2 2 2 2
tan
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 9 / 30
17. arctan
Arctan is the inverse of the tangent yfunction after restriction to [−π/2, π/2].
x
3π π π 3π
− −
2 2 2 2
tan
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 9 / 30
18. arctan
y =x
Arctan is the inverse of the tangent yfunction after restriction to [−π/2, π/2].
x
3π π π 3π
− −
2 2 2 2
tan
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 9 / 30
19. arctan
Arctan is the inverse of the tangent yfunction after restriction to [−π/2, π/2].
π
2 arctan
x
π
−
2
The domain of arctan is (−∞, ∞)
π π
The range of arctan is − ,
2 2
π π
lim arctan x = , lim arctan x = −
x→∞ 2 x→−∞ 2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 9 / 30
20. arcsec
y
Arcsecant is the inverse of secant after restriction to [0, π/2) ∪ (π, 3π/2].
x
3π π π 3π
− −
2 2 2 2
sec
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 10 / 30
21. arcsec
y
Arcsecant is the inverse of secant after restriction to [0, π/2) ∪ (π, 3π/2].
x
3π π π 3π
− −
2 2 2 2
sec
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 10 / 30
22. arcsec
y =x
y restriction to [0, π/2) ∪ (π, 3π/2].
Arcsecant is the inverse of secant after
x
3π π π 3π
− −
2 2 2 2
sec
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 10 / 30
23. 3π
arcsec
2
y
Arcsecant is the inverse of secant after restriction to [0, π/2) ∪ (π, 3π/2].
π
2
x
The domain of arcsec is (−∞, −1] ∪ [1, ∞)
π π
The range of arcsec is 0, ∪ ,π
2 2
π 3π
lim arcsec x = , lim arcsec x =
x→∞ 2 x→−∞ 2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 10 / 30
24. Values of Trigonometric Functions
π π π π
x 0
6 4 3 2
√ √
1 2 3
sin x 0 1
2 2 2
√ √
3 2 1
cos x 1 0
2 2 2
1 √
tan x 0 √ 1 3 undef
3
√ 1
cot x undef 3 1 √ 0
3
2 2
sec x 1 √ √ 2 undef
3 2
2 2
csc x undef 2 √ √ 1
2 3
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 11 / 30
25. Check: Values of inverse trigonometric functions
Example
Find
arcsin(1/2)
arctan(−1)
√
2
arccos −
2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 12 / 30
26. Check: Values of inverse trigonometric functions
Example
Find
arcsin(1/2)
arctan(−1)
√
2
arccos −
2
Solution
π
6
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 12 / 30
27. What is arctan(−1)?
3π/4
−π/4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 13 / 30
28. What is arctan(−1)?
3π/4 3π
Yes, tan = −1
4
√
2
sin(3π/4) =
2
√
2
cos(3π/4) = −
2
−π/4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 13 / 30
29. What is arctan(−1)?
3π/4 3π
Yes, tan = −1
4
√ But, the range of arctan is
2 π π
sin(3π/4) = − ,
2 2 2
√
2
cos(3π/4) = −
2
−π/4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 13 / 30
30. What is arctan(−1)?
3π/4 3π
Yes, tan = −1
4
But, the range of arctan is
√ π π
2 − ,
cos(π/4) = 2 2
2 Another angle whose
π
tangent is −1 is − , and
√ 4
2 this is in the right range.
sin(π/4) = −
2
−π/4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 13 / 30
31. What is arctan(−1)?
3π/4 3π
Yes, tan = −1
4
But, the range of arctan is
√ π π
2 − ,
cos(π/4) = 2 2
2 Another angle whose
π
tangent is −1 is − , and
√ 4
2 this is in the right range.
sin(π/4) = − π
2 So arctan(−1) = −
4
−π/4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 13 / 30
32. Check: Values of inverse trigonometric functions
Example
Find
arcsin(1/2)
arctan(−1)
√
2
arccos −
2
Solution
π
6
π
−
4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 14 / 30
33. Check: Values of inverse trigonometric functions
Example
Find
arcsin(1/2)
arctan(−1)
√
2
arccos −
2
Solution
π
6
π
−
4
3π
4
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 14 / 30
34. Caution: Notational ambiguity
sin2 x = (sin x)2 sin−1 x = (sin x)−1
sinn x means the nth power of sin x, except when n = −1!
The book uses sin−1 x for the inverse of sin x, and never for (sin x)−1 .
1
I use csc x for and arcsin x for the inverse of sin x.
sin x
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 15 / 30
35. Outline
Inverse Trigonometric Functions
Derivatives of Inverse Trigonometric Functions
Arcsine
Arccosine
Arctangent
Arcsecant
Applications
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 16 / 30
36. The Inverse Function Theorem
Theorem (The Inverse Function Theorem)
Let f be differentiable at a, and f (a) = 0. Then f −1 is defined in an open
interval containing b = f (a), and
1
(f −1 ) (b) =
f (f −1 (b))
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 17 / 30
37. The Inverse Function Theorem
Theorem (The Inverse Function Theorem)
Let f be differentiable at a, and f (a) = 0. Then f −1 is defined in an open
interval containing b = f (a), and
1
(f −1 ) (b) =
f (f −1 (b))
Upshot: Many times the derivative of f −1 (x) can be found by implicit
differentiation and the derivative of f :
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 17 / 30
38. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
39. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
To simplify, look at a right
triangle:
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
40. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
To simplify, look at a right
triangle:
1
x
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
41. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
To simplify, look at a right
triangle:
1
x
y = arcsin x
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
42. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
To simplify, look at a right
triangle:
1
x
y = arcsin x
1 − x2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
43. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
To simplify, look at a right
triangle:
cos(arcsin x) = 1 − x2 1
x
y = arcsin x
1 − x2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
44. Derivation: The derivative of arcsin
Let y = arcsin x, so x = sin y . Then
dy dy 1 1
cos y = 1 =⇒ = =
dx dx cos y cos(arcsin x)
To simplify, look at a right
triangle:
cos(arcsin x) = 1 − x2 1
x
So
d 1
arcsin(x) = √ y = arcsin x
dx 1 − x2
1 − x2
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 18 / 30
45. Graphing arcsin and its derivative
1
√
1 − x2
The domain of f is [−1, 1],
but the domain of f is arcsin
(−1, 1)
lim f (x) = +∞
x→1−
| |
lim f (x) = +∞ −1 1
x→−1+
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 19 / 30
46. Derivation: The derivative of arccos
Let y = arccos x, so x = cos y . Then
dy dy 1 1
− sin y = 1 =⇒ = =
dx dx − sin y − sin(arccos x)
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 20 / 30
47. Derivation: The derivative of arccos
Let y = arccos x, so x = cos y . Then
dy dy 1 1
− sin y = 1 =⇒ = =
dx dx − sin y − sin(arccos x)
To simplify, look at a right
triangle:
sin(arccos x) = 1 − x2 1
1 − x2
So
d 1 y = arccos x
arccos(x) = − √
dx 1 − x2 x
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 20 / 30
48. Graphing arcsin and arccos
arccos
arcsin
| |
−1 1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 21 / 30
49. Graphing arcsin and arccos
arccos
Note
π
arcsin cos θ = sin −θ
2
π
=⇒ arccos x = − arcsin x
2
| |
−1 1 So it’s not a surprise that their
derivatives are opposites.
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 21 / 30
50. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
51. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
To simplify, look at a right
triangle:
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
52. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
To simplify, look at a right
triangle:
x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
53. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
To simplify, look at a right
triangle:
x
y = arctan x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
54. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
To simplify, look at a right
triangle:
1 + x2 x
y = arctan x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
55. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
To simplify, look at a right
triangle:
1
cos(arctan x) = √
1 + x2
1 + x2 x
y = arctan x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
56. Derivation: The derivative of arctan
Let y = arctan x, so x = tan y . Then
dy dy 1
sec2 y = 1 =⇒ = = cos2 (arctan x)
dx dx sec2 y
To simplify, look at a right
triangle:
1
cos(arctan x) = √
1 + x2
1 + x2 x
So
d 1
arctan(x) = y = arctan x
dx 1 + x2
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 22 / 30
57. Graphing arctan and its derivative
y
π/2
arctan
1
1 + x2
x
−π/2
The domain of f and f are both (−∞, ∞)
Because of the horizontal asymptotes, lim f (x) = 0
x→±∞
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 23 / 30
58. Example
√
Let f (x) = arctan x. Find f (x).
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 24 / 30
59. Example
√
Let f (x) = arctan x. Find f (x).
Solution
d √ 1 d √ 1 1
dx
arctan x = √ 2 dx x = 1 + x · 2√x
1+ x
1
= √ √
2 x + 2x x
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 24 / 30
60. Derivation: The derivative of arcsec
Try this first.
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
61. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
62. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
To simplify, look at a right
triangle:
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
63. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
To simplify, look at a right
triangle:
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
64. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
To simplify, look at a right
triangle:
x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
65. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
To simplify, look at a right
triangle:
x
y = arcsec x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
66. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
To simplify, look at a right
triangle:
√
x2 − 1
tan(arcsec x) =
1
x x2 − 1
y = arcsec x
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
67. Derivation: The derivative of arcsec
Try this first. Let y = arcsec x, so x = sec y . Then
dy dy 1 1
sec y tan y = 1 =⇒ = =
dx dx sec y tan y x tan(arcsec(x))
To simplify, look at a right
triangle:
√
x2 − 1
tan(arcsec x) =
1
x x2 − 1
So
d 1
arcsec(x) = √ y = arcsec x
dx x x2 − 1
1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 25 / 30
68. Another Example
Example
Let f (x) = e arcsec x . Find f (x).
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 26 / 30
69. Another Example
Example
Let f (x) = e arcsec x . Find f (x).
Solution
1
f (x) = e arcsec x · √
x x2 − 1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 26 / 30
70. Outline
Inverse Trigonometric Functions
Derivatives of Inverse Trigonometric Functions
Arcsine
Arccosine
Arctangent
Arcsecant
Applications
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 27 / 30
71. Application
Example
One of the guiding principles of
most sports is to “keep your eye
on the ball.” In baseball, a batter
stands 2 ft away from home plate
as a pitch is thrown with a
velocity of 130 ft/sec (about
90 mph). At what rate does the
batter’s angle of gaze need to
change to follow the ball as it
crosses home plate?
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 28 / 30
72. Solution
Let y (t) be the distance from the ball to home plate, and θ the angle the
batter’s eyes make with home plate while following the ball. We know
y = −130 and we want θ at the moment that y = 0.
y
130 ft/sec
θ
2 ft
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 29 / 30
73. Solution
Let y (t) be the distance from the ball to home plate, and θ the angle the
batter’s eyes make with home plate while following the ball. We know
y = −130 and we want θ at the moment that y = 0.
We have θ = arctan(y /2). Thus
dθ 1 1 dy
= ·
dt 1 + (y /2)2 2 dt
y
130 ft/sec
θ
2 ft
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 29 / 30
74. Solution
Let y (t) be the distance from the ball to home plate, and θ the angle the
batter’s eyes make with home plate while following the ball. We know
y = −130 and we want θ at the moment that y = 0.
We have θ = arctan(y /2). Thus
dθ 1 1 dy
= ·
dt 1 + (y /2)2 2 dt
When y = 0 and y = −130,
then y
dθ 1 1
= · (−130) = −65 rad/sec 130 ft/sec
dt y =0 1+0 2
θ
2 ft
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 29 / 30
75. Solution
Let y (t) be the distance from the ball to home plate, and θ the angle the
batter’s eyes make with home plate while following the ball. We know
y = −130 and we want θ at the moment that y = 0.
We have θ = arctan(y /2). Thus
dθ 1 1 dy
= ·
dt 1 + (y /2)2 2 dt
When y = 0 and y = −130,
then y
dθ 1 1
= · (−130) = −65 rad/sec 130 ft/sec
dt y =0 1+0 2
The human eye can only track θ
at 3 rad/sec! 2 ft
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 29 / 30
76. Summary
y y
1
arcsin x √
1 − x2
1
arccos x −√
1 − x2 Remarkable that the
1 derivatives of these
arctan x transcendental functions are
1 + x2
1 algebraic (or even rational!)
arccot x −
1 + x2
1
arcsec x √
x x2 − 1
1
arccsc x − √
x x2 − 1
V63.0121.002.2010Su, Calculus I (NYU) Section 3.5 Inverse Trigonometric Functions June 7, 2010 30 / 30