Trigonometric Limits - California State University, Northridgeama5348/calculus/... · Trigonometric...
Transcript of Trigonometric Limits - California State University, Northridgeama5348/calculus/... · Trigonometric...
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Trigonometric Limits
more examples of limits
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Substitution Theorem for
Trigonometric Functions
laws for evaluating limits
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Theorem A. For each point c in function’sdomain:
limx→c
sin x = sin c, limx→c
cos x = cos c,
limx→c
tan x = tan c, limx→c
cot x = cot c,
limx→c
csc x = csc c, limx→c
sec x = sec c.
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Theorem A. For each point c in function’sdomain:
limx→c
sin x = sin c, limx→c
cos x = cos c,
limx→c
tan x = tan c, limx→c
cot x = cot c,
limx→c
csc x = csc c, limx→c
sec x = sec c.
Proof. Prove first that
limx→0
sin x = 0, limx→0
cos x = 1.
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Is it obvious?
limx→0
sin x = 0, limx→0
cos x = 1.
y=sin(x) y=cos(x)
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Is it obvious?
limx→0
sin x = 0, limx→0
cos x = 1.
y=sin(x) y=cos(x)
No. The picture is not precise.
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Is it obvious?
limx→0
sin x = 0, limx→0
cos x = 1.
y=sin(x) y=cos(x)
No. The picture is not precise.
Use definitions of sin(x) and cos(x).
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Use The One-Sided Squeeze Theorem. Iff(x) ≤ g(x) ≤ h(x) near c and lim
x→c+f(x) =
limx→c+
h(x) = Lright, then
limx→c+
g(x) = Lright c
L
y=h(x)
y=f(x)
y=g(x)
Also, if limx→c−
f(x) = limx→c−
h(x) = Lleft, then
limx→c−
g(x) = Lleftc
L
y=h(x)
y=f(x)
y=g(x)
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Use The One-Sided Limits.
limx→c
g(x) = L
⇔ limx→c−
g(x) = limx→c+
g(x) = L
And other Limits Theorems.
limx→c
[f(x) + g(x)] = limx→c
f(x) + limx→c
g(x),
limx→c
[f(x)g(x)] = [limx→c
f(x)][limx→c
g(x)], e.t.c.
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An estimate from geometry:
0 < AB < AC < arcAC
O
A
B C
sin(
t) t
cos(t)
2 1
-cos
(t)
%&%&
&&&&
t<0
t>0
1
or,
0 < sin(t) <√
2√
1 − cos(t) < t
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An estimate from geometry:
0 < AB < AC < arcAC
O
A
B C
sin(
t) t
cos(t)
2 1
-cos
(t)
%&%&
&&&&
t<0
t>0
1
or,
0 < sin(t) <√
2√
1 − cos(t) < t
By the Right-Sided Squeeze Theorem
limx→0+
sin(x) = 0, limx→0+
(1 − cos(x)) = 0,
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Similarly,
limx→0−
sin(x) = 0, limx→0−
(1 − cos(x)) = 0.
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Similarly,
limx→0−
sin(x) = 0, limx→0−
(1 − cos(x)) = 0.
The left and the right limits are equal, thus
limx→0
sin(x) = 0, limx→0
(1 − cos(x)) = 0
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Similarly,
limx→0−
sin(x) = 0, limx→0−
(1 − cos(x)) = 0.
The left and the right limits are equal, thus
limx→0
sin(x) = 0, limx→0
(1 − cos(x)) = 0
or,
limx→0
sin(x) = 0, limx→0
cos(x) = 1.
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EXAMPLES
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EXAMPLE 1. Evaluate limit
limθ→π/4
θ tan(θ)
Since θ = π/4 is in the domain of the functionθ tan(θ)
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EXAMPLE 1. Evaluate limit
limθ→π/4
θ tan(θ)
Since θ = π/4 is in the domain of the functionθ tan(θ) we use Substitution Theorem to substituteπ/4 for θ in the limit expression:
limθ→π/4
θ tan θ =π
4tan
(π
4
)=
π
4· 1 =
π
4.
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EXAMPLE 2. Evaluate limit
limθ→π/2
cos2(θ)1− sin(θ)
.
Since at θ = π/2 the denominator of cos2(θ)/(1−sin(θ)) turns to zero, we can not substitute π/2 forθ immediately.
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EXAMPLE 2. Evaluate limit
limθ→π/2
cos2(θ)1− sin(θ)
.
Since at θ = π/2 the denominator of cos2(θ)/(1−sin(θ)) turns to zero, we can not substitute π/2 forθ immediately. Instead, we rewrite the expressionusing sin2(θ) + cos2(θ) = 1:
limθ→π/2
1− sin2(θ)1− sin(θ)
= limθ→π/2
(1− sin(θ))(1 + sin(θ))(1− sin(θ))
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Finally,
limθ→π/2
(1− sin(θ))(1 + sin(θ))(1− sin(θ))
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Finally,
limθ→π/2
(1− sin(θ))(1 + sin(θ))(1− sin(θ))
= limθ→π/2
(1− sin(θ)1− sin(θ)
)lim
θ→π/2(1 + sin(θ))
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Finally,
limθ→π/2
(1− sin(θ))(1 + sin(θ))(1− sin(θ))
= limθ→π/2
(1− sin(θ)1− sin(θ)
)lim
θ→π/2(1 + sin(θ))
= 1 · (1 + sin(π/2)) = 2.
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Special Trigonometric Limits
sin(x)/x →? as x → 0
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Theorem B1.
limx→0
sin x
x= 1.
Theorem B2.
limx→0
1 − cos x
x= 0.
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Proof B1. A fact from geometry: (t > 0)
area(OAB)≤area(ODB)≤area(ODC)
cos2(t)t/2 ≤ sin(t) cos(t)/2 ≤ t/2.
dividing by cos(t)t/2 get
cos t ≤sin t
t≤
1
cos t
Right-Sided Squeeze Theorem:
limt→0+
sin t
t= 1
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The same inequality holds for t < 0:
cos t ≤sin t
t≤
1
cos t
Left-Sided Squeeze Theorem:
limt→0−
sin t
t= 1
The left and the right limits are equal, thus,
limt→0
sin t
t= 1
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Proof B2. By multiplying numerator anddenominator with (1 + cos x)
limx→0
1 − cos x
x= lim
x→0
(1 − cos x)
x
(1 + cos x)
(1 + cos x)
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Proof B2. By multiplying numerator anddenominator with (1 + cos x)
limx→0
1 − cos x
x= lim
x→0
(1 − cos x)
x
(1 + cos x)
(1 + cos x)
= limx→0
(1 − cos2 x)
x(1 + cos x)= lim
x→0
sin2 x
x(1 + cos x)
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Proof B2. By multiplying numerator anddenominator with (1 + cos x)
limx→0
1 − cos x
x= lim
x→0
(1 − cos x)
x
(1 + cos x)
(1 + cos x)
= limx→0
(1 − cos2 x)
x(1 + cos x)= lim
x→0
sin2 x
x(1 + cos x)Using B1 write
=[limx→0
sin x
x
]limx→0[sin x]
limx→0[1 + cos x]= 0.
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EXAMPLES
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EXAMPLE 3. Evaluate limit
limt→0
tan t
t
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EXAMPLE 3. Evaluate limit
limt→0
tan t
t
Recalling tan t = sin t/ cos t, and using B1:
= limt→0
sin t
(cos t)t
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EXAMPLE 3. Evaluate limit
limt→0
tan t
t
Recalling tan t = sin t/ cos t, and using B1:
= limt→0
sin t
(cos t)t=
[limt→0
sin t
t
]limt→0
1cos t
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EXAMPLE 3. Evaluate limit
limt→0
tan t
t
Recalling tan t = sin t/ cos t, and using B1:
= limt→0
sin t
(cos t)t=
[limt→0
sin t
t
]limt→0
1cos t
= 1 · 11
= 1
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EXAMPLE 4. Evaluate limit (Can’t use B1 !):
limt→0
sin(3t)t
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EXAMPLE 4. Evaluate limit (Can’t use B1 !):
limt→0
sin(3t)t
multiply both numerator and denominator with 3:
= limt→0
3sin(3t)
3t
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EXAMPLE 4. Evaluate limit (Can’t use B1 !):
limt→0
sin(3t)t
multiply both numerator and denominator with 3:
= limt→0
3sin(3t)
3t
Now, t → 0 as 3t → 0, so
= lim3t→0
3sin(3t)
3t= 3.
(limx→0
sinx
x= 1
)B1 applies (with a substitution x = 3t).
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EXAMPLE 5. Evaluate limit
limt→0
1− cos t
sin t
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EXAMPLE 5. Evaluate limit
limt→0
1− cos t
sin t
Divide both numerator and denominator with t:
= limt→0
1− cos t
tsin t
t
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EXAMPLE 5. Evaluate limit
limt→0
1− cos t
sin t
Divide both numerator and denominator with t:
= limt→0
1− cos t
tsin t
t
Use B1 and B2:
=01
= 0.
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