2. Use l'Hôpital's Rule to evaluate the following limit. a) x→∞0 d) lim f) g) h) x³-1 x-1 4x²-x-3 1-cost e) lim 5x x-0 x2 2x²+3x lim x-00x²+x+1 sin x lim x-0 tan x exte-x lim x-00 ex.

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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Question
2. Use l'Hôpital's Rule to evaluate the following limit.
a)
x→∞0
d) lim
f)
g)
h)
x³-1
x-1 4x²-x-3
1-cost
e) lim
5x
x-0 x2
2x²+3x
lim
x-00x²+x+1
sin x
lim
x-0 tan x
exte-x
lim
x-00 ex.
Transcribed Image Text:2. Use l'Hôpital's Rule to evaluate the following limit. a) x→∞0 d) lim f) g) h) x³-1 x-1 4x²-x-3 1-cost e) lim 5x x-0 x2 2x²+3x lim x-00x²+x+1 sin x lim x-0 tan x exte-x lim x-00 ex.
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Follow-up Questions
Read through expert solutions to related follow-up questions below.
Follow-up Question
Let f be a function with derivatives of all orders throughout some interval containing a as an
interior point. Then the Taylor series generated by f(x) at x = 0 is:
ƒ'(0)
f(x) = f(0) + -x +
1!
f"(0) f"" (0)
-x² +:
3!
2!
And the Taylor series generated by f(x) at x = a is:
f(x) = f(a) +
1
== a = 2
)
f'(a)
1!
c) f(x) =
f"(a)
2!
1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a.
a) f(x) = e²x, a = 0
b) f(x) = lnx, a = 1
π
d) f(x) = sinx, a = =
4
e) f(x) = √x, a = 4
-x³ +
(x − a) + -(x − a)² + · (x − a)³ + ·
f""'(a)
3!
Transcribed Image Text:Let f be a function with derivatives of all orders throughout some interval containing a as an interior point. Then the Taylor series generated by f(x) at x = 0 is: ƒ'(0) f(x) = f(0) + -x + 1! f"(0) f"" (0) -x² +: 3! 2! And the Taylor series generated by f(x) at x = a is: f(x) = f(a) + 1 == a = 2 ) f'(a) 1! c) f(x) = f"(a) 2! 1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a. a) f(x) = e²x, a = 0 b) f(x) = lnx, a = 1 π d) f(x) = sinx, a = = 4 e) f(x) = √x, a = 4 -x³ + (x − a) + -(x − a)² + · (x − a)³ + · f""'(a) 3!
Solution
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Follow-up Question
Let f be a function with derivatives of all orders throughout some interval containing a as an
interior point. Then the Taylor series generated by f(x) at x = 0 is:
ƒ'(0)
f(x) = f(0) + -x +
1!
f"(0) f"" (0)
-x² +:
3!
2!
And the Taylor series generated by f(x) at x = a is:
f(x) = f(a) +
1
== a = 2
)
f'(a)
1!
c) f(x) =
f"(a)
2!
1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a.
a) f(x) = e²x, a = 0
b) f(x) = lnx, a = 1
π
d) f(x) = sinx, a = =
4
e) f(x) = √x, a = 4
-x³ +
(x − a) + -(x − a)² + · (x − a)³ + ·
f""'(a)
3!
Transcribed Image Text:Let f be a function with derivatives of all orders throughout some interval containing a as an interior point. Then the Taylor series generated by f(x) at x = 0 is: ƒ'(0) f(x) = f(0) + -x + 1! f"(0) f"" (0) -x² +: 3! 2! And the Taylor series generated by f(x) at x = a is: f(x) = f(a) + 1 == a = 2 ) f'(a) 1! c) f(x) = f"(a) 2! 1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a. a) f(x) = e²x, a = 0 b) f(x) = lnx, a = 1 π d) f(x) = sinx, a = = 4 e) f(x) = √x, a = 4 -x³ + (x − a) + -(x − a)² + · (x − a)³ + · f""'(a) 3!
Solution
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Follow-up Question
Let f be a function with derivatives of all orders throughout some interval containing a as an
interior point. Then the Taylor series generated by f(x) at x = 0 is:
ƒ'(0)
f(x) = f(0) + -x +
1!
f"(0) f"" (0)
-x² +:
3!
2!
And the Taylor series generated by f(x) at x = a is:
f(x) = f(a) +
1
== a = 2
)
f'(a)
1!
c) f(x) =
f"(a)
2!
1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a.
a) f(x) = e²x, a = 0
b) f(x) = lnx, a = 1
π
d) f(x) = sinx, a = =
4
e) f(x) = √x, a = 4
-x³ +
(x − a) + -(x − a)² + · (x − a)³ + ·
f""'(a)
3!
Transcribed Image Text:Let f be a function with derivatives of all orders throughout some interval containing a as an interior point. Then the Taylor series generated by f(x) at x = 0 is: ƒ'(0) f(x) = f(0) + -x + 1! f"(0) f"" (0) -x² +: 3! 2! And the Taylor series generated by f(x) at x = a is: f(x) = f(a) + 1 == a = 2 ) f'(a) 1! c) f(x) = f"(a) 2! 1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a. a) f(x) = e²x, a = 0 b) f(x) = lnx, a = 1 π d) f(x) = sinx, a = = 4 e) f(x) = √x, a = 4 -x³ + (x − a) + -(x − a)² + · (x − a)³ + · f""'(a) 3!
Solution
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SEE SOLUTION
Follow-up Question
Let f be a function with derivatives of all orders throughout some interval containing a as an
interior point. Then the Taylor series generated by f(x) at x = 0 is:
ƒ'(0)
f(x) = f(0) + -x +
1!
f"(0) f"" (0)
-x² +:
3!
2!
And the Taylor series generated by f(x) at x = a is:
f(x) = f(a) +
1
== a = 2
)
f'(a)
1!
c) f(x) =
f"(a)
2!
1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a.
a) f(x) = e²x, a = 0
b) f(x) = lnx, a = 1
π
d) f(x) = sinx, a = =
4
e) f(x) = √x, a = 4
-x³ +
(x − a) + -(x − a)² + · (x − a)³ + ·
f""'(a)
3!
Transcribed Image Text:Let f be a function with derivatives of all orders throughout some interval containing a as an interior point. Then the Taylor series generated by f(x) at x = 0 is: ƒ'(0) f(x) = f(0) + -x + 1! f"(0) f"" (0) -x² +: 3! 2! And the Taylor series generated by f(x) at x = a is: f(x) = f(a) + 1 == a = 2 ) f'(a) 1! c) f(x) = f"(a) 2! 1. Find the Taylor polynomials of orders 0, 1, 2, and 3 generated by f at a. a) f(x) = e²x, a = 0 b) f(x) = lnx, a = 1 π d) f(x) = sinx, a = = 4 e) f(x) = √x, a = 4 -x³ + (x − a) + -(x − a)² + · (x − a)³ + · f""'(a) 3!
Solution
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