QuestionExercise 1.
Determine limited development in the neighborhood of to the indicated order for the following functions
1.
3. ,
2.
4. ,
5.
Exercise 2.
1. Determine the limited development in the neighborhood of to the indicated order of the following functions :
(a) .
(b) .
2. Determine Determine the limited development in the neighborhood of to the indicated order of the following functions :
(a)
(b)
Studdy Solution
STEP 1
1. We are tasked with finding the Taylor series expansion (limited development) of given functions around a specified point to a certain order .
2. We will use standard Taylor series expansions and algebraic manipulation to achieve the desired results.
3. The functions are assumed to be differentiable up to the required order in the neighborhood of the specified point.
STEP 2
1. Exercise 1: Find the Taylor series expansion for each function around to the specified order .
- Function 1: with
- Function 2: with
- Function 3: with
- Function 4: with
- Function 5: with
2. Exercise 2: Find the Taylor series expansion for each function around the specified point or at to the specified order .
- Part 1:
- Function (a): , ,
- Function (b): , ,
- Part 2:
- Function (a): ,
- Function (b): ,
Exercise 1:
STEP 3
For Function 1: , expand both the numerator and denominator using Taylor series around .
STEP 4
Simplify the expression by dividing the series expansions of the numerator and denominator and truncate to order .
STEP 5
For Function 2: , use the Taylor series for and around .
STEP 6
Simplify and truncate the expression to order .
STEP 7
For Function 3: , use the binomial series expansion for both the numerator and denominator.
STEP 8
Simplify and truncate the expression to order .
STEP 9
For Function 4: , use the series expansion for and .
STEP 10
Simplify and truncate the expression to order .
STEP 11
For Function 5: , use the series expansion for and the exponential function.
STEP 12
Simplify and truncate the expression to order .
Exercise 2:
STEP 13
For Part 1, Function (a): , expand around using Taylor series to order .
STEP 14
Simplify the expression.
STEP 15
For Part 1, Function (b): , expand around using Taylor series to order .
STEP 16
Simplify the expression.
STEP 17
For Part 2, Function (a): , expand around using asymptotic expansion to order .
STEP 18
Simplify the expression.
STEP 19
For Part 2, Function (b): , expand around using asymptotic expansion to order .
STEP 20
Simplify the expression.
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