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Evaluate the indefinite integral as a power series f(x) = 1 tan-1(x7) dx n=0 What is the radius of convergence R? R= -/0.77 points
Evaluate the indefinite integral as a power series x7 In(1 x) dx f(x) = C + n=0
What is the radius of convergence R?

Answers

Answer 1

Answer:

Answer:

$\mathbf{f(x)=C + \sum \limits ^(\infty)_(n=0) ((-1)^n \ x^(14n +8))/((2n+1)(14n+8))}$

For convergence since |x| > 1

The radius of convergence R = 1

$\mathbf{f(x) = C + \sum \limits ^(\infty)_(n =0) \frac{(-1)^n \ x^(n+9)} {(n+1) (x^(n+9))}}$

For convergence since |x| < 1

The radius of convergence R = 1

Step-by-step explanation:

Given that:

$f(x) = \int tan^(-1) (x^7) \ dx$

Let recall that for Power series of tan⁻¹ (x)

$tan^(-1) (x) = \sum \limits ^(\infty)_(n=0) ((-1)^n x^(2n+1))/((2n+1))$

Then $tan^(-1) (x^7) = \sum \limits ^(\infty)_(n=0) ((-1)^n (x^7)^(2n+1))/((2n+1))$

$tan^(-1) (x^7) = \sum \limits ^(\infty)_(n=0) ((-1)^n \ x^(14n+7))/((2n+1))$

Thus;

$f(x) =\int tan^(-1) (x^7) \ dx = \int \sum \limits ^(\infty)_(n=0) ((-1)^n \ x^(14n+7))/((2n+1))$

$\implies \sum \limits ^(\infty)_(n=0) ((-1)^n )/((2n+1)) \int x^(14n+7) \ dx$

$\mathbf{f(x)=C + \sum \limits ^(\infty)_(n=0) ((-1)^n \ x^(14n +8))/((2n+1)(14n+8))}$

For convergence since |x| > 1

The radius of convergence R = 1

$\int x^7 \ In (1 + x) \ dx$

Recall that for power series of,

$In(1+x) = \sum \limits ^(\infty)_(n = 0) ((-1)^n \ x^(n+1))/(n +1)$

Thus;

$x^7 \ In (1+x) = x^7 \sum \limits ^(\infty)_(n =0) ((-1)^n \ x^(n+1) )/(n+1)$

$\implies \sum \limits ^(\infty)_(n =0) ((-1)^n \ x^(n+8) )/(n+1)$

$f(x) = \int x^7 \ In (1+x) \ dx = \int \sum \limits ^(\infty)_(n =0) ((-1)^n \ x^(n+8) )/(n+1) \ dx$

$=\sum \limits ^(\infty)_(n =0) ((-1)^n)/(n+1) \int \ x^(n+8) \ dx$

$\mathbf{f(x) = C + \sum \limits ^(\infty)_(n =0) \frac{(-1)^n \ x^(n+9)} {(n+1) (x^(n+9))}}$

For convergence since |x| < 1

The radius of convergence R = 1

Answer 2

Answer:

Final answer:

To evaluate the indefinite integral as a power series for the given equations, we use the power series expansions of the functions involved. The radius of convergence, R, is the distance from the center of the power series to the nearest point where the power series diverges.

Explanation:

To evaluate the indefinite integral f(x) = 1/tan-1(x7) dx as a power series, we can use the power series expansion of tan-1(x). The power series expansion of tan-1(x) is x - (x3/3) + (x5/5) - (x7/7) + .... We substitute x7 for x in the power series expansion and integrate term by term. The radius of convergence, R, is the distance from the center of the power series to the nearest point where the power series diverges.

To evaluate the indefinite integral f(x) = x7ln(1-x) dx as a power series, we can use the power series expansion of ln(1-x). The power series expansion of ln(1-x) is -x - (x2/2) - (x3/3) - (x4/4) - .... We substitute x7 for x in the power series expansion and integrate term by term. The radius of convergence, R, is the distance from the center of the power series to the nearest point where the power series diverges.

Learn more about Integration using power series here:

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Translate the following into algebraic expressions: The first class has a kids in it, the second has b kids in it, and the third class has c kids in it. The kids from all three classes are divided equally between two buses. How many kids are in each bus?

Answers

Answer:

(a + b + c)/2

Step-by-step explanation:

Number of kids in first class: a

Number of kids in second class: b

Number of kids in third class: c

The total number of kids in all classes is: a + b + c

The total number of kids is divided equally between 2 buses:

(a + b + c)/2

Answer:

(a + b + c)/2

Step-by-step explanation:

;)

Multiply the polynomials 3(x+7) (show work pls)

Answers

Answer:

3x + 21

Step-by-step explanation:

(3)(x+7)

Now, we distribute the 3 in each term of (x+7)

So, 3*x = 3x and 3*7 = 21.

So our resulting term would be 3x+21.

Compute the distance between (a,b,c) and (-2,5,6).a.
(a + 2)^2 + (b - 5)^2 + (c - 6)^2
c.
a + b + c -(-2 + 5 + 6)
b.
sqrt((a+2)^2+(b-5)^2+(c-6)^2)
d.
((a + 2) + (b - 5) + (c - 6))^2

Answers

Answer:

b. sqrt(a+2)^2+(b-5)^2+(c-6)^2

Step-by-step explanation:

Use distance formula

sqrt (a-(-2)^2 + (b-5)^2 + (c-6) ^2

sqrt (a+2)^2 +(b+5)^2 + (c-6)^2

Answer:

Step-by-step explanation:

took it on edge, it's the right answer :)

Sample annual salaries (in thousands of dollars) for employees at a company are listed. 51 53 48 62 34 34 51 53 48 30 62 51 46 (a) Find the sample mean and sample standard deviation. (b) Each employee in the sample is given a $5000 raise. Find the sample mean and sample standard deviation for the revised data set. (c) Each employee in the sample takes a pay cut of $2000 from their original salary. Find the sample mean and the sample standard deviation for the revised data set. (d) What can you conclude from the results of (a), (b), and (c)?

Answers

Answer:

Mean increase or decrease (same quantity) according to the quantity of the increment or reduction

As all elements were equally affected the standard deviation will remain the same

Step-by-step explanation:

For the original set of salaries: ( In thousands of $ )

51, 53, 48, 62, 34, 34, 51, 53, 48, 30, 62, 51, 46

Mean = μ₀ = 47,92

Standard deviation = σ = 9,56

If we raise all salaries in the same amount ( 5 000 $ ), the nw set becomes

56,58,53,67,39,39,56,58,53,35,67,56,51

Mean = μ₀´ = 52,92

Standard deviation = σ´ = 9,56

And if we reduce salaries in the same quantity ( 2000 $ ) the set is

49,51,46,60,32,32,49,51,46,28,60,49,44

Mean μ₀´´ = 45,92

Standard deviation σ´´ = 9,56

What we observe

1.-The uniform increase of salaries, increase the mean in the same amount

2.-The uniform reduction of salaries, reduce the mean in the same quantity

3.-The standard deviation in all the sets remains the same.

We can describe the situation as a translation of the set along x-axis (salaries). If we normalized the three curves we will get a taller curve (in the first case) and a smaller one in the second, but the data spread around the mean will be the same

Any uniform change in the data will directly affect the mean value

Uniform changes in values in data set will keep standard deviation constant

Final answer:

The mean salary is affected by each employee's changes in salary, such as raises and pay cuts, but the standard deviation (the spread of salaries) remains the same provided the change is the same for all individuals.

Explanation:

To answer this question, we need to calculate the sample mean and sample standard deviation in each case. The sample mean is the average of the data, while the sample standard deviation is a measure of the amount of variation or dispersion in the data set.

(a) Calculate the sample mean and sample standard deviation of the initial salaries. This involves summing all the salaries and dividing by the total number to get the mean, then calculating the standard deviation using the formula: square root of [sum of (each salary - mean salary)² divided by (total number of salaries - 1)].
(b) When each employee is given a $5000 raise, the mean will increase by 5, while the standard deviation will remain the same because raises do not affect the dispersion of the team's salaries.
(c) Similarly, when each employee takes a pay cut of $2000, the mean salary will decrease by 2, but the standard deviation will again remain the same because pay cuts do not affect the dispersion of the team's salaries.
(d) We can conclude that while the mean is affected by changes in individual salaries (like raises and pay cuts), the standard deviation is not, provided the change is the same for all individuals. Therefore, it shows that while supply changes can affect the central tendency (mean), they do not impact how spread out the salaries are (standard deviation).

Learn more about Mean and Standard Deviation here:

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Find the measure of each numbered angle.

Answers

Answer:

∠3 = 22°

∠4 = 22°

∠5 = 88°

Step-by-step explanation:

86 + 72 = 158

180 - 158 = 22

∠3 ≅∠4 they're verticle angles

22+ 70 = 92

180 - 92 = 88

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What is the y value of the line when x = -1

Answers

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Evaluate the indefinite integral as a power series f(x) = 1 tan-1(x7) dx n=0 What is the radius of convergence R? R= -/0.77 points Evaluate the indefinite integral as a power series x7 In(1 x) dx f(x) = C + n=0 What is the radius of convergence R?

Answers

Final answer:

Explanation:

Learn more about Integration using power series here:

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Final answer:

Explanation:

Learn more about Mean and Standard Deviation here:

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Evaluate the indefinite integral as a power series f(x) = 1 tan-1(x7) dx n=0 What is the radius of convergence R? R= -/0.77 points
Evaluate the indefinite integral as a power series x7 In(1 x) dx f(x) = C + n=0
What is the radius of convergence R?