Katie invests money in two bank accounts: one paying 3% and the other paying 11% simple interest per year. Katie invests twice as much money in the lower-yielding account because it is less risky. If the annual interest is $6,035, how much did Katie invest at each rate? Amount invested at 3% interest is $ Amount invested at 11% interest is $

Answers

Answer 1

Amount

invested at 3% interest is $24,140.Amount invested at 11% interest is $48,280.

Let the amount invested at 3% be x, then the amount invested at 11% will be 2x (since she invests twice as much in the lower-yielding account).

Given that the annual interest is $6,035.

The interest from the amount

invested

at 3% is 0.03x and the interest from the amount invested at 11% is 0.11(2x) = 0.22x.

Therefore, we have:0.03x + 0.22x = 6035

Combine like terms to get:0.25x = 6035

Divide both sides by 0.25 to solve for

x:x = 6035/0.25

= $24,140

This means that Katie invested $24,140 at 3% interest.

She invested twice as much (2x) at 11% interest, which is:$24,140 * 2

= $48,280

Therefore, the amount invested at 11% interest is $48,280.

Hence,Amount invested at 3% interest is $24,140.Amount invested at 11%

interest

is $48,280.

To know more about

amount

visit:-

https://brainly.com/question/25720319

#SPJ11


Related Questions


How do you determine the mean in order to calculate the Poisson
probabilities?

Answers

To calculate Poisson probabilities, you need the mean value (λ) of the distribution. Mean = average # of events in fixed interval/space. The Poisson PMF calculates event probability based on mean value and number of events in a given interval or space.

What is  Poisson probabilities?

To calculate Poisson probabilities, use the formula with λ and k values. Determine λ based on context or problem. Use data to calculate mean by taking the average.

The Poisson experiment is linked to a random variable labeled as X, which is the numerical value representing the frequency of occurrences within a specific timeframe. The Poisson distribution utilizes λ as the mean number of events that occur within a given timeframe. A Poisson probability distribution has an average of λ, which is also the mean, and a standard deviation of √λ.

Learn more about  Poisson probabilities from

https://brainly.com/question/30388228

#SPJ4

Major universities claim that 72% of the senior athletes graduate that year. 50 senior athletes attending major universities are randomly selected whether or not they graduate. SHOW YOUR WORK FOR ALL PARTS!
(a) What is the probability that exactly 30 senior athletes graduated that year?
(b) What is the probability that at most 37 senior athletes graduated that year?
(c) What is the probability that at least 40 senior athletes graduated that year?

Answers

Let p be the probability that senior athlete graduates that year. Then, p = 0.72 and q = 0.28, where q is the probability that a senior athlete does not graduate that year.

(a) Probability that exactly 30 senior athletes graduated that year is 0.1251 or 12.51%.

(b) Probability that at most 37 senior athletes graduated that year is 0.7596 or 75.96%.

(c) Probability that at least 40 senior athletes graduated that year is 0.1421 or 14.21%.

We are given that major universities claim that 72% of the senior athletes graduate that year. We are required to find the probability that exactly 30 senior athletes graduated that year, the probability that at most 37 senior athletes graduated that year, and the probability that at least 40 senior athletes graduated that year.

(a) We need to find the probability that exactly 30 senior athletes graduated that year. This is a binomial distribution problem.

Using the binomial distribution formula, we get:

P(X = 30) = C(50, 30) × p³⁰ × q²⁰ = (50!/(30!20!)) × (0.72)³⁰ × (0.28)²⁰ ≈ 0.1251 ≈ 12.51%

(b) We need to find the probability that at most 37 senior athletes graduated that year. Using the binomial distribution formula, we get:

P(X ≤ 37) = P(X = 0) + P(X = 1) + ... + P(X = 37) = ∑ C(50, i) × pⁱ × q^(50-i) where i takes values from 0 to 37. By using a binomial distribution table or calculator, we can find that P(X ≤ 37) ≈ 0.7596 ≈ 75.96%

(c) We need to find the probability that at least 40 senior athletes graduated that year. Using the binomial distribution formula, we get:

P(X ≥ 40) = P(X = 40) + P(X = 41) + ... + P(X = 50) = ∑ C(50, i) × pⁱ × q^(50-i) where i takes values from 40 to 50. Using a binomial distribution table or calculator, we can find that P(X ≥ 40) ≈ 0.1421 ≈ 14.21%.

We have calculated the probabilities of exactly 30 senior athletes graduating that year, at most 37 senior athletes graduating that year, and at least 40 senior athletes graduating that year.

To know more about Probability visit :

brainly.com/question/31828911

#SPJ11

"







6, 7, 8, 11, 14, 18, 22, 24, 28, 31, 35 Using StatKey or other technology, find the following values for the above data. Click here to access StatKey (a) The mean and the standard deviation Round your answer

Answers

Given data: 6, 7, 8, 11, 14, 18, 22, 24, 28, 31, 35To find: Mean and Standard deviationWe can use the StatKey online calculator to find the mean and standard deviation.

Step 1: Go to the website "Type the data set in the box (separated by commas)Step 6: Click on "Calculate"Mean: The mean is the average of the data set. It can be calculated by adding up all the values in the data set and then dividing by the number of values.

Mean = (6+7+8+11+14+18+22+24+28+31+35)/11 = 19.9091 (rounded to 4 decimal places)Standard Deviation: The standard deviation is a measure of how spread out the data is. It can be calculated using the formula: σ = √((Σ(x-μ)²)/n)

where μ is the mean of the data set and n is the number of values. σ = √((Σ(x-μ)²)/n) = √(((6-19.9091)² + (7-19.9091)² + (8-19.9091)² + (11-19.9091)² + (14-19.9091)² + (18-19.9091)² + (22-19.9091)² + (24-19.9091)² + (28-19.9091)² + (31-19.9091)² + (35-19.9091)²)/11) = 9.5654

To know more about Mean  visit:

https://brainly.com/question/31101410

#SPJ11

in exercises 11 and 12, find the dimension of the subspace spanned by the given vectors.

Answers

The dimension of the subspace spanned by the given vectors [1, 2, 0], [0, 1, 1], [1, 1, 1] is dim(subspace) = 3.

Given below are exercises 11 and 12.

Exercise 11:

Find the dimension of the subspace spanned by the given vectors [2, 1, -1], [4, 2, -2], [0, 1, -1].

Exercise 12:

Find the dimension of the subspace spanned by the given vectors [1, 2, 0], [0, 1, 1], [1, 1, 1].

In order to solve the given exercises.

We will be using the concept of the dimension of a subspace of a vector space.

The dimension of a subspace is defined as the number of vectors present in a basis for the subspace and is denoted by dim(subspace).

In order to find the dimension of the subspace, we need to first identify a basis for the subspace and then count the number of vectors in that basis.

Exercise 11:

We are given the vectors [2, 1, -1], [4, 2, -2], [0, 1, -1].

We can see that the third vector is a linear combination of the first two vectors.

That is, 2[2, 1, -1] + (-2)[4, 2, -2]

= [0, 1, -1].

Therefore, the subspace spanned by these three vectors is the same as the subspace spanned by the first two vectors [2, 1, -1], [4, 2, -2].

A basis for this subspace can be found by performing row operations on the augmented matrix [2 4 0; 1 2 1; -1 -2 -1] corresponding to the given vectors:

[2 4 0; 1 2 1; -1 -2 -1] ~ [1 2 0; 0 0 1; 0 0 0]

The first and third columns of the row echelon form above correspond to the basis vectors [2, 1, -1] and [0, 1, -1], respectively.

Therefore, the dimension of the subspace spanned by the given vectors [2, 1, -1], [4, 2, -2], [0, 1, -1] is dim(subspace) = 2.

Exercise 12:

We are given the vectors [1, 2, 0], [0, 1, 1], [1, 1, 1].

We can see that none of these vectors are linear combinations of the other two vectors.

Therefore, all three vectors are linearly independent and form a basis for the subspace spanned by them.

Therefore, the dimension of the subspace spanned by the given vectors [1, 2, 0], [0, 1, 1], [1, 1, 1] is dim(subspace) = 3.

Hence, the answer to the given question is as follows:

Exercise 11:

The dimension of the subspace spanned by the given vectors [2, 1, -1], [4, 2, -2], [0, 1, -1] is dim(subspace) = 2.

Exercise 12:

The dimension of the subspace spanned by the given vectors [1, 2, 0], [0, 1, 1], [1, 1, 1] is dim(subspace) = 3.

To know more about vectors visit:

https://brainly.com/question/27854247

#SPJ11

Imagine that your friend rolls a number cube, but you cannot see what number it landed on. He tells you that the number is less than 4. Determine the probability that he rolled a 2. Explain your variables and how you found the probability. Use the paperclip button below to attach files mas 100 actes G BIU Ω INTL O 12:37

Answers

The probability of the friend rolling a 2 = P(E2) = 1/3.

In this problem, it is given that a friend rolls a number cube, but the number rolled on the cube cannot be seen by you. However, the friend tells you that the number is less than 4, and you are asked to find the probability that the friend rolled a 2.

Variable:In the given problem, the number cube can show any number between 1 to 6.

However, since it is given that the number is less than 4, the possible outcomes would be {1, 2, 3}.

Therefore, the sample space of this experiment would be S = {1, 2, 3}.

Event:The friend has told us that the number is less than 4.

Hence, we can consider the event E = {1, 2, 3}.

Probability:Probability of rolling a 2 would be P(E2) where E2 is the event of rolling a 2.

Since rolling a 2 is only possible when the friend rolls a number 2, the event E2 has only one possible outcome.

Hence, P(E2) = 1/3. Therefore, the probability that the friend rolled a 2 is 1/3.

This probability is obtained by dividing the number of favorable outcomes by the total number of possible outcomes.

Here, the total number of possible outcomes is 3 and the number of favorable outcomes is 1 (only when the friend rolls a 2).

Therefore, the probability of the friend rolling a 2 = P(E2) = 1/3.

Learn more about probability

brainly.com/question/31828911

#SPJ11

Answer the following 6 questions which parallel the video. First, consider N(15, 6). (a) Find the score for x = 22.452 (to 2 decimal places). 2₁ = (b) Now find the probility (to 4 decimal places from the z-score table), that a randomly chosen X is less than 22.452. P(X<22.452) = Second, consider N(16, 4). (c) Find the score for x = 14.464 (to 2 decimal places). 22 = (d) Now find the probility (to 4 decimal places from the z-score table), that a randomly chosen X is less than 14.464. P(X < 14.464) = Third, consider N(18, 3). (e) If we know the probability of a random variable X being less than 3 is 0.8632 [that is, we know P(X23) = 0.8632], use the z-score table to find z-score for 3 that gives this probability. (A picture may be useful). 23 = (f) Now use the formula for the z-score given a, u and o to find the value of 23 that has the correct probability. 3 =

Answers

a) N(15,6), Score for x = 22.452 Score formula z = (X-μ)/σ Where X = 22.452, μ = 15 and [tex]σ = 6z = (22.452 - 15)/6= 1.24267[/tex] To 2 decimal places = 1.24 (Answer)Therefore, the z-score of X = 22.452 is 1.24. b) N(15,6), Probability of X < 22.452 Probabilty formula, P(X<22.452) = Φ(z)Where z = 1.24267, Φ(z) can be calculated from z-score table.

P(Z < 1.24) = 0.8925 (approximate)To 4 decimal places = 0.8925 (Answer)Therefore, the probability of X being less than 22.452 is 0.8925.Second, consider N(16,4).c) N(16,4), Score for x = 14.464 Score formula z = (X-μ)/σWhere X = 14.464, μ = 16 and σ = 4z = (14.464 - 16)/4 = -0.384 To 2 decimal places = -0.38 (Answer)Therefore, the z-score of X = 14.464 is -0.38.d) N(16,4), Probability of X < 14.464 Probabilty formula, P(X<14.464) = Φ(z)Where z = -0.384, Φ(z) can be calculated from z-score table.P(Z < -0.38) = 0.3528 (approximate)To 4 decimal places = 0.3528 (Answer)Therefore, the probability of X being less than 14.464 is 0.3528.Third, consider N(18,3).e) N(18,3), Z-score for P(X<3) = 0.8632 Using z-score table,P(Z < z) = 0.8632 The closest probability to 0.8632 is 0.8633, corresponding to z-score of 1.05. (from the table)Therefore, the z-score for [tex]P(X < 3) = 0.8632 is 1.05[/tex].f) N(18,3), Value of X corresponding to P(X<3) = 0.8632 Score formula, z = (X-μ)/σ

To find X, re-arrange the score formula, X = μ + z * σWhere z = 1.05, μ = 18 and[tex]σ = 3X = 18 + 1.05 * 3 = 21.15[/tex] To 2 decimal places = 21.15 (Answer)Therefore, the value of X corresponding to P(X<3) = 0.8632 is 21.15.

To know more about probability visit-

https://brainly.com/question/31828911

#SPJ11

Find the inverse function and graph both f and f−1 on the same set of axes.
f(x)=√3−x

Answers

The inverse function is f⁻¹(x) = -x² + 3.

A graph of the functions is shown in the image below.

What is an inverse function?

In Mathematics, an inverse function simply refers to a type of function that is obtained by reversing the mathematical operation in a given function (f(x)).

In this exercise, you are required to determine the inverse of the function f(x). This ultimately implies that, we would have to interchange both the independent value (x-value) and dependent value (y-value) as follows;

f(x) = y = √(3 - x)

x = √(3 - y)

By taking the square of both sides, we have:

x² = 3 - y

f⁻¹(x) = -x² + 3

Read more on inverse function here: brainly.com/question/14033685

#SPJ4

 
Suppose that p(x) = c/3*, x = 1,2,..., is the probability function for a random variable X. 35. Determine c. (a) 2 (b) 2.25 (c) 1.5 (d) 1.8 36. Find P(2 ≤X<5) 26 (a) 81 13 (b) 13 (c) 54 13 (d) 45 37. Which of the following is a false property of a standard normal distribution? I: the mean is zero (0) and the standard deviation is 1. II: the distribution is symmetric about the mean. III: the mean, mode and median are the same. IV: P(-1 ≤Z≤ 1)=0.68. (a) I only (b) IV only (c) All the above (d) None of the above.

Answers

The correct option is `(c) All the above`.None of the properties is false.

We are given that the probability function for a random variable X is given by,[tex]`p(x) = c/3*, x = 1,2,...,`[/tex]

We are to determine the value of c. Given probability function is [tex]`p(x) = c/3*`.[/tex]

The sum of probabilities of all the events is 1.

So, we can use this concept to find the value of c.[tex]`P(X = 1) + P(X = 2) + P(X = 3) + ... = 1`[/tex]

We know that the probability function is given as,[tex]`p(x) = c/3*[/tex]

`When [tex]`x = 1`, `p(x = 1) = c/3`[/tex]

When `[tex]x = 2`, `p(x = 2) = c/3*2[/tex]

`When[tex]`x = 3`, `p(x = 3) = c/3*3[/tex]

When `x = n`, `p(x = n) = c/3*n`

Therefore,[tex]`P(X = 1) + P(X = 2) + P(X = 3) + ... = c/3 + c/3*2 + c/3*3 + ... = 1[/tex]

`Let's simplify the equation.[tex]`c/3 + c/3*2 + c/3*3 + ... = 1``c/3(1 + 1/2 + 1/3 + ...) = 1``c/3ln(e) = 1``c = 3/ln(e)`[/tex]

Hence, the value of c is `3/ln(e)`.We are given that `p(x) = c/3*` and we need to find [tex]`P(2 ≤X < 5)`.`P(2 ≤X < 5) = P(X = 2) + P(X = 3) + P(X = 4)`[/tex]

From part (a), we know that `c = 3/ln(e)`.

Therefore,[tex]`p(x) = (3/ln(e))/(3*x)``P(X = 2) \\= (3/ln(e))/(3*2) = 0.5/ln(e)``P(X = 3) \\=(3/ln(e))/(3*3) = 0.5/ln(e)``P(X = 4) \\= (3/ln(e))/(3*4) = 0.5/ln(e)`[/tex]

Hence,[tex]`P(2 ≤X < 5) = P(X = 2) + P(X = 3) + P(X = 4) = 0.5/ln(e) + 0.5/ln(e) + 0.5/ln(e) \\= 1.5/ln(e)`[/tex]

Hence, the required probability is `1.5/ln(e)`.

We need to determine the false property of a standard normal distribution.

We know that a standard normal distribution has mean `μ = 0` and standard deviation `σ = 1`. T

he distribution is symmetric about the mean. The mean, mode, and median are the same.

The probability of getting a value between `-1` and `1` is `0.68`.

Therefore, the correct option is `(c) All the above`.None of the properties is false.

Know more about probability here:

https://brainly.com/question/25839839

#SPJ11

q.7 Allen's hummingbird (Selasphorus sasin) has been studied by zoologist Bill Alther. Suppose a small group of 13 Allen's hummingbirds has been under study in Arizona. The average weight for these birds is x = 3.15 grams. Based on previous studies, we can assume that the weights of Allen's hummingbirds have a normal distribution, with = 0.40 gram. When finding an 80% confidence interval, what is the critical value for confidence level? (Give your answer to two decimal places.) Zc=1.28 (a) Find an 80% confidence interval for the average weights of Allen's hummingbirds in the study region. What is the margin of error? (Round your answers to two decimal places.)

Answers

The critical value for an 80% confidence level is 1.28.

The 80% confidence interval for the average weights of Allen's hummingbirds in the study region can be calculated using the formula:

Confidence Interval = (x - Margin of Error, x + Margin of Error)

To find the margin of error, we need to consider the standard deviation of the population (σ), sample size (n), and the critical value (Zc). The formula for margin of error is:

Margin of Error = Zc * (σ / √n)

Given that the average weight (x) is 3.15 grams, the standard deviation (σ) is 0.40 gram, and the sample size (n) is 13, we can substitute these values into the formula. Using Zc = 1.28, we can calculate the margin of error as follows:

Margin of Error = 1.28 * (0.40 / √13) ≈ 0.47 grams

Therefore, the 80% confidence interval for the average weights of Allen's hummingbirds in the study region is approximately (2.68 grams, 3.62 grams), with a margin of error of 0.47 grams.

To learn more about critical value, click here:

brainly.com/question/32607910

#SPJ11

Find the Fourier transform of sinc(t). sin(πt)/πt sinc(t) denote the sinc function
c. π/2 rect(w), rect is the rectangular pulse function
b. π rect(w/3), rect is the rectangular pulse function
d. π rect(-w/2), rect is the rectangular pulse function
a. π rect(w/2), . rect is the rectangular pulse function

Answers

The Fourier transform of a function f(t) is given by F(w) = ∫[−∞ to ∞] f(t) e^(-jwt) dt, where F(w) represents the Fourier transform of f(t) with respect to the frequency variable w.

a)The Fourier transform of π rect(w/2) can be found using the properties of the Fourier transform. The rectangular pulse function rect(t) has a Fourier transform that is a sinc function, given by sinc(w/2π). Since we have π multiplied by rect(w/2), the Fourier transform becomes π sinc(w/2π). b) Similarly, the Fourier transform of π rect(w/3) is π sinc(w/3π). Here, the width of the rectangular pulse function is scaled by a factor of 3, which affects the frequency response in the Fourier domain.

c) The Fourier transform of π rect(-w/2) can be obtained by taking the complex conjugate of the Fourier transform of π rect(w/2). Since the Fourier transform is an integral, the limits of integration will be flipped, resulting in the negative sign in the argument of the sinc function. Thus, the Fourier transform becomes -π sinc(w/2π). d) Finally, the Fourier transform of π/2 rect(w) can be obtained by scaling the sinc function by π/2. Therefore, the Fourier transform is given by (π/2) sinc(w).

In summary, the Fourier transforms of the given functions are:

a) π sinc(w/2π)

b) π sinc(w/3π)

c) -π sinc(w/2π)

d) (π/2) sinc(w)

To learn more about Fourier transform click here:

brainly.com/question/31683614

#SPJ11

a particle moves along the x axis with its position at time t given by x(t)=(t-a)(t-b)

Answers

The position of a particle moving along the x-axis at time t is defined by the equation x(t) = (t - a)(t - b).

Could you provide an alternative expression to describe the position of the particle on the x-axis?

The equation x(t) = (t - a)(t - b) represents the position of a particle moving along the x-axis. Here, 'a' and 'b' are constants that affect the position of the particle. The equation is a quadratic function, resulting in a parabolic path for the particle's motion. The values of 'a' and 'b' determine the position of the particle at specific points in time.

To understand the behavior of the particle, we need to analyze the factors affecting its position. When t < a, both terms in the equation are negative, resulting in a positive value for x(t). As t approaches a, the first term becomes zero, and x(t) also becomes zero, indicating that the particle is at the position defined by 'a'. Similarly, when t > b, both terms in the equation are positive, resulting in a positive value for x(t). As t approaches b, the second term becomes zero, and x(t) becomes zero, indicating that the particle is at the position defined by 'b'.

Therefore, the given equation provides information about the particle's position along the x-axis as a function of time, with 'a' and 'b' determining specific positions. By analyzing this quadratic function, we can gain insights into the particle's path and behavior.

Learn more about position of a particle

brainly.com/question/29053545

#SPJ11

Show full solution: Find all relative extrema and saddle points of the following function using Second Derivatives Test
a. f(x,y) =x^4- 4x^3 + 2y^2+ 8xy +1
b. f(x,y) = e^xy +2

Answers

(a) The function is f(x,y) = x^4 - 4x^3 + 2y^2 + 8xy + 1.

(b) The function is f(x, y) = e^(xy) + 2.

(a) To find the relative extrema and saddle points, we need to compute the second partial derivatives of f(x, y) with respect to x and y. Then, we evaluate these partial derivatives at critical points where the first partial derivatives are zero or undefined.

After finding the critical points, we use the Second Derivatives Test. For each critical point, we evaluate the Hessian matrix (the matrix of second partial derivatives). The test involves determining the eigenvalues of the Hessian matrix at each critical point.

If all eigenvalues are positive, the point is a relative minimum. If all eigenvalues are negative, the point is a relative maximum. If there are positive and negative eigenvalues, the point is a saddle point.

(b) To find the relative extrema and saddle points, we need to compute the second partial derivatives of f(x, y) with respect to x and y. Then, we evaluate these partial derivatives at critical points where the first partial derivatives are zero or undefined.

However, in this case, the function f(x, y) = e^(xy) + 2 does not have any critical points since its first partial derivatives do not equal zero for any x and y. Therefore, we cannot apply the Second Derivatives Test to find relative extrema or saddle points. The function does not exhibit any local maximum, minimum, or saddle points.

Learn more about Partial Derivative click here :brainly.com/question/28376218

#SPJ11

Assume that a sample is used to estimate a population mean μ.
Find the 99.5% confidence interval for a sample of size 937 with a
mean of 46.2 and a standard deviation of 17.7. Enter your answers
accu

Answers

The 99.5% confidence interval for the sample of size 937 with a mean of 46.2 and a standard deviation of 17.7 is approximately [44.525, 47.875].

How to solve for the standard deviation

standard deviation = sample standard deviation

sample size = size of the sample

Plugging in the values:

Confidence Interval = 46.2 ± 2.807 * (17.7 / √937)

Calculating the values within the formula:

Confidence Interval = 46.2 ± 2.807 * (17.7 / √937)

Confidence Interval = 46.2 ± 2.807 * (17.7 / 30.577)

Confidence Interval = 46.2 ± 2.807 * 0.577

Confidence Interval = 46.2 ± 1.675

Confidence Interval = [44.525, 47.875]

Therefore, the 99.5% confidence interval for the sample of size 937 with a mean of 46.2 and a standard deviation of 17.7 is approximately [44.525, 47.875].

Read more on  confidence interval https://brainly.com/question/15712887

#SPJ4

introduction to optimisation question,
i solved the first question, i need help with the second one
please. please make sure the answer is clear. thank you
MAT2008 INTRODUCTION TO OPTIMIZATION HOMEWORK II Due date: May, 224, 2022 1. Consider the problem minimize f(x₁,X₂)=(X₁-2X₂)² + X4₁.
(a) Suppose that Newton's method with line search is used to min- imize the function starting from the point z=(2,1). What is the Newton search direction at this point? Find the next iterate
(b) Suppose that backtracing is used. Does the trial step a = 1 satisfy the sufficient decrease condition(Armijo condition) for = 0.27. For what values of a does a satisfy the Armijo condition. For which values of n is the Wolfe condition satisfied?
2. Consider the following trust-region algorithm: Specify some ro as an initial guess. Let the constants 7₁.72 € (0.1) are given. Typical values are 7₁=1₁₁=1 For km 0,1..
If ze is optimal, then stop. Compute Ph= f(x₂)-f(3x +PA) 1(2₂)-₂ (Pa) where (P) = f(x) + f(x) pa + P²²f(x) with pe=-(²f(za) +μl)-¹()).
if p < n then the step is failed: +1. 2p.
if

72 then the step is very good: 12+ ==
Compute the trust-region radius A. || ()||-
To minimize the function fr. 2₂)=-² + (²₁-2₂)²
(a) Let zo (1.1). Apply the full Newton step to give ₁. -
(b) Let (1.1). Calculate the trust-region search direction with initial value = 1. Would you accept this step in the trust region algorithm above or a should be changed?

Answers

In this optimization problem, we are asked to perform certain calculations using Newton's method and trust-region algorithm. Specifically, we need to find the Newton search direction and the next iterate starting from a given point, as well as compute the trust-region search direction and decide whether to accept the step or change the parameter value.

(a) Newton's method with line search:

To find the Newton search direction at the point z=(2,1), we need to compute the gradient and Hessian matrix of the function f(x₁,x₂)=(x₁-2x₂)² + x₄₁.

The Newton search direction can be obtained by solving the equation Hd = -∇f(z), where d is the search direction, H is the Hessian matrix, and ∇f(z) is the gradient at the point z.

Once the search direction is obtained, we can compute the next iterate by updating z as z_new = z + ad, where a is the step size determined by line search.

(b) Armijo condition and Wolfe condition:

To determine if the trial step a = 1 satisfies the sufficient decrease condition (Armijo condition) for the given value of 0.27, we need to check if f(z + ad) ≤ f(z) + c₁a∇f(z)Td, where c₁ is a constant between 0 and 1.

If a satisfies the Armijo condition, then it provides sufficient decrease in the objective function.

The values of a that satisfy the Armijo condition can be found by performing a backtracking line search.

The Wolfe condition is a stronger condition that also ensures curvature in the search direction.

The values of n for which the Wolfe condition is satisfied can be determined through additional calculations.

Trust-region algorithm:

In this algorithm, the trust-region radius A is computed as the norm of the vector Ph, where Ph is the solution of a subproblem involving the Hessian matrix, gradient, and a parameter μ.

If the step size p is less than a certain threshold, the step is considered failed and the trust-region radius is increased. If p is greater than another threshold, the step is considered very good.

The trust-region search direction is then calculated based on the current value of the parameter ro.

In summary, this problem requires performing calculations related to Newton's method, line search, Armijo condition, Wolfe condition, and trust-region algorithm. The specific steps and computations involved are crucial in determining the search directions, iterates, and acceptance of steps in the optimization process.

To learn more about Newton's method, click here: brainly.com/question/17081309

#SPJ11

Suppose the average reaction time for a driver is 400 ms with standard deviation 100 ms, and assume reaction time is normally distributed. (a) Find the probability that a random driver's reaction time is between 250 ms and 550 ms. (b) Suppose three cars are closely following one another when the first car suddenly stops. If greater than 1 s of lag time (i.e. the sum of the two trailing driver reaction times) occurs, there will be a collision either between the first two or second two cars. What is the probability of a crash?

Answers

The probability of a crash occurring due to lag time exceeding 1 s is approximately 0.9207 or 92.07%.

To calculate this probability, we can use the Z-score formula. First, we convert the lower and upper reaction time limits to their respective Z-scores using the formula: Z = (X - μ) / σ, where X is the reaction time, μ is the mean, and σ is the standard deviation.

For the lower limit of 250 ms: Z1 = (250 - 400) / 100 = -1.5

For the upper limit of 550 ms: Z2 = (550 - 400) / 100 = 1.5

Next, we use a standard normal distribution table or calculator to find the area under the curve between these Z-scores. The probability of a random driver's reaction time falling between 250 ms and 550 ms is then the difference between the cumulative probabilities at Z2 and Z1, which is approximately 0.7887.

Regarding part (b), to calculate the probability of a crash, we need to consider the lag time caused by the sum of the reaction times of the trailing drivers. Given that each driver has a reaction time normally distributed with a mean of 400 ms and a standard deviation of 100 ms, we can apply the properties of normal distributions to solve this problem.

Let's assume the lag time is the sum of the reaction times of the second and third drivers. The mean lag time is 400 ms + 400 ms = 800 ms. The standard deviation of the sum of two independent random variables is the square root of the sum of their variances. Since the variances of both drivers are the same (100 ms^2), the standard deviation of the sum is sqrt(100^2 + 100^2) ≈ 141.42 ms.

To calculate the probability of lag time exceeding 1 s (1000 ms), we need to find the probability that the sum of the reaction times is greater than 1000 ms. This is equivalent to finding the probability of a Z-score greater than (1000 - 800) / 141.42 = 1.41.

Using a standard normal distribution table or calculator, we can find the cumulative probability corresponding to a Z-score of 1.41, which is approximately 0.9207. Therefore, the probability of a crash occurring due to lag time exceeding 1 s is approximately 0.9207 or 92.07%.

Learn more about Probability:

brainly.com/question/31828911

#SPJ11

A random sample of size 81 is taken from a normal population having a mean of 85 and a standard deviation of 2. A second random sample of size 25 is taken from a different normal population having a mean of 80 and a standard deviation of 4. Find the probability that the sample mean computed from the 81 measurements will exceed the sample mean computed from the 25 measurements by at least 3.4 but less than 5.6. Assume the difference of the means to be measured to the nearest tenth.

Answers

We need to find the probability that the difference between the sample means falls between 3.4 and 5.6 using the given information.


To find the probability, we first calculate the standard error of the sample mean for each population. For the sample of size 81 with a standard deviation of 2, the standard error is 2 / √(81) = 2 / 9. For the sample of size 25 with a standard deviation of 4, the standard error is 4 / √(25) = 4 / 5.

Next, we find the difference between the means: 85 - 80 = 5. We want to find the probability that this difference falls between 3.4 and 5.6. To do this, we convert these values into standard units using the respective standard errors.

The standard units for 3.4 and 5.6 are (3.4 - 5) / 2/9 = -1.9 and (5.6 - 5) / 2/9 = 0.8, respectively. We then calculate the probability using the z-table or a statistical calculator between -1.9 and 0.8 to find the desired probability.

Learn more about Probability click here :
brainly.com/question/30034780

#SPJ11

Summation Properties and Rules CW Find the sum for each series below: 20 100 1. Σ (6) 2. Σ., (51) 15 50 3 . Σ" (3) 4. Σ., (213)

Answers

The summation properties and rules are used to find the sum of a given series. The sum of each series is as follows:1. Σ(6)The series 6 + 6 + 6 + 6 + ….. + 6 contains 20 terms, so the sum can be found by multiplying the number of terms by the value of each term

S = 20(6)

S = 120

Therefore, the sum of the series is 120.2. Σ.(51)

The series 51 + 51 + 51 + 51 + ….. + 51 contains 100 terms,

so the sum can be found by multiplying the number of terms by the value of each term:S = 100(51)S = 5100

Therefore, the sum of the series is 5100.3. Σ"(3)

The series 3 + 3 + 3 + 3 + ….. + 3 contains 15 terms, so the sum can be found by multiplying the number of terms by the value of each term

:S = 15(3)

S = 45

Therefore, the sum of the series is 45.4. Σ.,(213)

The series 213 + 213 + 213 + 213 + ….. + 213 contains 50 terms,

so the sum can be found by multiplying the number of terms by the value of each term

:S = 50(213)

S = 10650

Therefore, the sum of the series is 10650.

To know more about sum visit :-

https://brainly.com/question/24205483

#SPJ11

Find the area of the regular polygon: Round your answer to the nearest tenth

Answers

The area of the shape is  105. 3 square units

How to determine the area

The formula for calculating the area of a regular triangle is expressed as;

A =1/2 aP

This is so, such that the parameters of the formula are expressed as;

A is the area of the trianglea is the length of the apothemP is the perimeter of the triangle

Note that perimeter is the sum of the lengths of the side.

Then, we have;

P= 15.6 + 15.6 + 15.6

add the values

P = 46.8 units

Substitute the value, we have;

Area = 1/2 × 4.5 × 46.8

Multiply the values, we get;

Area = 210.6/2

Divide the values

Area = 105. 3 square units

Learn more about area at: https://brainly.com/question/25292087

#SPJ1

For the independent projects shown below, determine which one (s) should be selected based on the AW values presented below. Alternative Annual Worth $/yr w -50,000 Х -10,000 +10,000 Z +25,000

Answers

Project W, on the other hand, should not be chosen since it has a negative AW value.

The independent projects that should be selected based on the AW values presented below are projects X and Z.

Alternative Annual Worth (AW) can be defined as a method of analyzing two or more alternatives with unequal lives, as well as comparing their values in current dollars.

A negative AW value indicates that the alternative's cash outflow exceeds its cash inflows, while a positive AW value indicates that the cash inflows exceed the cash outflows.

On the other hand, if the AW is zero, the cash inflows equal the cash outflows.

The independent projects shown below are W, X, and Z.

Their AW values are presented as follows:

W - $50,000/year;

X - $10,000/year;

Z + $25,000/year.

Since projects X and Z both have positive AW values, they should be chosen.

Project W, on the other hand, should not be chosen since it has a negative AW value.

To know more about Alternative Annual Worth, visit:

https://brainly.com/question/29025034

#SPJ11

find the taylor series for f(x) centered at the given value of a. [assume that f has a power series expansion. do not show that rn(x) → 0.] f(x) = 9x − 2x3, a = −3

Answers

The taylor series for f(x) centered at a = -3 is [tex]f(x) = 27 - 45(x + 3) + 18(x + 3)^2 - 2(x + 3)^3/3! + ...[/tex]

To obtain the Taylor series for the function f(x) = 9x - 2x^3 centered at a = -3, we can use the formula for the Taylor series expansion:

[tex]f(x) = f(a) + f'(a)(x - a) + f''(a)(x - a)^2/2! + f'''(a)(x - a)^3/3! + ...[/tex]

First, let's evaluate f(a) and its derivatives:

[tex]f(-3) = 9(-3) - 2(-3)^3 = -27 + 54 = 27[/tex]

[tex]f'(x) = 9 - 6x^2\\f'(-3) = 9 - 6(-3)^2 = 9 - 6(9) = 9 - 54 = -45[/tex]

[tex]f''(x) = -12x\\f''(-3) = -12(-3) = 36[/tex]

[tex]f'''(x) = -12\\f'''(-3) = -12[/tex]

Now, we can substitute these values into the Taylor series formula:

[tex]f(x) = 27 + (-45)(x + 3) + 36(x + 3)^2/2! + (-12)(x + 3)^3/3! + ...[/tex]

Simplifying, we have:

[tex]f(x) = 27 - 45(x + 3) + 18(x + 3)^2 - 2(x + 3)^3/3! + ...[/tex]

To know more about taylor series refer here:

https://brainly.com/question/31776250#

#SPJ11

Find the domain of the vector function et r(t) = (cos(2t), In(t + 2),( et/(t-1))
a. (-2, 1) U (1, [infinity]0)
b. (-[infinity], 1) U (1, [infinity])
c. (-2, [infinity])
d. (-1,2) U (2, [infinity]0)
e. (-[infinity], -2) U (-2,00)

Answers

To determine the domain of the vector function r(t) = (cos(2t), ln(t + 2), e^t/(t - 1)), we need to identify the valid values for the parameter t.

In this case, we need to consider the restrictions on the variables in each component of the vector function.

The cosine function, cos(2t), is defined for all real values of t.

The natural logarithm function, ln(t + 2), is defined only for positive values of (t + 2), i.e., t + 2 > 0, which implies t > -2.

The exponential function, e^t/(t - 1), is defined for all real values of t except when the denominator (t - 1) equals zero, which implies t ≠ 1.

Based on these considerations, we can determine that the domain of the vector function r(t) is given by option (e): (-∞, -2) U (-2, ∞). This represents all real values of t except for t = 1, where the function is undefined due to the division by zero.

To learn more about vector click here :

brainly.com/question/10841907

#SPJ11

An e-commerce Web site claims that % of people who visit the site make a purchase. A random sam of 15 to who vished the White What is the probability that less than 3 people will make a purchase?

Answers

The probability that less than 3 people will make a purchase from the given data is 0.999.

Given: An e-commerce website claims that % of people who visit the site make a purchase. A random sample of 15 is taken out of those who visited the website. We need to find the probability that less than 3 people will make a purchase.

We can solve this problem by using the binomial probability formula.

The formula for the binomial probability is:

P (X = k) = C(n, k) * p^k * (1 - p)^(n-k)

where n is the sample size, k is the number of successes, p is the probability of success, and C(n, k) is the binomial coefficient.

Here, the probability of making a purchase is not given, so we cannot directly use the formula. However, we can assume that the probability of making a purchase is small (say 0.01) and use the Poisson approximation to the binomial distribution.

The formula for Poisson approximation is:

P(X = k) = (e^(-λ) * λ^k) / k!

where λ = np is the mean and variance of the binomial distribution.

Here, n = 15 and p = %. So, λ = np = 15 * % = 0.15.

Now, we can find the probability of less than 3 people making a purchase:

P(X < 3) = P(X = 0) + P(X = 1) + P(X = 2)

P(X < 3) ≈ (e^(-0.15) * 0.15^0) / 0! + (e^(-0.15) * 0.15^1) / 1! + (e^(-0.15) * 0.15^2) / 2!

P(X < 3) ≈ 0.999.

Hence, the probability that less than 3 people will make a purchase from the given data is 0.999.

To know more about the binomial probability visit:

https://brainly.com/question/30773801

#SPJ11

Solve the following equation in the complex number system. Express solutions in both polar and rectangular form. x^6 + 64 =0 Write the solutions as complex numbers in polar form.

Answers

The solutions of the equation are as follows: x= -2i∛2, 2i∛2 in rectangular form. x= 2∛2∠(-π/2+2kπ)/3, 2∛2∠(π/2+2kπ)/3 in polar form. where k=0, 1, 2.

Let's start by expressing -64 in polar form. The magnitude of -64 is 64, and the argument can be found by considering that -64 lies in the third quadrant, which is π radians or 180 degrees away from the positive real axis. So, -64 can be written in polar form as: -64 = 64 * e^(iπ).

Factor the given equation as a difference of squares x⁶+64=0(x³)² + (8)² =0(x³+8i)(x³-8i)=0

To solve this equation, we set the factors equal to zero separately.x³+8i=0x³=-8i  ... (1)x³-8i=0x³=8i ... (2)

Now, we can solve equation (1) as follows;x³=-8iTake the cube root on both sides. x=-2i∛2

In rectangular form, x=-2i∛2+i0In polar form, x=2∛2∠(-π/2+2kπ)/3 where k=0, 1, 2. We can solve equation (2) as follows; x³=8iTake the cube root on both sides. x=2i∛2

In rectangular form, x=2i∛2+i0In polar form, x=2∛2∠(π/2+2kπ)/3 where k=0, 1, 2.Hence, the solutions of the equation are as follows:

x= -2i∛2, 2i∛2 in rectangular form. x= 2∛2∠(-π/2+2kπ)/3, 2∛2∠(π/2+2kπ)/3 in polar form. where k=0, 1, 2.

To know more about rectangular visit :-

https://brainly.com/question/29514785

#SPJ11

Prev Question 25 - of 25 Step 1 of 1 Find the Taylor polynomial of degree 3 near x = 0 for the following function. y = ³√4x + 1 Answer 2 Points √√4x + 1 ≈ P₃(x) = Keypad Keyboard Shortcuts Next

Answers

To find the Taylor polynomial of degree 3 near x=0 for the function y=³√4x+1,

we need to find the derivatives of y up to the third degree. The formula for the nth derivative of y is given by the following formula:nth derivative of y = n! × (4/3)^(-n) × x^(-2/3+n)

Let's find the first three derivatives of y:

First derivative of y: y' = (4/3)^(-1) × x^(-2/3) = 3/(4√x)

Second derivative of y: y'' = 2!(4/3)^(-2) × x^(1/3) = 9/(8x^(3/2))

Third derivative of y: y''' = 3!(4/3)^(-3) × x^(5/3) = 27/(16x^(5/2))

plug these values into the formula for the Taylor polynomial of degree 3:P₃(x) = y(0) + y'(0)x + (y''(0)/2!)x² + (y'''(0)/3!)x³P₃(x) = 1 + 0 + (3/2)x² + (27/16)x³Simplifying:P₃(x) = 1 + (3/2)x² + (27/16)x³

Therefore, the Taylor polynomial of degree 3 near x=0 for the function y=³√4x+1 is P₃(x) = 1 + (3/2)x² + (27/16)x³.

#SPJ11

https://brainly.com/question/32618850

The second derivative of g is 6x.

x=2 is a critical number of g(x).

Use second derivative test to determine whether x=2 is a relative min, max or neither.

Answers

To determine whether x = 2 is a relative minimum, maximum, or neither, we can use the second derivative test. The second derivative of g(x) is given as 6x.

At x = 2, the second derivative is 6(2) = 12, which is greater than 0.

The second derivative test states that if the second derivative is positive at a critical point, then the function has a local minimum at that point.

Since the second derivative is positive at x = 2, we can conclude that x = 2 is a relative minimum of g(x). This means that at x = 2, the function g(x) reaches its lowest point within a small interval around x = 2. It implies that the function is increasing both to the left and right of x = 2, making it a relative minimum.

To learn more about Derivative test - brainly.com/question/30404403

#SPJ11

A firm has the marginal-demand function D' (x) = -1400x/squareroot 25 - x^2. Find the demand function given that D = 18,000 when x = $3 per unit. The demand function is D(x) =

Answers

To find the demand function D(x) given the marginal-demand function D'(x), we need to integrate D'(x) with respect to x.

Given: D'(x) = -1400x/√(25 - x^2)

To integrate D'(x), we'll use the substitution u = 25 - x^2, which gives us du = -2x dx.

Replacing x and dx in terms of u, we have:

D'(x) = -1400x/√(25 - x^2) = -1400x/√u

dx = -du/(2x)

Substituting these values in the integral, we get:

∫D'(x) dx = ∫(-1400x/√u) * (-du/(2x))

= 700 ∫du/√u

= 700 * 2√u + C

= 1400√u + C

Now, we substitute u = 25 - x^2:

D(x) = 1400√(25 - x^2) + C

To find the value of C, we'll use the given information that D = 18,000 when x = $3 per unit.

D(3) = 1400√(25 - 3^2) + C

18,000 = 1400√(16) + C

18,000 = 1400 * 4 + C

18,000 = 5,600 + C

C = 18,000 - 5,600

C = 12,400

Therefore, the demand function D(x) is:

D(x) = 1400√(25 - x^2) + 12,400.

Learn more about marginal-demand function here:

https://brainly.com/question/30764099

#SPJ11


True or False: For an IVP dy/dx = f(x,y); y(a)=b, if f(x,y) is
not continuous near (a,b), then its solution does not exist.

Answers

The given statement is true. In mathematics, an initial value problem is a differential equation that has to be solved for a certain set of conditions. The most common initial value problem consists of solving a differential equation and finding the unique solution that satisfies an initial condition.

Example of an initial value problem: dy/dx = y, y(0)

= 1

In this case, we have a first-order ordinary differential equation, and the initial condition is y(0) = 1. The general solution to this equation is y(x) = e^x.

However, the initial condition y(0) = 1 specifies a unique solution to this equation, y(0) = e^0 = 1.

If the initial condition were different, say y(0) = 2, then the solution would be different as well, y(x) = 2e^x.

In general, for an initial value problem dy/dx = f(x,y);

y(a)=b,

if f(x,y) is not continuous near (a,b), then its solution does not exist. Therefore, the given statement is true.

To know more about differential equation visit :

https://brainly.com/question/25731911

#SPJ11








Find the Fourier transform of the function f(t) = = = {" e-t/4 t > 1 t< 1 0

Answers

The Fourier transform of the function f(t) is given by; F(ω) = ∫∞−∞ f(t) e−jωtdt`   .

Where ω is frequency. Applying the definition of Fourier transform, we get,`F(ω) = ∫∞−∞ f(t) e−jωtdt`              `= ∫∞1 e−t/4 e−jωtdt + ∫1−∞ 0 e−jωtdt`               `= ∫∞1 e−t/4 e−jωtdt`Let's solve the above integral by parts.       `I = ∫∞1 e−t/4 e−jωtdt`         `= e−t/4 (-jω + 1/4) / (jω) | ∞1 − ∫∞1 (−1/4) e−t/4 / (jω) dt`Now,     `e−t/4 (-jω + 1/4) / (jω)` will become zero as t tends to infinity.Therefore,              `I = −(1/4) ∫∞1 e−t/4 / (jω) dt`                 `= (1/4jω) [ e−t/4 ]∞1`                 `= (1/4jω) [0 − e−1/4 ]`Thus, the Fourier transform of the given function is given by     `F(ω) = ∫∞−∞ f(t) e−jωtdt`        `= ∫∞1 e−t/4 e−jωtdt`        `= −(1/4) ∫∞1 e−t/4 / (jω) dt`        `= (1/4jω) [0 − e−1/4 ]`       `= e−1/4 / (4jω)`

Therefore, the Fourier transform of the function is `e−1/4 / (4jω)`.Summary: The Fourier transform of the given function f(t) is `e−1/4 / (4jω)`.

Learn more about Fourier transform click here

https://brainly.com/question/28984681

#SPJ11

Let f(x,y) = 2x + 5xy, find f(0, – 3), f( – 3,2), and f(3,2). f(0, -3) = (Simplify your answer.) f(-3,2)= (Simplify your answer.) f(3,2)= (Simplify your answer.)

Answers

We are given the function f(x, y) = 2x + 5xy and need to evaluate it for three different input values: f(0, -3), f(-3, 2), and f(3, 2). We will simplify the expressions to determine the values of f for each input.

To evaluate f(0, -3), we substitute x = 0 and y = -3 into the function: f(0, -3) = 2(0) + 5(0)(-3). Simplifying this expression, we get f(0, -3) = 0 + 0 = 0.

Next, let's find f(-3, 2). Substituting x = -3 and y = 2 into the function, we have f(-3, 2) = 2(-3) + 5(-3)(2). Simplifying this expression, we get f(-3, 2) = -6 - 30 = -36.

Lastly, we evaluate f(3, 2). Substituting x = 3 and y = 2 into the function, we obtain f(3, 2) = 2(3) + 5(3)(2). Simplifying this expression, we get f(3, 2) = 6 + 30 = 36.

Therefore, the values of f for the given input values are: f(0, -3) = 0, f(-3, 2) = -36, and f(3, 2) = 36.

Learn more about functions here:

https://brainly.com/question/28750217

#SPJ11

Question Four
(a) Express in the form LU the matrix
0.7 -5.4 1.0
3.5 2.2
0.8
1.0 -1.5 4.3
where L is the lower triangular matrix with unit elements on its diagonal and U is the upper
[10 marks]
triangular matrix.
(b) Solve the equation
10.27x, -1.23x2 +0.67x, = 4.27
2.39x, -12.65x2 +1.13x3 = 1.26
1.79x, +3.61x2 +15.11x, = 12.71
by using Gauss-Seidel iteration process.
[10 marks]

Answers

The solution is $x_1 \approx 0.824$, $x_2 \approx 0.344$, and $x_3 \approx 0.391$.

a) The matrix 0.7 -5.4 1.0 3.5 2.2 0.8 1.0 -1.5 4.3 can be expressed in the form LU, where L is the lower triangular matrix with unit elements on its diagonal and U is the upper triangular matrix as follows:

We need to perform elementary row operations to make it in the form of upper triangular. Interchange R1 and R2 of the given matrix, and perform the operation R2 – 5R1 → R2 to obtain the matrix as:3.5 2.2 0.8
0 -11.3 -2.5
1 -1.5 4.3

Now, interchange R2 and R3 of the above matrix and perform the operation R3 – R1 → R3 and R3 – R2 → R3 to obtain the matrix as:3.5 2.2 0.8
0 -11.3 -2.5
0 0 4.5

Thus,

L = $\begin{bmatrix} 1 & 0 & 0 \\ 0 & 1 & 0 \\ 0.2 & 0.13 & 1 \end{bmatrix}$ and

U = $\begin{bmatrix} 3.5 & 2.2 & 0.8 \\ 0 & -11.3 & -2.5 \\ 0 & 0 & 4.5 \end{bmatrix}$

b) The given system of equations can be rewritten in the form

Ax = b as:$\begin{bmatrix} 10.27 & -1.23 & 0 \\ 0 & -12.65 & 1.13 \\ 0 & 3.61 & 15.11 \end{bmatrix}$

$\begin{bmatrix} x_1 \\ x_2 \\ x_3 \end{bmatrix}$

= $\begin{bmatrix} 4.27 \\ 1.26 \\ 12.71 \end{bmatrix}$

Now, we need to write the equations in a rearranged form:

$$x_1 = \frac{1.23x_2 - 0.67x_3 + 4.27}{10.27}$$

$$x_2 = \frac{1.13x_3 - 2.39x_1 + 1.26}{12.65}$$

$$x_3 = \frac{12.71 - 1.79x_1 - 3.61x_2}{15.11}$$

Using these equations, we can perform the Gauss-Seidel iteration process as follows:

Let $x_{1(0)}, x_{2(0)}, x_{3(0)}$ be the initial guesses for $x_1, x_2, x_3$ respectively.

Then the process can be given by:

$$x_{1(k+1)} = \frac{1.23x_{2(k)} - 0.67x_{3(k)} + 4.27}{10.27}$$

$$x_{2(k+1)} = \frac{1.13x_{3(k)} - 2.39x_{1(k+1)} + 1.26}{12.65}$$ $$x_{3(k+1)} = \frac{12.71 - 1.79x_{1(k+1)} - 3.61x_{2(k+1)}}{15.11}$$

Using an initial guess of $x_{1(0)} = x_{2(0)}

= x_{3(0)}

= 0$,

we obtain:$x_1$ $x_2$ $x_3$
1 0.383 0.464
0.843 0.294 0.438
0.831 0.333 0.408
0.825 0.343 0.393
0.824 0.344 0.391
0.824 0.344 0.391

The solution is $x_1 \approx 0.824$, $x_2 \approx 0.344$, and $x_3 \approx 0.391$.

To learn more about solution visit;

https://brainly.com/question/1616939

#SPJ11

Other Questions
You are the manager of a Zoo. The zoo is running short of funds,so you decide to increase revenue. Should you increase or decreasethe price of admission for visitors? Explain in detail the stepsyou Recall the vector space P(3) consisting of all polynomials in the variable x of degree at most 3. Consider the following collections, X, Y, Z, of elements of P(3). X = {0, 3x, x + 1, x}, Y := {1, x + 9, (x-3) - (x + 3), x), Z:= {x + x + x + 1, x + 1, x + 1, x, 1, 0). In each case decide if the statement is true or false. (A) span(X) = P(3). (No answer given) + [3marks] (B) span(Z) = P(3). (No answer given) + [3marks] (C) Y is a basis for P(3). (D) Z is a basis for P(3). (No answer given) + [3marks] (No answer given) [3marks] Do you think government policies are growth accelerators orgrowth inhibitors in the entrepreneurial ecosystem? (Please citeyour sources) TRUE / FALSE. "Determine if vector X can be expressed as a linear combinationof the vectors in S Consider the following information Demand rate (D) 320 units per hour Lead time (T) 6 hours Container capacity (C) 10 units Safety factor (x)=25% a. The number of kanban production cards is (Enter your response rounded up to the next whole number) b. The cards will represent hours' worth of demand. (Enter your response rounded to one decimal place.) c. Suppose the lead time is reduced to five hours. The number of kanban production cards is The cards will represent (Enter your response rounded up to the next whole number) hours' worth of demand. (Enter your response rounded to one decimal place.)Previous question Assume a corporation's bond has 18 years remaining until maturity. The coupon interest rate is 8.5% and the bond pays interest semi-annually. Assume bond investors' required rate of return on the bond is 8.8%. What would be the expected market price of this bond. (Assume a $1000 par value.) Answer to 2 decimal places. 11. Let C denote the positively oriented circle |2|| = 2 and evaluate the integr (a) e tan z dz; (b) Sci dz sinh (23) in small-scale societies witches differ from sorcerers in that witches kill by: A store recently marked a hydration belt on sale, lowering the price from $20 to $12. The store also sells a hydration bottle, which has a similar concept to the belt, except that a runner can hold it in his or her hand with a strap while running. When the store owner lowered the price of the hydration belt, he noticed that the quantity of hydration bottles that he sold decreased from seven the previous week to five, as more people chose to buy the belt. Using the mid-point formula, the cross-price elasticity is _________ and the goods are ----- a.) -0.714; complements b.) -1.333, complements O c.) 0.667; substitutes d.) 1.005; substitutes Find the Maclaurin series for the following function using your table of series. c(x) = 9x cos(3x) A physicist predicts the height of an object t seconds after an experiment begins will be given by S(t)=17-2 sin + meters above the ground. meters. (a) The object's height at the start of the experiment will be (b) The object's greatest height will be meters. (c) The first time the object reaches this greatest height will be the experiment begins. seconds after Will the object ever reach the ground during the experiment? Explain why/why not. Suppose you are in the Rational Expectations world. There has been a breakthrough in the semiconductor industry, making future computing both cheaper and faster for firms. What should happen to the price and quantity in the corporate bond market? Explain using rational expectations theory Which of the following are features of the corporate form of organization? (check all that apply)Limited liabilityUnlimited liabilityDouble taxationInfinite lifeFinite life how do you know that this address for ethernet adapter ethernet was assigned by a dhcp server? The test scores for an exam are approximatoly normally distributed with a mean 73 points and a standard deviation of 6 points. Use this information to answer each of the following. Express your answer as a whole percent What was the Enlightenment?Choose 1 answer:(Choice A) A flourishing of African-American literature and music in New York City during the early twentieth century.(Choice B) A nonfiction literary tradition of the late nineteenth century.(Choice C) An intellectual and cultural movement in the eighteenth century that emphasized reason over superstition. Consider the following model, which estimates the consumption of cigarettes for a sample of 127 individuals: Cigs =-3.64+ 0.88 log(income) - 0.75 log (price)- 0.50 educ (2.11) (0.73) (5.77) (0.17) + 0.77 age-0.008 age+ 2.83 restaurant (0.002) (1.11) (0.16) N = 127 SSE = 13.25 SSR = 8.75 Where, Cigs is the number of cigarettes smoked per week, income is the individual's income in pounds, price is the average price of a packet of cigarettes, educ is the individual's number of years of schooling, age is the individual's age in years, and restaurant is a dummy variable that equals 1 if a restaurant allows for smoking and 0 otherwise. (a) Carefully interpret all of the estimated coefficients. (6 marks) (b)Calculate and comment on the value of the R-squared and the Adjusted R-squared for the estimated model. Explain why they are different. (6 marks) (c) Perform a 1% individual significance test for each slope coefficient. Comment on your results. State the null and the alternative hypotheses for each one. (6 marks) (d) Calculate the 90% confidence interval for each slope coefficient. (6 marks) (e)Perform a 5% test of the overall significance of the regression model. Comment on your results. State the null and the alternative hypotheses. DETAILED FINANCIALSD. Projected income and expenses (The following items are recommended for inclusion.You may select the appropriate items for your business.)1. Projected income statements by month for the first years operation (sales, expenses, profit/loss)2. Projected cash flow for the firstyear3. Projected cash flow by month for the first years operation4. Projected balance sheet, end offirst year5. Projected three-year planE.Proposed plan to meet capital needs(The following are recommended itemsfor inclusion. You may select the appropriate items for your business.)1. Personal and internal sources2. Earnings, short-term and long-term borrowing, long-term equity3. External sources4. Repayment plans5. Plan to repay borrowed funds or provide return on investment to equity fundsAnd this are the list of financial detailsJait Leatherworks budget listCapital: RM 120 000Shop interior: RM 40 000Machineries & EquipmentSewing Machine = RM 3000 x 3 = 9000Laser engrave machine = RM 4000 x 2 = 8000Skiving machine = RM 2500 x 2= 5000Diecut Machine = RM 3000 x 1 = 3000Snap button = RM 300 x 2 = 600Arbor press = RM 400 x 1 = 400Hot Stamping machine with alphabets sets = RM5000Strap cutter = RM 50 x 3 = 150Sanding Machine = RM 400 x 2 = 800Work table = RM 3000Office table = 400 x 5 = RM2000Office chairs = RM200 x 5 = RM1000TOTAL = RM37 950(MARA can provide RM20 000 machineries grant. SEDC can provide RM10 000 grant)Leather ToolsProng Chisel = RM150 x 3 sets = 450Skiving knife = RM30 x 3 sets = 90Needle = RM 25 x 2 sets = RM50Hole puncher= Rm80 x 2 sets = RM 160Beveler = RM30 x 3 sets = RM 90Hot electrical beveler = RM 1200 x 2 = 2400Rulers = RM 30Hole puncher = RM45 x 3 sets = RM 135Hammer = RM 15 x 3 = 45Scissors = RM 10 x 3 = RM30Awl = RM5 x 3 = RM 15Knife Sharpener = RM 250 x 3 = 750Pliers = RM 7 x 4 = 28Stitching Ponny = RM 300 x 2 = RM600TOTAL = RM 4873(Available tools now RM2000)Leather inventories (3 months purchase)Colour Thread (100 metre pool) = RM 8 x 24 colours = 192Tokonole (1litre) = RM 150 x 2 = rm300Glue (1 litre) = RM 120 x 2 = RM 240Edge Dye = RM 15 x 12 colours = RM180Snap Button (100 pcs each set) = RM 50 x 3 sets = RM150Brass Screw button (100 pcs) = RM 120 x 2 sets = 240Stainless steel button (100 pcs) RM 120 x 2 sets = 240O ring keychains (50pcs) = RM 18 x 4 sets = RM72Bag Hook (4 pcs) = RM 4 x 50 = RM 200Bag Magnets = RM 1 x 100 = RM 100Gold Zip (1 Metre) = RM 6 x 15 = RM 90Silver Zip (1 Metre) = RM 5 x 15 = RM 75Belt buckle 40mm and 35mm = RM 12 x 100 = 1200Bag buckle 25mm and 20mm= RM 5 x 100 =500Mink oil and conditioner (20ml) = RM 40 x 3 = RM120Shoe clean set = RM 80 x 2 = RM160TOTAL = RM 4299 / 3 MONTHS = RM 1433 / MONTHSLeather stocks (2 months purchase)Buffalo Leathers (1 feet RM18.50) = 50 feet x 18.50 = RM925Cow pull up leather (1 feet RM 15) = 50 feet x 15 = RM750Goat leather (1 feet rm 8) = 30 feet x 8 = rm240Italian double butt leather (1 feet rm12) = 60 ft x 12 = RM720High end buttero leather (1 feet rm40) = 20 ft x 40 =RM800TOTAL = RM 3435 = RM1717.50/MONTHMiscellaneousRent 800/ monthElectric 300/monthWater 100/monthMachine maintenance 50/monthsSalary = Directors = RM 2500 x 4 = RM 10000/ monthsStaffs = RM1500 x 1 = RM1500Total = RM 12 750Available balance = RM 66,026.50 "Find the average value of f(x, y) over the region bounded by the graphs of the given equations. Write the exact answer. Do not round. f(x, y) = 2x2 - 2y: y = 3x, y2 = 9x] Help with the following equation 8x-6x-5=x