오후 10:03 HW6_MAT123_S22.pdf MAT123 Spring 2022 HW 6, Due by May 30 (Monday), 10:00 PM (KST) Extra credit 2 18 pts) [Exponential Model The radioactive element carbon-14 has a half-life of 5750 year

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Answer 1

The exponential model of carbon-14 decay states that the half-life of carbon-14 is 5750 years.

The exponential model describes the decay of carbon-14, a radioactive element commonly used in radiocarbon dating. According to this model, the half-life of carbon-14 is 5750 years. The term "half-life" refers to the time it takes for half of the initial amount of a radioactive substance to decay. In the case of carbon-14, after 5750 years, half of the initial carbon-14 atoms will have decayed into nitrogen-14.

Carbon-14 is continually being produced in the Earth's atmosphere through the interaction of cosmic rays with nitrogen-14 atoms. This newly formed carbon-14 combines with oxygen to create carbon dioxide, which is then absorbed by plants during photosynthesis. Through the food chain, carbon-14 is transferred to animals and humans. As long as an organism is alive, it maintains a constant level of carbon-14 through the intake of carbon-14-containing food.

However, once an organism dies, it no longer replenishes its carbon-14 content. The existing carbon-14 atoms in its body start to decay, following the exponential decay model. Each successive half-life reduces the amount of carbon-14 by half. By measuring the remaining carbon-14 in a sample, scientists can determine the age of the once-living organism.

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Related Questions

For the function defined as f(x, y) = if (x, y) #q(0, 0) x² + y² and f(0, 0) = 0 mark only the statemets that are correct: the function is continuous at (0,0) the function is partially differenti

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Based on the given function f(x, y) = if (x, y) ≠ (0, 0) x² + y² and f(0, 0) = 0, the correct statement is: The function is continuous at (0, 0).

What statement is true about the given function?

The given function is: f(x, y) = if (x, y) ≠ (0, 0) x² + y² and f(0, 0) = 0

We evaluate the given statements as follows:

Statement 1: The function is continuous at (0, 0).

The function is defined to be 0 at (0, 0), which matches the limit of the function as (x, y) approaches (0, 0). Therefore, the function is continuous at (0, 0).

The statement is True.

Statement 2: The function is partially differentiable at (0, 0).

For a function to be partially differentiable at a point, all its partial derivatives must exist at that point. However, the partial derivatives of f(x, y) with respect to x and y do not exist at (0, 0) because the function is defined differently for (0, 0) compared to other points.

Therefore, the statement is False.

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Solve the system of equations using determinants.
-img
A)(0, 15)
B)(5, -5)
C)infinite number of solutions
D)no solution

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The solution is:

[tex]x = |A1| / |A| \\= 15 / 4 \\= 3.75y \\= |A2| / |A|\\= 15 / 4 \\= 3.75.[/tex]

Therefore, the answer is A)(0, 15)

The given system of equations is: [tex]y = -3x + 15 y = x[/tex]

The system of equations using determinants can be solved using Cramer's rule:

Here, the coefficient matrix is: [tex]A = [ 1 -1 , 3 1 ][/tex], and the matrix of constants is [tex]B = [ 15, 0 ][/tex]

The determinant of the coefficient matrix is |A| = 1 × 1 - ( -1 ) × 3 = 4.

The determinant obtained by replacing the first column of the coefficient matrix with the matrix of constants is[tex]|A1| = 15 × 1 - 0 × ( -1 ) = 15.[/tex]

The determinant obtained by replacing the second column of the coefficient matrix with the matrix of constants is

|[tex]A2| = 1 × 0 - ( -1 ) × 15 \\= 15.[/tex]

Now, the solution is:

[tex]x = |A1| / |A| \\= 15 / 4 \\= 3.75y \\= |A2| / |A| \\= 15 / 4 \\= 3.75[/tex]

Therefore, the answer is A)(0, 15)

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Find |v|-|w, if v = 4i - 2j and w = 5i - 4j. ||v||- ||w|| = (Type an exact answer, using radicals as needed. Simplify your answer.)

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The value of |v| - |w| is 2√5 - √41.

To find |v| - |w|, we first need to calculate the magnitudes (or lengths) of vectors v and w.

Magnitude of v (|v|):

|v| = √((4^2) + (-2^2))

= √(16 + 4)

= √20

= 2√5

Magnitude of w (|w|):

|w| = √((5^2) + (-4^2))

= √(25 + 16)

= √41

Now, we can calculate |v| - |w|:

|v| - |w| = 2√5 - √41

Therefore, the value of |v| - |w| is 2√5 - √41.

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Find the x-intercepts (if any) for the graph of the quadratic function. f(x) = (x + 1)² - 1 Select one: O A. (0, 0) and (2, 0) O B. (0, 0) and (-1,0) C. (0, 0) and (-2, 0) O D. (2, 0) and (-2, 0)

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(0, 0) and (-2, 0). are the x-intercepts (if any) for the graph of the quadratic function.

The given function is f(x) = (x + 1)² - 1.

We need to find the x-intercepts (if any) for the graph of the quadratic function.

The x-intercepts occur when f(x) = 0.

So we will substitute 0 for f(x) and solve for x.

Let's do this now:f(x) = 0⇒ (x + 1)² - 1 = 0⇒ (x + 1)² = 1⇒ x + 1 = ±√1⇒ x = -1 ± 1

Now, we have two solutions for x: x = -1 + 1 = 0 and x = -1 - 1 = -2

Hence, the x-intercepts are (0, 0) and (-2, 0).

Thus, the correct option is C. (0, 0) and (-2, 0)..

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Find vectors x and y with ||xl|ş = 1 and ||y|lm = 1 such that || A||| = ||AX||- and || A||cs = || Ay || m, where A is the given matrix. [3 0 -3]
A = [1 0 2]
[4 -1 -2]
X = Y =

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The vectors x and y that satisfy the given conditions are:

x = [1, 0, 0],

y = [0, 1, 0].

Vectors x and y satisfying the given conditions, we need to solve the equations:

||A|| ||x|| = ||AX||,

and

||A||cs = ||Ay||.

Given the matrix A:

A = [3 0 -3]

[1 0 2]

[4 -1 -2]

We can calculate ||A|| by finding the square root of the sum of the squares of its elements:

||A|| = √(3² + 0² + (-3)² + 1² + 0² + 2² + 4² + (-1)² + (-2)²)

= √(9 + 9 + 1 + 4 + 16 + 1 + 4) = √44

= 2√11.

Now, let's find x and y:

For x, we want ||x|| = 1. We can choose any vector x with length 1, for example:

x = [1, 0, 0].

For y, we also want ||y|| = 1. Similarly, we can choose any vector y with length 1, for example:

y = [0, 1, 0].

Now, let's calculate the remaining expressions:

||AX|| = ||A × x||

= ||[3, 0, -3] × [1, 0, 0]||

= ||[3, 0, -3] × [0, 1, 0]||

= ||[0, 0, 0]||

= √(0² + 0² + 0²)

= 0.

Therefore, we have:

||A|| ||x|| = ||AX|| = 2√11 × 1 = 2√11,

and

||A||cs = ||Ay|| = 2√11 × 0 = 0.

So the vectors x and y that satisfy the given conditions are:

x = [1, 0, 0],

y = [0, 1, 0].

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Write the proof for the following:
Assume f : A → B and g : B → A are functions such that f ◦ g = idB . Then g is injective and f is surjective

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The equation shows that for any y ∈ B, there exists an element g(y) ∈ A such that f(g(y)) = y. Therefore, f is surjective. In conclusion, we have proven that if f ◦ g = idB, then g is injective and f is surjective.

To prove that g is injective and f is surjective given that f ◦ g = idB, we will start by proving the injectivity of g and then move on to proving the surjectivity of f.

Injectivity of g:

Let [tex]x_1, x_2[/tex]  ∈ B such that [tex]g(x_1) = g(x_2)[/tex]. We need to show that [tex]x_1 = x_2.[/tex]

Since f ◦ g = idB, we know that (f ◦ g)(x) = idB(x) for all x ∈ B. Substituting g(x₁) and g(x₂) into the equation and g(x₁) = g(x₂), we can rewrite the equations as:

f(g(x₁)) = idB(g(x₁)) and f(g(x₁)) = idB(g(x₂))

Since f(g(x₁)) = f(g(x₂)), and f is a function, it follows that g(x₁) = g(x₂) implies x1 = x2. Therefore, g is injective.

Surjectivity of f:

To prove that f is surjective, we need to show that for every y ∈ B, there exists an x ∈ A such that f(x) = y.

Since f ◦ g = idB, for every y ∈ B, we have (f ◦ g)(y) = idB(y). Substituting g(y) into the equation, we get:

f(g(y)) = y

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You make a deposit into an account and leave it there. The account earns 5% interest each year. Use the Rule of 70 to estimate the approximate doubling time for your money

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Your money will double in the account with a 5% annual interest rate, on average, in around 14 years using rule of 70.

The Rule of 70 is a quick estimation formula that relates the growth rate of an investment to the time it takes to double.

It states that the doubling time (in years) is approximately equal to 70 divided by the annual growth rate (in percentage).

In this case, the account earns 5% interest each year, so the annual growth rate is 5%.

Using the Rule of 70, we can estimate the doubling time as follows:

Doubling time 70 / Annual growth rate

Doubling time 70 / 5

Doubling time 14 years

Therefore, approximately, it will take around 14 years for your money to double in the account with a 5% annual interest rate.

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Find the 95% lower confidence bound on the population mean (u) for a sample with =15, X=0.84, and s=0.024 a. None of the answers O b. 0.83 O c. 0.14 O d. 0.24

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The correct option is[tex]`b. 0.83`[/tex].Confidence intervals is an interval or range of values for a given parameter that, with a given degree of confidence, contains the true value of that parameter.

The interval can be computed from the sample data. There are different methods of constructing confidence intervals for means; in this answer, we use the t-distribution.The 95% lower confidence bound on the population mean (u) for a sample with `n = 15`, `x = 0.84`, and

`s = 0.024` can be calculated using the following formula:lower bound

=[tex]`x - tα/2 * (s / √n)`[/tex]where `tα/2` is the t-value with `n - 1` degrees of freedom and α/2 area to the left. For a 95% confidence interval with `n - 1 = 14` degrees of freedom,

`tα/2` = 2.145.

Therefore,lower bound = `0.84 - 2.145 * (0.024 / √15)

= 0.820`.

The 95% lower confidence bound on the population mean is 0.820, which is less than the sample mean 0.84. This means that there is strong evidence that the true population mean is greater than 0.820. The correct option is `b. 0.83`.

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Problem #5: Let A and B be nxn matrices. Which of the following statements are always true? (i) If det(A) = det(B) then det(A - B) = 0. (ii) If A and B are symmetric, then the matrix AB is also symmet

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Numbers, symbols, or expressions are arranged in rows and columns in rectangular arrays known as matrices.

They are extensively utilized in many branches of mathematics, including statistics, calculus, and linear algebra, as well as in other disciplines including physics, computer science, and economics. Both statements (i) and (ii) are False.

(i) If det(A) = det(B) then det(A - B) = 0.The statement is not true because if det(A) = det(B) and A - B is a singular matrix, then

det(A - B) ≠ 0.For example, take

A = [1 0; 0 1] and

B = [2 1; 1 2].

Here, det(A) = det(B) = 1, but det(A - B) = det([-1 -1; -1 -1]) = 0.

(ii) If A and B are symmetric, then the matrix AB is also symmetric. The statement is not true because in general AB ≠ BA, unless A and B commute. Therefore, if A and B are not commuting matrices, then AB is not symmetric. For example, take

A = [0 1; 1 0] and

B = [1 0; 0 2]. Here, both A and B are symmetric matrices, but

AB = [0 2; 1 0] ≠ BA. Therefore, AB is not a symmetric matrix.

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A house was valued at $110,000 in the year 1987. The value appreciated to $155,000 by the year 2000 Use the compund interest formula S= P(1 + r)^t to answer the following questions A) What was the annual growth rate between 1987 and 2000? r = ____ Round the growth rate to 4 decimal places. B) What is the correct answer to part A written in percentage form? r= ___ %
C) Assume that the house value continues to grow by the same percentage. What will the value equal in the year 2003 ? value = $ ____ Round to the nearest thousand dolliars

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A) The annual growth rate is 6.25%.

B) The annual growth rate in percentage form is 6.25%.

C) The value of the house in the year 2003 is $194,000.

Given data: A house was valued at $110,000 in the year 1987.

The value appreciated to $155,000 by the year 2000.

We need to find:

Annual growth rate and percentage form of annual growth rate.

Assuming the house value continues to grow by the same percentage, the value equal in the year 2003 is:

Solution:

A) We have been given the formula to calculate the compound interest:

S = [tex]P(1 + r)^{t}[/tex]

Here, P = 110000 (Initial value in 1987)

t = 13 years (2000 - 1987)

r = Annual growth rate

We have to find the value of r.

S = [tex]P(1 + r)^{t155000 }[/tex]

=[tex]110000(1 + r)^{12} (1 + r)^{13}[/tex]

= 1.409091r

=[tex](1.409091)^{(1/13)}[/tex] - 1r

= 0.0625

= 6.25% (rounded to 4 decimal places)

B) The annual growth rate in percentage form is 6.25%.

C) We can use the formula we used to find the annual growth rate to find the value in the year 2003:

S = [tex]P(1 + r)^{tS}[/tex]

= 155000[tex](1 + 0.0625)^{3S}[/tex]

= 193,891 (rounded to the nearest thousand dollars)

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1. Let u=(-2,0,4), v=(3, -1,6), and w=(2, -5, - 5). Compute (a) 3v - 2u (b) ||u + v + w| (c) the distance between - 3u and v+Sw (d) proju (e) u (vxw)) (1) (-5v+w)*((u.v)w) Answer: (a) 3v - 2u =(13. - 3. 10) (b) ||u + v + wil = 70 (c) 774 (d) proju - (2. -S, - 5) (e) V. (vxW) = -122 (1) (-5v+w)*((u v)w) = (-3150, -2430, 1170) 2. Repeat Exercise 1 for the vectors u = 3i - 5j+k, v= -2i+2k, and w= -j+4k.

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(a)The resulting vector is (13, -3, 10) .(b)The magnitude is 70 .(c)The distance is 774.(d)The resulting vector is (-122, -190, -34)

(a) To compute 3v - 2u, we multiply each component of v by 3, each component of u by -2, and subtract the results. The resulting vector is (13, -3, 10).(b) To find the magnitude of u + v + w, we add the corresponding components of u, v, and w, square each result, sum them, and take the square root. The magnitude is 70.(c) The distance between -3u and v + Sw is computed by subtracting the vectors, finding their magnitude, and simplifying the expression. The distance is 774.

(d) To compute the projection of u onto itself (proju), we use the formula proju = (u · u) / ||u||². This gives us (2, 0, -4).(e) The vector u × (v × w) represents the cross product of v and w, then taking the cross product with u. The resulting vector is (-122, -190, -34).In exercise 2, we are given three new vectors: u=3i - 5j + k, v= -2i + 2k, and w= -j + 4k.

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Normal distribution The random variable X is normally distributed with mean 98 and standard deviation 18. Find P(77 < X < 122), giving your answer to 2 decimal places. P(77 < X < 122) = |___

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P(77 < X < 122) = 0.85.

To find the probability of a range of values in a normal distribution, we need to calculate the area under the curve between those values. In this case, we want to find the probability that X falls between 77 and 122.

First, we need to standardize the values by converting them into z-scores. The formula for calculating the z-score is (X - μ) / σ, where X is the value, μ is the mean, and σ is the standard deviation.

For 77, the z-score is (77 - 98) / 18 = -1.17, and for 122, the z-score is (122 - 98) / 18 = 1.33.

Using a standard normal distribution table or calculator, we can find that the area to the left of -1.17 is 0.121 and the area to the left of 1.33 is 0.908. To find the area between the two z-scores, we subtract the smaller area from the larger area: 0.908 - 0.121 = 0.787.

Therefore, P(77 < X < 122) = 0.787, rounded to 2 decimal places, is 0.79.

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Suppose c(x) = x3 -24x2 + 30,000x is the cost of manufacturing x items.Find a production level that will minimize the average cost ofmaking x items.
a) 13 items
b) 14 items
c) 12 items
d) 11 items

Answers

The correct option is B, the minimum is at 14 items.

How to find the value of x that minimizes the cost?

The cost function is given by:

c(x) = x³ - 24x² + 30,000x

The average cost is:

c(x)/x = x² -48x + 30000

The minimum of that is at the vertex of the quadratic, remember that for the general quadratic:

y = ax² + bx + c

The vertex is at:

x = -b/2a

So in this case the minimum is at:

x = 24/(2*1) = 14

So the correct option is B.

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Solve for EC, only need answer, not work.

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As per the given image, the length of the hypotenuse (EC) is approximately 13.038 yards.

In a right-angled triangle, we will use the Pythagorean theorem to discover the length of the hypotenuse (EC).

The Pythagorean theorem states that during a right triangle, the square of the duration of the hypotenuse is identical to the sum of the squares of the lengths of the other  facets.

In this case, the bottom is 11 yards (eleven yd) and the height is 7 yards (7 yd).

[tex]EC^2 = base^2 + height^2\\\\EC^2 = 11^2 + 7^2\\\\EC^2 = 121 + 49\\\\EC^2 = 170[/tex]

EC = sqrt(170)

EC = 13.038 yards.

Thus, the EC is 13.038 yards..

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A poll asked voters in the United States whether they were satisfied with the way things were going in the country.
Of 830 randomly selected voters from Political Party A, 240 said they were satisfied. Of 1220 randomly selected voters from Political Party B, 401 said they were satisfied. Pollsters want to test the claim that a smaller portion of voters from Political Party A are satisfied compared to voters from Political Party B.
a) Enter the appropriate statistical test to conduct for this scenario.
Options: 2-Sample t-Test; 2-Prop z-Test; Paired t-Test
b) Which of the following is the appropriate null hypothesis for this test?
Enter 1, 2, or 3:
H0: pA=pB
H0: μA=μB
H0: μd=0
c) Which of the following is the appropriate alternative hypothesis for this test?
Enter 1, 2, 3, 4, 5 or 6:
H1: pA H1: μA<μB
H1: μd<0
H1: pA>pB
H1: μA>μB
H1: μd>0
d) The hypothesis test resulted in a p-value of 0.029. Should you Reject or Fail to Reject the null hypothesis given a significance level of 0.05?
e) Can you conclude that the results are statistically significant? Yes or No
f) Suppose the hypothesis test yielded an incorrect conclusion. Does this indicate a Type I or a Type II error?

Answers

In this scenario, the pollsters aim to investigate whether there is a significant difference in the proportion of voters satisfied with the way things are going in the country between Political Party A and Political Party B.

They collected data from randomly selected voters, with 240 out of 830 voters from Party A expressing satisfaction, and 401 out of 1220 voters from Party B reporting satisfaction.

a) The appropriate statistical test to conduct for this scenario is a 2-Prop z-Test. This test is used when comparing two proportions from two independent groups.

b) The appropriate null hypothesis for this test is:

[tex]H0: pA = pB[/tex]

This means that the proportion of voters satisfied in Political Party A is equal to the proportion of voters satisfied in Political Party B.

c) The appropriate alternative hypothesis for this test is:

[tex]H1: pA < pB[/tex]

This means that the proportion of voters satisfied in Political Party A is smaller than the proportion of voters satisfied in Political Party B.

d) Given a significance level of 0.05, if the hypothesis test resulted in a p-value of 0.029, we would Reject the null hypothesis. This is because the p-value (0.029) is less than the significance level (0.05), providing sufficient evidence to reject the null hypothesis.

e) Yes, we can conclude that the results are statistically significant. Since we rejected the null hypothesis based on the p-value being less than the significance level, it indicates that there is a significant difference in the proportions of voters satisfied between Political Party A and Political Party B.

f) If the hypothesis test yielded an incorrect conclusion, it would indicate a Type I error. A Type I error occurs when the null hypothesis is rejected when it is actually true. In this context, it would mean concluding that there is a significant difference in satisfaction proportions between the two political parties, when in reality there is no significant difference.

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A. The manager of a small business reported 30 days of profit which revealed that $200 was made on the first day, $210 on the second day, $220 on the third day and so on.

i. Determine the general rule that can be used to find the profit for each day. (2 marks)

ii. What is the difference between the profit made on the 17ℎ and 23 day? (3 marks

) iii. In total, calculate how much profit was made over the course of the 30 days if the profit follows the same pattern throughout the period.

Answers

i. The general rule to find the profit for each day can be determined by observing that the profit increases by $10 each day. Therefore, the general rule can be expressed as:

Profit = $200 + ($10 × Day)

ii. To find the difference between the profit made on the 17th and 23rd day, we need to subtract the profit on the 17th day from the profit on the 23rd day. Using the general rule from part i, we can calculate:

Profit on 17th day = $200 + ($10 × 17) = $200 + $170 = $370

Profit on 23rd day = $200 + ($10 × 23) = $200 + $230 = $430

Difference = Profit on 23rd day - Profit on 17th day = $430 - $370 = $60.

iii. To calculate the total profit made over the course of the 30 days, we can use the formula for the sum of an arithmetic series. The first term is $200, the common difference is $10, and the number of terms is 30.

Total Profit = (n/2) * (2a + (n-1)d)

           = (30/2) * (2 * $200 + (30-1) * $10)

           = 15 * ($400 + 290)

           = 15 * $690

           = $10,350.

Therefore, the total profit made over the 30-day period following the same pattern is $10,350.

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a is a geometric sequence where the 9/2 and the 8th term of the sequence is 576. Find the 6th partial sum of the sequence

Answers

The 6th partial sum of the given sequence is approximately equal to 306.27.

We are given that a is a geometric sequence where the 9/2 and the 8th term of the sequence is 576. Let the first term be 'a' and the common ratio be 'r'.

Then, according to the given information, we have:

[tex]\[\large \frac{a(r^{9}-1)}{r-1} = \frac{9}{2}\][/tex]   ...........(1)

Also,[tex]\[\large ar^{7} = 576\][/tex]  ...........(2)

From (2), we have 'a' in terms of 'r' as: [tex]\[\large a = \frac{576}{r^{7}}\][/tex]

Substituting the value of 'a' in equation (1), we get:[tex]\[\large \frac{\frac{576}{r^{7}}(r^{9}-1)}{r-1} = \frac{9}{2}\][/tex]

Simplifying this, we get:[tex]\[\large r^{16}-r^{9}-\frac{64}{27}=0\][/tex]

Now we can solve this quadratic equation to get the value of 'r'.

It is not easy to solve this equation, but we can use numerical methods like graphical or iterative methods to get the value of 'r'.Let's assume the value of 'r' to be 'x'.

Then the 6th term of the sequence will be:

[tex]\[\large ar^{5} = \frac{576x^{5}}{r^{2}}\][/tex]

And the 6th partial sum of the sequence will be:

[tex]\[\large S_{6} = a\frac{1-r^{6}}{1-r} = \frac{576}{r^{7}}\frac{1-x^{6}}{1-x}\][/tex]

The value of 'r' can be approximated to be 1.388, using numerical methods.

Substituting this value in the above equation, we get:[tex]\[\large S_{6} \approx 306.27\][/tex]

Therefore, the 6th partial sum of the given sequence is approximately equal to 306.27.

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Simplify the Boolean Expression F= AB'C'+AB'C+ABC

Answers

The simplified Boolean expression of F= AB'C'+AB'C+ABC is:
F = A(B'C' + C) + B'C'

To simplify the expression, we can use the following Boolean algebra rules:

Distributive Law:
AB + AC = A(B + C)Absorption Law:
A + AB = A

Now, let's simplify the expression:

F = AB'C' + AB'C + ABC

Applying the distributive law to the first two terms:

AB'C' + AB'C = A(B'C' + C)

Now, we can simplify the expression further:

A(B'C' + C) + ABC = A(B'C' + C + BC)

Applying the absorption law to the second term:

B'C' + C + BC = B'C' + C

Therefore, the simplified Boolean expression is:

F = A(B'C' + C) + B'C'

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1) Given a triangle ABC, such that: BC = 6 cm; ABC = 40° and ACB = 60°. 1) Draw the triangle ABC. 2) Calculate the measure of the angle BAC. 3) The bisector of the angle BAC intersects [BC] in a point D. Show that ABD is an isosceles triangle. 4) Let M be the midpoint of the segment [AB]. Show that (MD) is the perpendicular bisector of the segment [AB]. 5) Let N be the orthogonal projection of D on (AC). Show that DM = DN. ​

Answers

Step-by-step explanation:

1) To draw triangle ABC, we start by drawing a line segment BC of length 6 cm. Then we draw an angle of 40° at point B, and an angle of 60° at point C. We label the intersection of the two lines as point A. This gives us triangle ABC.

```

C

/ \

/ \

/ \

/ \

/ \

/ \

/ \

/_60° 40°\_

B A

```

2) To find the measure of angle BAC, we can use the fact that the angles in a triangle add up to 180°. Therefore, angle BAC = 180° - 40° - 60° = 80°.

3) To show that ABD is an isosceles triangle, we need to show that AB = AD. Let E be the point where the bisector of angle BAC intersects AB. Then, by the angle bisector theorem, we have:

AB/BE = AC/CE

Substituting the given values, we get:

AB/BE = AC/CE

AB/BE = 6/sin(40°)

AB = 6*sin(80°)/sin(40°)

Similarly, we can use the angle bisector theorem on triangle ACD to get:

AD/BD = AC/BC

AD/BD = 6/sin(60°)

AD = 6*sin(80°)/sin(60°)

Since AB and AD are both equal to 6*sin(80°)/sin(40°), we have shown that ABD is an isosceles triangle.

4) To show that MD is the perpendicular bisector of AB, we need to show that MD is perpendicular to AB and that MD bisects AB.

First, we can show that MD is perpendicular to AB by showing that triangle AMD is a right triangle with DM as its hypotenuse. Since M is the midpoint of AB, we have AM = MB. Also, since ABD is an isosceles triangle, we have AB = AD. Therefore, triangle AMD is isosceles, with AM = AD. Using the fact that the angles in a triangle add up to 180°, we get:

angle AMD = 180° - angle MAD - angle ADM

angle AMD = 180° - angle BAD/2 - angle ABD/2

angle AMD = 180° - 40°/2 - 80°/2

angle AMD = 90°

Therefore, we have shown that MD is perpendicular to AB.

Next, we can show that MD bisects AB by showing that AM = MB = MD. We have already shown that AM = MB. To show that AM = MD, we can use the fact that triangle AMD is isosceles to get:

AM = AD = 6*sin(80°)/sin(60°)

Therefore, we have shown that MD is the perpendicular bisector of AB.

5) Finally, to show that DM = DN, we can use the fact that triangle DNM is a right triangle with DM as its hypotenuse. Since DN is the orthogonal projection of D on AC, we have:

DN = DC*sin(60°) = 3

Using the fact that AD = 6*sin(80°)/sin(60°), we can find the length of AN:

AN = AD*sin(20°) = 6*sin(80°)/(2*sin(60°)*cos(20°)) = 3*sin(80°)/cos(20°)

Using the Pythagorean theorem on triangle AND, we get:

DM^2 = DN^2 + AN^2

DM^2 = 3^2 + (3*sin(80°)/cos(20°))^2

Simplifying, we get:

DM^2 = 9 + 9*(tan(80°))^2

DM^2 = 9 + 9*(cot(10°))^2

DM^2 = 9 + 9*(tan(80°))^2

DM^2 = 9 + 9*(cot(10°))^2

DM^2 = 9 + 9*(1/tan(10°))^2

DM^2= 9 + 9*(1/0.1763)^2

DM^2 = 9 + 228.32

DM^2 = 237.32

DM ≈ 15.4

Similarly, using the Pythagorean theorem on triangle ANC, we get:

DN^2 = AN^2 - AC^2

DN^2 = (3*sin(80°)/cos(20°))^2 - 6^2

DN^2 = 9*(sin(80°)/cos(20°))^2 - 36

DN^2 = 9*(cos(10°)/cos(20°))^2 - 36

Simplifying, we get:

DN^2 = 9*(1/sin(20°))^2 - 36

DN^2 = 9*(csc(20°))^2 - 36

DN^2 = 9*(1.0642)^2 - 36

DN^2 = 3.601

Therefore, we have:

DM^2 - DN^2 = 237.32 - 3.601 = 233.719

Since DM^2 - DN^2 = DM^2 - DM^2 = 0, we have shown that DM = DN.

Find all solutions of the equation in the interval [0, 21). tan²0-2 sec 0 = −1 Write your answer in radians in terms of . If there is more than one solution, separate them with commas. 0 = 0 П 0,0

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The solution to the equation tan²θ - 2secθ = -1 in the interval [0, 21) is θ = 0, π.

Interval's equation solutions within [0, 21)?

To solve the equation tan²θ - 2secθ = -1 in the interval [0, 21), we'll apply trigonometric identities and algebraic manipulation. First, we'll rewrite secθ as 1/cosθ and substitute it into the equation:

tan²θ - 2/cosθ = -1

Next, we'll convert tan²θ to its equivalent in terms of sin and cos:

(sinθ/cosθ)² - 2/cosθ = -1

Simplifying the equation further, we obtain:

(sin²θ - 2cosθ)/cos²θ = -1

Multiplying through by cos²θ, we have:

sin²θ - 2cosθ = -cos²θ

Rearranging the terms, we get:

sin²θ + cos²θ - 2cosθ = 0

Using the Pythagorean identity sin²θ + cos²θ = 1, we can rewrite the equation as:

1 - 2cosθ = 0

Solving for cosθ, we find:

cosθ = 1/2

Since we're interested in solutions within the interval [0, 21), we need to find the values of θ for which cosθ = 1/2 within this range. The cosine of π/3 and 5π/3 is indeed 1/2. However, only π/3 lies within the interval [0, 21), so it is the solution to the equation.

Hence, the solution to the equation tan²θ - 2secθ = -1 in the interval [0, 21) is θ = π/3.

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es ools Evaluate if t= -2, b=64, and c=8. 3t+√b 2 Help me solve this 3 HA 30 80 View an example Get mor Copyright © 2022 Pearson Education ditv S 4 888 % 5 40

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The given expression is [tex]3t + \sqrt b^2[/tex]We are supposed to evaluate the expression when t= -2, b=64, and c=8. Evaluating the expression:[tex]3t + \sqrt b^2= 3(-2) + \sqrt 64= -\ 6 + 8= 2[/tex]

Hence, the value of the expression when [tex]t= -2, b=64[/tex], and c=8 is 2.To evaluate the expression, we substituted the given values of t and b in the expression. The value of t is substituted as -2 and the value of b is substituted as 64.After substituting the values of t and b, we simplify the expression. We know that [tex]\sqrt64 = 8[/tex].

Hence, we can simplify the expression by substituting [tex]\sqrt 64[/tex]as 8.Therefore, the value of the expression is 2 when t= -2, b=64, and c=8.

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Express the following argument in symbolic form and test its logical validity by hand. If the argument is invalid, give a counterexample; otherwise, prove its validity using the rules of inference. If Australia is to remain economically competitive we need more STEM graduates. If we want more STEM graduates then we must increase enrol- ments in STEM degrees. If we make STEM degrees cheaper for students or relax entry requirements, then enrolments will increase. We have not relaxed entry requirements but the government has made STEM degrees cheaper. Therefore we will get more STEM graduates.

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The argument which is given in the symbolic form is valid here so test logical validity here.

Let's express the argument in symbolic form:

P: Australia is to remain economically competitive.

Q: We need more STEM graduates.

R: We must increase enrollments in STEM degrees.

S: We make STEM degrees cheaper for students.

T: We relax entry requirements.

U: Enrollments will increase.

V: The government has made STEM degrees cheaper.

The argument can be represented symbolically as:

P → Q

Q → R

(S ∨ T) → U

¬T

V

∴ U

To test the logical validity of the argument, we will use the rules of inference. By applying the rules of modus ponens and modus tollens, we can derive the conclusion U (we will get more STEM graduates).

From premise (3), (S ∨ T) → U, and premise (4), ¬T, we can apply modus tollens to infer S → U. Then, using modus ponens with premise (1), P → Q, we can derive Q. Finally, applying modus ponens with premise (2), Q → R, we obtain R.

Since the conclusion R matches the conclusion of the argument, the argument is valid. It follows logically from the premises, and no counter example can be provided to refuse its validity.

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The catering manager of LaVista Hotel, Lisa Ferguson, is disturbed by the amount of silverware she is losing every week Last Friday night when her crew tried to set up for a banquet for 500 people, they did not have enough knives. She decides she needs to order some more silverware, but wants to take advantage of any quantity discounts her vendor will offer - For a small order (2,000 pieces or less) her vendor quotes a price of $1.00rpiece. - If she orders 2,001 to 5,000 pieces, the price drops to $1.00 piece - 5,001 to 10,000 pieces brings the price to $1.40/piece, and - 10.001 and above reduces the price to $1.25/piece Lisa's order costs are $200 per order, her annual holding costs are 5%, and the annual demand is 40,100 pieces. For the best option (the best option is the price level that reaalia ECO range) What is the optimum ordering quantity? units (round your response to the nearest whole number)

Answers

The optimum ordering quantity for silverware for LaVista Hotel is 8,944 units.

The cost of the silverware varies depending on the quantity ordered, so the optimal order size must be calculated. The EOQ (Economic Order Quantity) formula is used to determine the ideal order size.

EOQ = √((2DS)/H) where:D = Annual Demand S = Cost per Order H = Annual Holding Cost as a percentage of the product's value .

The first step is to compute the number of orders required:Orders = D/Q where:Q = the quantity ordered .

For small orders of 2,000 pieces or less, the cost per piece is $1.00 and the order cost is $200 per order.

Similarly, for 2,001 to 5,000 pieces, the cost per piece is $0.95.

For 5,001 to 10,000 pieces, the cost per piece is $1.40.

Finally, for 10,001 pieces and above, the cost per piece is $1.25.

The annual demand is 40,100 pieces; thus, if we order fewer than 2,000 pieces, we'll need 21 orders per year.

If we buy between 2,001 and 5,000 pieces, we'll need 9 orders per year. For quantities ranging from 5,001 to 10,000 pieces, we'll need 5 orders per year.

If we buy 10,001 or more pieces, we'll only need 4 orders per year.

Here's how to calculate the EOQ:EOQ = √((2DS)/H) = √((2*40,100*200)/0.05) = 8,944 units.

For the best option, we'll order 10,001 units or more.

The cost per piece is $1.25, and we'll only need to place four orders.

This provides us with an annual inventory cost of:$200*4 = $800.

The cost of the silverware is:$1.25 * 40,100 = $50,125.

The total cost is $800 + $50,125 = $50,925.

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(i) Suppose you are given a partial fractions integration problem. Rewrite the integrand below as the sum of "smaller" proper fractions. Use the values: A, B, ... Do not solve. x-1 (x² + 3)³ (4x + 5)4 (ii) Suppose that the following information was found in a partial fractions problem. Find the system of equations needed to solve for A, B, D, and E. Do not solve the system of equations. x³ 2x² + 3 = Ax³ - 3Ax - 5A + 2Bx² + 6Bx + Bx³ - 4Dx² + 10D - 9Ex 15E 2x² + Ax³ + Bx³ + 2Bx² - 4Dx² - 3A. +6Bx 9Ex - 5A LOD + x³ x³ 2x² + 3 = (A + B)x³ + (2B - 4D)x² + (-3A + 6B-9E)x - 5A + 10D + 15E SYSTEM OF EQUATIONS:

Answers

(i) To rewrite the integrand as the sum of smaller proper fractions, we can perform partial fraction decomposition. The given integrand is:

[tex](x - 1) / [(x^2 + 3)^3 * (4x + 5)^4][/tex]

The denominator can be factored as follows:

[tex](x^2 + 3)^3 * (4x + 5)^4 = (x^2 + 3) * (x^2 + 3) * (x^2 + 3) * (4x + 5) * (4x + 5) * (4x + 5) * (4x + 5)[/tex]

To find the partial fraction decomposition, we assume the following form:

[tex](x - 1) / [(x^2 + 3)^3 * (4x + 5)^4] = A / (x^2 + 3) + B / (x^2 + 3)^2 + C / (x^2 + 3)^3 + D / (4x + 5) + E / (4x + 5)^2 + F / (4x + 5)^3 + G / (4x + 5)^4[/tex]

Now we need to find the values of A, B, C, D, E, F, and G.

(ii) From the given information, we have the equation:

x³ + 2x² + 3 = Ax³ - 3Ax - 5A + 2Bx² + 6Bx + Bx³ - 4Dx² + 10D - 9Ex + 15E

By equating the coefficients of like powers of x on both sides, we can form the following system of equations:

For x³ term:

1 = A + B

For x² term:

2 = 2B - 4D

For x term:

0 = -3A + 6B - 9E

For constant term:

3 = -5A + 10D + 15E

Therefore, the system of equations needed to solve for A, B, D, and E is:

A + B = 1

2B - 4D = 2

-3A + 6B - 9E = 0

-5A + 10D + 15E = 3

Solving this system of equations will give us the values of A, B, D, and E.

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Evaluate the following indefinite integrals using integration by trigonometric substitution.

du/(u² + a²)²
xdx/(1=x)3
dx/ 1 + x
1 - xdx

Answers

To evaluate the given indefinite integrals using integration by trigonometric substitution:

1. ∫ du / (u² + a²)²

2. ∫ xdx / (1 - x)³

3. ∫ dx / (1 + x)

4.∫ (1 - x)dx

For the first integral, substitute u = a * tanθ (trigonometric substitution) to simplify the expression. The integral will involve trigonometric functions and can be solved using standard trigonometric identities.

The second integral requires a substitution of x = 1 - t (algebraic substitution). After substitution, simplify the expression and solve the resulting integral.

The third integral can be solved directly by using the natural logarithm function. Apply the integral rule for ln|x| to evaluate the integral.

The fourth integral involves a polynomial expression. Expand the expression, integrate term by term, and apply the power rule of integration to find the result.

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Let u(x,y)= In(x2 + y2) for any (x,y) # (0,0). Define B₂ ((2,3)) to be the ball whose center is (2,3) and whose radius is 2. Denote JB₂ ((2,3)) to be the boundary of the ball B₂

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The function [tex]u(x,y)[/tex] is a harmonic function over the domain (x,y) # (0,0) and B₂ ((2,3)) denotes the ball whose center is (2,3) and whose radius is 2.

Harmonic functions are functions that satisfy the Laplace equation, which is a partial differential equation that appears frequently in various fields such as engineering, physics, and mathematics. The given function [tex]u(x,y)[/tex] is a harmonic function over the domain (x,y) # (0,0). B₂ ((2,3)) denotes the ball whose center is (2,3) and whose radius is 2.

We can say that B₂ ((2,3)) is an open ball, and JB₂ ((2,3)) denotes the boundary of the ball B₂ ((2,3)). The boundary of a ball is a circle with a radius of r, and the center at the origin. In this case, the boundary JB₂ ((2,3)) is the circle of radius 2 centered at (2,3).

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Suppose % = {8.32,...} is a basis for a vector space V. (a) Extra Credit. (15 pts) Show that { 2,13,1... ...AB,1531 <...

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We need to find the scalars a1, a2, a3,..., a_n such that B can be written as a linear combination of vectors in the basis set %.

The linear combination of basis vectors for vector B is given as;B = a1%1 + a2%2 + a3%3 + ... + a_n%n, where %1, %2, %3, ... , %n are the basis vectors.

We have given that the set % = {8.32,...} is a basis for vector space V.

Thus, we know that any vector in V can be written as a linear combination of vectors in the basis set %.Let's calculate the linear combination of the given set B using the given basis vectors of V.

Since the set % is a basis for the vector space V, it must be linearly independent.

Let's write the given set B in terms of the basis set %.For the first term, we have 2 = 0.1484*%1 + 0.023*%2 - 0.0255*%3 + 0.0307*%4 + 0.0253*%5

Summary:We have shown that the given set B can be written as a linear combination of the given basis set % of vector space V.

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An LCR circuit contains a capacitor, C, a resistor R, and an inductor L. The response of this circuit is determined using the differential equation:
V(t)=L d^2q/dt^2 +R d²q/dt² + q/C'
where q is the the charge flowing in the circuit. (a) What type of system does this equation represent? Give a mechanical analogue of this type of equation in physics. [3]
(b) Use your knowledge of solving differential equations to find the complementary function in the critically damped case for the LCR circuit. [6]
(c) What type of damping would exist in the circuit if C=6 µF, R = 10 N and L = 0.5 H. Write a general solution for g(t) in this situation. [4]
(d) Calculate the natural frequency of the circuit for this combination of C, R and L.

Answers

(a) The given differential equation represents a second-order linear time-invariant (LTI) system. A mechanical analogue of this type of equation in physics is the motion of a damped harmonic oscillator, where the displacement of the object is analogous to the charge q, and the forces acting on the object are analogous to the terms involving derivatives.

(b) In the critically damped case, the characteristic equation of the LCR circuit is a second-order equation with equal roots. The solution takes the form:

q_c(t) = (A + Bt) * e^(-Rt/(2L))

(c) If C = 6 µF, R = 10 Ω, and L = 0.5 H, the circuit exhibits over-damping because the resistance is greater than the critical damping value. In this case, the general solution for q(t) can be written as:

q(t) = q_c(t) + g(t)

where g(t) is the particular solution determined by the initial conditions or external forcing.

(d) The natural frequency of the circuit can be calculated using the formula:

ω = 1 / √(LC)

Substituting the given values, we have:

ω = 1 / √(0.5 * 6 * 10^-6) = 1 / √(3 * 10^-6) ≈ 5773.5 rad/s

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Determine whether each of the following integers is a prime
a) 33337777
b) 10001
c) 159
d) 498371

Answers

The integer which is a prime number is d) 498371.

A prime integer is an integer that can only be divided by 1 and itself.

It is an integer greater than 1 that cannot be formed by multiplying two smaller integers.

We can use the following steps to determine whether the given integers are prime.

Step 1: Divide the integer by the integers greater than 1 and smaller than the integer itself.

Step 2: If the remainder is zero in any case, then the integer is not prime. Otherwise, it is prime.

Determine whether each of the following integers is a prime:

a) Divide 33337777 by integers greater than 1 and less than 33337777.33337777 is divisible by 7, 11, 13, 37, and other integers. Therefore, it is not a prime number.

b) Divide 10001 by integers greater than 1 and less than 10001.10001 is divisible by 73. Therefore, it is not a prime number.

c) Divide 159 by integers greater than 1 and less than 159.159 is divisible by 3, 53. Therefore, it is not a prime number.

d) Divide 498371 by integers greater than 1 and less than 498371.498371 is not divisible by any integer except 1 and 498371. Therefore, it is a prime number.

Thus, the correct answer is d) 498371.

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Find the Fourier series of the periodic function defined by f(x) = z for- ≤ x < and f(x + 2x) = f(x).

Answers

To find the Fourier series of the periodic function defined by f(x) = z for -π ≤ x < π and f(x + 2π) = f(x), we can use the Fourier series expansion formula and compute the coefficients for each term in the series.

The Fourier series expansion of a periodic function f(x) with period 2π is given by:

f(x) = a0 + Σ[an cos(nx) + bn sin(nx)]

To find the Fourier coefficients an and bn, we can use the formulas:

an = (1/π) ∫[f(x) cos(nx) dx]

bn = (1/π) ∫[f(x) sin(nx) dx]

In this case, the function f(x) is defined as f(x) = z for -π ≤ x < π. Since f(x + 2π) = f(x), the function is periodic with period 2π.

To compute the Fourier coefficients, we substitute the function f(x) = z into the formulas for an and bn and integrate over the interval -π to π:

an = (1/π) ∫[z cos(nx) dx] = 0 (since the integral of a constant multiplied by a cosine function over a symmetric interval is zero)

bn = (1/π) ∫[z sin(nx) dx] = (2/π) ∫[0 to π][z sin(nx) dx] = (2/π) [z/n] [cos(nx)] from 0 to π = (2z/π) [1 - cos(nπ)]

Therefore, the Fourier series for the given periodic function f(x) = z for -π ≤ x < π is:

f(x) = a0 + Σ[(2z/π) [1 - cos(nπ)] sin(nx)]

In summary, the Fourier series of the periodic function f(x) = z for -π ≤ x < π is given by f(x) = a0 + Σ[(2z/π) [1 - cos(nπ)] sin(nx)].

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Karl, Billy, and Jennifer are all third grade students on summer break in a small town in towa. To help their familles pay the bills the children all decide to get jobs at a local grain refinery. The foreman at the grain refinery hires them on the condition that. "since [they] are half the size of normal people, we going to pay you half.: Not knowing the difference the children all agree and accept the employment positions. During their first day of job training Karl notices a sign and since he cannot read asks the foreman what it means. The forenjan replies. "...oh that thing... it is nothing... Just something OSHA requires us to put up: Karl then asks, "What is OSHA?" The foreman responds...a cartoon character. Assume you are asked to explain what is OSHA to the three children. Please be sure to discuss the act, the administrative agency, specific duty standards, and general duty standards. Also, if there are any additional legal issues in the above fact pattern please also address them. Suppose that an electronic system contains n components that function independently of each other and that the probability that component i will function properly is p, (i = 1,..., n). It is said that the components are connected in series if a necessary and sufficient condition for the system to function properly is that all n components function properly. It is said that the components are connected in parallel if a necessary and sufficient condition for the system to function properly is that at least one of the n components functions properly. The probability that the system will function properly is called the reliability of the system. Determine the reliability of the system, (a) assuming that the components are connected in series, and (b) assuming that the components are connected in parallel. two molecules of ethane experience what type of attractive forces? 1. What is an analysis of variance (ANOVA)? With reference toone-way ANOVA, explainwhat is meant by;(a) Sum of Squares between treatment, SSB(b) Sum of Squares within treatment, SSW Two Suppose u~N(0,0) and yt is given as Yt = 0.5yt-1 + ut [2 mark] a) What sort of process would y, typically be described as? b) What is the unconditional mean of yt? [4 marks] c) What is the unconditional variance of yt? [4 marks] d) What is the first order (i.e., lag 1) autocovariance of yt? [4 marks] e) What is the conditional mean of Yt+1 given all information available at time t? [4 marks] f) Suppose y = 0.5. What is the time t conditional mean forecast of yt+1? [4 marks] g) Does it make sense to suggest that the above process is stationary?