Problem 6 [Logarithmic Properties] Use the Laws of Logarithms to expand the expression. (a) loga () 100 √ √√₂ (b) log

Answers

Answer 1

By simplifying the given expressions using the properties of logarithms, such as the power rule, and evaluating them accordingly.

How do we expand the expressions using the laws of logarithms?

The problem asks us to use the laws of logarithms to expand the given expressions. Let's consider each part separately:

(a) loga () 100 √ √√₂

To expand this expression, we can use the properties of logarithms. First, we simplify the expression inside the logarithm: 100 √ √√₂ = 100^(1/2)^(1/2)^(1/2) = 100^(1/8).

Now, we can apply the power rule of logarithms, which states that loga(b^c) = cˣ loga(b). Applying this rule, we have loga(100^(1/8)) = (1/8) ˣ  loga(100). Since loga(100) = 2 (since a^2 = 100), the expression becomes (1/8)ˣ  2 = 1/4.

(b) log(base 4) 64^3

Here, we can use the power rule of logarithms again. We have log(base 4) (64^3) = 3 ˣ log(base 4) 64. Since 64 is equal to 4^3, we can further simplify this expression to 3 ˣ  3 = 9.

Therefore, the expanded expressions are:

(a) loga () 100 √ √√₂ = 1/4

(b) log(base 4) 64^3 = 9.

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Related Questions

For the project listed below, find the following items: (15 marks) 1- Total project finishing time (3 marks) 2- Critical path (3 marks) 3- Free float for each task. (3marks)
4- If Activity B is delayed by 7 weeks. As a project manager explains how this will affect the total project critical path. (6 marks) Activity الفعالية Duration in Weeks لمدة بالأسابيع Dependency or Predecessor Activities السابقة ا الاعتمادية أو الفعاليات C 6 -
B 4 -
P 3 -
A 7 C,B,P
U 4 P
T 2 A
R 3 A
N 6 U

Answers

Project scheduling is a mechanism for developing and maintaining project timetables and project plans. The process takes into account task dependencies, constraints, and resource requirements.

The following items must be found for the project listed below: 1. Total project finishing time: Total Project Finishing Time = Late Finish Time (LFT) for the last activity in the project network diagram. In the table given, we can notice that Activity C is the last task in the project, and its duration is six weeks. As a result, the total project finishing time is six weeks.2. Critical Path:The Critical Path is the longest route through a project network diagram in terms of duration. In the network diagram given, the critical path includes A - T - U - N - C, with a total duration of 25 weeks. 4. If Activity B is delayed by seven weeks, explain how this will affect the total project critical path.The critical path of a project will change if one or more of its tasks are delayed beyond their early start time. If Activity B is delayed by seven weeks, it will be completed in week eleven, extending the length of Activity P by seven weeks.

The critical path would then be A-T-P-N-C, with a total duration of 31 weeks. This is due to the fact that Activity B, the predecessor of Activity P, is now delayed by seven weeks. The free float of Activity B is just one week, which indicates that its delay will cause a delay in the following activities.

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Prove or disprove each of the follwoing statements. You must use the definition of congruence modulo n, and the definition of divides. (a) There exists an integer a so that 5a = 2 (mod 9). (b) There exists an integer a so that 4a = 2 (mod 9). (c) There exists an integer a so that 3a = 2 (mod 9).

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According to the definition of congruence modulo n, two integers a and b are said to be congruent modulo n if (a − b) is divisible by n. If n is a positive integer, then n divides a if there exists an integer q such that a = qn. Option(C) is correct  3a = 2 (mod 9).

a) There exists an integer a so that 5a = 2 (mod 9). To prove the given statement, let's assume a = 8. Then 5a = 5(8) = 40, which leaves a remainder of 4 on dividing by 9. So, 5a ≠ 2 (mod 9). Hence, the given statement is false.b) There exists an integer a so that 4a = 2 (mod 9). To prove the given statement, let's assume a = 7. Then 4a = 4(7) = 28, which leaves a remainder of 1 on dividing by 9. So, 4a ≠ 2 (mod 9). Hence, the given statement is false.c) There exists an integer a so that 3a = 2 (mod 9). To prove the given statement, let's assume a = 3. Then 3a = 3(3) = 9, which leaves a remainder of 2 on dividing by 9. So, 3a = 2 (mod 9). Hence, the given statement is true. So, (c) is the only true statement.According to the definition of congruence modulo n, two integers a and b are said to be congruent modulo n if (a − b) is divisible by n. If n is a positive integer, then n divides a if there exists an integer q such that a = qn.

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Let F = (4z + 4x³) i + (4y + 4z + 4 sin(y³)) 3 + (4x + 4y + -4e²³) k. (a) Find curl F. curl F = (b) What does your answer to part (a) tell you about SF. dr where C' is the circle (x - 10)² + (y − 25)² = 1 in the xy-plane, oriented clockwise? ScF. dr = (c) If C' is any closed curve, what can you say about fF.dr? ScF.dr = (d) Now let C' be the half circle (x − 10)² + (y - 25)² = 1 in the xy-plane with y > 25, traversed from (11, 25) to (9, 25). Find F. dr by using your result from (c) and considering C plus the line segment connecting the endpoints of C. ScF. dr = |

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a. To find the curl of F, we calculate the cross product of the del operator (∇) and the vector F. The curl of F is given by curl F = (∂F₃/∂y - ∂F₂/∂z)i + (∂F₁/∂z - ∂F₃/∂x)j + (∂F₂/∂x - ∂F₁/∂y)k.

b. The answer to part (a) tells us about the circulation of the vector field F around a closed curve C. By Stokes' theorem, the line integral of F around a closed curve C is equal to the surface integral of the curl of F over any surface S bounded by C. Therefore, curl F represents the circulation density of the vector field F around a given curve. c. If C' is any closed curve, we can say that the line integral of F around C' is equal to the surface integral of the curl of F over any surface bounded by C'. This is a consequence of Stokes' theorem, which relates the circulation of a vector field around a closed curve to the flux of the curl of the vector field through any surface bounded by that curve.

d. Now, considering the half circle C' defined by (x - 10)² + (y - 25)² = 1 with y > 25, traversed from (11, 25) to (9, 25), we can use the result from part (c). Since C' is a closed curve, we can apply Stokes' theorem. We can take C as the combination of C' and the line segment connecting the endpoints of C. By Stokes' theorem, the line integral of F around C is equal to the surface integral of the curl of F over any surface bounded by C. We can evaluate the line integral by calculating the surface integral of the curl F over the surface bounded by C, which includes C' and the line segment.

However, without a specific surface bounded by C, it is not possible to provide a numerical value for ScF.dr. The result would depend on the specific surface chosen.

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Random samples of size n= 36 were selected from populations with the mean, u = 30, and standard deviation, o = = 4.8. a) Describe the sampling distribution (shape, mean, and standard deviation) of sample mean. b) Find P ( 29 < < 32.2)

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a) The sampling distribution of the sample mean has a mean of 30 and a standard deviation of 0.8

b) P(29 < X < 32.2) is 0.499

a) The sampling distribution of the sample mean can be described as approximately normal. According to the Central Limit Theorem, when the sample size is sufficiently large (n > 30), the sampling distribution of the sample mean tends to follow a normal distribution regardless of the shape of the population distribution.

The mean of the sampling distribution of the sample mean is equal to the population mean, which is u = 30 in this case.

The standard deviation of the sampling distribution of the sample mean, also known as the standard error of the mean (SE), can be calculated using the formula:

SE = o / sqrt(n)

where o is the population standard deviation and n is the sample size. Substituting the given values, we have:

SE = 4.8 / √(36) = 4.8 / 6 = 0.8

Therefore, the sampling distribution of the sample mean has a mean of 30 and a standard deviation of 0.8.

b)P(29 < X < 32.2), where X represents the sample mean, we need to calculate the z-scores corresponding to the lower and upper limits and then find the probability between those z-scores.

The z-score can be calculated using the formula

z = (X - u) / SE

For the lower limit of 29

z₁ = (29 - 30) / 0.8 = -1.25

For the upper limit of 32.2

z₂ = (32.2 - 30) / 0.8 = 3.25

P(29 < X < 32.2) is 0.499

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The heights of children in a city are normally distributed with a mean of 54 inches and standard deviation of 5.2 inches. Suppose random samples of 40 children are selected. What are the mean and standard error of the sampling distribution of sample means. Round the standard error to 3 decimal places. a. Mean - 54. Standard Error - 5.2 b. Mean - 54, Standard Error -0.822 c. Mean - 54. Standard Error 0.708 d. The mean and standard error cannot be determined.

Answers

The mean of the children is 54 and the standard error is 0.822

Finding the mean of the children

From the question, we have the following parameters that can be used in our computation:

Mean = 54

Standard deviation = 5.2

Sample size = 40

The sample mean is always equal to the population mean

So, we have

Mean = 54

Find the standard error

Here, we have

SE = σ/√n

So, we have

SE = 5.2/√40

Evaluate

SE = 0.822

Hence, the standard error is 0.822

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Find the inverse Laplace of the function 4s /s²-4

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The inverse Laplace transform of the function [tex]4s/(s^2 - 4)[/tex] is [tex]2e^{(2t)} + 2e^{(-2t)}[/tex].

The inverse Laplace transform of the function 4s/(s^2 - 4) can be found by using partial fraction decomposition and consulting a table of Laplace transforms.

First, let's rewrite the function using partial fraction decomposition:

4s / ([tex]s^2[/tex] - 4) = A/(s-2) + B/(s+2)

To find the values of A and B, we can multiply both sides of the equation by ([tex]s^2[/tex] - 4) and then substitute s = 2 and s = -2:

4s = A(s+2) + B(s-2)

Plugging in s = 2, we get:

8 = 4A

So, A = 2

Similarly, plugging in s = -2, we get:

-8 = -4B

So, B = 2

Now, we have:

4s / ([tex]s^2[/tex] - 4) = 2/(s-2) + 2/(s+2)

Using a table of Laplace transforms, we can find the inverse Laplace transform of each term.

The inverse Laplace transform of 2/(s-2) is [tex]e^{(2t)}[/tex], and the inverse Laplace transform of 2/(s+2) is [tex]e^{(2t)}[/tex].

Therefore, the inverse Laplace transform of the given function is:

[tex]2e^{(2t)} + 2e^{(-2t)}[/tex]

In summary, the inverse Laplace transform of 4s/([tex]s^2[/tex] - 4) is [tex]2e^{(2t)} + 2e^{(-2t)}[/tex].

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what is the radius of the n = 80 state of the bohr hydrogen atom?

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The radius of the n = 80 state of the Bohr hydrogen atom is 3.52 × 10² Å.

The formula to find the radius of an atom in the nth state of the Bohr model is:

r = n² × (0.529 Å) / Z

Where:

r = radius

n = state number

Z = atomic number (for hydrogen, Z = 1)

0.529 Å = Bohr radius

For n = 80,

the radius of the Bohr hydrogen atom can be calculated as:

r = (80)² × (0.529 Å) / 1r = 3.52 × 10² Å (rounded to three significant figures)

Therefore, the radius of the n = 80 state of the Bohr hydrogen atom is 3.52 × 10² Å.

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Find the rejection region for a one-dimensional chi-square test of a null hypothesis concerning if k = 5 and α = .025.

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The rejection region for this one-dimensional chi-square test with k = 5 and α = 0.025 is: Chi-square test statistic > C.

To obtain the rejection region for a one-dimensional chi-square test with a null hypothesis concerning k = 5 and α = 0.025, we need to determine the critical chi-square value.

The rejection region for a chi-square test is determined by the significance level (α) and the degrees of freedom (df).

In this case, k = 5 represents the number of categories or groups in the test, and the degrees of freedom (df) for a one-dimensional chi-square test are given by df = k - 1.

Since k = 5, the degrees of freedom would be df = 5 - 1 = 4.

To find the critical chi-square value at α = 0.025 and df = 4, we can refer to chi-square distribution tables or use statistical software.

The critical chi-square value for this test would be denoted as χ^2(0.025, 4).

Let's assume that the critical chi-square value is C.

The rejection region for the test would be the right-tail region of the chi-square distribution beyond the critical value C.

In other words, if the calculated chi-square test statistic is greater than C, we reject the null hypothesis.

So, the rejection region = Chi-square test statistic > C.

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If price index of base year with respect to current year is 125 percent, then: Select one: O a. 25 percent of prices increased in current year as compared to base year b. 100 percent of prices increased in the current year as compared to base year c. 75 percent of prices decreased in current year as compared to base year d. 25 percent of prices decreased in current year as compared to base year e. 125 percent of prices increased in current year as compared to base year O O

Answers

According to the information we can infer that the prices have risen by 25 percent more than the prices in the base year.

What is the correct sentences regarding to this situation?

If the price index of the base year with respect to the current year is 125 percent, it means that the prices in the current year have increased by 25 percent compared to the prices in the base year. This implies that the prices have risen by 25 percent more than the prices in the base year.

According to the above, the correct option would be: 25 percent of prices increased in current year as compared to base year (option A).

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- Let V = R¹ equipped with the standard dot-product, and let W = 1 2 0 3 Span{u₁, u2}, where u₁ = and U₂ Let v = 1 1 5 a) Find the matrix of the linear map prw VV in the standard basis S = {e1,e2, €3, €4} of V. b) Find the projection vector pw (v), use a) to do it Hint: Find an orthogonal basis of W to start.

Answers

Here, pw(v) = (118/105, 176/105, -92/105).

(a) In order to find the matrix of the linear map prwV:V, one needs to compute the images of the basis vectors e1, e2, e3 and e4 under prwV.

For e1, we have prwV(e1) = 2u1 + u2, which means that the first column of the matrix is [2, 1, 0, 0].

For e2, we have prwV(e2) = u1 + u2, which means that the second column of the matrix is [1, 1, 0, 0].

For e3 and e4, we have prwV(e3) = 0 and prwV(e4) = 0, which means that the third and fourth columns of the matrix are [0, 0, 1, 0] and [0, 0, 0, 1], respectively. Therefore, the matrix of the linear map prwV:V in the standard basis S = {e1,e2, €3, €4} of V is given by:

[2 1 0 0][1 1 0 0][0 0 1 0][0 0 0 1]

(b) To find the projection vector pw(v), we need to find an orthogonal basis for W. From the given vectors, we can see that u1 and u2 are linearly independent. Therefore, we only need to orthogonalize them using the Gram-Schmidt process. Let v = (1, 1, 5)u1 = (1, -1, 1)u2 = (1, 2, 1)

Then, we get u1' = u1 = (1, -1, 1) and

u2' = u2 - projv(u2) = (1, 2, 1) - (2/15)(1, 1, 5) = (7/15, 8/15, -7/15)

Therefore, the orthogonal basis of W is {u1', u2'}.

Now, the projection vector pw(v) is given by

pw(v) = projW(v) = (v · u1')u1' + (v · u2')u2'

Therefore, pw(v) = ((1, 1, 5) · (1, -1, 1))/(1² + 1² + 1²)((1, -1, 1) + ((1, 1, 5) · (7/15, 8/15, -7/15))/(1² + 2² + 1²)((7/15, 8/15, -7/15))= (3/7, -1/7, 5/7) + (31/15, 29/15, -41/15)= (118/105, 176/105, -92/105)

Therefore, pw(v) = (118/105, 176/105, -92/105).

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A manufacturer of ceramic vases has determined that her weekly revenue and cost functions for the manufacture and sale of z vases are R(z)-1052 -0.092 dollars and C(2) 1000+75 -0.08² dollars, respectively. Given that profit equals revenue minus cost:
a. find the marginal revenue, marginal cost, and marginal profit functions.
Marginal revenue: R' (z) =105-(0.18)x
Marginal cost: C' (z) =75-(0.16)x
Marginal profit: P'(x) = 30-(0.02)x

Answers

The marginal revenue function is R'(z) = -0.092 dollars, the marginal cost function is C'(z) = 75 - 0.16z dollars, and the marginal profit function is P'(z) = 0.16z - 75.092 dollars.

The given revenue function is R(z) = 1052 - 0.092z dollars.

Differentiating R(z) with respect to z, we get the marginal revenue function:

R'(z) = -0.092

The given cost function is C(z) = 1000 + 75z - 0.08z² dollars.

Differentiating C(z) with respect to z, we get the marginal cost function:

C'(z) = 75 - 0.16z

The profit function is given by P(z) = R(z) - C(z).

Differentiating P(z) with respect to z, we get the marginal profit function:

P'(z) = R'(z) - C'(z)

      = -0.092 - (75 - 0.16z)

      = -0.092 - 75 + 0.16z

      = 0.16z - 75.092

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50 Points
28 = -6a+ (-2a) + (-3) + 7

Answers

Answer:

28=-8a+4

Step-by-step explanation:

combine like terms

-6+-2=-8

-3+7=4

Addition of same coefficient
28=-8a+4
Collect like terms
28-4=-8a
Divide both side by -8
a=28-4/8
a=3

if the cost of gasoline in Calgary is S151 CDN dollars/L and the cost of gasoline in Dallas, Texas is $4.19 US dollars/US gallon, which place has the better deal for gasoline? (1 CDN dollar $0.77 US Dollar; 1 US gallon 3.81) Use Proportional Reasoning to convert the cost of gasoline in Canada to SUSD/gallon

Answers

Given that the cost of gasoline in Calgary is S151 CDN dollars/L and the cost of gasoline in Dallas, Texas is $4.19 US dollars/US gallon.

Let's first convert the exchange rates into US dollars:

1 CDN dollar $0.77 US Dollar1 US dollar $1.30 CDN Dollar Now,

let's convert the cost of gasoline in Calgary from S/L to USD/L:

[tex]S151 \text{ CDN dollars/L} \times 0.77 \text{ US Dollar/1 CDN dollar} = \boxed{$116.27 \text{ US dollars/L}}[/tex]

[tex]\$116.27\text{ US dollars/L}[/tex] Now,

let's convert the cost of gasoline in Dallas from US dollars/gallon to USD/L:$4.19 US dollars/US gallon x 1 US gallon/3.81

= $1.10 US dollars/L

Now we can compare the prices:

$116.27 USD/L (Calgary) vs $1.10 USD/L (Dallas)Since the cost of gasoline in Dallas is significantly cheaper than in Calgary, Dallas is the better deal for gasoline.

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arranging them such that no two rowing boats are in the same row or column. how many ways can he do this?

Answers

Total number of arrangements = n! - nC₁  × (n - 1)! - nC₁ × (n - 1)! + nC₂ × (n - 2)! + nC₁ × (n - 1)C₂ × (n - 3)! - nC₂ × (n - 2)C₁  × (n - 3)! + nC₁  × (n - 1)C₃ × (n - 4)! Suppose there are n rowing boats arranged in a square table with n rows and n columns. The solution is obtained through the application of permutations and combinations.

Step 1: We consider all the possible permutations of the rowing boats ignoring the fact that some boats may lie on the same row or column. The total number of such permutations is n!.

Step 2: We subtract from the number of permutations above, the number of permutations where two boats lie on the same row.

The number of permutations where two boats lie on the same row can be obtained as  nC₁  × (n - 1)!

Step 3: Next, we add to the number of permutations in step 2, the number of permutations where two boats lie on the same column.

The number of permutations where two boats lie on the same column can be obtained as nC₁  × (n - 1)!

Step 4: We then subtract the number of permutations where two boats lie on the same row and the same column.

This is because we counted these arrangements twice in step 2 and step 3. The number of such permutations is nC₂ × (n - 2)!

Step 5: Next, we add the number of permutations where three boats lie on the same row, since they are subtracted thrice in step 2, step 3, and step 4. The number of such permutations is nC₁  × (n - 1)C₂ × (n - 3)!

Step 6: We then subtract the number of permutations where two boats lie on the same row and two boats lie on the same column.

This is because we counted these arrangements twice in step 4 and step 5. The number of such permutations is nC₂ × (n - 2)C₁  × (n - 3)!

Step 7: We add the number of permutations where four boats lie on the same row or column since we subtracted them four times in step 2, step 3, step 4, and step 6. The number of such permutations is nC₁ × (n - 1)C₃ × (n - 4)!

Total number of arrangements = n! - nC₁  × (n - 1)! - nC₁ × (n - 1)! + nC₂ × (n - 2)! + nC₁ × (n - 1)C₂ × (n - 3)! - nC2 × (n - 2)C₁  × (n - 3)! + nC₁  × (n - 1)C₃ × (n - 4)!

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Evaluate ∂z/∂u at (u,v = (3, 5) for the function z = xy - y²; x = u - v, y = uv.
a. 8
b. -145
c. -2
d. 13

Answers

The value of  ∂z/∂u  is -145. Option B

How to determine the values

From the information given, we have that the function is;

z = xy - y²

x = u - v

y = uv.

(u,v = (3, 5)

Now, let use partial derivatives of the function z with respect to u.

First, Substitute the expressions, we have;

z = (u - v)(uv) - (uv)²

= u²v - uv - u²v²

With v as constant, we have;

dz/du = 2uv - v² - 2uv²

Substituting the values u = 3 and v = 5 , we get;

dz/du = 2(3)(5) - (5)² - 2(3)(5)²

dz/du = 30 - 25 - 150

subtract the values, we have;

dz/du = -145

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A smartphone runs a news application that downloads Internet news every 15 minutes. At the start of a download, the radio modems negotiate a connection speed that depends on the radio channel quality. When the negotiated speed is low, the smartphone reduces the amount of news that it transfers to avoid wasting its battery. The number of kilobytes transmitted, L, and the speed B in kb/s, have the joint PMF PL,B(1, b) b = 512 b = 1,024 b = 2,048 1 = 256 0.2 0.1 0.05 1 = 768 0.05 0.1 0.2 1 = 1536 0 0.1 0.2 Let T denote the number of seconds needed for the transfer. Express T as a function of L and B. What is the PMF of T? = XY when random variables X and Y (B) Find the CDF and the PDF of W have joint PDF [1 0≤x≤1,0 ≤ y ≤ 1, fx,y(2,3)= (6.39) otherwise.

Answers

The transfer time T is expressed as T = L / B, where L is the number of kilobytes transmitted and B is the speed in kb/s. The PMF of T can be derived from the joint PMF of L and B.


The transfer time T is calculated by dividing the number of kilobytes transmitted (L) by the speed (B), giving T = L / B.

To find the PMF of T, we need to derive it from the joint PMF of L and B. The joint PMF table provided for PL,B(L, B) can be used to determine the probabilities associated with different values of T.

To calculate the PMF of T, we need to sum up the probabilities for all combinations of L and B that satisfy the condition T = L / B.

The CDF and PDF of W, given random variables X and Y, can be found using the joint PDF of X and Y. By integrating the joint PDF over the appropriate ranges, we can obtain the CDF and differentiate it to obtain the PDF of W. The specific calculations would depend on the ranges of X and Y as indicated in the joint PDF.


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For a certain car and road conditions, the braking distance d, in meters, is given by the formula d 200 where s is the speed of the car, in kilometers per hour, at the time the brakes are first applied. According to the formals, which of the following could be the speed of the car, in kilometers per hour, at the time the brakes are first applied, so that the breaking distance is less than 20 meters? Indicate all such speeds 20 30 40 50 60 70

Answers

The speed of the car, in kilometers per hour, at the time the brakes are first applied, for which the braking distance is less than 20 meters, could be 20 km/h and 30 km/h.

According to the given formula, the braking distance (d) is equal to 200 times the square of the speed of the car (s). To find the speeds at which the braking distance is less than 20 meters, we need to solve the inequality d < 20. Substituting the formula, we get 200[tex]s^{2}[/tex]< 20. Dividing both sides of the inequality by 200 gives [tex]s^{2}[/tex] < 0.1. Taking the square root of both sides, we have s < √0.1. Evaluating this value, we find that s is less than approximately 0.316. Converting this value to kilometers per hour, we get s < 0.316 * 60 = 18.96 km/h. Thus, any speed below 18.96 km/h will result in a braking distance less than 20 meters. However, since the options provided are discrete values, the closest speeds that satisfy the condition are 20 km/h and 30 km/h. Therefore, the possible speeds at which the braking distance is less than 20 meters are 20 km/h and 30 km/h.

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find a polar equation for the curve represented by the given cartesian equatuon 4y^2=

Answers

Cartesian equation is[tex]4y^2 = x\ or\ y^2 = x/4[/tex]We know that the polar equation of the form [tex]r = f(\Theta)[/tex]can be obtained by converting the Cartesian equation x = g(y) into polar coordinates.

To convert the equation, [tex]x = 4y^2[/tex] into polar coordinates, we need to replace x and y with their respective polar coordinates.

We know that [tex]x = r\ cos\ \Theta[/tex] and [tex]y = r\ sin\ \Theta[/tex], where r is the radial distance and θ is the polar angle.

So, the Cartesian equation can be expressed as follows:[tex]4(r\ sin\ \theta)^2 = r\ sin\ \theta\⇒\\\ 4r^2 sin^2 \theta = r\ cos\ \theta\⇒ \\r = 4\ cos\ \theta sin^2 \theta[/tex]

Therefore, the polar equation for the curve represented by the given Cartesian equation is [tex]r = 4\ cos\ \theta\ sin^2\ \theta[/tex].The polar equation for the curve represented by the given Cartesian equation [tex]x = 4y^2\ is\ r = 4\ cos\ \theta\ sin\ \theta[/tex].

To convert the given Cartesian equation[tex]r = 4 \cos\ \theta \sin^2 \theta[/tex][tex]x = 4y^2[/tex] into polar coordinates, we need to replace x and y with their respective polar coordinates.

Using the equation [tex]x = r\ cos\ \theta[/tex]and [tex]y = r\ sin\ \theta[/tex], we get [tex]4(r\ sin\ \theta)^2 = r\ cos\ \theta[/tex], which simplifies to [tex]r = 4\ cos\ \theta \sin^2 \theta[/tex].

Hence, the polar equation for the curve represented by the given Cartesian equation is r = 4 cos θ sin² θ.

Therefore, the polar equation for the given Cartesian equation [tex]x = 4y^2[/tex]is [tex]r = 4\ cos \ \theta\ sin^2 \theta[/tex].

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(a) From a random sample of 200 families who have TV sets in Şile, 114 are watching Gülümse Kaderine TV series. Find the 96 confidence interval for the fractin of families who watch Gülümse Kaderine in Şile. (b) What can we understand with 96% confidence about the possible size of our error if we estimate the fraction families who watch Gülümse Kaderine to be 0.57 in Şile?

Answers

The 96 confidence interval for the fraction of families is (49.8%, 64.2%)

We are 96% confident that 49.8% to 64.2% of families watch Gülümse Kaderine in Şile

Finding the 96 confidence interval for the fraction of families

From the question, we have the following parameters that can be used in our computation:

Sample size, n = 200

Familes,, x = 114

z-score at 96% confidence, z = 2.05

So, we have the proportion of families to be

p = 114/200

p = 0.57

Next, we calculate the margin of error using

E = z *  √[(p * (1 - p) / n]

So, we have

E = 2.05 * √[(0.57 * (1 - 0.57) / 200]

Evaluate

E = 0.072

The confidence interval is then calculated as

CI = p ± E

So, we have

CI = 0.57 ± 0.072

Evaluate

CI = (49.8%, 64.2%)

What we understand about the confidence interval

In (a), we have

CI = (49.8%, 64.2%)

This means that we are 96% confident that 49.8% to 64.2% of families watch Gülümse Kaderine in Şile

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In each of the following tell what computation must be done last.

a. 5(16-7)-18

b. 54/(10-5+4)

c. (14-3)+(24x2)

d. 21,045/345+8

e.5x6-3x4+2

f. 19-3x4+9/3

g. 15-6/2x4

.h. 5+(8-2)3

Answers

The computations that must be done last are:

a. Subtraction: 16-7

b. Addition: 10-5+4

c. Multiplication: 24x2

d. Division: 21,045/345

e. Subtraction: 5x6-3x4

f. Division: 9/3

g. Multiplication: 6/2x4

h. Multiplication: (8-2)3

To determine the computation that must be done last in each expression, let's analyze them one by one:

a. 5(16-7)-18

The computation that must be done last is the subtraction inside the parentheses, which is 16-7.

b. 54/(10-5+4)

The computation that must be done last is the addition inside the parentheses, which is 10-5+4.

c. (14-3)+(24x2)

The computation that must be done last is the multiplication, which is 24x2.

d. 21,045/345+8

The computation that must be done last is the division, which is 21,045/345.

e. 5x6-3x4+2

The computation that must be done last is the subtraction, which is 5x6-3x4.

f. 19-3x4+9/3

The computation that must be done last is the division, which is 9/3.

g. 15-6/2x4

The computation that must be done last is the multiplication, which is 6/2x4.

h. 5+(8-2)3

The computation that must be done last is the multiplication inside the parentheses, which is (8-2)3.

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2. Solve the following partial differential equation ∂u/ ∂t = ∂²u/ ∂x²; u(0,t)=0. u(10,t)=100 u(x,0)=10x

Answers

The given partial differential equation is a one-dimensional heat equation. To solve it, we can use the method of separation of variables.

Assuming u(x, t) can be expressed as a product of two functions, u(x, t) = X(x)T(t), we substitute this into the partial differential equation:

X(x)T'(t) = X''(x)T(t)

Dividing both sides by X(x)T(t) gives:

T'(t)/T(t) = X''(x)/X(x)

Since the left side of the equation depends only on t and the right side depends only on x, they must be equal to a constant, say -λ^2:

T'(t)/T(t) = -λ^2 = X''(x)/X(x)

Now we have two ordinary differential equations:

T'(t)/T(t) = -λ^2

X''(x)/X(x) = -λ^2

The solutions to the time equation are of the form T(t) = Aexp(-λ^2t), where A is a constant. The solutions to the spatial equation are of the form X(x) = Bsin(λx) + Ccos(λx), where B and C are constants.

Applying the boundary conditions, we find that C = 0 and Bsin(10λ) = 100. This implies that λ = nπ/10, where n is an integer.

Therefore, the general solution is given by u(x, t) = Σ(A_nsin(nπx/10)exp(-(nπ/10)^2t)), where n ranges from 1 to infinity.

Finally, using the initial condition u(x, 0) = 10x, we can determine the coefficients A_n by expanding 10x in terms of the eigenfunctions sin(nπx/10) and performing the Fourier sine series expansion.

In conclusion, the solution to the given partial differential equation is u(x, t) = Σ(A_nsin(nπx/10)exp(-(nπ/10)^2t)), where A_n are determined by the Fourier sine series expansion of 10x.

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explain the steps used to apply l'hôpital's rule to a limit of the form .

Answers

L'Hôpital's Rule is a method for evaluating limits involving indeterminate forms of the types 0/0 or ∞/∞. When limits of such kinds occur, this rule is used for determining their values. In other words, this rule is employed for evaluating the limits which are beyond the standard method.

The principle behind L'Hôpital's Rule is that if the limit of f(x)/g(x) exists as x tends to a, where f(x) and g(x) are differentiable functions and both of them have the same limit at a, then the limit of (f(x))'/(g(x))' also exists and it is equal to the same value as that of f(x)/g(x).This rule helps in reducing the degree of numerator and denominator of a fraction without altering its value.

For instance, let's consider the limit of the form 0/0 as x approaches a.

Given below are the steps to apply L'Hôpital's Rule to a limit of the form 0/0:

Step 1: First, identify the indeterminate form.

Step 2: Compute the first derivative of both the numerator and the denominator.

Step 3: Compute the limit of the ratio of the derivatives obtained in step 2.

Step 4: If the limit computed in step 3 is an indeterminate form, apply L'Hôpital's Rule again and repeat the above steps. Continue applying this rule until the limit is no longer in indeterminate form.

Step 5: If the limit exists, then it is equal to the limit of the original function. If it does not exist, then the original limit also does not exist.

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From a spot 25 m from the base of the Peace Tower in Ottawa, the angle of elevation to the top of the flagpole is 76⁰. How tall, to the nearest metre, is the Peace Tower, including the flagpole? a) 24m b) 100m c) 6m d) 50m

Answers

Answer:

b) 100m

Step-by-step explanation:

tan(angle) = opposite/adjacent

tan(76) = height/25

4.01078093 = height/25

height = 25(4.01078093) = 100.23 or 100

find a 90onfidence interval for μ d = μ 1 − μ 2 μd=μ1-μ2 . to do this, answer the following questio

Answers

Confidence interval for μd = μ1 − μ2. Approach for The confidence interval for μd = μ1 − μ2 is given by:

Confidence interval = (X¯d- tα/2sD / √n, X¯d+ tα/2sD / √n)Where,

X¯d = Sample mean.

d = Sample mean difference.

tα/2 = The t-value for the selected level of significance (two-tailed).

sD = Standard deviation of the sample mean difference.

n = Sample size.

Formula used:

Sample Mean Difference = X¯d = Σd / n

Where,

Σd = Sum of the difference between the pairs

n = Number of pairs of data.

t - value = tα/2

= [ t-value table ]sD

= SD

= √[ Σd2 - (Σd)2 / n ] / (n - 1)

Calculation:

The given confidence level is 90%,So, the level of significance (α) is 1 - 0.9 = 0.1

The degrees of freedom is (n - 1) = 8 - 1 = 7Using the t-distribution table for 0.1 level of significance and 7 degrees of freedom, we get tα/2 as 1.895Given data is as follows:

PairsDifference (d)

110.08220.00330.11041.16652.11262.34672.478

We can calculate sample mean difference,

Sample Mean Difference (X¯d)

= Σd / nΣd

= 4.298n

= 8X¯d

= Σd / n

= 4.298 / 8

= 0.53725

Standard deviation of the sample mean difference (sD)

= SD

= √[ Σd2 - (Σd)2 / n ] / (n - 1)Σd2

= (0.082)2 + (0.003)2 + (0.110)2 + (1.166)2 + (2.112)2 + (2.346)2 + (2.478)2

= 14.691184SD

= √[ Σd2 - (Σd)2 / n ] / (n - 1)

= √[ 14.691184 - (4.298)2 / 8 ] / 7

= √[ 14.691184 - 9.2628203125 ] / 7

= √5.428363625 / 7

= 0.3856713846

Substitute the values in the formula,Confidence interval

= (X¯d- tα/2sD / √n, X¯d+ tα/2sD / √n)

= (0.53725 - (1.895 * 0.3856713846 / √8), 0.53725 + (1.895 * 0.3856713846 / √8))

= (0.0855, 0.9890)

Hence, the confidence interval is (0.0855, 0.9890).

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Find the circumference. Leave in terms of π.

Answers

Answer:

10 pi

Step-by-step explanation:

the formula for circumference is 2 x pi x radius, and since the diameter is given, we divide 10 by 2 to get 5. Then, we do 5x2, which is ten, so the answer is 10 pi! :)

Let denote a random sample from a Uniform( ) distribution. T () = () are jointly sufficient for θ. Use the fact, that is an unbiased estimate of θ to find a uniformly better estimator of θ than .
Hint: Use the Rao-Blackwell theorem.

Answers

A uniformly better estimator of θ can be obtained using the Rao-Blackwell theorem.

How can we obtain a uniformly better estimator?

The Rao-Blackwell theorem states that if we have an unbiased estimator and a sufficient statistic, then we can obtain a uniformly better estimator by taking the conditional expectation of the estimator given the sufficient statistic.

In this case, since T(X) = X(1) is a jointly sufficient statistic for θ and E[X(1)] = θ, we can use the Rao-Blackwell theorem to improve the estimator.

Let's denote the improved estimator as θ' and calculate its conditional expectation given T(X):

E[θ' | T(X)] = E[X(1) | T(X)]

Since T(X) = X(1), we have:

E[θ' | T(X)] = E[X(1) | X(1)] = X(1)

Therefore, the improved estimator θ' is simply X(1), the first order statistic of the random sample.

This improved estimator is uniformly better than X(1) because it has the same unbiasedness property as X(1) but with potentially lower variance. By conditioning on the sufficient statistic, we have utilized more information from the data, leading to a more efficient estimator.

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Use statistical tables to find the following values (i) fo.75, 6 15 = (ii) X²0.975, 12 = - (iii) t 0.9, 22 = - (iv) Z 0.025 = - (v) fo.05, 9, 10 = - (vi) k = when n = 15, tolerance level is 99% and confidence level is 95% assuming two-sided tolerance interval.

Answers

(i) F0.75,6,15: Use the F-distribution table to find the value of F for cumulative probability 0.75 and degrees of freedom 6 and 15.

(ii) X²0.975,12: Use the chi-square distribution table to find the value of chi-square for cumulative probability 0.975 and degrees of freedom 12.

(iii) t0.9,22: Use the t-distribution table to find the value of t for cumulative probability 0.9 and degrees of freedom 22.

(iv) Z0.025: Use the standard normal distribution table to find the value of Z for cumulative probability 0.025.

(v) F0.05,9,10: Use the F-distribution table to find the value of F for cumulative probability 0.05 and degrees of freedom 9 and 10.

(vi) k: Use a tolerance factor table or statistical software to find the value of k for a given sample size, tolerance level, and confidence level in a two-sided tolerance interval.

(i) To find the value of F0.75,6,15, we use the F-distribution table. The first number, 0.75, represents the cumulative probability, and the second and third numbers, 6 and 15, represent the degrees of freedom. In the F-distribution table, we locate the row corresponding to the numerator degrees of freedom (6) and the column corresponding to the denominator degrees of freedom (15). The intersection of this row and column gives us the value of F0.75,6,15.

(ii) To find the value of X²0.975,12, we use the chi-square distribution table. The number 0.975 represents the cumulative probability, and the number 12 represents the degrees of freedom. In the chi-square distribution table, we locate the row corresponding to the degrees of freedom (12) and the column that is closest to 0.975. The value at the intersection of this row and column gives us X²0.975,12.

(iii) To find the value of t0.9,22, we use the t-distribution table. The number 0.9 represents the cumulative probability, and the number 22 represents the degrees of freedom. In the t-distribution table, we locate the row corresponding to the degrees of freedom (22) and the column that is closest to 0.9. The value at the intersection of this row and column gives us t0.9,22.

(iv) To find the value of Z0.025, we use the standard normal distribution table. The number 0.025 represents the cumulative probability. In the standard normal distribution table, we locate the row corresponding to the desired cumulative probability (0.025) and find the value in the column labeled "Z". This value gives us Z0.025.

(v) To find the value of F0.05,9,10, we use the F-distribution table. The first number, 0.05, represents the cumulative probability, and the second and third numbers, 9 and 10, represent the degrees of freedom. Similar to (i), we locate the row corresponding to the numerator degrees of freedom (9) and the column corresponding to the denominator degrees of freedom (10) in the F-distribution table. The intersection of this row and column gives us F0.05,9,10.

(vi) To find the value of k when n = 15, the tolerance level is 99%, and the confidence level is 95% for a two-sided tolerance interval, we need to use a tolerance factor table or a statistical software package that provides tolerance factor calculations. The tolerance factor table will have rows for different confidence levels and columns for different tolerance levels. In this case, we look for the row corresponding to a confidence level of 95% and the column corresponding to a tolerance level of 99%. The value at the intersection of this row and column gives us the value of k.

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A researcher wishes to test the claim that the average cost of tuition and fees at a four-year public college is greater than $5700. She selects a random sample of 36 four-year public colleges and finds the mean to be $5950. The population standard deviation is $659. Is there evidence to support the claim at . Use the traditional method of hypothesis testing (show all 5 steps).

Answers

Based on the given sample data, we have enough evidence to suggest that the average cost of tuition and fees at a four-year public college is greater than $5700.

To test the claim that the average cost of tuition and fees at a four-year public college is greater than $5700, we can use the traditional method of hypothesis testing.

Let's go through the five steps:

State the hypotheses.

The null hypothesis (H0): The average cost of tuition and fees at a four-year public college is not greater than $5700.

The alternative hypothesis (Ha): The average cost of tuition and fees at a four-year public college is greater than $5700.

Set the significance level.

Let's assume a significance level (α) of 0.05.

This means we want to be 95% confident in our results.

Compute the test statistic.

Since we have the population standard deviation, we can use a z-test. The test statistic (z-score) is calculated as:

z = (sample mean - population mean) / (population standard deviation / √sample size)

In this case:

Sample mean ([tex]\bar{x}[/tex]) = $5950

Population mean (μ) = $5700

Population standard deviation (σ) = $659

Sample size (n) = 36

Plugging in these values, we get:

z = ($5950 - $5700) / ($659 / √36)

z = 250 / (659 / 6)

z ≈ 2.717

Determine the critical value.

Since our alternative hypothesis is that the average cost is greater than $5700, we are conducting a one-tailed test.

At a significance level of 0.05, the critical value (z-critical) is approximately 1.645.

Make a decision and interpret the results.

The test statistic (2.717) is greater than the critical value (1.645).

Thus, we reject the null hypothesis.

There is sufficient evidence to support the claim that the average cost of tuition and fees at a four-year public college is greater than $5700.

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Which of the following sets of vectors are bases for R²? (a) (6, 6), (8, 0)
(b) (4, 2), (-8,-6) (c) (0,0), (4, 6) (d) (6,2), (-12,-4)
a. a,b
b. a
c. a,b,c,d
d. b,c,d
e. c,d

Answers

The only set of vectors that forms a basis for R² is (4, 2), (-8,-6). So the correct answer is: b. a To answer this question, we need to recall that the set of vectors v₁, v₂, ... vₙ, is said to be a basis of a vector space V if and only if they are linearly independent and span the vector space V.

(a) (6, 6), (8, 0) :These vectors are not linearly independent since one of them is a multiple of the other: 2(6, 6) = (12, 12)

= 2(8, 0)

Therefore, they do not form a basis for R².

(b) (4, 2), (-8,-6) : We'll start by checking if these vectors are linearly independent, which means we need to check if there exist any scalars c₁ and c₂ such that:

c₁(4, 2) + c₂(-8, -6)

= (0, 0)

By equating the coefficients, we obtain the system of equations:

4c₁ - 8c₂ = 02c₁ - 6c₂

= 0

Dividing the second equation by 2 gives:

c₁ - 3c₂ = 0  and

so: c₁ = 3c₂.

Substituting this into the first equation, we get:

4(3c₂) - 8c₂ = 0,

Which simplifies to: c₂ = 0.

Substituting back into c₁ = 3c₂, we find that c₁ = 0.

Therefore, the only solution is (c₁, c₂) = (0, 0).

Thus, the vectors are linearly independent and since they are in R², they span R² as well.

Therefore, (4, 2), (-8,-6) is a basis for R².(c) (0,0), (4, 6). Here, one vector is a multiple of the other:

2(0,0) = (0,0)

≠ (4, 6).

Therefore, these vectors are linearly dependent and do not form a basis for R².(d) (6,2), (-12,-4). These vectors are not linearly independent since one of them is a multiple of the other:

-(6, 2) = (-12, -4).

Therefore, they do not form a basis for R².

To summarize, the only set of vectors that forms a basis for R² is (4, 2), (-8,-6). So the answer is: b. a

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Determine whether the given function is a solution to the given differential equation. 0=4e5t-2 e 2t d²0 de 0- +50= - 7 e 2t dt² dt C d²0 The function 0= 4 e 5t - 2 e 2t a solution to the differential equation de 0 +50= -7 e 2t, because when 4 e 5t - 2 e 2t is substituted for 0, dt² dt equivalent on any intervals of t. de is substituted for and dt is substituted for d²0 d₁² the two sides of the differential equation

Answers

The function 0 = 4e^(5t) - 2e^(2t) is a solution to the differential equation d²0/dt² + 50 = -7e^(2t). This is because when the function is substituted into the differential equation, it satisfies the equation for all intervals of t.

To determine whether the given function is a solution to the given differential equation, we substitute the function into the differential equation and check if it satisfies the equation for all values of t.The given differential equation is d²0/dt² + 50 = -7e^(2t). Substituting the function 0 = 4e^(5t) - 2e^(2t) into the differential equation, we have:
d²0/dt² + 50 = -7e^(2t)
Taking the second derivative of the function, we get:
d²0/dt² = (4e^(5t) - 2e^(2t))''
Evaluating the second derivative, we have:
d²0/dt² = (20e^(5t) - 4e^(2t))
Substituting this expression into the differential equation, we have:(20e^(5t) - 4e^(2t)) + 50 = -7e^(2t)
Simplifying the equation, we get:
20e^(5t) + 50 = 3e^(2t)
We can see that this equation holds true for all intervals of t. Therefore, the function 0 = 4e^(5t) - 2e^(2t) is indeed a solution to the given differential equation d²0/dt² + 50 = -7e^(2t).

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Find (a) P(A or B), Two events C and D are independent, such that P(C)-0.3 and P(D)-0.6. Find (b) P(C and D). (1) (1) (T Suppose N(t) denotes a population size at time t where the = = 0.04N(t). dt If the population size at time t = 4 is equal to 100, use a linear approximation to estimate the size of the population at time t 4.1. L(4.1) = Let R be a relation on the set of integers where a Rb a = b ( mod 5) Mark only the correct statements. Hint: There are ten correct statements. The composition of R with itself is R The inverse of R is R R is transitive For all integers a, b, c and d, if aRb and cRd then (a-c)R(b-d) (8,1) is a member of R. The equivalence class [0] = [4]. R is reflexive The union of the classes [-15],[-13].[-11],[1], and [18] is the set of integers. 1R8. The equivalence class [-2] = [3]. The complement of R is R Ris antisymmetric The union of the classes [1],[2],[3] and [4] is the set of integers. The intersection of [-2] and [3] is the empty set. R is irreflexive R is asymmetric Ris symmetric The equivalence class [-2] is a subset of the integers. The equivalence class [1] is a subset of R. R is an equivalence relation on the set of integers. Given Scenario C, they decide to SELL THE INVESTMENT in22 for $420,000 (post-tax).Calculate NPV given the sale, also find the option to abandonand state whether the company should proceed with the 1286) Determine the Inverse Laplace Transform of F(s)=10/(s+12). The form of the answer is f(t)=Aexp(-alpha t). Give your answers as: A,alpha ans: 2 recent research in biology and genetics has led to the conclusion that may need to use the appropriate technology to answer this question ergency 911 calls to a small municipality in Idaho come in at the rate of one every five minutes. Anume that the number of 911 colis is a random variohle that can be described by the Produtobusom ) What is the expected number of 911 calls in thour? 12 ) What the probability of the 911 calls in 5 minutes? (Round your answer to four decimal places) X 0 130 What is the probability of no 911 calls in a 5-minute period Two models of batteries are measured for their discharge time (in hours): Model A 5.5 5.6 6.3 4.6 5.3 5.0 6.2 5.8 5.1 5.2 5.9 Model B 3.8 4.3 4.2 4.0 4.9 4.5 5.2 4.8 4.5 3.9 3.7 4.6 Assume that the discharge times of Model A follows a normal distribution N(, 0), and the discharge times of Model B follows a normal distribution N(,^2). (a) Suppose the variances from the two models are the same, at significant level a = 0.01, can we assert that Model A lasts longer than Model B? (b) At a = 0.05, test if the two samples have the same variance. mary's company is implementing an erp system to achieve which main business objective? Suppose we have a 2m long rod whose temperature is given by the function (2,1) for 2 on the beam and time t. Use separation of variables to solve the heat equation for this rod if the initial temperature is: u(x,0) = {e^x if 0 and the ends of the rod are always 0 (i.e.,u(0,t)=0=u(2,t))