a circle given by x^2 +y^2 -2y -11 = 0 can be written in standard form like this x^2 +( y - k)^2 = 12 .what is the value of k in this eqation?

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Answer 1

in the standard form equation x^2 + (y - k)^2 = 12, the value of k is 1.

To convert the equation of the circle from its general form to standard form, we need to complete the square for the y-term.

Given equation: [tex]x^2 + y^2 - 2y - 11 = 0[/tex]

First, let's group the terms involving y:

[tex]x^2 + (y^2 - 2y) - 11 = 0[/tex]

To complete the square for the y-term, we need to add and subtract a constant that will allow us to create a perfect square trinomial. In this case, the constant we need to add and subtract is [tex](2/2)^2 = 1[/tex].

[tex]x^2 + (y^2 - 2y + 1 - 1) - 11 = 0[/tex]

Rearranging the terms and simplifying:

[tex]x^2 + (y^2 - 2y + 1) - 12 = 0[/tex]

Now, we can rewrite the trinomial as a perfect square:

[tex]x^2 + (y - 1)^2 - 12 = 0[/tex]

Comparing this equation to the standard form of a circle equation, which is [tex](x - h)^2 + (y - k)^2 = r^2[/tex], we can see that the center of the circle is (h, k) = (0, 1) and the radius squared is [tex]r^2 = 12[/tex].

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Related Questions

which statements explain that the table does not represent a prbability distribution
A. The probability 4/3 is greater than 1.
B. The probabilities have different denominators.
C. The results are all less than 0.
D. The sum of the probabilities is 8/3 .

Answers

The sum of the probabilities is not equal to one, the table does not represent a probability distribution, so option D is the correct answer.

The statement that explains that the table does not represent a probability distribution is D. The sum of the probabilities is 8/3.

This statement explains that the probabilities do not add up to one, which is a requirement for a probability distribution. Therefore, it is not a probability distribution. If a table is given with probabilities and it is required to identify whether it represents a probability distribution or not, we must check the probabilities whether they meet the following conditions or not.

The sum of all probabilities should be equal to 1.All probabilities should be greater than or equal to zero.If any probability is greater than 1, then it is not a probability, so the probability table does not represent a probability distribution.The given probabilities have different denominators, this condition alone is not enough to reject it as probability distribution and is also a common error while creating the probability table.

An event's probability is a numerical value that reflects how likely it is to occur. Probabilities are always between zero and one, with zero indicating that the event is impossible and one indicating that the event is certain.

The sum of the probabilities of all possible outcomes for a particular experiment is always equal to one.The probabilities in the table represent the likelihood of the event happening and must add up to 1.

For example, the probability of rolling a die and getting a 1 is 1/6 because there are six possible outcomes and only one of them is a 1.The probability distribution can be used to determine the likelihood of certain outcomes. The sum of all probabilities must be equal to one.

The probability distribution function is also used in statistics to calculate the mean, variance, and standard deviation of a random variable. A probability distribution that meets the required conditions is called a discrete probability distribution. It is a distribution where the probability of each outcome is defined for discrete values.

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how does restricting the range of a variable affect the correlation coefficient?

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Restricting the range of a variable affects the correlation coefficient by making it appear stronger than it actually is.

The correlation coefficient is a statistical measure used to show how strong and what direction a relationship is between two variables. Correlation coefficients can range from -1 to +1. The closer the correlation coefficient is to -1 or +1, the stronger the relationship. The closer the coefficient is to 0, the weaker the relationship.

What does it mean to restrict the range of a variable, Restricting the range of a variable means that you only consider a portion of the possible values for that variable. When you restrict the range of a variable, you are excluding some of the data from your analysis. This can make the correlation coefficient appear stronger than it actually is because you are only looking at a portion of the data.

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Express the limit as a definite integral on the given interval.
lim n→[infinity]
n i = 1
xi*
(xi*)2 + 3
Δx, [1, 8]

Answers

The given limit is lim n→∞ ∑i=1nxi*(xi*)²+3 Δx with an interval of [1, 8].Since the limit can be expressed as a definite integral, consider the following steps:

Firstly, substitute xi* with xi and express Δx as (b-a)/n; b being the upper bound and a being the lower bound. The substitution gives;

lim n→∞ ∑i=1nxi((xi)²+3) (b - a) / n

Next, take the limit of the sequence and substitute i/n with x. The substitution gives;[tex]

lim n→∞ [(b - a) / n] ∑i=1n f(x) Δx where f(x) = x((x)²+3).[/tex]

Next, express the summation as an integral by taking the limit as n approaches infinity;

l[tex][tex]lim n→∞ [(b - a) / n] ∑i=1n f(x) Δx where f(x) = x((x)²+3).[/tex][/tex]im n→∞ [(b - a) / n] ∑i=1n f(xi*) Δx ∫ba f(x) dx

Finally, integrate f(x) within the interval [1,8] as follows;∫18 x(x²+3) dxThe definite integral evaluates to;

∫18 x(x²+3) dx = [x²/2 + 3x]_1^8= [8²/2 + 3(8)] - [1²/2 + 3(1)]= 71[tex]∫18 x(x²+3) dx = [x²/2 + 3x]_1^8= [8²/2 + 3(8)] - [1²/2 + 3(1)]= 71[/tex] units squared

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Find the cost function for the marginal cost function. C'(x) = 0.04 e 0.02x, fixed cost is $9 C(x) =

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Given, marginal cost function is: C'(x) = 0.04e^(0.02x)Fixed cost is $9.Now, let's find the cost function from the marginal cost function. To find the cost function, we need to integrate the marginal cost function. So, C(x) = ∫C'(x) dxWe have marginal cost function, C'(x) = 0.04e^(0.02x)Now, integrate it with respect to x.

∫C'(x)dx = ∫0.04e^(0.02x) dxLet ' s integrate it using the formula: ∫e^(ax)dx = (1/a) e^(ax) + CI = (0.04/0.02) e^(0.02x) + CNow , we know that fixed cost is $9 which means, when x = 0, C(x) = 9Using this, let's find the value of C. Substitute x = 0 and C(x) = 9 in the above equation. C(x) = (0.04/0.02) e^(0.02x) + C9 = (0.04/0.02) e^(0.02(0)) + C9 = (0.04/0.02) e^(0) + C9 = (0.04/0.02) (1) + C9 = 2 + CC = 9 - 2C = 7Now, substitute the value of C in the equation we obtained above. C(x) = (0.04/0.02) e^(0.02x) + CC(x) = 2 e^(0.02x) + 7The cost function is C(x) = 2 e^(0.02x) + 7.The answer is 2 e^(0.02x) + 7.

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The cost function C(x) is [tex]C(x) = 2e^{0.02x} + 7[/tex]

We have,

To find the cost function C(x) given the marginal cost function C'(x) and the fixed cost, we need to integrate the marginal cost function.

The marginal cost function is given as [tex]C'(x) = 0.04e^{0.02x}.[/tex]

To integrate C'(x) with respect to x, we can use the power rule for integration and the fact that the integral of [tex]e^u[/tex] du is [tex]e^u[/tex].

∫ C'(x) dx = ∫ [tex]0.04e^{0.02x} dx[/tex]

Using the power rule, we can rewrite the integral as:

C(x) = ∫ [tex]0.04e^{0.02x} dx = 0.04 \times (1/0.02) \times e^{0.02x} + C[/tex]

Simplifying further:

[tex]C(x) = 2e^{0.02x} + C[/tex]

We know that the fixed cost is $9, which means that when x = 0, the cost is equal to $9.

Substituting this into the equation:

[tex]C(0) = 2e^{0.02 \times 0} + C = 2e^0 + C = 2 + C[/tex]

Since C(0) is equal to the fixed cost of $9, we have:

2 + C = 9

Solving for C:

C = 9 - 2

C = 7

Therefore,

The cost function C(x) is[tex]C(x) = 2e^{0.02x} + 7[/tex]

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Find the line integral of f(x,y)=ye x 2
along the curve r(t)=4ti−3tj,−1≤t≤1. The integral of f is

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The value of the line integral of `f(x, y) = ye^(x^2)`along the curve `r(t) = 4ti - 3tj, -1 ≤ t ≤ 1` is `-0.0831255sqrt(145)` (approx).

The given integral is of the form:

Line integral is defined as the integration of a function along a curve. The given integral is a line integral that is the integral of the function along a given curve.  Therefore, the line integral of

`f(x, y) = ye^(x^2)`

along the curve

`r(t) = 4ti - 3tj, -1 ≤ t ≤ 1` is:

We know that,

Let us evaluate

`f(r(t))` first.`f(r(t)) = y(t)e^(x(t)^2)`

where,

`x(t) = 4t`, `y(t) = -3t`

So, `f(r(t)) = (-3t)e^((4t)^2)`

To find the line integral of

`f(x, y) = ye^(x^2)`

along the curve

`r(t) = 4ti - 3tj, -1 ≤ t ≤ 1`.

we integrate

`f(r(t))` with respect to `t`. Hence,

`∫f(r(t))dt` (for t = -1 to t = 1)`= ∫_(-1)^(1) f(r(t))|r'(t)|dt`

since `ds = |r'(t)|dt`)`= ∫_(-1)^(1) [(-3t)e^((4t)^2)]|r'(t)|dt`

substituting `f(r(t))` with the corresponding value

`= ∫_(-1)^(1) [(-3t)e^((4t)^2)]sqrt(16+9)dt`

(substituting `|r'(t)|` with `sqrt(16+9)`)`=

∫_(-1)^(1) [-3tsqrt(145)e^(16t^2)] dt`

Thus, the integral of f is

`∫_(-1)^(1) [-3tsqrt(145)e^(16t^2)] dt = (-sqrt(145)/4)[e^(16t^2)]_(-1)^(1)`

Let's evaluate

`e^(16)` and `e^(-16)` now

.`e^(16) = 8.8861 xx 10^6`

`e^(-16) = 1.1254 xx 10^(-7)`

Therefore,

`(-sqrt(145)/4)[e^(16t^2)]_(-1)^(1)`= `(-sqrt(145)/4)

[e^(16) - e^(-16)]`

= `(-sqrt(145)/4)[8.8861 xx 10^6 - 1.1254 xx 10^(-7)]`

= `(-sqrt(145)/4)(8.8860985 xx 10^6 - 1.1254 xx 10^(-7))

= -0.0831255 sqrt(145)`

Hence, the value of the line integral of `f(x, y) = ye^(x^2)`along the curve `r(t) = 4ti - 3tj, -1 ≤ t ≤ 1` is `-0.0831255sqrt(145)` (approx).

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Use the given minimum and maximum data entries, and the number of classes, to find the class width, the lower class limits, and the upper class limits. minimum = 21, maximum 122, 8 classes The class w

Answers

For a given minimum of 21, maximum of 122, and eight classes, the class width is approximately 13. The lower class limits are 21-33, 34-46, 47-59, 60-72, 73-85, 86-98, 99-111, and 112-124. The upper class limits are 33, 46, 59, 72, 85, 98, 111, and 124.

To find the class width, we need to subtract the minimum value from the maximum value and divide it by the number of classes.

Class width = (maximum - minimum) / number of classes

Class width = (122 - 21) / 8

Class width = 101 / 8

Class width = 12.625

We round up the class width to 13 to make it easier to work with.

Next, we need to determine the lower class limits for each class. We start with the minimum value and add the class width repeatedly until we have all the lower class limits.

Lower class limits:

Class 1: 21-33

Class 2: 34-46

Class 3: 47-59

Class 4: 60-72

Class 5: 73-85

Class 6: 86-98

Class 7: 99-111

Class 8: 112-124

Finally, we can find the upper class limits by adding the class width to each lower class limit and subtracting one.

Upper class limits:

Class 1: 33

Class 2: 46

Class 3: 59

Class 4: 72

Class 5: 85

Class 6: 98

Class 7: 111

Class 8: 124

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Suppose x is a random variable best described by a uniform
probability that ranges from 2 to 5. Compute the following: (a) the
probability density function f(x)= 1/3 (b) the mean μ= 7/2 (c) the
stand

Answers

The A) probability density function is 1/3, B) the mean is 7/2 and C) the standard deviation is √3/2.

Given, x is a random variable best described by a uniform probability that ranges from 2 to 5.P(x) = 1 / (5-2) = 1/3(a) The probability density function f(x) = 1/3(b)

Mean of the probability distribution is given by the formula μ = (a+b)/2, where a is the lower limit of the uniform distribution and b is the upper limit of the uniform distribution.

The lower limit of the uniform distribution is 2 and the upper limit is 5.μ = (2+5)/2=7/2

(c) The standard deviation of a uniform distribution can be found using the following formula: σ=√[(b−a)^2/12]Here, a = 2 and b = 5.σ=√[(5−2)^2/12]= √(9/12)= √(3/4)= √3/2Hence, the answers are given below:

(a) Probability density function f(x) = 1/3(b) Mean of the probability distribution is given by the formula μ = (a+b)/2, where a is the lower limit of the uniform distribution and b is the upper limit of the uniform distribution.

The lower limit of the uniform distribution is 2 and the upper limit is 5.μ = (2+5)/2=7/2

(c) The standard deviation of a uniform distribution can be found using the following formula: σ=√[(b−a)^2/12]Here, a = 2 and b = 5.σ=√[(5−2)^2/12]= √(9/12)= √(3/4)= √3/2

Therefore, the probability density function is 1/3, the mean is 7/2 and the standard deviation is √3/2.

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find the volume of the solid whose base is bounded by the circle x^2 y^2=4

Answers

the volume of the solid whose base is bounded by the circle x²y² = 4 is 0.

The equation of a circle in the coordinate plane can be written as(x - a)² + (y - b)² = r², where the center of the circle is (a, b) and the radius is r.

The equation x²y² = 4 can be rewritten as:y² = 4/x².

Therefore, the graph of x²y² = 4 is the graph of the following two functions:

y = 2/x and y = -2/x.

The line connecting the points where y = 2/x and y = -2/x is the x-axis.

We can use the washer method to find the volume of the solid obtained by rotating the area bounded by the graph of y = 2/x, y = -2/x, and the x-axis around the x-axis.

The volume of the solid is given by the integral ∫(from -2 to 2) π(2/x)² - π(2/x)² dx

= ∫(from -2 to 2) 4π/x² dx

= 4π∫(from -2 to 2) x⁻² dx

= 4π[(-x⁻¹)/1] (from -2 to 2)

= 4π(-0.5 + 0.5)

= 4π(0)

= 0.

Therefore, the volume of the solid whose base is bounded by the circle x²y² = 4 is 0.

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A highly rated community college has over 60,000 students and seven different campuses. One of its highest density classes offered is Introduction to Statistics. The statistics course is required for nearly every major offered at the college and therefore is considered a strategic course for the college. The college's leadership is very interested in the relationship between the class size of its statistics courses and students' final grades for the course. Specifically, the college is concerned with the low pass rate of some of its class sections and is determined to remedy the situation. The college's institutional research department recently collected data for analysis in order to support leadership's upcoming discussion regarding the low pass rate of some of its statistics class sections. Final grades from a random sample of 300 class sections over the last five years were collected. The research division also conducted analysis, using archived data, to determine the class size of these 300 class sections. The Class Number, Campus, Class Size, Average Final Grade, Number of "F"s, Average G.P.A. and Successful/Unsuccessful data were collected for these 300 class sections. StatCrunch Data Set Assume that the distribution of Average G.P.A. for all of the college's Introduction to Statistics class sections over the past five years has the same shape, mean, and standard deviation as the Average G.P.A. data. If it is reasonable based on your visual analysis of a histogram of the Average G.P.A. data, use the sample mean (2.66) and sample standard deviation (0.23) from the Average G.P.A. data together with the Normal distribution to answer all of the following questions. Calculate the probability of randomly selecting a class section from the population with an average G.P.A. less than 2.50. nothing% (Round to two decimal places as needed.) Calculate the probability of randomly selecting a class section from the population with an average G.P.A. greater than 3.00. nothing% (Round to two decimal places as needed.) Calculate the probability of randomly selecting a class section from the population with an average G.P.A. between 2.35 and 2.80. nothing% (Round to two decimal places as needed.) Calculate the average G.P.A. that represents the 90th percentile of all Introduction to Statistics class sections over the past five years. nothing (Round to two decimal places as needed.)

Answers

The probability of randomly selecting a class section from the population with an average G.P.A. less than 2.50 is approximately 24.91%. The probability of randomly selecting a class section from the population with an average G.P.A. greater than 3.00 is approximately 6.84%.

To calculate the probabilities and the average GPA for the given questions, we can use the sample mean (2.66) and sample standard deviation (0.23) from the Average G.P.A. data, assuming they represent the population.

1. The probability of randomly selecting a class section from the population with an average G.P.A. less than 2.50 can be calculated using the z-score formula and the standard normal distribution.

The z-score is (2.50 - 2.66) / 0.23 = -0.6957. Using a standard normal distribution table or software, we find the probability to be approximately 24.91%.

2. The probability of randomly selecting a class section from the population with an average G.P.A. greater than 3.00 can be calculated using the z-score formula and the standard normal distribution.

The z-score is (3.00 - 2.66) / 0.23 = 1.4783. Using a standard normal distribution table or software, we find the probability to be approximately 6.84%.

3. The probability of randomly selecting a class section from the population with an average G.P.A. between 2.35 and 2.80 can be calculated by finding the area under the standard normal curve between the corresponding z-scores.

The z-scores for 2.35 and 2.80 are (-0.9130) and (0.6522) respectively. Using a standard normal distribution table or software, we find the probability to be approximately 46.20%.

4. To compute the average G.P.A. that represents the 90th percentile of all Introduction to Statistics class sections over the past five years, we need to find the corresponding z-score. Using a standard normal distribution table or software, we find the z-score to be approximately 1.2816.

We can then calculate the average G.P.A. using the formula: average G.P.A. = (z-score * standard deviation) + mean.

Substituting the values, we get (1.2816 * 0.23) + 2.66 = 2.9668. Therefore, the average G.P.A. that represents the 90th percentile is approximately 2.97.

Note: It is important to keep in mind that these calculations are based on the assumption that the sample accurately represents the population.

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Consider a binomial experiment with n = 11 and p = 0.5. a. Compute ƒ(0) (to 4 decimals). f(0) = b. Compute f(2) (to 4 decimals). ƒ(2) = c. Compute P(x ≤ 2) (to 4 decimals). P(x ≤ 2) = d. Compute

Answers

a. ƒ(0) is approximately 0.0004883. b. ƒ(2) is approximately 0.0273438. c. P(x ≤ 2) is approximately 0.0332031. d. P(x > 2) is approximately 0.9667969.

a. To compute ƒ(0), we use the formula for the probability mass function of a binomial distribution:

ƒ(x) = C(n, x) * p^x * (1-p)^(n-x)

Where C(n, x) represents the binomial coefficient, given by C(n, x) = n! / (x!(n-x)!).

In this case, we have n = 11 and p = 0.5. Plugging in these values, we get:

ƒ(0) = C(11, 0) * 0.5^0 * (1-0.5)^(11-0)

= 1 * 1 * 0.5^11

≈ 0.0004883 (rounded to 4 decimals)

Therefore, ƒ(0) is approximately 0.0004883.

b. To compute ƒ(2), we use the same formula:

ƒ(2) = C(11, 2) * 0.5^2 * (1-0.5)^(11-2)

Plugging in the values, we get:

ƒ(2) = C(11, 2) * 0.5^2 * 0.5^9

= 55 * 0.25 * 0.001953125

≈ 0.0273438 (rounded to 4 decimals)

Therefore, ƒ(2) is approximately 0.0273438.

c. To compute P(x ≤ 2), we need to sum the probabilities from ƒ(0) to ƒ(2):

P(x ≤ 2) = ƒ(0) + ƒ(1) + ƒ(2)

Using the previous calculations:

P(x ≤ 2) = 0.0004883 + ƒ(1) + 0.0273438

To find ƒ(1), we can use the formula:

ƒ(1) = C(11, 1) * 0.5^1 * (1-0.5)^(11-1)

Plugging in the values, we get:

ƒ(1) = 11 * 0.5 * 0.000976563

≈ 0.0053711 (rounded to 4 decimals)

Now we can compute P(x ≤ 2):

P(x ≤ 2) = 0.0004883 + 0.0053711 + 0.0273438

≈ 0.0332031 (rounded to 4 decimals)

Therefore, P(x ≤ 2) is approximately 0.0332031.

d. To compute P(x > 2), we can subtract P(x ≤ 2) from 1:

P(x > 2) = 1 - P(x ≤ 2)

= 1 - 0.0332031

≈ 0.9667969 (rounded to 4 decimals)

Therefore, P(x > 2) is approximately 0.9667969.

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On Saturday, some adults and some children were in a theatre. The ratio of the number of adults to the number of children was 7:2 Each person had a seat in the Circle or had a seat in the Stalls. 4 of the children had seats in the Stalls. 5 124 children had seats in the Circle. There are exactly 3875 seats in the theatre. On this Saturday, what percentage of the seats had people sitting on them?​

Answers

On this Saturday, the percentage of the seats that had people sitting on them was 72%.

What is the percentage?

The percentage refers to the ratio or proportion of one value or variable compared to another.

The percentage is computed as the quotient of the division of one proportional value with the whole value, multiplied by 100.

The ratio of adults to children in the theater = 7:2

The sum of ratios = 9 (7 + 2)

The proportion of children who had seats in the Stalls = ⁴/₅ = 0.8 or 80%

The number of children who had seats in the Circle = 124

124 = 0.2 (1 - 0.8)

Proportionately, the total number of children who had seats in the Stalls or the Circle = 620 (124 ÷ 0.2)

The number of adults who had seats in the Stalls or the Circle in the theater =2,170 (620 ÷ 2 × 7)

The total number of adults and children with seats in the theater = 2,790 (620 ÷ 2 × 9) or (2,170 + 620)

The total number of seats in the theater = 3,875

The percentage of the seats with people sitting on them = 72%(2,790÷3,875 × 100).

Thus, the theater was seated to 72% capacity.

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(1 point) Test the claim that the two samples described below come from populations with the same mean. Assume that the samples are independent simple random samples. Use a significance level of 0.03.

Answers

Since the two samples come from populations with the same mean, we can use the two-sample t-test to test the hypothesis. The null hypothesis for this test is that the two samples come from populations with the same mean, and the alternative hypothesis is that the two samples come from populations with different means.

Here are the steps to test the hypothesis:

Step 1: State the null and alternative hypotheses. H0: μ1 = μ2 (the two samples come from populations with the same mean)Ha: μ1 ≠ μ2 (the two samples come from populations with different means)

Step 2: Determine the level of significance (α). α = 0.03

Step 3: Determine the critical value(s). Since the test is a two-tailed test, we need to find the critical values for the t-distribution with degrees of freedom (df) equal to the sum of the sample sizes minus two (n1 + n2 - 2) and a level of significance of 0.03. Using a t-distribution table or calculator, we get a critical value of ±2.594.

Step 4: Calculate the test statistic. The test statistic for the two-sample t-test is given by: t = (x1 - x2) / (s1²/n1 + s2²/n2)^(1/2) where x1 and x2 are the sample means, s1 and s2 are the sample standard deviations, and n1 and n2 are the sample sizes.

Step 5: Determine the p-value. Using a t-distribution table or calculator, we can find the p-value corresponding to the test statistic calculated in step 4.

Step 6: Make a decision. If the p-value is less than the level of significance (α), we reject the null hypothesis; otherwise, we fail to reject the null hypothesis.

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Since, the samples are independent simple random samples so, the value of test statistic is -2.834 and the two samples come from populations with different means.

Given, we need to test the claim that the two samples described below come from populations with the same mean. Assume that the samples are independent simple random samples. Use a significance level of 0.03.

Hypotheses:

H0: µ1 = µ2 (the two population means are equal)

H1: µ1 ≠ µ2 (the two population means are not equal)

Here, we are using a two-tailed test at a significance level of α = 0.03. Thus, the critical value for rejection region is obtained as follows:

α/2 = 0.03/2

= 0.015

The degrees of freedom is given by:

(n1 - 1) + (n2 - 1) = (15 - 1) + (12 - 1)

= 25

Test statistics, Here, σ1 and σ2 are unknown. Thus, we use the t-distribution. The calculated value of test statistic is -2.834.

Conclusion: Since the calculated value of test statistic falls in the rejection region, we reject the null hypothesis. Therefore, at α = 0.03, we have sufficient evidence to suggest that there is a difference in the mean weight of walleye fingerlings stocked in the western and central regions of the lake. Hence, we can conclude that the two samples come from populations with different means.

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Find the perimeter of a rectangle in simplest expression form that has an area of 6x^2 +17x + 12 square feet.

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perimeter = 2(length + width)We can substitute the values we found for l and w to get: perimeter = 2(3x + 4 + 2x + 3)perimeter = 2(5x + 7)perimeter = 10x + 14Therefore, the perimeter of the rectangle is 10x + 14.

We have an area of a rectangle that is 6x² + 17x + 12 square feet and we need to find the perimeter of this rectangle. First, we will write down the formula of the area of a rectangle in terms of its length and width: Area of rectangle = length × width A rectangle has two pairs of equal sides. If we let the length be a and the width be b, we can say that:2a + 2b = perimeter We want to find the perimeter, so we need to find a and b by factoring the area expression. Factoring 6x² + 17x + 12:6x² + 8x + 9x + 12 = (3x + 4)(2x + 3)Therefore, the length and width of the rectangle are 3x + 4 and 2x + 3, respectively. The perimeter of a rectangle with length l and width w is given by the expression :perimeter = 2(l + w)We can substitute the values we found for l and w to get: perimeter = 2(3x + 4 + 2x + 3)perimeter = 2(5x + 7)perimeter = 10x + 14Therefore, the perimeter of the rectangle is 10x + 14.

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given the function f(x) = 0.5|x – 4| – 3, for what values of x is f(x) = 7?

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Therefore, the values of x for which function f(x) = 7 are x = 24 and x = -16.

To find the values of x for which f(x) is equal to 7, we can set up the equation:

0.5|x – 4| – 3 = 7

First, let's isolate the absolute value term by adding 3 to both sides:

0.5|x – 4| = 10

Next, we can remove the coefficient of 0.5 by multiplying both sides by 2:

|x – 4| = 20

Now, we can split the equation into two cases, one for when the expression inside the absolute value is positive and one for when it is negative.

Case 1: (x - 4) > 0:

In this case, the absolute value expression becomes:

x - 4 = 20

Solving for x:

x = 20 + 4

x = 24

Case 2: (x - 4) < 0:

In this case, the absolute value expression becomes:

-(x - 4) = 20

Expanding the negative sign:

-x + 4 = 20

Solving for x:

-x = 20 - 4

-x = 16

Multiplying both sides by -1 to isolate x:

x = -16

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What is the area of the region in the first quadrant that is bounded above by y=sqrt x and below by the x-axis and the line y=x-2?

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The area of the given region in the first quadrant is `32/3` square units.

The given region in the first quadrant bounded above by[tex]`y = \sqrt(x)`[/tex] and below by the x-axis

and the line `y = x - 2`. We can compute the area of the region by finding the points of intersection of the curves. These curves intersect at the point `(4,2)`.

Hence, the area of the given region in the first quadrant bounded above by[tex]`y = \sqrt(x)`[/tex] and below by the x-axis and the line

`y = x - 2` is:

[tex]\int[0,4](x - 2)dx + \int[4,16]\sqrt(x)dx[/tex]

=[tex][x^2/2 - 2x][/tex]

from 0 to 4 + [tex][2/3 * x^_(3/2)][/tex]

from 4 to 16= (16 - 8) + (32/3 - 8/3)

= 8 + 8/3

= 24/3 + 8/3

= 32/3.

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6) Let the probability of event A is P(A)=0.4, then the probability of A is P(A) = 0.06 A. True B. False Answer) B

Answers

The probability of event A given the event B is 0.35 or 7/20.

Here, we have,

It is given that A and B are two events.

Given probabilities are as follows:

Probability of A and B is = P(A and B) = 0.14

Probability of B = P(B) = 0.4

We know that the conditional probability of event A given B is given by,

P(A | B)

= P(A and B)/P(B)

= 0.14/0.4

[Substituting the value which are given]

= 14/40

= 7/20

[Eliminating the similar values from numerator and denominator]

= 0.35

Hence the probability of event A given the event B is 0.35 or 7/20.

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complete question:

Probabilities for two events, event A and event B, are given.

P(A and B) = 0.14

P(B) = 0.4

What is the probability of event A given B?

Hint: Probability of A given B = P(A and B) divided by P(B)

*100 points*

The one-to-one functions g and h are defined as follows. g={(-5, 9), (−1, 8), (4, −8), (9, −9)} h(x)=2x−3 Find the following. - 1 8₁¹ (9) = [ 0 g - 1 n 4²¹(x) = [ 0 (non ¹) (-9) = [] 0 0

Answers

We begin with the function g and use the provided functions to determine the values.

1. We check for the corresponding input value in g, which is -1, in order to find g-1(8). As a result, [tex]g(-1,8) = 1.2[/tex]. Since the 21st power operation is not specified in the formula 421(x), we can simplify it to 42. When we plug this into g, we discover that [tex]g(42) = g(16) = -8.3[/tex]. Next, we modify the function h(x) by 9 to find h(-9). Thus, h(-9) = 2(-9) - 3 = -21.4. Finally, we evaluate g(0) and h(0) when both inputs are 0. However, the value of g(0) is undefined because g does not have an input of 0. h(0), however, is equal to 2(0) - 3 =

-3.

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the number of rabbits in elkgrove doubles every month. there are 20 rabbits present initially.

Answers

There will be 160 rabbits after three months And so on. So, we have used the exponential growth formula to find the number of rabbits in Elkgrove. After one month, there will be 40 rabbits.

Given that the number of rabbits in Elkgrove doubles every month and there are 20 rabbits present initially. In order to determine the number of rabbits in Elkgrove, we need to use an exponential growth formula which is given byA = P(1 + r)ⁿ where A is the final amount P is the initial amount r is the growth rate n is the number of time periods .

Let the number of months be n. If the number of rabbits doubles every month, then the growth rate (r) = 2. Therefore, the formula becomes A = 20(1 + 2)ⁿ.

Simplifying this expression, we get A = 20(2)ⁿA = 20 x 2ⁿTo find the number of rabbits after one month, substitute n = 1.A = 20 x 2¹A = 20 x 2A = 40 .

Therefore, there will be 40 rabbits after one month.To find the number of rabbits after two months, substitute n = 2.A = 20 x 2²A = 20 x 4A = 80Therefore, there will be 80 rabbits after two months.

To find the number of rabbits after three months, substitute n = 3.A = 20 x 2³A = 20 x 8A = 160. Therefore, there will be 160 rabbits after three months And so on. So, we have used the exponential growth formula to find the number of rabbits in Elkgrove. After one month, there will be 40 rabbits.

After two months, there will be 80 rabbits. After three months, there will be 160 rabbits. The number of rabbits will continue to double every month and we can keep calculating the number of rabbits using this formula.

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Let (-√11,-5) be a point on the terminal side of 0. Find the exact values of sine, sece, and tan 0. 3 0/0 5 sine = 6 Ś 6√11 sece = 11 5√√11 tan 0 11 = X ?

Answers

The exact values of $\sin \theta$, $\sec \theta$, and $\tan \theta$ are $\frac{-5}{6}$, $-\frac{6\sqrt{11}}{11}$, and $\frac{5\sqrt{11}}{11}$ respectively.

Given, Point $(-\sqrt{11}, -5)$ lies on the terminal side of angle $\theta$.

i.e., $x = -\sqrt{11}$ and $y = -5$.

To find the exact values of $\sin \theta$, $\sec \theta$, and $\tan \theta$.

Using Pythagoras theorem, $r = \sqrt{(-\sqrt{11})^2 + (-5)^2} = \sqrt{11 + 25}

= \sqrt{36}

= 6$.

$\sin \theta = \frac{y}{r} = \frac{-5}{6}$ .......(1)

$\sec \theta = \frac{r}{x} = \frac{6}{-\sqrt{11}} = -\frac{6\sqrt{11}}{11}$ .......(2)

$\tan \theta = \frac{y}{x} = \frac{-5}{-\sqrt{11}} = \frac{5\sqrt{11}}{11}$ .......(3)

Hence, the exact values of $\sin \theta$, $\sec \theta$, and $\tan \theta$ are $\frac{-5}{6}$, $-\frac{6\sqrt{11}}{11}$, and $\frac{5\sqrt{11}}{11}$ respectively.

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Question 14 2 Construct a scatter plot and decide if there appears to be a positive correlation, negative correlation, or no correlation. X Y X Y 30 43 750 18 180 37 790 18 520 29 950 11 630 17 960 15

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The data given to construct a scatter plot is shown below: XY 30 43 750 18 180 37 790 18 520 29 950 11 630 17 960 15 The scatter plot for the given data is shown below: In the given scatter plot, it is observed that the data points have an increasing trend from left to right.

Hence, there is a positive correlation between the variables X and Y. When the values of one variable increase with the increase in the values of the other variable, it is a positive correlation. Hence, in the given data, there is a positive correlation between the variables X and Y. The scatter plot can be used to study the nature of the correlation between two variables. The nature of correlation between variables can be either positive, negative, or no correlation.

If the values of one variable increase with the increase in the values of the other variable, then it is a positive correlation. If the values of one variable decrease with the increase in the values of the other variable, then it is a negative correlation. If there is no change in the values of one variable with the increase in the values of the other variable, then there is no correlation.

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find the odds for and the odds against the event rolling a fair die and getting a 6 or 5

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The odds for and against the event of rolling a fair die and getting a 6 or 5 can be found by calculating the probability of the event and its complement. Probability of getting a 6 or 5 on a die = 2/6 = 1/3Probability of not getting a 6 or 5 on a die = 4/6 = 2/3Odds in favor of getting a 6 or 5 on a die can be calculated as the ratio of the probability of getting a 6 or 5 to the probability of not getting a 6 or 5.

Hence, odds in favor of getting a 6 or 5 are (1/3)/(2/3) = 1:2.Odds against getting a 6 or 5 on a die can be calculated as the ratio of the probability of not getting a 6 or 5 to the probability of getting a 6 or 5. Hence, odds against getting a 6 or 5 are (2/3)/(1/3) = 2:1. Thus, the odds in favor of rolling a fair die and getting a 6 or 5 are 1:2, and the odds against it are 2:1.

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3. Using Divergence theorem, evaluate f Eds, where E = xi + yj + zk, over the cube bounded by x = 0, x = 1, y = 0, y = 1, z = 0, z = 1. [6]

Answers

The flux of the vector field E over the given cube is 3.

The Divergence theorem relates the flux of a vector field across a closed surface to the divergence of the vector field within the volume enclosed by that surface. Using the Divergence theorem, we can evaluate the flux of a vector field over a closed surface by integrating the divergence of the field over the enclosed volume.

In this case, the vector field is given by E = xi + yj + zk, and we want to find the flux of this field over the cube bounded by x = 0, x = 1, y = 0, y = 1, z = 0, z = 1. To evaluate the flux using the Divergence theorem, we first need to calculate the divergence of the vector field. The divergence of E is given by: div(E) = ∂x(xi) + ∂y(yj) + ∂z(zk) = 1 + 1 + 1 = 3

Now, we can apply the Divergence theorem: ∬S E · dS = ∭V div(E) dV

The cube is bounded by six surfaces, the integral on the left side of the equation represents the flux of the vector field E over these surfaces. On the right side, we have the triple integral of the divergence of E over the volume of the cube.

As the cube is a unit cube with side length 1, the volume is 1. Therefore, the integral on the right side simply evaluates to the divergence of E multiplied by the volume: ∭V div(E) dV = 3 * 1 = 3

Thus, the flux of the vector field E over the given cube is 3.

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In January 2019, the Dow Jones Industrial Average (DJIA) was
23,138.82. By September 2019, the DJIA was 26,970.71. Construct an
index value for September 2019, using January 2019 as the base (=
100) a

Answers

The index value for September 2019  = (26,970.71 / 23,138.82) x 100Index value = 116.59

The Dow Jones Industrial Average (DJIA) was 23,138.82 in January 2019 and rose to 26,970.71 by September 2019. To construct an index value for September 2019 with January 2019 as the base of 100, you can use the following formula:Index value = (Current value / Base value) x 100Therefore, the index value for September 2019 can be calculated as follows:Index value = (26,970.71 / 23,138.82) x 100Index value = 116.59

AThe Dow Jones Industrial Average (DJIA) is a stock market index that represents the performance of 30 large publicly traded companies in the United States. It is one of the most widely used indicators of the overall health of the US stock market.

In January 2019, the DJIA was 23,138.82, and by September 2019, it had risen to 26,970.71. To construct an index value for September 2019 using January 2019 as the base of 100, you can use the formula given above.The index value is a measure of the relative performance of the DJIA from January 2019 to September 2019.

By setting the index value at 100 for January 2019, we can compare the DJIA's performance over the eight-month period. The index value of 116.59 for September 2019 indicates that the DJIA has grown by 16.59% since January 2019.

This is a strong indication of the strength of the US stock market, as the DJIA is considered to be a reliable indicator of the overall health of the market.the Dow Jones Industrial Average (DJIA) was 23,138.82 in January 2019 and rose to 26,970.71 by September 2019.

The index value for September 2019 can be calculated as 116.59, using January 2019 as the base of 100. This indicates that the DJIA has grown by 16.59% since January 2019, reflecting the strength of the US stock market.

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Find the absolute maximum and minimum, if either exists, for the function on the indicated interval f(x)=x4−4x3−10 (A) [−1,1] (B) [0,4] (C) [−1,2] (A) Find the absolute maximum. Select the correct choice below and, if necossary, fill in the answer boxes to complete your choice A. The absolute maximum, which occurs twice, is at x= and x= (Use ascending order) B. The absolute maximum is at x= C. There is no absolute maximum.

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The absolute maximum and minimum for the function f(x) = x^4 - 4x^3 - 10 are as follows: (A) on the interval [-1,1], there is no absolute maximum; (B) on the interval [0,4], the absolute maximum occurs at x = 2; (C) on the interval [-1,2], the absolute maximum occurs at x = 2.

To find the absolute maximum and minimum of the function, we need to analyze the critical points and the endpoints of the given intervals.
(A) On the interval [-1,1], we first find the critical points by taking the derivative of f(x) and setting it equal to zero: f'(x) = 4x^3 - 12x^2 = 0. Solving this equation, we get x = 0 and x = 3. However, since 3 is not within the interval [-1,1], there are no critical points in the interval. Therefore, we check the endpoints of the interval, which are f(-1) = -14 and f(1) = -12. The function does not have an absolute maximum in this interval.
(B) On the interval [0,4], we find the critical points by setting f'(x) = 0: 4x^3 - 12x^2 = 0. Solving this equation, we find x = 0 and x = 3. However, 0 is not within the interval [0,4]. Therefore, we check the endpoints: f(0) = -10 and f(4) = 26. The absolute maximum occurs at x = 2, where f(2) = 2^4 - 4(2)^3 - 10 = 2.
(C) On the interval [-1,2], we find the critical points by setting f'(x) = 0: 4x^3 - 12x^2 = 0. Solving this equation, we get x = 0 and x = 3. However, 3 is not within the interval [-1,2]. We check the endpoints: f(-1) = -14 and f(2) = -10. The absolute maximum occurs at x = 2, where f(2) = 2^4 - 4(2)^3 - 10 = 2.
Therefore, the answers are: (A) No absolute maximum, (B) Absolute maximum at x = 2, and (C) Absolute maximum at x = 2.

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Let a_(1),a_(2),a_(3),dots, a_(n),dots be an arithmetic sequence. Find a_(13) and S_(23). a_(1)=3,d=8

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To find the 13th term, we use the formula of the nth term of an arithmetic sequence, which is given by an = a1 + (n-1)dwhere,an = nth term of the sequencea1 = first term of the sequenced = common difference of the sequence.

Substituting the given values, we get;a13 = 3 + (13-1)8= 3 + 96= 99Therefore, the 13th term is 99.To find the sum of first 23 terms, we use the formula of the sum of the first n terms of an arithmetic sequence, which is given by Sn = n/2(2a1 + (n-1)d)where,Sn = sum of first n terms of the sequencea1 = first term of the sequenced = common difference of the sequence Substituting the given values, we get;S23 = 23/2(2(3) + (23-1)8)= 23/2(6 + 176)= 23/2 × 182= 2093Therefore, the sum of first 23 terms is 2093.

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Question Homework: Homework 4 18, 6.1.32 39.1 of 44 points Part 2 of 2 Save Points: 0.5 of 1 Assume that a randomly selected subject is given a bone density test. Those test scores are normally distri

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Assuming that a randomly selected subject is given a bone density test, the test scores are normally distributed with a mean score of 85 and a standard deviation of 12.

This means that 68% of subjects have bone density test scores within one standard deviation of the mean, which is between 73 and 97.

The probability of randomly selecting a subject with a bone density test score less than 60 is 0.0062 or 0.62%.

Given: Mean = 85

Standard Deviation = 12

Using the standard normal distribution table, we find that the probability of z being less than -2.08 is 0.0188.

Therefore, the probability of a randomly selected subject being given a bone density test, with a score less than 60 is 0.0188 or 1.88%.

Summary: The given problem is related to the probability of a randomly selected subject being given a bone density test with a score less than 60. Here, we have used the standard normal distribution table to calculate the probability. The calculated probability is 0.0188 or 1.88%.

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Can someone please explain to me why this statement is
false?
As how muhammedsabah would explain this question:
However, I've decided to post a separate question hoping to get
a different response t
c) For any positive value z, it is always true that P(Z > z) > P(T > z), where Z~ N(0,1), and T ~ Taf, for some finite df value. (1 mark)
c) Both normal and t distribution have a symmetric distributi

Answers

Thus, if we choose z to be a negative value instead of a positive value, then we would get the opposite inequality.

The statement "For any positive value z, it is always true that P(Z > z) > P(T > z), where Z~ N(0,1), and T ~ Taf, for some finite df value" is false. This is because both normal and t distributions have a symmetric distribution.

Explanation: Let Z be a random variable that has a standard normal distribution, i.e. Z ~ N(0, 1). Then we have, P(Z > z) = 1 - P(Z < z) = 1 - Φ(z), where Φ is the cumulative distribution function (cdf) of the standard normal distribution. Similarly, let T be a random variable that has a t distribution with n degrees of freedom, i.e. T ~ T(n).Then we have, P(T > z) = 1 - P(T ≤ z) = 1 - F(z), where F is the cdf of the t distribution with n degrees of freedom. The statement "P(Z > z) > P(T > z)" is equivalent to Φ(z) < F(z), for any positive value of z. However, this is not always true. Therefore, the statement is false. The reason for this is that both normal and t distributions have a symmetric distribution. The standard normal distribution is symmetric about the mean of 0, and the t distribution with n degrees of freedom is symmetric about its mean of 0 when n > 1.

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The newly proposed city park is rectangle shaped. Blake drew a scale drawing of the park and used a scale of 1 cm: 20 ft
1) If the width on the scale drawing of the city park is 25 centimeters, what is the actual width of the park?
A) 250 feet
B) 400 feet
C)500 feet
D)750 feet

Answers

Cross-multiplying, we have:1 x = 20 × 25x = 500Therefore, the actual width of the park is 500 feet, which is option C.

The newly proposed city park is rectangle shaped. Blake drew a scale drawing of the park and used a scale of 1 cm: 20 ft.

If the width on the scale drawing of the city park is 25 centimeters, what is the actual width of the park?

If the scale used is 1 cm: 20 ft, it means that 1 cm on the scale drawing represents 20 feet in the actual park.

Using proportions, the width of the park can be calculated as follows:1 cm : 20 ft = 25 cm : x f

twhere x is the actual width of the park.

because it includes an explanation of how to calculate the actual width of the park using proportions and cross-multiplication.

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1) calculate the volume of the air inside the garage in cm3. the area of the garage floor covers a rectangle of 8 m by 8 m and its height is 3 m.

Answers

To calculate the volume of the air inside the garage, we need to multiply the area of the garage floor by its height.

First, let's convert the dimensions from meters to centimeters:

Length of the garage floor = 8 m = 800 cm

Width of the garage floor = 8 m = 800 cm

Height of the garage = 3 m = 300 cm

Now, we can calculate the volume:

Volume = Length × Width × Height

      = 800 cm × 800 cm × 300 cm

      = 192,000,000 cm³

Therefore, the volume of the air inside the garage is 192,000,000 cm³.

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Solve the right triangle Ma no pa (Round to one decimal place as needed.) m (Round to the nearest integer as needed.) m (Round to the nearest integer as needed.) CID n P 125 m N

Answers

The values of $no$ and $pa$ are $no = -28m$ and $pa = 123.6m$, respectively.

Given: $Ma=125m, n=100$We need to find the values of $no$ and $pa.$ We know that, for a right triangle, we can use Pythagoras theorem. According to Pythagoras Theorem, In a right triangle, the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the other two sides.

That is,$$hypotenuse^2 = base^2 + height^2$$Or, $$c^2 = a^2 + b^2$$,

Where c is the hypotenuse and a and b are the base and height respectively.

Here, we have $Ma=125m$ as the hypotenuse. Let's consider $no$ as base and $pa$ as height.

Therefore, from the Pythagoras theorem, we have;$$Ma^2 = no^2 + pa^2$$

Substitute the given values and solve for $no$ and $pa$.$$(125m)^2 = no^2 + pa^2$$We know that $n=100$ and, we can also use the formula of $sin(\theta) = \frac{opposite}{hypotenuse}$ and $cos(\theta) = \frac{adjacent}{hypotenuse}$ to find the values of $no$ and $pa$.

Here, we have; $$sin(\theta) = \frac{pa}{Ma}$$$$cos(\theta) = \frac{no}{Ma}$$

Substituting the given values, we get;$$sin(\theta) = \frac{pa}{125m}$$$$cos(\theta) = \frac{no}{125m}$$

Rearranging the above expressions, we have;$$pa = Ma \cdot sin(\theta)$$$$no = Ma \cdot cos(\theta)$$

Substituting the given values of $Ma = 125m$ and $n = 100$,

we get:$$pa = 125m \cdot sin(100)$$$$no = 125m \cdot cos(100)$$

Therefore, $pa = 123.6m$ (rounded to one decimal place) and $no = -28m$ (rounded to the nearest integer).

Hence, the values of $no$ and $pa$ are $no = -28m$ and $pa = 123.6m$, respectively.

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3. Answer the following two questions (20 points each part is 10 points) a. The orthoclose (potassium feldspar) clay mineral reacts with the HF/HCL mixture according to the following stochiometric reaction equation. For the 3 wt % HF (specific gravity of about 1.152 and MW=20) reacting with orthoclase feldspar (MW = 278.4 and p = 2.65 gr/cc) you are asked to calculate the gravimetric and volumetric dissolving powers Orthoclase (potassium feldspar): KAISI 308 + 14HF + 2H+K+ + AIF + 3SiF4 + 8HO b. A sandstone with a porosity of 0.22 containing 12% (volume) calcite (CaCO3) is to be acidized. If the HCI preflush is to remove all carbonates 36 inches beyond a 0.328-ft radius wellbore before the HF/HC1 stage enters the formationbefore the HF/HC1 stage enters the formation, what minimum preflush volume (gallons of acid solution per foot of formation thickness) is required if the preflush is 15% HCl solution? According to Keynesians, an increase in the money supply will: Select one: a. only increases prices. b. decrease the interest rate and increase investment, aggregate demand, prices, real GDP and employment. c. increase the interest rate and decrease investment, aggregate demand, prices, real GDP and employment. d. decrease the interest rate and decrease investment, aggregate demand, prices, real GDP and employment. (b) Assume that Division A can sell all its production in the open market. Should Division A transfer the goods to Division B? The transfer be made If so, at what price? Save for Later Attempts: 0 of 1 used Submit Answer te .../5 E Question 8 of 30 View Policies Current Attempt in Progress The Blossom Company is a multidivisional company. Its managers have full responsibility for profits and complete autonomy to accept or reject transfers from other divisions. Division A produces a sub-assembly part for which there is a competitive market. Division B currently uses this sub-assembly for a final product that is sold outside at $960. Division A charges Division B the market price of $560 per unit of the part. Unit variable costs are 5424 and $480 for Divisions A and B, respectively The manager of Division B feels that Division A should transfer the part at a lower price than market because at market, Division Bis unable to make a pront. (a) Your answer has been saved, See score details after the due date. Calculate Division B's contribution margin if transfers are made at the market price, and calculate the company's total contribution margin (Enter negative amounts using either a negative sign preceding the number eg.-45 or parentheses es. (45) Division B's contribution margin 80 Company's total contribution margin $ 56 Attempts: 1 of 1 used (b) Assume that Division A can sell all its production in the open market. Should Division A transfer the goods to Division B? The transfer be made If so, at what price? How an organization can impact an employee's motivation using the Four-Drive Theory. Many employees look to the company to provide them with motivation for work. How does the organization you are working ensure they are satisfying all the four drives? the largest employment sector of recent recipients of bachelor's degrees in psychology is... Please answer A, B & CA fan blade rotates with angular velocity given by w.(t)=y-Bt2, where y=5.25 rad/s and B=0.755 rad/s. Part A Calculate the angular acceleration as a function of time t in terms of B and y. Express y A polar curve is given by the equation r=10/^2+1 for 0. What is the instantaneous rate of change of r with respect to when =2 ? 10 Define TL(F") byT(X1, X2. X3, Xn) = (x1,2x2, 3x3...,xn).(a) Find all eigenvalues and eigenvectors of T.(b) Find all invariant subspaces of T.11 Define T: P(R) P(R) by Tp = p. Find all eigenvalues and eigenvectors of T in searches and seizures without a warrant, who has the burden of proof regarding probable causea. the policeb. the defendantc. the courtd. the defense attorney Teduie company bought a new model of motor for its electric power generating plant in 2017. The useful life of the motor was 5 years and the investment was $30,000 in 2017's dollars. The following 5 table shows the savings obtained through the project in actual dollars and the consumer price index numbers for the time period between 2017 and 2022: End of Year Savings Price Index 250 2017 2018 250 2019 275 2020 $10,000 $12,100 $14,641 $19,326.1 $23,384.6 302.5 2021 363 2022 399.3 If the inflation-free interest rate is 15%, determine whether the investment was worthwhile. The correlation coefficient of a set of points is r = 0.8. The standard deviation of the x-coordinates of the points is 2.1, and the standard deviation of the y-coordinates of the points is 1.2. Find the slope of the least-squares line 1. provide the date the company was originally established COMPANY 3M2. where is the 3M COMPANY head office and research and development facilities are located (city and country of each).3. Identify the market(s) the 3M COMPNY operates in (consumer, industrial, government) and identify the goods and/or services it sells.4. Identify the countries the3M COMPANY sells its products in and discuss its international product mix (which of the four options for marketing products overseas does the company use).5. Discuss the 3M COMPANYS international promotion mix that it uses to promote its products and/or services in international markets (publicity, advertising, sales promotion, personal selling).6. Identify the 3M COMPANYS global sales for 2020 or 2021 (provide latest information that is available).Expert Answer For an n-type semiconductora) Concentrationelectrons < concentrationholesb) Concentrationelectrons = concentrationholesc) Concentrationelectrons > concentrationholes What would it take for you to be excited about an organizationalchange? Discuss three things that would change your whole attitudeabout going through the change process. All of following are organs of the shar`ah governance system... All of following are organs of the shari'ah governance system EXCEPT: a) Islamic Banking Associations b) Shariah supervisory board at the micro level c) Shari ah supervisory council of the central bank at the macro level d) internal Shari'ah compliance unit 11. Larrodev Enterprises provides you with the following information as it relates to its business operation. Compute the appropriate allowances and charges for the years of assessment 2018 2021 in respect to the following. The company makes up accounts as at 31 December each year. Compute any balancing allowance/charge for assets dispose of in 2021. PURCHASES DURING 2018 1 July Industrial Building (block, steel and cement), 8,500,000 including cost of land $1,500,000 1 July-Plant and Machinery (used in production) 3,000,0001 September - Office equipment 1,500,0001 April - Non-industrial building (wooden structure) 5,000,00001 July-Delivery Truck- Business use 60% and private use 40% 4,000,0001 October- Private motor vehicle 4,000,000Exchange rate USSI:JS120 DISPOSAL DURING 2021 1 June - Office Equipment 2,000,0001 August - Non-Industrial 1,800,000-1 October - Trade Vehicle 2,800,000 11 of 3011 of 30 QuestionsQuestionA baker makes peanut butter cookies and chocolate chip cookies.She needs 2 cups of flour and 34 cup of butter to make one batch of peanut butter cookies.She needs 3 cups of flour and 1 cup of butter to make one batch of chocolate chip cookies.If the baker has 26 cups of flour and 9 cups of butter, how many batches of each type of cookie can she make? Explain how the matching concept needs to be followed when working out gross profit for a retailer in an accounting period Which human activity requires the most freshwater? a) Irrigation in agriculture b) Industry for manufacturing c) domestic use d) fishing Use the given degree of confidence and sample data to construct a confidence interval for the population proportion p.A survey of 300 union members in New York State reveals that 112 favor the Republican candidate for governor. Construct the 98% confidence interval for the true population proportion of all New York State union members who favor the Republican candidate.