A swim team has 75 members and there is a 12% absentee rate per
team meeting.
Find the probability that at a given meeting, exactly 10 members
are absent.

We will substitute this value of sin²x in our expression which will give;6 tan²x(1 - sin²x)6 tan²x(1 - (1 - cos²x))6 tan²x cos²x.

We need to simplify the given expression which is given below;

6 tan2 x − 6 tan2 x sin2 x

In order to solve this expression, we will first write it in a factored form which will be;

6 tan²x(1 - sin²x)

We know that the identity for sin²x is;sin²x + cos²x = 1

Which can be rearranged to give;

sin²x = 1 - cos²x

Now we will substitute this value of sin²x in our expression which will give;6 tan²x(1 - sin²x)6 tan²x(1 - (1 - cos²x))6 tan²x cos²x.

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The given function is:y = −3 + (1/cos(xx - ²))³ = - 3 + (1/cos(x- ²))³The function is shifted 2 units to the right.Phase shift, P = 2 Final answer:Period: 2πAmplitude: 1 Phase shift: 2

Given function is

y = −3 + (1/cos(xx - ²))³Period:

Period is the distance after which the function will repeat itself. For finding the period of the given function, use the formula:

T = 2π/b

Where T = period and b is the coefficient of x Here the coefficient of x is 1 Period,

T = 2π/1 = 2πAmplitude:

Amplitude of the given function can be determined by observing the graph of the function or it can be calculated using the formula

A = |1/b|

Here b is the coefficient of cosx, which is 1.Amplitude, A = |1/b| = 1Phase Shift:The general form of cosine function is:

y = A cos (bx - c) + d

Here A is the amplitude, b is the coefficient of x, c is the phase shift and d is the vertical shift. Phase shift is the horizontal shift of the graph of the given function.The given function is:

y = −3 + (1/cos(xx - ²))³ = - 3 + (1/cos(x- ²))³

The function is shifted 2 units to the right.Phase shift, P = 2 Final answer:

Period: 2πAmplitude: 1 Phase shift: 2

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Let g be a continuous, positive, decreasing function on [1,oo). We need to compare the values of the integral of the following options provided below:2.BCA3.ABC4.

ASince g is a decreasing function on [1, oo), we can show that ∫[n,n+1] g(x)dx ≥ g(n+1) for every positive integer n.Using this inequality and adding them all up gives us∫1n g(x)dx≥∑n=1∞ g(n)Therefore, the series ∑n=1∞ g(n) diverges (the terms are positive and do not go to zero), so the integral of option BCA is infinite.Option ABC is equal to∫1∞ g(x)dx=∫11g(x)dx+∫12g(x)dx+∫23g(x)dx+⋯+∫n,n+1g(x)dx+⋯

Since g is a positive function, we have 0 ≤∫n,n+1g(x)dx≤g(n)so the integral is bounded below by ∑n=1∞ g(n) which diverges. Thus the integral of option ABC is also infinite.Option A is equal to∫2∞g(x)dx=∫23g(x)dx+⋯+∫n,n+1g(x)dx+⋯and since g is a decreasing function, we have ∫n,n+1g(x)dx≤g(n+1)(n+1−n)=g(n+1)so the integral is bounded above by∑n=1∞g(n+1)(n+1−n)=∑n=1∞g(n+1)which converges since g is a positive, decreasing function. Hence the integral of option A is finite and less than infinity.Option A is less than option BCA and option ABC is infinite.

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The 25th, 50th, and 75th percentiles from the given list of 36 data 12 14 16 18 20 26 28 29 30 32 40 45 47 48 49 50 51 52 54 62 63 78 80 87 89 50th percentile= 28

The percentile is a statistical value that indicates the percentage of a distribution that is equal to or below it.

The steps to calculate percentiles:

Step 1: Arrange the data in ascending order

Step 2: Calculate the position of percentile (P) by using the formula P = (n * x) / 100, where n is the total number of data and x is the percentile.

Step 3: If P is a whole number, find the average of the two values at positions P and P + 1. If P is a decimal number, round up to the next whole number to find the position of the data value

Step 4: Find the value of the data at the Pth position. So the 50th percentile, also called the median, is the middle value of the dataset when it is arranged in ascending order.

From the given list of 36 data:12 14 16 18 20 26 28 29 30 32 40 45 47 48 49 50 51 52 54 62 63 78 80 87 89Since the total number of data is 36.

Find the 50th percentile, we will use the formula as follows:P = (n * x) / 100P = (36 * 50) / 100P = 18The 50th percentile   (or the median) is at the 18th position. Hence, the 50th percentile is 28.

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Therefore, the approximate area of the surface generated by revolving the given curve about the y-axis is 8847.42 square units, rounded to two decimal places.

To find the area of the surface generated by revolving the curve around the y-axis, we can use the formula for the surface area of revolution:

A=2π∫abx(t)(dydt)2+1dtA=2π∫ab​x(t)(dtdy​)2+1

​dt

In this case, the curve is defined by the parametric equations: x(t)=16t3x(t)=16t3 and y(t)=7t−1y(t)=7t−1, where 1≤t≤21≤t≤2.

First, let's find dxdtdtdx​ and dydtdtdy​:

dxdt=48t2dtdx​=48t2

dydt=7dtdy​=7

Now we can substitute these values into the formula and integrate:

A=2π∫1216t3(48t2)2+1dtA=2π∫12​16t3(48t2)2+1

​dt

Simplifying further:

A=2π∫1216t32304t4+1dtA=2π∫12​16t32304t4+1

​dt

To evaluate this integral, numerical methods or specialized software are typically used. Since this is a complex calculation, let's use a numerical integration method such as Simpson's rule to approximate the result.

Approximating the integral using Simpson's rule, we get:

A≈2π(163t42304t4+1)∣12A≈2π(316​t42304t4+1

​)∣

∣​12​

A≈2π(163(24)2304(24)+1−163(14)2304(14)+1)A≈2π(316​(24)2304(24)+1

​−316​(14)2304(14)+1

A≈2π(163(16)2304(16)+1−163(1)2304(1)+1)A≈2π(316​(16)2304(16)+1

​−316​(1)2304(1)+1

​)

Now we can calculate this expression:

A≈2π(256336865−1632305)A≈2π(3256​36865

​−316​2305

Using a calculator, we can find the decimal approximation:

A≈2π(1517.28−108.74)A≈2π(1517.28−108.74)

A≈2π×1408.54A≈2π×1408.54

A≈8847.42A≈8847.42

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Therefore, the area of the region R is A = -10.5/3 square units.

To find the area of the region bounded by the functions[tex]f(x) = x^2 - 3x - 3[/tex] and g(x) = -2x + 3, we need to determine the points of intersection between the two functions.

Setting f(x) equal to g(x), we have:

[tex]x^2 - 3x - 3 = -2x + 3[/tex]

Rearranging the equation and simplifying:

[tex]x^2 - x - 6 = 0[/tex]

Factoring the quadratic equation:

(x - 3)(x + 2) = 0

This gives us two solutions: x = 3 and x = -2.

To find the area, we integrate the difference between the two functions over the interval [x = -2, x = 3]:

A = ∫[from -2 to 3] (f(x) - g(x)) dx

Substituting the functions:

A = ∫[from -2 to 3] [tex]((x^2 - 3x - 3) - (-2x + 3)) dx[/tex]

Simplifying:

A = ∫[from -2 to 3] [tex](x^2 + x - 6) dx[/tex]

Integrating the polynomial:

A =[tex][(1/3)x^3 + (1/2)x^2 - 6x][/tex] [from -2 to 3]

Evaluating the integral:

[tex]A = [(1/3)(3^3) + (1/2)(3^2) - 6(3)] - [(1/3)(-2^3) + (1/2)(-2^2) - 6(-2)][/tex]

Simplifying further:

A = [(1/3)(27) + (1/2)(9) - 18] - [(1/3)(-8) + (1/2)(4) + 12]

A = [9 + 4.5 - 18] - [-8/3 - 2 + 12]

A = 4.5 - (8/3) + 2 - 12

A = -3.5 - (8/3)

A = -10.5/3

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Given the complex numbers x = 3 + 8i and y = 7 - i, we can match them with equivalent expressions. By substituting these values into the expressions.

we find that - x - y is equivalent to -8 - 41i, - 2x - 3y is equivalent to -15 + 19i, - 5x + y is equivalent to 58 + 106i, and - x - 2y is equivalent to -29 - 53i. These matches are determined by performing the respective operations on the complex numbers and simplifying the results.

Matching the equivalent expressions:

x - y matches -8 - 41i

2x - 3y matches -15 + 19i

5x + y matches 58 + 106i

x - 2y matches -29 - 53i

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The probability that among 5 adults with smartphones, all 5 use them in meetings or classes is 0.00221 (rounded to five decimal places).Therefore, the answer is 0.00221.

The required answer to the given question is as follows: Given Data: It is given that when adults with smartphones are randomly selected, 44% use them in meetings or classes.

We have to calculate the probability that among 5 adults with smartphones, all 5 use them in meetings or classes.

Concept Used: Here we use the concept of probability of Independent events which states that if the probability of occurrence of one event does not affect the probability of occurrence of the other event then the events are known as Independent events.

Formula Used: The formula used for probability of Independent events is: P(A and B) = P(A) x P(B) Where, P(A and B) represents the probability of occurrence of both A and BP(A) represents the probability of occurrence of A. P(B) represents the probability of occurrence of B.

Calculation: Given that when adults with smartphones are randomly selected, 44% use them in meetings or classes. The probability that a person use the smartphones in meeting or class is 44/100 = 0.44So, the probability that a person does not use the smartphones in meeting or class is 1 - 0.44 = 0.56

Now, we need to find the probability that among 5 adults with smartphones, all 5 use them in meetings or classes. So, we can say that these are Independent events. Now, P(A and B and C and D and E) = P(A) x P(B) x P(C) x P(D) x P(E) = 0.44 x 0.44 x 0.44 x 0.44 x 0.44 = 0.00221

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Here's the LaTeX representation of the explanation:

To determine whether the series [tex]$\sum \frac{\arctan(10n)}{n^{1.3}}$[/tex] converges or diverges, we can use the limit comparison test.

Let's consider the series [tex]$\sum \frac{1}{n^{1.3}}$[/tex] . This is a [tex]$p$[/tex]-series with [tex]$p = 1.3$[/tex] , and we know that a [tex]$p$[/tex]-series converges if [tex]$p > 1$[/tex] and diverges if [tex]$p \leq 1$.[/tex]

Now, let's take the limit as [tex]$n$[/tex] approaches infinity of the ratio of the terms of the given series to the terms of the series  [tex]$\frac{1}{n^{1.3}}$[/tex]  :

[tex]\[\lim_{n \to \infty} \frac{\frac{\arctan(10n)}{n^{1.3}}}{\frac{1}{n^{1.3}}}\][/tex]

Simplifying this limit, we get:

[tex]\[\lim_{n \to \infty} \arctan(10n)\][/tex]

As [tex]$n$[/tex] approaches infinity, [tex]$\arctan(10n)$[/tex] also approaches infinity. Therefore, the limit is infinity.

Since the limit is not zero or a finite value, and the terms of the series do not approach zero, we can conclude that the given series diverges.

Therefore, the series [tex]$\sum \frac{\arctan(10n)}{n^{1.3}}$[/tex] diverges.

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Here, the set contains the zero vector (since 0 can be represented as 0v1​+0v2​+...+0vp​). Therefore, the given statement is true

The statement "Given vectors v1​…,vp​ in Rn, the set of all linear combinations of these vectors is a subspace of Rn." is True.

Explanation: The set of all linear combinations of vectors v1​, v2​,..., vp​ in Rn is known as Span(v1​,v2​,...,vp​).

Here, we have to check whether the set of all linear combinations of these vectors is a subspace of Rn or not.

Now, to check this, we have to see if the set satisfies the following three properties:

It contains the zero vector. It is closed under addition. It is closed under scalar multiplication. It can be proved that:

If v1, v2, ..., vp are vectors in Rn, then Span(v1, v2, ..., vp) is a subspace of Rn..

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A. The probability density function of Tn is not ne⁻ⁿ(¹⁻⁰)as proposed.

B. E(Tn) = (16)ⁿ/ₙ, which is not equal to 0 + 1/n.

C. Tn is a minimum variance unbiased estimator of θ = μ₁ = 16.

(a) To determine the probability density function (pdf) of Tn, find the cumulative distribution function (CDF) and then differentiate it.

The CDF of Tn can be calculated as follows:

F(t) = P(Tn ≤ t) = 1 - P(Tn > t)

Since Tn is the minimum of X1, X2, ..., Xn, we have:

P(Tn > t) = P(X1 > t, X2 > t, ..., Xn > t)

Using the independence of the random variables, we can write:

P(Tn > t) = P(X1 > t) × P(X2 > t) × ... × P(Xn > t)

Since X1, X2, ..., Xn are sampled from the given pdf f(x), we have:

P(Xi > t) = ∫[t, ∞] f(x) dx

Substituting the given pdf, we get:

P(Xi > t) = ∫[t, ∞] (-16e⁻(ˣ⁻⁰)) dx

= -16 ∫[t, ∞] e⁻ˣ dx

= -16e⁻ˣ ∣ [t, ∞]

= -16e⁻ᵗ

Therefore:

P(Tn > t) = (-16e⁻ᵗ)ⁿ

= (-16)ⁿ × e⁻ⁿᵗ

Finally, we can calculate the CDF of Tn:

F(t) = 1 - P(Tn > t)

= 1 - (-16)ⁿ × e⁻ⁿᵗ

= 1 + (16)ⁿ × e⁻ⁿᵗ

To find the pdf of Tn, we differentiate the CDF:

g(t) = d/dt [F(t)]

= d/dt [1 + (16)ⁿ × e⁻ⁿᵗ

= (-n)(16)ⁿ * e⁻ⁿᵗ

Therefore, the pdf of Tn is given by:

g(t) = (-n)(16)ⁿ × e-ⁿᵗ, t ≥ 0

0, otherwise

Hence, the probability density function of Tn is not ne⁻ⁿ(¹⁻⁰) as proposed.

(b) To find E(Tn), calculate the expected value of Tn using its pdf.

E(Tn) = ∫[0, ∞] t × g(t) dt

= ∫[0, ∞] t × (-n)(16)ⁿ × e(⁻ⁿᵗ) dt

By integrating by parts, we obtain:

E(Tn) = [-t × (16)ⁿ × e⁻ⁿᵗ] ∣ [0, ∞] + ∫[0, ∞] (16)ⁿ × e⁻ⁿᵗ) dt

= [0 - (-16)ⁿ × eⁿ∞] + ∫[0, ∞] (16)ⁿ × e⁻ⁿᵗ dt

= [0 + 0] + ∫[0, ∞] (16)ⁿ × e⁻ⁿᵗ dt

The term (16)ⁿ is a constant, so we can move it outside the integral:

E(Tn) = (16)ⁿ × ∫[0, ∞] e⁻ⁿᵗ dt

Next, we integrate with respect to t:

E(Tn) = (16)ⁿ × [(-1/n) × e⁻ⁿᵗ)] ∣ [0, ∞]

= (16)ⁿ × [(-1/n) × (e⁻ⁿ∞) - e⁰))]

= (16)ⁿ × [0 - (-1/n)]

= (16)ⁿ/ⁿ

Therefore, E(Tn) = (16)ⁿ/ⁿ, which is not equal to 0 + 1/n.

(c) To find a minimum variance unbiased estimator of 0, we can use the method of moments.

The first moment of the given pdf f(x) is:

μ₁ = E(X) = ∫[0, ∞] x × (-16e⁻(ˣ⁻⁰)) dx

= ∫[0, ∞] -16x × eˣ dx

By integrating by parts, we have:

μ₁ = [-16x × (-e⁻ˣ)] ∣ [0, ∞] + ∫[0, ∞] 16 × e⁻ˣ dx

= [0 + 0] + 16 ∫[0, ∞] e⁻ˣ dx

= 16 × [e⁻ˣ] ∣ [0, ∞]

= 16 × [0 - e⁰]

= 16

The first moment μ₁ is equal to 16.

Now, we equate the sample mean to the population mean and solve for θ:

(1/n) * Σᵢ Xᵢ = μ₁

(1/n) * (X₁ + X₂ + ... + Xn) = 16

X₁ + X₂ + ... + Xn = 16n

T₁ + T₂ + ... + Tn = 16n

Since Tn is a complete sufficient statistic, it is also an unbiased estimator of μ₁.

Therefore, Tn is a minimum variance unbiased estimator of θ = μ₁ = 16.

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The complete question goes thus:

Let X₁, X2, X3,..., X,, be a random sample from a distribution with probability density function: f (x 10) = - 16 e-(x-0) if x ≥ 0, otherwise. Let Tn min{X1, X2,..., Xn). = Given: T,, is a complete sufficient statistic for 0. (a) Prove or disprove that the probability density function of T, is ne-n(1-0) ift ≥0, g(110) = = {₁ 0 otherwise. (6) (b) Prove or disprove that E(T) = 0 + ¹. (7) n (c) Find a minimum variance unbiased estimator of 0. Justify your answer: (3)

Ahmed rolls a die twice and added the face values. Compute the following: i) The probability that the sum is greater than 8 is ii) The probability that the sum is an even number is.

In order to solve the problem we are given, let’s find out all the possible outcomes of Ahmed rolling a die twice. In rolling a die once, the probability of getting any number from 1 to 6 is 1/6 each. Therefore, in rolling a die twice, we have 6 × 6 = 36 possible outcomes.Explanation:We need to find the probability that the sum is greater than 8. Now, let’s see what pairs of numbers will give us a sum greater than 8.

These are: (3, 6), (4, 5), (5, 4), and (6, 3). So there are 4 such pairs and each pair can occur in two ways, giving a total of 8 ways for the sum to be greater than 8.  the probability of getting a sum greater than 8 is: 8/36 = 2/9Now, we need to find the probability that the sum is an even number. Let’s see what pairs of numbers will give us an even sum. These are: (1, 1), (1, 3), (1, 5), (2, 2), (2, 4), (2, 6), (3, 1), (3, 3), (3, 5), (4, 2), (4, 4), (4, 6), (5, 1), (5, 3), (5, 5), (6, 2), (6, 4), and (6, 6).

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i) The probability that the sum is greater than 8 is 5/18.

ii) The probability that the sum is an even number is 1/2.

To compute the probabilities requested, we need to consider all the possible outcomes of rolling a die twice and summing the face values.

There are a total of 36 equally likely outcomes when rolling a die twice (6 possibilities for the first roll and 6 possibilities for the second roll). Let's analyze each case:

i) The probability that the sum is greater than 8:

The possible outcomes with a sum greater than 8 are:

{(3, 6), (4, 5), (4, 6), (5, 4), (5, 5), (5, 6), (6, 3), (6, 4), (6, 5), (6, 6)}

There are 10 favorable outcomes. Therefore, the probability is given by:

P(sum > 8) = 10/36 = 5/18

ii) The probability that the sum is an even number:

The possible outcomes with an even sum are:

{(1, 1), (1, 3), (1, 5), (2, 2), (2, 4), (2, 6), (3, 1), (3, 3), (3, 5), (4, 2), (4, 4), (4, 6), (5, 1), (5, 3), (5, 5), (6, 2), (6, 4), (6, 6)}

There are 18 favorable outcomes. Therefore, the probability is given by:

P(sum is even) = 18/36 = 1/2

To summarize:

i) The probability that the sum is greater than 8 is 5/18.

ii) The probability that the sum is an even number is 1/2.

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We compare the calculated F-statistic with the critical value from the F-distribution table for the desired significance level and degrees of freedom.

To test the null hypothesis regarding the equality of variances between two populations, we use the F-test. The F-statistic is calculated as the ratio of the sample variances.

Given the following information:

Population A:

Sample size (n1) = 24

Sample variance (S21) = 130.1

Population B:

Sample size (n2) = 24

Sample variance (S22) = 114.8

The F-statistic is calculated as:

F = S21 / S22

Plugging in the values:

F = 130.1 / 114.8 ≈ 1.133

To test the null hypothesis, we compare the calculated F-statistic with the critical value from the F-distribution table for the desired significance level and degrees of freedom.

Based on the provided information, the F-statistic is approximately 1.133. To determine whether the null hypothesis can be rejected or not, we need the critical value from the F-distribution table or the p-value associated with this F-statistic.

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A table of percentiles that takes sample size into consideration is not required.Therefore, option C is not right when the sample kurtosis coefficient in Excel is negative.

If the sample kurtosis coefficient in Excel is negative, we can make certain inferences. These are the inferences we can make if the sample kurtosis coefficient in Excel is negative:We know that the population is platykurtic. When the sample kurtosis coefficient is negative, the distribution is flat-topped, which means that there are fewer outliers in the distribution. As a result, the population is platykurtic.

We can deduce that the population is flat and that there are fewer extreme values (tails) than a normal distribution.We know that the population is leptokurtic. When a sample kurtosis coefficient is negative, the tails of the population distribution are shorter than the tails of a normal distribution, indicating that the population is leptokurtic. It has more values than a standard normal distribution that fall in the extreme ranges.

We should consult a table of percentiles that takes sample size into consideration. There is no need to seek a table of percentiles that takes sample size into consideration. Because the sample kurtosis coefficient is negative, we can infer that the population is either platykurtic or leptokurtic.  Thus, option C is the incorrect option.

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When testing the null hypothesis, the confidence interval helps us to determine how certain we can be about the population mean or proportion.

The confidence interval (CI) represents the range of values that we are reasonably certain contains the population parameter. When we compute a 95% CI, we have a degree of confidence that the parameter lies in the range of values represented by the interval. We are given that we are testing the null hypothesis that there is no linear relationship between two variables, X and Y. From the sample of n = 18, we determine that b1 = 4.8 and Sb1 = 1.2.

Now, we need to construct a 95% confidence interval. Here's how we can do it:Let us assume the level of significance as α = 0.05 which implies a confidence level of 95%.The formula for the confidence interval is given as,

b1 ± tα/2.Sb1/√n

Here, the degrees of freedom

(df) = n - 2 = 18 - 2 = 16

The value of tα/2 with

df = 16 at 0.05

level of significance is 2.120.Using the formula, the 95% confidence interval for b1 can be calculated as follows:

b1 ± tα/2.Sb1/√n= 4.8 ± 2.120 × 1.2 / √18= 4.8 ± 1.27.

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The solution set over the interval [0°, 360°) is {120°, 240°}. The correct choice is (c) {120°, 240°}.

The given equation is csc²θ + 2 cotθ = 0 over the interval [0°, 360°).

To solve this equation, we first need to simplify it using trigonometric identities as follows:

csc²θ + 2 cotθ

= 0(1/sin²θ) + 2(cosθ/sinθ)

= 0(1 + 2cosθ)/sin²θ = 0

We can then multiply both sides by sin²θ to get:

1 + 2cosθ = 0

Now, we can solve for cosθ as follows:

2cosθ = -1cosθ

= -1/2

We know that cosθ = 1/2 at θ = 60° and θ = 300° in the interval [0°, 360°).

However, we have cosθ = -1/2, which is negative and corresponds to angles in the second and third quadrants. To find the solutions in the interval [0°, 360°), we can use the following formula: θ = 180° ± αwhere α is the reference angle. In this case, the reference angle is 60°.

So, the solutions are:θ = 180° + 60° = 240°θ = 180° - 60° = 120°

Therefore, the solution set over the interval [0°, 360°) is {120°, 240°}. The correct choice is (c) {120°, 240°}.

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The range of the data set is the difference between the largest and smallest values. In order to find the range of a sample of size n = 10, we need to first identify the largest and smallest values in the sample.

The data set is shown below: 80.4 112.4 73.4 98.4 112.4 95.8 101.4 93.3 89 112.4.

The smallest value in the sample is 73.4 and the largest value in the sample is 112.4.

Therefore, the range of the data set is: range = 112.4 - 73.4 = 39.0.

The standard deviation of a sample is a measure of the amount of variation or dispersion of the sample values from the mean value.

The formula for the standard deviation of a sample is: SD = sqrt [ Σ ( xi - x )2 / ( n - 1 ) ], where: x is the sample mean xi is the ith value in the sample sqrt is the square root Σ is the sum of all values from i = 1 to n, SD is the standard deviation, n is the sample size.

We can use this formula to find the standard deviation of the data set. However, since the sample size is small (n = 10), we should use the corrected sample standard deviation formula, which is: SD = sqrt [ Σ ( xi - x )2 / ( n - k ) ], where: k is the number of parameters estimated from the sample (in this case, k = 1 because we estimated the sample mean).

Therefore, we have:

SD = sqrt [ Σ ( xi - x )2 / ( n - 1 ) ]

SD = sqrt [ ( ( 80.4 - 97.5 )2 + ( 112.4 - 97.5 )2 + ... + ( 112.4 - 97.5 )2 ) / ( 10 - 1 ) ]

SD = sqrt [ 5093.31 / 9 ]

SD = sqrt [ 565.92 ]

SD = 23.79

Therefore, the standard deviation of the data set is approximately 23.79.

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To calculate the volume of a right circular cylinder, we can use the formula:

Volume = π * r^2 * h

Where:

π is the mathematical constant pi (approximately 3.14159)

r is the radius of the base of the cylinder (half the diameter)

h is the height of the cylinder

Given:

Base diameter = 6 m

Radius (r) = (base diameter) / 2 = 6 m / 2 = 3 m

Height (h) = 5 m

Substituting the values into the formula, we have:

Volume = π * (3 m)^2 * 5 m

= π * 9 m^2 * 5 m

= π * 45 m^3

Therefore, the volume of the cylinder is 45π cubic meters.

the volume of the right circular cylinder with a base diameter of 6 m and a height of 5 m is 45π m³ By using formula of

V = πr²h

The volume of a right circular cylinder with a base diameter of 6 m and a height of 5 m is given by:V = πr²hwhere r is the radius of the cylinder and h is the height of the cylinder. Since the base diameter of the cylinder is given as 6 m, we can find the radius by dividing it by 2:r = d/2 = 6/2 = 3 m Therefore, the volume of the cylinder is:V = π(3 m)²(5 m)V = π(9 m²)(5 m)V = 45π m³Therefore, the volume of the right circular cylinder with a base diameter of 6 m and a height of 5 m is 45π m³.

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Answer:

4)a. A = π(3²) = 9π

b. h = 10

c. V = 9π(10) = 90π

To find the covariance between X and Y, we need to use the joint moment generating function (MGF) and the properties of MGFs.

The joint MGF MX,Y(t1, t2) is given as:

[tex]MX,Y(t1, t2) = \frac{1}{3}(1 + e^{t1 + 2t2} + e^{2t1 + t2})[/tex]

To find the covariance, we need to differentiate the joint MGF twice with respect to t1 and t2, and then evaluate it at t1 = 0 and t2 = 0.

First, let's differentiate MX,Y(t1, t2) with respect to t1:

[tex]\frac{\partial^2(MX,Y(t1, t2))}{\partial t1^2} = \frac{\partial}{\partial t1}\left(\frac{\partial(MX,Y(t1, t2))}{\partial t1}\right)\\\\= \frac{\partial}{\partial t_1} \left(\frac{\partial}{\partial t_1} \left(\frac{1}{3} (1 + e^{t_1 + 2t_2} + e^{2t_1 + t_2})\right)\right)\\\\= \frac{\partial}{\partial t1}\left(\frac{1}{3}(2e^{t1 + 2t2} + 2e^{2t1 + t2})\right)\\\\= \frac{2}{3}(2e^{t1 + 2t2} + 4e^{2t1 + t2})[/tex]

Now, let's differentiate MX,Y(t1, t2) with respect to t2:

[tex]\frac{\partial^2(MX,Y(t1, t2))}{\partial t2^2} = \frac{\partial}{\partial t2}\left(\frac{\partial(MX,Y(t1, t2))}{\partial t2}\right)\\\\= \frac{\partial}{\partial t_2} \left(\frac{\partial}{\partial t_2} \left(\frac{1}{3} (1 + e^{t_1 + 2t_2} + e^{2t_1 + t_2})\right)\right)\\\\= \frac{\partial}{\partial t2}\left(\frac{1}{3}(4e^{t1 + 2t2} + 2e^{2t1 + t2})\right)\\\\= \frac{2}{3}(4e^{t1 + 2t2} + 2e^{2t1 + t2})[/tex]

Now, we can evaluate the second derivatives at t1 = 0 and t2 = 0:

[tex]\frac{\partial^2(MX,Y(t1, t2))}{\partial t1^2} = \frac{2}{3}(2e^{0 + 2(0)} + 4e^{2(0) + 0})\\\\= \frac{2}{3}(2 + 4)\\\\= 2\\\\\\\frac{\partial^2(MX,Y(t1, t2))}{\partial t2^2} = \frac{2}{3}(4e^{0 + 2(0)} + 2e^{2(0) + 0})\\\\= \frac{2}{3}(4 + 2)\\\\= \frac{4}{3}[/tex]

Finally, the covariance between X and Y is given by:

[tex]Cov(X, Y) = \frac{\partial^2(MX,Y(t1, t2))}{\partial t1^2} - \frac{\partial^2(MX,Y(t1, t2))}{\partial t2^2}\\\\= 2 - \frac{4}{3}\\\\= \frac{6}{3} - \frac{4}{3}\\\\= \frac{2}{3}[/tex]

Therefore, the covariance between X and Y is [tex]\frac{2}{3}[/tex].

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The mean of the random variable is approximately 1.935 and the variance is approximately 0.763.

To determine the mean (μ) and variance (σ²) of a random variable with the given probability mass function, we use the following formulas:

Mean (μ) = ∑(x * P(x))

Variance (σ²) = ∑((x - μ)² * P(x))

In this case, the probability mass function is given by f(x) = (125/31)(1/5), for x = 1, 2, 3.

Let's calculate the mean (μ) first:

μ = (1 * P(1)) + (2 * P(2)) + (3 * P(3))

Substituting the values of the probability mass function, we have:

[tex]\[\mu = \frac{125}{31} \cdot \frac{1}{5} \cdot (1 + 2 + 3)\][/tex]

[tex]\[\mu = \frac{125}{31} \cdot \frac{1}{5} \cdot (6)\][/tex]

μ ≈ 1.935

Therefore, the mean (μ) of the random variable is approximately 1.935.

Now, let's calculate the variance (σ²):

σ² = (1 - μ)² * P(1) + (2 - μ)² * P(2) + (3 - μ)² * P(3)

Substituting the values of the probability mass function and the mean (μ), we have:

[tex][\sigma^2 = \left( (1 - 1.935)^2 \cdot \frac{125}{31} \cdot \frac{1}{5} \right) + \left( (2 - 1.935)^2 \cdot \frac{125}{31} \cdot \frac{1}{5} \right) + \left( (3 - 1.935)^2 \cdot \frac{125}{31} \cdot \frac{1}{5} \right)][/tex]

σ² ≈ 0.763

Therefore, the variance (σ²) of the random variable is approximately 0.763.

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To find the probability that x is greater than or equal to 62.48, we can use the standard normal distribution. First, we need to standardize the value of 62.48 using the z-score formula:

z = (x - μ) / σ

Where x is the value, μ is the mean, and σ is the standard deviation.

In this case, we have:

x = 62.48

μ = 20

σ = 18

z = (62.48 - 20) / 18

z = 2.36

Now, we can find the probability using a standard normal distribution table or a calculator. The probability of x being greater than or equal to 62.48 is the same as the probability of z being greater than or equal to 2.36.

Using a standard normal distribution table or calculator, we find that the probability is approximately 0.0091 or 0.91%.

Therefore, p(x ≥ 62.48) is approximately 0.0091 or 0.91%.

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The slope of the line passing through the following points are:

1. The slope of the line passing through point (5, 14) and (19, 7) can be obtain as follow:

m = (y₂ - y₁) / (x₂ - x₁)

= (7 - 14) / (19 - 5)

= -7 / 14

= -1/2

2. The slope of the line passing through point  (-10, 2) and (-10, 4) can be obtain as follow:

m = (y₂ - y₁) / (x₂ - x₁)

= (4 - 2) / (10 - -10)

= 2 / 20

= 1/10

3. The slope of the line passing through point (-3, -3) and (15, 13) can be obtain as follow:

m = (y₂ - y₁) / (x₂ - x₁)

= (13 - -3) / (15 - -3)

= 16 / 18

= 8/9

4. The slope of the line passing through point (-1/2, 1/7) and (-3/2, 2/7)​ can be obtain as follow:

m = (y₂ - y₁) / (x₂ - x₁)

= (2/7 - 1/7) / (-3/2 - -1/2)

= 1/7 ÷ -1

= -1/7

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-1 is the z-score corresponding to a raw score of 32 from a population.

To find which Z-score could correspond to a raw score of 32 from a population with a mean of 33, we can use the Z-score formula, which is:

Z = (X - μ) / σ

Where:

Z is the Z-score

X is the raw score

μ is the population mean

σ is the population standard deviation

First, we need to know the Z-score corresponding to the raw score of 33 (since that is the population mean). Then, we can use that Z-score to find the Z-score corresponding to the raw score of 32.

Here's how to solve the problem:

Z for a raw score of 33:

Z = (X - μ) / σ

Z = (33 - 33) / σ

Z = 0 / σ

Z = 0

This means that a raw score of 33 has a Z-score of 0.

Now we can use this Z-score to find the Z-score for a raw score of 32:

Z = (X - μ) / σ

0 = (32 - 33) / σ

0 = -1 / σ

σ = -1

This tells us that the Z-score corresponding to a raw score of 32 from a population with a mean of 33 is -1.

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a. The experiment fits into the Hypergeometric distribution.

b. The probability of finding no faulty parts is 0.0746 or 7.46%.

c. The probability of finding two faulty products is 0.4336 or 43.36%.

a. The experiment fits into the Hypergeometric distribution because it involves sampling without replacement from a finite population (100 products) that contains both defective (5 faulty products) and non-defective items (95 non-faulty products). The Hypergeometric distribution is appropriate when the sampling is done without replacement and the population size is small relative to the sample size.

b. To calculate the probability of finding no faulty parts, we use the Hypergeometric distribution formula:

P(X = 0) = (C(5, 0) * C(95, 5)) / C(100, 5)

where C(n, r) represents the combination function.

Calculating this formula, we find:

P(X = 0) = (1 * 1,221) / 75,287 = 0.0162 ≈ 0.0746 or 7.46%.

c. To calculate the probability of finding two faulty products, we again use the Hypergeometric distribution formula:

P(X = 2) = (C(5, 2) * C(95, 3)) / C(100, 5)

Calculating this formula, we find:

P(X = 2) = (10 * 14,070) / 75,287 = 0.2088 ≈ 0.4336 or 43.36%.

a. The experiment fits into the Hypergeometric distribution because it involves sampling without replacement from a finite population.

b. The probability of finding no faulty parts is approximately 0.0746 or 7.46%.

c. The probability of finding two faulty products is approximately 0.4336 or 43.36%.

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The given differential equation is: y'' − 14y' + 40y = 0. To find the two values of k for which y(x) = ekx is a solution of the differential equation, we first differentiate y(x) twice. We get y'(x) = ekxk and y''(x) = ekxk2. Now we substitute these values in the differential equation and get;ekxk2 − 14ekxk + 40ekxk = 0ekxk [k2 − 14k + 40] = 0k2 − 14k + 40 = 0Solving this quadratic equation gives us;k = 7 ± √9.

The two values of k are; Smaller value = 7 − √9Larger value = 7 + √9Now we need to simplify this further. We know that √9 = 3Therefore,Smaller value = 7 − 3 = 4Larger value = 7 + 3 = 10Therefore, the two values of k for which y(x) = ekx is a solution of the differential equation y'' − 14y' + 40y = 0 are 4 and 10. The smaller value is 4 and the larger value is 10.

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Given the function y(t) = 5sin 4t + 3cos 4t. We need to rewrite it in terms of a cosine term only and sine term only.a) a cosine term only We can use the formula of sin (a + b) = sin a cos b + cos a sin b.

Using this formula, we can write, y(t) = 5sin 4t + 3cos 4t = √34 [√(5/17)sin 4t + √(12/17)cos 4t]We know, cos (90° - θ) = sin θ and sin (90° - θ) = cos θThus, we can rewrite the above equation as,y(t) = √34 [cos (90° - 4t) √(5/17) + sin (90° - 4t) √(12/17)]Thus, y(t) = √34 cos (4t - 0.37)b) a sine term only We can use the formula of cos (a + b) = cos a cos b - sin a sin b.

Using this formula, we can write, y(t) = 5sin 4t + 3cos 4t = √34 [√(12/17)sin 4t - √(5/17)cos 4t]We know, cos (90° - θ) = sin θ and sin (90° - θ) = cos θThus, we can rewrite the above equation as,y(t) = √34 [sin (4t + 1.18) √(12/17)]Thus, y(t) = √408/17 sin (4t + 1.18)The frequency of both sine and cosine functions is equal to 4 rad/s The amplitude of sine function = √408/17 = 2.73The amplitude of cosine function = √34 = 5.83The phase angle of cosine function = 0.37 rad The phase angle of sine function = 1.18 rad.

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There are 4,738,381,338,321,616 valid passwords that can be created using the given restrictions, with a length of 14 characters.

To solve this problem, we need to determine the number of valid passwords that can be created using the given restrictions. The password length is 14, and each character can be either a digit [0-9] or lowercase letter [a-z]. Therefore, the total number of possibilities for each character is 36 (10 digits and 26 letters).

Thus, the total number of valid passwords that can be created is calculated as follows:36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 × 36 = 36¹⁴ Therefore, there are 4,738,381,338,321,616 valid passwords that can be created using the given restrictions, with a length of 14 characters.

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Given function: h(x) = -x³ - 3x² + 15x + 3To find the absolute maximum and minimum BODMAS values on the interval [-6, 3], we need to follow these steps:

critical points of h(x) inside the interval (-6,3).Find all endpoints of the interval (-6,3).Test all the critical points and endpoints to find the absolute maximum and minimum values.Step 1:Finding the critical points of h(x) inside the interval (-6,3):We find the first derivative of h(x):h'(x) = -3x² - 6x + 15Now we equate it to zero to find the critical points: -3x² - 6x + 15 = 0 ⇒ x² + 2x - 5 = 0Using the quadratic formula, we find:x = (-2 ± √(2² - 4·1·(-5))) / (2·1) ⇒ x = (-2 ± √24) / 2 ⇒ x = -1 ± √6There are two critical points inside the interval (-6,3): x1 = -1 - √6 ≈ -3.24 and x2 = -1 + √6 ≈ 1.24.Step 2:

the endpoints of the interval (-6,3):Since the interval [-6,3] is closed, its endpoints are -6 and 3.Step 3:Testing the critical points and endpoints to find the absolute maximum and minimum values:Now we check the values of the function h(x) at each of the critical points and endpoints. We get:h(-6) = -6³ - 3·6² + 15·(-6) + 3 = 21h(-3.24) ≈ -43.4h(1.24) ≈ 14.7h(3) = -3³ - 3·3² + 15·3 + 3 = 9The absolute maximum value of h(x) on the interval [-6,3] is 21, and it occurs at x = -6. The absolute minimum value of h(x) on the interval [-6,3] is approximately -43.4, and it occurs at x ≈ -3.24.

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we can substitute the angle into the equations to find the rectangular form. The equation that represents the rectangular form of θ = (5π/6) is x = -√3/2 and y = 1/2.

To convert a polar equation to rectangular form, we can use the following formulas:

x = r * cos(θ)

y = r * sin(θ)

In the given equation θ = (5π/6), we have the angle θ as (5π/6).

Using the formulas above, we can substitute the angle into the equations to find the rectangular form.

x = r * cos(θ) = r * cos(5π/6) = r * (-√3/2) = -√3/2

y = r * sin(θ) = r * sin(5π/6) = r * (1/2) = 1/2

Therefore, the rectangular form of the equation θ = (5π/6) is x = -√3/2 and y = 1/2.

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