Suppose X is a normal random variable with mean μ-53 and standard deviation σ-12. (a) Compute the z-value corresponding to X-40 b Suppose he area under the standard normal curve to the left o the z-alue found in part a is 0.1393 What is he area under (c) What is the area under the normal curve to the right of X-40?

Answers

Answer 1

Given, a normal random variable X with mean μ - 53 and standard deviation σ - 12. We need to find the z-value corresponding to X = 40 and the area under the normal curve to the right of X = 40.(a)

To compute the z-value corresponding to X = 40, we can use the z-score formula as follows:z = (X - μ) / σz = (40 - μ) / σGiven μ = 53 and σ = 12,Substituting these values, we getz = (40 - 53) / 12z = -1.0833 (approx)(b) The given area under the standard normal curve to the left of the z-value found in part (a) is 0.1393. Let us denote this as P(Z < z).We know that the standard normal distribution is symmetric about the mean, i.e.,P(Z < z) = P(Z > -z)Therefore, we haveP(Z > -z) = 1 - P(Z < z)P(Z > -(-1.0833)) = 1 - 0.1393P(Z > 1.0833) = 0.8607 (approx)(c)

To find the area under the normal curve to the right of X = 40, we need to find P(X > 40) which can be calculated as:P(X > 40) = P(Z > (X - μ) / σ)P(X > 40) = P(Z > (40 - 53) / 12)P(X > 40) = P(Z > -1.0833)Using the standard normal distribution table, we getP(Z > -1.0833) = 0.8607 (approx)Therefore, the area under the normal curve to the right of X = 40 is approximately 0.8607.

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Related Questions

Suppose we did a regression analysis that resulted in the following regression model: yhat = 11.5+0.9x. Further suppose that the actual value of y when x=14 is 25. What would the value of the residual be at that point? Give your answer to 1 decimal place.

Answers

The value of the residual at that point is 0.9.

The regression model is yhat = 11.5+0.9x. Given that the actual value of y when x = 14 is 25. We want to find the residual at that point. Residuals represent the difference between the actual value of y and the predicted value of y. To find the residual, we first need to find the predicted value of y (yhat) when x = 14. Substitute x = 14 into the regression model: yhat = 11.5 + 0.9x= 11.5 + 0.9(14)= 11.5 + 12.6= 24.1.

Therefore, the predicted value of y (yhat) when x = 14 is 24.1.The residual at that point is the difference between the actual value of y and the predicted value of y: Residual = Actual value of y - Predicted value of y= 25 - 24.1= 0.9.

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Please show work clearly and graph.
2. A report claims that 65% of full-time college students are employed while attending college. A recent survey of 110 full-time students at a state university found that 80 were employed. Use a 0.10

Answers

1. Null Hypothesis (H0): The proportion of employed students is equal to 65%.

Alternative Hypothesis (HA): The proportion of employed students is not equal to 65%.

2. We can use the z-test for proportions to test these hypotheses. The test statistic formula is:

 [tex]\[ z = \frac{{p - p_0}}{{\sqrt{\frac{{p_0(1-p_0)}}{n}}}} \][/tex]

  where:

  - p is the observed proportion

  - p0 is the claimed proportion under the null hypothesis

  - n is the sample size

3. Given the data, we have:

  - p = 80/110 = 0.7273 (observed proportion)

  - p0 = 0.65 (claimed proportion under null hypothesis)

  - n = 110 (sample size)

4. Calculating the test statistic:

[tex]\[ z = \frac{{0.7273 - 0.65}}{{\sqrt{\frac{{0.65 \cdot (1-0.65)}}{110}}}} \][/tex]

 [tex]\[ z \approx \frac{{0.0773}}{{\sqrt{\frac{{0.65 \cdot 0.35}}{110}}}} \][/tex]

 [tex]\[ z \approx \frac{{0.0773}}{{\sqrt{\frac{{0.2275}}{110}}}} \][/tex]

[tex]\[ z \approx \frac{{0.0773}}{{0.01512}} \][/tex]

[tex]\[ z \approx 5.11 \][/tex]

5. The critical z-value for a two-tailed test at a 10% significance level is approximately ±1.645.

6. Since our calculated z-value of 5.11 is greater than the critical z-value of 1.645, we reject the null hypothesis. This means that the observed proportion of employed students differs significantly from the claimed proportion of 65% at a 10% significance level.

7. Graphically, the critical region can be represented as follows:

[tex]\[ | | \\ | | \\ | \text{Critical} | \\ | \text{Region} | \\ | | \\ -------|---------------------|------- \\ -1.645 1.645 \\ \][/tex]

  The calculated z-value of 5.11 falls far into the critical region, indicating a significant difference between the observed proportion and the claimed proportion.

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Question 2: A local dealership collects data on customers. Below are the types of cars that 206 customers are driving. Electric Vehicle Compact Hybrid Total Compact-Fuel powered Male 25 29 50 104 Female 30 27 45 102 Total 55 56 95 206 a) If we randomly select a female, what is the probability that she purchased compact-fuel powered vehicle? (Write your answer as a fraction first and then round to 3 decimal places) b) If we randomly select a customer, what is the probability that they purchased an electric vehicle? (Write your answer as a fraction first and then round to 3 decimal places)

Answers

Approximately 44.1% of randomly selected females purchased a compact fuel-powered vehicle, while approximately 26.7% of randomly selected customers purchased an electric vehicle.

a) To compute the probability that a randomly selected female purchased a compact-fuel powered vehicle, we divide the number of females who purchased a compact-fuel powered vehicle (45) by the total number of females (102).

The probability is 45/102, which simplifies to approximately 0.441.

b) To compute the probability that a randomly selected customer purchased an electric vehicle, we divide the number of customers who purchased an electric vehicle (55) by the total number of customers (206).

The probability is 55/206, which simplifies to approximately 0.267.

Therefore, the probability that a randomly selected female purchased a compact-fuel powered vehicle is approximately 0.441, and the probability that a randomly selected customer purchased an electric vehicle is approximately 0.267.

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the reaction r to an injection of a drug is related to the dose x (in milligrams) according to the following. r(x) = x2 700 − x 3 find the dose (in mg) that yields the maximum reaction.

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the dose (in mg) that yields the maximum reaction is 1800 mg (rounded off to the nearest integer).

The given equation for the reaction r(x) to an injection of a drug related to the dose x (in milligrams) is:

r(x) = x²⁷⁰⁰ − x³

The dose (in mg) that yields the maximum reaction is to be determined from the given equation.

To find the dose (in mg) that yields the maximum reaction, we need to differentiate the given equation w.r.t x as follows:

r'(x) = 2x(2700) - 3x² = 5400x - 3x²

Now, we need to equate the first derivative to 0 in order to find the maximum value of the function as follows:

r'(x) = 0

⇒ 5400x - 3x² = 0

⇒ 3x(1800 - x) = 0

⇒ 3x = 0 or 1800 - x = 0

⇒ x = 0

or x = 1800

The above two values of x represent the critical points of the function.

Since x can not be 0 (as it is a dosage), the only critical point is:

x = 1800

Now, we need to find out whether this critical point x = 1800 is a maximum point or not.

For this, we need to find the second derivative of the given function as follows:

r''(x) = d(r'(x))/dx= d/dx(5400x - 3x²) = 5400 - 6x

Now, we need to check the value of r''(1800).r''(1800) = 5400 - 6(1800) = -7200

Since the second derivative r''(1800) is less than 0, the critical point x = 1800 is a maximum point of the given function. Therefore, the dose (in mg) that yields the maximum reaction is 1800 mg (rounded off to the nearest integer).

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.How long is the minor axis for the ellipse shown below?
(x+4)^2 / 25 + (y-1)^2 / 16 = 1
A: 8
B: 9
C: 12
D: 18

Answers

The length of the minor axis for the given ellipse is 8 units. Therefore, the correct option is A: 8.

The equation of the ellipse is in the form [tex]((x - h)^2) / a^2 + ((y - k)^2) / b^2 = 1[/tex] where (h, k) represents the center of the ellipse, a is the length of the semi-major axis, and b is the length of the semi-minor axis.

Comparing the given equation to the standard form, we can determine that the center of the ellipse is (-4, 1), the length of the semi-major axis is 5, and the length of the semi-minor axis is 4.

The length of the minor axis is twice the length of the semi-minor axis, so the length of the minor axis is 2 * 4 = 8.

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find the volume v of the described solid s. a cap of a sphere with radius r and height h v = incorrect: your answer is incorrect.

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To find the volume v of the described solid s, a cap of a sphere with radius r and height h, the formula to be used is:v = (π/3)h²(3r - h)First, let's establish the formula for the volume of the sphere. The formula for the volume of a sphere is given as:v = (4/3)πr³

A spherical cap is cut off from a sphere of radius r by a plane situated at a distance h from the center of the sphere. The volume of the spherical cap is given as follows:V = (1/3)πh²(3r - h)The volume of a sphere of radius r is:V = (4/3)πr³Substituting the value of r into the equation for the volume of a spherical cap, we get:v = (π/3)h²(3r - h)Therefore, the volume of the described solid s, a cap of a sphere with radius r and height h, is:v = (π/3)h²(3r - h)The answer is  more than 100 words as it includes the derivation of the formula for the volume of a sphere and the volume of a spherical cap.

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Consider the following series. n = 1 n The series is equivalent to the sum of two p-series. Find the value of p for each series. P1 = (smaller value) P2 = (larger value) Determine whether the series is convergent or divergent. o convergent o divergent

Answers

If we consider the series given by n = 1/n, we can rewrite it as follows:

n = 1/1 + 1/2 + 1/3 + 1/4 + ...

To determine the value of p for each series, we can compare it to known series forms. In this case, it resembles the harmonic series, which has the form:

1 + 1/2 + 1/3 + 1/4 + ...

The harmonic series is a p-series with p = 1. Therefore, in this case:

P1 = 1

Since the series in question is similar to the harmonic series, we know that if P1 ≤ 1, the series is divergent. Therefore, the series is divergent.

In summary:

P1 = 1 (smaller value)

P2 = N/A (not applicable)

The series is divergent.

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Three candidates, A, B and C, participate in an election in which eight voters will cast their votes. The candidate who receives the absolute majority, that is at least five, of the votes will win the

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The total number of possible outcomes, we get 3^8 - 2^8 = 6,305. Therefore, there are 6,305 possible outcomes in this scenario.

A, B, and C are the three up-and-comers in an eight-vote political decision. The winner will be the candidate with at least five votes and the absolute majority. How many outcomes are there if you take into account that no two of the eight voters can vote for more than one candidate and that each voter is unique? 3,8 minus 2,8 equals 6,305 less than 256.

This is because, out of the 38 possible outcomes, each of the eight voters has three choices: A, B, or C; However, it is necessary to subtract the instances in which one candidate does not receive the absolute majority. A candidate needs at least five votes to win the political race. Without this, there are two possible outcomes: 1. Situation: Each newcomer requires five votes. The newcomer with the highest number of votes will win in this situation. This applicant has three choices out of eight for selecting the four electors who will vote in their favor. The other applicant will win the vote of the remaining citizens.

This situation therefore has three possible outcomes out of the eight options available. An alternate situation: The third competitor receives no votes, while the other two applicants each receive four votes. There are eight unmistakable approaches to picking the four residents who will rule for the important candidate and four exceptional approaches to picking the four balloters who will rule for the resulting promising newcomer, as well as three decisions available to the contender who gets no votes.

Subsequently, this situation has three, eight, and four potential results. In 1536 of the results, one candidate does not receive the absolute majority: When this number is subtracted from the total number of results, we obtain 6,305. 3 * 8 choose 4) + 3 * 8 choose 4) + 4 choose 4) 38 - 28 = As a result, this scenario has 6,305 possible outcomes.

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Let X be the standard uniform random variable and let Y = 20X + 10. Then, Y~ Uniform(20, 30) Y is Triangular with a peak (mode) at 20 Y~ Uniform(0, 20) Y~ Uniform(10, 20) Y ~ Uniform(10, 30)

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"Let X be the standard uniform random variable and let Y = 20X + 10. Then, Y~ Uniform(20, 30)." is True and the correct answer is :

D. Y ~ Uniform(10, 30).

X is a standard uniform random variable, this means that X has a range from 0 to 1, which can be expressed as:

X ~ Uniform(0, 1)

Then, using the formula for a linear transformation of a uniform random variable, we get:

Y = 20X + 10

Also, we know that the range of X is from 0 to 1. We can substitute this to get the range of Y:

When X = 0,

Y = 20(0) + 10

Y = 10

When X = 1,

Y = 20(1) + 10

Y = 30

Therefore, Y ~ Uniform(10, 30).

Thus, the correct option is (d).

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Deposit $500, earns interest of 5% in first year, and has $552.3 end year 2. what is it in year 2?

Answers

The initial deposit is $500 and it earns interest of 5% in the first year. Let us calculate the interest in the first year.

Interest in first year = (5/100) × $500= $25After the first year, the amount in the account is:$500 + $25 = $525In year two, the amount earns 5% interest on $525. Let us calculate the interest in year two.Interest in year two = (5/100) × $525= $26.25

The total amount at the end of year two is the initial deposit plus interest earned in both years:$500 + $25 + $26.25 = $551.25This is very close to the given answer of $552.3, so it could be a rounding issue. Therefore, the answer is $551.25 (approximately $552.3).

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Find z that such 8.6% of the standard normal curve lies to the right of z.

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Therefore, we have to take the absolute value of the z-score obtained. Thus, the z-score is z = |1.44| = 1.44.

To determine z such that 8.6% of the standard normal curve lies to the right of z, we can follow the steps below:

Step 1: Draw the standard normal curve and shade the area to the right of z.

Step 2: Look up the area 8.6% in the standard normal table.Step 3: Find the corresponding z-score for the area using the table.

Step 4: Take the absolute value of the z-score obtained since we want the area to the right of z.

Step 1: Draw the standard normal curve and shade the area to the right of z

The standard normal curve is a bell-shaped curve with mean 0 and standard deviation 1. Since we want to find z such that 8.6% of the standard normal curve lies to the right of z, we need to shade the area to the right of z as shown below:

Step 2: Look up the area 8.6% in the standard normal table

The standard normal table gives the area to the left of z.

To find the area to the right of z, we need to subtract the area from 1.

Therefore, we look up the area 1 – 0.086 = 0.914 in the standard normal table.

Step 3: Find the corresponding z-score for the area using the table

The standard normal table gives the z-score corresponding to the area 0.914 as 1.44.

Step 4: Take the absolute value of the z-score obtained since we want the area to the right of z

The area to the right of z is 0.086, which is less than 0.5.

Therefore, we have to take the absolute value of the z-score obtained.

Thus, the z-score is z = |1.44| = 1.44.

Z-score is also known as standard score, it is the number of standard deviations by which an observation or data point is above the mean of the data set. A standard normal distribution is a normal distribution with mean 0 and standard deviation 1.

The area under the curve of a standard normal distribution is equal to 1. The area under the curve of a standard normal distribution to the left of z can be found using the standard normal table.

Similarly, the area under the curve of a standard normal distribution to the right of z can be found by subtracting the area to the left of z from 1.

In this problem, we need to find z such that 8.6% of the standard normal curve lies to the right of z. To find z, we need to perform the following steps.

Step 1: Draw the standard normal curve and shade the area to the right of z.

Step 2: Look up the area 8.6% in the standard normal table.

Step 3: Find the corresponding z-score for the area using the table.

Step 4: Take the absolute value of the z-score obtained since we want the area to the right of z.

The standard normal curve is a bell-shaped curve with mean 0 and standard deviation 1.

Since we want to find z such that 8.6% of the standard normal curve lies to the right of z, we need to shade the area to the right of z.

The standard normal table gives the area to the left of z.

To find the area to the right of z, we need to subtract the area from 1.

Therefore, we look up the area 1 – 0.086 = 0.914 in the standard normal table.

The standard normal table gives the z-score corresponding to the area 0.914 as 1.44.

The area to the right of z is 0.086, which is less than 0.5.

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jenna is redoing her bathroom floor with tiles measuring 6 in. by 14 in. the floor has an area of 8,900 in2. what is the least number of tiles she will need?

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The area of the bathroom floor = 8,900 square inchesArea of one tile = Length × Width= 6 × 14= 84 square inchesTo determine the least number of tiles needed, divide the area of the bathroom floor by the area of one tile.

That is:Number of tiles = Area of bathroom floor/Area of one tile= 8,900/84= 105.95SPSince she can't use a fractional tile, the least number of tiles Jenna needs is the next whole number after 105.95. That is 106 tiles.Jenna will need 106 tiles to redo her bathroom floor.

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find all solutions of the equation cos x sin x − 2 cos x = 0 . the answer is a b k π where k is any integer and 0 < a < π ,

Answers

Therefore, the only solutions within the given interval are the values of x for which cos(x) = 0, namely [tex]x = (2k + 1)\pi/2,[/tex] where k is any integer, and 0 < a < π.

To find all solutions of the equation cos(x)sin(x) - 2cos(x) = 0, we can factor out the common term cos(x) from the left-hand side:

cos(x)(sin(x) - 2) = 0

Now, we have two possibilities for the equation to be satisfied:

 cos(x) = 0In this case, x can take values of the form x = (2k + 1)π/2, where k is any integer.

 sin(x) - 2 = 0 Solving this equation for sin(x), we get sin(x) = 2. However, there are no solutions to this equation within the interval 0 < a < π, as the range of sin(x) is -1 to 1.

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If there care 30 trucks and 7 of them are red. What fraction are the red trucks

Answers

Answer:

7/30

Step-by-step explanation:

7 out of 30 is 7/30

let a, b e z. (a) prove that if a2 i b2, then a i b. (b) prove that if a n i b n for some positive integer n, then a i b.

Answers

(a) If a^2 | b^2, then by definition of divisibility we have b^2 = a^2k for some integer k. Thus,b^2 - a^2 = a^2(k - 1) = (a√k)(a√k),which implies that a^2 divides b^2 - a^2.

Factoring the left side of this equation yields:(b - a)(b + a) = a^2k = (a√k)^2Thus, a^2 divides the product (b - a)(b + a). Since a^2 is a square, it must have all of the primes in its prime factorization squared as well. Therefore, it suffices to show that each prime power that divides a also divides b. We will assume that p is prime and that pk divides a. Then pk also divides a^2 and b^2, so pk must also divide b. Thus, a | b, as claimed.(b) If a n | b n, then b n = a n k for some integer k. Thus, we can write b = a^k, so a | b, as claimed.

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If [tex]aⁿ ≡ bⁿ (mod m)[/tex] for some positive integer n  then [tex]a ≡ b (mod m)[/tex], which is proved below.

a) Let [tex]a² = b²[/tex]. Then [tex]a² - b² = 0[/tex], or (a-b)(a+b) = 0.

So either a-b = 0, i.e. a=b, or a+b = 0, i.e. a=-b.

In either case, a=b.

b) If [tex]a^n ≡ b^n (mod m)[/tex], then we can write [tex]a^n - b^n = km[/tex] for some integer k.

We know that [tex]a-b | a^n - b^n[/tex], so we can write [tex]a-b | km[/tex].

But a and b are relatively prime, so we can write a-b | k.

Thus there exists some integer j such that k = j(a-b).

Substituting this into our equation above, we get

[tex]a^n - b^n = j(a-b)m[/tex],

or [tex]a^n = b^n + j(a-b)m[/tex]

and so [tex]a-b | b^n[/tex].

But a and b are relatively prime, so we can write a-b | n.

This means that there exists some integer h such that n = h(a-b).

Substituting this into the equation above, we get

[tex]a^n = b^n + j(a-b)n = b^n + j(a-b)h(a-b)[/tex],

or [tex]a^n = b^n + k(a-b)[/tex], where k = jh.

Thus we have shown that if aⁿ ≡ bⁿ (mod m) then a ≡ b (mod m).

Therefore, both the parts are proved.

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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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For the standard normal distribution, find the value of c such
that:
P(z > c) = 0.6454

Answers

In order to find the value of c for which P(z > c) = 0.6454 for the standard normal distribution, we can make use of a z-table which gives us the probabilities for a range of z-values. The area under the normal distribution curve is equal to the probability.

The z-table gives the probability of a value being less than a given z-value. If we need to find the probability of a value being greater than a given z-value, we can subtract the corresponding value from 1. Hence,P(z > c) = 1 - P(z < c)We can use this formula to solve for the value of c.First, we find the z-score that corresponds to a probability of 0.6454 in the table. The closest probability we can find is 0.6452, which corresponds to a z-score of 0.39. This means that P(z < 0.39) = 0.6452.Then, we can find P(z > c) = 1 - P(z < c) = 1 - 0.6452 = 0.3548We need to find the z-score that corresponds to this probability. Looking in the z-table, we find that the closest probability we can find is 0.3547, which corresponds to a z-score of -0.39. This means that P(z > -0.39) = 0.3547.

Therefore, the value of c such that P(z > c) = 0.6454 is c = -0.39.

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The additional growth of plants in one week are recorded for 11 plants with a sample standard deviation of 2 inches and sample mean of 10 inches. t at the 0.10 significance level = Ex 1,234 Margin of error = Ex: 1.234 Confidence interval = [ Ex: 12.345 1 Ex: 12345 [smaller value, larger value]

Answers

Answer :  The confidence interval is [9.18, 10.82].

Explanation :

Given:Sample mean, x = 10

Sample standard deviation, s = 2

Sample size, n = 11

Significance level = 0.10

We can find the standard error of the mean, SE using the below formula:

SE = s/√n where, s is the sample standard deviation, and n is the sample size.

Substituting the values,SE = 2/√11 SE ≈ 0.6

Using the t-distribution table, with 10 degrees of freedom at a 0.10 significance level, we can find the t-value.

t = 1.372 Margin of error (ME) can be calculated using the formula,ME = t × SE

Substituting the values,ME = 1.372 × 0.6 ME ≈ 0.82

Confidence interval (CI) can be calculated using the formula,CI = (x - ME, x + ME)

Substituting the values,CI = (10 - 0.82, 10 + 0.82)CI ≈ (9.18, 10.82)

Therefore, the confidence interval is [9.18, 10.82].

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Smartphones: A poll agency reports that 80% of teenagers aged 12-17 own smartphones. A random sample of 250 teenagers is drawn. Round your answers to at least four decimal places as needed. Dart 1 n6 (1) Would it be unusual if less than 75% of the sampled teenagers owned smartphones? It (Choose one) be unusual if less than 75% of the sampled teenagers owned smartphones, since the probability is Below, n is the sample size, p is the population proportion and p is the sample proportion. Use the Central Limit Theorem and the TI-84 calculator to find the probability. Round the answer to at least four decimal places. n=148 p=0.14 PC <0.11)-0 Х $

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The solution to the problem is as follows:Given that 80% of teenagers aged 12-17 own smartphones. A random sample of 250 teenagers is drawn.

The probability is calculated by using the Central Limit Theorem and the TI-84 calculator, and the answer is rounded to at least four decimal places.PC <0.11)-0 Х $P(X<0.11)To find the probability of less than 75% of the sampled teenagers owned smartphones, convert the percentage to a proportion.75/100 = 0.75

This means that p = 0.75. To find the sample proportion, use the given formula:p = x/nwhere x is the number of teenagers who own smartphones and n is the sample size.Substituting the values into the formula, we get;$$p = \frac{x}{n}$$$$0.8 = \frac{x}{250}$$$$x = 250 × 0.8$$$$x = 200$$Therefore, the sample proportion is 200/250 = 0.8.To find the probability of less than 75% of the sampled teenagers owned smartphones, we use the standard normal distribution formula, which is:Z = (X - μ)/σwhere X is the random variable, μ is the mean, and σ is the standard deviation.

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the table shows values for variable a and variable b. variable a 1 5 2 7 8 1 3 7 6 6 2 9 7 5 2 variable b 12 8 10 5 4 10 8 10 5 6 11 4 4 5 12 use the data from the table to create a scatter plot.

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Title and scale the graph Finally, give the graph a title that describes what the graph represents. Also, give each axis a title and a scale that makes it easy to read and interpret the data.

To create a scatter plot from the data given in the table with variables `a` and `b`, you can follow the following steps:

Step 1: Organize the dataThe first step in creating a scatter plot is to organize the data in a table. The table given in the question has the data organized already, but it is in a vertical format. We will need to convert it to a horizontal format where each variable has a column. The organized data will be as follows:````| Variable a | Variable b | |------------|------------| | 1 | 12 | | 5 | 8 | | 2 | 10 | | 7 | 5 | | 8 | 4 | | 1 | 10 | | 3 | 8 | | 7 | 10 | | 6 | 5 | | 6 | 6 | | 2 | 11 | | 9 | 4 | | 7 | 4 | | 5 | 5 | | 2 | 12 |```

Step 2: Create a horizontal and vertical axisThe second step is to create two axes, a horizontal x-axis and a vertical y-axis. The x-axis represents the variable a while the y-axis represents variable b. Label each axis to show the variable it represents.

Step 3: Plot the pointsThe third step is to plot each point on the graph. To plot the points, take the value of variable a and mark it on the x-axis. Then take the corresponding value of variable b and mark it on the y-axis. Draw a dot at the point where the two marks intersect. Repeat this process for all the points.

Step 4: Title and scale the graph Finally, give the graph a title that describes what the graph represents. Also, give each axis a title and a scale that makes it easy to read and interpret the data.

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Given the equation y = 7 sin The amplitude is: 7 The period is: The horizontal shift is: The midline is: y = 3 11TT 6 x - 22π 3 +3 units to the Right

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The amplitude is 7, the period is 12π/11, the horizontal shift is 22π/33 to the right, and the midline is y = 3, where [11π/6(x - 22π/33)] represents the phase shift.

Given the equation y = 7 sin [11π/6(x - 22π/33)] +3 units to the Right

For the given equation, the amplitude is 7, the period is 12π/11, the horizontal shift is 22π/33 to the right, and the midline is y = 3.

To solve for the amplitude, period, horizontal shift and midline for the equation y = 7 sin [11π/6(x - 22π/33)] +3 units to the right, we must look at each term independently.

1. Amplitude: Amplitude is the highest point on a curve's peak and is usually represented by a. y = a sin(bx + c) + d, where the amplitude is a.

The amplitude of the given equation is 7.

2. Period: The period is the length of one cycle, and in trigonometry, one cycle is represented by one complete revolution around the unit circle.

The period of a trig function can be found by the formula T = (2π)/b in y = a sin(bx + c) + d, where the period is T.

We can then get the period of the equation by finding the value of b and using the formula above.

From y = 7 sin [11π/6(x - 22π/33)] +3, we can see that b = 11π/6. T = (2π)/b = (2π)/ (11π/6) = 12π/11.

Therefore, the period of the equation is 12π/11.3.

Horizontal shift: The equation of y = a sin[b(x - h)] + k shows how to move the graph horizontally. It is moved h units to the right if h is positive.

Otherwise, the graph is moved |h| units to the left.

The value of h can be found using the equation, x - h = 0, to get h.

The equation can be modified by rearranging x - h = 0 to get x = h.

So, the horizontal shift for the given equation y = 7 sin [11π/6(x - 22π/33)] +3 units to the right is 22π/33 to the right.

4. Midline: The y-axis is where the midline passes through the center of the sinusoidal wave.

For y = a sin[b(x - h)] + k, the equation of the midline is y = k.

The midline for the given equation is y = 3.

Therefore, the amplitude is 7, the period is 12π/11, the horizontal shift is 22π/33 to the right, and the midline is y = 3, where [11π/6(x - 22π/33)] represents the phase shift.

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Type the correct answer in each box. Use numerals instead of words. If necessary, use / for the fraction bar(s). Points A and B are the endpoints of an arc of a circle. Chords are drawn from the two endpoints to a third point, C, on the circle. Given m AB =64° and ABC=73° , mACB=.......° and mAC=....°

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Measures of angles ACB and AC are is m(ACB) = 64°, m(AC) = 146°

What is the measure of angle ACB?

Given that m(AB) = 64° and m(ABC) = 73°, we can find the measures of m(ACB) and m(AC) using the properties of angles in a circle.

First, we know that the measure of a central angle is equal to the measure of the intercepted arc. In this case, m(ACB) is the central angle, and the intercepted arc is AB. Therefore, m(ACB) = m(AB) = 64°.

Next, we can use the property that an inscribed angle is half the measure of its intercepted arc. The angle ABC is an inscribed angle, and it intercepts the arc AC. Therefore, m(AC) = 2 * m(ABC) = 2 * 73° = 146°.

To summarize:

m(ACB) = 64°

m(AC) = 146°

These are the measures of angles ACB and AC, respectively, based on the given information.

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The table shows values for functions f(x) and g(x) .
x f(x) g(x)
1 3 3
3 9 4
5 3 5
7 4 4
9 12 9
11 6 6
What are the known solutions to f(x)=g(x) ?

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The known solutions to f(x) = g(x) can be determined by finding the values of x for which f(x) and g(x) are equal. In this case, analyzing the given table, we find that the only known solution to f(x) = g(x) is x = 3.

By examining the values of f(x) and g(x) from the given table, we can observe that they intersect at x = 3. For x = 1, f(1) = 3 and g(1) = 3, which means they are equal. However, this is not considered a solution to f(x) = g(x) since it is not an intersection point. Moving forward, at x = 3, we have f(3) = 9 and g(3) = 9, showing that f(x) and g(x) are equal at this point. Similarly, at x = 5, f(5) = 3 and g(5) = 3, but again, this is not considered an intersection point. At x = 7, f(7) = 4 and g(7) = 4, and at x = 9, f(9) = 12 and g(9) = 12. None of these points provide solutions to f(x) = g(x) as they do not intersect. Finally, at x = 11, f(11) = 6 and g(11) = 6, but this point also does not satisfy the condition. Therefore, the only known solution to f(x) = g(x) in this case is x = 3.

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What does a linear model look like? Explain what all of the pieces are? 2) What does an exponential model look like? Explain what all of the pieces are? 3) What is the defining characteristic of a linear model? 4) What is the defining characteristic of an exponential model?

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A linear model is that it represents a constant Rate of change between the two variables.

1) A linear model is a mathematical representation of a relationship between two variables that forms a straight line when graphed. The equation of a linear model is typically of the form y = mx + b, where y represents the dependent variable, x represents the independent variable, m represents the slope of the line, and b represents the y-intercept. The slope (m) determines the steepness of the line, and the y-intercept (b) represents the point where the line intersects the y-axis.

2) An exponential model is a mathematical representation of a relationship between two variables where one variable grows or decays exponentially with respect to the other. The equation of an exponential model is typically of the form y = a * b^x, where y represents the dependent variable, x represents the independent variable, a represents the initial value or starting point, and b represents the growth or decay factor. The growth or decay factor (b) determines the rate at which the variable changes, and the initial value (a) represents the value of the dependent variable when the independent variable is zero.

3) The defining characteristic of a linear model is that it represents a constant rate of change between the two variables. In other words, as the independent variable increases or decreases by a certain amount, the dependent variable changes by a consistent amount determined by the slope. This results in a straight line when the data points are plotted on a graph.

4) The defining characteristic of an exponential model is that it represents a constant multiplicative rate of change between the two variables. As the independent variable increases or decreases by a certain amount, the dependent variable changes by a consistent multiple determined by the growth or decay factor. This leads to a curve that either grows exponentially or decays exponentially, depending on the value of the growth or decay factor.

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e 6xy dv, where e lies under the plane z = 1 x y and above the region in the xy-plane bounded by the curves y = x , y = 0, and x = 1

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The problem involves evaluating the integral of 6xy over a specific region in three-dimensional space. The region lies beneath the plane z = 1 and is bounded by the curves y = x, y = 0, and x = 1 in the xy-plane.

To solve this problem, we need to integrate the function 6xy over the given region. The region is defined by the plane z = 1 above it and the boundaries in the xy-plane: y = x, y = 0, and x = 1.

First, let's determine the limits of integration. Since y = x and y = 0 are two of the boundaries, the limits of y will be from 0 to x. The limit of x will be from 0 to 1.

Now, we can set up the integral:

∫∫∫_R 6xy dv,

where R represents the region in three-dimensional space.

To evaluate the integral, we integrate with respect to z first since the region is bounded by the plane z = 1. The limits of z will be from 0 to 1.

Next, we integrate with respect to y, with limits from 0 to x.

Finally, we integrate with respect to x, with limits from 0 to 1.

By evaluating the integral, we can find the numerical value of the expression 6xy over the given region.

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Find a vector function, r(t), that represents the curve of intersection of the two surfaces. The cone z = x² + y² and the plane z = 2 + y r(t) =

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A vector function r(t) that represents the curve of intersection of the two surfaces, the cone z = x² + y² and the plane z = 2 + y, is r(t) = ⟨t, -t² + 2, -t² + 2⟩.

What is the vector function that describes the intersection curve of the given surfaces?

To find the vector function representing the curve of intersection between the cone z = x² + y² and the plane z = 2 + y, we need to equate the two equations and express x, y, and z in terms of a parameter, t.

By setting x² + y² = 2 + y, we can rewrite it as x² + (y - 1)² = 1, which represents a circle in the xy-plane with a radius of 1 and centered at (0, 1). This allows us to express x and y in terms of t as x = t and y = -t² + 2.

Since the plane equation gives us z = 2 + y, we have z = -t² + 2 as well.

Combining these equations, we obtain the vector function r(t) = ⟨t, -t² + 2, -t² + 2⟩, which represents the curve of intersection.

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A study was carried out to compare the effectiveness of the two vaccines A and B. The study reported that of the 900 adults who were randomly assigned vaccine A, 18 got the virus. Of the 600 adults who were randomly assigned vaccine B, 30 got the virus (round to two decimal places as needed).

Construct a 95% confidence interval for comparing the two vaccines (define vaccine A as population 1 and vaccine B as population 2

Suppose the two vaccines A and B were claimed to have the same effectiveness in preventing infection from the virus. A researcher wants to find out if there is a significant difference in the proportions of adults who got the virus after vaccinated using a significance level of 0.05.

What is the test statistic?

Answers

The test statistic is approximately -2.99 using the significance level of 0.05.

To compare the effectiveness of vaccines A and B, we can use a hypothesis test for the difference in proportions. First, we calculate the sample proportions:

p1 = x1 / n1 = 18 / 900 ≈ 0.02

p2 = x2 / n2 = 30 / 600 ≈ 0.05

Where x1 and x2 represent the number of adults who got the virus in each group.

To construct a 95% confidence interval for comparing the two vaccines, we can use the following formula:

CI = (p1 - p2) ± Z * √[(p1 * (1 - p1) / n1) + (p2 * (1 - p2) / n2)]

Where Z is the critical value corresponding to a 95% confidence level. For a two-tailed test at a significance level of 0.05, Z is approximately 1.96.

Plugging in the values:

CI = (0.02 - 0.05) ± 1.96 * √[(0.02 * (1 - 0.02) / 900) + (0.05 * (1 - 0.05) / 600)]

Simplifying the equation:

CI = -0.03 ± 1.96 * √[(0.02 * 0.98 / 900) + (0.05 * 0.95 / 600)]

Calculating the values inside the square root:

√[(0.02 * 0.98 / 900) + (0.05 * 0.95 / 600)] ≈ √[0.0000218 + 0.0000792] ≈ √0.000101 ≈ 0.01005

Finally, plugging this value back into the confidence interval equation:

CI = -0.03 ± 1.96 * 0.01005

Calculating the confidence interval:

CI = (-0.0508, -0.0092)

Therefore, the 95% confidence interval for the difference in proportions (p1 - p2) is (-0.0508, -0.0092).

Now, to find the test statistic, we can use the following formula:

Test Statistic = (p1 - p2) / √[(p1 * (1 - p1) / n1) + (p2 * (1 - p2) / n2)]

Plugging in the values:

Test Statistic = (0.02 - 0.05) / √[(0.02 * (1 - 0.02) / 900) + (0.05 * (1 - 0.05) / 600)]

Simplifying the equation:

Test Statistic = -0.03 / √[(0.02 * 0.98 / 900) + (0.05 * 0.95 / 600)]

Calculating the values inside the square root:

√[(0.02 * 0.98 / 900) + (0.05 * 0.95 / 600)] ≈ √[0.0000218 + 0.0000792] ≈ √0.000101 ≈ 0.01005

Finally, plugging this value back into the test statistic equation:

Test Statistic = -0.03 / 0.01005 ≈ -2.99

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what is the probability that a positive integer selected at random from the set of positive integers not exceeding 100 is divisible by either 2 or 5?

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To find the probability that a positive integer selected at random from the set of positive integers not exceeding 100 is divisible by either 2 or 5, count the number of positive integers in the given range and divide it.

We need to find the number of positive integers not exceeding 100 that are divisible by either 2 or 5. We can use the principle of inclusion-exclusion to count these numbers.

The numbers divisible by 2 are: 2, 4, 6, ..., 100. There are 50 such numbers.

The numbers divisible by 5 are: 5, 10, 15, ..., 100. There are 20 such numbers.

However, some numbers (such as 10, 20, 30, etc.) are divisible by both 2 and 5, and we have counted them twice. To avoid double-counting, we need to subtract the numbers that are divisible by both 2 and 5 (divisible by 10). There are 10 such numbers (10, 20, 30, ..., 100).

Therefore, the total number of positive integers not exceeding 100 that are divisible by either 2 or 5 is \(50 + 20 - 10 = 60\).

Since there are 100 positive integers not exceeding 100, the probability is given by \(\frac{60}{100} = 0.6\) or 60%.

Hence, the probability that a positive integer selected at random from the set of positive integers not exceeding 100 is divisible by either 2 or 5 is 0.6 or 60%.

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An engineer fitted a straight line to the following data using the method of Least Squares: 1 2 3 4 5 6 7 3.20 4.475.585.66 7.61 8.65 10.02 The correlation coefficient between x and y is r = 0.9884, t

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There is a strong positive linear relationship between x and y with a slope coefficient of 1.535 and an intercept of 1.558.

The correlation coefficient and coefficient of determination both indicate a high degree of association between the two variables, and the t-test and confidence interval for the slope coefficient confirm the significance of this relationship.

The engineer fitted the straight line to the given data using the method of Least Squares. The equation of the line is y = 1.535x + 1.558, where x represents the independent variable and y represents the dependent variable.

The correlation coefficient between x and y is r = 0.9884, which indicates a strong positive correlation between the two variables. The coefficient of determination, r^2, is 0.977, which means that 97.7% of the total variation in y is explained by the linear relationship with x.

To test the significance of the slope coefficient, t-test can be performed using the formula t = b/SE(b), where b is the slope coefficient and SE(b) is its standard error. In this case, b = 1.535 and SE(b) = 0.057.

Therefore, t = 26.93, which is highly significant at any reasonable level of significance (e.g., p < 0.001). This means that we can reject the null hypothesis that the true slope coefficient is zero and conclude that there is a significant linear relationship between x and y.

In addition to the t-test, we can also calculate the confidence interval for the slope coefficient using the formula:

b ± t(alpha/2)*SE(b),

where alpha is the level of significance (e.g., alpha = 0.05 for a 95% confidence interval) and t(alpha/2) is the critical value from the t-distribution with n-2 degrees of freedom (where n is the sample size).

For this data set, with n = 7, we obtain a 95% confidence interval for the slope coefficient of (1.406, 1.664).

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what is the probability that the length of stay in the icu is one day or less (to 4 decimals)?

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The probability that the length of stay in the ICU is one day or less is approximately 0.0630 to 4 decimal places.

To calculate the probability that the length of stay in the ICU is one day or less, you need to find the cumulative probability up to one day.

Let's assume that the length of stay in the ICU follows a normal distribution with a mean of 4.5 days and a standard deviation of 2.3 days.

Using the formula for standardizing a normal distribution, we get:z = (x - μ) / σwhere x is the length of stay, μ is the mean (4.5), and σ is the standard deviation (2.3).

To find the cumulative probability up to one day, we need to standardize one day as follows:

z = (1 - 4.5) / 2.3 = -1.52

Using a standard normal distribution table or a calculator, we find that the cumulative probability up to z = -1.52 is 0.0630.

Therefore, the probability that the length of stay in the ICU is one day or less is approximately 0.0630 to 4 decimal places.

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