Identify whether the experiment involves a discrete or a continuous random variable. Measuring the distance traveled by different cars using 1-liter of gasoline?

Answers

Answer 1

The experiment involves measuring the distance traveled by different cars using 1 liter of gasoline, which represents a continuous random variable.

In this experiment, the variable being measured is the distance traveled by different cars using 1 liter of gasoline. A continuous random variable is a variable that can take any value within a certain range, often associated with measurements on a continuous scale. In this case, the distance traveled can take on any value within a range, such as from 0 to infinity. The distance is not limited to specific discrete values but can vary continuously based on factors like driving conditions, car efficiency, and individual driving habits.

Since the distance traveled is not limited to specific discrete values and can take on any value within a range, it is considered a continuous random variable. This means that measurements can be fractional or decimal values, allowing for a smooth and infinite number of possibilities. In statistical analysis, dealing with continuous random variables often involves techniques such as probability density functions and integration.

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Related Questions

The population of a country dropped from 51.7 million in 1995 to 45.7 million in 2007 . assume that​ p(t), the​ population, in​ millions, t years after​ 1995, is decreasing according to the exponential decay model.​a) find the value of​ k, and write the equation.​b) estimate the population of the country in 2020.​c) after how many years will the population of the country be 2 ​million, according to this​ model?

Answers

a) The general form of an exponential decay model is of the form: P(t) = Pe^(kt) where P(t) is the population at time t, P is the initial population, k is the decay rate.

The initial population is given as 51.7 million, and the population 12 years later is 45.7 million. Therefore, 45.7 = 51.7e^(k(12)). Using the logarithmic rule of exponentials, we can write it as log(45.7/51.7) = k(12). Solving for k gives k = -0.032. Thus, the equation is P(t) = 51.7e^(-0.032t).

b) To estimate the population of the country in 2020, we need to determine how many years it is from 1995. Since 2020 - 1995 = 25, we can use t = 25 in the equation P(t) = 51.7e^(-0.032t) to get P(25) = 28.4 million. Therefore, the population of the country in 2020 is estimated to be 28.4 million.

c) To find how many years it takes for the population to be 2 million, we need to solve the equation 2 = 51.7e^(-0.032t) for t. Dividing both sides by 51.7 and taking the natural logarithm of both sides gives ln(2/51.7) = -0.032t. Solving for t gives t = 63.3 years. Therefore, according to this model, it will take 63.3 years for the population of the country to be 2 million.

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Sonali purchased some pants and skirts the numbers of skirts is 7 less than eight times the number of pants purchase also number of skirt is four less than five times the number of pants purchased purchased

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Sonali purchased some pants and skirts the numbers of skirts is 7 less than eight times the number of pants purchase also number of skirt is four less than five times the number of pants purchased is 1 pant and 1 skirt.

Let's denote the number of pants Sonali purchased as P and the number of skirts as S. We're given two pieces of information:

1. The number of skirts (S) is 7 less than eight times the number of pants (8P). This can be represented as S = 8P - 7.

2. The number of skirts (S) is also 4 less than five times the number of pants (5P). This can be represented as S = 5P - 4.

Now we have a system of two linear equations with two variables, P and S:

S = 8P - 7
S = 5P - 4

To solve the system, we can set the two expressions for S equal to each other:

8P - 7 = 5P - 4

Solving for P, we get:

3P = 3
P = 1

Now that we know P = 1, we can substitute it back into either equation to find S. Let's use the first equation:

S = 8(1) - 7
S = 8 - 7
S = 1

So, Sonali purchased 1 pant and 1 skirt.

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People living in Boston are hospitalized about 1.5 times as often as those living in New Haven, yet their health outcomes, based on age-specific mortality rates, appear to be identical. Does this mean that hospital care has no ability to improve health

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Health outcomes based on age-specific mortality rates seem identical among people living in Boston and those living in New Haven, even though those living in Boston are hospitalized about 1.5 times more often than those living in New Haven.

It may seem that hospital care has no ability to improve health based on the information given. However, a few possible explanations might help explain the data.First, it is important to note that hospitalization rates might be an imperfect proxy for health outcomes. People living in Boston might have more access to healthcare or preventive measures than those living in New Haven.

Thus, despite having higher hospitalization rates, people living in Boston might actually be healthier than those living in New Haven.

Therefore, their similar age-specific mortality rates might reflect this.Second, the quality of healthcare might differ between Boston and New Haven. Although hospital care has the potential to improve health, differences in the quality of healthcare might explain the lack of differences in age-specific mortality rates. People living in Boston might receive lower-quality healthcare than those living in New Haven. If this were the case, it might offset any benefits from being hospitalized more frequently.

Finally, it is possible that hospital care does not have a significant impact on health outcomes. For example, hospitalization might only provide short-term relief but not have a meaningful impact on long-term health outcomes. Alternatively, hospitalization might be associated with negative health outcomes, such as complications from surgery or infections acquired in the hospital.

In either case, the hospitalization rate might not be a good indicator of the impact of healthcare on health outcomes.In conclusion, the similar age-specific mortality rates among people living in Boston and New Haven, despite differences in hospitalization rates, might reflect a variety of factors. While hospital care has the potential to improve health, differences in healthcare access, healthcare quality, or the impact of hospitalization on health outcomes might explain the observed data.

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Evaluate the double integral ∬DyexdA, where D is the triangular region with vertices (0,0)2,4), and (6,0).
(Give the answer correct to at least two decimal places.)

Answers

The value of the double integral ∬DyexdA is approximately 358.80 (correct to two decimal places).

How to evaluate the double integral ∬DyexdA over the triangular region D?

To evaluate the double integral ∬DyexdA over the triangular region D, we need to set up the integral limits and then integrate in the correct order. Since the region is triangular, we can use the limits of integration as follows:

0 ≤ x ≤ 6

0 ≤ y ≤ (4/6)x

Thus, the double integral can be expressed as:

∬DyexdA = ∫₀⁶ ∫₀^(4/6x) yex dy dx

Integrating with respect to y, we get:

∬DyexdA = ∫₀⁶ [(exy/y)₀^(4/6x)] dx

= ∫₀⁶ [(ex(4/6x)/4/6x) - (ex(0)/0)] dx

= ∫₀⁶ [(2/3)ex] dx

Integrating with respect to x, we get:

∬DyexdA = [(2/3)ex]₀⁶

= (2/3)(e⁶ - 1)

Therefore, the value of the double integral ∬DyexdA is approximately 358.80 (correct to two decimal places).

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find the direction angle of v for the following vector. v=−73i 7j

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Therefore, the direction angle of vector v is approximately 175.25 degrees.

To find the direction angle of a vector, we use the inverse tangent function (atan2) with the y-component and x-component of the vector as parameters. In this case, the vector v has an x-component of -73 and a y-component of 7. By evaluating atan2(7, -73) using a calculator or math software, we find that the direction angle is approximately 175.25 degrees. This angle represents the counter-clockwise rotation from the positive x-axis to the vector v in the 2D plane. It provides information about the direction in which the vector is pointing relative to the reference axis.

θ = atan2(y, x)

θ = atan2(7, -73)

θ ≈ 175.25 degrees (rounded to two decimal places)

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Tuesday 4. 4. 1 Subtraction Life Skills Language Wednesday 4. 4. 2 Length Solve grouping word problems with whole numbers up to 8 Recognise symmetry in own body Recognise number symbol Answer question about data in pictograph Thursday Question 4. 3 Number recognition 4. 4. 3 Time Life Skills Language Life Skills Language Life Skills Language Friday 4. 1 Develop a mathematics lesson for the theme Wild Animals" that focuses on Monday's lesson objective: "Count using one-to-one correspondence for the number range 1 to 8" Include the following in your activity and number the questions correctly 4. 1. 1 Learning and Teaching Support Materials (LTSMs). 4. 12 Description of the activity. 4. 1. 3 TWO (2) questions to assess learners' understanding of the concept (2)​

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4.1 Develop a mathematics lesson for the theme "Wild Animals" that focuses on Monday's lesson objective: "Count using one-to-one correspondence for the number range 1 to 8".

Include the following in your activity and number the questions correctly:

4.1.1 Learning and Teaching Support Materials (LTSMs):

Animal flashcards or pictures (with numbers 1 to 8)

Counting objects (e.g., small animal toys, animal stickers)

4.1.2 Description of the activity:

Introduction (5 minutes):

Show the students the animal flashcards or pictures.

Discuss different wild animals with the students and ask them to name the animals.

Counting Animals (10 minutes):

Distribute the counting objects (e.g., small animal toys, animal stickers) to each student.

Instruct the students to count the animals using one-to-one correspondence.

Model the counting process by counting one animal at a time and touching each animal as you count.

Encourage the students to do the same and count their animals.

Practice Counting (10 minutes):

Display the animal flashcards or pictures with numbers 1 to 8.

Call out a number and ask the students to find the corresponding animal flashcard or picture.

Students should count the animals on the flashcard or picture using one-to-one correspondence.

Assessment Questions (10 minutes):

Question 1: How many elephants are there? (Show a flashcard or picture with elephants)

Question 2: Can you count the tigers and tell me how many there are? (Show a flashcard or picture with tigers and other animals)

Conclusion (5 minutes):

Review the concept of counting using one-to-one correspondence.

Ask the students to share their favorite animal from the activity.

4.1.3 TWO (2) questions to assess learners' understanding of the concept:

Question 1: How many lions are there? (Show a flashcard or picture with lions)

Question 2: Count the zebras and tell me how many there are. (Show a flashcard or picture with zebras and other animals)

Note: Adapt the activity and questions based on the students' age and level of understanding.

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Let X be a random variable with CDF Fx and PDF fx. Let Y=aX with a > 0. Compute the CDF and PDF of Y in terms of Fx and fx.

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Therefore, In summary, the CDF of Y is Fy(y) = Fx(y/a) and the PDF of Y is fy(y) = (1/a) * fx(y/a).

To find the CDF of Y, we use the definition:
Fy(y) = P(Y ≤ y) = P(aX ≤ y) = P(X ≤ y/a) = Fx(y/a)
To find the PDF of Y, we take the derivative of the CDF:
fy(y) = d/dy Fy(y) = d/dy Fx(y/a) = fx(y/a)/a
So the CDF of Y is Fy(y) = Fx(y/a) and the PDF of Y is fy(y) = fx(y/a)/a.

To compute the CDF and PDF of Y in terms of Fx and fx, follow these steps:
1. CDF of Y: We need to find Fy(y) which is the probability that Y is less than or equal to y, or P(Y ≤ y). Since Y = aX, we have P(aX ≤ y) or P(X ≤ y/a).
2. Using the definition of CDF, we can now write Fy(y) = Fx(y/a).
3. PDF of Y: To find fy(y), we need to differentiate Fy(y) with respect to y.
4. Using the chain rule, we get fy(y) = dFy(y)/dy = dFx(y/a) * d(y/a)/dy.
5. Notice that d(y/a)/dy = 1/a, therefore fy(y) = (1/a) * fx(y/a).

Therefore, In summary, the CDF of Y is Fy(y) = Fx(y/a) and the PDF of Y is fy(y) = (1/a) * fx(y/a).

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What is the formula needed for Excel to calculate the monthly payment needed to pay off a mortgage for a house that costs $189,000 with a fixed APR of 3. 1% that lasts for 32 years?



Group of answer choices which is the correct choice



=PMT(. 031/12,32,-189000)



=PMT(. 031/12,32*12,189000)



=PMT(3. 1/12,32*12,-189000)



=PMT(. 031/12,32*12,-189000)

Answers

Option 3 is correct.

The formula needed for Excel to calculate the monthly payment needed to pay off a mortgage for a house that costs

189,000with a fixed APR of 3.1

=PMT(3.1/12,32*12,-189000)

This formula uses the PMT function in Excel, which stands for "Present Value of an Annuity." The PMT function calculates the monthly payment needed to pay off a loan or series of payments with a fixed annual interest rate (the "APR") and a fixed number of payments (the "term").

In this case, we are calculating the monthly payment needed to pay off a mortgage with a fixed APR of 3.1% and a term of 32 years. The formula uses the PMT function with the following arguments:

Rate: 3.1/12, which represents the annual interest rate (3.1% / 12 = 0.0254)

Term: 32*12, which represents the number of payments (32 years * 12 payments per year = 384 payments)

Payment: -189000, which represents the total amount borrowed (the principal amount)

The PMT function returns the monthly payment needed to pay off the loan, which in this case is approximately 1,052.23

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To which family does the function y=(x 2)1/2 3 belong? a: quadratic b: square root c: exponential d :reciprocal

Answers

The function y = (x²)^(1/2) + 3 belongs to the family of square root functions.

What is a square root function?

A square root function is a function that has a variable that is the square root of the variable used in the function. A square root function has the general form:

                                           f(x) = a√(x - h) + k,

where a, h, and k are constants and a is not equal to 0.

A square root function is an inverse function to a quadratic function.

A square root function is a function that, when graphed, produces a curve with a domain (all possible values of x) of x ≥ 0 and a range (all possible values of y) of y ≥ 0, which means it is positive or zero for all values of x.

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Jenna is volunteering at the local animal shelter. After grooming some cats, the veterinarian on-site gave Jenna a slip of paper that read, "Thanks for volunteering! So far, you have groomed 0. 41 of the cats in the shelter. " What percent of the cats has Jenna groomed?

Answers

Jenna has groomed 0.41 of the cats in the shelter. To find the percentage of cats she has groomed, we multiply this decimal value by 100. Jenna has groomed 41% of the cats in the shelter.

To calculate the percentage, we need to convert the decimal value of 0.41 to a percentage. To do this, we multiply the decimal by 100. In this case, 0.41 * 100 = 41. Therefore, Jenna has groomed 41% of the cats in the shelter.

The percentage represents a portion of a whole, whereas 100% represents the entire amount. In this context, the whole is the total number of cats in the shelter, and the portion is the number of cats Jenna has groomed. By expressing Jenna's grooming progress as a percentage, we can easily understand and compare her contribution to the overall task. In this case, Jenna has groomed 41% of the cats, indicating a significant effort in helping care for the animals at the shelter.

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On a certain hot​ summer's day, 379 people used the public swimming pool. The daily prices are $1.50 for children and $2.25 for adults. The receipts for admission totaled $741.0. How many children and how many adults swam at the public pool that​ day?

Answers

Hence, there were 149 children and 230 adults who swam at the public pool that day.

Let the number of children who swam at the public pool that day be 'c' and the number of adults who swam at the public pool that day be 'a'.

Given that the total number of people who swam that day is 379.

Therefore,

c + a = 379   ........(1)

Now, let's calculate the total revenue for the day.

The cost for a child is $1.50 and for an adult is $2.25.

Therefore, the revenue generated by children = $1.5c and the revenue generated by adults = $2.25

a. Total revenue will be the sum of revenue generated by children and the revenue generated by adults. Hence, the equation is given as:$1.5c + $2.25a = $741.0  ........(2)

Now, let's solve the above two equations to find the values of 'c' and 'a'.

Multiplying equation (1) by 1.5 on both sides, we get:

1.5c + 1.5a = 568.5

Multiplying equation (2) by 2 on both sides, we get:

3c + 4.5a = 1482

Subtracting equation (1) from equation (2), we get:

3c + 4.5a - (1.5c + 1.5a) = 1482 - 568.5  

=>  1.5c + 3a = 913.5

Now, solving the above two equations, we get:

1.5c + 1.5a = 568.5  

=>  c + a = 379  

=>  a = 379 - c'

Substituting the value of 'a' in equation (3), we get:

1.5c + 3(379-c) = 913.5  

=>  1.5c + 1137 - 3c = 913.5  

=>  -1.5c = -223.5  

=>  c = 149

Therefore, the number of children who swam at the public pool that day is 149 and the number of adults who swam at the public pool that day is a = 379 - c = 379 - 149 = 230.

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If α and β are the zeroes of the quadratic polynomial f(x) = ax2 + bx + c, then evaluate : (i) α − β

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The expression α − β represents the difference between the two zeroes of the quadratic polynomial f(x).

To evaluate α − β, we need to find the values of α and β. In a quadratic polynomial of form ax^2 + bx + c, the zeroes (or roots) α and β can be found using the quadratic formula: x = (-b ± √(b^2 - 4ac)) / (2a).

Given that the quadratic polynomial is f(x) = ax^2 + bx + c, the zeroes α and β satisfy the equation f(α) = 0 and f(β) = 0.

Substituting α and β into the polynomial, we get:

f(α) = aα^2 + bα + c = 0,

f(β) = aβ^2 + bβ + c = 0.

We can rearrange these equations to isolate the term involving the difference α − β:

f(α) - f(β) = a(α^2 - β^2) + b(α - β) = 0.

Factoring out (α - β) from the equation, we have:

(α - β)(a(α + β) + b) = 0.

Since we know that f(x) = ax^2 + bx + c, the sum of the zeroes α + β is given by:

α + β = -b/a.

Substituting this value into the previous equation, we have:

(α - β)(-b + b) = 0,

(α - β)(0) = 0.

Therefore, α - β = 0.

The final answer is α - β = 0, indicating that the difference between the zeroes of the quadratic polynomial is zero, implying that the zeroes are equal.

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(Second Isomorphism Theorem) If K is a subgroup of G and N is a normal subgroup of G, prove that K/(K ∩ N) is isomorphic to KN/N

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We use the First Isomorphism Theorem to show that K/(K ∩ N) is isomorphic to the image of φ, which is φ(K) = {kN | k is in K}. Since φ is a homomorphism, φ(K) is a subgroup of KN/N. Moreover, φ is onto, meaning that every element of KN/N is in the image of φ. Therefore, by the First Isomorphism Theorem, K/(K ∩ N) is isomorphic to KN/N, completing the proof of the Second Isomorphism Theorem.

To prove the Second Isomorphism Theorem, we need to show that K/(K ∩ N) is isomorphic to KN/N, where K is a subgroup of G and N is a normal subgroup of G.

First, we define a homomorphism φ: K → KN/N by φ(k) = kN, where kN is the coset of k in KN/N. We need to show that φ is well-defined, meaning that if k1 and k2 are in the same coset of K ∩ N, then φ(k1) = φ(k2). This is true because if k1 and k2 are in the same coset of K ∩ N, then k1n = k2 for some n in N. Then φ(k1) = k1N = k1nn⁻¹N = k2N = φ(k2), showing that φ is well-defined.

Next, we show that φ is a homomorphism. Let k1 and k2 be elements of K. Then φ(k1k2) = k1k2N = k1Nk2N = φ(k1)φ(k2), showing that φ is a homomorphism.

Now we show that the kernel of φ is K ∩ N. Let k be an element of K. Then φ(k) = kN = N if and only if k is in N. Therefore, k is in the kernel of φ if and only if k is in K ∩ N, showing that the kernel of φ is K ∩ N.

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What is the logarithmic function for log2 7 = x

Answers

Step-by-step explanation:

log2 (7) = x  

2^(log2(7) )  = 2^x

        7 = 2^x                   <======this may be what you want

   

Tracy works at North College as a math teacher. She will be paid $900 for each credit hour she teaches. During the course of her first year of teaching, she would teach a total of 50 credit hours. The college expects her to work a minimum of 170 days (and less and her salary would be reduced) and 8 hours each day. What is her gross monthly income?.

Answers

Tracy works at North College as a math teacher. She will be paid $900 for each credit hour she teaches. During the course of her first year of teaching, she would teach a total of 50 credit hours.

The college expects her to work a minimum of 170 days (and less and her salary would be reduced) and 8 hours each day. Her gross monthly income is $12,150.

The total number of hours Tracy works is given by;

Total number of hours Tracy works = Number of days she works in a year x Number of hours per day.

Number of days she works in a year = 170Number of hours per day = 8.

Total number of hours Tracy works = 170 × 8

= 1360.

Each credit hour Tracy teaches is paid for $900.

Therefore, for all the credit hours she teaches in a year, she will be paid for $900 × 50 = $45,000.In order to get Tracy's monthly gross income, we need to divide the total amount of money Tracy will be paid in a year by 12 months.$45,000 ÷ 12 = $3750.

Then, we can calculate the gross monthly income of Tracy by adding her salary per month and her total hourly work salary. The total hourly work salary is equal to the product of the total number of hours Tracy works and the amount she is paid per hour which is $900. Therefore, her monthly gross income will be:$3750 + ($900 × 1360) = $12,150. Answer: $12,150.

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Let F=(5xy, 8y2) be a vector field in the plane, and C the path y=6x2 joining (0,0) to (1,6) in the plane. Evaluate F. dr Does the integral in part(A) depend on the joining (0, 0) to (1, 6)? (y/n)

Answers

The line integral is independent of the choice of path, it does not depend on the specific joining of (0, 0) to (1, 6). Hence, the answer is "n" (no).

To evaluate the line integral of F.dr along the path C, we need to parameterize the curve C as a vector function of t.

Since the curve is given by y = 6x^2, we can parameterize it as r(t) = (t, 6t^2) for 0 ≤ t ≤ 1.

Then dr = (1, 12t)dt and we have:

F.(dr) = (5xy, 8y^2).(1, 12t)dt = (5t(6t^2), 8(6t^2)^2).(1, 12t)dt = (30t^3, 288t^2)dt

Integrating from t = 0 to t = 1, we get:

∫(F.dr) = ∫(0 to 1) (30t^3, 288t^2)dt = (7.5, 96)

So the line integral of F.dr along the path C is (7.5, 96).

Since the line integral is independent of the choice of path, it does not depend on the specific joining of (0, 0) to (1, 6). Hence, the answer is "n" (no).

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i will mark brainlist

Answers

Answer:

11. [B] 90

12. [D] 152

13. [B] 16

14. [A]  200

15. [C] 78

Step-by-step explanation:

 Given table:

                                                      Traveled on Plan  

                                                          Yes            No                     Total

Age                          Teenagers         A                62                      B

Group                          Adult               184            C                         D

                                    Total                274           E                        352

Let's start with the first column.

Teenagers(A) + Adult (184) = Total 274.

Since, A + 184 = 274. Thus, 274 - 184 = 90

Hence, A = 90

274 + E = 352

352 - 274 = 78

Hence, E = 78

Since E = 78, Then 62 + C = 78(E)

78 - 62 = 16

Thus, C = 16

Since, C = 16, Then 184 + 16(C) = D

184 + 16 = 200

Thus, D = 200

Since, D = 200, Then B + 200(D) = 352

b + 200 = 352

352 - 200 = 152

Thus, B = 152

As a result, our final table looks like this:

                                                      Traveled on Plan  

                                                          Yes            No                     Total

Age                          Teenagers         90               62                      152

Group                          Adult               184              16                      200

                                    Total                274           78                        352

And if you add each row or column it should equal the total.

Column:

90 + 62 = 152

184 + 16 = 200

274 + 78 = 352

Row:

90 + 184 = 274

62 + 16 = 78

152 + 200 = 352

RevyBreeze

Answer:

11. b

12. d

13. b

14. a

15. c

Step-by-step explanation:

11. To get A subtract 184 from 274

274-184=90.

12. To get B add A and 62. note that A is 90.

62+90=152.

13. To get C you will have to get D first an that will be 352-B i.e 352-152=200. since D is 200 C will be D-184 i.e 200-184=16

14. D is 200 as gotten in no 13

15. E will be 62+C i.e 62+16=78

Devon’s tennis coach says that 72% of Devon’s serves are good serves. Devon thinks he has a higher proportion of good serves. To test this, 50 of his serves are randomly selected and 42 of them are good. To determine if these data provide convincing evidence that the proportion of Devon’s serves that are good is greater than 72%, 100 trials of a simulation are conducted. Devon’s hypotheses are: H0: p = 72% and Ha: p > 72%, where p = the true proportion of Devon’s serves that are good. Based on the results of the simulation, the estimated P-value is 0. 6. Using Alpha= 0. 05, what conclusion should Devon reach?




Because the P-value of 0. 06 > Alpha, Devon should reject Ha. There is convincing evidence that the proportion of serves that are good is more than 72%.


Because the P-value of 0. 06 > Alpha, Devon should reject Ha. There is not convincing evidence that the proportion of serves that are good is more than 72%.


Because the P-value of 0. 06 > Alpha, Devon should fail to reject H0. There is convincing evidence that the proportion of serves that are good is more than 72%.


Because the P-value of 0. 06 > Alpha, Devon should fail to reject H0. There is not convincing evidence that the proportion of serves that are good is more than 72%

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no lo sé Rick parece falso porfa

suppose a and s are n × n matrices, and s is invertible. suppose that det(a) = 3. compute det(s −1as) and det(sas−1 ). justify your answer using the theorems in this section.

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Both [tex]det(s^(-1)as) and det(sas^(-1))[/tex]are equal to 3.

To compute [tex]det(s^(-1)as) and det(sas^(-1))[/tex], we can utilize the following properties and theorems:

The determinant of a product of matrices is equal to the product of their determinants: det(AB) = det(A) * det(B).

The determinant of the inverse of a matrix is the inverse of the determinant of the original matrix: [tex]det(A^(-1)) = 1 / det(A)[/tex].

Using these properties, let's compute the determinants:

[tex]det(s^(-1)as)[/tex]:

Applying property 1, we have [tex]det(s^(-1)as) = det(s^(-1)) * det(a) * det(s).[/tex]

Since s is invertible, its determinant det(s) is nonzero, and using property 2, we have [tex]det(s^(-1)) = 1 / det(s)[/tex].

Combining these results, we get:

[tex]det(s^(-1)as) = (1 / det(s)) * det(a) * det(s) = (1 / det(s)) * det(s) * det(a) = det(a) = 3.[/tex]

det(sas^(-1)):

Again, applying property 1, we have [tex]det(sas^(-1)) = det(s) * det(a) * det(s^(-1)).[/tex]

Using property 2, [tex]det(s^(-1)) = 1 / det(s)[/tex], we can rewrite the expression as:

[tex]det(sas^(-1)) = det(s) * det(a) * (1 / det(s)) = det(a) = 3.[/tex]

Therefore, both [tex]det(s^(-1)as) and det(sas^(-1))[/tex]are equal to 3.

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A collection of 40 coins is made up of dimes and nickles and is worth $2. 60. Find how many were


dimes and how many were nickels.

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The question that needs to be answered is "A collection of 40 coins is made up of dimes and nickels and is worth $2.60. Find how many were dimes and how many were nickels. According to the solving 28 dimes and 12 nickels were there.

"Given, There are 40 coins in total. Let the number of nickels be x and the number of dimes be y. Then the total value of coins is $2.60, which can be expressed in terms of the number of nickels and dimes:x + y = 40 ...(1)0.05x + 0.10y = 2.60  ...(2)Multiplying the first equation by 0.05, we get:

0.05x + 0.05y = 2 ... (3)

Subtracting equation (3) from equation (2), we get:

0.10y - 0.05y

= 2.6 - 2

=> 0.05y

= 0.6

=> y = 12

We can use the elimination method to solve the equations.

Multiplying equation (1) by 0.05, we get:

0.05x + 0.05y = 2 ...(3)

Now, subtracting equation (3) from equation (2), we get:

0.10y - 0.05y = 2.60 - 2 => 0.05y = 0.6 => y = 12

Therefore, the number of dimes is 28 (40-12) and the number of nickels is 12. Answer: 28 dimes and 12 nickels were there.

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onsider the curve given by the parametric equations x=t(t2−192),y=3(t2−192) x=t(t2−192),y=3(t2−192) a.) determine the point on the curve where the tangent is horizontal.

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To find the point on the curve where the tangent is horizontal, we need to find the value(s) of t for which the derivative of y with respect to x (i.e., dy/dx) is equal to zero.

First, we can find the derivative of y with respect to x using the chain rule:

dy/dx = (dy/dt) / (dx/dt)

We have

dx/dt = 3t^2 - 192

dy/dt = 6t

Therefore:

dy/dx = (dy/dt) / (dx/dt) = (6t) / (3t^2 - 192)

To find the values of t where dy/dx = 0, we need to solve the equation:

6t / (3t^2 - 192) = 0

This equation is satisfied when the numerator is equal to zero, which occurs when t = 0.

To confirm that the tangent is horizontal at t = 0, we can check the second derivative:

d^2y/dx^2 = d/dx (dy/dt) / (dx/dt)

         = [d/dt ((6t) / (3t^2 - 192)) / (dx/dt)] / (dx/dt)

         = (6(3t^2 - 192) - 12t^2) / (3t^2 - 192)^2

         = -36 / 36864

         = -1/1024

Since the second derivative is negative, the curve is concave down at t = 0. Therefore, the point on the curve where the tangent is horizontal is (x,y) = (0, -576).

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TRUE/FALSE. The R command "qchisq(0.05,12)" is for finding the chi-square critical value with 12 degrees of freedom at alpha = 0.05.

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In this case, the R command "qchisq(0.05,12)" returns the critical value of the chi-square distribution with 12 degrees of freedom at the probability level of 0.05, which is used to determine whether the test statistic falls in the rejection region or not in a statistical test.

True. The R command "qchisq(p, df)" is used to find the critical value of the chi-square distribution with "df" degrees of freedom at the specified probability level "p". In this case, "qchisq(0.05,12)" returns the critical value of the chi-square distribution with 12 degrees of freedom at the probability level of 0.05.

The chi-square distribution is a family of probability distributions that arise in many statistical tests, such as the chi-square test of independence, goodness of fit tests, and tests of association in contingency tables.

The distribution is defined by its degrees of freedom (df), which determines its shape and location. The critical value of the chi-square distribution is the value at which the probability of obtaining a more extreme value is equal to the specified level of significance (alpha).

Therefore, in this case, the R command "qchisq(0.05,12)" returns the critical value of the chi-square distribution with 12 degrees of freedom at the probability level of 0.05, which is used to determine whether the test statistic falls in the rejection region or not in a statistical test.

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The Riemann zeta-function ζ is defined as ζ(x)=∑[infinity]n=11nx and is used in number theory to study the distribution of prime numbers. What is the domain of ζ?

Answers

The Riemann zeta-function is defined for all complex numbers x with real part greater than 1, that is, the domain of ζ is {x ∈ C : Re(x) > 1}.

However, the zeta function can be analytically extended to a meromorphic function on the whole complex plane except for a simple pole at x = 1, where it has a limit of infinity.

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this is getting really confusing now

Answers

Answer:

5

Step-by-step explanation:

solve normally

subtract the denominator

10-6 gives 4

20/4

gives 5

10-6 is 4 now it is 20/4 the bar separating 20 and 4 means divide so the answer:5

3. The table shows the number of contacts six people each have stored in their cell phone. Cell Phone Contracts Person Number of Contracts Mary 68 Wes 72 Keith 77 Julie 64 Anthony 69 Lan 76 What is the mean absolute deviation for this set of data?​

Answers

The mean absolute deviation (MAD) for the given set of data is 4.83 contacts.

The mean absolute deviation (MAD) for this set of data is 4.83 contacts. MAD is a measure of how much the data values deviate from the mean on average. It provides information about the variability or dispersion of the data set. In this case, the mean of the data set is calculated by summing up all the values and dividing by the number of values. The absolute deviation for each value is obtained by subtracting the mean from each individual value and taking the absolute value to eliminate any negative signs. These absolute deviations are then averaged to find the MAD.

MAD is a measure of how spread out the data values are from the mean. To calculate the MAD, we first find the mean of the data set, which is the sum of all the values divided by the number of values (68 + 72 + 77 + 64 + 69 + 76) / 6 = 426 / 6 = 71. Next, we find the absolute deviation for each value by subtracting the mean from each individual value and taking the absolute value. The absolute deviations for each value are: 68 - 71 = 3, 72 - 71 = 1, 77 - 71 = 6, 64 - 71 = 7, 69 - 71 = 2, and 76 - 71 = 5. Then, we calculate the mean of these absolute deviations, which is (3 + 1 + 6 + 7 + 2 + 5) / 6 = 24 / 6 = 4. Finally, the MAD is 4.83, rounded to two decimal places.

In simpler terms, the MAD of 4.83 means that, on average, each person's number of contacts deviates from the mean by approximately 4.83 contacts. This indicates that the number of contacts stored in the cell phones of these six individuals is relatively close together, with relatively small variations from the mean value.

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If event E and F form the whole sample space, S, Pr(E)=0.7, and Pr(F)=0.5, then pick the correct options from below. Pr(EF) = 0.2 Pr(EIF)=2/5. Pr(En F) = 0.3 Pr(E|F)=3/5 Pr(E' UF') = 0.8 Pr(FE) = 4/7

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In summary, the correct options for the probability are "Pr(EF) = 0.2", "Pr(E' UF') = 0.8", and "Pr(FE) = 4/7", while the incorrect options are "Pr(EIF) = 2/5", "Pr(E n F) = 0.3", and "Pr(E|F) = 3/5".

Given that event E and F form the whole sample space, S, and Pr(E)=0.7, and Pr(F)=0.5, we can use the following formulas to calculate the probabilities:

Pr(EF) = Pr(E) + Pr(F) - Pr(EuF) (the inclusion-exclusion principle)

Pr(E'F') = 1 - Pr(EuF) (the complement rule)

Pr(E|F) = Pr(EF) / Pr(F) (Bayes' theorem)

Using these formulas, we can evaluate the options provided:

Pr(EF) = Pr(E) + Pr(F) - Pr(EuF) = 0.7 + 0.5 - 1 = 0.2. Therefore, the option "Pr(EF) = 0.2" is correct.

Pr(EIF) = Pr(E' n F') = 1 - Pr(EuF) = 1 - 0.2 = 0.8. Therefore, the option "Pr(EIF) = 2/5" is incorrect.

Pr(E n F) = Pr(EF) = 0.2. Therefore, the option "Pr(E n F) = 0.3" is incorrect.

Pr(E|F) = Pr(EF) / Pr(F) = 0.2 / 0.5 = 2/5. Therefore, the option "Pr(E|F) = 3/5" is incorrect.

Pr(E' U F') = 1 - Pr(EuF) = 0.8. Therefore, the option "Pr(E' UF') = 0.8" is correct.

Pr(FE) = Pr(EF) / Pr(E) = 0.2 / 0.7 = 4/7. Therefore, the option "Pr(FE) = 4/7" is correct.

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Use the formula r = (F/P)^1/n - 1 to find the annual inflation rate to the nearest tenth of a percent. A rare coin increases in value from $0. 25 to 1. 50 over a period of 30 years

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over the period of 30 years, the value of the rare coin has decreased at an average annual rate of approximately 90.3%.

The formula you provided is used to calculate the annual inflation rate, given the initial value (P), the final value (F), and the number of years (n).

In this case, the initial value (P) is $0.25, the final value (F) is $1.50, and the number of years (n) is 30.

To find the annual inflation rate, we can rearrange the formula as follows:

r = (F/P)^(1/n) - 1

Substituting the given values:

r = ($1.50/$0.25)^(1/30) - 1

Simplifying the expression within the parentheses:

r = 6^(1/30) - 1

Using a calculator to evaluate the expression:

r ≈ 0.097 - 1

r ≈ -0.903

The annual inflation rate is approximately -0.903 or -90.3% (to the nearest tenth of a percent). Note that the negative sign indicates a decrease in value or deflation rather than inflation.

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let q be an orthogonal matrix. show that |det(q)|= 1.

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To show that the absolute value of the determinant of an orthogonal matrix Q is equal to 1, consider the following properties of orthogonal matrices:

1. An orthogonal matrix Q satisfies the condition Q * Q^T = I, where Q^T is the transpose of Q, and I is the identity matrix.

2. The determinant of a product of matrices is equal to the product of their determinants, i.e., det(AB) = det(A) * det(B).

Using these properties, we can proceed as follows:

Since Q * Q^T = I, we can take the determinant of both sides:
det(Q * Q^T) = det(I).

Using property 2, we get:
det(Q) * det(Q^T) = 1.

Note that the determinant of a matrix and its transpose are equal, i.e., det(Q) = det(Q^T). Therefore, we can replace det(Q^T) with det(Q):
det(Q) * det(Q) = 1.

Taking the square root of both sides gives us:
|det(Q)| = 1.

Thus, we have shown that |det(Q)| = 1 for an orthogonal matrix Q.

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Marilyn sold 16 raffle tickets last week. This week her tickets sales increased by about 75%. How many tickets did Marilyn sell this week?

Answers

Marilyn sold approximately 28 raffle tickets this week, representing a 75% increase from the previous week's sales.

To find out how many tickets Marilyn sold this week, we first need to determine the 75% increase from last week's sales. Since Marilyn sold 16 tickets last week, we can calculate the increase by multiplying 16 by 0.75 (75% expressed as a decimal). The result is 12, indicating that Marilyn's ticket sales increased by 12 tickets.

To determine the total number of tickets sold this week, we add the increase of 12 to last week's sales of 16 tickets. This gives us a total of 28 tickets sold this week. Therefore, Marilyn sold approximately 28 raffle tickets this week, representing a 75% increase from the previous week's sales of 16 tickets.

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you can buy a pair of 1.75 diopter reading glasses off the rack at the local pharmacy. what is the focal length of these glasses in centimeters ?

Answers

the focal length of these glasses is approximately 57.14 centimeters.

The focal length (f) of a lens in centimeters is given by the formula:

1/f = (n-1)(1/r1 - 1/r2)

For reading glasses, we can assume that the lens is thin and has a uniform thickness, so we can use the simplified formula:

1/f = (n-1)/r

D = 1/f (in meters)

So we can convert the diopter power (P) of the reading glasses to the focal length (f) in centimeters using the formula:

P = 1/f (in meters)

f = 1/P (in meters)

f = 100/P (in centimeters)

For 1.75 diopter reading glasses, we have:

f = 100/1.75

f = 57.14 centimeters

Therefore, the focal length of these glasses is approximately 57.14 centimeters.

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