The 95% confidence interval for the population mean is approximately (61.91 inches, 64.89 inches)
To construct the 95% confidence interval for the population mean, we will use the given information and the formula:
[tex]Lower Bound = Point Estimate - (1.96)(\frac{s}{\sqrt{n} } )[/tex]
[tex]Lower Bound = Point Estimate +(1.96)(\frac{s}{\sqrt{n} } )[/tex]
In this case, the point estimate is the mean height of the sample, which is 63.4 inches. The standard deviation (s) is 2.4, and the sample size (n) is 10. Now we can plug these values into the formula:
[tex]Lower Bound = 63.4 - (1.96)\frac{2.4}{\sqrt{10} } = 63.4 - (1.96)(0.759) = 63.4 - 1.489 = 61.91[/tex]
[tex]Upper Bound = 63.4 + (1.96)\frac{2.4}{\sqrt{10} } = 63.4 + (1.96)(0.759) = 63.4 + 1.489 = 64.89[/tex]
Therefore, the 95% confidence interval for the population mean is approximately (61.91 inches, 64.89 inches).
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What is the average rate of change for this quadratic function for the interval
from x=-4 to x = -2?
A. 6
B. -12
C. -6
OD. 12
The average rate of change of the given function graph between the two given values is: 6
How to find the average rate of change of a function?The Average Rate of Change of a function is one that is defined as the average rate at which one quantity is changing with respect to another thing changing. Thus, an average rate of change function is basically a process that helps to calculate the amount of change in one item divided by the corresponding amount of change in another.
It is given by the formula:
f'(x) = [f(b) - f(a)]/(b - a)
From the graph attached, we have that:
f(-4) = -6
f(-2) = 6
Thus:
f'(x) = (6 - (-6))/(-2 - (-4))
f'(x) = (6 + 6)/(-2 + 4)
f'(x) = 6
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What is the equation of the following line written in general form (4,5) (1,2)
The equation of the line written in general form (4,5) (1,2) is y - x = 1.
The formula to find the line equation from two points is as follows -
(y - [tex] y_{1}[/tex])/(x - [tex] x_{1}[/tex]) = ([tex] y_{2}[/tex] - [tex] y_{1}[/tex])/([tex] x_{2}[/tex] - [tex] x_{1}[/tex]). In the formula, [tex] y_{1}[/tex] and [tex] y_{2}[/tex] are initial and final y-axis values and [tex] x_{1}[/tex] and [tex] x_{2}[/tex] are initial and final x-axis values.
Keep the values in formula to find the equation -
(y - 5)/(x - 4) = (2 - 5)/(1 - 4)
Simplifying the equation
(y - 5)/(x - 4) = -3/-3
Divide the values
(y - 5)/(x - 4) = 1
Rewriting the equation
(y - 5) = (x - 4)
Rearranging the equation
y - x = 5 - 4
y - x = 1
Hence, the equation of line is y - x = 1.
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Rose works a concession stand at a football game that sells whole pretzels and bottle of water.
Each pretzel sells for $2.50 and each bottle of water sells for $1.00
Rose collected $135 in sales
Rose sold a total of 87 items at the past game
Enter the number of pretzels rose sold at the game
Rose sold 53.6 pretzels.
P x ? + W = 135
2.50 x 53.6 + 1.00 = 135
Study Guide:
What are the assumptions (or conditions) required for the Intermediate Value Theorem?
The Intermediate Value Theorem states that for any value c between the function's values at the endpoints (f(a) and f(b)), there exists a value x in the interval [a, b] such that f(x) = c.
The assumptions (or conditions) required for the Intermediate Value Theorem are:
1. The function is continuous: The function must be continuous on the closed interval [a, b]. This means that there are no breaks, jumps, or holes in the graph of the function within the given interval.
2. The interval is closed and bounded: The interval [a, b] must be a closed interval, meaning it includes both endpoints a and b. Additionally, the interval must be bounded, meaning the function has a maximum and a minimum value within the interval.
By satisfying these two assumptions, the Intermediate Value Theorem states that for any value c between the function's values at the endpoints (f(a) and f(b)), there exists a value x in the interval [a, b] such that f(x) = c.
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Help me pls. 20 points.
Answer: 2/3 or 12/18
Step-by-step explanation:
Pete, the skateboarding penguin, practices on a ramp in the shape of a right triangular prism
as shown below.
I need help ASAP!!! please
Of course! I'm here to help. Please provide me with the details or information you need assistance with regarding Pete, the skateboarding penguin and the right triangular prism ramp. I'll do my best to provide you with prompt and accurate help.
Any equation is given
40=x^2-3x
What is one solution to the equation?
The solution of the quadratic equation, 40 = x² - 3x is x = 8 or x = -5.
How to solve quadratic equation?Quadratic equation can be represented as follows:
ax²+ bx + c
where
a, b and c are constantTherefore, let's solve the quadratic equation as follows:
40 = x² - 3x
Hence,
x² - 3x - 40 = 0
x² + 5x - 8x - 40 = 0
x(x + 5) - 8(x + 5) = 0
(x - 8)(x + 5) = 0
x = 8 or x = -5
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b) Another larger triangle is made from smaller, similar triangles. The perimeter
of this larger triangle is 32 times larger than the perimeter of one of the smaller
triangles.
How many smaller triangles are used to form this larger triangle?
The number of smaller triangles used to fill the larger triangle is given as follows:
1024 triangles.
How to obtain the number of smaller triangles?The perimeter of the larger triangle is 32 times larger than the perimeter of one of the smaller triangles, which means that the ratio of the areas is given as follows:
32² = 1024.
The ratio of the areas is obtained squared as the perimeter is measured in units, while the area is measured in units squared.
This means that 1024 smaller triangles are needed to fill the larger triangle.
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Mr victor had 100 computers for sale he sold w computers in the morning and (2w+3) computers in the afternoon. He had 7computers left. How many computers did he sell in the morning?
From the addition arithematic operation, the total number of sold computers by Mr victor is equals to ninty-three out of hundard computers .
Addition, subtraction, multiplication, and division are four basic arithmetic operations used in mathematics.
Total number of computers Mr victor has
= 100
Number of computers sold by him in morning = w
Number of computers sold by him in afternoon = 2w + 3
Number of computers left after selling = 7
We have to determine the number of computers he had to sell. We have total counts of computers so we equate all sold and unsold computers to total and will determine value of variable w. Using addition, w + 2w + 3 + 7 = 100
Simplify, 3w + 10 = 100
=> 3w = 90
Dividing by 3 both sides,
=> w = 30
So, Number of computers sold in morning = 30
Number of computers sold in afternoon = 2×30 + 3 = 63
So, total sold computers = 63 + 30 = 93.
Hence, required value is 93.
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please find M, ill give brainliest if youre correct
Answer: m∠1=76.5
Step-by-step explanation:
x+y/2
71+82/2
153/2
76.5
Hope this helps! :)
PLEASE HELP ME TO SOLVE THIS QUESTION
3.Xavier's salary increases by 2% each year.
In 2010 , his salary was £40,100
i) Calculate his salary in 2015 and give your answer to the nearest pound.
ii) In which year did Xavier's salary first greater than £47,500
i) Based on exponential growth, Xavier's salary in 2015 is £44,274.
ii) The year that Xavier's salary first became greater than £47,500 would be 2019.
What is exponential function?Exponential functions show the relationship between two variables and a variable exponent with a periodic constant rate of growth or decay in the value of something
Annual increase in Xavier's salary = 2% or 0.02
Xavier's salary in 2010 = £40,100
The number of years between 2015 and 2010 = 5 years
Exponential Function:i) y = £40,100(1.02)^5
= £44,273.64
= £44,274
ii) £47,500 = £40,100(1.02)^t
t = 9 years
= 2019 (2010 + 9)
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The president of Doerman Distributors, Inc., believes that 27% of the firm's orders come from first-time cu:
sample of 100 orders will be used to estimate the proportion of first-time customers. Use z-table.
0.30. What is the sampling distribution of p for this study?
a. Assume that the president is correct and p
=
Hint(s) Che
A normal distribution because np and n(1-p) are both greater than 5 v
b. What is the probability that the sample proportion will be between 0.20 and 0.40 (to 4 decimals)?
c. What is the probability that the sample proportion will be between 0.25 and 0.35 (to 4 decimals)?
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Partially Correct
The president of Doerman Distributors, Inc., believes that 27% of the firm's orders come from first-time cu:
sample of 100 orders will be used to estimate the proportion of first-time customers. Use z-table.
0.30. What is the sampling distribution of p for this study?
a. Assume that the president is correct and p
=
Hint(s) Che
A normal distribution because np and n(1-p) are both greater than 5 v
b. What is the probability that the sample proportion will be between 0.20 and 0.40 (to 4 decimals)?
c. What is the probability that the sample proportion will be between 0.25 and 0.35 (to 4 decimals)?
Hide Feedback
Partially Correct
Answer:
Step-by-step explanation:
Please mark me the brainliest
a. Since the sample size is large enough (n=100) and the expected number of first-time customers (np=27) and the expected number of repeating customers (n(1-p)=73) are both greater than 5, we can assume that the sampling distribution of the sample proportion p is approximately normal with mean μ=p=0.27 and standard deviation σ=sqrt[p(1-p)/n]=sqrt[(0.27)(0.73)/100]=0.046.
b. To find the probability that the sample proportion will be between 0.20 and 0.40, we need to standardize the values using the formula z = (x - μ) / σ, where x is the sample proportion, μ is the population proportion, and σ is the standard deviation of the sampling distribution of p. Then we can use a standard normal distribution table (z-table) to find the corresponding probabilities.
z(0.20) = (0.20 - 0.27) / 0.046 = -1.52
z(0.40) = (0.40 - 0.27) / 0.046 = 2.83
Using the z-table, the probability of getting a z-score between -1.52 and 2.83 is approximately 0.9747. Therefore, the probability that the sample proportion will be between 0.20 and 0.40 is 0.9747 (to 4 decimals).
c. To find the probability that the sample proportion will be between 0.25 and 0.35, we can follow the same steps as in part b:
z(0.25) = (0.25 - 0.27) / 0.046 = -0.43
z(0.35) = (0.35 - 0.27) / 0.046 = 1.74
Using the z-table, the probability of getting a z-score between -0.43 and 1.74 is approximately 0.5267. Therefore, the probability that the sample proportion will be between 0.25 and 0.35 is 0.5267 (to 4 decimals).
Darrien and his family are at a football game. Darrien’s dad gives him $22 to buy snacks. He finds that drinks cost $1.50 and a bowl of nachos cost $2.75. Write and graph an inequality that shows the amount of sodas and nachos that Darien can afford to buy.
Find the P-hate and E by using the given confidence
interval (0.444, 0.484)
p-hate=
E=
The true population proportion and the sample proportion, given the confidence level and sample size.
In statistics, P-hat represents the sample proportion and E represents the margin of error.
Given a confidence interval of (0.444, 0.484), we can find P-hat and E as follows:
P-hat = (lower limit + upper limit) / 2
P-hat = (0.444 + 0.484) / 2
P-hat = 0.464
Therefore, the sample proportion (P-hat) is 0.464.
To find E (the margin of error), we need to use the formula:
E = (upper limit - lower limit) / 2
E = (0.484 - 0.444) / 2
E = 0.02
Therefore, the margin of error (E) is 0.02.
Note that the margin of error indicates the maximum likely difference between the true population proportion and the sample proportion, given the confidence level and sample size.
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3. Convert the given Infix expression "A+B* C + D" to Postfix expression using Stack. (2 marks)
The postfix expression for the given infix expression is "A B C * + D +".
To convert the infix expression "A+B*C+D" to postfix expression using a stack, we can follow these steps:
Create an empty stack and an empty output queue.
Process each symbol in the infix expression from left to right.
If the symbol is an operand (e.g. A, B, C, D), add it to the output queue.
If the symbol is an operator (e.g. +, *), then do the following:
a. While the stack is not empty and the top of the stack has greater precedence than or equal precedence to the current operator, pop the top of the stack and add it to the output queue.
b. Push the current operator onto the stack.
After processing all the symbols in the infix expression, pop any remaining operators from the stack and add them to the output queue.
Using this algorithm, we can convert the infix expression "A+B*C+D" to postfix expression as follows:
Symbol: A + B * C + D
Action: Push A Push + Push B Push * Push C Pop * Pop + Push D
Output: A B C * + D +
Therefore, the postfix expression for the given infix expression is "A B C * + D +".
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an orange juice company sells a can of frozen orange juice that measures 9.4 centimeters in height and 8.5 centimeters in diameter. the company wants to design a new label for the can of juice. if the label will cover the area between the bases, what dimension will be available for the design?
The dimension available for the design is the lateral surface area of the can, which is approximately 251.33 square centimeters.
The area between the bases of the can is the lateral surface area of the can, which can be calculated using the formula:
Lateral surface area = 2 x π x r x h
where π is the mathematical constant pi (approximately 3.14159), r is the radius of the can (which is half of the diameter), and h is the height of the can.
In this case, the height of the can is given as 9.4 centimeters, and the diameter (and hence the radius) is given as 8.5/2 = 4.25 centimeters.
Plugging in these values, we get:
Lateral surface area = 2 x π x 4.25 cm x 9.4 cm
= 251.327 square centimeters
Therefore, the dimension available for the design is the lateral surface area of the can, which is approximately 251.33 square centimeters.
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Question 1
A town's population has been exponentially increasing for the past 10 years. The town council initially recorded the town's
population at 6,000 people and tracked it each year after that. The table represents their data.
Years
1
2
3
4
6
7
8
9
Town Population
(in thousands)
6
Part A
6.9
9
10.5
13
14.2
18
20.8
26
31.3
Use the graphing tool to plot the population data and determine the curve of best fit.
Question
What is the equation of the curve of best fit for the population data?
Enter the correct answer in the box by replacing a and b with the values from the graphing tool. Do not round the values
A and b
The equation of best fit is ŷ = 2.69152X + 3.45818.
From the data we cab write,
Sum of X = 45
Sum of Y = 155.7
Mean X = 4.5
Mean Y = 15.57
Sum of squares (SSX) = 82.5
Sum of products (SP) = 222.05
So, Regression Equation = ŷ = bX + a
Now, b = SP/SSX = 222.05/82.5 = 2.69152
and, a = MY - bMX = 15.57 - (2.69*4.5) = 3.45818
Thus, the equation of best fit is ŷ = 2.69152X + 3.45818.
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Suppose the trip take 3 hours and 15 minutes of driving time for the 124-mile round trip. What is the average speed of the buses in miles per hour?
The average speed of the buses is approximately 19.08 miles per hour.
We have,
If the trip takes 3 hours and 15 minutes of driving time, that's a total of 3.25 hours.
The distance traveled is 124 miles round trip, so the distance traveled in one direction is half of that or 62 miles.
To find the average speed of the buses in miles per hour, we can use the formula:
average speed = distance/time
where distance is in miles and time is in hours.
So, the average speed of the buses in miles per hour is:
Average speed
= 62 miles / 3.25 hours
= 19.0769 miles per hour (rounded to 4 decimal places)
Therefore,
The average speed of the buses is approximately 19.08 miles per hour.
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Help fast pls Geometry
Answer:
64.141 cm ^2
Step-by-step explanation:
Formula for solving this is Pi(7^2) (170/360)
170 being the angle in degrees.
A chain saw requires 5 hours of assembly and a wood chipper 2 hours. A maximum of 20 hours of assembly time is
available. The profit is $190 on a chain saw and $210 on a chipper. How many of each should be assembled for
maximum profit?
An assembly time, chain saw requires 5 hours of assembly and a wood chipper 2 hours. From linear programming for maximum profit, number of chain saw assembled are 0 and number of wood chipper are 10.
This problem is related to the topic of linear programming. We use a graphical method to solve the equation. To determine the maximum profit we write the equation of profit. Let we consider x chain saw and y wood chipper. We have a chain saw requires 5 hours of assembly. But wood chipper require 2 hours of assembly. Maximum hours of assembly time available = 20 hours
So, 5x + 2y ≤ 20 --(1) and x ≥ 0, y≥ 0
Profit of chain saw = $190
Profit on wood chipper = $210
Maximize profit, Max Z = 190x + 210y
Now, using graphical method, draw a graph is present in above figure. To determine the profit at point A and B
At point A( 0, 10)
Z = 190 ×(0)+ 210× (10) = 2100 --(1)
At point B(5,0)
Z = 190×(5)+230×(0) = 950 --(2)
Clearly from equation (1), maximum profit is at point A, number of chain saw assembled are 0 and number of wood chipper arre 10.
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QW: Investing Funds
Name: Cissel Ibana.
Date: W1003
friends.
imagine you're buying a dozen donuts for you and your
Do you buy all 12 in the same flavor? Or would you buy a box that
has a variety of flavors? Why?
the
Explain using 2-3 complete sentences why you feel this way.
Clavi
1. Dan has £6,000 in his bank account. His bank account pays compound interest at
a rate of 4% per year. How much will Dan have after 3 years?
NS
At the end of three years, Daniel would have saved $6749.
What is the compound interest?When interest is calculated on a principal amount of money using the compound interest method, the interest gained is periodically added back to the principal and interest is then calculated on the new principal amount.
We know that;
A = P(1 + r/n)^nt
A =amount
r = rate
P = principal
n = Number of times compounded
t = time
Thus;
A = 6000(1 + 0.04)^3
A = $6749
Thus the compound amount saved is $6749
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Estimation (gcse maths)
Answer:
√(4.93 × 17.1) is about √(5 × 20) = √100 = 10. 0.209 is about 0.2, or 1/5.
So we have 10/0.2 = 100/2 = 50.
Need this answered quick geometry
Answer: Geometry is a branch of mathematics that deals with the study of shapes, sizes, positions, and measurements of objects in two-dimensional and three-dimensional spaces. It involves analyzing and calculating angles, lengths, areas, volumes, and other properties of various figures such as triangles, circles, squares, cubes, and spheres. Geometry is used in many fields including architecture, engineering, physics, and computer graphics.
A store sells 140 stainless steel thermal travel mugs per month at 24 dollars each. A survey indicates that for each $1. 50 decrease in price sales will increase by 5 travel mugs. A) Determine the demand function. B) Determine the revenue function c) Determine the marginal revenue d) Solve for R(x)=0. What does it mean? How can the store use this information? e) What price corresponds to value found in part d)
A) The demand function is [tex]y = 500 - 20x[/tex]
B) The revenue function [tex]R(x) = 500x - 20x^2[/tex]
C) The marginal revenue [tex]MR(x) = 500 - 40x[/tex]
D) This means that the store can maximize its revenue by setting the price at $25
E) The price corresponding to the value found in part d) is $25
To determine the demand function, we need to use the information given in the problem that for each $1.50 decrease in price, sales will increase by 5 travel mugs. Let x be the price in dollars and y be the number of travel mugs sold.
A) Then, we can write the demand function as:
[tex]y = 140 + 5((24-x)/1.5)[/tex]
Simplifying this expression, we get:
[tex]y = 140 + 20(16 - x)[/tex]
[tex]y = 500 - 20x[/tex]
Therefore, the demand function is[tex]y = 500 - 20x.[/tex]
B) The revenue function is given by the product of the price and the quantity sold:
[tex]R(x) = x(500 - 20x)[/tex]
[tex]R(x) = 500x - 20x^2[/tex]
C) The marginal revenue is the derivative of the revenue function with respect to x:
[tex]MR(x) = dR/dx[/tex]
[tex]= 500 - 40x[/tex]
D) To solve for R(x) = 0, we need to set the revenue function equal to zero and solve for x:
[tex]500x - 20x^2 = 0[/tex]
[tex]x(500 - 20x) = 0[/tex]
[tex]x = 0[/tex] or [tex]x = 25[/tex]
Since the price cannot be zero, the store can only set the price at $25 to achieve zero revenue. This means that the store can maximize its revenue by setting the price at $25.
E) The price corresponding to the value found in part d) is $25.
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The table shows the average aduat weight and average life expectancy for 12 dog breeds a. Pint the data as ordered pairs. Describe the shape of the data. Show your work. Average Weight Life Expectancy 125 57. 5 62. 5 49 12 16 12. 3 12 11
The scatter plot shows that there is no strong correlation between average weight and life expectancy for the 12 dog breeds. The coefficient of correlation for this adult weight data to be -0.123, which is very near to 0.
The adult weight of a person can vary greatly depending on several factors, including genetics, age, gender, height, muscle mass, and overall health. However, a healthy weight range for adults is typically determined by body mass index (BMI), which is calculated by dividing weight in kilograms by height in meters squared.
We can use the average weight as the x-value and the average life expectancy as the y-value to represent the data as ordered pairs. Following are the ordered pairs for the provided data:
(125, 57.5)
(62.5, 49)
(12, 16)
(12.3, 12)
(11, 11)
We may plot these ordered pairs on a scatter plot to show the form of the data. As for the story:
We can observe from the scatter plot that there is no obvious pattern formed by the data points. There is no discernible pattern or connection between the two variables, and the spots are dispersed throughout the plot. As a result, the data's shape can be described as random or dispersed.
We can calculate the correlation coefficient to provide more evidence for this. The variables do not have a linear relationship if the correlation coefficient is close to zero. we can calculate the coefficient of correlation for this data to be -0.123, which is very near to 0.
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The following frequency table shows the observed high temperatures in Buffalo, New York, in May 2007. Which interval contains the median temperature? 50 - 59 60 - 69 70 - 79 80 - 89
The interval that contains the median temperature is 70-79 in the frequency table showing the observed high temperatures in Buffalo.
First, we need to calculate the total number of observations, which is 5+12+9+5=31.
The median is the middle value of the data set when arranged in ascending or descending order. Since there are 31 observations, the median will be the 16th value.
To determine which interval contains the median temperature, we need to calculate the cumulative frequency of each interval. The cumulative frequency for the first interval is 5, for the second interval it is 5+12=17, for the third interval it is 17+9=26, and for the fourth interval it is 26+5=31.
Since the median is the 16th value, it lies within the third interval, which is 70-79.
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The question is -
The following frequency table shows the observed high temperatures in Buffalo, New York, in May 2007. Which interval contains the median temperature?
temperature frequency
50-59 5
60-69 12
70-79 9
80-89 5
Vine gunshot sound effect download unblockeRestaurants often slip takeout menus under Eli's apartment door. So far, Eli has collected 28 menus, including 7 for Italian food. Considering this data, how many of the next 24 menus slipped under Eli's door should you expect to be from Italian restaurants?
From percentage formula, in a vine gunshot sound effect download unblocked restaurants, the number of expected Italian restaurants in next 24 menus slipped under Eli's door is six.
We have a Vine gunshot sound effect download unblocked Restaurants often slip takeout menus. Total collected menus by Eli = 28
In this 28 menus, 7 for Italian food. We have to determine the how many menus in next 24 menus slipped under Eli's door expected from Italian restaurants. Percentage is calculated by dividing the value by the total value, and then multiplying the resultant value by 100.
Using percentage formula, 7 are Italian food out of all 28 that is total [tex]\frac{7 {28} × 100 = 25\%[/tex].
Let the required number of menus slipped under Eli's door should you expect to be from Italian restaurants be x. So, number of menus slipped under Eli's door should you expect to be from Italian restaurants out of 24, x = 25% of 24
=> [tex]\frac{25}{100} × 24 = x[/tex]
=> x = 6
Hence, required value is 6.
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1 27 3 Q5. Consider the MA(2) process X, = (1+0,B²)W, with W, - WN(0,1). Recall that y(0)=1+02", y(1)=0, Y(2)= 0, , y(h) = 0 for h> 3. i) Use the innovations algorithm to find x), X3, and X in terms of U,,U2, and Uz. (Note that a lot of terms will be zero.) ii) Use the result from part i to find xx. (Note that we have calculated x2 in Q8 of HW#6. But in that question, we expressed it in terms of Xi and X2, but in here we expressed it in terms of U, and U2.)
X1 = U1 + U-1 = U1 (since U-1 = 0);
X2 = U2 + U0 = U2 + 1 (since U0 = y1 - y0 = -1);
X3 = U3 + U1 = U3 + U1;
X4 = U4 + U3 + U2.
Innovations algorithm is a method for computing the values of a time series at each time point using the lag operator and the innovation or error terms. The lag operator, denoted by the symbol B, is used to shift the time index of a time series by one unit. Specifically, B multiplied by the time series X is equivalent to the time series X shifted one unit into the past.
We are given the MA(2) process X, = (1+0,B²)W with W, - WN(0,1), this means that X is a moving average process of order 2, where the current value of X depends on the current and two past innovation terms. The innovation terms U1, U2, U3, ... are uncorrelated random variables with zero mean and unit variance.
i) To use the innovations algorithm to find X1, X2, and X3 in terms of U1, U2, and U3, we first need to express X in terms of B and the innovation terms. Using the definition of the MA(2) process, we have:
Xt = (1 + 0*B^2)Wt + B* (1 + 0*B^2)Wt-1 + B^2* (1 + 0*B^2)Wt-2
= (1 + 0*B^2)Wt + B* (1 + 0*B^2)Wt-1 + B^2* (1 + 0*B^2)Wt-2
= Wt + B*Wt-1 + B^2*Wt-2
Next, we can use the innovations algorithm to express Xt in terms of the innovation terms U1, U2, and U3. The algorithm works as follows:
- Compute the initial values of the time series using the given initial conditions. In this case, we have y(0)=1+0*2, y(1)=0, y(2)=0, and y(h)=0 for h>3.
- For each time point t > 2, compute the innovation term Ut as the difference between the observed value yt and the predicted value based on the past observations up to time t-1. Specifically, we have:
Ut = yt - (1 + 0*B + 0*B^2) yt-1
= yt - yt-1
- Compute the current value of Xt as a linear combination of the past innovation terms Ut-1, Ut-2, and Ut-3, using the coefficients from the MA(2) process. Specifically, we have:
Xt = Ut + 0*Ut-1 + Ut-2
= Ut + Ut-2
Using this algorithm, we can compute the values of X1, X2, and X3 as follows:
- X1 = U1 + U-1 = U1 (since U-1 = 0)
- X2 = U2 + U0 = U2 + 1 (since U0 = y1 - y0 = -1)
- X3 = U3 + U1 = U3 + U1
ii) To find the value of X4, we can use the result from part i to express X4 in terms of the innovation terms U1, U2, U3, and U4. Specifically, we have:
X4 = U4 + U2
= y4 - y3 + y2 - y1
= (1 + 0*B^2) W4 - (1 + 0*B + 0*B^2) W3 + (1 + 0*B^2) W2 - (1 + 0*B + 0*B^2) W1
- (1 + 0*B + 0*B^2) W0
= W4 - W3 + W2 - W1
= U4 + U3 + U2
Therefore, X4 = U4 + U3 + U2.
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Find the probability that a randomly
selected point within the circle falls in the
red-shaded triangle.
16
LO
5
12
15
P = [?]
Enter as a decimal rounded to the nearest hundredth.
The probability that a randomly selected point within the circle falls in the
red-shaded triangle is 0.14.
What is probability?It is the chance of an event to occur from a total number of outcomes.
The formula for probability is given as:
Probability = Number of required events / Total number of outcomes.
Example:
The probability of getting a head in tossing a coin.
P(H) = 1/2
We have,
Area of the circle.
= πr²
= 3.14 x 15 x 15
= 706.5
Area of the shaded triangle.
= 1/2 x base x height
= 1/2 x 12 x 16
= 6 x 16
= 96
Now,
The probability that a randomly selected point within the circle falls in the
red-shaded triangle.
= Area of shaded triangle /Area of the circle
= 96/706.5
= 0.14
Thus,
The probability that a randomly selected point within the circle falls in the
red-shaded triangle is 0.14.
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outside temperature over a day can be modelled as a sinusoidal function. suppose you know the high temperature of 89 degrees occurs at 5 pm and the average temperature for the day is 80 degrees. assuming t is the number of hours since midnight, find an equation for the temperature, d, in terms of t.
The equation for the temperature, d, in terms of t is:
d(t) = 9 * cos[(π/12) * (t - 17)] + 80
To create an equation for the temperature, d, in terms of t, we will use the information given: the high temperature of 89 degrees at 5 pm and the average temperature of 80 degrees.
Determine the amplitude (A) of the sinusoidal function.
Amplitude = (High Temperature - Average Temperature)
A = (89 - 80)
A = 9
Determine the period (P) of the sinusoidal function.
Since the temperature pattern repeats every 24 hours, the period is 24 hours.
Determine the horizontal shift (HS) of the sinusoidal function.
Since the high temperature occurs at 5 pm (17 hours since midnight), the horizontal shift is 17 hours.
Determine the vertical shift (VS) of the sinusoidal function.
The vertical shift is the average temperature, which is 80 degrees.
Write the sinusoidal equation for the temperature, d, in terms of t.
Since the temperature reaches its peak (high temperature) at 5 pm, we will use the cosine function, as it starts at its peak value. The general form of the cosine function is:
d(t) = A * cos[(2π/P) * (t - HS)] + VS
Now, plug in the values found in steps 1-4:
d(t) = 9 * cos[(2π/24) * (t - 17)] + 80
So, the equation for the temperature, d, in terms of t is:
d(t) = 9 * cos[(π/12) * (t - 17)] + 80
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