The answer is (a) 22.307.
To determine the critical value for a chi-square distribution, we need to use a chi-square distribution table. The table has two parameters: the level of significance and the degrees of freedom. In this case, the level of significance is 0.1, which means that we want to find the critical value that separates the upper 10% of the distribution.
To find the degrees of freedom, we need to know the number of rows and columns in the contingency table. The degrees of freedom can be calculated using the formula:
(df) = (r - 1) x (c - 1)
where r is the number of rows and c is the number of columns.
In this case, the number of rows is 4 and the number of columns is 6. Using the formula, we get:
(df) = (4-1) x (6-1) = 15
Now that we know the level of significance and the degrees of freedom, we can use the chi-square distribution table to find the critical value. Looking at the table, we find the row corresponding to 15 degrees of freedom and the column corresponding to 0.1 level of significance. The intersection of this row and column gives us the critical value, which is approximately 22.307.
Therefore, the answer is (a) 22.307.
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Which compression technique encodes the digital value of an analog sample, based on the change from the previous sample? LZ78 compression Shannon-Fano encoding Differential PCM using delta encoding Huffman coding
The compression technique encodes the digital value of an analog sample, based on the change from the previous sample is c. Differential PCM using delta encoding
By accounting for the difference or change between successive samples, Differential Pulse Code Modulation (DPCM) is a compression method used to encode digital values of analogue samples. In DPCM, the delta, or difference between the current and previous samples, is quantized and encoded, which results in a less amount of data than if the samples' absolute values were simply recorded.
It is a method that takes use of the correlation or resemblance between successive samples in a variety of analogue signals. But it might experience error propagation, where mistakes in the decoded delta values can build up over time and result in a deterioration in signal quality.
Complete Question:
Which compression technique encodes the digital value of an analog sample, based on the change from the previous sample?
a. LZ78 compression
b. Shannon-Fano encoding
c. Differential PCM using delta encoding
d. Huffman coding
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Write an explicit rule for each sequence
1. 3200, 1600, 800, 400, ...
2. 12, 84, 588, 4116, ...
3. 1395, 465, 155, 51.67, ...
i need this as soon as possible
posting more soon
The explicit rule for sequence 3200,1600,800, 400,... is aₙ = 3200(1/2)⁽ⁿ⁻¹⁾, the explicit rule for sequence 12, 84, 588, 4116, .. is aₙ = 12(7)⁽ⁿ⁻¹⁾, the explicit rule for sequence 1395, 465, 155, 51.67,... is aₙ = 1395(1/3)⁽ⁿ⁻¹⁾.
The common ratio in this geometric sequence is 1/2. Thus, the explicit rule for this sequence is given by
aₙ = 3200(1/2)⁽ⁿ⁻¹⁾
where aₙ represents the nth term of the sequence.
This sequence appears to be a geometric sequence where the common ratio is 7. Thus, the explicit rule for this sequence is
aₙ = 12(7)⁽ⁿ⁻¹⁾
where aₙ represents the nth term of the sequence.
This sequence appears to be a geometric sequence where the common ratio is 1/3. Thus, the explicit rule for this sequence is
aₙ = 1395(1/3)⁽ⁿ⁻¹⁾.
where aₙ represents the nth term of the sequence.
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Pete’s plumbing was just hired to replace the water pipes in the Johanssons house Pete has two types of pipes he can use a pipe with a radius of 8cm or a pipe with a radius of 4cm the 4 cm pipes are less expensive than the 8cm pipes for Pete to buy so Pete wonders if there are a number of 4cm pipes he could use that would give the same amount of water to the Johanssons house as one 8cm pipe
Four 4cm pipes would give the same amount of water as one 8cm pipe.
We have,
The volume of water that can flow through a pipe is directly proportional to the cross-sectional area of the pipe, which is proportional to the square of its radius.
The area of the 8cm pipe is A1 = π(8cm)²
= 64π cm².
Let x be the number of 4cm pipes that would be needed to replace the 8cm pipe.
The area of one 4cm pipe is A2 = π(4cm)² = 16π cm².
Therefore, the area of x 4cm pipes is Ax = x(16π) = 16xπ cm².
We want to find the value of x such that Ax = A1.
That is, 16xπ = 64π
Solving for x, we get:
x = (64π) / (16π) = 4
Therefore,
Four 4cm pipes would give the same amount of water as one 8cm pipe.
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Each of the dimensions of a pyramid are doubled. What is true about the volume of the new pyramid?
1
The new pyramid has a volume that is
the volume of the original pyramid.
The new pyramid has a volume that is 2 times the volume of the original pyramid.
The new pyramid has a volume that is 4 times the volume of the original pyramid.
The new pyramid has a volume that is 8 times the volume of the original pyramid.
Mark this and return
Save and Exit
Next
The dimensions of the new pyramid is 8 times the original volume.
How to solveThe area of the pyramid's base and its height are exactly proportional to its volume, hence the volume of any pyramid is equal to the area of the base times the height of the pyramid divided by three.
Knowing the formula of the pyramid is:
1/3 x a x b x h
If the dimensions are doubled, it will be :
1/3 x 2a x 2b x 2h
So:
v2= 1/3 x 2a x 2b x 2h
v2 = 1/3 x 8 x a x b x h
Hence, The new volume is 8 times more than the original.
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Show that the surface area of the solid region bounded by the three cylinders x^2 + y^2 = 1, y^2 + z^2 = 1 and x^2 + z^2 = 1 is 48 – 24√2.
We have to show that the surface area of the solid region bounded by the three cylinders x^2 + y^2 = 1, y^2 + z^2 = 1, and x^2 + z^2 = 1 is 48 - 24√2
Step 1: Find the points of intersection between the cylinders.
By solving the systems of equations:
(i) x^2 + y^2 = 1 and y^2 + z^2 = 1
(ii) x^2 + y^2 = 1 and x^2 + z^2 = 1
(iii) y^2 + z^2 = 1 and x^2 + z^2 = 1
Step 2: Calculate the surface areas of the three cylinders within the bounded region.
The surface area of each cylinder can be found using the formula A = 2πrh, where r is the radius, and h is the height.
Step 3: Add the surface areas of the three cylinders.
Sum the surface areas found in step 2 to get the total surface area of the bounded region.
Step 4: Subtract the overlapping areas.
The overlapping areas are the 6 faces of the solid octahedron formed by the intersection of the cylinders. Each face has an area of √2/2, so the total overlapping area is 6(√2/2).
Step 5: Calculate the final surface area.
Subtract the overlapping areas found in step 4 from the total surface area found in step 3 to obtain the final surface area.
Upon completing these steps, you will find that the surface area of the solid region bounded by the three cylinders x^2 + y^2 = 1, y^2 + z^2 = 1, and x^2 + z^2 = 1 is indeed 48 - 24√2.
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There are 2 workers in a team. Each can either work hard or shirk. If both workers shirk, the overall project succeeds with probability p0, if only one worker shirks, it succeeds with probability p1, and if both workers work hard, it succeeds with probability p2. (p2>p1>p0) The cost of effort is c. The principal cannot observe the individual efforts, but only the success or failure of the whole project. Design the optimal contract that induces all the workers the exert effort all the time. Do the workers’ efforts complement or substitute each other (classify the probabilities of success to answer this question)?
To design the optimal contract that induces both workers to exert effort all the time, consider the following steps:
1. Determine the joint probabilities of success for each combination of efforts:
- Both workers shirk: Probability of success is p0.
- One worker shirks and the other works hard: Probability of success is p1.
- Both workers work hard: Probability of success is p2.
2. Identify the complementarity or substitutability of workers' efforts:
- Since p2 > p1 > p0, the workers' efforts are complementary. This means that the success probability increases when both workers exert effort, as compared to only one worker doing so.
3. Design the optimal contract based on complementarity:
- The principal should offer a contract with a bonus B, paid only if the project is successful.
- To incentivize both workers to exert effort, the bonus should satisfy the following condition:
B > 2c / (p2 - p1)
This ensures that the benefit of exerting effort (i.e., receiving the bonus) outweighs the cost of effort (c) for both workers. Since the workers' efforts complement each other, they will be more likely to exert effort knowing that their combined efforts increase the probability of project success and receiving the bonus.
In summary, the optimal contract should offer a bonus B that satisfies B > 2c / (p2 - p1) and is paid only upon project success. This contract incentivizes both workers to exert effort all the time, as their efforts complement each other and increase the probability of project success.
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the empirical rule is another method used to describe how much of the data lies within a certain number of standard deviations of the mean. Unlike Chebyshev's theorem, the empirical rule can only be used when data have a bell-shaped distribution. When the data do have a bell-shaped distribution, approximately 68% of the data values will be within one standard deviation of the mean, approximately 95% of the data values will be within two standard deviations of the mean, and 99.74% of the data values will be within three standard deviations of the mean.
Using Chebyshev's theorem, we found that approximately 89% of adults get between 1.3 hours and 11.5 hours of sleep a night. This corresponded to a standard deviation of 3.
The empirical rule dictates that approximately % of the data will be within 3 standard deviations of the mean. Thus, the approximation given by the empirical rule is ?
A. less than to the approximation given by Chebyshev's theorem.
B. greater than equal to the approximation given by Chebyshev's theorem.
The answer is option(b) greater than equal to the approximation given by Chebyshev's theorem.
To answer this, we need to use the empirical rule and compare it with the approximation given by Chebyshev's theorem.
The empirical rule states that approximately 68% of the data will be within one standard deviation, 95% within two standard deviations, and 99.74% within three standard deviations of the mean, given that the data has a bell-shaped distribution.
In this case, we're looking at 3 standard deviations from the mean. According to the empirical rule, approximately 99.74% of the data will be within 3 standard deviations. Now, we compare the approximation given by the empirical rule (99.74%) to the approximation given by Chebyshev's theorem (89%).
Since 99.74% (empirical rule) is greater than 89% (Chebyshev's theorem), the approximation given by the empirical rule is greater than equal to the approximation given by Chebyshev's theorem.
Your answer: B. greater than equal to the approximation given by Chebyshev's theorem.
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A sign is in the shape of a rhombus. The diagonals are 1.75 feet and 2.5 feet. What is the area of the sign? 2.125 ft2 2.1875 ft2 4.25 ft2 4.375 ft2
Answer:
Area = 2.1875
Step-by-step explanation:
The formula for area of a rhombus is A = 1/2(d1)(d2), where d1 is one of its rhombus and d2 is the other. Thus, to find the area, we can plug into the formula 1.75 for d1 and 2.5 for d2 and solve for A:
A = 1/2(1.75)(2.5)
A = 0.875*2.5
A = 2.1875
A set of equations is given below:
Equation C: y = 6x + 9
Equation D: y = 6x + 2
Which of the following options is true about the solution to the given set of equations?
a
One solution
b
No solution
c
Two solutions
d
Infinite solutions
The solution to the given set of equations is, No solution.
We have to given that;
A set of equations is given below:
Equation C: y = 6x + 9
Equation D: y = 6x + 2
Now, We can see that;
y = 6x + 9
y = 6x + 2
Equate both equations, we get;
6x + 2 = 6x + 9
2 ≠ 9
Hence, We get;
The solution to the given set of equations is, No solution.
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Examine the ratios to find the one that is not equivalent to the others. Which ratio is different from the other three?
The ratio StartFraction 14 Over 35 EndFraction is equivalent to the other three ratios, and the ratio that is different from the others is StartFraction 8 Over 20 EndFraction.
To determine which ratio is not equivalent to the others, we need to simplify each ratio to its lowest terms.
Give the following ratios :
[tex]2 / 5 = 6 /10 = 8 / 20 = 12 / 30.[/tex]
- StartFraction 2 Over 5 EndFraction: This ratio is already in its simplest form.
- StartFraction 6 Over 10 EndFraction: We can simplify this ratio by dividing both the numerator and denominator by their greatest common factor (GCF), which is 2.
-StartFraction 6 Over 10 EndFraction = StartFraction 3 Over 5 EndFraction
- StartFraction 8 Over 20 EndFraction: We can simplify this ratio by dividing both the numerator and denominator by their GCF, which is 4.
StartFraction 8 Over 20 EndFraction = StartFraction 2 Over 5 EndFraction
- StartFraction 12 Over 30 EndFraction: We can simplify this ratio by dividing both the numerator and denominator by their GCF, which is 6.
StartFraction 12 Over 30 EndFraction = StartFraction 2 Over 5 EndFraction
Therefore, the ratios StartFraction 6 Over 10 EndFraction, StartFraction 8 Over 20 EndFraction, and StartFraction 12 Over 30 EndFraction are all equivalent to StartFraction 2 Over 5 EndFraction. The ratio that is different from the others is StartFraction 14 Over 35 EndFraction, which can be simplified by dividing both the numerator and denominator by their GCF, which is 7.
[tex]StartFraction 14 Over 35 EndFraction = StartFraction 2 Over 5 EndFraction.[/tex]
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Question 3 Not yet answered Find the inverse of the following function 8+5x f(x) = x+3 Marked out of 1.0 Flag question f(x)-1 = =
The inverse of f(x) is: [tex]f^{-1(x)}[/tex] = (x - 8)/5 switched the variables, so instead of [tex]f^{-1(x)}[/tex] , we wrote it as [tex]f^{-1(x)}[/tex] .
What is function?
In mathematics, a function is a relationship between two sets of elements, called the domain and the range, such that each element in the domain is associated with a unique element in the range.
To find the inverse of the function f(x) = 8 + 5x, we need to solve for x in terms of f(x).
Let y = f(x) = 8 + 5x
To find the inverse, we need to isolate x on one side of the equation:
y = 8 + 5x
y - 8 = 5x
x = (y - 8)/5
Therefore, the inverse of f(x) is:
[tex]f^{-1(x)}[/tex] = (x - 8)/5
Or, we can write it as:
[tex]f(x)^{-1}[/tex] = (x - 8)/5
Note that we switched the variables, so instead of [tex]f^{-1}[/tex] , we wrote it as [tex]f^{-1(x)}[/tex] .
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W, E, L, O, V, E, M, A, T, H, determine the probability of randomly drawing a vowel.
two fifths
two sixths
two tenths
four elevenths
The probability of randomly drawing a vowel is 2/5
Calculating the probability of randomly drawing a vowel.From the question, we have the following parameters that can be used in our computation:
W, E, L, O, V, E, M, A, T, H
Using the above as a guide, we have the following:
Vowels = 4
Total = 10
So, we have
P(Vowel) = Vowel/Total
Substitute the known values in the above equation, so, we have the following representation
P(Vowel) = 4/10 = 2/5
Hence, the solution is 2/5
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- Which slices will always result in a square plane section? Select all that apply.
A Slicing a cube parallel to one of its faces
B Slicing a right square pyramid parallel to its base
C Slicing a cube perpendicular to one of its faces
D Slicing a right square pyramid perpendicular to its base
E Slicing a cube at an angle neither parallel nor perpendicular to any of its faces
F
Slicing a right square pyramid at an angle neither parallel nor perpendicular to
any of its faces
The slices that will always result in a square plane section include;
A Slicing a cube parallel to one of its facesC Slicing a cube perpendicular to one of its facesWhat is a plane section ?The intersection of a three-dimensional object with a plane creates a two-dimensional shape known as a "plane section." When this section is square in shape, it is referred to as a "square plane section."
A cube possesses six faces that are all squares. Slicing the cube parallel to one of its sides produces a square plane section every time, given that the side being sliced also happens to be a square. Meanwhile, cutting the cube perpendicular to any of its other faces generates a comparable result: a square plane section.
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In an election, 7/20 of the voters voted for a new school tax. What is the probability that a randomly selected voter did not vote for the tax? Express your answer as a percentage.
Answer:
65%
Step-by-step explanation:
ITS CORRECT
can you help me with this please
a.) The hire purchase price would be =$3,933.6
b.) The amount of each monthly instalment would be =$218.5
C.) The difference between the price for hire purchase and cash price would be = $953.6
How to calculate the hire purchase price?To hire purchase price for the video recorder would be = initial down payment + interest + cash price.
The initial down payment = 20/100×2980
= 59600/100 = $596
The interest = 15 % of outstanding balance
outstanding balance = 2980- 596 =$2,384
Therefore, 15/100 × 2,384
= 35760/100 = $357.60
Thet hire purchase price = 2980+596+357.60=$3,933.6
The amount for each month installment over the next 18 months = $3,933/18 = $218.5
The difference between hire purchase and cash price = $3,933.6- $2980 = $953.6
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now suppose that the bag has 7 white balls and 3 red balls. you draw one ball without looking. please type a number between 0 and 100 for the percent chance that the ball you draw is white. %
The percent chance that the ball you draw is white is 70%.
To find the percent chance of drawing a white ball, we will calculate the probability and then convert it into a percentage.
1. First, determine the total number of balls in the bag: 7 white balls + 3 red balls = 10 balls.
2. Next, determine the number of favorable outcomes, which is the number of white balls: 7 white balls.
3. Calculate the probability by dividing the number of favorable outcomes by the total number of balls: 7 white balls ÷ 10 balls = 0.7.
4. Convert the probability to a percentage by multiplying it by 100: 0.7 x 100 = 70%.
So, the percent chance that the ball you draw is white is 70%.
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estimate the change in the advertising budget necessary to maintain a monthly profit of $93,500 if the insurance company hires 5 new sales associates.
The change in the advertising budget necessary to maintain a monthly profit of $93,500 if the insurance company hires 5 new sales associates is estimated to be an increase of $2,308.
To estimate the change in advertising budget necessary to maintain a monthly profit of $93,500 with the addition of 5 new sales associates, we need to consider the potential impact of these new hires on the company's revenue and expenses.
Assuming that each new sales associate is expected to generate $10,000 in revenue per month, the total increase in revenue would be $50,000 (5 sales associates x $10,000).
However, there may also be additional expenses associated with the new hires, such as salaries and benefits. Let's assume that the total cost of adding 5 new sales associates is $30,000 per month.
Therefore, the net increase in monthly profit due to the new hires would be $20,000 ($50,000 in revenue - $30,000 in expenses).
To maintain a monthly profit of $93,500, the company would need to increase its advertising budget by an amount that would generate an additional $20,000 in profit. Assuming that the company's profit margin on its products is 20%, this would require an additional $100,000 in revenue per month ($20,000 / 0.20).
Based on the historical data and market conditions, the company could estimate the additional advertising budget required to generate this amount of revenue.
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Round 39 to one significant number
The blueprint for a circular gazebo has a scale of 2 inches = 5 feet. The blueprint shows that the gazebo has a diameter of 5. 1 inches. What is the actual diameter of the gazebo? What is its area?
The area of the gazebo is approximately 127.23 square feet.
To find the actual diameter of the gazebo, we need to use the scale of 2 inches = 5 feet. This means that for every 2 inches on the blueprint, the actual distance is 5 feet. Therefore, we can set up a proportion:
2 inches / 5 feet = 5.1 inches / x
where x is the actual diameter of the gazebo.
Solving for x, we get:
x = (5.1 inches * 5 feet) / 2 inches
x = 12.75 feet
So the actual diameter of the gazebo is 12.75 feet.
To find the area of the gazebo, we need to use the formula for the area of a circle:
A = π[tex]r^2[/tex]
where r is the radius of the circle. Since we know the diameter is 12.75 feet, the radius is half of that:
r = 12.75 feet / 2
r = 6.375 feet
Now we can plug in the radius to the formula for the area:
A = π(6.375 feet[tex])^2[/tex]
A = 127.23 square feet
So the area of the gazebo is approximately 127.23 square feet.
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Can someone help and check the image? PLEASE explain how you get your answer I need to understand it!
Answer:
The equation y = 75 - 2.85x represents the amount of money left on the gift card, where x is the number of Chai lattes Angie has purchased and y is the remaining gift card balance.
To find the x-intercept, we set y = 0 and solve for x:
0 = 75 - 2.85x
2.85x = 75
x = 26.32 (rounded to the nearest tenth)
So the x-intercept is approximately 26.3 Chai lattes, meaning that Angie can buy a maximum of 26 Chai lattes with her gift card.
To find the y-intercept, we set x = 0 and solve for y:
y = 75 - 2.85(0)
y = 75
So the y-intercept is $75, meaning that when Angie has not yet bought any Chai lattes, her gift card balance is $75.
To predict how many Chai lattes Angie has purchased when her gift card balance is about $35, we set y = 35 and solve for x:
35 = 75 - 2.85x
2.85x = 40
x = 14.04 (rounded to the nearest tenth)
So when Angie's gift card balance is about $35, she has purchased approximately 14 Chai lattes.
Marisol works at a coffee shop. It takes her
45 seconds to make a cup of tea. It takes
her 1 minutes to make a latte. How many
more seconds does it take Marisol to make
a latte than a cup of tea?
Which graph represents the inequality \(y\ge-x^2+1\)?
The graph of the given inequality y ≥ x² + 1 is a shaded region above the downward-facing parabola -x² + 1.
Hence, graph A represents the given inequality.
The inequality y ≥ x² + 1 represents a region in the coordinate plane where y is greater than or equal to the value of the function -x² + 1 for any given x. The graph of this inequality is a shaded region above the downward-facing parabola -x² + 1. The vertex of this parabola is located at the point (0,1), and as x moves away from 0, the value of the function becomes more negative.
Therefore, the shaded region includes all points (x, y) where y is greater than or equal to the y-value of the parabola at that x-value. The resulting graph is a curve that opens downward and flattens out at y=1 as x moves further away from 0.
Hence, the correct option is A.
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one option for the game is to change the matching scheme. we will be comparing these two matching schemes. the shapes and cutouts are all the same color (sc) the shapes and cutouts are different colors (dc) is there a difference in the average time to complete all of the matches(s) for the different matching schemes? each person completed the puzzle using both methods. what is the appropriate alternative hypothesis? group of answer choices ha: psc - pdc does not equal 0 ha: mu d does not equal 0 ha: xbarsd - xbardc does not equal 0
The appropriate alternative hypothesis is: Hₐ: [tex]\mu_{sc[/tex] - [tex]\mu_{dc[/tex] does not equal 0, where [tex]\mu_{sc[/tex] is the mean time to complete all matches using the "shapes and cutouts are all the same color" matching scheme, and [tex]\mu_{dc[/tex] is the mean time to complete all matches using the "shapes and cutouts are different colors" matching scheme.
What is alternative hypothesis?An assertion used in statistical inference experiments is known as the alternative hypothesis. It is indicated by Hₐ or H₁ and runs counter to the null hypothesis.
The appropriate alternative hypothesis is: Hₐ: [tex]\mu_{sc[/tex] - [tex]\mu_{dc[/tex] does not equal 0, where [tex]\mu_{sc[/tex] is the mean time to complete all matches using the "shapes and cutouts are all the same color" matching scheme, and [tex]\mu_{dc[/tex] is the mean time to complete all matches using the "shapes and cutouts are different colors" matching scheme.
This hypothesis is appropriate because it is testing whether there is a statistically significant difference in the mean time to complete all matches between the two matching schemes. The null hypothesis would be that there is no difference in the mean time between the two schemes, i.e., H₀: [tex]\mu_{sc[/tex] - [tex]\mu_{dc[/tex] = 0.
To test this hypothesis, we can use a paired t-test, which compares the mean difference between the two sets of measurements (in this case, the time to complete all matches using the two matching schemes) to the standard error of the mean difference. If the t-test results in a p-value that is smaller than the chosen significance level (typically 0.05), we reject the null hypothesis and conclude that there is a statistically significant difference between the mean times for the two matching schemes.
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The appropriate alternative hypothesis is: Hₐ: - does not equal 0, where is the mean time to complete all matches using the "shapes and cutouts are all the same color" matching scheme and is the mean time to complete all matches using the "shapes and cutouts are different colors" matching scheme.
An assertion used in statistical inference experiments is known as the alternative hypothesis. It is indicated by Hₐ or H₁ and runs counter to the null hypothesis.
The appropriate alternative hypothesis is: Hₐ: - does not equal 0, where is the mean time to complete all matches using the "shapes and cutouts are all the same color" matching scheme and is the mean time to complete all matches using the "shapes and cutouts are different colors" matching scheme.
This hypothesis is appropriate because it is testing whether there is a statistically significant difference in the mean time to complete all matches between the two matching schemes. The null hypothesis would be that there is no difference in the mean time between the two schemes, i.e., H₀: - = 0.
To test this hypothesis, we can use a paired t-test, which compares the mean difference between the two sets of measurements (in this case, the time to complete all matches using the two matching schemes) to the standard error of the mean difference. If the t-test results in a p-value that is smaller than the chosen significance level (typically 0.05), we reject the null hypothesis and conclude that there is a statistically significant difference between the mean times for the two matching schemes.
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Assume scores on a recent national statistics exam were normally distributed with a mean of 74 and a standard deviation of 6. Find the probability that a randomly selected student score more than 80 points? If the top 2.5% of test scores recurveerit awards, what is the lowest eligible for an award?
The probability that a randomly selected student score more than 80 points is 0.1587 or 15.87%. The lowest eligible for an award is 85.76.
To find the probability that a randomly selected student scores more than 80 points, we need to standardize the score using the z-score formula:
z = (x - μ) / σ
where x is the score
μ is the mean
σ is the standard deviation.
In this case, we have:
z = (80 - 74) / 6 = 1
Using a standard normal distribution table or calculator, we can find that the probability of a z-score of 1 or greater is approximately 0.1587. Therefore, the probability that a randomly selected student scores more than 80 points is approximately 0.1587 or 15.87%.
To find the lowest score eligible for an award, we need to find the z-score that corresponds to the top 2.5% of the distribution. Using a standard normal distribution table or calculator, we can find that the z-score corresponding to the top 2.5% is approximately 1.96.
We can then use the z-score formula to solve for x:
z = (x - μ) / σ
1.96 = (x - 74) / 6
11.76 = x - 74
x = 85.76
Therefore, the lowest score eligible for an award is approximately 85.76.
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The inequality x2 – 5x + 3 < 3 can be broken down into two related inequalities. The graphs of these related inequalities are shown on the graph to the left. Which set shows the solution to the inequality? (0, 5) (–3.25, 3) (–∞, 0) ∪ (5, ∞) (–∞,–3.25) ∪ (3, ∞)
The inequality Ellen’s graph shows the solution to is, Negative 3.25 less-than negative 2.5 + r, the correct option is C.
Here, we have,
An Inequality is a statement that is formed when two expressions are joined using an inequality operator.
A number line is a line segment that depicts the real numbers marked at a fixed distance, like a coordinate axis.
A graph is a representation of the relation between two variables, a graph is useful in determining the equation of the variables.
A number line going from negative 1.25 to positive 0.75. An open circle is at negative 0.75, everything to the left of the circle is shaded.
An open circle represents the number that is not included.
x < -0.75
x < -3.25 +2.5
x -2.5 < 3.25
It can also be written as,
Negative 3.25 less-than negative 2.5 + r.
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complete question;
Ellen drew a graph showing the solution to an inequality.
A number line going from negative 1.25 to positive 0.75. An open circle is at negative 0.75. Everything to the left of the circle is shaded.
Which inequality does Ellen’s graph show the solution to?
3.25 less-than 2.5 + r
3.25 greater-than 2.5 + r
Negative 3.25 less-than negative 2.5 + r
Negative 3.25 greater-than negative 2.5 + r
The volume of a rectangular prism (shown below) is 4x^4+14x^3-8x^2 What is one dimension of the prism?
The dimension of the rectangular prism is ( 2x - 1) which has a volume 4x⁴ + 14x³ - 8x²
The given volume of the rectangular prism is,
V = 4x⁴ + 14x³ - 8x²
Let the length, breadth and height of the rectangular prism be l, b, and h respectively.
Thus, by formula of volume of a rectangular prism we get,
l*b*h = 4x⁴ + 14x³ - 8x²
⇒ l*b*h = 2x² ( 2x² + 7x - 4)
= 2x² [ 2x² + 8x - x - 4]
= 2x² [ 2x( x + 4) -1( x + 4) ]
= 2x² ( 2x - 1 )( x + 4 )
Therefore, by equating the above equation, obtained from simplifying the equation of volume of a rectangular prism, with zero , we get,
2x² ( 2x - 1 )( x + 4 ) = 0
⇒ 2x² = 0 ⇒ x = 0
and, ⇒ 2x - 1 = 0 ⇒ x = 1/2
and, ⇒ x + 4 = 0 ⇒ x = -4
Thus we can see that only equation (2x - 1) gives a possible value of x, that is either the length or breadth or height of the rectangular prism.
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1. [5 marks] Find the coefficients of the Fourier series expansion of the function f(x) = 1 for x € (-1,0) 2 – x for x € (0,1)
The Fourier series for the original function f(x) is:
f(x) = (1/2) + ∑[n=1,∞] [(4/nπ²) * (1 - (-1)^n) cos(nπx/2) + (4/nπ) * sin(nπ/2) sin(nπx/2)] for x € (-1,1)
To find the Fourier series coefficients for the given function, we need to first determine the period of the function.
Since the function is defined differently for x in the interval (-1,0) and (0,1), we can break down the function into two separate periodic functions, each with its own period.
For the interval (-1,0), the function is a constant function equal to 1. Hence, the period is simply 2.
For the interval (0,1), the function is a linear function given by f(x) = 2 - x. The period of a linear function is always infinite, but we can restrict the domain to a smaller interval to get a periodic function. We can choose the interval (0,2) as the period for this function, since f(x + 2) = 2 - (x + 2) = 2 - x = f(x) for all x in the interval (0,1).
Now, we can write the Fourier series for each of the two periodic functions:
For the function defined on (-1,0), the Fourier series coefficients are given by:
an = (1/2) * ∫[-1,1] f(x) cos(nπx/2) dx
= (1/2) * ∫[-1,0] cos(nπx/2) dx (since f(x) = 1 for x in (-1,0))
= (1/2) * [(2/π) * sin(nπ/2)]
bn = (1/2) * ∫[-1,1] f(x) sin(nπx/2) dx
= (1/2) * ∫[-1,0] sin(nπx/2) dx (since f(x) = 1 for x in (-1,0))
= (1/2) * [(2/π) * (1 - cos(nπ/2))]
For the function defined on (0,1), the Fourier series coefficients are given by:
an = (1/2) * ∫[0,2] f(x) cos(nπx/2) dx
= (1/2) * ∫[0,1] (2 - x) cos(nπx/2) dx
= (1/2) * [(4/nπ²) * (1 - (-1)^n)]
bn = (1/2) * ∫[0,2] f(x) sin(nπx/2) dx
= (1/2) * ∫[0,1] (2 - x) sin(nπx/2) dx
= (1/2) * [(4/nπ) * sin(nπ/2)]
Hence, the Fourier series for the original function f(x) is:
f(x) = (1/2) + ∑[n=1,∞] [(4/nπ²) * (1 - (-1)^n) cos(nπx/2) + (4/nπ) * sin(nπ/2) sin(nπx/2)] for x € (-1,1)
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HELP!! PLS ILL GIVE BRAINLIEST
Answer:3 1/2 times 5= 15 1/10 - 7 1/4 = 8 6/40 or 8 3/20
Step-by-step explanation:
Answer:
3/4 or 0.75 tons
Step-by-step explanation:
The sum of the two months is 7 1/4 which is 29/4. For the first month, the company used 3 1/2 (7/2 or 14/4)
(29-14)/4=15/4.
Thus the second month you use 15/4.
Don’t simplify it yet-
15/4 divided by 5 is 3/4.
Which linear system has this matrix of constants? `[[12],[11],[4]]
The matrix of constants you provided [[12],[11],[4]] represents a system of linear equations with 3 variables and 1 equation, which is an underdetermined system.
To write the system of equations in the form Ax = b, where A is the matrix of coefficients, x is the vector of variables, and b is the vector of constants, we can set:
12x1 = 11x2 + 4x3
where x1, x2, and x3 are the variables of the system.
Note that this system has infinitely many solutions, since there are more variables than equations. In other words, we can choose any value for one of the variables and solve for the other two.
Assuming that you meant to ask for the simplified form of the expression:
The formula is (a × x) = (a × x) + (b × a × x)
We can first simplify the expression by combining like terms:
(1 + 4b) is equal to (axe) + b(ax) + c(a × x) + d(a × x)√(ax)
Therefore, the simplified expression is:
(1 + 4b)√()axe) + b(ax) + c(a × x) + d(a × x)√(ax)
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Write the standard form of the equation of a circle with radius 9 and center (14,15).
Answer:[tex]\left(x-14\right)^{2}+\left(y-15\right)^{2}=92[/tex]
Step-by-step explanation:
Since the x value is 14 and the y value is 15, we know our H and K for this formula. In the formula, we state that the first part of the formula is equal to the radius squared. That would look something like this without the filled in values:
[tex]\left(x-h\right)^{2}+\left(y-k\right)^{2}=r^{2}[/tex]
The center point of the circle is found at (h, k)
I hope this helps :)