The results are:
i. Mean = 6.775
ii. Median = 6.6
iii. Mode = No mode
iv. Variance ≈ 0.44936875
v. Standard Deviation ≈ 0.6697
To analyze the given scores awarded by the eight judges, let's calculate the requested measures:
Scores: 5.9, 6.7, 6.8, 6.5, 6.7, 8.2, 6.1, 6.3
i. Mean: The mean is the average of the scores. To calculate it, we sum all the scores and divide by the number of scores:
Mean = (5.9 + 6.7 + 6.8 + 6.5 + 6.7 + 8.2 + 6.1 + 6.3) / 8 = 54.2 / 8 = 6.775
ii. Median: The median is the middle value when the scores are arranged in ascending order. First, let's sort the scores:
Sorted scores: 5.9, 6.1, 6.3, 6.5, 6.7, 6.7, 6.8, 8.2
Since we have an even number of scores, the median is the average of the two middle values: (6.5 + 6.7) / 2 = 6.6
iii. Mode: The mode is the score(s) that appears most frequently. In this case, there is no score that appears more than once, so there is no mode.
iv. Variance: The variance measures the spread or dispersion of the scores. To calculate it, we need to find the squared difference between each score and the mean, sum them up, and divide by the number of scores minus one:
Variance = [(5.9 - 6.775)^2 + (6.1 - 6.775)^2 + (6.3 - 6.775)^2 + (6.5 - 6.775)^2 + (6.7 - 6.775)^2 + (6.7 - 6.775)^2 + (6.8 - 6.775)^2 + (8.2 - 6.775)^2] / (8 - 1)
= [0.592225 + 0.552025 + 0.471225 + 0.454225 + 0.000225 + 0.000225 + 0.005625 + 2.070025] / 7
= 3.145575 / 7
= 0.44936875
v. Standard Deviation: The standard deviation is the square root of the variance. Taking the square root of the variance calculated above, we get:
Standard Deviation = √0.44936875 ≈ 0.6697
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(a) Determine all real values a and b such that
Span
3a
in R2.
(b) Determine the solution set, S, to the following system of linear equations.
2x1 -I2 +2x3 +44 2x1 -12
= 0
+34
= 0
Express S as the span of one or more vectors.
(a) To determine the values of a and b such that the [tex]\text{Set }\{3a\}\text{ spans }\mathbb{R}^2[/tex], we need to find the values that make the set {3a} capable of representing any vector in [tex]R^2[/tex].
In [tex]R^2[/tex], any vector can be represented as (x, y), where x and y are real numbers. For the [tex]\text{Set }\{3a\}\text{ to span }\mathbb{R}^2[/tex], it should be able to represent any vector in the form (x, y).
Since the set {3a} only contains a single vector, it cannot span [tex]R^2[/tex]. Regardless of the value of a, the set {3a} will always be a one-dimensional subspace of [tex]R^2[/tex], representing a line passing through the origin.
Therefore, there are no values of a and b that would make the [tex]\text{Set }\{3a\}\text{ spans } \mathbb{R}^2[/tex].
(b) The given system of linear equations can be written in matrix form as:
[tex]\begin{pmatrix}2 & -1 & 2 \\2 & -1 & 3 \\3 & 4 & 1 \\\end{pmatrix}\begin{pmatrix}x_1 \\x_2 \\x_3 \\\end{pmatrix}=\begin{pmatrix}4 \\4 \\0 \\\end{pmatrix}[/tex]
To determine the solution set S, we can solve the system of equations by row reducing the augmented matrix:
[tex]\begin{array}{ccc|c}2 & -1 & 2 & 4 \\2 & -1 & 3 & 4 \\3 & 4 & 1 & 0 \\\end{array}[/tex]
Performing row operations, we can reduce the matrix to row-echelon form:
[tex]\begin{array}{ccc|c}1 & 0 & -1 & 2 \\0 & 1 & -1 & 0 \\0 & 0 & 0 & 0 \\\end{array}[/tex]
From the row-echelon form, we can see that x1 - x3 = 2 and x2 - x3 = 0. We can express x3 as a free variable (let's call it t), and rewrite the equations:
[tex]x1 = 2 + x3 = 2 + t\\x2 = x3 = t[/tex]
The solution set S can be expressed as the [tex]\text{span}\left\{ \begin{bmatrix} x1 \\ x2 \\ x3 \end{bmatrix} \right\}[/tex]:
[tex]\text{Span}\left\{\begin{bmatrix}2 + t \\ t \\ t\end{bmatrix}\right\}[/tex]
So, the solution set S is the [tex]\text{span}\left\{ \begin{bmatrix} 2 + t \\ t \\ t \end{bmatrix} \right\}[/tex], where t is a real number.
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How many solutions exist in the given expression?
x+1/2y=1
20x+10y = 6
O infinite number of solutions exist
O no solution exists
O one unique solution exists
The given system of equations, x + (1/2)y = 1 and 20x + 10y = 6, has no solution. The equations represent parallel lines that do not intersect, indicating that there are no common points of intersection.
To determine the number of solutions in the given system of equations, we can analyze the coefficients of the variables. The first equation can be simplified as 2x + y = 2, while the second equation can be simplified as 20x + 10y = 6. By comparing the coefficients, we can see that the second equation is obtained by multiplying the first equation by 10. This indicates that the two equations represent the same line and are dependent.
When two equations represent the same line, they intersect at infinitely many points, which means there are an infinite number of solutions. However, in this case, the two equations have different right-hand side constants (1 and 6), indicating that the lines are parallel and will never intersect. Therefore, there are no common points of intersection and no solution exists.
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There are two boxes; the first one has 5 red balls and 7 blue balls while the second box has 3 red balls and 5 white balls. One of the boxes was drawn randomly and one ball was draw from it. Therefore the probability that the drawn ball was red is 0.1 O 0.25 O 0.3 O 0.4 O none of all above O
The probability that the drawn ball was red can be calculated by considering the probabilities of drawing a red ball from each box, weighted by the probabilities of selecting each box.
Let's calculate the probability that the drawn ball was red.
The probability of selecting the first box is 1/2, and the probability of drawing a red ball from the first box is 5/12 (since there are 5 red balls out of a total of 12 balls).
The probability of selecting the second box is also 1/2, and the probability of drawing a red ball from the second box is 3/8 (since there are 3 red balls out of a total of 8 balls).
To calculate the overall probability of drawing a red ball, we multiply the probability of selecting the first box by the probability of drawing a red ball from the first box, and then add it to the product of the probability of selecting the second box and the probability of drawing a red ball from the second box.
(1/2) * (5/12) + (1/2) * (3/8) = 1/24 + 3/16 = 7/48 ≈ 0.1458
Therefore, the probability that the drawn ball was red is approximately 0.1458 or 14.58%.
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Let V = span{1+ x, 1 + 2x, x − x²,1 – 2x²}. Find a basis of V. - 24. Let {V1, V2, 73, 74} be a basis of V. Show that {V₁ +V2, V2+√3, V3+V₁, V4−V₁} is a base too.
the given vector space is V = span{1+ x, 1 + 2x, x − x²,1 – 2x²}.
A set of vectors B = {b1, b2, ..., bk} in a vector space V is said to be a basis of V if it satisfies the following conditions: Every vector in V is a linear combination of vectors in B. B is linearly independent.
Let's find the basis of V: First, we will express each vector in terms of 1st vector i.e. 1 + x.
1st vector = 1 + x2nd vector = 1 + 2x3rd vector = x - x²4th vector = 1 - 2x²2nd Vector = -1(1 + x) + 3(1 + 2x) - 2(x - x²) - 5(1 - 2x²)2nd Vector = -4x² - 5x + 9.
Using 1st and 2nd vectors, we can get the following linear combination:2 + 5x = -1(1 + x) + 3(1 + 2x) - 2(x - x²) - 5(1 - 2x²)
We can conclude that the set {1+x,-4x²-5x+9} is a basis of V.
Now, let {V1, V2, V3, V4} be a basis of V. In order to show that {V₁ +V2, V2+√3, V3+V₁, V4−V₁} is a base too, there is a need to check if the given set is linearly independent. By equating a linear combination of all the vectors to zero and check if all scalars are zero.
(V₁ +V2) + (V2+√3) + (V3+V₁) + (V4−V₁) = 0(2V₁ + 2V2 + V3 + V4) = -√3 - V2
Conclusion can be drawn that the set {V₁ +V2, V2+√3, V3+V₁, V4−V₁} is a basis of V.
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a) Write out the first few terms of the series to show how the series starts. Then find the sum of the series. 1 Σ+ (-1)" 5" n=0
b) Use the nth-Term Test for divergence to show that the series is divergent, or state that the test is inconclusive. n n² + 3 n=1
c) Find the sum of the series. 6 (2n-1)(2n + 1) n=1
a. The series will be 1 + (-1)^5 + 1 + (-1)^5 + ... (repeating).
b. The series is divergent.
c. The sum is (4n^2 - 1)(4n^2 + 1)(8n^2 + 1)/6.
a) The series is given by 1 + (-1)^5 + 1 + (-1)^5 + ... (repeating). The first few terms of the series are 1, -1, 1, -1, 1. To find the sum of the series, we need to determine if the series converges or diverges. The sum of the series is divergent.
b) Using the nth-Term Test for divergence, we examine the behaviour of the individual terms of the series. The nth term is given by n/(n^2 + 3). As n approaches infinity, the term converges to zero, since the numerator grows linearly while the denominator grows quadratically. However, the nth-Term Test is inconclusive in determining whether the series converges or diverges. Additional tests, such as the comparison test or the integral test, may be needed to establish convergence or divergence.
c) The series is given by 6(2n-1)(2n + 1) as n ranges from 1 to infinity. To find the sum of the series, we can simplify the expression. Expanding the terms, we have 6(4n^2 - 1). The sum of this series can be found using the formula for the sum of squares, which is given by n(n + 1)(2n + 1)/6. Plugging in 4n^2 - 1 for n, we get the sum of the series as (4n^2 - 1)(4n^2 + 1)(8n^2 + 1)/6.
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please show steps to both problems, if theres an infinite number of
solutions in the top one, express x1, x2, and x3 in terms of
parameter t
[-/1 Points] DETAILS LARLINALG8 2.1.037. Solve the matrix equation Ax = 0. (If there is no solution, enter NO SOLUTION. If the system has X1 A = (33) X = X2 -[:] -5 (X1, X2, X3) = ( Need Help? Read It
The general solution for the matrix equation Ax = 0 is:
X1 = t
X2 = (2/5)t
X3 = 0
To solve the matrix equation Ax = 0, we need to find the values of x that satisfy the equation.
Given:
A = [ X1 -3X2 X3 ] 0
2X1 -X2 4X1 -3X3 -5
0 0 0
To find the solutions, we can row reduce the augmented matrix [A | 0] using Gaussian elimination:
Row 2 - 2 * Row 1:
[ X1 -3X2 X3 ] 0
0 5X2 - 2X1 -8X3 -5
0 0 0
Row 3 - 4 * Row 1:
[ X1 -3X2 X3 ] 0
0 5X2 - 2X1 -8X3 -5
0 12X2 - 4X1 - 4X3 0
Now, we simplify the system further:
Row 2 / 5:
[ X1 -3X2 X3 ] 0
0 X2 - (2/5)X1 -8/5X3 -1
0 12X2 - 4X1 - 4X3 0
Row 3 - 12 * Row 2:
[ X1 -3X2 X3 ] 0
0 X2 - (2/5)X1 -8/5X3 -1
0 0 -8X1 + 4X2 + 8X3 12
From the last row, we see that we have an equation:
-8X1 + 4X2 + 8X3 = 12
To express the solutions in terms of parameter t, we can write the variables in terms of t:
X1 = t
X2 = (2/5)t
X3 = 0
This means that for any value of t, the vector [t, (2/5)t, 0] will satisfy the equation Ax = 0.
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date at the deptre. The surystallica en 400.5 4.75 Use o tance to stredomorogoro who that splendore has been selected the terrain Types of the fol continentem What we went on teate ones? DAH 5.00 Hi5.00 OCH WW800 H00 OH 500m HIS OD 300 Demet Rond to two decal places and Determine the Round to tredecimal places as reded) Sohal onclusion that address the original H, There evidence to conclude theme of the population des come
The given text does not make coherent sense and appears to be a combination of random words or fragments. It is difficult to extract any meaningful information or address the original question based on the provided text.
The text provided does not form a coherent question or statement. It seems to be a random assortment of words and numbers without any clear context or structure. Consequently, it is impossible to derive a meaningful answer or address the original question. Without proper context or relevant information, it is challenging to provide any useful insights or draw conclusions.
Attempting to interpret the text leads to confusion, as it lacks logical connections or identifiable patterns. It is crucial to provide clear and coherent information when formulating questions or seeking answers. This allows for effective communication and facilitates a meaningful exchange of ideas.
In this case, it is recommended to provide more context or clarify the question to receive a relevant and accurate response. Without further information, it is not possible to offer any insights or conclusions regarding the population or any other topic related to the given text.
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Use Part 1 of the Fundamental Theorem of Calculus to find the derivative of the function. y = integral_3^tan x square root 2t + square root t dt
Let us suppose that the function is, [tex]\[y = \int\limits_{3}^{\tan x} {\sqrt {2t} + \sqrt t } \,dt\][/tex]We need to find the derivative of the above function. We will be using part 1 of the fundamental theorem of calculus for finding the derivative. the derivative of the function is[tex]\[y'(x) = \sec ^2 x\left( {\sqrt {2\tan x} + \sqrt {\tan x} } \right)\].[/tex]
Using the fundamental theorem of calculus part 1, we have,[tex]\[y'(x) = \frac{d}{{dx}}\int\limits_{3}^{\tan x} {\sqrt {2t} + \sqrt t } \,dt\][/tex] Let us find the derivative of \[y'(x)\] by applying the Leibniz rule.
Hence,[tex]\[y'(x) = \frac{d}{{dx}}\left( {\int\limits_{3}^{\tan x} {\sqrt {2t} + \sqrt t } \,dt} \right)\]$$y'(x) = \left( {\frac{d}{{d(\tan x)}}\int\limits_{3}^{\tan x} {\sqrt {2t} + \sqrt t } \,dt} \right)\left( {\frac{d(\tan x)}{{dx}}} \right)$$$$\[/tex]
Rightarrow [tex]y'(x) = \left( {\sqrt {2\tan x} + \sqrt {\tan x} } \right)\left( {\sec ^2 x} \right)$$$$\[/tex]
Rightarrow[tex]y'(x) = \sec ^2 x\left( {\sqrt {2\tan x} + \sqrt {\tan x} } \right)\][/tex]
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the level of the root node in a tree of height h is (a) 0 (b) 1 (c) h-1 (d) h (e) h 1
The root node is also the highest level node in the binary tree, and its level is 0. The correct option is a.
A binary tree is a type of data structure that consists of nodes, each of which has two branches, a left and a right branch, and one root node. The root node is the top node in the tree and has no parent node.
The root node is also the highest level node in the binary tree, and its level is 0.
The root node in a binary tree with height h is at level 0.The level of the root node in a binary tree of height h is 0. A binary tree with a height of h has a maximum of h levels, and since the root node is at level 0, the maximum level is h-1.
A binary tree is a type of data structure used in computer science that is made up of nodes and branches. Each no
de has at most two branches, a left branch and a right branch.
The topmost node in the tree is called the root node. The root node has no parent nodes and is therefore at the highest level in the tree.
In a binary tree with height h, the root node is at level 0, and the maximum level in the tree is h-1.
Therefore, the level of the root node in a tree of height h is 0. The correct option is a.
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A 145 78. Twenty-five randomly selected students were asked the number of movies they watched the previous week. The are as follows.
#of movies Frequency Relative Frequency Cumulative Relative Frequency
0 5
1 9
2 6
3 4
4 1
Table 2.67
a. Construct a histogram of the data.
b. Complete the columns of the chart.
(a) A histogram can be constructed to visualize the distribution of the number of movies watched by the students. (b) The missing columns of the chart can be completed by calculating the relative frequency.
(a) To construct a histogram, we plot the number of movies on the x-axis and the frequency on the y-axis. Each category (0, 1, 2, 3, 4) represents a bar, and the height of the bar corresponds to the frequency of that category. By connecting the tops of the bars, we form a series of rectangles that represent the distribution of the data.
(b) The missing columns in Table 2.67 can be completed by calculating the relative frequency and cumulative relative frequency for each category. The relative frequency for each category is found by dividing the frequency by the total number of students (25).
The cumulative relative frequency is the sum of the relative frequencies up to that category. By performing these calculations, the missing columns of the chart can be filled in, allowing for a comprehensive overview of the data.
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A bottled water distributor wants to estimate the amount of water contained in 1-gallon bottles purchased from a nationally known water bottling company. The water bottling company's specifications state that the standard deviation of the amount of water is equal to 0.01 galton. A random sample of 50 bottles is selected, and the sample mean amount of water per 1-gallon bottle is 0.993 gallon. Complete parts (a) through (d). a Construct a 95% confidence interval estimate for the population mean amount of water included in a 1-galon bottle. (Round to five decimal places as needed) b. On the basis of these results, do you think that the distributor has a right to complain to the water bottling company? Why? No, because a 1 sallon bottle containing exactly 1-gallon of water lies within the 95% confidence interval c. Must you assume that the population amount of water per bottle is normally distributed here? Explain. A. Yes, since nothing is known about the distribution of the population, it must be assumed that the population is normally distributed O B. No, because the Central Limit Theorem almost always ensures that is normally distributed when n is large. In this case, the value of n is large. OC. No, becaus the Central Limit Theorem almost always ensures that is normally distributed when n is small. In this case, the value of n is small, OD. Yes, because the Central Limit Theorem almost always ensures that X is normally distributed when n is large. In this case, the value of n is small. d. Construct a 90% confidence interval estimate. How does this change your answer to part ()? SW (Round to five decimal places as needed.) How does this change your answer to part (b)? Not Not .... Click to select your answers) ? Not Not A bottled water distributor wants to estimate the amount of water contained in 1-gallon bottles purchased from a nationally known water bottling company. The water botting company's specifications state that the standard deviation of the amount of water is equal to 0.01 gallon. A random sample of 50 botties is selected, and the sample mean amount of water per 1-gallon bottle is 0.993 gallon. Complete parts (a) through (d). Susu (Round to five decimal places as needed.) b. On the basis of these results, do you think that the distributor has a right to complain to the water bottling company? Why? No, because a 1-gallon bottle containing exactly 1-gallon of water lies within the 96% confidence interval c. Must you assume that the population amount of water per bottle is normally distributed here? Explain Yes, since nothing is known about the distribution of the population, it must be assumed that the population is normally distributed B. No, because the Central Limit Theorem almost always ensures that X is normally distributed when n is large. In this case, the value of n is large. OC. No, because the Central Limit Theorem almost always ensures that is normally distributed when n is small. In this case, the value of n is small. OD. Yes, because the Central Limit Theorem almost always ensures that X is normally distributed when n is large. In this case, the value of n is small. d. Construct a 90% confidence interval estimate. How does this change your answer to part (b)? (Round to five decimal places as needed) How does this change your answer to part (b)? A 1-gallon bottle containing exactly 1-galion of water les company the 90% confidence interval. The distributor a right to complain to the bottling N Click to select your answer(s)
The change in confidence interval does not change the answer to part (b), as 1-gallon still lies within the 90% confidence interval (0.99067, 0.99533). The distributor does not have a right to complain.
a) To construct a 95% confidence interval estimate for the population mean amount of water in a 1-gallon bottle, we can use the following formula:
CI = sample mean ± (critical value * (standard deviation / √n))
CI = 0.993 ± (1.96 * (0.01 / √50))
CI = 0.993 ± 0.00277
The 95% confidence interval is (0.99023, 0.99577).
b) The distributor does not have a right to complain since 1-gallon lies within the 95% confidence interval (0.99023, 0.99577).
c) The correct answer is B. No, because the Central Limit Theorem almost always ensures that X is normally distributed when n is large. In this case, the value of n (50) is large.
d) To construct a 90% confidence interval estimate, we can use the same formula with a different critical value:
CI = 0.993 ± (1.645 * (0.01 / √50))
CI = 0.993 ± 0.00233
The 90% confidence interval is (0.99067, 0.99533).
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-10 9 -8 y=91 P(x, y) F(-2,5) 1 What is the equation of the parbola shown below, given the focus at F(-2,5) and the directrix y vertex and the equation of the axis of symmetry of the parabola. =9? Ide
The equation of the parabola with a focus at F(-2,5) and a directrix at y=9 is y = (x² - 2x - 36)/(-8).
A parabola is a U-shaped curve that can be defined by its focus and directrix. The focus of the parabola is the point towards which all the rays of light reflected off the parabola's curve converge. The directrix, on the other hand, is a line that is equidistant from all points on the parabola.
To determine the equation of the parabola, we can use the standard form: (x-h)^2 = 4p(y-k), where (h,k) represents the vertex of the parabola and p is the distance from the vertex to the focus (and also from the vertex to the directrix).
From the given information, we know that the focus is located at F(-2,5). This means the vertex (h,k) will also be at (-2,5) since the vertex lies on the axis of symmetry.
We are also given the directrix at y=9. The distance between the vertex and the directrix is 4 units, which is equal to the value of p.
Substituting the values into the standard form equation, we have (x+2)²= 4(-4)(y-5). Simplifying this equation, we get (x+2)² = -16(y-5).
To find the final form of the equation, we expand the equation: x² + 4x + 4 = -16y + 80. Rearranging the terms, we have x² + 4x + 16y - 76 = 0. Dividing both sides by -4, we obtain the equation of the parabola as y = (x² - 2x - 36)/(-8).
The equation of the parabola with the given focus, directrix, vertex, and axis of symmetry is y = (x² - 2x - 36)/(-8).
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Simplify the following division: 8 x 10-5 Then enter your final answer in decimal form below:
The simplified form of the given division [tex]8 x 10^-^5[/tex] is [tex]0.00008[/tex].
To simplify the given division [tex]8 x 10^-^5[/tex], we first used the law of exponents. The law of exponents states that when we multiply two numbers with the same base, we add the exponents. Using the law of exponents, we rewrote the given division as [tex]8 x 1/10^5[/tex].
Then, we simplified the given division by multiplying the numerator and denominator by [tex]10^5[/tex]. This is because [tex]10^5/10^5 = 1[/tex], so multiplying by [tex]10^5[/tex]does not change the value of the given division. Multiplying [tex]8[/tex] by [tex]10^5[/tex] gives us [tex]800000[/tex], while multiplying [tex]1[/tex] by [tex]10^5[/tex] gives us [tex]100000[/tex]. Therefore,[tex]8/10^5[/tex] is equivalent to [tex]800000/100000[/tex], which simplifies to [tex]8/100000[/tex] or [tex]0.00008[/tex] in decimal form.
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A researcher knows that the weights of 6 year olds are normally distributed with \mu = 20.9 and \sigma = 3.2. It is claimed that all 6 year old children weighing less than 18.2 kg can be considered underweight and therefore undernourished. If a sample of n = 9 children is therefore selected from this population, find the probability that their average weight is less tha or equal to 18.2kg?
The probability that the average weight of a sample of 9 six-year-old children is less than or equal to 18.2 kg, given a population with a mean of 20.9 kg and a standard deviation of 3.2 kg, can be determined using the sampling distribution of the sample mean.
In this scenario, we are dealing with the distribution of sample means, which follows the Central Limit Theorem. The Central Limit Theorem states that when the sample size is sufficiently large, the sampling distribution of the sample mean will be approximately normally distributed, regardless of the shape of the population distribution.
To find the probability that the average weight of a sample of 9 children is less than or equal to 18.2 kg, we need to calculate the z-score for this value. The z-score measures the number of standard deviations a value is from the mean. Using the formula z = (x - μ) / (σ / sqrt(n)), where x is the sample mean, μ is the population mean, σ is the population standard deviation, and n is the sample size, we can calculate the z-score.
For this problem, x is 18.2 kg, μ is 20.9 kg, σ is 3.2 kg, and n is 9. Substituting these values into the formula, we find that the z-score is z = (18.2 - 20.9) / (3.2 / sqrt(9)) = -2.7 / 1.066 = -2.53 (rounded to two decimal places).
Next, we can use a standard normal distribution table or a statistical software to find the probability associated with a z-score of -2.53. The probability corresponds to the area under the standard normal curve to the left of -2.53. By looking up this value, we find that the probability is approximately 0.0058.
Therefore, the probability that the average weight of a sample of 9 six-year-old children is less than or equal to 18.2 kg is approximately 0.0058, or 0.58%.
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show working out clearly
B. Integrate the following: 1 5 i. (3x²+-+x) dx ii. (x²y³ -x5y4) dydx (4 marks) (6 marks)
The integral of (3x² - x) dx is x³ - 0.5x² + C, and the integral of (x²y³ - x⁵y⁴) dy is (0.25x²y⁴ - 0.2x⁶y⁵) + C.
To integrate the expression (3x² - x) dx, we use the power rule of integration. The power rule states that the integral of x^n dx, where n is any real number except -1, is [tex](1/(n+1))x^{(n+1)[/tex] + C, where C is the constant of integration. Applying this rule, we integrate each term separately.
For the term 3x², the power is 2, so we add 1 to the power and divide the coefficient by the new power. Therefore, the integral of 3x² dx is (3/3)[tex]x^{(2+1)[/tex] = x³ + C.
For the term -x, the power is 1. Following the power rule, we add 1 to the power and divide the coefficient by the new power. Hence, the integral of -x dx is (-1/2)[tex]x^{(1+1)[/tex] = -0.5x² + C.
Combining the integrals of both terms, we get the final result: x³ - 0.5x² + C.
Moving on to the second expression, (x²y³ - x⁵y⁴) dy, we integrate with respect to y this time. Since there is no coefficient in front of y, we can directly apply the power rule of integration.
For the term x²y³, the power of y is 3. Adding 1 to the power and dividing the coefficient by the new power, we obtain (1/4)x²y^(3+1) = (1/4)x²y⁴.
For the term -x⁵y⁴, the power of y is already 4. So the integral is simply (-1/5)x⁵[tex]y^{(4+1)[/tex] = (-1/5)x⁵y⁵.
Combining the integrals of both terms, we get the final result: (1/4)x²y⁴ - (1/5)x⁵y⁵ + C.
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Compute the following determinants using the permutation expansion method. (Your can check your answers by also computing them via the Gaussian elimination method.) -8 7 5 0 0-1 a) 2 -5 -6 b) -1 4 -2 9 4 2 3 3
Using the permutation expansion method, we get the main answer as follows:
Simplifying the above equation, we get:$\det(B) = -19 - 52 - 6 + 16$$\det(B) = -61$Therefore, the main answer is -61.
Summary: The value of the determinant of the matrix A is 31 and the value of the determinant of the matrix B is -61.
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5. Solve the differential equation ÿ+ 2y + 5y = 4 cos 2t. (15 p)
the general solution of the differential equation is: y = (1/2) e^(-t) cos(2t) + (1/2) sin(2t)
Given the differential equation is ÿ + 2y + 5y = 4 cos(2t).
To solve the differential equation, we will use the method of undetermined coefficients, where we assume that the particular solution is of the form:
yp = A cos(2t) + B sin(2t)Taking the first derivative,
we have yp' = -2A sin(2t) + 2B cos(2t)
Taking the second derivative,
we have yp'' = -4A cos(2t) - 4B sin(2t)
Substituting the particular solution,
we have:
-4A cos(2t) - 4B sin(2t) + 2(A cos(2t) + B sin(2t)) + 5(A cos(2t) + B sin(2t)) = 4 cos(2t).
Simplifying, we have: (-2A + 5A) cos(2t) + (-2B + 5B) sin(2t) = 4 cos(2t)2A - 3B = 4
Also, using the characteristic equation, we can find the complementary solution:
y c = c1 e^(-t) cos(2t) + c2 e^(-t) sin(2t)
Thus, the general solution is: y = yc + yp = c1 e^(-t) cos(2t) + c2 e^(-t) sin(2t) + A cos(2t) + B sin(2t)
Now, we can apply initial conditions to find the values of c1 and c2.
The first initial condition is that y(0) = 0.
Substituting t = 0, we get:0 = c1 + A.
The second initial condition is that y'(0) = 1.
Substituting t = 0, we get:1 = -c1 + 2B
Thus, we have two equations and two unknowns: 0 = c1 + A1 = -c1 + 2B. We can solve for A and B as follows: A = -c1B = 1/2.
We already know that c1 = -A,
so substituting, we have:c1 = A = 1/2c2 = 0.
Thus, the general solution of the differential equation is: y = (1/2) e^(-t) cos(2t) + (1/2) sin(2t).
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(8 marks) Assume that the occurrence of serious earthquakes is modeled as a Poisson process. The mean time between earthquakes was 437 days. (a) Estimate the rate 2 (per year, i.e. 365 days) of the Poisson process. [1] (b) [2] (c) [1] Calculate the probability that exactly three serious earthquakes occur in a typical year. Calculate the standard deviation of the number of serious earthquakes occur in a typical year. Calculate the probability of a gap of at least one year between serious earthquakes. (e) Calculate the median time interval between successive serious earthquakes. (d) [2] [2]
The rate per year is 1.197
The probability that exactly three serious earthquakes occur is 0.18
The standard deviation is 0.086
The median is 0.579
Estimating the rateGiven that
Mean = 437
So, we have
Rate, λ = 437/Year
λ = 437/365
λ = 1.197
Calculating the probability that exactly three serious earthquakes occurThe poisson distribution probability formula is
[tex]P(x) = \frac{\lambda^x * e^{-\lambda}}{x!}[/tex]
So, we have
[tex]P(3) = \frac{1.197^3 * e^{-1.197}}{3!}[/tex]
P(3) = 0.086
Calculate the standard deviationThis is calculated as
SD = √Mean
So, we have
SD = √437
Evaluate
SD = 20.90
Calculating the medianThis is calculated as
Median = (ln 2) / λ
So, we have
Median = (ln 2) / 1.197
Median = 0.579
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3. We say that a set SCR" is linearly independent if for any finite collection of distinct elements vi...,S we have that (vi,...) is a linearly independent set. Let & CR" be a line. Prove that is not a linearly independent set. 4. Give an example of a linearly dependent collection of vectors (₁,2,3) such that if then span{}.
The statement "CR" is a line that is not a linearly independent set" can be proven through a contradiction.
A collection of vectors is called a linearly independent set if none of them can be expressed as a linear combination of the others. If a vector is added that can be expressed as a linear combination of the previous vectors, the collection is no longer linearly independent.
A line in the plane, represented by the equation [tex]Ax+By = C[/tex], is a linearly dependent set. It has two basis vectors: [tex](A,0)[/tex] and [tex](0,B)[/tex], each of which can be expressed as a linear combination of the other. Example: 4. To show that a collection of vectors is linearly dependent, it is enough to find a nontrivial solution to the homogeneous equation [tex]a(1,2,3)+ b(2,4,6)+ c(3,6,9) = 0[/tex].
Dividing by 3, this becomes [tex](a + 2b + 3c, 2a + 4b + 6c, 3a + 6b + 9c) = (0,0,0)[/tex], which simplifies to[tex]a + 2b + 3c = 0[/tex].
One solution to this equation is [tex]a = 3[/tex], [tex]b = -3[/tex], and[tex]c = 1[/tex].
So the collection [[tex]{(1,2,3), (2,4,6), (3,6,9)}[/tex]] is linearly dependent.
If the sum of the coefficients of a linear combination of these vectors is equal to zero, then that combination can be eliminated without changing the span of the set.
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Find the volume of the solid generated when the region bounded by y = 2 sin x and y = 0, for 0≤x≤ π, is revolved about the x-axis. (Recall that sin²x = (1 - cos 2x).)
Set up the integral that gives the volume of the solid.
∫ (___) dx 0
(Type exact answers.)
The volume is ___ cubic units. (Type an exact answer.)
To find the volume of the solid generated by revolving the region bounded by y = 2 sin x and y = 0, for 0 ≤ x ≤ π, about the x-axis, we can use the method of cylindrical shells.
The formula for the volume of a solid generated by revolving a curve y = f(x) about the x-axis between x = a and x = b is given by:
V = ∫[a,b] 2πx f(x) dx
In this case, the region is bounded by y = 2 sin x and y = 0, and we need to revolve it about the x-axis from x = 0 to x = π. So we have:
f(x) = 2 sin x
a = 0
b = π
The integral for the volume becomes:
V = ∫[0,π] 2πx (2 sin x) dx
Now, we can simplify the integral using the double-angle identity for sine:
sin 2x = 2 sin x cos x
We can rewrite the integrand as follows:
2πx (2 sin x) = 4πx sin x = 4πx (sin x)(cos 0)
Now the integral becomes:
V = ∫[0,π] 4πx (sin x)(cos 0) dx
V = 4π ∫[0,π] x (sin x) dx
To evaluate this integral, we can use integration by parts. Let u = x and dv = sin x dx.
Differentiating u gives du = dx, and integrating dv gives v = -cos x.
Applying the integration by parts formula ∫ u dv = uv - ∫ v du, we have:
V = 4π [x (-cos x) - ∫(-cos x) dx] evaluated from 0 to π
V = 4π [-x cos x + ∫cos x dx] evaluated from 0 to π
V = 4π [-x cos x + sin x] evaluated from 0 to π
Now let's evaluate the expression at the limits:
V = 4π [-(π cos π) + sin π - (0 cos 0 + sin 0)]
V = 4π [-(-π) + 0 - 0]
V = 4π (π)
V = 4π²
Therefore, the volume of the solid is 4π² cubic units.
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Use the definition to calculate the derivative of the following function. Then find the values of the derivative as specified. p(0)=√110 p'(1). p'(11). P(77) p'(0)=
To calculate the derivative of a function using the definition, we use the formula:
p'(x) = lim(h->0) [p(x+h) - p(x)] / h
Let's apply this to the given function:
p(x) = √(110)
To find p'(1), we substitute x = 1 into the derivative formula:
p'(1) = lim(h->0) [p(1+h) - p(1)] / h
Since p(x) = √(110) is a constant function, p(1+h) - p(1) = 0 for any value of h. Therefore, p'(1) = 0.
Similarly, for p'(11):
p'(11) = lim(h->0) [p(11+h) - p(11)] / h
Again, since p(x) = √(110) is a constant function, p(11+h) - p(11) = 0 for any value of h. Therefore, p'(11) = 0.
For P(77) and p'(0), we need to know the actual function p(x).
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Find the area of the triangle with vertices (2, 0, 1), (1, 0, 1) and (3, 0, 5).
A. 16
B. 8
C. 4
D. 2
E. 1
The area of the triangle with the given vertices is 4 square units, which corresponds to option C.
In this case, the vertices are:
A(2, 0, 1)
B(1, 0, 1)
C(3, 0, 5)
To calculate the area, we can use the magnitude of the cross product of two vectors formed by the given vertices.
Let's first find the vectors AB and AC:
AB = B - A = (1 - 2, 0 - 0, 1 - 1) = (-1, 0, 0)
AC = C - A = (3 - 2, 0 - 0, 5 - 1) = (1, 0, 4)
Now, calculate the cross product of AB and AC:
AB × AC = (0 * 4 - 0 * 1, -1 * 4 - 0 * 1, -1 * 0 - 1 * 0) = (0, -4, 0)
The magnitude of the cross product gives the area of the triangle:
Area = |AB × AC| = √(0² + (-4)² + 0²) = √(16) = 4
Therefore, the area = 4 (option C).
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In 2000, the chairman of a California ballot initiative campaign to add "none of the above" to the list of ballot options in all candidate races was quite critical of a Field poll that showed his measure trailing by 10 percentage points. The poll was based on a random sample of 1000 registered voters in California. He is quoted by the Associated Presst as saying, "Field's sample in that poll equates to one out of 17,505 voters," and he added that this was so dishonest that Field should get out of the polling business! If you worked on the Field poll, how would you respond to this criticism? a) It is not the proportion of voters that is important, but the number of voters in the sample, and 1000 voters is an adequate number. b) It is the proportion of voters that is important, not the number of voters in the sample, and 1 out of every 17,505 voters is an adequate proportion.
It is not the proportion of voters that is important, but the number of voters in the sample, and 1000 voters is an adequate number. The correct answer is A.
Field poll is a famous and reliable pollster in California. It releases independent non-partisan polls for candidates in local and state elections. Field pollster works by sampling 1000 registered voters in California and in this poll the California ballot initiative campaign to add "none of the above" was being evaluated. In 2000, the chairman of the campaign was very critical of the Field poll that showed his measure trailing by 10 percentage points. The chairman criticized the pollster saying that the sample was so dishonest and not a fair representation of voters in California. The pollster had sampled 1 out of every 17,505 voters which he thought was inadequate. He also added that Field should get out of the polling business because it was a disaster.The issue at hand is whether the sample size of 1000 voters is sufficient or not. To respond to this criticism, the Field pollster should say that the sample size of 1000 registered voters is adequate for the poll because it is not the proportion of voters that is important, but the number of voters in the sample. 1000 voters is considered an adequate number. In addition, the poll was conducted randomly, which means that there was no bias in selecting the voters for the poll. Therefore, the criticism of the chairman is unfounded and does not hold water. The Field pollster should continue with its polling activities as usual.
Thus, it can be concluded that the correct response is A. It is not the proportion of voters that is important, but the number of voters in the sample, and 1000 voters is an adequate number.
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Bullet Proof Inc. manufactures high-end protective screens for Smartphones and Tablets. The plant equipment limits both kinds that can be made in one day. The limits are as follows:
• No more than 80 Tablet screens, < 80
• No more than 110 Smartphone screens, y ≤ 110
• No more than 150 total, z + y ≤ 150
• Tablet screens cost $120 each to manufacture
• Smartphone screens cost $85 each to manufacture
Using the above information, the objective function for the cost of screens produced at this manufacturer is
C-$80+ $110y
C=$150z + 150y
C=$85z + $120y
C-$120x + $85y
The objective function C = $85z + $120y represents the total cost of manufacturing screens, taking into account the cost per unit and the number of units produced for both Smartphones and Tablets.
The objective function for the cost of screens produced at this manufacturer can be expressed as:
C = $85z + $120y
Let's break down the components of this objective function:
$85z represents the cost of manufacturing Smartphone screens. Here, z represents the number of Smartphone screens produced, and $85 represents the cost per Smartphone screen.
$120y represents the cost of manufacturing Tablet screens. Here, y represents the number of Tablet screens produced, and $120 represents the cost per Tablet screen.
The objective function combines these two costs to give the total cost of manufacturing screens at the manufacturer. The coefficients $85 and $120 represent the cost per unit, while z and y represent the number of units produced.
Therefore, the objective function C = $85z + $120y represents the total cost of manufacturing screens, taking into account the cost per unit and the number of units produced for both Smartphones and Tablets.
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3. Consider the function f(x) = x - log₂ x − 4, and let the nodes be 1, 2, 4.
(a) Find the minimal degree polynomial which interpolates f(x) at the nodes.
(b) What base points should we choose to minimize the error on the interval [1,4]? Provide the error estimation as well.
(c) Apply inverse interpolation to approximate the solution of the equation f(x) = 0. Perform one step of the method. (4+6+4 points)
(a) The minimal degree polynomial that interpolates f(x) at the given nodes 1, 2, and 4 is P(x) = 3x - 12.
(b) To minimize the error on the interval [1,4], choose the base points as x₀ = 1 and xₙ = 4. The error estimation is given by |f(x) - P(x)| ≤ M / (n+1)! * |(x - 1)(x - 4)|, where M is the maximum value of |f''''(x)|.
(a) To find the minimal degree polynomial that interpolates f(x) at the given nodes, we can use the Lagrange interpolation formula.
At node x = 1:
L₁(x) = (x - 2)(x - 4) / (1 - 2)(1 - 4) = (x - 2)(x - 4) / 3
At node x = 2:
L₂(x) = (x - 1)(x - 4) / (2 - 1)(2 - 4) = -(x - 1)(x - 4)
At node x = 4:
L₃(x) = (x - 1)(x - 2) / (4 - 1)(4 - 2) = (x - 1)(x - 2) / 6
The minimal degree polynomial that interpolates f(x) at the nodes is given by:
P(x) = f(1)L₁(x) + f(2)L₂(x) + f(4)L₃(x)
(b) To minimize the error on the interval [1,4], we can choose the base points to be the endpoints of the interval, i.e., x₀ = 1 and xₙ = 4.
The error estimation for the Lagrange interpolation formula can be given by:
|f(x) - P(x)| ≤ M / (n+1)! * |(x - x₀)(x - xₙ)|,
where M is the maximum value of |f''''(x)| on the interval [x₀, xₙ]. Since f(x) = x - log₂x - 4, we can calculate f''''(x) as 48 / (x²log₂(x)³).
Using the endpoints of the interval, the error estimation becomes:
|f(x) - P(x)| ≤ M / (n+1)! * |(x - 1)(x - 4)|.
(c) Applying inverse interpolation to approximate the solution of the equation f(x) = 0 involves reversing the roles of x and f(x).
Let's denote the inverse polynomial as P^(-1)(x). We have:
P^(-1)(0) = 1.
To perform one step of the method, we interpolate the inverse polynomial at the nodes 1, 2, and 4:
P^(-1)(1) = 0,
P^(-1)(2) = 1,
P^(-1)(4) = 2.
By interpolating these three points, we can find the polynomial P^(-1)(x). To approximate the solution of f(x) = 0, we evaluate P^(-1)(x) at x = 0, which gives us the approximate solution.
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An experiment was conducted to measure and compare the effectiveness of various feed supplements on the growth rate of chickens. To test whether type of diet has influence on the growth of chickens, an analysis of variance was done and the R output is below. Test at 1% level of significance, assume that the population variances are equal.
What is the within mean square
> anova(lm(weight~feed))
Analysis of Variance Table
Response: weight
Df Sum Sq Mean Sq F value Pr(>F)
feed 5 231129 46226 15.365 5.936e-10 ***
Residuals 65 195556 3009
---
Signif. codes: 0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1
PLEASE USE R CODE
The within mean square, also known as the mean square error (MSE) or residual mean square, can be obtained from the analysis of variance (ANOVA) output in R.
In this case, the within mean square corresponds to the "Mean Sq" value for the "Residuals" row. From the given ANOVA table, the within mean square is 3009. This value represents the average sum of squares of the residuals, which indicates the amount of unexplained variability in the data after accounting for the effect of the feed supplements.
A smaller within mean square suggests a better fit of the model to the data, indicating that the type of diet has a significant influence on the growth rate of chickens. The obtained within mean square can be used to further assess the significance of the diet effect and make conclusions about the experiment.
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Verify that the inverse of A™ is (A-')?. Hint: Use the multiplication rule for tranposes, (CD)? = DCT.
The inverse of the transpose of matrix A is equal to the transpose of the inverse of matrix A.
To verify that the inverse of A transpose (A^T) is equal to the transpose of the inverse of A (A^-1), we can use the multiplication rule for transposes, which states that (CD)^T = D^T * C^T.
Let's assume that A is an invertible matrix. We want to show that (A^T)^-1 = (A^-1)^T.
First, let's take the inverse of A^T:
(A^T)^-1 * A^T = I,
where I is the identity matrix.
Now, let's take the transpose of both sides:
(A^T)^T * (A^T)^-1 = I^T.
Simplifying the equation:
A^-1 * (A^T)^T = I.
Since the transpose of a transpose is the original matrix, we have:
A^-1 * A^T = I.
Now, let's take the transpose of both sides:
(A^-1 * A^T)^T = I^T.
Using the multiplication rule for transposes, we have:
(A^T)^T * (A^-1)^T = I.
Again, since the transpose of a transpose is the original matrix, we get:
A * (A^-1)^T = I.
Now, let's take the transpose of both sides:
(A * (A^-1)^T)^T = I^T.
Using the multiplication rule for transposes, we have:
((A^-1)^T)^T * A^T = I.
Simplifying further, we get:
A^-1 * A^T = I.
Comparing this with the earlier equation, we see that they are identical. Therefore, we have verified that the inverse of A transpose (A^T) is equal to the transpose of the inverse of A (A^-1).
In conclusion, (A^T)^-1 = (A^-1)^T.
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Using the divergence criteria in the class, show that (a) f(x) does not have a limit at 0, where x < 0 f(x) = -{ x > 0 (b) f(x) does not have a limit at 0, where 1 f(x) = sin 7.C
Divergence criteriaIn mathematics, the Divergence criterion is a theorem that is used to establish the divergence or convergence of a series.
To use this criterion, one needs to observe if the limit of the series terms is zero as n approaches infinity, and if it does not, then the series will diverge.
Therefore, if a limit of the sequence does not exist or is not equal to L, then the series is said to diverge.
The Divergence criterion states that if the limit of the sequence of terms of a series is not equal to 0, the series will not converge.
This is a necessary but not sufficient condition for convergence.
Therefore, for a series to converge, its sequence of terms must approach 0.
To show that (a) f(x) does not have a limit at 0, where x < 0 f(x) = -{ x > 0}, we use the Divergence criterion.
Let's suppose that the limit of f(x) as x approaches 0 exists.
Therefore, we have limx→0- f(x) = limx→0+ f(x).
Since f(x) = -1 for x < 0, and f(x) = 1 for x > 0, then we have limx→0- f(x) = -1 and limx→0+ f(x) = 1.
Hence, we get a contradiction and we can conclude that f(x) does not have a limit at 0, where x < 0 f(x) = -{ x > 0}.
To show that (b) f(x) does not have a limit at 0, where 1 f(x) = sin 7.C,
we use the Divergence criterion. Let's suppose that the limit of f(x) as x approaches 0 exists. Therefore, we have limx→0 f(x) = L.
If L exists, then we can write it as limx→0 f(x) = limx→0 sin(7/x) / (1/x) = limx→0 (7 cos(7/x)) / (-1/x²).
Simplifying, we get limx→0 f(x) = limx→0 -7x² cos(7/x) = 0.
Since the limit is equal to 0, we cannot use the Divergence criterion to determine whether the series converges or diverges.
Therefore, we need to use another test to determine the convergence or divergence of the series.
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(2) In triathlons, it is common for racers to be placed into age and gender groups. Friends Romeo and Juliet both completed the Verona Triathlon, where Romeo competed in the Men, Ages 30-34 group while Juliet competed in the Women, Ages 25–29 group. Romeo completed the race in 1:22:28 (4948 seconds), while Juliet completed the race in 1:31:53 (5513 seconds). While Romeo finished faster, they are curious about how they did within their respective groups. Here is some information on the performance of their groups. • The finishing times of the Men, Ages 30-34 group has a mean of 4313 seconds with a standard deviation of 583 seconds. • The finishing times of the Women, Ages 25-29 group has a mean of 5261 seconds with a standard deviation of 807 seconds. • The distributions of finishing times for both groups are approximately Nor- mal. Thus, we can write the two distributions as Nu = 4313,0 = 583) for Men, Ages 30-34 and Nu=5261,0 = 807) for the Women, Ages 25-29 group. Remember: a better performance corresponds to a faster finish. (a) What are the Z-scores for Romeo's and Juliet's finishing times? What do these Z-scores tell you? (b) Did Romeo or Juliet rank better in their respective groups? Explain your reasoning. (c) What percent of the triathletes were slower than Romeo in his group? (d) What percent of the triathletes were slower than Juliet in her group? (e) Compute the cutoff time for the fastest 5% of athletes in the men's group, i.e. those who took the shortest 5% of time to finish. (This is in the 5th percentile of the distribution). Give an answer in terms of hours, minutes, and seconds. (f) Compute the cutoff time for the slowest 10% of athletes in the women's group. (This is in the 90th percentile of the distribution). Give an answer in terms of hours, minutes, and seconds.
(a) 0.31. Z-scores (b) Juliet's Z-score of 0.31 is lower than Romeo's Z-score of 1.09 (c) Therefore, approximately 54% of the triathletes were slower than Romeo in his group. (d) Therefore, approximately 51% of the triathletes were slower than Juliet in her group. (e) The cutoff time for the fastest 5% of athletes in the men's group is approximately 1 hour, 5 minutes, and 16 seconds. (f) Athletes in the women's group is approximately 1 hour, 44 minutes, and 32 seconds.
(a) To calculate the Z-scores for Romeo and Juliet's finishing times, we use the formula: Z = (X - mean) / standard deviation. For Romeo, his Z-score is (4948 - 4313) / 583 ≈ 1.09, and for Juliet, her Z-score is (5513 - 5261) / 807 ≈ 0.31. Z-scores measure how many standard deviations an individual's score is from the mean. Positive Z-scores indicate scores above the mean, while negative Z-scores indicate scores below the mean.
(b) To determine who ranked better in their respective groups, we compare the Z-scores. Since Z-scores reflect the distance from the mean, a lower Z-score indicates a better rank. In this case, Juliet's Z-score of 0.31 is lower than Romeo's Z-score of 1.09, indicating that Juliet ranked better within her group.
(c) To find the percentage of triathletes slower than Romeo in his group, we need to calculate the percentile. Using a Z-table or calculator, we find that Romeo's Z-score of 1.09 corresponds to approximately the 86th percentile. This means that around 86% of triathletes in Romeo's group finished slower than him.
(d) Similarly, to determine the percentage of triathletes slower than Juliet in her group, we find that her Z-score of 0.31 corresponds to approximately the 62nd percentile. Therefore, about 62% of triathletes in Juliet's group finished slower than her.
(e) To compute the cutoff time for the fastest 5% of athletes in the men's group, we look for the Z-score that corresponds to the 5th percentile. From the Z-table or calculator, we find that the Z-score is approximately -1.645. Using this Z-score, we can calculate the cutoff time by multiplying it by the standard deviation and adding it to the mean.
(f) For the cutoff time of the slowest 10% of athletes in the women's group, we look for the Z-score corresponding to the 90th percentile. Using the Z-table or calculator, we find that the Z-score is approximately 1.282. Multiplying this Z-score by the standard deviation and adding it to the mean gives us the cutoff time, which can be converted to hours, minutes, and seconds.
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16. Using the Quotient tanx = sinx to prove COSX oved tan tanx = = sec²x. [3 Marks]
To prove the identity tan(x) = [tex]sec^2(x)[/tex], we'll start with the given equation tan(x) = sin(x). We know that tan(x) = sin(x) / cos(x) (definition of tangent).
Substituting this into the equation, we have:
sin(x) / cos(x) = [tex]sec^2(x)[/tex]
To prove this, we need to show that the left-hand side (LHS) is equal to the right-hand side (RHS).
Let's simplify the LHS:
LHS = sin(x) / cos(x)
Recall that sec(x) = 1 / cos(x) (definition of secant).
Multiplying the numerator and denominator of the LHS by sec(x), we have:
LHS = (sin(x) / cos(x)) * (sec(x) / sec(x))
Using the fact that sec(x) = 1 / cos(x), we can rewrite this as:
LHS = sin(x) * (sec(x) / cos(x))
Now, since sec(x) = 1 / cos(x), we can substitute this back into the equation:
LHS = sin(x) * (1 / cos(x)) / cos(x)
Simplifying further:
LHS = sin(x) /[tex]cos^2(x)[/tex]
But remember,[tex]cos^2(x)[/tex] = [tex]1 / cos^2(x)[/tex] (reciprocal identity).
Therefore, we can rewrite the LHS as:
LHS = [tex]sin(x) / cos^2(x)[/tex]
And this is equal to the RHS:
LHS = RHS
Hence, we have proven that [tex]tan(x) = sec^2(x)[/tex].
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