The probability that a randomly selected point within the circle falls in the red-shaded circle is 0.785
Finding the probabilityFrom the question, we have the following parameters that can be used in our computation:
Red circle of radius 11White square of length 22The areas of the above shapes are
Red circle = 3.14 * 11^2 = 379.94
White square = 22^2 = 484
The probability is then calculated as
P = Red circle/White square
So, we have
P = 379.94/484
Evaluate
P = 0.785
Hence, the probability is 0.785
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. (3 points) for a simple linear regression, if the sum of squares for error (sse) is 40 and the sum of squares due to the model (ssm) is 60, what is ? (a) 1.50 (b) 0.40 (c) 0.60 (d)
If the sum of squares for error (SSE) is 40 and the sum of squares due to the model (SSM) is 60, therefore, the answer is (c) 0.60.
Based on your question, the coefficient of determination (R²) for a simple linear regression, given the sum of squares for error (SSE) is 40 and the sum of squares due to the model (SSM) is 60.
To calculate R², follow these steps:
1. Calculate the total sum of squares (SST): SST = SSE + SSM
2. Divide SSM by SST: R² = SSM / SST
Now, let's apply the values from your question:
To calculate, we use the formula:
= SSM / SSM + SSE)
Plugging in the given values, we get:
= 60 / (60 + 40) = 0.6
SST = SSE + SSM = 40 + 60 = 100
R² = SSM / SST = 60 / 100 = 0.60
So, the coefficient of determination (R²) is 0.60, which corresponds to option (c).
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Suppose a simple random sample of size n = 200i is obtained from a population whose size is N = 25 and whose population proportion with a specified characteristic is p = 0.2
(a) Describe the sampling distribution of p.
Choose the phrase that best describes the shape of the sampling distribution below.
Approximately normal because n <= 0.05N and n_{D}(1 - p) >= 10
B. Not normal because n <= 0.05N and np(1 - p) >= 10
C. Approximately normal because n <= 0.05N and np(1 - p) < 10
D. Not normal because n <= 0.05N and np(1 - p) < 10
The sampling distribution of p is the distribution of all possible values of p that could be obtained from all possible samples of size n = 200i from the population with size N = 25 and population proportion p = 0.2.
To determine whether the sampling distribution of p is approximately normal, we need to check the conditions n <= 0.05N and [tex]np(1 - p)\geq 10[/tex].
Here, n = 200i and N = 25, so [tex]n\leq 0.05N[/tex] holds if and only if [tex]i\leq 0625[/tex].
Since i is a positive integer, the largest value that i can take is 1. Therefore, n = 200 is the maximum sample size that we can have.
Next, we need to check whether [tex]np(1 - p)\geq 10[/tex]. Substituting n = 200 and p = 0.2, we get np(1 - p) = 32, which is greater than or equal to 10. Therefore, this condition is also satisfied.
Hence, we can conclude that the sampling distribution of p is approximately normal because [tex]n\leq0.05N[/tex] and [tex]np(1 - p)\geq 10[/tex].
Therefore, the correct answer is option A: Approximately normal because and [tex]n\leq0.05N[/tex] and [tex]n_{D} (1 - p)\geq 10.[/tex].
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just answer for brainleist
Answer:
128° + 52° + 38° + x° = 360°
218° + x° = 360°
x = 142
y"" + 2y + y= 7 +75sin2x I want other answers compared to the answers posted earlier.. keep it short and simple.
The general solution of the y" + 2y + y= 7 +75sin2x is given as:
y = (c₁+c₂x)[tex]e^{-x}[/tex] + 7 - 12cos2x - 9sin2x
The Greek terms trigonon (triangle) and metron (measure) are the origin of the word trigonometry. The connections between the lengths and angles of triangles' sides are the subject of this area of mathematics. An equation with one or more trigonometric ratios of unknown angles is said to as trigonometric. The ratios of sine, cosine, tangent, cotangent, secant, and cosecant angles are used to express it.
y" + 2y' + y = 7 + 75sin2x
Auxlliary equation are (m²+2m+1) = 0
CF = (c₁+c₂x)[tex]e^{-x}[/tex]
PI = [tex]\frac{1}{D^2+2D+1} (7+75sin2x)[/tex]
Now,
[tex]\frac{7}{D^2+2D+1} +\frac{75}{D^2+2D+1} (sin2x)[/tex]
7 -3(2D+3)sin2x
7 - 6D.sin2x - 9sin2x
7 - 6 x 2cos2x - 9sin2x
7 - 12cos2x - 9sin2x
PI = 7 - 12cos2x - 9sin2x
Finally,
y = C.F + P.I
y = (c₁+c₂x)[tex]e^{-x}[/tex] + 7 - 12cos2x - 9sin2x.
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Compare the functions y= 2x² and y= 2. Which of the following statements are true? Check all that
apply.
For any x-value, the y-value of the exponential function is always greater.
For any x-value, the y-value of the exponential function is always smaller.
For some x-values, the y-value of the exponential function is smaller.
For some x-values, the y-value of the exponential function is greater.
For any x-value greater than 7, the y-value of the exponential function is greater.
For equal intervals, the y-values of both functions have a common ratio.
DONE
Answer: Answer:
3. For some x-values, the y-value of the exponential function is smaller.
4. For some x-values, the y-value of the exponential function is greater.
5. For any x-value greater than 7, the y-value of the exponential function is greater.
Step-by-step explanation:
We are given the functions,
It is required to find the true statements of the functions.
From the graphs of the functions below, we have that the graphs intersect at the point (6.32,79.878).
To the left of the point, we have that the exponential function have smaller y-values than the parabola.
To the right of the point, we have that the exponential function have greater y-values than the parabola.
Moreover, after x= 7, the y-values of the exponential function are always greater than parabola.
Thus, the correct options are 3, 4 and 5.
Step-by-step explanation:
Answer:
- For any x-value, the y-value of the exponential function is always greater. (False)
- For any x-value, the y-value of the exponential function is always smaller. (False)
- For some x-values, the y-value of the exponential function is smaller. (True)
- For some x-values, the y-value of the exponential function is greater. (True)
- For any x-value greater than 7, the y-value of the exponential function is greater. (Not enough information provided to determine)
- For equal intervals, the y-values of both functions have a common ratio. (False)
A researcher developed a regression model to predict the tear rating of a bag of coffee based on the plate gap in bag-sealing equipment. Data were collected on 30 bags in which the plate gap was varied. An analysis of variance from the regression showed that b1=0.7098 and Upper S1=0.2146. a. At the 0.05 level ofsignificance, is there evidence of a linear relationship between the plate gap of the bag-sealing machine and the tear rating of a bag of coffee? b. Construct a 95% confidence interval estimate of the population slope, betaβ1.
Compute the test statistic.
The test statistic is
Determine the critical value(s).
The critical value(s) is(are)
reach a decision
H0.
There is blank evidence at the 0.05 level of significance to conclude that there is a linear relationship between the summated rating and the cost of a meal at a restaurant.
The 95% confidence interval is
Expert Ans
a. At the 0.05 level of significance, there is evidence of a linear relationship between the plate gap of the bag-sealing machine and the tear rating of a bag of coffee.
b. A 95% confidence interval estimate of the population slope, betaβ1 is (0.5590, 0.8606).
a. To test for the linear relationship between plate gap and tear rating, we can use the null and alternative hypotheses:
H0: β1 = 0 (there is no linear relationship)
Ha: β1 ≠ 0 (there is a linear relationship)
We can use the t-test to test this hypothesis. The test statistic is calculated as:
t = b1 / (S1 / [tex]\sqrt(n)[/tex])
where b1 is the sample slope, S1 is the standard error of the slope, and n is the sample size. Substituting the values given in the question, we get:
t = 0.7098 / (0.2146 / sqrt(30)) = 5.05
Using a t-distribution with n-2 = 28 degrees of freedom and a significance level of 0.05, we can find the critical values as ±2.048. Since the calculated t-value of 5.05 is greater than the critical value of 2.048, we reject the null hypothesis and conclude that there is evidence of a linear relationship between plate gap and tear rating at the 0.05 level of significance.
b. To construct a 95% confidence interval estimate of the population slope β1, we can use the formula:
b1 ± tα/2(S1 / [tex]\sqrt(n)[/tex])
where tα/2 is the critical value from the t-distribution with n-2 degrees of freedom and a confidence level of 95%. Substituting the values given in the question, we get:
b1 ± 2.048(0.2146 / [tex]\sqrt(30)[/tex]) = 0.7098 ± 0.1508
Therefore, the 95% confidence interval for the population slope β1 is (0.5590, 0.8606).
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9y-7x=-13 -9x+y=15 substitution
The solution of the given system of equations by substitution is (-2, -3).
Given a system of equations,
9y - 7x = -13 [Equation 1]
-9x + y = 15 [Equation 2]
We have to find the solution of the given system of equations.
From [Equation 2],
y = 15 + 9x [Equation 3]
Substitute [Equation 3] in [Equation 1].
9 (15 + 9x) - 7x = -13
135 + 81x - 7x = -13
74x = -148
x = -2
y = 15 + (-18) = -3
Hence the solution of the given system of equations is (-2, -3).
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What’s the answer I need it asap?
The distance between A and B is 5 unit.
We have the coordinates as
A(4, 3) and B(4, -2).
Using Distance formula
d= √(x₂ - x₁)² + (y₂ - y₁)²
So, d = √(-2-3)² + (4-4)²
d= √(-5)² + 0²
d = √25
d= 5
Thus, the distance between A and B is 5 unit.
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An angle measures 83.2° less than the measure of its supplementary angle. What is the measure of each angle?
uppose you have a set with k elements. set up a recurrence relation to count the number of subsets of the set (alternatively, the cardinality of its power set). don't forget your initial condition.
Therefore, we have the recurrence relation: |P(S_k)| = 2 * |P(S_{k-1})|
with the initial condition |P(S_0)| = 1 (since the empty set is the only subset of the empty set).
Sure! To count the number of subsets of a set with k elements, we can use the fact that each element can either be in a subset or not. This gives us two options for each element, so there are 2^k total subsets.
To set up a recurrence relation for this, let S_k denote the set with k elements and P(S_k) denote its power set (the set of all subsets of S_k). Then, we can relate P(S_k) to P(S_{k-1}) by considering whether or not to include the kth element in each subset.
If we don't include the kth element, then each subset of S_{k-1} is also a subset of S_k, so there are |P(S_{k-1})| subsets that don't include the kth element.
If we do include the kth element, then each subset of S_{k-1} can be extended by including the kth element, giving us |P(S_{k-1})| more subsets.
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12x^2-22x-5=-5x use the quadratic formula to solve express your answer in simplest form
The solutions to the equation 12x²-22x-5=-5x using the quadratic formula are x = 5/4 and x = -1/3.
The given equation is a quadratic equation in standard form, ax² + bx + c = 0, where a = 12, b = -22, and c = -5 + 5 = 0. We can use the quadratic formula to solve for x:
x = (-b ± √(b² - 4ac)) / 2a
Substituting the values of a, b, and c, we get:
x = (22 ± √(22² - 4(12)(0))) / 2(12)
Simplifying under the square root, we get:
x = (22 ± √484) / 24
x = (22 ± 22) / 24
Simplifying further, we get:
x = 44/24 or x = 0/24
Reducing the first fraction, we get:
x = 11/6 or x = 0
However, we need to check if x = 0 satisfies the given equation or not. Substituting x = 0, we get:
12(0)² - 22(0) - 5 = -5(0)
-5 = 0
This is not true, so x = 0 is an extraneous solution and should be discarded. Therefore, the solutions to the given equation are:
x = 5/4 and x = -1/3.
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Sami wants to find the measurements of the sides and angles of the parallelogram shown. Which tools can she use to find these measurements? Select all that apply.
A.
protractor
B.
scale
C.
ruler
D.
compass
In a case whereby Sami wants to find the measurements of the sides and angles of the parallelogram shown the tools she can use to find these measurements are;
A.protractorC.rulerWhat is the function of the selected tool in making a parallelogram?The protractor serves as one of the tools that can be used in making the parallelogram whih which be used in the mearement of the angles of the paralleolgram.
The ruler is also useful in the creation of the parallelogram because it can be used to meausre the lenght of the fiqure, hence the first as well as the third option is right
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Carlita has a swimming pool in her backyard that is rectangular with a length of 26 feet and a width of 16 feet. She wants to install a concrete walkway of width c around the pool. Surrounding the walkway, she wants to have a wood deck that extends w feet on all sides. Find an expression for the perimeter of the wood deck.
The expression for the perimeter of the wood deck, obtained from the formula for finding the perimeter of a rectangle is; 84 + 8·c + 8·w
What is the formula for finding the perimeter of a rectangle?The perimeter of a rectangle is found from the sum of twice the length and twice the width of the rectangle.
The dimensions of the rectangular swimming pool are;
Length = 26 feet
Width = 16 feet
The width of the concrete walkway = c
The width of the wooden deck = w
Therefore;
The length of the perimeter of the wooden deck = 26 + 2·c + 2·w
The width of the perimeter of the wooden deck = 16 + 2·c + 2·w
The expression for the perimeter of the of the around the wooden walkway = 2 × (26 + 2·c + 2·w) + 2 × (16 + 2·c + 2·w) = 84 + 8·c + 8·wLearn more on writing expressions here: https://brainly.com/question/1859113
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The drama club is selling gift baskets to raise money for new costumes. During the fall play, they sold a combined 15 regular gift baskets and 17 deluxe gift baskets, earning a total of $978. During the spring musical, they sold 27 regular gift baskets and 17 deluxe gift baskets, earning a total of $1,230. How much are they charging for the different-sized gift baskets?
The drama club is charging $__ for a regular gift basket and $__ for a deluxe gift basket.
Using the system of equations, we get that the drama club is charging $21 for a regular gift basket and $39 or a deluxe gift basket.
Given that,
The drama club is selling gift baskets to raise money for new costumes.
Let x be cost of the regular gift baskets and y be the cost of the deluxe gift baskets.
During the fall play, they sold a combined 15 regular gift baskets and 17 deluxe gift baskets, earning a total of $978.
15x + 17y = 978
During the spring musical, they sold 27 regular gift baskets and 17 deluxe gift baskets, earning a total of $1,230.
27x + 17y = 1230
From both equations,
978 - 15x = 1230 - 27x
12x = 252
x = 21
Cost of regular gift basket = $21
Cost of deluxe gift basket = y = (978 - 15 (21)) / 17 = $39
Hence the cost two kinds of baskets are $21 and $39.
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Express the confidence interval
40.8%
The confidence interval is in the range of 40.8% ± E.
The confidence interval for a proportion is typically expressed as:
ˆp ± z*SE
where ˆp is the sample proportion, z* is the critical value from the standard normal distribution for the desired level of confidence (e.g. 1.96 for 95% confidence), and SE is the standard error of the proportion.
Using this formula, if the sample proportion is 40.8% and we want a 95% confidence interval, we would have:
40.8% ± 1.96*√[(40.8%*(1-40.8%))/n]
where n is the sample size.
Without knowing the sample size, we cannot calculate the exact confidence interval. However, we can express the interval as:
(40.8% ± E)%
where E is the margin of error, which is equal to 1.96*√[(40.8%*(1-40.8%))/n]. This means that we are 95% confident that the true proportion falls within the range of 40.8% ± E.
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on the same coordinate plane mark all points (x,y) that satisfy each rule. y = x-3
The equation is y = x - 3
and the points (x, y) is (0,-3) , (-1, -4) and (1, -2)
Equation:An equation is math's way of saying that two things are equal to each other--that is, they have the same value, are worth the same amountA formula is a special equation that expresses an important relationship between variables and numbers.The equation is as follows:
y = x - 3
Substituting 'x = 0' in the given equation, we get
y = 0 - 3
y = -3
Substituting 'x = - 1' in the given equation, we get
y = - 1 - 3
y = -4
Substituting 'x = 1' in the given equation, we get
y = 1 - 3
y = -2
➢ Pair of points of the given equation are shown in the below table.
x y
0 -3
-1 -4
1 -2
➢ Now draw a graph using the points.
➢ See the attachment graph.
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A number cube is tossed 60 times.
Outcome Frequency
1 12
2 13
3 11
4 6
5 10
6 8
Determine the experimental probability of landing on a number greater than 4.
17 over 60
18 over 60
24 over 60
42 over 60
The experimental probability of landing on a number greater than 4 is 18/60
How to determine the experimental probability?The experimental probability will be given by the number of times that the outcome was greater than 4 (so a 5 or a 6) over the total number of trials.
We can see that the total number of trials is 60, and we have:
The outcome 5 a total of 10 times.
The outomce 6 a total of 8 times.
Adding these values we will get 10 + 8 = 18
Then the experimental probability of a number greater than 4 is:
E = 18/60
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Two concentric circles form a target. The radii of the two circles measure 8 cm and 4 cm. The inner circle is the bullseye of the target. A point on the target is randomly selected.
What is the probability that the randomly selected point is in the bullseye?
Enter your answer as a simplified fraction in the boxes.
The probability that the randomly selected point is in the bullseye is 0.75, or 75%.
The area of the bullseye is the difference between the areas of the larger and smaller circles:
[tex]A = \pi r_1^2 - \pi r_2^2[/tex]
where [tex]r_1[/tex] is the radius of the larger circle (8 cm) and [tex]r_2[/tex] is the radius of the smaller circle (4 cm).
[tex]A = \pi(8^2 - 4^2)A = \pi(64 - 16)A = 48\pi[/tex]
The area of the entire target (both circles) is:
[tex]A = \pi r_1^2[/tex]
A = 64π
Therefore, the probability of selecting a point in the bullseye is:
P(bullseye) = A(bullseye) / A(target)
P(bullseye) = (48π) / (64π)
P(bullseye) = 3/4 or 0.75
So the probability that the randomly selected point is in the bullseye is 0.75, or 75%.
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A student randomly draws a card from a standard deck of 52 cards. He records the type of card drawn and places it back in the deck. This is repeated 20 times. The table below shows the frequency of each outcome.
Outcome Frequency
Heart 7
Spade 3
Club 6
Diamond 4
Determine the experimental probability of drawing a diamond.
0.13
0.20
0.35
0.70
The experimental probability of drawing a diamond is 0.20
Determining the experimental probability of drawing a diamond.From the question, we have the following parameters that can be used in our computation:
Outcome Frequency
Heart 7
Spade 3
Club 6
Diamond 4
For diamond, we have
P(Diamond) = Diamond/Total
So, we have
P(Diamond) = 4/20
Evaluate
P(Diamond) = 0.20
Hence, the value is 0.20
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B. Match each picture of the figure with its formula.
Write the letter on the line.
2.
3.
5 In.
5 in.
8 In.
8 in.
8 In.
8 in.
5 In.
5 in.
5 In.
5 In.
a. A - lw
A= 5.8
b. V = lwh
V=8.5.5
c. P = a + b + c
P= 5 + 5+8
The marching of figure images with their formulas are:
Figure 1:
P = a + b + c
P = 5 + 5 + 8
Figure 2:
A = lw
A = 5 * 8
Figure 3:
V = lwh
V = 8 * 5 * 5
How to find the perimeter and area of the figures?The formula for the area of a triangle is:
Area = ¹/₂ * base * height
Formula for area of a rectangle is:
Area = length * width
Formula for volume of a cuboid is:
V = length * width * height
1) For the triangle, we are not give the height and so we can only find the perimeter which is:
P = a + b + c
P = 5 + 5 + 8
2) The area of this rectangle is:
A = lw
A = 5 * 8
3) Volume of this cuboid is:
V = lwh
V = 8 * 5 * 5
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Which of this is NOT a family of antiderivative of 2(3x + 2) ? a. 3 2(3x + 2)4 - +C 12 (3x + 2)4 - -C 6 b. 4(3x + 2)4 12 + K (3x + 2) 6 + K
4(3x + 2)4 12 + K (3x + 2) 6 + K is NOT a family of antiderivative of 2(3x + 2). The correct answer is Option b.
To find the antiderivative of 2(3x + 2), follow these steps:
1. Notice the function is 2(3x + 2).
2. Apply the power rule of integration, which states that ∫x^n dx = (x^(n+1))/(n+1) + C, where n ≠ -1.
3. In this case, n = 1, so the antiderivative is (2(3x + 2)^2)/(2) + C.
4. Simplify to obtain (3x + 2)^2 + C.
Option b doesn't match this result, so it is NOT a family of antiderivatives of 2(3x + 2).
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Un automóvil sale a 45 km/h de A al mismo tiempo que otro automóvil a 35 km/h sale de B y van en sentido opuesto al encuentro del otro. Si entre A y B hay 400km, ¿a qué distancia de A se encontrarán los automóviles y cuánto tiempo tardarán en encontrarse?
The cars will be 225 km from point A when they meet and it will take 5 hours for the cars to meet..
Let's denote the distance of the faster car from point A as "x" km. Therefore, the distance of the slower car from point B would be "400-x" km.
We can use the formula for distance, which is:
distance = rate × time
For the faster car, the distance it travels can be expressed as:
x = 45t
where t is the time it takes for the cars to meet.
For the slower car, the distance it travels can be expressed as:
400-x = 35t
Now, we can solve for t by setting these two expressions equal to each other:
45t = 400 - 35t
80t = 400
t = 5
We can then substitute t back into either expression to find the distance from point A:
x = 45t = 45(5) = 225 km
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Various temperature measurements are recorded at different times for a particular city. The mean of 20 degree C a for 60 temperatures on 60 different days. Assuming that sigma = 1. 5 degree C, test the claim that the population mean is 22 degree C. Use a 0. 05 significance level
As we see, p-value is less than the significance level, so null hypothesis rejected and there is no evidence to support the claim that population mean is 22 degree C.
The population mean can be calculated by the sum of all values in the given data/population divided by a total number of values. We have various temperature measurements are recorded at different times for a particular city.
Sample Mean, [tex]\bar X [/tex] = 20°C
Standard deviations,[tex]\sigma [/tex]= 1.5° C
Level of significance, = 0.05
We have to test that population mean is 22 degree C. Consider the hypothesis testing, the null and alternative hypothesis are [tex]H_0 : \mu = 22 [/tex].
[tex]H_a : \mu ≠ 22 [/tex].
Consider the test statistic, z test for mean formula, [tex]z = \frac{\bar x - \mu }{\frac{\sigma}{\sqrt{n}}}[/tex].
=> [tex]z = \frac{20 - 22}{\frac {1.5}{\sqrt{60}}}[/tex].
= - 10.32
Now, using distribution table, the p-value for z = - 10.32 is less than to 0.001. So,
p-value < 0.05, so null hypothesis is rejected.
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Write a variable equation for the sentence.
22. Sarah threw the javelin 9 inches farther than Kimberly.
Answer:
y = x + 9
Step-by-step explanation:
We Know
Sarah threw the javelin 9 inches farther than Kimberly.
Let's y represent the total distance Sarah threw and x is the distance Kimberly threw, we have the equation
y = x + 9
Water Temperature if the variance of the water temperature in a lake is 27% how many days should the researcher select to measure the temperature to estimate the true mean within 4 with 90% confidence?
The researcher needs a sample of at least_____ days.
The researcher needs a sample of at least 46 days.
We have,
To estimate the true mean water temperature within 4 with 90% confidence, given that the variance is 27%, we need to use the formula for sample size in a confidence interval estimation:
n = (Z² x σ²) / E²
where n is the required sample size, Z is the Z-score corresponding to the desired confidence level (90%), σ^2 is the variance (27%), and E is the margin of error (4).
We can find the Z-score for a 90% confidence level using a standard normal table, which is 1.645.
Now we can plug the values into the formula:
n = (1.645² x 0.27) / 4²
n = (2.706025 x 0.27) / 16
n = 0.729625 / 16
n = 0.0456015625
Since we cannot have a fraction of a day, we need to round up to the nearest whole number to ensure the desired accuracy.
Therefore, the researcher needs a sample of at least 46 days to estimate the true mean water temperature within 4 with 90% confidence.
Thus,
The researcher needs a sample of at least 46 days.
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A manufacturer of soap bubble liquid will test _ new S0 lution formula The solution will be approved, if the percent of produced parisons; in which the content does not allowthe bubbles to inflate. doesnot exceed 7%. random sample of 700 parisons contains 55 defective parisons: After testing_ ppropriate set of hypotheses to determine whether the solution can be approved by using & = 0.05,what is the P-value of this test? 0.206 0.415 0.833 <0.001
A manufacturer of soap bubble liquid tests a new formula with a sample of 700 parisons. With a significance level of 0.05, the test results in a p-value of 0.206, leading to the conclusion that the new formula can be approved since the proportion of defective parisons does not exceed 7%. So, the correct option is A).
Let p be the true proportion of defective parisons in the population.
The null hypothesis is that the proportion of defective parisons is equal to or less than 7%, i.e., H0: p <= 0.07
The alternative hypothesis is that the proportion of defective parisons is greater than 7%, i.e., Ha: p > 0.07
Calculate the sample proportion and standard error
We are given that the sample size n = 700 and the number of defective parisons x = 55.
The sample proportion is P = x/n = 55/700 = 0.0786
The standard error of the sample proportion is
SE = √[(P(1-P))/n] = sqrt[(0.0786*0.9214)/700] = 0.0166
Calculate the test statistic
The test statistic for a one-tailed z-test is
z = (P - p) / SE
Here, we want to test if the proportion of defective parisons is greater than 7%, so we use the alternative hypothesis to calculate the z-value
z = (0.0786 - 0.07) / 0.0166 = 0.516
The p-value is the probability of getting a test statistic as extreme or more extreme than the observed value, assuming the null hypothesis is true. Since this is a one-tailed test, we need to find the area under the standard normal distribution curve to the right of z = 0.516.
Using a standard normal table or calculator, we find that the area to the right of z = 0.516 is 0.206.
The p-value of the test is 0.206, which is greater than the significance level of 0.05. Therefore, we fail to reject the null hypothesis and conclude that there is not enough evidence to suggest that the proportion of defective parisons is greater than 7%.
In other words, the new soap bubble liquid formula can be approved since the proportion of produced parisons with contents that do not allow bubbles to inflate does not exceed 7%. So, the correct answer is A).
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The graph of the parent tangent function was transformed such that the result is function f. f(x) = tan(x + 1) Which graph represents function f?
THE ANSWER IS D!!!!!!!!!!
Using translation concepts, it is found that graph D represents the function f(x) = tan(x + 1).
A translation is represented by a change in the function graph, according to operations such as multiplication or sum/subtraction in it's definition.
The function f(x) = tan(x + 1) is a translation of one unit to the left of g(x) = tan(x), which has g(0) = 0, hence at the translated function g(-1) = 0, which means that graph D represents the function f(x).
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suppose we roll two dice. what is the probability that the sum is 7 given that neither die showed a 6?
The probability that the sum is 7 given that neither die showed a 6 is 4/25 or 0.16.
To find the probability that the sum is 7 given that neither die showed a 6, we need to consider the possible outcomes of rolling two dice without any 6s, and then identify the outcomes where the sum is 7.
Determine the total number of possible outcomes without rolling a 6.
Since there are 5 possible outcomes for each die (1, 2, 3, 4, and 5), there are 5 x 5 = 25 possible outcomes for rolling two dice without any 6s.
Identify the outcomes where the sum is 7.
The possible outcomes that result in a sum of 7 are: (1, 6), (2, 5), (3, 4), (4, 3), (5, 2), and (6, 1). However, since neither die can show a 6, we can only consider the following four outcomes: (1, 6), (2, 5), (3, 4), and (4, 3).
Calculate the probability.
The probability that the sum is 7 given that neither die showed a 6 is the number of favorable outcomes divided by the total number of possible outcomes:
P(sum is 7 | no 6s) = (number of outcomes with sum 7) / (total number of outcomes without 6s) = 4 / 25
So, the probability that the sum is 7 given that neither die showed a 6 is 4/25 or 0.16.
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Find the probability of exactly three
successes in eight trials of a binomial
experiment in which the probability of
success is 45%.
, or the probability of failure, as a decimal.
Enter q,
9
= [?]
Enter
Answer:
q = 0.55p(3 of 8) = 0.2568Step-by-step explanation:
You want q and the probability of 3 successes in 8 trials if the probability of success is 0.45.
QThe value designated q is the complement of p, the probability of success.
q = 1 -p
q = 1 -0.45
q = 0.55
P(3 of 8)The probability of 3 successes is ...
P(3 of 8) = 8C3·p^3·q^(8-3) = 56·0.45^3·0.55^5
P(3 of 8) ≈ 56°0.091125·0.050328 ≈ 0.256826
The probability of exactly 3 successes in 8 trials is about 0.2568.
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Each month, Nadeem keeps track of the number of times he visits the library and the number of books he checks out Is there a correlation
you model his data with a linear equation? Is there a causal relationship?
We may draw a scatterplot of the data and compute the correlation coefficient to see whether there is a relationship between Nadeem's visits to the library and the number of books he checks out. Linear Equation = Y =mx+c. Option A is Correct.
The degree and direction of the linear link between two variables are measured by the correlation coefficient. If the correlation is positive, it suggests that if one variable rises, the other variable rises as well.
If there is a correlation, linear regression may be used to describe the data with a linear equation.
Y= mx+c
Based on how frequently Nadeem visits the library, we may use this equation to anticipate how many books he will borrow. Correlation does not always indicate cause, though. Option A is Correct.
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Correct Question:
Each month, Nadeem keeps track of the number of times he visits the library and the number of books he checks out Is there a correlation. you model his data with a linear equation? Is there a causal relationship?
A. There is a positive correlation and no causal relationship.
B. There is a negative correlation and no casual relationship.
C. There is a casual relationship but no positive correlation.
D. There is neither a correlation nor a casual relationship.