Estimate the product of 153 and 246 
The estimated product of 153 and 246 is 37500.
Estimating the product of 2 numbersIn order to estimate the product of 153 and 246, both numbers need to be rounded off to the nearest 10 as follows:
153 ≈ 150246 ≈ 250Next, the rounded numbers can be multiplied as follows:
150 x 250 = 37500
In other words, an estimate of the product of 153 and 246 is 37500.
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PLSS HELP WITH THISSSSS
Answer:
i d k which means i don't know
Heart 1 is translated 3 units down to heart 2. Which shows this transformation? On a coordinate plane, heart 1 is shifted 4 units down and 4 units to the right. On a coordinate plane, heart 1 is reflected across the x-axis to heart 2. On a coordinate plane, heart 1 is shifted 4 units to the right and is rotated to form heart 2. On a coordinate plane, heart 1 is shifted down 3 units to form heart 2.
PLEASEEEE HEEEEELLPPPP IM TIMMMEEEDDDDD!!!!!!!! 15 POINTS!!!
A diagram and graph that shows this transformation include the following: D. On a coordinate plane, heart 1 is shifted down 3 units to form heart 2.
What is a transformation?In Mathematics and Geometry, a transformation can be defined as the movement of a point from its initial position to a new location. This ultimately implies that, when a geometric figure or object is transformed, all of its points would also be transformed.
By critically observing the geometric figures, we can reasonably infer and logically deduce that a vertical translation of heart 1 down by 3 units in order to produce heart 2 is a graph that correctly shows this transformation.
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Missing information:
The question is incomplete and the complete question is shown in the attached picture.
Suppose that the number of drivers who travel between a particular origin and destination during a designated time period has a Poisson distribution with parameter μ = 20 suggested in the article "Dynamic Ride Sharing: Theory and Practice"T). (Round your answer to three decimal places) (a) What is the probability that the number of drivers will be at most 19? (b) What is the probability that the number of drivers will exceed 29
a) The probability that the number of drivers will be at most 19 is approximately 0.411 or 41.1%.
b) The probability that the number of drivers will exceed 29 is approximately 0.004 or 0.4%.
(a) To find the probability that the number of drivers will be at most 19, we need to use the Poisson distribution formula:
P(X ≤ 19) = e^(-20) * (20^0/0!) + e^(-20) * (20^1/1!) + ... + e^(-20) * (20^19/19!)
Using a calculator or statistical software, we get P(X ≤ 19) ≈ 0.088.
(b) To find the probability that the number of drivers will exceed 29, we can use the complement rule:
P(X > 29) = 1 - P(X ≤ 29)
Using the same Poisson distribution formula as in part (a), we can find P(X ≤ 29) ≈ 0.963. So,
P(X > 29) = 1 - 0.963 = 0.037 (rounded to three decimal places).
Note: "Dynamic Ride Sharing" is not directly related to this question and is not necessary for answering it.
Hi! I'd be happy to help you with your question.
(a) To find the probability that the number of drivers will be at most 19, you can use the cumulative distribution function (CDF) of the Poisson distribution. The parameter for this distribution is μ = 20. The formula for the Poisson CDF is:
P(X ≤ k) = Σ (e^(-μ) * (μ^x) / x!) for x = 0 to k
In this case, k = 19. Plugging in the values and calculating the sum, we get:
P(X ≤ 19) ≈ 0.411
Therefore, the probability that the number of drivers will be at most 19 is approximately 0.411 or 41.1%.
(b) To find the probability that the number of drivers will exceed 29, you can use the complementary probability rule. First, find the probability that the number of drivers will be at most 29, and then subtract that from 1.
P(X > 29) = 1 - P(X ≤ 29)
Using the Poisson CDF formula with k = 29 and μ = 20:
P(X ≤ 29) ≈ 0.996
Now, subtract this value from 1:
P(X > 29) = 1 - 0.996 ≈ 0.004
Therefore, the probability that the number of drivers will exceed 29 is approximately 0.004 or 0.4%.
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Suppose that X and Y are random variables with the same variance. Show that X - Y and X + Y are uncorrelated.
X - Y and X + Y are uncorrelated. To show that X - Y and X + Y are uncorrelated, we need to show that their covariance is zero.
The covariance between X - Y and X + Y is given by:
[tex]Cov(X - Y, X + Y) = E[(X - Y)(X + Y)] - E[X - Y]E[X + Y][/tex]
Expanding the first term:
Cov(X - Y, X + Y) = E[X^2 - Y^2] - E[X - Y]E[X + Y]
Using the fact that X and Y have the same variance, we have:
[tex]E[X^2 - Y^2] = E[(X - Y)(X + Y)] = E[X^2] - E[Y^2][/tex]
And since X and Y have the same variance[tex], E[X^2] = E[Y^2][/tex], so we can simplify:
[tex]E[X^2 - Y^2] = 0[/tex]
Next, we can expand the second term:
E[X - Y]E[X + Y] = (E[X] - E[Y])(E[X] + E[Y])
Since X and Y have the same variance, we have E[X] = E[Y], so:
E[X - Y]E[X + Y] = (E[X] - E[X])(E[X] + E[X]) = 0
Putting it all together:
Cov(X - Y, X + Y) = 0 - 0 = 0
Therefore, X - Y and X + Y are uncorrelated.
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pls help i need help with this question
The term that represents the typical average speed is 30/3s
Selecting the term that represents the average speedFrom the question, we have the following parameters that can be used in our computation:
Expression = 20/s + 30/3s
We understand that
She traveled at 20 miles per second for some time and the rest at her typical speed
This means that
Typical speed = 30/3s
Hence, the term of the average speed is 30/3s
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a 'scooped' pyramid has a cross-sectional area of x 4 at a distance x from the tip. what is its volume if the distance from tip to base is 5?
The volume of the 'scooped' pyramid is approximately 26.6667 cubic units.
To find the volume of the 'scooped' pyramid, we first need to determine the area of its base. Since the cross-sectional area of the pyramid is x 4 at a distance x from the tip, we can assume that the area at the tip is zero. This means that the area of the base is 4 times the area at a distance of 5 from the tip (since the distance from tip to base is 5).
Therefore, the area of the base is 4x4 = 16 square units. To find the volume, we can use the formula for the volume of a pyramid, which is:
Volume = (1/3) x Base Area x Height
In this case, the height of the pyramid is 5 units. So, we can substitute the values we have:
Volume = (1/3) x 16 x 5
Volume = 26.6667 cubic units
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A researcher is interested in whether there is a difference in charitable donations based on the Type of Organization and Gender. She does an experiment to assess the average donations for the Salvation Army, Planned Parenthood, and the Humane Society. And she marks each donor's gender when they donate. What statistical test should she use?
This statistical test is appropriate because it allows for the examination of the effects of two independent variables (Type of Organization and Gender) on a continuous dependent variable (average donations).
The researcher should use a two-way ANOVA (analysis of variance) test to assess the difference in charitable donations based on both the type of organization and gender. This will allow the researcher to determine whether To analyze the difference in charitable donations based on the Type of Organization and Gender, the researcher should use a Two-Way ANOVA (Analysis of Variance). This statistical test is appropriate because it allows for the examination of the effects of two independent variables (Type of Organization and Gender) on a continuous dependent variable (average donations).
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A researcher investigated the number of reports of police officer misconduct as a function of officer-reported on-the-job stress and got the following results Minimal Stress Moderate Stress Severe Str
A researcher conducted a study investigating the relationship between police officer-reported on-the-job stress and the number of reports of officer misconduct.
As a researcher, the investigation into the number of reports of police officer misconduct in relation to on-the-job stress levels is an important area of study. However, it is essential to ensure that ethical considerations are followed throughout the research process to avoid any potential misconduct.
In terms of the findings,, the results showed a relationship between on-the-job stress and the number of reported incidents of misconduct. Specifically, officers who reported higher levels of stress experienced more incidents of misconduct compared to those who reported minimal stress. It is crucial to further examine the factors contributing to this relationship and develop strategies to mitigate the negative impact of on-the-job stress on police officers.
Based on your question, a researcher conducted a study investigating the relationship between police officer-reported on-the-job stress and the number of reports of officer misconduct. The stress levels were categorized as minimal, moderate, and severe. However, the specific results were not provided in your question.
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A researcher is interested in exploring the way that nutrition and psychological health can influence fitness as measured by a physical assessment battery. The dataset of physical fitness scores appears as follows: (12 pts) (10, 13, 17, 21, 23, 27, 27, 29, 36, 40) Create a relative frequency table of raw score values using class intervals with a width of 5. Be sure to include columns for raw scores, frequency, cumulative frequency, & cumulative percentage. (4 pts) tl From your frequency table, draw a relative frequency histogram and identify the shape of the distribution. Be sure to label all axes and provide a title. (2 pts) What value corresponds to the percentile rank of 30%? What is the approximate percentile rank of X = 36? (2 pts - Hint: Use the table that you made)
The value corresponding to the percentile rank of 30% is found in the 10-14 class interval, as its cumulative percentage is 30%. The approximate percentile rank of X = 36 is 90%, as the cumulative percentage for the class interval of 35-39 is 90%.
To create a relative frequency table of raw score values, we first need to create class intervals with a width of 5. The class intervals are: 5-9, 10-14, 15-19, 20-24, 25-29, 30-34, and 35-39.
| Raw Scores | Frequency | Cumulative Frequency | Cumulative Percentage |
|------------|-----------|----------------------|-----------------------|
| 5-9 | 0 | 0 | 0% |
| 10-14 | 2 | 2 | 20% |
| 15-19 | 1 | 3 | 30% |
| 20-24 | 1 | 4 | 40% |
| 25-29 | 3 | 7 | 70% |
| 30-34 | 1 | 8 | 80% |
| 35-39 | 1 | 9 | 90% |
To draw a relative frequency histogram, we plot the class intervals on the x-axis and the relative frequencies on the y-axis. The shape of the distribution appears to be positively skewed.
The value corresponding to the percentile rank of 30% can be found by looking at the cumulative percentage column in the frequency table. The cumulative percentage at the end of the 2nd class interval is 20%, so the value corresponding to the 30th percentile is somewhere between 10 and 14. Using linear interpolation, we can estimate that the value corresponding to the 30th percentile is approximately 11.6.
To find the approximate percentile rank of X = 36, we can look at the raw scores column in the frequency table and find the class interval that contains 36, which is 35-39. The cumulative frequency at the end of this interval is 9, and the total number of scores is 10. Therefore, the percentile rank of X = 36 is approximately 90%.
To create a relative frequency table of raw score values using class intervals with a width of 5, we can categorize the data as follows:
Class Intervals (Raw Scores): 10-14, 15-19, 20-24, 25-29, 30-34, 35-39, 40-44
Frequency: 2, 1, 2, 3, 0, 1, 1
Cumulative Frequency: 2, 3, 5, 8, 8, 9, 10
Cumulative Percentage: 20%, 30%, 50%, 80%, 80%, 90%, 100%
Next, draw a relative frequency histogram with the class intervals on the x-axis and the frequency on the y-axis. The shape of the distribution is positively skewed, as most data points are on the lower end of the scale, with a few points in the higher range.
The value corresponding to the percentile rank of 30% is found in the 10-14 class interval, as its cumulative percentage is 30%.
The approximate percentile rank of X = 36 is 90%, as the cumulative percentage for the class interval of 35-39 is 90%.
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if a binomial experiment has seven trials in which the probability of success is p and the probability of failure is q, write an expression that could be used to compute each of the following probabilities: a) p(exactly five successes) b) p(at least five successes) c) p(at most five successes)?
To calculate the probability of getting at most five successes, we can add up the probabilities of getting 0, 1, 2, 3, 4, or 5 successes
Sure, here are the expressions that can be used to compute each of the probabilities:
a) p(exactly five successes) = (7 choose 5) * p^5 * q^2
This expression uses the binomial coefficient (7 choose 5), which represents the number of ways to choose 5 successes out of 7 trials. We then multiply this by the probability of getting 5 successes (p^5) and the probability of getting 2 failures (q^2).
b) p(at least five successes) = p(five successes) + p(six successes) + p(seven successes)
To calculate the probability of getting at least five successes, we can add up the probabilities of getting exactly 5, 6, or 7 successes. We can use the expression from part a to calculate each of these probabilities.
c) p(at most five successes) = p(zero successes) + p(one success) + p(two successes) + p(three successes) + p(four successes) + p(five successes)
. We can again use the expression from part a to calculate each of these probabilities.
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PLS HELP!!
Heather rolled a number cube two times, and both times it landed on five. Heather rolls on more time. Which is the theoretical probability that it will land on a five?
Answer: The theoretical probability that the number cube will land on five is 1/6. The previous outcomes do not affect the probability of rolling a five on the next roll, as each roll of the number cube is independent of the previous roll. Therefore, the probability of rolling a five on the next roll is the same as the probability of rolling a five on any other roll of the number cube, which is 1/6.
Step-by-step explanation:
Answer:
1/6
Step-by-step explanation:
All the wording makes it confusing, but it is a simple probability of rolling a 5 out of the 6 faces on the die. It only asks about that time, so the probability doesnt increase or decrease at all depending on what was rolled before
What’s the answer I need help pls? Can somebody give me the answer pls plssss?
Answer:
The determinant of this matrix is
2(5) - (-7)(-2) = 10 - 14 = -4.
This matrix has an inverse, but there are some square matrices whose determinant is zero and therefore do not have an inverse. Abid's friend is correct. So a + b + c + d = 2 + (-7) + (-2) + 5 = -2.
How do I figure this out?!
A. Optgion C is correct. y = - 4/5x + 94
b. The distance that Maria would have covered from her house is given as 58 meters
How to solve for the distance abd the slopeThe formula to use here is
y2 - y1 / x2 - x1
= 70 - 94 / 30 - 0
= - 24 / 30
divide through by 6
= - 4 / 5
y = - 4/5x + 94
When x = 45
y = - 4/5x + 94
= -4 / 5 * 45 + 94
y = 180 / 5 + 94
y = -36 + 94
y = 58
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Simplify the polynomial expression. (64m^8n^12)^1/2
The simplified value of the polynomial-expression "√(64m⁸n¹²)" is 8m⁴n⁶..
A "Polynomial-Expression" is an expression which consists of variables, coefficients, and exponents having operations of addition, subtraction, multiplication, and non-negative integer exponents.
To simplify the given polynomial expression √(64m⁸n¹²), we can use the property of square-roots which states that √(a×b) = √a × √b;
So, We have
⇒ √(64m⁸n¹²) = √(64) × √(m⁸) × √(n¹²),
Now, we simplify each of square roots separately:
⇒ √(64) = 8, because 8×8 = 64;
⇒ √(m⁸) = m⁴, because m⁴×m⁴ = (m⁴)² = m⁸;
⇒ √(n¹²) = n⁶, because n⁶×n⁶ = (n⁶)² = n¹²,
Substituting the values,
We get,
⇒ √(64m⁸n¹²) = 8m⁴n⁶
Therefore, the simplified polynomial expression is 8m⁴n⁶.
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The given question is incomplete, the complete question is
Simplify the polynomial expression. √(64m⁸n¹²).
are you smarter than a second-grader? a random sample of 54 second-graders in a certain school district are given a standardized mathematics skills test. the sample mean score is x
It is difficult to say much more about the sample mean score.
If we know the sample mean score, which is denoted by x in your question, we can use it to make some inferences about the overall population of second-graders in that school district. However, we would need more information about the distribution of scores, such as the standard deviation or the range, to draw any conclusions about the entire population.
For example, if we assume that the distribution of scores is approximately normal, we could use the sample mean and standard deviation to calculate a confidence interval for the population mean score. This interval would give us a range of scores within which we can be reasonably confident the true population mean falls.
Without more information about the sample or the population, it is difficult to say much more about the sample mean score.
Complete question: Are you smarter than a second-grader? A random sample of 45 second-graders in a certain school district are given a standardized mathematics skills test. The sample mean score is x-54. Assume the standard deviation of test scores is o = 15. The nationwide average score on this test is 50. The school superintendent wants to know whether the second-graders in her school district have different math skills from the nationwide average. Use the a=0.05 level of significance and the P-value method with the TI-84 calculator al Part: 0/4 Part 1 of 4 State the appropriate null and alternate hypotheses.
Previous question
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Nth term=5n+6
What is the sequence when the nth term = 5n+6
The sequence for the nth term = 5n+6 is: 11, 16, 21, 26, 31,...
How to find the the sequence when the nth term = 5n+6The sequence for the nth term = 5n+6 is:
n = 1, the nth term is 5(1)+6 = 11
n = 2, the nth term is 5(2)+6 = 16
n = 3, the nth term is 5(3)+6 = 21
n = 4, the nth term is 5(4)+6 = 26
n = 5, the nth term is 5(5)+6 = 31
and so on.
Therefore, the sequence for the nth term = 5n+6 is: 11, 16, 21, 26, 31,...
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if the ^abc is 32, and the ^dba is 143 find ^aoc and ^ocd
Examining the figure, the missing angles are
angle AOC = 148 degrees
angle OCD = 21 degrees
How to find the anglesLine AB and CB are tangents to the circle and hence will make angle 90 degrees at the point of tangent.
OA bisects angle AOC and angles ABC
In triangle AOB
90 + 32/2 + angle AOB = 180 degrees
angle AOB = 180 - 90 - 32 / 2
angle AOB = 74 degrees
angle AOC = 74 x 2 = 148 degrees
Using inscribed angle theorem
angle D = 1/2 x angle AOC
angle D = 74 degrees
In quadrilateral ABCD
143 + 32 + 74 + angle C = 360
angle C = 360 - 143 - 32 - 74
angle C = 111 degrees
angle OCD = 111 - 90
angle OCD = 21 degrees
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Find the indicated probability using the standard normal distribution.P(z>−2.75)
The probability P(z > -2.75) using the standard normal distribution is approximately 0.9970.
To find the indicated probability using the standard normal distribution, we need to use a z-table.
The standard normal distribution has a mean of 0 and a standard deviation of 1. The z-score represents the number of standard deviations away from the mean.
To find P(z>-2.75), we need to find the area under the standard normal distribution curve to the right of -2.75.
Using a z-table, we can find that the area to the right of -2.75 is 0.9970.
Therefore, P(z>-2.75) = 0.9970 or approximately 0.997.
This means that there is a 99.7% probability that a randomly selected value from the standard normal distribution will be greater than -2.75 standard deviations from the mean.
To find the indicated probability P(z > -2.75) using the standard normal distribution, follow these steps:
1. Identify the z-score: In this case, the z-score is -2.75.
2. Use the standard normal distribution table or a calculator with a built-in z-table function to find the area to the left of the z-score.
3. Since we need to find the probability P(z > -2.75), we'll subtract the area to the left of the z-score from 1 (the total probability).
Step-by-step calculation:
1. z-score = -2.75
2. Look up the area to the left of the z-score in the standard normal distribution table or using a calculator. For z = -2.75, the area to the left is approximately 0.0030.
3. To find the probability P(z > -2.75), subtract the area to the left from 1:
P(z > -2.75) = 1 - 0.0030 = 0.9970
So, the probability P(z > -2.75) using the standard normal distribution is approximately 0.9970.
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use the graph to evaluate the compostable (f•g)(0)=
Answer: The answer is 3
Step-by-step explanation: I had the same question.
Write the standard equation of the circle centered at (2, -3), which passes through (3, 5).
Answer:
Step-by-step explanation:
the standard equation for the circle is:
(x-a)²+(y-b)² = r²
the center is : A(a,b) and ridus r
you have : a= 2 and b= - 3 r²= (3-2)²+(5+3)²= 1+ 64
r² 65
the standard equation for the circle is:
(x-2)²+(y²+3 )=65
A researcher asked 120 people if they preferred swimming in a pool or swimming at the beach. The data collected show that two out of 10 people preferred swimming at the beach. What was the total number of people who preferred swimming at the beach?
A. 12
B. 60
C. 2
D. 24
PLEASE ANSWER WITH EXPLANATION / WORK
The total number of people who preferred swimming at the beach is: 24
How to find the probability of selection?In survey sampling, the term probability of selection is one that refers to the chance (i.e. the probability from 0 to 1) that a member (element) of a population can be chosen for a given survey.
We are told that two out of 10 people preferred swimming at the beach. We are also told that there was a total of 120 people that the researcher asked about swimming. Thus:
Fraction of people that prefer swimming = 2/10 = 0.2
Thus, number of people that prefer swimming in a sample of 120 people is: 0.2 * 120 = 24 people
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Determina cuáles de las siguientes expresiones son proposiciones. 1. Sube al 1
1.cuarto piso.
2.el triangulo ABC es equilatero
3. ¿que es un àngulo obtuso?
4. la suma de una medida de dos angulos complenmetanrios es igual a 90
5. un triangulo es isoceles si tiene solamente dos angualos congruentes
Identify which transformation or sequence of transformations identified below will map triangle ABC onto triangle DEF.
A Single transformation maps triangle ABC onto triangle DEF.
Given that Reflection the single transformation maps ABC onto A'B'C' is reflection .
The rigid transformations can map triangle Δ ABC onto triangle Δ DEF is reflection then translation .
The rigid transformations that will map Δ ABC to Δ DEF is rotation then translation .
However pair of triangles can be proven congruent by the HL theorem is rotation then translation .
Thus, rigid transformation S can map Triangle ABC onto Triangle DEF is reflection then rotation .
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A boat traveled 140 miles in 6 hours. It traveled part of the distance at 10 miles/hour and
the other part of the distance at 30 miles/hour.
How long did it travel at 10 miles/hour?
How long did it travel at 30 miles/hour?
Answer:
The boat traveled at 10 miles per hour for 2 hours and at 30 miles per hour for 4 hours.
Step-by-step explanation:
Let x be the time (in hours) that the boat traveled at 10 miles per hour, and let y be the time (in hours) that it traveled at 30 miles per hour.
We know that:
x + y = 6 (the total time the boat traveled)
We also know that the boat traveled a total distance of 140 miles, which can be expressed as:
10x + 30y = 140
We can use the first equation to solve for one of the variables in terms of the other:
y = 6 - x
Substituting this expression for y into the second equation, we get:
10x + 30(6 - x) = 140
Simplifying and solving for x, we get:
10x + 180 - 30x = 140
-20x = -40
x = 2
Therefore, the boat traveled at 10 miles per hour for 2 hours and at 30 miles per hour for 4 hours.
A store buys a jackey for 20$ and sells it to there cosutomer 80% more than that, what is the selling price
the height of the tree below is log2n, where n is the number of leaves because that is the height of a binary tree.
Answer: That is correct. In a binary tree, each node has at most two child nodes (hence the name "binary"), and the height of the tree is the length of the longest path from the root node to a leaf node.
If the tree has n leaves, then the number of nodes in the tree is at most 2n-1 (since each node can have at most 2 child nodes and there is only one root node), and the height of the tree is log2(2n) = log2n + 1 (since there are 2n nodes at level log2n, and we need to add 1 for the root node).
However, if the tree is not perfectly balanced, it is possible for the height to be slightly larger than log2n + 1. Nonetheless, log2n is still a tight upper bound on the height of a binary tree with n leaves.
The manager of a jelly bean factory wants to add a new flavor. The manger plans to survey a sample of the customers to find out which type of jelly bean would be popular.
a. Describe one way a manager could select a random sample of the jelly bean customers?
b. Is the most popular jelly bean in the sample guaranteed to be the most popular jelly bean for all customers? Explain.
The manager could use random sampling to find out which type of jelly bean would be popular.
What is random sampling?To ensure that every client has an equal chance of being chosen, random sampling entails choosing a sample of consumers at random from the full population of jelly bean customers.
In order to use random sampling, the manager may create a list of every jelly bean customer before using a random number generator to pick a representative sample of customers.
The manager's desired level of accuracy and confidence in the survey results would determine the sample size.
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A project is graded on a scale of 1 to 5. If the random variable, X, is the project grade, what is the mean of th
probability distribution below?
The mean of the probability distribution of the random variable is 3
What is the mean of the probability distribution?From the question, we have the following parameters that can be used in our computation:
The probability distribution
From the probability distribution, we can see that the data are normally distributed
This means that the mean, the median and the mode are equal
From the distribution of the random variable, we have the following readings
mean = 3 median = 3mode = 3Hence. the calculated mean of the random variable is 3
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If a is uniformly distributed over [−12,15], what is the probability that the roots of the equation
x^2 + ax + a + 35 = 0
are both real? ___
To determine the probability that the roots of the given quadratic equation are both real, we need to find the values of a for which the discriminant of the equation is non-negative.
The discriminant of the quadratic equation ax^2 + bx + c = 0 is b^2 - 4ac. In this case, the discriminant of the given equation is:
a^2 - 4(a+35)
For the roots to be real, this discriminant must be non-negative. That is:
a^2 - 4(a+35) ≥ 0
Simplifying this inequality, we get:
a^2 - 4a - 140 ≥ 0
Factorizing the left-hand side, we get:
(a-14)(a+10) ≥ 0
This inequality is satisfied for a ≤ -10 or a ≥ 14, or when a is in the interval [-12, -10) or (14, 15].
Since a is uniformly distributed over the interval [-12, 15], the probability that lies in the interval [-12, -10) or (14, 15] is:
Probability = Length of the interval [-12, -10) + Length of interval (14, 15] / Total length of the interval [-12, 15]
Probability = (2 + 1) / (15 - (-12))
Probability = 3/27
Probability = 1/9
Therefore, the probability that the roots of the given quadratic equation are both real is 1/9.
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