Monopolists are firms that have control over the supply of a particular product or service in a market. Due to this control, they can charge higher prices than competitive firms, which can result in lower quantities sold.
One reason why a monopolist's marginal revenue is less than the sales price is due to the downward-sloping demand curve. As the monopolist increases its sales price, the quantity demanded decreases. This means that the revenue generated from each additional unit sold is lower than the revenue generated from the previous unit sold. In other words, the marginal revenue earned from each unit sold is less than the sales price. This occurs because the monopolist must lower the price of all units sold to sell additional units, which lowers the average revenue earned per unit.
To illustrate this, imagine a monopolist that sells widgets for $10 each. If the monopolist lowers the price to $9, it may sell 10 widgets, resulting in revenue of $90 ($9 x 10). However, if the monopolist maintains the $10 price and only sells 9 widgets, the revenue is $90 ($10 x 9). In this case, the marginal revenue for the 9th unit sold is $0, which is less than the sales price of $10. This is because the monopolist must lower the price of all units sold to sell the additional unit, resulting in a decrease in average revenue per unit. Overall, the monopolist's marginal revenue is less than the sales price due to the downward-sloping demand curve and the need to lower prices to sell additional units.
A monopolist, unlike firms in a competitive market, has significant market power due to the absence of competition. This allows the monopolist to control the market price of their product by adjusting the quantity supplied. When a monopolist wants to sell an additional unit, they must lower the sales price for all units, including the ones already being sold. This is because the demand curve faced by a monopolist is downward-sloping, meaning that in order to sell more units, the monopolist has to decrease the price.
Marginal revenue refers to the additional revenue gained from selling one more unit of the product. As the monopolist lowers the sales price to sell more units, two things happen: the revenue increases from the additional unit sold, but there is also a loss in revenue from the units that were sold at a higher price before the price reduction.
As a result, the marginal revenue is less than the sales price, since it takes into account not only the revenue from the additional unit sold but also the loss of revenue from lowering the price of all units. This relationship between the monopolist's pricing strategy and marginal revenue is a key factor in determining the monopolist's profit-maximizing level of output and price.
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Using the partial fractions technique, the function f(x) = 68x+168/ x^2+2x-24 can be written as a sum of partial fractions
We can express f(x) as a sum of partial fractions as: f(x) = (-10 / (x + 6)) + (78 / (x - 4))
To write the function f(x) = [tex](68x + 168) / (x^2 + 2x - 24)[/tex] as a sum of partial fractions, we first need to factor the denominator:
[tex]x^2 + 2x - 24 = (x + 6)(x - 4)[/tex]
So we can write:
f(x) = (68x + 168) / ((x + 6)(x - 4))
Now we can use the method of partial fractions to express f(x) as a sum of simpler fractions:
f(x) = A / (x + 6) + B / (x - 4)
where A and B are constants that we need to find. To do this, we can multiply both sides of the equation by the common denominator (x + 6)(x - 4):
(68x + 168) = A(x - 4) + B(x + 6)
Expanding and collecting like terms, we get:
68x + 168 = (A + B) x + (6B - 4A)
Since this equation holds for all values of x, we can equate the coefficients of x and the constant terms separately:
68 = A + B
168 = 6B - 4A
Solving these two equations simultaneously, we get:
A = -10
B = 78
Therefore, we can express f(x) as a sum of partial fractions as:
f(x) = (-10 / (x + 6)) + (78 / (x - 4))
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Addisonisasalesperson.Shesoldacoatfor$75andearned10%commission.HowmuchcommissiondidAddisonearn?
Water is steadily dripping from a faucet into a bowl. You want to write an equation that represents the number of milliliters y of water in the bowl after x seconds. What is the constant of proportionality for the relationship between the number of milliliters y of water in the bowl and the time in seconds x? What is the equation?
Water from Dripping Faucet
Time in
Seconds (x)
Milliliters
in Bowl (y)
20
320
35
560
45
720
60
960
The constant of proportionality is nothing
The equation that represents the number of milliliters y of water in the bowl after x seconds is: y = 16x
The constant of proportionality for this relationship is the slope of the linear function that passes through any two points on the line. We can use the points (20, 320) and (60, 960) from the table to find the slope:
slope = (960 - 320) / (60 - 20) = 640 / 40 = 16
Therefore, the equation that represents the number of milliliters y of water in the bowl after x seconds is: y = 16x
What is the Constant of Proportionality?The constant of proportionality is the ratio that relates two given values in what is known as a proportional relationship. Other names for the constant of proportionality include the constant ratio, constant rate, unit rate, constant variation, or even the rate of change.
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How many moles of aluminum will be used when reacted with 1.35 moles of oxygen based on this chemical reaction? __Al + ___ O2 → 2Al2O3
I NEED IT ASAP
In this process, 1.35 moles of oxygen are combined with roughly 1.80 moles of aluminum.
The balanced chemical equation for the reaction between aluminum and oxygen is:
4 Al + 3 O₂ → 2 Al₂O₃
As a result, in order to create 2 moles of aluminum oxide (Al₂O₃), 3 moles of oxygen gas (O₂) must react with 4 moles of aluminum (Al).
We are given 1.35 moles of oxygen gas, thus we can calculate a percentage to estimate how many moles of aluminum are required using this information:
4 moles Al / 3 moles O₂ = x moles Al / 1.35 moles O
Solving for x, we get:
x = 4 moles Al * 1.35 moles O₂ / 3 moles O₂
x ≈ 1.80 moles Al
Therefore, approximately 1.80 moles of aluminum will be used when reacted with 1.35 moles of oxygen in this reaction.
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A cubical container is 4/5 filled with water. It contains 2.7l of water. Find the base area of the container
Answer:
225 cm²
Step-by-step explanation:
The container has 2.7L of water in it but it is only 4/5 full
Therefore if the container were to be filled entirely with water it would contain
2.7 x 5/4 = 3.375 Liters
This, therefore is the volume of the container is 3.375 L
3.375 L = 3.375 x 1000 cm³
= 3, 375 cm³
The volume of a cube of side a is given by
V = a³
The base area of a cube of side a is given by
A = a²
We have calculated the volume of the cube as 3.375 cm³
Therefore each side of the cubical container
[tex]a = \sqrt[3]{3375} = 15[/tex] cm
The base area is
a² = 15²
= 225 cm²
What is 1/4 of 1 & 1/4
a. 1/4
b. 1/5
c. 5/16
d. 1/2
1/5
you take 1/4÷ 1 1/4 and you get 1/5
Aaden wants to get a subscription to a library. There are two subscription options one of which charges a fixed 96 dollar annual fee and the other which charges 3 dollars per book he borrows.
what does point Q represent in this context?
a. A number of books and their cost where the subscription with the annual fee costs less
b. A number of books and their cost where the subscription the charges per book costs less
c. A number of books and their cost where both subscriptions cost the same
d. A number of books and their cost that is not possible with either subscription
Point R in this context represents the number of books borrowed and their cost where both subscription options cost the same.
The correct option is A.
Let's analyze the two subscription options:
Subscription with a fixed annual fee: This option charges a fixed $96 annual fee, regardless of the number of books borrowed.
The cost function for this subscription is a horizontal line at y = $96.
Subscription that charges per book borrowed: This option charges $3 per book borrowed. The cost function for this subscription is a linear function with a slope of $3.
When we plot the cost functions on a graph with the number of books borrowed on the x-axis and the cost on the y-axis, we will see that the two lines intersect at a point. This point of intersection is point R.
At point R, the cost of both subscriptions is the same. Therefore, the correct answer is c.
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The complete question:
Aaden wants to get a subscription to a library. There are two subscription options one of which charges a fixed 96-dollar annual fee and the other which charges 3 dollars per book he borrows.
What does point R represent in this context?
a. A number of books and their cost where the subscription with the annual fee costs less
b. A number of books and their cost where the subscription the charges per book costs less
c. A number of books and their cost where both subscriptions cost the same
d. A number of books and their cost that is not possible with either subscription
The complete question is given in the attached image.
5) A warehouse outside of a factory currently has an inventory of 1245 boxes. After an 8-
hour work day, the warehouse has 2000 boxes. Assume the warehouse was being filled at a
constant (linear) rate.
a) How many boxes per hour is the factory able to provide to the warehouse?
b) What would be the inventory at the end of a 40-hour work week?
c) How long will it take to fill the warehouse to its 50,000 box capacity?
6) In the year 2007, a FOREVER stamp cost cost $0.41. In 2023, the cost of a FOREVER
stamp was $0.63. Assume that the cost of stamps increased at a constant (linear) rate.
a) If price increases continue at the current rate, how much will a FOREVER stamp
cost in 2035?
b) In what year would you expect a FOREVER stamp to cost one dollar?
7) In January of 2021, there were 980,000 games available on the Apple App Store. By July
of 2021, there were 984,200 games available. If we assume that the number of available
games is steadily increasing at a constant (linear) rate,
a) How many games does this pattern predict will be available in January 2022?
b) At this rate, when will there be 1,000,000 games available for purchase in the Apple
App Store?
Thee factory is able to provide 94.38 boxes per hour to the warehouse.
How to calculate the valueRate = (2000 - 1245) / 8 = 94.38 boxes per hour
Therefore, the factory is able to provide 94.38 boxes per hour to the warehouse.
Boxes added in 40 hours = rate * time = 94.38 * 40 = 3,775.2
Therefore, the inventory at the end of a 40-hour work week would be:
1245 + 3775.2 = 5020.2 boxes
rate = (50000 - 1245) / time
Simplifying this equation, we get:
time = (50000 - 1245) / rate = 511.64 hours (rounded to two decimal places).
Therefore, it will take approximately 511.64 hours to fill the warehouse to its 50,000 box capacity,
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Help me pls. paying a lot of points
Answer:
33.3333%
Step-by-step explanation:
Answer:3/6 or 1/2
Step-by-step explanation:
Pls helps me out with this! ASAP
The tables are completed as follows:
Table 1: f(x) = 30.Table 2: f(x) = 1.301.How to complete the table?For Table 1, we have an exponential function defined as follows:
f(x) = b^x.
We have that when x = 0.699, f(x) = 5, hence the base b is obtained as follows:
b^0.699 = 5
b = 5^(1/0.699)
b = 10.
Hence, when x = 1.477, the value of f(x) is given as follows:
f(x) = 10^1.477
f(x) = 30.
Table 2 is the inverse of table 1. For Table I, we have that when x = 1.301, f(x) = 20, hence for table 2, we have that f(x) = 1.301 when x = 20.
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what is 104 subtracted by 18
Answer:
104-18=86 and also 18-104=-86
Step-by-step explanation:
Write an equation for the relationship
Shown in the table. Then find the
Unknown value (?) in the table.
X- 4, 10, 12, 18, 23
Y- -1, 0.5, 1, ?, 3.75
The equation for the relationship would be y = 0.25x - 2 and the unknown value would be 2. 5.
How to find the equation ?To find the equation, you first need to find the slope of the line by picking two points and applying the slope formula. The two points are (4, -1) and (12, 1).
The slope is:
= (y2 - y1) / (x2 - x1)
= ( 1 - ( - 1 ) ) / ( 12 - 4)
= 2 / 8
= 0. 25
We can then find the full equation :
y - ( - 1 ) = 0.25 (x - 4)
y = 0.25x - 2
The unknown y value when x is 18 is:
y = 0.25 ( 18 ) - 2
y = 2. 5
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"price by mathematical induction
Prove that n! > 2^n for all n ∈ Z≥4"
By the principle of mathematical induction, we can conclude that n! > 2ⁿ for all n ∈ Z≥4.
What is mathematical induction?The art of demonstrating a claim, theorem, or formula that is regarded as true for each and every natural number n is known as proof.
We can prove by mathematical induction that n! > 2ⁿ for all n ∈ Z≥4.
First, we will prove the base case n = 4:
4! = 4 x 3 x 2 x 1 = 24
2⁴ = 16
Since 24 > 16, the base case is true.
Next, we assume that the inequality is true for some arbitrary k ≥ 4:
k! > [tex]2^k[/tex]
To complete the induction step, we must prove that the inequality is also true for k + 1:
(k+1)! = (k+1) x k!
(k+1)! > (k+1) x [tex]2^k[/tex] (by the induction hypothesis)
(k+1)! > 2 x [tex]2^k[/tex]
(k+1)! > [tex]2^{(k+1)[/tex]
Since the inequality is true for k+1, this completes the induction step.
Therefore, by the principle of mathematical induction, we can conclude that n! > 2ⁿ for all n ∈ Z≥4.
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select the true statement(s) about hypothesis tests. a statistical hypothesis is always stated in terms of a population parameter. in a test of a statistical hypothesis, there may be more than one alternative hypothesis. in a test of a statistical hypothesis, we attempt to find evidence in favor of the null hypothesis. if the value of the test statistic lies in the nonrejection region, then the null hypothesis is true.
It does not mean that the null hypothesis is true.
The true statement about hypothesis tests is:
- A statistical hypothesis is always stated in terms of a population parameter.
The other statements are false:
- In a test of a statistical hypothesis, there may be more than one alternative hypothesis. This is not true. There should only be one alternative hypothesis.
- In a test of a statistical hypothesis, we attempt to find evidence in favor of the null hypothesis. This is not true. In a hypothesis test, we attempt to find evidence against the null hypothesis.
- If the value of the test statistic lies in the nonrejection region, then the null hypothesis is true. This is not true. If the value of the test statistic lies in the nonrejection region, we do not have enough evidence to reject the null hypothesis. It does not mean that the null hypothesis is true.
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+ BrushPro is an one-man paint business owned by Banele. If x offices are painted per month, BrushPro's monthly profit, P, is given by the function P(x) = -x} + 27x2 + 132x + 2970, where 0 < x < 34. U
The maximum profit occurs when 34 offices are painted per month, and the maximum profit is R13500.
Based on the given information, Brush Pro is an one-man paint business owned by Banele and their monthly profit, P, depends on the number of offices painted per month, x. The profit function is given as P(x) = -x + 27x^2 + 132x + 2970, where 0 < x < 34.
To find the maximum profit, we need to find the vertex of the parabolic function. The vertex is located at x = -b/2a, where a = 27, b = 132.
x = -132/(2*27) = -2.44
Since x must be between 0 and 34, the maximum profit will occur at x = 0 or x = 34. We need to evaluate P(0) and P(34) to determine which one is the maximum.
P(0) = -0 + 27(0)^2 + 132(0) + 2970 = 2970
P(34) = -34 + 27(34)^2 + 132(34) + 2970 = 13500
Therefore, the maximum profit occurs when 34 offices are painted per month, and the maximum profit is R13500.
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Based on the Normal model N( 100, 15) describing IQ scores, what percent of people's IQs would you expect to be a) over 80? b) under 90? c) between 112 and 132?
The percentage of people's IQ over 80 is 9.18%, the percentage of people's IQ under 90 is 25.14% and the percentage of people's IQ between 112 and 132 is 8.23%
Then,
a) Over 80:
The z-score for 80 is (80-100)/15 = -1.33
Using a standard normal distribution table , we can evaluate that the area under the normal curve to the right of -1.33 is approximately 0.9082.
Therefore, the percentage of people's IQs that will be over 80 is approximately
(1-0.9082) x 100%
= 9.18%.
b) Under 90:
The z-score for 90 is (90-100)/15 = -0.67
Using a standard normal distribution table, we can evaluate that the area under the normal curve to the left of -0.67 is approximately 0.2514.
Therefore, the percentage of people's IQs that will be under 90 is approximately
0.2514 x 100%
= 25.14%.
c) Between 112 and 132:
The z-score for 112 is (112-100)/15 = 0.8
The z-score for 132 is (132-100)/15 = 2.13
Using a standard normal distribution table, we can calculate that the area under the normal curve between these two z-scores is approximately 0.0823.
Therefore, the percentage of people's IQs that will be between 112 and 132 is approximately
0.0823 x 100%
= 8.23%.
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Which of the following would have resulted in a violation of the conditions for inference? (a) If the entire sample was selected from one classroom (b) If the sample size was 15 instead of 25 (c) If the scatterplot of x = foot length and y = height did not show a perfect linear relationship (d) If the histogram of heights had an outlier (e) If the standard deviation of foot length was different from the standard deviation of height
A perfect linear relationship is essential for making accurate inferences in regression analysis. If the relationship between the variables is not linear, the results from the analysis may not be valid or reliable.
Option (a) would have resulted in a violation of the conditions for inference, as it would not be a representative sample of the population. Inference relies on the sample being representative of the population, and selecting the entire sample from one classroom would not be a random selection from the population.
Options (b), (c), (d), and (e) do not necessarily violate the conditions for inference. The sample size of 15 may affect the precision of the estimate, but it does not necessarily violate the conditions for inference.
A perfect linear relationship is essential for making accurate inferences in regression analysis. The scatterplot not showing a perfect linear relationship is expected in most cases, as perfect linear relationships are rare in real-world data. The histogram having an outlier may affect the distribution, but it does not necessarily violate the conditions for inference. And the standard deviation of foot length is different from the standard deviation of height is expected, as they are measuring different variables.
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What is the product of
8.2
×
1
0
2
8.2×10
2
and
3.4
×
1
0
5
3.4×10
5
expressed in scientific notation?
The product of the numbers is 2.788 x 10^8.
What is a scientific notation?Scientific notation is a method of expressing very large numbers so that they can be easily understood. The process involves expressing the number in terms of the power of ten. For example; 1230000000000 = 1.23 x 10^12.
In the given question, the product of 8.2 x 10^2 and 3.4 x 10^5 is required.
Thus;
8.2 x 10^2 * 3.4 x 10^5 = 8.2 * 3.4 x 10^5 * x 10^2
= 8.2 * 3.4 x 10^(2+5)
= 27.88 x 10^7
= 2.788 x 10^8
Therefore, the product of the numbers expressed in scientific notation is 2.788 x 10^8.
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In these activities, we use the following applet to select a random sample of 8 students from the small college in the previous example. At the college, 60% of the students are eligible for financial aid. For each sample, the applet calculates the proportion in the sample who are eligible for financial aid. Repeat the sampling process many times to observe how the sample proportions vary, then answer the questions.
Use the applet to select a random sample of 8 students. Repeat to generate many samples. The applet gives the sample proportion for each sample. Examine the variability in the sample proportions you generated with the applet. Which of the following sequences of sample proportions is most likely to occur for 5 random samples of 8 students from this population?
Group of answer choices
a) 0.250, 0.125, 0.500, 0.500, 0.875
b) 0.600, 0.600, 0.600, 0.600, 0.600
c) 0.375, 0.625, 0.500, 0.500, 0.875
Option c) has moderate variability and is closer to the true proportion and thus is the most likely sequence of sample proportions to occur for 5 random samples of 8 students from this population.
To determine which sequence of sample proportions is most likely to occur for 5 random samples of 8 students from a population where 60% are eligible for financial aid, we'll examine the variability in the sample proportions generated with the applet.
Given the options:
a) 0.250, 0.125, 0.500, 0.500, 0.875
b) 0.600, 0.600, 0.600, 0.600, 0.600
c) 0.375, 0.625, 0.500, 0.500, 0.875
Option b) has no variability, which is unlikely in random sampling.
Option a) has very high variability, which is also unlikely.
Option c) has moderate variability and is closer to the true proportion of 0.60, making it the most likely sequence of sample proportions to occur for 5 random samples of 8 students from this population.
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The diameter of a circle is 7 cm. Find its area to the nearest whole number.
Answer:
Step-by-step explanation:
Answer: A=38.48
Step-by-step explanation:
A=πr^2
7/2=3.5
3.5x3.5=12.25
12.25π
38.48
Hope this helps! :)
CRITICAL THINKING
Solve the problem. Show your work.
Find the total area of the flower and vegetable garden.
Use the formula for the area of a rectangle.
6 ft
4 ft
flowers
vegetables
8 ft
Garden
Answer:
Step-by-step explanation:
Formula of rectangle: base x height (b*h)
base: 8ft
height: 6+4= 10
8 x 10 = 80
Area of rectangle: 80ft
A faculty committee has decided to choose one or more students to join the committee. A total of 5 juniors and 6 seniors have volunteered to serve on this committee. How many different choices are there if the committee decides to select (a) one junior and one senior?
(b) exactly one student?
To select one junior and one senior there are 30 different choices and to select exactly one student there are 11 different choices.
(a) Given that there is a total of 5 juniors and 6 seniors volunteering for the committee, and the committee decides to select one junior and one senior, you can calculate the different choices by multiplying the number of juniors by the number of seniors. In this case, it would be 5 juniors * 6 seniors = 30 different choices.
(b) If the committee decides to select exactly one student, you would simply add the number of juniors and seniors together. In this case, it would be 5 juniors + 6 seniors = 11 different choices.
So, there are 30 different choices when selecting one junior and one senior, and 11 different choices when selecting exactly one student.
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a box has a volume of 140 cm Square if its breadth is 5 cm and it's length is 7 cm find it's height
Answer:
To find the height of the box, we need to use the formula for volume of a box: Volume = length x breadth x height
Given the values for length and breadth, we can substitute them into the formula and solve for height: 140 = 7 x 5 x height
Simplifying the equation, we get: 140 = 35 x height
Dividing both sides by 35, we get: height = 4
Therefore, the height of the box is 4 cm
Solve the problem. Show your work.
Reina heard on the 6:00 P.M. news that the temperature had
dropped 22° since 4:00 P.M. At 4:00 P.M., the temperature was 12º.
What is the temperature at 6:00 P.M.?
Bruce Lovegren was born on September 27, 1950. On April 14, 1977, he purchased a $15,000 10-year term life insurance policy. What was the annual premium he paid?
Bruce Lovegren paid a monthly annual premium of $125 for his $15,000 10-year term life insurance policy.
The monthly premium can be calculated by dividing the total cost of the policy by the number of months in the policy term:
monthly premium = total cost of policy / number of months in policy term
The total cost of the policy can be calculated by multiplying the annual premium by the number of years in the policy term:
total cost of policy = annual premium * number of years in policy term
The number of months in a year is 12.
Bruce Lovegren purchased the policy on April 14, 1977, so the policy was in effect for 10 years and 8 months, or 128 months.
The annual premium as follows:
total cost of policy = $15,000
number of years in policy term = 10
annual premium = total cost of policy / number of years in policy term
annual premium = $15,000 / 10
annual premium = $1,500
monthly premium = annual premium / 12
monthly premium = $1,500 / 12
monthly premium = $125
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A simple random sample of 100 postal employees is used to test if the average time postal employees have worked for the postal service has changed from the value of 7.5 years recorded 20 years ago. The sample mean was 7 years with a standard deviation of 2 years. Assume the distribution of the time the employees have worked for the postal service is approximately normal. The hypotheses being tested are H0: μ = 7.5, HA: μ ≠ 7.5. A one-sample t test will be used.
What are the appropriate degrees of freedom for this test?
a) 19
b) 99
c) 100
d) 7
What is the value of the test statistic for the one-sample t?
a) 2.5
b) -2.5
c) 2
d) -0.25
What is the p-value for the one-sample t?
a. 0.02 > p-value > 0.01
b. 0.10 > p-value > 0.05
c. 0.0062
d. 0.01 > p-value > 0.005
e. 0.05 > p-value > 0.01
Suppose the mean and standard deviation obtained were based on a sample of size n=25 postal workers rather than 100.
What do we know about the value of the p-value?
a) It would be larger.
b) It would be unchanged because the variability or standard deviation is the same.
c) It would be unchanged because the difference between the sample mean and the hypothesized mean is the same.
d) It would be smaller.
What would you conclude about the population?
a) The true average years is greater than 7.5
b) The true average years is not equal to 7.5
c) The true average years is equal to 7.5
d) Not enough information
We reject the null hypothesis and conclude that the true average years are not equal to 7.5.
The appropriate degrees of freedom for this test is: b) 99
The degrees of freedom are calculated as n - 1, where n is the sample size (100 in this case).
So, [tex]n-1=100-1=99[/tex].
The value of the test statistic for the one-sample t is: b) -2.5
The test statistic is calculated using the formula: [tex]\frac{(sample mean - hypothesized mean)}{\frac{standard deviation}{\sqrt{sample size}}}[/tex], which is =[tex]\frac{(7 - 7.5)}{\frac{2}{\sqrt{100}}}[/tex] -2.5.
The p-value for the one-sample t is: e) 0.05 > p-value > 0.01
With a test statistic of -2.5 and 99 degrees of freedom, the p-value falls between 0.01 and 0.05.
If the mean and standard deviation were based on a sample of size n=25 postal workers rather than 100, the value of the p-value would be:
a) It would be larger.
A smaller sample size typically results in a larger p-value, making it more difficult to reject the null hypothesis.
Based on the given information, we can conclude about the population:
b) The true average years is not equal to 7.5
Since the p-value is between 0.01 and 0.05, it's significant at the 0.05 level, leading us to reject the null hypothesis and conclude that the true average years is not equal to 7.5.
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A magician holds a standard deck of cards and draws one card. The probability of drawing the ace of diamonds is 1/52. What method of assigning probabilities was used?
a. classical method
b. objective method
c. subjective method
d. experimental method
The probability of drawing the ace of diamonds is determined by the number of possible outcomes (52 cards in a standard deck) and the number of favorable outcomes (1 ace of diamonds). Your answer: a. classical method
The method of assigning probabilities used in this scenario is the classical method, where the probability of an event is calculated by dividing the number of favorable outcomes by the total number of possible outcomes. In this case, there is only one favorable outcome (drawing the ace of diamonds) out of 52 possible outcomes (drawing any card from a standard deck of 52 cards).
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NEED ANSWER ASAP : The formula gives the maximum height y of a projectile launched straight up, given acceleration a and initial velocity v.
y=v^2/2a
Solve for v.
Responses
v=2ay√/a
v equals fraction numerator square root of 2 a y end root over denominator a end fraction
v=4a^2y^2
v equals 4 a squared y squared
v=4y^2/a^2
v equals fraction numerator 4 y squared over denominator a squared end fraction
v=2ay−−−√
The required expression is v = √2ay.
Let acceleration is given by: a
and initial velocity is given by: v
So, The maximum height(y) is
y= v² sinθ / 2a
As, θ=90 then
y = v² /2a
v² = 2ay
v = √2ay
Thus, the required expression is v = √2ay.
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Which exponents are equivalent to 2 exponent 6? Choose ALL that apply.
Answer:
the entire right column
Step-by-step explanation:
your solutions should simply to 64
Answer:2*2*2*2*2*2 and 4*16 and 8*8
Step-by-step explanation:
2*2*2*2*2*2=64
4*16=64
8*8=64
6*6*6*6*6*6=46656
2*6=12
12*12=144
Find a value of the standard normal random variable z, call it zo such that the following probabilities are satisfied. a. P(z ≤ zo) = 0.0151 b. P(-z0 ≤ z ≤ z0)=0.99 c. P(- zo ≤ z ≤ z0)=0.90 d. P(-z0 ≤ z ≤ zo) = 0.8154
e. P(-z0 ≤ z ≤ 0)= 0-2755 f. P(-2 < z < z)=0.9746 g. P(z >z0)=0.5 h. P (z ≤ zo)= 0.0043
The values of the standard normal random variable z, such that the probability of the following are satisfied: a. zo = -2.17; b. zo = 2.58; c. zo = 1.645; d. zo = 1.44.; e. zo = 0.37; f. zo = 1.96; g. zo = 0; h. zo = 0.
a. P(z ≤ zo) = 0.0151:
zo = -2.17.
b. P(-z0 ≤ z ≤ z0)=0.99
Since the standard normal distribution is symmetric, therefore, finding the z-score corresponding to probability: (1+0.99)/2 = 0.995.
zo = 2.58.
c. P(-zo ≤ z ≤ zo)=0.90:
Using the same reasoning as above, z-score for probability: (1+0.90)/2 = 0.95.
zo = 1.645.
d. P(-z0 ≤ z ≤ zo) = 0.8154:
probability of being outside and inside the range (-zo, zo) respectively:
P(z ≤ -zo) = P(z ≥ zo) = (1 - 0.8154)/2 = 0.0923
P(-zo ≤ z ≤ zo) = 1 - P(z ≤ -zo) - P(z ≥ zo) = 1 - 2(0.0923) = 0.8154
z-score for probability: (1+0.8154)/2 = 0.9077.
zo = 1.44.
e. P(-zo ≤ z ≤ 0) = 0.2755:
Using symmetry of standard normal distribution:
P(-zo ≤ z ≤ 0) = P(0 ≤ z ≤ zo) = (1 - 0.2755)/2 = 0.36225
zo = 0.37.
f. P(-2 < z < zo) = 0.9746:
zo = 1.96.
g. P(z > zo) = 0.5:
Since the standard normal distribution is symmetric:
P(z > zo) = P(z < -zo) = 0.5
zo = 0.
h. P(z ≤ zo) = 0.0043:
zo = 0.
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