The height of first graders in a class, represented by x, would be considered a Continuous variable. Continuous variables can take on any value within a specified range and are often used to measure physical attributes, such as height.
Let x represent the height of first graders in a class. Discrete variables are those that can be measured using whole numbers, such as the number of people in a room, the number of items on a grocery list, or the number of pages in a book. Continuous variables, on the other hand, are those that can take on any value, such as height, weight, and time.Continuous variables are those that can take on any value between two points on a measurement scale. For example, the height of first graders in a class can be measured in inches or centimeters and can take on any value between the smallest and largest heights in the class.
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A circle has a radius of 4/7 and is centered at
(−2. 5,−4. 4). Write the equation of this circle
The equation of this circle with a radius of 4/7 and is centered at (−2.5, −4.4) is (x + 2.5)² + (y + 4.4)² = 49/16.
It is given to us that a circle has a radius of 7/4 units and is centered at (−2.5, −4.4). We need to write an equation of this circle
Therefore, we can say that the standard form of a circle is:
(x - h)² + (y - k)² = r²
where, (h, k) is center and r is radius of the circle.
when we substitute h = -2.5, k = -4.4 and r = 7/4 in the above formula, we get:
= [x-(-2.5)]² + [y-(-4.4)]² = (7/4)²
= (x + 2.5)² + (y + 4.4)² = 49/16
Hence the equation of circle is (x + 2.5)² + (y + 4.4)² = 49/16.
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if cards are drawn at random from a deck of cards and are not replaced, find the probability of getting at least one spade. enter your answer as a fraction or a decimal rounded to decimal places.
13/52
52 cards in a deck
13 spades
1-9 of spades
king, queen, jack and ace of spades
that makes 13 spades in a deck of cards
The probability of getting at least one spade when drawing cards at random from a deck of cards without replacement is 0.6492 or 0.65 (rounded to two decimal places).
To find the probability of getting at least one spade, we can first find the probability of getting no spades and subtract it from 1.
The probability of getting no spades in the first draw is 39/52 since there are 13 non-spade cards out of 52 cards in the deck. In the second draw, there are 38 non-spade cards out of 51 since one card has been removed from the deck.
Similarly, in the third draw, there are 37 non-spade cards out of 50. Therefore, the probability of getting no spades in three draws is (39/52) x (38/51) x (37/50) = 0.3508 or 0.35 (rounded to two decimal places).
Finally, we can subtract this probability from 1 to get the probability of getting at least one spade: 1 - 0.3508 = 0.6492 or 0.65 (rounded to two decimal places).
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How many possible outcomes are in the sample space?
The total number of possible outcomes in the sample space for three coin flips is 8.
When a coin is flipped three times, the sample space consists of all possible outcomes that can occur in the experiment. In this case, each coin flip can result in one of two possible outcomes: heads or tails. Therefore, the total number of possible outcomes in the sample space is obtained by multiplying the number of possible outcomes for each individual flip, since each flip is independent of the others.
Thus, the total number of possible outcomes in the sample space for three coin flips is 2 x 2 x 2 = 8. These outcomes include all possible combinations of heads and tails, such as HHH, HHT, HTH, THH, HTT, THT, TTH, and TTT. Each outcome has an equal probability of occurring, assuming the coin is fair and unbiased.
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Question:
How many outcomes are in the sample space if a coin is flipped three times?
in how many ways can we seat $8$ people around a table if alice and bob won't sit next to each other? (two seatings are the same if one is a rotation of the other.)
There are a total of 7 ways to seat eight people around a table if Alice and Bob won't sit next to each other. This is because the seating arrangement must be a permutation of the seven people not including Alice and Bob.
We can calculate this by taking the factorial of the number of people not including Alice and Bob, which is seven. Since a factorial is the product of an integer and all the integers below it, we can calculate the factorial of seven by multiplying all the integers from one to seven.
This gives us 7=5040, which is the total number of ways to seat eight people around a table if Alice and Bob won't sit next to each other.
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Answer: I am terrible at these kinds of "sit-uating" problems (haha). My idea is that the three people can be situated in (3−1)!
ways and that the rest can be situated in (5−1)!
ways. Then, the ordering of the five people depends on the partitions of 5 into 3 groups:
Step-by-step explanation:
Graph the line passing through (−4,−1) whose slope is m=−45
Step-by-step explanation:
y=mx+b
let(-4,-1)
x. y
then lets fill it with the formula
-4=-45(-1)+b
-4=45+b
-b=45+4
-b=49
b=-49
katherine spent 20\% of her hike going uphill. if she spent 1 hour and 42 minutes hiking uphill, how many hours long was her hike?
Katherine's hike was 4.7 hours long. She spent 1 hour and 42 minutes going uphill, which was 20% of her hike. This means that her entire hike was (1 hour and 42 minutes) / (20%) = 4.7 hours long.
To calculate this, we need to divide the amount of time spent hiking uphill (1 hour and 42 minutes) by the percentage of her hike spent going uphill (20%). 1 hour and 42 minutes is equal to 102 minutes. 102 minutes / 20% = 4.7 hours. Therefore, Katherine's hike was 4.7 hours long.
We can use the following equation to calculate the answer:
Hike time = (uphill time) / (percentage of uphill time)
Hike time = (102 minutes) / (20%) = 4.7 hours
It is important to note that the calculation can also be done using the amount of time spent going downhill as well. The amount of time spent going downhill will equal the total hike time minus the amount of time spent going uphill. In this case, the amount of time spent going downhill would equal 4.7 hours - 1 hour and 42 minutes = 2.28 hours.
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Blue Cab operates 12% of the taxis in a certain city, and Green Cab operates the other 88%. After a night-time hit-and-run accident involving a taxi, an eyewitness said the vehicle was blue. Suppose, though, that under night vision conditions, only 85% of individuals can correctly distinguish between a blue and a green vehicle. What is the probability that the taxi at fault was blue given an eyewitness said it was? Round your answer to 3 decimal places Write your answer as reduced fraction
The probability that the taxi at fault was blue given an eyewitness said it was is approximately 0.436.
To find the probability that the taxi at fault was blue given an eyewitness said it was, we can use Bayes' theorem. Bayes' theorem is expressed as: P(A|B) = (P(B|A) * P(A)) / P(B)
Where:
- P(A|B) is the probability of A given B (the probability the taxi is blue given the eyewitness said it was blue)
- P(B|A) is the probability of B given A (the probability the eyewitness said the taxi was blue given it was actually blue)
- P(A) is the probability of A (the probability the taxi is blue)
- P(B) is the probability of B (the probability the eyewitness said the taxi was blue)
First, let's define our events:
- A: The taxi is blue (Blue Cab), with a probability of 12% (0.12)
- B: The eyewitness said the taxi was blue
Now, we need to find P(B|A) and P(B).
1. P(B|A) = 0.85 (the probability the eyewitness correctly identifies the blue taxi)
2. P(B) can be found using the law of total probability: P(B) = P(B|A) * P(A) + P(B|A') * P(A')
- A': The taxi is not blue (Green Cab), with a probability of 88% (0.88)
- P(B|A') = 1 - 0.85 = 0.15 (the probability the eyewitness incorrectly identifies the green taxi as blue)
So, P(B) = 0.85 * 0.12 + 0.15 * 0.88 = 0.102 + 0.132 = 0.234
Now, we can apply Bayes' theorem:
P(A|B) = (P(B|A) * P(A)) / P(B)
P(A|B) = (0.85 * 0.12) / 0.234
P(A|B) ≈ 0.4359
Rounded to three decimal places, the probability that the taxi at fault was blue given an eyewitness said it was is approximately 0.436 or 436/1000 as a reduced fraction.
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Hey! I need help on this question and I would be so happy if you helped me!
Answer: Answer is below <3
Step-by-step explanation:
Which figure has the greater volume?A
Which figure has the greater surface area?B
Which figure has fewer edges?A
I hope this is correct, I'm sorry if its wrong :(
Pease help!!
Question below!
Answer: Line PQ is parallel to line LM
Step-by-step explanation:
We can check if they are of equal distance apart by checking if the ratios of the given lines are equal...in other words we must check if LP/PN=MQ/QN
We know that triangle PNQ is inscribed inside triangle LNM
Using the information we have we see that side LP is 18 units, PN is 16 units, MQ is 27, and QN is 24. With this information we can write out LP/PN=MQ/QN and see if it's true.
LP= 18, PN= 16, 18/16= 1.125
MQ= 27, QN=24, 27/24= 1.125
therefore, LP/PN=MQ/QN is true. Making line PQ and line LM parallel.
an apple falls from a tree 100 km to the ground. if the acceleration due to gravity is 9,8 m/s² and the mass of the apple is 0,2 gram. what is the potential energy of the apple?
Answer: 196 Joules (J)
Step-by-step explanation:
To calculate the potential energy of the apple, we can use the formula:
Potential Energy = Mass x Gravity x Height
First, let's convert the height from kilometers to meters:
100 km = 100,000 meters
Now, let's convert the mass of the apple from grams to kilograms:
0.2 gram = 0.0002 kilograms
Using these values, we can calculate the potential energy:
Potential Energy = 0.0002 kg x 9.8 m/s^2 x 100,000 m
Potential Energy = 196 Joules (J)
Therefore, the potential energy of the apple is 196 Joules (J).
To determine the % Cr in the chromium-complex Legna synthesized, she massed out a 1.0240 g sample of the Cr complex. She dissolved the sample in a volumetric flask and made 100.0 mL of solution. From the standard curve of Absorbance versus concentration Legna obtain [Cr^3+]=0.03933 M. Calculate the %Cr in the complex.
the %Cr in the complex is 26.294%.
To determine the % Cr in the chromium-complex Legna synthesized, she massed out a 1.0240 g sample of the Cr complex. She dissolved the sample in a volumetric flask and made 100.0 mL of solution. From the standard curve of Absorbance versus concentration Legna obtained [Cr3+]=0.03933 M. Calculate the %Cr in the complex.
To determine the % Cr in the chromium-complex synthesized by Legna, we can use the following formula:% Cr = (mass of Cr/mass of sample) x 100We have the mass of the sample, which is 1.0240 g. We need to find the mass of Cr in the sample. To do this, we need to find the number of moles of Cr in the solution, and then use the molar mass of Cr to convert this to mass.
The concentration of Cr3+ in the solution is given as 0.03933 M. We know that the complex is made up of Cr and some other ligands, and the concentration of Cr3+ is not the same as the concentration of Cr in the complex. To find the concentration of Cr in the complex, we need to use the formula:[Cr] = [Cr3+] x (1/x), where x is the number of moles of Cr3+ in the complex.
Let's assume that there is one mole of Cr3+ in the complex, then x = 1. If there are n moles of Cr3+ in the complex, then x = n. We can find x by using the formula:x = (mass of sample/Mr of Cr3+) x [Cr3+]/volume of solutionWe know that the mass of the sample is 1.0240 g, and the volume of the solution is 100.0 mL = 0.1000 L. The molar mass of Cr3+ is 52.00 g/mol. Substituting these values into the formula, we get:x = (1.0240/52.00) x 0.03933/0.1000x = 0.000761 moles of Cr3+ in the complex
Now we can use the formula [Cr] = [Cr3+] x (1/x) to find the concentration of Cr in the complex:[Cr] = 0.03933/0.000761[Cr] = 51.69 M
Finally, we can use the formula:% Cr = (mass of Cr/mass of sample) x 100The molar mass of Cr is 52.00 g/mol. The mass of Cr in the complex is 51.69 x 52.00 = 2689.88 g/mol. Substituting this value and the mass of the sample (1.0240 g) into the formula, we get:% Cr = (2689.88/1.0240) x 100% Cr = 262944.53% Cr = 26.294%
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In a pond, the ratio of newts to toads was 3:4
9 more toads then entered the pond, and the ratio of newts to toads became 3:5
Work out how many newts are in the pond
The initial number of newts and toads in the pond were in the ratio 3:4, making the total number of organisms in the pond 7x. Solving for x, we get the initial number of toads and newts in the pond as 108 and 81.
Let's assume that the initial number of newts and toads in the pond were 3x and 4x, respectively. Therefore, the total number of organisms in the pond would be 7x.
When 9 more toads entered the pond, the number of toads became 4x + 9, and the ratio of newts to toads changed to 3:5. This means that the number of newts and toads in the pond increased by a factor of 3/2 and 5/4, respectively. We can set up the following equation to solve for x:
3/2n = 4x + 9
5/4n = 4x + 9
Simplifying these equations, we get:
6x + 18 = 5x + 45
x = 27
So, the initial number of toads in the pond was 4x = 108, and the initial number of newts was 3x = 81.
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2. for each of the following variables, tell me level of measurement and what statistic you would use to quantify central tendency and variability. a. body weight in pounds b. number of cigarettes smoked in a day c. ethnicity d. birth order (i.e., first born, second born, etc.)
In the following question, among the conditions given, the option- a,b and c stand the same ie- The level of measurement is a ratio. The statistic used for the central tendency is the mean or median, whereas d. birth, "is ordinal."
1. Body weight in pounds: The level of measurement is a ratio. The statistic used for the central tendency is mean or median, while for variability, standard deviation or variance can be used.
2. Number of cigarettes smoked in a day: The level of measurement is a ratio. The statistic used for the central tendency is mean or median, while for variability, standard deviation or variance can be used.
3. Ethnicity: The level of measurement is nominal. The statistic used for the central tendency is the mode, while for variability, there is no appropriate statistic.
4. Birth order: The level of measurement is ordinal. The statistic used for the central tendency is median or mode, while for variability, range or interquartile range can be used.
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Write ^4√11^5 without radicals.
Answer: ^4√11^5 = 11^(5/4)
Step-by-step explanation: When we apply a radical, we are asking what number, when raised to a certain power, gives us the number under the radical. For example, ^4√16 is asking what number, when raised to the fourth power, gives us 16. The answer is 2, since 2^4 = 16.
So, ^4√11^5 is asking what number, when raised to the fourth power, gives us 11^5. We can simplify this expression using the exponent laws:
^4√11^5 = (11^5)^(1/4) = 11^(5/4)
Therefore, the simplified expression for ^4√11^5 is 11^(5/4). This expression does not have any radicals, making it easier to work with and manipulate.
Hope this helps, and have a great day!
Find the average of 9, 3, 10, 5, 8, 8, 8
Answer: 7.286
Step-by-step explanation: To find the average, here is the formula =
Sum of all values in a data set ÷ the number of values = mean (average)
Step 1: We add the sum of the values
We do=
9 + 3 + 10 + 5 + 8 + 8 + 8 = 51
Step 2: We find the number of values
9 3 10 5 8 8 8
1 2 3 4 5 6 7
So there are 7 values.
Step 3: We divide the sum of values by the number of values
51 ÷ 7 = 7.286
So the answer is 7.285714....
We round it to the nearest 3 decimal places (3 d.p).
This becomes 7.286
ASAP
Out of 18 students who study French, German, or both, 13 study French, 5 study only German
and 6 study both.
Draw a Venn diagram below to show the two sets.
Answer:
In this diagram, "F" represents the set of students who study French, "G" represents the set of students who study German, "F∩G" represents the set of students who study both French and German, "G∩F" represents the same set but the order of the labels has been reversed to emphasize that this is the same set, and the numbers inside the diagram indicate how many students belong to each set.
Based on the given information, 13 students study French, 5 study only German (i.e., not French), and 6 study both French and German. Therefore, the number of students who study French only is 13 - 6 = 7.
Step-by-step explanation:
To arrive at the number of students who study French only, we subtract the number of students who study both French and German (6) from the total number of students who study French (13), which gives us 7. This means that there are 7 students who study French but do not study German.
find the value of x and y
Answer:
1/3 y
Step-by-step explanation:
0,6x
Listed is a series of experiments and associated random variables. In each case, identify
the values that the random variable can assume and state whether the random variable is
discrete or continuous.
Experiment Random Variable (x)
a. Take a 20-question examination Number of questions answered correctly
b. Observe cars arriving at a tollbooth Number of cars arriving at tollbooth
for 1 hour
c. Audit 50 tax returns Number of returns containing errors
d. Observe an employee’s work Number of nonproductive hours in an
eight-hour workday
e. Weigh a shipment of goods Number of pounds
Experiment Random Variable (x)Possible values of the random variable Discrete or Continuous.
a) Take a 20-question examination Number of questions answered correctly Discrete (0, 1, 2, 3, ..., 20)
b. Observe cars arriving at a tollbooth Number of cars arriving at tollbooth for 1 hour Discrete (0, 1, 2, 3, ...)
c. Audit 50 tax returns Number of returns containing errors Discrete (0, 1, 2, 3, ...)
d. Observe an employee’s work Number of nonproductive hours in an eight-hour workday Continuous
e.Weigh a shipment of goods Number of pounds Continuous Random variables are numerical values that are a result of a random experiment. Random variables are generally classified into two categories
Solution:
discrete random variables and continuous random variables
.Discrete random variables
When a random variable can assume only a countable number of values, it is called a discrete random variable.
Examples: the number of cars passing by a particular point of a highway in a day or the number of customers served by a shop in a day.
Continuous random variables:
When a random variable can assume any value within a given range or interval, it is called a continuous random variable.
Examples: temperature, the weight of a person, or the height of a person.Tax returns: The random variable is discrete, as it can only take certain values (0, 1, 2, 3, and so on) since the number of tax returns containing errors is an integer.The shipment of goods: The random variable is continuous because it can assume any value between the minimum and maximum weight of the shipment, and the weight of the shipment can be any value.
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3 Use the system of equations shown.
-2x - 4y= 24
6x-8y=28
a. How could you change one of the equations so that you could add it to the
other equation and eliminate the x terms?
b. How could you change one of the equations so that you could add it to the
other equation and eliminate the y terms?
c. What is the solution of the system? Show your work.
Answer:
a. Multiply the entire first equation by 3 so that the xs will be eliminated when the two equations are added.
b. Multiply the entire first equation by -2 so that the ys will be eliminated when the two equations are added.
c. y = -5; x = -2
Step-by-step explanation:
a. We're able to cancel a variable when the two variables are the same number with opposite signs (e.g., -3 + 3 = 0, -80 + 80 = 0)
If we multiply the entire first equation by 3, we get
[tex]3(-2x-4y=24)\\-6x-12y=72[/tex]
-6x + 6x = 0
b. We can again use the first equation and multiply it by -2 to cancel out the ys:
[tex]-2(-2x-4y=24)\\4x+8y=-48[/tex]
8y - 8y = 0
c. We can first solve for y by first canceling the xs using the process in part a.
[tex]3(-2x-4y=24)\\\\\\-6x-12y=72\\6x-8y=28\\\\-20y=100\\y=-5[/tex]
We can now plug in -5 for y into the first equation to find x:
[tex]-2x-4(-5)=24\\-2x+20=24\\-2x=4\\x=-2[/tex]
Consider the initial value problem
y^{\,\prime\prime} + 25 y = e^{-t}, \ \ \ y(0) = y_0, \ \ \ y^{\,\prime}(0) = y_0^{\prime}.
Suppose we know thaty(t) \to 0ast \to \infty. Determine the solution and the initial conditions.
y(t) =______________
y(0) =_____________
y^{\,\prime}(0) =
Thus, the solution to the initial value problem is:[tex]y(t) = - y'(t) + \frac{5}{2} (-\frac{1}{5} (y''(0) - 20)) e^{2t} + 3 e^{2t}[/tex]
In this case, the student is asking about an initial value problem with a given differential equation. The differential equation is:[tex]y(t) = y'(t) - 2y(0) + 5[/tex]The initial condition is:y'(0) = 4To solve this initial value problem, we can use the method of integrating factors. First, we need to find the integrating factor. The integrating factor is given by:[tex]e^{∫ -2 dt} = e^{-2t}[/tex]
Now we can multiply both sides of the differential equation by the integrating factor to get:
[tex]e^{-2t} y(t) = e^{-2t} y'(t) + 5e^{-2t} y(0)[/tex]
We can now integrate both sides of this equation with respect to t to get:[tex]e^{-2t} y(t) = - e^{-2t} y'(t) + \frac{5}{-2} e^{-2t} y(0) + C[/tex]where C is the constant of integration.
To find C, we can use the initial condition:y'(0) = 4Substituting this into the equation above gives:C = 3Now we can solve for y(t) by multiplying both sides of the equation by[tex] e^{2t}:y(t) = - y'(t) + \frac{5}{2} y(0) e^{2t} + 3 e^{2t}[/tex]
Finally, we can use the initial condition y'(0) = 4 to solve for the value of[tex] y(0):y'(0) = - y''(0) + 5y(0) + 6y'(0) = - y''(0) + 5y(0) + 24[/tex]
Since y'(0) = 4, we have:[tex]4 = - y''(0) + 5y(0) + 24[/tex]Solving for y(0), we get:[tex]y(0) = -\frac{1}{5} (y''(0) - 20)[/tex]
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tire warranty analysis. grear tire company has produced a new tire with an estimated mean lifetime mileage of 36,500 miles. management also believes that the standard deviation is 5000 miles and that tire mileage is normally distributed. to promote the new tire, grear has offered to refund a portion of the purchase price if the tire fails to reach 30,000 miles before the tire needs to be replaced. specifically, for tires with a lifetime below 30,000 miles, grear will refund a customer $1 per 100 miles short of 30,000. construct a simulation model to answer the following questions: a. for each tire sold, what is the average cost of the promotion? b. what is the probability that grear will refund more than $25 for a tire?
In the following question, among the various parts to solve- a.) the average cost of the promotion is $210, b.) The probability that Grear will refund more than $25 for a tire is 0.159.
a. For each tire sold, the average cost of the promotion is $210. This calculation is based on the fact that the company offers $1 per 100 miles short of 30,000 miles. As a result, the company will refund $210 for each tire that fails to meet the 30,000-mile mark.
b. The probability that Grear will refund more than $25 for a tire is 0.159. This calculation can be carried out using the following steps: First, we need to calculate the number of standard deviations that correspond to a refund of $25 or more:z = (25 - 21) / 3 = 1.33where 21 is the expected value of the refund and 3 is the standard deviation. Next, we can use a normal distribution table to find the probability of a z-score greater than 1.33. Using the table, we get: P(z > 1.33) = 0.0918Therefore, the probability that Grear will refund more than $25 for a tire is 0.0918 or approximately 0.159.
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a. For each tire sold, the average cost of the promotion is $150 ($1 per 100 miles short of 30,000).
b. The probability that grear will refund more than $25 for a tire is 0%.
To calculate the cost of the promotion per tire,
we must first determine the probability that the tire will need to be replaced before reaching 30,000 miles.
Since tire mileage is normally distributed,
we can use the standard normal distribution to calculate this probability.
The z-score for a tire with a lifetime of 30,000 miles is:(30000-36500)/5000 = -1.3
The probability that a tire will need to be replaced before reaching 30,000 miles is the area to the left of this z-score, which can be found using a standard normal distribution table or calculator.
This probability is approximately 0.0968 or 9.68%.
Therefore, the average cost of the promotion per tire is:0.0968 x $150 = $14.52b.
The probability that Grear will refund more than $25 for a tire can be calculated using the same method as in part a. We must first determine the probability that a tire will need to be replaced before reaching 30,000 miles.
The amount of the refund for a tire with a lifetime of less than 30,000 miles is: ($30,000 - lifetime) / 100 x $1
For a refund amount of $25 or more,
we must have:($30,000 - lifetime) / 100 x $1 ≥ $25
This simplifies to: lifetime ≤ $5000/3, or lifetime ≤ 1666.67 miles
The z-score for a tire with a lifetime of 1666.67 miles is:(1666.67-36500)/5000 = -6.6667
The probability that a tire will need to be replaced before reaching 1666.67 miles is the area to the left of this z-score, which can be found using a standard normal distribution table or calculator.
This probability is approximately 0.0000 or 0%.
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The measures of the angles of a triangle are shown in the figure below. Solve for x.
(9x-1)º
74°
62°
PLS HURRY !! :((
How could you predict the probability of the player making at least one shot out of 3 foul shot attempts?
A Carry out 30 trials where 3 marbles are randomly pulled out of the bag with replacement. Count the number of successes and divide by 30 to estimate the probability of making at least one shot out of 3 foul shouts.
B Carry out 30 trials where a marble is randomly pulled out of the bag. Count the number of failures and divide by 30 to estimate the probability of making at least one shot out of 3 foul shouts.
C Carry out 30 trials where a marble is randomly pulled out of the bag. Count the number of successes and divide by 30 to estimate the probability of making at least one shot out of 3 foul shouts.
D Carry out 30 trials where 3 marbles are randomly pulled out of the bag with replacement. Count the number of failures and divide by 30 to estimate the probability of making at least one shot out of 3 foul shouts.
c
Step-by-step explanation:
c because 30 where any marble can be pulled out
The volume of a right cone is 2016
�
π units
3
3
. If its diameter measures 24 units, find its height.
The height of the cone is 13.38 units
What is volume of a cone?A cone is a three-dimensional shape in geometry that narrows smoothly from a flat base (usually circular base) to a point(which forms an axis to the centre of base) called the apex or vertex.
The volume of a cone = 1/3 πr²h
volume = 2016 units³
r = d/2 = 24/2 = 12 units
2016 = 1/3 × 3.14 × 12² h
6048 = 452.16h
h = 6048/452.16
h = 13.38units
therefore the height of the cone is 13.38 units
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Let triangle ABC be similar to DEF. Find the missing side EF.
The length of the side EF is equal to 18 units since the triangle DEF and triangle ABC are similar and DEF is bigger than ABC in the margin of 3 times.
Given, two triangles ABC and DEF.
The length of AB = 8 units
The length of its concurrent side DE = 24 units
Also given that the length of BC = 6 units
Here we can see that:
As both triangles are similar, their corresponding sides are in proportion.
This means that:
[tex]\frac{BC}{EF} = \frac{AE}{DE} =\frac{AC}{DF}[/tex]
Length of AB * 3 = Length of DE
Now the length of the side EF will be 3 times more than the side BC.
Length of EF = Length of BC * 3
Length of EF = 6 * 3
Length of EF = 18 units.
Therefore, the length of the side EF is equal to 18 units.
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What is the mean of this data set?
A line plot titled Height of Lilies. The bottom of the line plot is labeled height in inches. There is a number line showing whole numbers from 18 to 24. The line plot has one mark above the 18. There is one mark above 19. There are two marks above 20. There are two marks above 21. There are three marks above 22. There are zero marks above 23. There is one mark above 24.
20
20.9
21
22.6
Answer: To find the mean of this data set, we need to add up all the heights of lilies and divide by the total number of lilies. We can estimate the heights from the line plot:
There is 1 lily at a height of 18 inches.
There is 1 lily at a height of 19 inches.
There are 2 lilies at a height of 20 inches.
There are 2 lilies at a height of 21 inches.
There are 3 lilies at a height of 22 inches.
There are 0 lilies at a height of 23 inches.
There is 1 lily at a height of 24 inches.
To calculate the mean, we need to multiply each height by the number of lilies at that height, then add up these products, and divide by the total number of lilies:
(1 x 18) + (1 x 19) + (2 x 20) + (2 x 21) + (3 x 22) + (0 x 23) + (1 x 24)
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10
= (18 + 19 + 40 + 42 + 66 + 0 + 24) / 10
= 209 / 10
= 20.9
Therefore, the mean height of lilies in this data set is 20.9 inches. The answer is (B) 20.9.
Step-by-step explanation:
Complete the table
Original Price
Percent of Discount
15%
Sale Price
$146.54
The final result for the money is [tex]172.40[/tex] after you multiply it by a percent.
What does a maths percent mean?In essence, percentages are fractions with a 100 as the denominator. We place the percent sign (%) next to the number to indicate that the number is a percentage.
What does the word "percentage" actually mean?Rather than being stated as a fraction, a percent is a piece of an entire thing expressed as just a number between zero and 100. Nothing is zero percent; everything is 100 percent; half of something is 50 percent; and nothing is zero percent. You divide the part of the total by its entirety and multiply the result by 100 to get the percentage.
[tex]w-[0.15]=146.54[/tex]
so [tex]w-85p=146.54[/tex]
[tex]146.54[/tex] divided by [tex]80=1.724[/tex] so when you make it a percent it turns it into [tex]172.40[/tex] which is the final answer for the money.
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Nahum spent 60% of his money to buy a new bicycle. If the bicycle cost $150, how much money did he have?
Answer: 210
Step-by-step explanation: i learned that today in school
help please!! i have no clue how to do this without the answer to DC
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Winston is baking a pie. The diameter of the pie is 12 inches. What is the area of the pie? Use 3.14 for pi and round your answer to the nearest tenth.
The area of the pie is approximately 113.0 square inches.
What is the significance of pi in math?The ratio of a circle's circumference to its diameter is denoted by the mathematical constant pi . It is roughly equivalent to 3.14159 and is not repetitive or terminal. As pi is an irrational number, it cannot be written as an exact fraction of two integers and its decimal representation never ends. Pi is used to compute the characteristics of circles, spheres, cylinders, and other curved objects in many branches of mathematics and science, including geometry, trigonometry, calculus, physics, and engineering.
The area of the circle is given as:
A = πr²
Here, diameter = 12, thus radius is 6 inches.
Substituting the values:
area = 3.14 x (6)²
area = 113.04 square inches
Hence, the area of the pie is approximately 113.0 square inches.
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