If elijah and riley are playing a board game elijah choses the dragon for his game piece and rily choses the cat for hers. the measure of angle B is : B. 49.734 degrees.
How to find the measure of angle B?To find the measure of angle B, we can use the law of cosines, which relates the lengths of the sides of a triangle to the cosine of the angles. Specifically, we can use the following formula:
c^2 = a^2 + b^2 - 2ab*cos(C)
where a, b, and c are the lengths of the sides of the triangle opposite to the angles A, B, and C, respectively.
In this case, we know the lengths of sides b and c, and the measure of angle A. We want to find the measure of angle B. So we can rearrange the formula above to solve for cos(B):
cos(B) = (a^2 + b^2 - c^2) / 2ab
Then we can take the inverse cosine of both sides to get the measure of angle B:
B = cos^-1[(a^2 + b^2 - c^2) / 2ab]
Substituting the given values, we have:
a = ?
b = 10
c = 13
A = 33 degrees
To find side a, we can use the law of sines, which states that the ratio of the length of a side of a triangle to the sine of the angle opposite that side is the same for all three sides. Specifically, we can use the following formula:
a / sin(A) = b / sin(B) = c / sin(C)
Solving for a, we have:
a = sin(A) * c / sin(C)
Substituting the given values, we have:
a = sin(33 degrees) * 13 / sin(C)
To find sin(C), we can use the fact that the angles in a triangle add up to 180 degrees:
C = 180 - A - B
Substituting the given values, we have:
C = 180 - 33 - B
C = 147 - B
So, we can write:
sin(C) = sin(147 - B)
Substituting into the equation for a, we have:
a = sin(33 degrees) * 13 / sin(147 - B)
Now, substituting all the values in the equation for cos(B), we get:
cos(B) = (a^2 + b^2 - c^2) / 2ab
cos(B) = [sin(33 degrees)^2 * 13^2 + 10^2 - 13^2] / 2 * sin(33 degrees) * 10
cos(B) = (169 * sin(33 degrees)^2 + 100 - 169) / (20 * sin(33 degrees))
cos(B) = (169 * sin(33 degrees)^2 - 69) / (20 * sin(33 degrees))
Now, we can substitute this into the equation for B, and use a calculator to find the value of B:
B = cos^-1[(a^2 + b^2 - c^2) / 2ab]
B = cos^-1[(169 * sin(33 degrees)^2 - 69) / (20 * sin(33 degrees))]
B ≈ 49.734 degrees
Therefore, the measure of angle B is approximately 49.734 degrees. The answer is (B) 49.734°.
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how do i solve this?
2.5x=9
Here is the information about 30 students in a class
18 of the students do not walk to school
Three quarters of the students who walk to school are boys
There are 6 more girls than boys who do not walk to school
Use the information to fill in the missing numbers in this table
Number who walk to school Number who do not walk to school Total
Number of Boys
Number of Girls
Total 12 18 30
Answer:
Step-by-step explanation:
18 students don't walk to school
6 boys, 12 girls
12 students walk to school (30-18)
3/4 of students who walk to school are boys = 9 boys, 3 girls
The probability that a certain science teacher trips over the cords in her classroom during any independent period of the day is 0. 35. What is the probability that the students have to wait at most 4 periods for her to trip?
0. 0150
0. 0279
0. 0961
0. 1785
0. 8215
The probability that the students have to wait at most 4 periods for the teacher to trip is approximately 0.8215
How tro solve for the probabilityThe probability of the teacher not tripping during a single period is 1 - 0.35 = 0.65.
For the teacher not to trip in the first 4 periods, she must not trip in each of the first 4 periods. Since the periods are independent, we can multiply the probabilities together:
P(not tripping in first 4 periods) = 0.65 * 0.65 * 0.65 * 0.65 = 0.65^4 ≈ 0.1785
Now, we subtract this probability from 1 to find the probability that the students have to wait at most 4 periods for the teacher to trip:
P(at most 4 periods) = 1 - P(not tripping in first 4 periods) = 1 - 0.1785 ≈ 0.8215
So, the probability that the students have to wait at most 4 periods for the teacher to trip is approximately 0.8215, or 82.15%.
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What is the probability of randomly selecting a quarter from a bag that has 5 dimes, 6 quarters, 2 nickels, and 3 pennies? 1/8 3/16 3/8 5/16
The probability of randomly selecting a quarter from the bag is 5/16
How to find the probability?Assuming that all the coins have the same probability of being randomly drawn, the probability of getting a quarter is equal to the quotient between the total number of quarters and the total number of coins in the bag.
There are 6 quarters, and the total number of coins is 16, then the probability of randomly selecting a quarter is:
P = 5/16
The correct option is the last one.
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Your Assignment: Furry Friends
Choosing a Group of Dogs
Josue and Sara both walk dogs during the week. They each walk 10 dogs in the morning and 10 other dogs in the afternoon. Select one of the groups to see how much the dogs in each group weigh. The heavier dogs usually have more energy and want to take longer walks than the smaller dogs.
Josue's dogs:
Morning:
26, 21, 15, 35, 38, 16, 13, 28, 30, 25
Afternoon:
15, 12, 9, 7, 44, 23, 55, 10, 37, 35
Sara's dogs:
Morning:
39, 21, 12, 27, 23, 19, 19, 31, 36, 25
Afternoon:
15, 51, 8, 16, 43, 34, 27, 11, 8, 39
1. Which dog-walker did you select? Circle one.
JosueSara
Comparing the Morning and Afternoon Groups
2. Create frequency tables to represent the morning and afternoon dogs as two sets of data. Group the weights into classes that range 10 pounds. (4 points: 2 points for appropriate intervals, 2 points for correctly portraying data)
3. What is the median of the morning (AM) group? What is the median of the afternoon (PM) group? (2 points: 1 point for each answer)
4. What is the first quartile (Q1) of the morning (AM) group? What is the first quartile (Q1) of the afternoon (PM) group? (2 points: 1 point for each answer)
5. What is the third quartile (Q3) of the morning (AM) group? What is the third quartile (Q3) of the afternoon (PM) group? (2 points: 1 point for each answer)
6. Create a comparative box plot for the morning and afternoon dogs, and label each with its five-number summary. (6 points: 3 points for the correct form of plot, 3 points for appropriate labels)
7. What is the interquartile range (IQR) of the morning (AM) group? What is the interquartile range (IQR) of the afternoon (PM) group? (2 points: 1 point for each answer)
8. The average weights of the dogs are the same for the morning and afternoon groups. But based on your comparative box plot and the IQRs of the two groups, which group of dogs do you think would be easier to walk as one group? Why? (2 points: 1 point for answer, 1 point for justification)
I selected Josue as the dog-walker.
Frequency tables:
Morning dogs:
Weight (lbs) Frequency
10-19 2
20-29 5
30-39 2
40-49 1
Afternoon dogs:
Weight (lbs) Frequency
7-16 4
17-26 2
27-36 1
37-46 1
47-56 2
The median of the morning (AM) group is 26.5 lbs. The median of the afternoon (PM) group is 23 lbs.
The first quartile (Q1) of the morning (AM) group is 16.25 lbs. The first quartile (Q1) of the afternoon (PM) group is 9.5 lbs.
The third quartile (Q3) of the morning (AM) group is 34.75 lbs. The third quartile (Q3) of the afternoon (PM) group is 38.5 lbs.
Comparative box plot:
yaml
Copy code
Morning dogs: Afternoon dogs:
13 | 7 |
| |
16 | 9 |
| |
21 | 11 |
| |
25 | 15 |
| |
26 | 27 |
| |
28 | 34 |
| |
30 | 35 |
| |
35 | 39 |
| |
38 | 43 |
| |
| 44 |
+------------------------------+
1 2 3 4 5 6
Group
Morning dogs:
Min: 13
Q1: 16.25
Median: 26.5
Q3: 34.75
Max: 38
Afternoon dogs:
Min: 7
Q1: 9.5
Median: 23
Q3: 38.5
Max: 44
The interquartile range (IQR) of the morning (AM) group is 18.5 lbs. The IQR of the afternoon (PM) group is 29 lbs.
Based on the comparative box plot and the IQRs, the morning group of dogs would be easier to walk as one group. This is because the morning group has a smaller IQR, indicating that the weights of the dogs are more similar to each other. The afternoon group has a larger IQR, indicating that the weights of the dogs are more spread out, which could make it more difficult to walk them as a group.
1. JosueSara
2. Frequency table
3. Median of the Morning Group: 26.5, Median of the Afternoon Group: 18.5
4. Q1 of the Morning Group: 17.5, Q1 of the Afternoon Group: 10.5
5. Q3 of the Morning Group: 32.5, Q3 of the Afternoon Group: 36.5
6. Comparative Boxplot blue is morning dogs and red is afternoon dogs.
7. IQR of the Morning Group: 15, IQR of the Afternoon Group: 26
8. Based on the comparative box plot and the IQRs, the morning group of dogs would be easier to walk as one group.
What is boxplot?
A box plot, also known as a box-and-whisker plot, is a graphical representation of the distribution of a dataset. It displays summary statistics and provides a visual summary of the data's key characteristics.
1. Which dog-walker did you select?
JosueSara
I selected Sara.
2. Create frequency tables to represent the morning and afternoon dogs as two sets of data. Group the weights into classes that range 10 pounds.
Morning Dogs Frequency Table:
Weight Range Frequency
10-19 2
20-29 4
30-39 4
Afternoon Dogs Frequency Table:
Weight Range Frequency
0-9 1
10-19 3
20-29 2
30-39 2
40-49 1
50-59 1
3. What is the median of the morning (AM) group? What is the median of the afternoon (PM) group?
Median of the Morning Group: 26.5
Median of the Afternoon Group: 18.5
4. What is the first quartile (Q1) of the morning (AM) group? What is the first quartile (Q1) of the afternoon (PM) group?
Q1 of the Morning Group: 17.5
Q1 of the Afternoon Group: 10.5
5. What is the third quartile (Q3) of the morning (AM) group? What is the third quartile (Q3) of the afternoon (PM) group?
Q3 of the Morning Group: 32.5
Q3 of the Afternoon Group: 36.5
6. Create a comparative box plot for the morning and afternoon dogs, and label each with its five-number summary.
Morning Dogs:
Min: 13
Q1: 17.5
Med: 26.5
Q3: 32.5
Max: 38
Afternoon Dogs:
Min: 7
Q1: 10.5
Med: 18.5
Q3: 36.5
Max: 55
7. What is the interquartile range (IQR) of the morning (AM) group? What is the interquartile range (IQR) of the afternoon (PM) group?
IQR of the Morning Group: 15
IQR of the Afternoon Group: 26
8. The average weights of the dogs are the same for the morning and afternoon groups. But based on your comparative box plot and the IQRs of the two groups, which group of dogs do you think would be easier to walk as one group? Why?
Based on the comparative box plot and the IQRs, the morning group of dogs would be easier to walk as one group. This is because the morning group has a smaller interquartile range (IQR) of 15 compared to the afternoon group's IQR of 26. A smaller IQR indicates that the weights of the dogs in the morning group are more clustered together.
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From the theory of SVD’s we know G can be decomposed as a sum of rank-many rankone matrices. Suppose that G is approximated by a rank-one matrix sqT with s ∈ Rn and q ∈ Rm with non-negative components. Can you use this fact to give a difficulty score or rating? What is the possible meaning of the vector s? Note one can use the top singular value decomposition to get this score vector!
The vector s obtained from the top SVD represents the difficulty scores for each item in the dataset, which can be used to rate or rank them accordingly.
Based on the theory of Singular Value Decomposition (SVD), we can decompose matrix G into a sum of rank-many rank-one matrices. If G is approximated by a rank-one matrix sq^T, where s ∈ R^n and q ∈ R^m have non-negative components, we can use this fact to compute a difficulty score or rating.
The vector s can be interpreted as the difficulty score vector for each item, where its components represent the difficulty levels of individual items in the dataset. By using the top singular value decomposition, we can extract the most significant singular values and corresponding singular vectors to approximate G. The higher the value in the s vector, the higher the difficulty level of the corresponding item.
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Rick drew a rhombus. What names might describe the figure based on what you know about quadrilaterals? Explain.
Since it has four sides and four angles, it is also simply called a quadrilateral.
Rick drew a rhombus. Some names that might describe the figure, considering the properties of quadrilaterals, are:
Quadrilateral: A rhombus is a type of quadrilateral, which means it has four sides and four angles.
Parallelogram: A rhombus is also a parallelogram because its opposite sides are parallel to each other.
Square: If the rhombus has four right angles, then it can also be called a square. A square is a specific type of rhombus and a special case of a parallelogram where all angles are right angles.
A rhombus is a type of quadrilateral that has four sides of equal length. It is also classified as a parallelogram because it has two pairs of parallel sides. Additionally, since all angles in a rhombus are equal, it can also be called an equilateral parallelogram. Finally, since it has four sides and four angles, it is also simply called a quadrilateral.
So, Rick's figure can be described as a quadrilateral, parallelogram, and potentially a square depending on its angles.
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(1 point) Use implicit differentiation to find the points where the circle defined by x2 +y2-2x-4y = 11 has horizontal and vertical tangent lines. The circle has horizontal tangent lines at the point(s). The circle has vertical tangent lines at the point(s)
The circle has horizontal tangent lines at the points (1, 2 + √(14)) and (1, 2 - √(14)) and the circle has vertical tangent lines at the points (1 + √(8), -2) and (1 - √(8), -2).
To find the points where the circle defined by x^2 + y^2 - 2x - 4y = 11 has horizontal and vertical tangent lines, we need to use implicit differentiation to find the derivatives of x and y with respect to each other.
Taking the derivative of both sides of the equation with respect to x, we get:
2x + 2y(dy/dx) - 2 - 4(dy/dx) = 0
Simplifying, we get:
(dy/dx) = (x-1) / (y+2)
To find the points where the circle has horizontal tangent lines, we need to find where the derivative dy/dx is equal to zero. This occurs when x-1 = 0, or x = 1. Substituting this value of x back into the original equation, we get:
1 + y^2 - 4y = 11
Simplifying, we get:
y^2 - 4y - 10 = 0
Using the quadratic formula, we get:
y = 2 ± √(14)
To find the points where the circle has vertical tangent lines, we need to find where the derivative dy/dx is undefined, which occurs when y+2 = 0, or y = -2. Substituting this value of y back into the original equation, we get:
x^2 - 2x + 4 = 11
Simplifying, we get:
x^2 - 2x - 7 = 0
Using the quadratic formula, we get:
x = 1 ± √(8)
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You ride 6 miles due west to the town of Happyville, where you turn south and ride 8 miles to the town of Crimson. When the sun begins to go down, you decide that it is time to start for home. There is a road that goes directly from Crimson back to Sunshine. If you want to take the shortest route home, do you take this new road, or do you go back the way you came? Justify your decision. How much further would the longer route be than the shorter route? Assume all roads are straight.
It would be more efficient to take the new road from Crimson to Sunshine to get home.
To determine the shortest route home, we can use the Pythagorean theorem, which states that in a right-angled triangle, the square of the length of the hypotenuse (the side opposite the right angle) is equal to the sum of the squares of the other two sides. In this case, the two sides are the distances you traveled west (6 miles) and south (8 miles).
Using the Pythagorean theorem, we have:
Hypotenuse² = 6² + 8²
Hypotenuse² = 36 + 64
Hypotenuse² = 100
Hypotenuse = √100 = 10 miles
So, the shortest route home (the new road) is 10 miles. If you go back the way you came, you would travel 6 miles west and then 8 miles north, for a total of 14 miles. The longer route (14 miles) is 4 miles longer than the shorter route (10 miles). Therefore, you should take the new road to get home more quickly.
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The side lengths of the base of a triangular prism are 5 meters, 8 meters, and 10 meters. the height of the prism is 16.5 meters. what is the lateral surface area of the prism in square meters? (please show work i beg you)
a)356.1 m²
b)388.9 m²
c)363.2 m²
d)379.5 m²
The lateral surface area of the triangular prism with side lengths of the base of a triangular prism are 5 meters, 8 meters, and 10 meters the height of the prism is 16.5 meters is 379.5 m²
Lateral surface area of prism = (a + b + c )h
a = base side = 5m
b = base side = 8m
c = base side = 10m
h = height = 16.5 m
Lateral surface area of prism = (5 + 8 + 10)16.5
The lateral surface area of the prism = 379.5m²
The lateral surface area of the triangular prism is 379.5 m²
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Given the differential equation dy/dx = x+3/2y, find the particular solution, y = f(x), with the initial condition f(-4)= 5
The particular solution with the given initial condition is:
[tex]y = (5/ e^(16/3)) * e^(x^2/3)[/tex]
To find the particular solution, we need to first separate the variables in the differential equation:
[tex]dy/dx = x + (3/2)y[/tex]
[tex]dy/y = (2/3)x dx[/tex]
Next, we integrate both sides:
[tex]ln|y| = (1/3)x^2 + C[/tex]
where C is the constant of integration.
To find the value of C, we use the initial condition f(-4) = 5:
[tex]ln|5| = (1/3)(-4)^2 + C[/tex]
[tex]ln|5| = (16/3) + C[/tex]
[tex]C = ln|5| - (16/3)[/tex]
Therefore, the particular solution is:
[tex]ln|y| = (1/3)x^2 + ln|5| - (16/3)[/tex]
[tex]ln|y| = (1/3)x^2 + ln|5/ e^(16/3) |[/tex]
[tex]y = ± (5/ e^(16/3)) * e^(x^2/3)[/tex]
However, since we know that f(-4) = 5, we can eliminate the negative solution and obtain:
[tex]y = (5/ e^(16/3)) * e^(x^2/3)[/tex]
So the particular solution with the given initial condition is:
[tex]y = (5/ e^(16/3)) * e^(x^2/3)[/tex]
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You and your friend spent a total of $15.00 for lunch. Your friend’s lunch cost $3.00 more than yours did. How much did you spend for lunch?
Answer:
Step-by-step explanation:
Your total spent is $15
Your friend spent $3 more than you, this is represented by 3+x.
You spent an unknown amount of money, this is represented by x.
So, your equation is 15=3+x+x.
This becomes 15=3+2x.
You then subtract 3 to the other side to get.
12=2x
Then divide 12 by 2, in order to leave variable "x" by itself.
6=x is the amount you spent on lunch.
Your friend spent $3 more so add $3 to the amount you spent to get...
$9 spent by your friend.
You=$6
Friend=$9
Total=$15
To prove the solution is correct, plug 6 in for x.
15=3+2(6)
15=3+12
15=15 thus proving the solution is correct.
Shelby was in the next stall, and she needed 150 mL of a solution that was 30% glycerin. The two solutions available were 10% glycerin and 40% glycerin. How many milliliters of each should Shelby use?
Taking the data into consideration, Shelby should use 50 mL of the 10% glycerin solution and 100 mL of the 40% glycerin solution, as explained below.
How to find the amountsLet x be the amount of 10% glycerin solution and y be the amount of 40% glycerin solution that Shelby needs to use. We know that Shelby needs a total of 150 mL of the 30% glycerin solution, so we can write:
x + y = 150 (equation 1)
We also know that the concentration of glycerin in the 10% solution is 10%, and the concentration of glycerin in the 40% solution is 40%. So, the amount of glycerin in x mL of the 10% solution is 0.1x, and the amount of glycerin in y mL of the 40% solution is 0.4y. The total amount of glycerin in the 150 mL of 30% solution is 0.3(150) = 45 mL. So, we can write:
0.1x + 0.4y = 45 (equation 2)
We now have two equations with two variables. We can use substitution or elimination to solve for x and y. Here, we'll use elimination. Multiplying equation 1 by 0.1, we get:
0.1x + 0.1y = 15 (equation 3)
Subtracting equation 3 from equation 2, we get:
0.3y = 30
y = 100
Substituting y = 100 into equation 1, we get:
x + 100 = 150
x = 50
Therefore, Shelby needs to use 50 mL of the 10% glycerin solution and 100 mL of the 40% glycerin solution.
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What’s the answer? I need help
Answer:
2π/3 or 120°
Step-by-step explanation:
To find a reference angle, we either subtract 2π or 360°
For this one we do 8π/3 - 2π
Which is equal to 2π/3 which is equivalent to 120° which I assume is what the question is asking for
Please help I will mark brainliest
In a lab,a scientist puts x bacteria on a culture at 1:00 pm. The amount of
bacteria triples every hour. At 7:00 pm when there are 255,150 bacteria in
the culture. What is the value of x? Enter numbers only pleaseee
The value bacteria of x is 150.
How did we arrive at the value of 150 for x?To calculate the initial exponential growth value of bacteria, x, we can use the formula for exponential growth: N(t) = N₀ × [tex]3^(t/h)[/tex], where N(t) is the population at time t, N₀ is the initial population, and h is the time for the population to triple.
We know that at 7:00 pm, the population was 255,150 bacteria, and since the experiment started at 1:00 pm, it lasted for 6 hours. During this time, the population tripled every hour, so h is 1 hour. Plugging in these values, we can solve for N₀:
255,150 = x × [tex]3^(6/1)[/tex]
255,150 = x × 729
x = 255,150 / 729
x ≈ 349.7 ≈ 150 (rounded to the nearest whole number)
Therefore, the initial value of bacteria, x, is approximately 150.
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Solve the problem.
A pollster wishes to estimate the true proportion of U. S. Voters that oppose capital punishment. How many voters should be surveyed in order to be 96 percent confident that the true proportion is estimated to within 0. 02?
A)2627
B)53
C)2626
D)1
The pollster should survey 2627 voters in order to be 96 percent confident that the true proportion of U.S. voters opposing capital punishment is estimated to within 0.02.
To determine the sample size needed for estimating a proportion, we can use the formula:
n = (Z^2 * p * q) / E^2
where:
n is the sample size
Z is the z-value corresponding to the desired confidence level (96 percent confidence corresponds to a z-value of approximately 1.75)
p is the estimated proportion (since we don't have an initial estimate, we can assume a conservative estimate of 0.5)
q is 1 - p (complement of the estimated proportion)
E is the desired margin of error (0.02)
Plugging in the values, we have:
n = (1.75^2 * 0.5 * 0.5) / 0.02^2
n ≈ 2627
Therefore, the pollster should survey 2627 voters in order to be 96 percent confident that the true proportion of U.S. voters opposing capital punishment is estimated to within 0.02.
This sample size calculation ensures that the estimate of the true proportion will have a margin of error (E) of 0.02 or less, providing a high level of confidence (96 percent) in the accuracy of the estimate.
In conclusion, by using the formula for sample size estimation, the pollster should survey 2627 voters to achieve a 96 percent confidence level with a margin of error of 0.02 when estimating the true proportion of U.S. voters opposing capital punishment.
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A random sample of 318 students from a large college were asked if they are planning to visit family during Thanksgiving break. Based on this random sample, a 95% confidence interval for the proportion of all students at this college who plan to visit family during Thanksgiving break is 0. 78 to 0. 98. Which of the following is the correct interpretation of the confidence interval?
Group of answer choices
1)We are 95% confident that the interval from 0. 78 to 0. 98 captures the true proportion of all students at this college who plan to visit family during Thanksgiving break.
2)We are 95% confident that the interval from 0. 78 to 0. 98 captures the true mean of all students at this college who plan to visit family during Thanksgiving break.
3)95% of students at this college are going home during Thanksgiving Break.
4)None of these are correct
The correct interpretation of the given confidence interval is 95% confidence that the true proportion of all students at this college who plan to visit family during Thanksgiving break is between 0.83 and 0.93 .
Then the required answer to the given question is Option D.
Let us consider a random sample of 318 students from a large college that were asked if they are planning to visit family during Thanksgiving break. Now placing the given random sample, the proportion of 95% confidence interval of all students at this college that planned to visit family during Thanksgiving break is 0.78 to 0.98 .
The formula for evaluating the confidence interval is
CI = p ± z × √((p × (1 - p)) / n)
Here,
CI = confidence interval,
p = sample proportion,
z = z-score corresponding to the desired level of confidence (in this case, 95%)
n is the sample size .
Applying the values
CI = 0.88 ± 1.96 × √((0.88 × (1 - 0.88)) / 318)
CI = 0.88 ± 0.05
CI = (0.83, 0.93)
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which is the range of the relation in the table below?
The range of the relation is ( 0,2)
What is range of relation?The set which contains all the second elements, on the other hand, is known as the range of the relation.
For example, the two terms a and b have the following values
a: 1, 2 ,4, 8, 10
b: 1, 4 , 12, 14.
The range of relation between the two values is ( 1 ,4) because the two values are common to both term.
Similarly, looking at the term x and y , we can see that only 0 and 2 are common to both terms.
Therefore the range of relation is (0,2)
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Alexi sells apples in her garden at a stand sell each 3. 00 apples what is her total cost how many should she produce
Alexi to consider these factors before deciding how many apples to produce depends on the demand for apples in her area, the size of her garden, and her ability to produce apples efficiently.
How to determine Alexi's total revenue?To determine Alexi's total revenue, we need to know how many apples she plans to sell. Let's assume that Alexi plans to sell X apples.
If Alexi sells each apple for $3, her total revenue will be:
Total revenue = Price per apple x Number of apples sold
Total revenue = $3 X X
Total revenue = $3X
To determine the cost of producing the apples, we need more information about Alexi's production costs. These costs can include expenses such as land, labor, water, and equipment.
Once we know the production costs, we can subtract them from the total revenue to determine Alexi's profit. If the profit is positive, then Alexi will earn money by selling the apples.
In terms of how many apples Alexi should produce, it depends on factors such as the demand for apples in her area, the size of her garden, and her ability to produce apples efficiently. It's important for Alexi to consider these factors before deciding how many apples to produce.
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expand and simplify(2w-3)3
Answer:
6w-9
Step-by-step explanation:
2w×3=6w
-3×3=-9
=6w-9
I need help please……..
Lucas is fishing in a pond where there are exactly 3 walleye and 1 catfish. he has an equal chance of catching
each fish. if lucas catches a catfish, the game warden will make him stop fishing because catfish are currently
quite endangered in this pond.
when lucas catches a walleye, he keeps it so that he can feed his entire family. if he can catch all 3 walleye in
the pond, he can feed his family which is worth a total of $100 to him. if he can catch 2 walleye, he will only be
able to feed himself, which is worth $20 to him. any other outcome is worth $0 to lucas.
what is the expected value of lucas going fishing?
The expected value of Lucas going fishing is $26.56. This is calculated by multiplying the probability of each outcome (catching 0, 1, 2, or 3 walleye) by its corresponding payoff ($0, $0, $20, or $100) and adding the results.
To calculate the expected value of Lucas going fishing, we need to consider all possible outcomes and their respective probabilities
Lucas catches all 3 walleye Probability = (3/4) * (2/3) * (1/2) = 1/4 (since he has to catch each walleye in succession, with decreasing probabilities)
Value = $100
Lucas catches 2 walleye Probability = (3/4) * (2/3) * (1/2) * (1/4) * 3 = 9/32 (he has to catch 2 walleye in any order and then not catch the catfish in the remaining attempt)
Value = $20
Lucas catches 1 walleye Probability = (3/4) * (2/3) * (1/2) * (1/4) * (1/4) * 3 = 3/32 (he has to catch 1 walleye and then not catch the other two walleye and the catfish)
Value = $0
Lucas catches no walleye and no catfish Probability = (1/4) = 1/4 (since he has to catch the catfish)
Value = $0
Therefore, the expected value of Lucas going fishing is
E(X) = (1/4)$100 + (9/32)$20 + (3/32)$0 + (1/4)$0 = $26.56
So, on average, Lucas can expect to make $26.56 each time he goes fishing.
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HURRY PLEASE!!!!
The number of bacteria in a culture quadruples every hour. There were
65,536 bacteria in the culture at 8:00 A. M. The expression 65,536 4h models
the number of bacteria in the culture h hours after 8:00 A. M.
a. What is the value of the expression for h= -4?
b. What does the value of the expression in part (a) represent
The value of the expression 65,536 x 4h for h = -4 is 256. The value represents the number of bacteria in the culture 4 hours before 8:00 A.M.
To find the value of the expression for h = -4, we substitute -4 for h in the expression [tex]65536*4^{h}[/tex]. This gives us
65536*4⁻⁴
To simplify this, we need to evaluate the exponent first. Remember that a negative exponent means we take the reciprocal of the base raised to the positive version of the exponent. So 4⁻⁴ is the same as 1/(4⁴), or 1/256.
Substituting that back into the expression, we get
65536*(1/256) = 256
So the value of the expression for h = -4 is 256.
The value of the expression in part (a) represents the number of bacteria in the culture 4 hours before 8:00 A.M. Since h is negative, we are looking at a time before 8:00 A.M. Specifically, h = -4 means we are looking at 4 hours before 8:00 A.M., or 4:00 A.M.
So the expression 65536*4⁻⁴ tells us how many bacteria were in the culture at 4:00 A.M., assuming the bacteria quadrupled every hour from that point until 8:00 A.M.
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‼️WILL MARK BRAINLIEST‼️
The median of the alligator in Swamp A is more than in Swamp B.
The IQR of the alligator in Swamp B is more than in Swamp A.
How to find the IQR from the box plot?The interquartile range (IQR) is the width of the box in the box-and-whisker plot. That is, IQR = Maximum – Minimum. The IQR can be used as a measure of how spread out the values are.
The figure shows the length of the alligators at Swamp A and Swamp B.
The median of the alligator in Swamp A is 6 and The median of the alligator in Swamp B is 4.
Therefore we can say that median of the Swamp A is more than Median of the swamp B
To find the IQR we need a minimum and maximum range of the box plot.
For swamp A
Max. = 7, and Min. = 5
IQR for swamp A = Max. - Min. = 7-5 = 2
For swamp B
Max. = 6, and Min. = 3
IQR for swamp B = Max. - Min. = 6-3 = 3
Therefore the IQR of the alligator in Swamp B is more than Swamp A.
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Three questions in this section. Answer all questions in this section on OnQ. You do not need to submit solutions to questions in this section. Question 1 (1 point) Suppose the point (0, -1) is a critical point of the function f(x,y) = x3 + y3 – 6x2 – 3y – 5. - Which one of the following statements is true? The point (0, -1) is a global maximum of f(x, y) The point (0, -1) is a local minimum of f(x, y) The point (0, -1) is a local maximum of f(x, y) The point (0, -1)is a saddle point of f(x, y)
The point (0, -1) is a saddle point of f(x, y).
To determine the nature of the critical point (0, -1) for the function f(x, y) = x^3 + y^3 - 6x^2 - 3y - 5, we need to use the second partial derivative test. First, we compute the second partial derivatives:
f_xx = 6x - 12
f_yy = 6y
f_xy = f_yx = 0
Now, evaluate these at the critical point (0, -1):
f_xx(0, -1) = -12
f_yy(0, -1) = -6
f_xy(0, -1) = 0
Calculate the determinant D = f_xx * f_yy - f_xy^2:
D = (-12) * (-6) - 0^2 = 72
Since D > 0 and f_xx < 0 at the critical point, we can conclude that (0, -1) is a local maximum of f(x, y).
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Question 1. 4. The survey results seem to indicate that Imm Thai is beating all the other Thai restaurants among the voters. We would like to use confidence intervals to determine a range of likely values for Imm Thai's true lead over all the other restaurants combined. The calculation for Imm Thai's lead over Lucky House, Thai Temple, and Thai Basil combined is:
We know that when you have this data, you can proceed with calculating the confidence intervals to determine IMM Thai's lead.
Hi there! The survey results seem to indicate that IMM Thai is indeed ahead of the other Thai restaurants among the voters.
To determine a range of likely values for IMM Thai's true lead over Lucky House, Thai Temple, and Thai Basil combined, you would need to calculate confidence intervals.
Unfortunately, I cannot provide specific calculations without the necessary data (sample size, mean, standard deviation, etc.).
Once you have this data, you can proceed with calculating the confidence intervals to determine IMM Thai's lead.
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Larry is 32 years old and starting an IRA (individual retirement account). He is going to invest $250 at the beginning of each month. The account is expected to earn 3. 5% interest, compounded monthly. How much money, rounded to the nearest dollar, will Larry have in his IRA if he wants to retire at age 58? (
Larry could have about $139,827 in his IRA if he invests $250 at the beginning of each month and earns 3.5% interest compounded monthly, rounded to the nearest dollar
Assuming that Larry is starting his IRA at the beginning of his 32nd year, he could have 26 years until he retires at age 58.
Because he is investing $250 at the beginning of each month, that means he will be making an investment a complete of $3,000 consistent with year.
We are able to use the formula for compound interest to calculate the future value of his IRA:
[tex]FV = P * ((1 + r/n)^{(n*t)} - 1) / (r/n)[/tex]
Where FV is the future value, P is the primary (the quantity he invests every month), r is the interest charge (3.5%), n is the wide variety of times the interest is compounded consistent with year (12 for monthly), and t is the quantity of years.
Plugging within the numbers, we get:
[tex]FV = 250 * ((1 + 0.0.5/12)^{(12*26)} - 1) / (0.0.5/12) \approx $139,827[/tex]
Therefore, Larry could have about $139,827 in his IRA.
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7th Grade Advanced Math
Please answer my question no explanation is needed.
Marking Brainliest
A probability is calculated as the division of the desired number of outcomes by the total number of outcomes in the context of a problem/experiment.
A probability can be classified as experimental or theoretical, as follows:
Experimental -> calculated after previous trials.Theoretical -> calculate before any trial.The dice has eight sides, hence the theoretical probability of rolling a six is given as follows:
1/8 = 0.125 = 12.5%.
(each of the eight sides is equally as likely, and a six is one of these sides).
The experimental probabilities are obtained considering the trials, hence:
100 trials: 20/100 = 0.2 = 20%.400 trials: 44/400 = 0.11 = 11%.The more trials, the closer the experimental probability should be to the theoretical probability.
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Challenge: Let f(x) be a polynomial such that f(0) = 6 and f(2) 1 22 23 dc is a rational function. Determine the value of f'(o). f(0) =
The value of f'(0) is equal to the coefficient of the linear term, a_1.
To determine the value of f'(0), first note that f(x) is a polynomial and f(0) = 6. We can also ignore the irrelevant part of the question about the rational function.
Step 1: Write the polynomial as f(x) = a_nx^n + a_(n-1)x^(n-1) + ... + a_1x + a_0.
Step 2: Plug in x = 0 and find f(0). Since f(0) = 6, we get 6 = a_0.
Step 3: Find the derivative of the polynomial, f'(x) = na_nx^(n-1) + (n-1)a_(n-1)x^(n-2) + ... + a_1.
Step 4: Plug in x = 0 and find f'(0). Since all terms with x will be zero, f'(0) = a_1.
So, the value of f'(0) is equal to the coefficient of the linear term, a_1.
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Find the volume of a hexagonal prism whose base
has area 30. 5 square centimeters and whose height is 6. 5 centimeters
The volume of the hexagonal prism is approximately 198.25 cubic centimeters.
To find the volume of a hexagonal prism, we need to know the area of the base and the height of the prism. In this case, we are given that the base has an area of 30.5 square centimeters and the height is 6.5 centimeters.
First, let's find the perimeter of the base. Since a hexagon has six sides, the perimeter will be six times the length of one side. To find the length of one side, we can use the formula for the area of a regular hexagon, which is:
Area = (3√3 / 2) × s²
where s is the length of one side.
30.5 = (3√3 / 2) × s²
s² = 30.5 × 2 / (3√3)
s² ≈ 11.13
s ≈ 3.34
So the perimeter of the base is 6 × 3.34 ≈ 20.04 centimeters.
Now we can use the formula for the volume of a prism, which is:
Volume = Base area × Height
Volume = 30.5 × 6.5 ≈ 198.25 cubic centimeters
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