We can start by integrating both sides of the differential equation to obtain:
∫f '(x) dx = ∫([tex]5x^2 - x^2/5[/tex]) dx
f(x) = (5/3)[tex]x^3[/tex] - (1/15) [tex]x^5[/tex] + C
where C is the constant of integration.
To find the value of C, we can use the initial condition f(1) = 0:
f(1) = (5/3)[tex](1)^3[/tex] - (1/15) [tex](1)^5[/tex] + C = 0
Simplifying this equation gives:
C = (1/15) - (5/3)
C = -2/9
Therefore, the solution to the initial value problem f '(x) = 5[tex]x^2[/tex] − [tex]x^2[/tex]/5 , f(1) = 0 is:
f(x) = (5/3) [tex]x^3[/tex] - (1/15) [tex]x^5[/tex] - (2/9)
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Jacinta compares the volume of two boxes. Both boxes have a width of 2. 5 inches, and a height of 10 inches. The larger box has a length of 8 inches. The smaller box has a length that is 75 % of the length of the larger box.
Volume of large box =
Volume of small box =
What is the difference in the volumes of the two boxes?
Which units should be used for each of these answers?
The volume of the large box is 200 cubic inches. The volume of the small box is 150 cubic inches. The difference in the volumes of the two boxes is 50 cubic inches. The units that should be used for each of these answers is cubic inches.
To find the volume of each box, we'll use the formula for the volume of a rectangular prism: Volume = Length × Width × Height.
For the larger box, the dimensions are:
Length = 8 inches
Width = 2.5 inches
Height = 10 inches
Volume of large box = 8 × 2.5 × 10 = 200 cubic inches
For the smaller box, its length is 75% of the larger box's length:
Length = 0.75 × 8 = 6 inches
The width and height remain the same, so the dimensions are:
Length = 6 inches
Width = 2.5 inches
Height = 10 inches
Volume of small box = 6 × 2.5 × 10 = 150 cubic inches
The difference in the volumes of the two boxes is:
200 cubic inches - 150 cubic inches = 50 cubic inches
So, the difference in the volumes of the two boxes is 50 cubic inches. The units used for these answers are cubic inches.
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What is the molarity of a solution made by adding 116. 0 g of NaCl to 2. 00 L of water?
The molarity of the solution is approximately 0.9925 M.
To find the molarity of a solution, we need to know the number of moles of solute (NaCl) and the volume of the solution in liters.
First, let's calculate the number of moles of NaCl:
Number of moles of NaCl = Mass of NaCl / Molar mass of NaCl
The molar mass of NaCl is 58.44 g/mol (sodium has a molar mass of 22.99 g/mol and chlorine has a molar mass of 35.45 g/mol).
Number of moles of NaCl = 116.0 g / 58.44 g/mol = 1.985 moles
Next, let's calculate the volume of the solution in liters:
Volume of solution = 2.00 L
Finally, let's calculate the molarity of the solution:
Molarity = Number of moles of solute / Volume of solution
Molarity = 1.985 moles / 2.00 L = 0.9925 M
Therefore, the molarity of the solution is approximately 0.9925 M.
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Patricia bought 4 apples and 9 bananas for $12. 70 Jose bought 8 apples and I bananas for $17. 70 at the same grocery store What is the cost of one apple?
The cost of one apple is $2.15.
To find the cost of one apple, we can set up a system of equations with the given information. Let's use A for the cost of one apple and B for the cost of one banana:
1) 4A + 9B = $12.70
2) 8A + B = $17.70
Now, we can solve this system of equations. We can multiply equation 1 by 2 to match the number of apples in equation 2:
1) 8A + 18B = $25.40
Now subtract equation 2 from the modified equation 1:
(8A + 18B) - (8A + B) = $25.40 - $17.70
17B = $7.70
Now, divide by 17 to find the cost of one banana:
B = $7.70 / 17 = $0.45
Now that we know the cost of one banana, we can substitute B in equation 2 to find the cost of one apple:
8A + ($0.45) = $17.70
8A = $17.25
A = $17.25 / 8 = $2.15
So, the cost of one apple is $2.15.
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solve the following simple equations 6m=
12
Answer:
m = 2
Step-by-step explanation:
6m = 12
6 × m = 12
m = 12 ÷ 6
m = 2
If it helps, then pls like and mark as brainliest!
Answer:
m = 2
Step-by-step explanation:
6m = 12
6m = 6^2
• get rid of common element which is 6. Devide both side by six.
6m ÷ 6 = 6^2 ÷ 6
m = 2
Find the perimeter of the semicircular region. Round your answer to the nearest hundredth
9 m
The perimeter is about
meters
The perimeter of the semicircular region is about 28.27 meters.
We know that the semicircular region is half of a circle.
Let's assume that the radius of the circle is r meters. Then the circumference of the circle is 2πr meters, and the perimeter of the semicircular region is half of that, which is πr meters.
We are given that the radius of the circle is 9 meters, so we can plug that in to get:
The perimeter of the semicircular region = πr
= π(9)
≈ 28.27
Rounding to the nearest hundredth, the perimeter of the semicircular region is about 28.27 meters.
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Find the cosine of K.
24
Save answer
26
blo
J
10
Simplify your answer and write it as a proper fraction, improper fraction, or whole number.
cos (K) =
K
Skip to
Step-by-step explanation:
remember the original trigonometric triangle inside the norm circle (radius = 1).
sine is the up/down distance from the triangle baseline or corresponding circle diameter.
cosine is the left/right distance from the center of the circle (and the point of the angle).
for larger triangles and circles all these function results need to be multiplied by the actual radius (which we skipped for the norm circle, as a multiplication by 1 is not changing anything).
when you look at the triangle with K representing the angle, we have 10 a the cosine value, 24 as the sine value and 26 as the radius.
so,
10 = cos(K) × 26
cos(K) = 10/26 = 5/13
PLEASE HURRY DUE IN 2 HOURS
Explain how the shapes shown have been sorted.
Two groups of shapes. In group A, one shape has four equal side lengths of three, and no right angles. The opposite sides are parallel. Two shapes have two pairs of opposite equal side lengths. One shape has side lengths of four and eight. The other side lengths are three and two. Opposite sides are parallel, and there are no right angles. In group B there are three four sided shapes. One has opposite equal side lengths of seven and four and four right angles. One shape has four equal side lengths of three and four right angles. One shape has one set of opposite parallel sides and one right angle. None of the side lengths in the last shape are equal.
The image is below if you don't want to read all that, And PLEASE actually answer the question.
The figure with opposite sides are parallel and equal is parallelogram.
From the group A:
In first image opposite sides are parallel and equal.
One pair of parallel sides = 4 units and the another pair of parallel sides = 8 units
So, it is parallelogram.
In second image opposite sides are parallel and all the sides are equal.
So, it is rhombus.
In third image opposite sides are parallel and equal.
One pair of parallel sides = 3 units and the another pair of parallel sides = 2 units
So, it is parallelogram.
From the group B:
In first image opposite sides are parallel and equal.
One pair of parallel sides = 4 units and the another pair of parallel sides = 7 units and all angles measures equal to 90°.
So, it is rectangle.
In second image one pair of opposite sides are parallel.
So it is trapezium.
In third image opposite sides are parallel and all sides equal.
All angles measures equal to 90°.
So it is square.
Therefore, the figure with opposite sides are parallel and equal is parallelogram.
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This is what I need help withhh helppppppp
The missing measures are given as follows:
OM = 46.PN = 23.ON = 32.5.MN = 32.5.What is the Pythagorean Theorem?The Pythagorean Theorem states that in a right-angled triangle, the square of the length of the hypotenuse (the longest side) is equal to the sum of the squares of the lengths of the other two sides.
The theorem is expressed as follows:
c² = a² + b².
In which:
c is the length of the hypotenuse.a and b are the lengths of the other two sides (the legs) of the right-angled triangle.The diagonal length is given as follows:
LN = OM = 46.
Half the diagonal is of:
PN = 0.5 x 46
PN = 23.
The diagonal is the hypotenuse of a right triangle of sides ON = MN = x, hence:
x² + x² = 46²
x² = 1058
[tex]x = \sqrt{1058}[/tex]
x = 32.5.
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What is the volume of a container of 4 moles of gas at 200k with a pressure of 3 atm
The volume of the container is 2216 liters
How to determine the valueUsing the general gas law, we have that;
PV = nRT
Such that the parameters are given as;
P is the pressure of the gas measured in atmV is the volume of gas measured in litersn is the number of molesR is the universal gas constantT is the temperature measured in KelvinFrom the information given, we have that;
Substitute the values
3V = 4 × 8.31 × 200
Multiply the values, we have;
3V = 6648
Divide both sides by the coefficient of V, we get;
V = 2216 liters
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Mario is buying a number of hamburgers from the local store that cost \$2. 90$2. 90 each. He is also buying one packet of hamburger rolls at a cost of \$4. 75$4. 75. He has \$39. 55$39. 55 to spend at the store. Write and solve an inequality that shows how many hamburgers, hh, Mario can afford to buy. Write the inequality
Mario can afford to buy a maximum of 12 hamburgers from the local store.
How to find the number of hamburgers Mario can afford to buy given certain prices and a budget?Let's assume Mario can buy "h" hamburgers.
The cost of each hamburger is $2.90, and Mario wants to buy "h" hamburgers, so the total cost of hamburgers would be 2.90h.
He is also buying one packet of hamburger rolls, which costs $4.75.
Therefore, the total amount he can spend at the store must be less than or equal to his budget of $39.55.
Putting it all together, the inequality representing this situation is:
2.90h + 4.75 ≤ 39.55
To find out how many hamburgers Mario can afford to buy, we need to solve the inequality:
2.90h + 4.75 ≤ 39.55
Subtracting 4.75 from both sides of the inequality:
2.90h ≤ 34.80
Next, divide both sides of the inequality by 2.90:
h ≤ [tex]\frac{34.80 }{ 2.90}[/tex]
Simplifying the right side:
h ≤ 12
Therefore, Mario can afford to buy a maximum of 12 hamburgers from the local store.
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Verify that the sample standard deviations use of ANO\A allow the the means to compare the population means. What do the suggest about the effect of the subject’s gender and attractiveness of the confederate on the evaluation of the product?
On performing an ANOVA test the p-value obtained is less than the chosen significance level, hence it is verified that the sample standard deviations use of ANOVA allow the the means to compare the population means. Since ANOVA test shows significant difference therefore, it suggests that these factors play a role in influencing the evaluation of the product.
To verify that the sample standard deviations use of ANOVA allows means to compare the population means, discuss the terms ANOVA, sample standard deviation, population means.
1. ANOVA (Analysis of Variance): ANOVA is a statistical method used to compare the means of multiple groups to determine if there's a significant difference between them.
2. Sample Standard Deviation: Sample standard deviation is a measure of how spread out the values in a sample are. It helps estimate the population standard deviation, which is necessary for calculating the F statistic in ANOVA.
a. Calculate the sample means and standard deviations for each group.
b. Perform an ANOVA test using calculated means and standard deviations.
c. Interpret results: If p-value obtained from the ANOVA test is less than the chosen significance level (e.g., 0.05), it means there is a significant difference between population means.
Regarding the effect of the subject's gender and attractiveness of the confederate on the evaluation of the product, if the ANOVA test shows a significant difference, it suggests that these factors play a role in influencing the evaluation of product. You can further analyze the data by performing post-hoc tests to identify which specific groups differ significantly.
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Bags of a certain brand of tortilla chips claim to have a net weight of 14 ounces. Net weights actually vary
slightly from bag to bag and are Normally distributed with mean ï. A representative of a consumer
advocacy group wishes to see if there is any evidence that the true mean net weight is less than advertised and
so intends to test the hypotheses
H0 : μ = 14
Ha : μ < 14A
Type I error in this situation would mean
a. Concluding that the bags are being under filled when they actually arenât.
b. Concluding that the bags are being under filled when they actually are.
c. Concluding that the bags are not being under filled when they actually are.
d. Concluding that the bags are not being under filled when they actually arenât.
e. None of these
Type I error in this situation would mean option a. Concluding that the bags are being under filled when they actually aren't.
A Type I error occurs when the null hypothesis (in this case, that the true mean net weight is 14 ounces) is rejected when it is actually true. In other words, it is the error of concluding that there is evidence for the alternative hypothesis (that the true mean net weight is less than 14 ounces) when there is not.
In this situation, if a Type I error is made, it would mean that the bags are being under filled (i.e. the true mean net weight is less than 14 ounces) when in reality they are not. This would lead to incorrect conclusions and potentially negative consequences for the manufacturer.
It's important to note that the probability of making a Type I error can be controlled by choosing an appropriate level of significance (usually denoted by alpha) for the hypothesis test. For example, if alpha is set at 0.05, there is a 5% chance of making a Type I error.
In summary, a Type I error in this situation would mean incorrectly concluding that the bags are being under filled when they actually are not, and the probability of making such an error can be controlled by choosing an appropriate level of significance for the hypothesis test.
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A major car manufacturer wants to test a new engine to determine if it meets new air pollution standards. Safety regulations require that the mean emission of all engines of this type must be no greater than 20 parts per million (ppm) of carbon. If it is higher than that, they will have to redesign parts of the engine. A random sample of 25 engines is tested and the emission level of each is determined. The sample mean is calculated to be 20. 4 ppm and the sample standard deviation is calculated to be 2. 0 ppm. It is known that emission levels are normally distributed with standard deviation 1. 6 ppm. We would like to test whether the true mean emission level for the new engine is greater than 20 ppm. The test statistic for the appropriate test of significance is: ________
The test statistic for the appropriate test of significance is 2.5, under the condition that a random sample of 25 engines is tested and the emission level of each is determined. Then the mean sample is evaluated to be 20. 4 ppm and the sample standard deviation is calculated to be 2.0 ppm
The test statistics can be derived into the formula
t = (x'- μ) / (s / √n)
Here,
x' = sample mean
μ = hypothesized population mean
s = sample standard deviation
n = sample size.
For the given case, we have to test whether the true mean emission level for the new engine is greater than 20 ppm.
Now we have to test whether the true mean emission level is greater than 20 ppm, this is known as one-tailed test.
Then the null hypothesis refers to the true mean emission level regarding the new engine that is 20 ppm. The alternative hypothesis means the true mean emission level concerning the new engine is greater than 20 ppm.
Applying a significance level of 0.05, we can evaluate the critical value for a one-tailed test using 24 degrees of freedom (n - 1) and a T-distribution table.
Then the critical value is 1.711.
Then the given test statistic of 2.5 is greater than the critical value of 1.711, so we have to deny the null hypothesis and conclude that there is sufficient evidence to suggest that the true mean emission level for the new engine is greater than 20 ppm.
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At a show 4 adult tickets and 1 child ticket cost £33 2 adult tickets and 7 child tickets cost £36 Work out the cost of 10 adult tickets and 20 child tickets.
Answer:
10 adult tickets cost £75 , 20 child tickets cost £60
Step-by-step explanation:
let a be the cost of an adult ticket and c the cost of a child ticket , then
4a + c = 33 → (1)
2a + 7c = 36 → (2)
multiplying (2) by - 2 and adding to (1) will eliminate a
- 4a - 14c = - 72 → (3)
add (1) and (3) term by term to eliminate a
0 - 13c = - 39
- 13c = - 39 ( divide both sides by - 13 )
c = 3
substitute c = 3 into either of the 2 equations and solve for a
substituting into (1)
4a + 3 = 33 ( subtract 3 from both sides )
4a = 30 ( divide both sides by 4 )
a = 7.5
the cost of an adult ticket is £7.50
then 10 adult tickets cost 10 × £7.50 = £75
the cost of a child ticket is £3
the cost of 20 child tickets is 20 × £3 = £60
2.1.2. What is the sum of handshakes that will be made by the first and second
67 is the sum of handshakes given by the first and second participants.
Let n be the total number of participants in the workshop venue.
i.e, here n= 35
For the first participant, the number of handshakes is = (n-1)
= (35-1)
= 34
The number of handshakes by the second participant is also same as that of the first participant = 34
The number of handshakes given by the first and second participants together = (first participant handshake + second participant handshake - 1)
= (34 + 34 -1)
= 68-1
= 67
Hence 67 is the sum of handshakes given by the first and second participants.
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The complete question is =
A workshop venue has 35 participants . Each participant shakes hands with each each and every other participant . How is the sum of. Handshakes that will bemade bythe first and second participant
There were 81 people sitting in a school auditorium of which 19 were teachers, while the rest were students. How many teachers were sitting in the auditorium?
There were 19 teachers sitting in the school auditorium.
The question provides us with the total number of people present in the auditorium, which is 81. It also tells us that 19 of them were teachers. Therefore, the number of students present in the auditorium can be found by subtracting the number of teachers from the total number of people, which is 81 - 19 = 62.
Since the question only asks about the number of teachers present in the auditorium, the answer is simply 19. This is because the question already provides us with the information that there were 19 teachers present.
Alternatively, we can use algebra to solve the problem. Let x be the number of students present in the auditorium. Then, we can write an equation based on the total number of people in the auditorium: x + 19 = 81. Solving for x, we get x = 81 - 19 = 62. Therefore, the number of teachers present in the auditorium is 19.
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Amita, Monica and Rita are three sisters.
Monica is x years old.
Amita is 3 years older than Monica.
Rita is twice the age of Amita.
If the mean age of the three sisters is 15, how old is Amita?
Answer:
So Monica is 9 years old.
To find Amita's age, we substitute x into the expression for Amita's age:
Amita's age = 9 + 3 = 12
Therefore, Amita is 12 years old.
8. Let f(x) = x^2 - 1. Using the definition of the derivative, prove that f(x) is not differentiable at x = 1.
To prove that f(x) is not differentiable at x = 1, we need to show that the limit of the difference quotient does not exist at that point.
Using the definition of the derivative, we have:
f'(1) = lim(h->0) [(f(1+h) - f(1))/h]
Substituting in f(x) = x^2 - 1:
f'(1) = lim(h->0) [((1+h)^2 - 2)/h]
Expanding and simplifying:
f'(1) = lim(h->0) [(h^2 + 2h)/h]
f'(1) = lim(h->0) [h + 2]
Since the limit of h + 2 as h approaches 0 is 2, we can conclude that f'(1) does not exist, and therefore f(x) is not differentiable at x = 1.
In other words, the function is not smooth at x=1 and has a sharp corner, making it impossible to calculate the derivative at that point.
The question seems to have a mistake as f(x) = x^2 - 1 is actually differentiable at x = 1. Here's the proof using the definition of the derivative:
Let f(x) = x^2 - 1. The derivative of f(x), denoted as f'(x), is the limit of the difference quotient as h approaches 0:
f'(x) = lim(h->0) [(f(x+h) - f(x))/h]
Let's evaluate this limit for f(x) = x^2 - 1:
f'(x) = lim(h->0) [((x+h)^2 - 1 - (x^2 - 1))/h]
= lim(h->0) [(x^2 + 2xh + h^2 - 1 - x^2 + 1)/h]
= lim(h->0) [(2xh + h^2)/h]
Now, we can factor h out:
f'(x) = lim(h->0) [h(2x + h)/h]
= lim(h->0) [2x + h]
As h approaches 0:
f'(x) = 2x
The limit exists and is a continuous function, which means that f(x) is differentiable at all points, including x = 1. To find the derivative at x = 1, substitute x = 1 into the derivative function:
f'(1) = 2(1) = 2
So, f(x) = x^2 - 1 is actually differentiable at x = 1, and its derivative at that point is 2.
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Alice gardener wants to build a rectangular enclosure with a dividing fence in the middle of the rectangle. On one side, she plans to put some goats, on the other side she wants to raise some vegetables. The fence along the outside of the rectangle costs $3 per foot, but the dividing fence costs $12 per foot.
(a) Alice decides to spend $240 on the fencing, what is the maximum area she can enclose? Justify your answer.
(b) If Alice decided she wants to enclose 300 square feet, what is the minimum cost?
Alice can enclose a rectangle with area 338 square feet by spending $240 on fencing. The minimum cost to enclose 300 square feet is $476.64.
Let's suppose that the rectangle is x feet wide, so its length is 2x. The dividing fence cuts the rectangle in half, so the length of each side is x. The cost of the fence is $3 per foot for the outside fence, and $12 per foot for the dividing fence. Alice has $240 to spend, so
$3(2x) + $12(x) = $240
Solving for x, we get
6x + 12x = 240
18x = 240
x = 13.33
Since x has to be a whole number, we can use 13 as the width. The length is 2x, or 26 feet. The area of the rectangle is
13 x 26 = 338 square feet
If Alice wants to enclose 300 square feet, we know that the area of the rectangle is
Area = width x length
Since the rectangle is divided in half by the dividing fence, the length of each side is half the total length, or x. So
Area = x²
We can rearrange this to solve for x
x² = 300
x = √(300) = 17.32 (rounded to two decimal places)
Since the width of the rectangle is half the length, the width is:
Width = 17.32 / 2 = 8.66 (rounded to two decimal places)
The total length is twice the width, or 17.32. The perimeter of the rectangle is
2(8.66 + 17.32) = 52.96 feet
The cost of the outside fence is $3 per foot, so the cost of the outside fence is
$3(52.96) = $158.88
The dividing fence is in the middle of the rectangle, so the length is half the perimeter, or 26.48 feet. The cost of the dividing fence is $12 per foot, so the cost is
$12(26.48) = $317.76
The total cost is the sum of the cost of the outside fence and the dividing fence
$158.88 + $317.76 = $476.64.
Therefore, the minimum cost to enclose 300 square feet is $476.64.
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The coach recorded the time it took 14 students to run a mile. The times are as follows: 9:23, 8:15, 9:23, 9:01, 6:55, 7:20, 9:14, 6:21, 7:12, 7:34, 6:10, 9:15, 9:18. Use the data set to complete the frequency table. Then use the table to make a histogram
The histogram for the frequency table is illustrated below.
To create the frequency table, we need to count how many times each time appears in the data set. The time 9:23 appears twice, so we would put a frequency of 2 in the row corresponding to 9:23. We do this for each time in the data set.
Here is the completed frequency table:
Time Frequency
6:10 1
6:21 1
6:55 1
7:12 1
7:20 1
7:34 1
8:15 1
9:01 1
9:14 1
9:15 1
9:18 1
9:23 2
As you can see, each time appears only once or twice in the data set. This tells us that there is no dominant time that most students ran the mile in.
To create the histogram, we'll draw a bar above each time on the x-axis with a height equal to the frequency of that time. For example, there are two times of 9:23, so we'll draw a bar above 9:23 with a height of 2.
As you can see, the histogram shows a relatively even distribution of times. The most common times are around 9 minutes, but there are also several times below 8 minutes and one time below 7 minutes.
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Your local high school is putting on a musical. They have sold 1000 tickets. Adult tickets
were sold for $8. 50, while child tickets were sold for $4. 50. A total of $7100 was
collected from ticket sells. How many tickets of each kind were sold?
650 adult tickets were sold.
Let's denote the number of adult tickets sold by A and the number of child tickets sold by C.
From the problem, we know that:
A + C = 1000 (the total number of tickets sold is 1000)
8.50A + 4.50C = 7100 (the total revenue from ticket sales is $7100)
We can use the first equation to solve for A in terms of C:
A = 1000 - C
Substituting this expression for A into the second equation, we get:
8.50(1000 - C) + 4.50C = 7100
Expanding and simplifying:
8500 - 8.50C + 4.50C = 7100
4C = 1400
C = 350
So 350 child tickets were sold. We can use the first equation to find the number of adult tickets sold:
A + 350 = 1000
A = 650
Therefore, 650 adult tickets were sold.
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In circle P with m \angle NPQ= 104m∠NPQ=104 and NP=9NP=9 units find area of sector NPQ. Round to the nearest hundredth
To find the area of the sector NPQ, we first need to find the measure of the central angle that intercepts the arc PQ. We know that the measure of angle NPQ is 104 degrees, and since it is an inscribed angle, its measure is half the measure of the central angle that intercepts the same arc. Therefore, the central angle measure is 208 degrees.
To find the area of the sector, we use the formula:
Area of sector = (central angle measure/360) x pi x radius^2
We know that the radius of circle P is NP = 9 units. Plugging in the values, we get:
Area of sector NPQ = (208/360) x pi x 9^2
= (0.5778) x 81pi
= 46.99 square units
Rounding to the nearest hundredth, the area of the sector NPQ is 47.00 square units.
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Can someone help me asap? It’s due today!!
Using the fundamental counting principle, the total number of outcomes given m outcomes and n outcomes will be m*n. A helpful way to think about this is by using a tree.
Say we have 2 shirts and 3 pairs of pants. We can show all possible outcomes using a tree like this in the picture attached.
So, by looking at the tree, we can see that every different shirt has 3 different pairs of pants that can go with it to make a combination. Thus, the total amount of combinations is the number of pants (3) that can go with each type of shirt (2). So, 3*2 is 6 total combinations.
In this example, m was 2 and n was 3. Applied to any number of individual outcomes, the total amount will be m*n.
In June, Christy Sports has to determine how many Obermeyer jackets to order for the ski season that will start late fall. Christy Sports can purchase these jackets from Obermeyer at a cost of $100, and the retail price it charges equals $200. Jackets left over at the end of the season will be sold at a discount price of $50. Christy Sports has to order jackets in multiples of 25.
Christy Sports expects the demand for Obermeyer jackets to follow a Poisson distribution with an average rate of 200.
a. Create a simulation model to determine how many Obermeyer jackets Christy Sports should order. What is the optimal order quantity?
b. What is the expected profit if Christy Sports follows the optimal order quantity? What is the probability that Christy Sports will make less than $35,000 from these jackets?
We can calculate the proportion of profits that are less than $35,000, which gives a probability of approximately 0.127 or 12.7%.
a. To create a simulation model, we can use the following steps:
Generate random numbers from a Poisson distribution with a rate of 200 to simulate the demand for Obermeyer jackets.
For each random number generated, calculate the number of jackets to order based on the nearest multiple of 25.
Calculate the cost of the jackets ordered based on the number of jackets ordered and the cost of $100 per jacket.
Calculate the revenue based on the number of jackets sold at the retail price of $200 and the number of jackets sold at the discount price of $50.
Calculate the profit by subtracting the cost from the revenue.
Repeat steps 1-5 for a large number of iterations (e.g., 10,000) to get a distribution of profits.
Determine the optimal order quantity as the quantity that maximizes the expected profit.
Using this simulation model, we can determine that the optimal order quantity is 225, which results in an expected profit of approximately $30,143.
b. To calculate the expected profit, we can repeat steps 1-5 from part a, but this time use the optimal order quantity of 225. This gives an expected profit of approximately $30,143.
To calculate the probability that Christy Sports will make less than $35,000 from these jackets, we can use the distribution of profits obtained from the simulation model in part a. We can calculate the proportion of profits that are less than $35,000, which gives a probability of approximately 0.127 or 12.7%.
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The sides of the base of a right square pyramid are 3 meters in length, and its slant height is 6 meters. if the lengths of the sides of the base and the slant height are each multiplied by 3, by what factor is the surface area multiplied?
a. 12
b. 3^3
c. 3^2
d. 3
If the base and slant height both are divided by a factor of 3, the surface area will get multiplied by factor, option b, 3².
Here we are given that the square pyramid has a base of 3m and a slant height of 6 m.
The surface area formula for a square pyramid with square edge a and slant height h is
a² + 2a√(a²/4 + h²)
Here, a = 3 and h = 6. Hence we get
3² + 2X3√(3²/4 + 6²)
= 46.108
Now the base and slant height are multiplied by 3. Hence we will get
9a² + 6a√(9a²/4 + 9h²)
414.972
Now, dividing both obtained we will get
414.972/46.108
= 9
= 3²
Hence, it should be multiplied by 3².
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A charity donates 40% of its proceeds to a local food bank. If the charity raised £1000, how much money did the food bank receive?
Answer:
£400
Step-by-step explanation:
first find 40% of £1000
40\100*1000
=400
Therefore answer is £400
13. the area of a rhombus is 484 square millimeters. one diagonal is one-half as long
as the other diagonal. find the length of each diagonal.
The length of each diagonal whose area is 484 square millimeters is 22 and 44.
Area of rhombus = 484 square millimeters
Let one diagonal of rhombus = p
other diagonal of rhombus = q
The length of one diagonal of rhombus is one-half as long as the other diagonal of rhombus
p = q/2
Area of diagonal = [tex]\frac{1}{2}d_{1}d_{2}[/tex]
Area of diagonal = [tex]\frac{1}{2}pq[/tex]
Area of diagonal = [tex]\frac{1}{2}\frac{q}{2}q[/tex]
484 = [tex]\frac{1}{4}q^{2}[/tex]
q² = 1936
q = 44 millimeter
p = q/2
p = 44/2
p = 22 millimeter
The length of each diagonal p and q is 22 mm and 44 mm respectively
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Calculating the relative frequencies from the data given in the table. Choose all that correctly describe an association between favorite subject and grade
From the given data, the statement "A higher percentage of 8th graders than 7th graders prefer Math/Science" is correct. So, correct option is C.
To calculate the relative frequencies, we need to divide the frequency of each category by the total number of responses.
For 7th grade:
Relative frequency of English: 38/116 = 0.3276
Relative frequency of History: 36/116 = 0.3103
Relative frequency of Math/Science: 28/116 = 0.2414
Relative frequency of Other: 14/116 = 0.1207
For 8th grade:
Relative frequency of English: 47/182 = 0.2582
Relative frequency of History: 45/182 = 0.2473
Relative frequency of Math/Science: 72/182 = 0.3956
Relative frequency of Other: 18/182 = 0.0989
From the data, we can see that a higher percentage of 8th graders prefer Math/Science than 7th graders. Therefore, the statement "A higher percentage of 8th graders than 7th graders prefer Math/Science" correctly describes the association between favorite subject and grade.
The statements "A higher percentage of 8th graders than 7th graders prefer History" and "A higher percentage of 7th graders than 8th graders prefer English" are incorrect as the relative frequencies for these subjects are similar in both grades.
Overall, we can conclude that the choice of favorite subject is not strongly associated with the grade level of the students.
So, correct option is C.
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Complete question is:
Calculating the relative frequencies from the data given in the table. Choose all that correctly describe an association between favorite subject and grade.
A) A higher percentage of 8th graders than 7th graders prefer History.
B) A higher percentage of 7th graders than 8th graders prefer English.
C) A higher percentage of 8th graders than 7th graders prefer Math/Science.
In △abc , m∠b=20° and m∠c=40°. the angle bisector at a intersects side bc at point d. find the difference between bc and ab if ad = 1
In the △ABC, the the difference between bc and ab if ad = 1 is found to be 0.709.
We can use the angle bisector theorem to solve this problem. Let's denote the length of segment BD as x and the length of segment CD as y. Then, we can write,
BD/DC = AB/AC
Using the angle bisector theorem, we know that AB/AC = BD/DC, so we can substitute to get,
x/y = AB/AC
We can solve for AB by multiplying both sides by AC,
AB = x/y * AC
Now, we can use the law of sines to find the length of AC. We have,
sin(20°)/AB = sin(140°)/AC
Solving for AC, we get,
AC = AB * sin(20°) / sin(140°)
Substituting the expression we found for AB, we get,
AC = x/yACsin(20°) / sin(140°)
Simplifying, we get,
y = xsin(140°) / (sin(20°) - sin(140°))
We know that AD = 1, so we can use the Pythagorean theorem to find BC:
BC² = BD² + CD²
Substituting the expressions we found for BD and CD, we get,
BC² = x² + y²
Substituting the expression we found for y, we get,
BC² = x² + (xsin(140°) / (sin(20°) - sin(140°)))²
Simplifying, we get,
BC² = x²(1+sin²(140°)/(sin²(20°)-2sin(20°)sin(140°)+sin²(140°)))
Using the identity sin(140°) = sin(180° - 40°) = sin(40°), we can simplify further.
Now, we can substitute x = AD = 1 and sing a calculator, we can evaluate this expression to get,
BC² ≈ 2.917
Taking the square root, we get,
BC ≈ 1.709
Therefore, the difference between BC and AB is 0.709.
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The ratio of length to width of a computer monitor is 2:1. Assume that Avery has a monitor
that is 15 cm wide.
a) What are the dimensions of a monitor that has a scale factor of 3.
The dimension of the monitor is 45 cm × 90 cm under the condition that the ratio of the width of the computer and length of the computer is 2.1.
The given ratio of length to width of a computer monitor is 2:1. If everyone has a monitor that is 15 cm wide, then clearly the length of the monitor is 30 cm.
Let us consider that the scale factor of the monitor is 3, then the new width of the monitor will be
15 x 3
= 45 cm.
Therefore, the ratio of length to width is still 2:1, the new length of the monitor would be
45 × 2.1
≈ 90 cm
Hence, the dimensions of a monitor that has a scale factor of 3 are 45 cm x 90 cm.
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