Each edge of the original cube is of length x cm. The diagonal A F has length 20 cm the value of x is 20√2 cm.
Let's label the points in the diagram as follows:
- A, B, C, D are the vertices of the original cube.
- E is the midpoint of the edge BC.
- F is the point where the plane cuts the cube, which is the midpoint of the diagonal AD.
First, let's find the length of the edge EF using the Pythagorean theorem. We know that A F = 20 cm and AE = EF/2, so:
EF² = 2×AE² (by Pythagoras theorem in triangle AEF)
EF² = 2×(A F/2)²
EF² = A F²/2
EF = √(A F²/2)
EF = 10√2 cm
Next, let's find the length of the diagonal AC using the Pythagorean theorem in triangle AEC. We know that AE = EF/2 = 5√2 cm and EC = x cm, so:
AC² = AE² + EC²
AC² = (5√2)² + x²
AC² = 50 + x²
AC = √(50 + x²) cm
Finally, let's find the length of the diagonal AD using the Pythagorean theorem in triangle AFD. We know that A F = 20 cm and FD = x/2 cm (since F is the midpoint of AD), so:
AD² = AF² + FD²
AD² = 20² + (x/2)²
AD² = 400 + x²/4
AD = √(400 + x²/4) cm
Since AD is a diagonal of the original cube, we know that AD = x√3 cm. Therefore:
x√3 = √(400 + x²/4)
x² × 3 = 400 + x²/4
3x² = 1600 + x²
2x² = 1600
x² = 800
x = √800 = 20√2 cm
Therefore, the value of x is 20√2 cm.
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Question 21 of 25
You need to solve a system of equations. You decide to use the elimination
method. Which of these is not allowed?
2x - 3y = 12
-x + 2y = 13
Equation 1
Equation 2
A. Multiply equation 1 by 2 and equation 2 by 3. Then add the new
equations.
B. Multiply the left side of equation 2 by 2. Then subtract the result
from equation 1.
C. Multiply equation 2 by -2. Then add the result to equation 1.
The requried for a system of the solution by elimination options B and C is not allowed.
To use the elimination method, you can add or subtract the equations to eliminate one of the variables. This means that you can multiply one or both of the equations by a constant before adding or subtracting them.
Option A is allowed since you can multiply equation 1 by 2 to get 4x - 6y = 24 and multiply equation 2 by 3 to get -3x + 6y = 39, and then add the new equations to eliminate y.
Option B is not allowed since we can cant multiply the left side of equation 2 by .
Option C is also not allowed since we can multiply equation 2 by -2 to get 2x - 4y = -26, but then we cannot add this result to equation 1.
Therefore, Options B and C are not allowed.
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help this is my last question
The value of k is given as follows:
k = 82º.
How to obtain the angle measure?The middle segment of the angle bisects the larger angle. A bisection means that the larger angle is divided into two smaller angles of equal measure.
The angle measures are given as follows:
k.82º.Hence the value of k is obtained as follows:
k = 82º.
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a jar contains 30 red marbles numbered 1 to 30 and 32 blue marbles numbered 1 to 32. a marble is drawn at random from the jar. find the probability of the given event. please enter reduced fractions.
The probability of the given event (drawing any marble from the jar) is 1, since you are guaranteed to draw a marble.
The probability of drawing a red marble is 30/62, since there are 30 red marbles out of a total of 62 marbles in the jar. Similarly, the probability of drawing a blue marble is 32/62. Given the jar has 30 red marbles (numbered 1-30) and 32 blue marbles (numbered 1-32), there are a total of 62 marbles in the jar. Since a marble is drawn at random, the probability of each event can be calculated as follows:
If the event is drawing a red marble:
Probability = (Number of red marbles) / (Total number of marbles) = 30/62
If the event is drawing a blue marble:
Probability = (Number of blue marbles) / (Total number of marbles) = 32/62
In both cases, the fractions are already reduced to their simplest form.
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what is 9x + −x + 2y + −14y
The expression in simplified form is 4(2x - 3y).
Given that, an expression, 9x+(-x)+2y+(-14y), we need to simplify it,
9x+(-x)+2y+(-14y)
Opening the brackets,
= 9x - x + 2y - 14y
combining the like terms,
= 8x - 12y
Take 4 common,
= 4(2x - 3y)
Hence the expression in simplified form is 4(2x - 3y).
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find the polynomial of least degree that interpolates the set of data: (3, 10), (7, 146), (1, 2), (2, 1) in (a) Lagrange form (b) Newton form
Both Lagrange and Newton forms are valid methods to find the interpolating polynomial. Choose the most convenient form based on the problem at hand.
To find the polynomial of least degree that interpolates the given data points, we can use (a) Lagrange form and (b) Newton form.
(a) Lagrange form:
1. Calculate the Lagrange basis polynomials L0(x), L1(x), L2(x), and L3(x).
2. Multiply each basis polynomial by its corresponding y-value.
3. Sum the results to obtain the final Lagrange polynomial.
(b) Newton form:
1. Calculate the divided differences for the given data points.
2. Determine the Newton basis polynomials N0(x), N1(x), N2(x), and N3(x).
3. Multiply each basis polynomial by its corresponding divided difference.
4. Sum the results to obtain the final Newton polynomial.
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Find the volume of the prism
below.
The prism is a triangular prism, therefore, the volume of the prism is calculated as: 581 cm³.
How to Find the Volume of a Prism?The volume of the triangular prism = base area * length of the prism.
This means that, we will find the area of the base of the prism and also multiply it by the length of the prism.
Base area of the prism = 1/2(base)(height)
Base area of the prism = 1/2(10)(8.3)
Base area of the prism = 41.5 cm²
The length of the prism = 14 cm.
Plug in the values:
Volume of the triangular prism = 41.5 * 14
= 581 cm³
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The following table of raw frequencies can be used to test this hypothesis: In a comparison of individuals, people with lower levels of education will express stronger support for the death penalty than will people with higher levels of education. Education: Support for death penalty High school or less Some college College or higher Not strong 47 43 56 Strong 49 50 35 A. Consider the way the table is arranged. If the hypothesis is correct, should we find a positive sign on Somers’ dyx or a negative sign on Somers’ dyx? Explain how you know. B. Calculate Somers’ dyx for this table. Show your work. On a sheet of paper, label three columns: Concordant pairs (C), Discordant pairs (D), and Tied pairs (Ty). Work your way through the table, recording and computing each concordant pair, discordant pair, and tied pair
if i buy to oranges for 1 pound and have 52p change how much is it for 1 orange
Based on the unit rate, if you buy 2 oranges with £1 coin and get 52p change, the cost of 1 orange is 24p.
What is the unit rate?The unit rate refers to the ratio of one quantity or value compared to another.
The unit rate is computed as the quotient of the total value divided by the number of items in the data set.
We can also refer to the unit rate as the slope, gradient, or constant of proportionality.
The total amount that you have = £1
The change obtained after the transaction = 52p
The amount spent for 2 oranges = 48p (£1 - 52p)
The unit rate of each orange = 24p (48p ÷ 2)
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Complete Question:If I buy 2 oranges with £1 coin and get 52p change, how much is it for 1 orange?
A local college recorded the number of students who registered for each class offered during the first summer session. The data is presented in the box-and-whisker plot shown. Which is the range of the number of students per class for the top 25% of the classes?
INVESTMENT Janice invests $1200 into an account that pays 3. 5% annual interest compounded weekly. A. Write an equation to represent Janice’s account balance after t years. B. Write and use a system of equations to determine how many years it will take for the account to reach $1500. Round to the nearest year
A) An equation to represent Janice’s account balance after t years is A = 1200[tex](1 + 0.035/52)^{(52t)[/tex]
B) It will take approximately 6 years for the account to reach $1500.
A) To find the account balance after t years, we can use the formula for compound interest:
A = P[tex](1 + r/n)^{(nt)[/tex]
Where:
A = the account balance after t years
P = the principal (initial investment) = $1200
r = the annual interest rate in decimal form = 0.035
n = the number of times the interest is compounded per year (weekly in this case) = 52
t = the number of years
Substituting the given values, we get:
A = 1200[tex](1 + 0.035/52)^{(52t)[/tex]
B) To determine how many years it will take for the account to reach $1500, we can set A equal to 1500 and solve for t:
1500 = 1200[tex](1 + 0.035/52)^{(52t)[/tex]
1.25 = [tex](1.000673)^{52t[/tex]
ln(1.25) = 52t ln(1.000673)
t = ln(1.25)/(52 ln(1.000673))
Using a calculator, we find that it will take approximately 6 years for the account to reach $1500. Note that we rounded to the nearest year as instructed.
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the table below shows the number of cars sold each month for 5 months at two dealerships.cars soldmonthadmiral autoscountywide carsjan49feb1917mar1514apr1010may1715which statements are supported by the data in the table? check all that apply.the mean number of cars sold in a month is the same at both dealerships.the median number of cars sold in a month is the same at both dealerships.the total number of cars sold is the same at both dealerships.the range of the number of cars sold is the same for both dealerships.the data for admiral autos shows greater variability.{12, 6, 24, 20, 44, 15, 29}
The statements that are supported by the data are:
The data for Admiral Autos shows greater variability.
To answer this question, we need to analyze the data in the table. Here are the statements that can be supported by the data:
The mean number of cars sold in a month is the same at both dealerships:
We can calculate the mean number of cars sold for each dealership by adding up the total number of cars sold and dividing by the number of months.
For Admiral Autos, the mean is (49+19+15+10+17)/5 = 22, and for Countywide Cars, the mean is (17+14+10+15+15)/5 = 14.2.
Therefore, this statement is false.
The median number of cars sold in a month is the same at both dealerships:
To find the median, we need to order the data from lowest to highest and find the middle value.
For Admiral Autos, the ordered data is 10, 15, 17, 19, 49, and the median is 17.
For Countywide Cars, the ordered data is 10, 14, 15, 15, 17, and the median is 15.
Therefore, this statement is false.
The total number of cars sold is the same at both dealerships: We can add up the total number of cars sold for each dealership to see if they are equal.
For Admiral Autos, the total is 110, and for Countywide Cars, the total is 71.
Therefore, this statement is false.
The range of the number of cars sold is the same for both dealerships: The range is the difference between the highest and lowest values.
For Admiral Autos, the range is 49-10=39, and for Countywide Cars, the range is 17- 10 = 7.
Therefore, this statement is false.
The data for Admiral Autos shows greater variability: Variability refers to the spread or dispersion of the data.
One way to measure variability is to calculate the standard deviation.
For Admiral Autos, the standard deviation is 15.47, and for Countywide Cars, the standard deviation is 2.6.
Therefore, this statement is true.
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what is the missing length of a rectangular prism where the height and width are both 9 cm and the surface area is 432 cm2?(1 point)
The length of the rectangular prism with height and width both of 9 cm and a surface area of 432 sq cm is 7.5 cm
A rectangular prism is also known as a cuboid and it has 6 faces made of rectangles.
S = 2(lb + bh + hl)
where l is the length
b is the breadth
h is the height
S is the surface area
Given,
h = 9 cm
b = 9 cm
S = 432 sq cm
S = 2 (9l + 9l * 81)
432 = 2 (18l + 81)
216 = 18l + 81
18l = 216 - 81
18l = 135
l = 7.5 cm
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please helpUse substitution to find the indefinite integral. (3x² e 6x² dx (34 ?
The indefinite integral of (3x² * e^(6x²) dx) is (1/4)(e^(6x²)) + C. We can calculate it in the following manner.
To solve the indefinite integral of (3x² * e^(6x²) dx) using substitution, follow these steps:
1. Let u = 6x². Then, du/dx = 12x.
2. Rearrange to find dx: dx = du/(12x).
3. Substitute u and dx into the integral: ∫(3x² * e^u * (du/(12x))).
4. Simplify the integral: (1/4)∫(e^u du).
5. Integrate with respect to u: (1/4)(e^u) + C.
6. Substitute back for x: (1/4)(e^(6x²)) + C.
So, the indefinite integral of (3x² * e^(6x²) dx) is (1/4)(e^(6x²)) + C.
An indefinite integral of a function is the antiderivative of that function, which is a function whose derivative is equal to the original function, up to a constant of integration.
The indefinite integral of a function f(x) is denoted by ∫f(x) dx and is read as "the integral of f(x) with respect to x." When we take the indefinite integral of a function, we do not specify any limits of integration, and hence the result is an expression involving an arbitrary constant, which is determined by any additional information provided.
For example, the indefinite integral of f(x) = 3x^2 + 2x is:
∫f(x) dx = ∫(3x^2 + 2x) dx = x^3 + x^2 + C,
where C is the constant of integration. Note that if we differentiate the expression x^3 + x^2 + C with respect to x, we get 3x^2 + 2x, which is the original function f(x).
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a national survey conducted in 2015 among a simple random sample of 1,507 adults shows that 56% of americans think the civil war is still relevant to american politics and political life. a) calculate a 90% confidence interval for the proportion of americans who think the civil war is still relevant. b) interpret the interval in the context of the question. c) if someone claims that in fact less than 50% of all americans think the civil war is still relevant to american politics and political life, does your confidence interval support his/her claim?
The confidence interval is (0.5287, 0.5913). The civil war is still relevant to American politics and political life is between 0.5287 and 0.5913. The civil war is still relevant to American politics and political life.
A) To calculate the 90% confidence interval, we first need to find the standard error of the proportion:
SE = sqrt[(p*(1-p))/n]
where p = 0.56 (proportion of Americans who think the civil war is still relevant)
n = 1507 (sample size)
SE = sqrt[(0.56*(1-0.56))/1507] = 0.019
Using a standard normal distribution table, the critical value for a 90% confidence level with a two-tailed test is 1.645.
Now, we can calculate the confidence interval:
CI = p ± z*SE
= 0.56 ± 1.645*0.019
= 0.56 ± 0.0313
= (0.5287, 0.5913)
B) We are 90% confident that the true proportion of Americans who think the civil war is still relevant to American politics and political life is between 0.5287 and 0.5913.
C) The confidence interval does not support the claim that less than 50% of all Americans think the civil war is still relevant because the lower bound of the interval (0.5287) is greater than 0.5. In fact, the interval suggests that a majority of Americans (more than 50%) think the civil war is still relevant to American politics and political life.
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suppose a random sample of ten 18-20 year olds is taken. is the use of the binomial distribution appropriate for calculating the probability that exactly six consumed alcoholic beverages? explain.
No, the use of the binomial distribution may not be appropriate for calculating the probability that exactly six 18-20 year olds consumed alcoholic beverages in a random sample of ten.
The binomial distribution assumes that the trials are independent, there are only two possible outcomes (success or failure), and the probability of success remains constant throughout the trials. In the case of consuming alcoholic beverages, the assumption of independence may not hold, as one person's decision to consume alcohol may influence another person's decision. Additionally, the probability of consuming alcohol may not remain constant throughout the sample, as some people may have stronger tendencies or preferences for drinking than others.
A more appropriate distribution for this scenario may be the hypergeometric distribution, which takes into account the finite population size (i.e. the total number of 18-20 year olds from which the sample is drawn) and the varying probabilities of success (i.e. the varying number of individuals in the population who consume alcohol).
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you are given the points belonging to class- 1 and class-2 as follows: class 1 points: (11, 11), (13, 11), (8, 10), (9, 9), (7, 7), (7, 5), (16, 3) class 2 points: (7, 11), (15, 9), (15, 7), (13, 5), (14, 4), (9, 3), (11, 3) what is the label of the sample (14, 3) using the nearest neighbor classifier using l2 distance?
To use the nearest neighbor classifier using l2 distance, we need to calculate the distance between the sample point (14, 3) and all the points in the dataset. The l2 distance is also known as the Euclidean distance and is calculated as the square root of the sum of the squared differences between each coordinate.
The distances between the sample point (14, 3) and each point in the dataset are as follows:
- Distance to class 1 points:
- (11, 11): sqrt((14-11)^2 + (3-11)^2) = 8.6
- (13, 11): sqrt((14-13)^2 + (3-11)^2) = 8.1
- (8, 10): sqrt((14-8)^2 + (3-10)^2) = 8.6
- (9, 9): sqrt((14-9)^2 + (3-9)^2) = 6.7
- (7, 7): sqrt((14-7)^2 + (3-7)^2) = 7.6
- (7, 5): sqrt((14-7)^2 + (3-5)^2) = 8.2
- (16, 3): sqrt((14-16)^2 + (3-3)^2) = 2
- Distance to class 2 points:
- (7, 11): sqrt((14-7)^2 + (3-11)^2) = 10.4
- (15, 9): sqrt((14-15)^2 + (3-9)^2) = 6.1
- (15, 7): sqrt((14-15)^2 + (3-7)^2) = 4.2
- (13, 5): sqrt((14-13)^2 + (3-5)^2) = 2.2
- (14, 4): sqrt((14-14)^2 + (3-4)^2) = 1
- (9, 3): sqrt((14-9)^2 + (3-3)^2) = 5
- (11, 3): sqrt((14-11)^2 + (3-3)^2) = 3
The sample point (14, 3) is closest to the point (14, 4) in class 2, with a distance of 1. Therefore, the label of the sample point (14, 3) using the nearest neighbor classifier using l2 distance is class 2.
Using the nearest neighbor classifier with L2 distance, we can calculate the distance between the given sample (14, 3) and each point from class 1 and class 2. L2 distance is the Euclidean distance and is calculated as the square root of the sum of squared differences between coordinates.
After calculating the L2 distances, we find that the shortest distance is to point (16, 3) from class 1, with a distance of 2 units. Therefore, the label of the sample (14, 3) using the nearest neighbor classifier and L2 distance is class 1.
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Evaluate ssI 2 dV, where W is the wedge in the first octant that is cut from the cylindrical solid v2+22 < 1 by the planes y =X and x = 0. Round to three decimal places'
The value of ssI2 dV ≈ 0.061.
The region W is described as the wedge in the first octant that is cut from the cylindrical solid v2+22 < 1 by the planes y = x and x = 0.
First, we can sketch the region W in the xy-plane:
|
| /
|/_____
0 1
The region is bounded by the curves y = x and y = √[tex](1 - x^2/2)[/tex], which can be found by setting [tex]v^2 + 2^2 = 1[/tex] and solving for v as a function of x. We can set up the integral as follows:
ssI2 dV = ∫∫∫W 2 dV
We can use cylindrical coordinates, where v = r cosθ and 2 = r sinθ, and the limits of integration are 0 ≤ r ≤ √2, 0 ≤ θ ≤ π/4, and r cosθ ≤ x ≤ √[tex](1 - r^2 sin^2\theta)[/tex]. The integrand is 2, so it is constant and can be factored out of the integral:
ssI2 dV = 2 ∫[tex]_0^{(\pi/4)[/tex] ∫[tex]_0^\sqrt2[/tex] ∫[tex]_(r cos\theta)^\sqrt(1 - r^2 sin^2\theta)[/tex] r dz dr dθ
We can integrate with respect to z first:
ssI2 dV = 2 ∫[tex]_0^{(\pi/4)[/tex] ∫[tex]_0^\sqrt2} r(\sqrt(1 - r^2 sin^2\theta) - r cos\theta)[/tex] dr dθ
Next, we can use the substitution u = 1 - [tex]r^2 sin^2\theta[/tex], du = -2r sinθ cosθ dr, to simplify the inner integral:
ssI2 dV = 2 ∫[tex]_0^{(\pi/4)[/tex] ∫[tex]_0^\sqrt 2 (1 - u)^{(1/2)[/tex] du dθ
We can integrate with respect to u using the substitution u = [tex]sin^2[/tex]φ, du = 2 sinφ cosφ dφ:
ssI2 dV = 2 ∫[tex]_0^{(\pi/4)[/tex] ∫[tex]_0^{(\pi/2)} (1 - sin^2[/tex]φ)[tex]^{(1/2)[/tex] sinφ cosφ dφ dθ
The integrand simplifies using the identity [tex]sin^2[/tex]φ + [tex]cos^2[/tex]φ = 1, so sinφ cosφ = 1/2 sin2φ:
ssI2 dV = ∫[tex]_0^{(\pi/4)[/tex] ∫[tex]_0^{(\pi/2)} sin^2[/tex]φ dφ dθ
We can use the identity [tex]sin^2[/tex]φ = (1 - cos2φ)/2 and integrate with respect to φ and θ:
ssI2 dV = ∫[tex]_0^{(\pi/4)[/tex] [φ/2 - 1/4 sin2φ][tex]_0^{(\pi/2)} d\theta[/tex]
= ∫[tex]_0^{(\pi/4)[/tex] (π/4 - 1/4) dθ
= (π/16 - 1/8) π/4
≈ 0.061
Rounding to three decimal places, we get ssI2 dV ≈ 0.061.
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For each of the following linear transformations L mapping R3 into R2, find a matrix A such that L(x)=Ax for every x in R3:
a) L((x1,x2,x3)T)=(x1+x2,0)T
b). L((x1,x2,x3)T)=(x1,x2)T
c). L((x1,x2,x3)T)=(x2-x1, x3-x2)T
The matrices are:
a) A = [1 1 0; 0 0 0]
b) A = [1 0 0; 0 1 0]
c) A = [-1 1 0; 0 -1 1]
a) To find matrix A for L((x1,x2,x3)T)=(x1+x2,0)T, we need to find the coefficients that map the basis vectors of R3 to the corresponding basis vectors of R2. So, we can write:
L(e1) = (1,0)T
L(e2) = (1,0)T
L(e3) = (0,0)T
Then, we can arrange these coefficients as columns of A:
A = [1 1 0; 0 0 0]
b) For L((x1,x2,x3)T)=(x1,x2)T, we can write:
L(e1) = (1,0)T
L(e2) = (0,1)T
L(e3) = (0,0)T
Hence,
A = [1 0 0; 0 1 0]
c) Finally, for L((x1,x2,x3)T)=(x2-x1, x3-x2)T, we have:
L(e1) = (-1,0)T
L(e2) = (1,-1)T
L(e3) = (0,1)T
So,
A = [-1 1 0; 0 -1 1]
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A 500m2 landfill experiences 150 mm of rain each year and 60 percent of the rain is runoff. If the landfill has a 90 percent effective leachate collection system, how much leachate escapes each year?
The requreid 3,000 liters of leachate escape from the landfill each year.
The total amount of rain that falls on the landfill each year is:
500 x 150 = 75,000 liters of water
60 percent of the rain is runoff, so the amount of water that enters the landfill is:
75,000 liters x 0.4 = 30,000 liters
If the landfill has a 90 percent effective leachate collection system, then the amount of leachate that escapes is:
30,000 liters x (1 - 0.9) = 3,000 liters
Therefore, 3,000 liters of leachate escape from the landfill each year.
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What is the y-intercept of y=3t-6
Answer:
-6
Step-by-step explanation:
The y-intercept of a linear equation is the value of y when x (or t in this case) is equal to zero. To find the y-intercept of the equation y=3t-6, we can set t=0 and solve for y:
y = 3(0) - 6
y = -6
Therefore, the y-intercept of the equation y=3t-6 is -6.
Random variables X and Y have joint probability density function
(PDF) fX,Y (x, y) = { 8xy; 0 ? y ? x ? 1,
0; otherwise.}
Let W = X + Y .
(a) Find SW , that is the range of W.
(b) Find the cumulative distribution function (CDF) of W, that is FW (w).
(c) Find the probability density function (PDF) of W, that is fW (w).
(d) Find the expected value of W, that is E[W].
(a) To find the range of W, we can first sketch the region where the PDF is non-zero. This is the triangle bounded by the lines y = 0, x = 1, and y = x. Then, we can find the range of possible values for W by considering the extreme values of X and Y.
When X and Y are both at their minimum values of 0, W = 0.
When X and Y are both at their maximum values of 1, W = 2.
Therefore, the range of W is 0 ? W ? 2.
(b) To find the CDF of W, we can use the definition of the CDF:
FW (w) = P(W ? w) = P(X + Y ? w)
We can integrate the joint PDF over the region where X + Y ? w to find the probability:
FW (w) = ? ? fX,Y (x, y) dy dx
subject to the constraints X + Y ? w and 0 ? y ? x ? 1.
This integral can be split into two parts, depending on whether y is less than or greater than w - x:
FW (w) = ? ? ? ? fX,Y (x, y) dy dx + ? ? ? ? fX,Y (x, y) dy dx
0 ? x ? w, 0 ? y ? w - x 0 ? x ? 1, w - x ? y ? 1
Evaluating these integrals gives:
FW (w) = { 0; w < 0,
w^2/2; 0 ? w ? 1,
2w - w^2/2 - 1/2; 1 ? w ? 2,
1; w > 2. }
(c) To find the PDF of W, we can differentiate the CDF:
fW (w) = d/dw FW (w)
For 0 ? w ? 1, we have:
fW (w) = d/dw (w^2/2) = w
For 1 ? w ? 2, we have:
fW (w) = d/dw (2w - w^2/2 - 1/2) = 2 - w
For other values of w, the PDF is 0. Therefore, the PDF of W is:
fW (w) = { w; 0 ? w ? 1,
2 - w; 1 ? w ? 2,
0; otherwise. }
(d) To find the expected value of W, we can use the definition of the expected value:
E[W] = ? ? w fW (w) dw
We can split this integral into two parts, for the ranges 0 ? w ? 1 and 1 ? w ? 2:
E[W] = ? ? w^2/2 dw + ? ? (2w - w^2/2 - 1/2) dw
0 ? w ? 1 1 ? w ? 2
Evaluating these integrals gives:
E[W] = 7/6.
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Determine whether the following individual events are independent or dependent. Then find the probability of the combined event. Randomly drawing and immediately eating two red pieces of candy in a row from a bag that contains 13 red pieces of candy out of 55 pieces of candy total. Choose the correct answer below. (Round to three decimal places as needed.)A. The individual events are independent. The probability of the combined event is ____B. The individual events are dependent. The probability of the combined event is ____
The individual events are dependent. The probability of the combined event is 4.3%.
The events are dependent because the probability of drawing a red candy on the second draw depends on whether a red candy was drawn on the first draw.
Let R1 be the event that a red candy is drawn on the first draw, and R2 be the event that a red candy is drawn on the second draw. The probability of R1 is 13/55 since there are 13 red candies out of 55 total. However, the probability of R2 given that R1 has occurred is 12/54, since there will be one less red candy and one less candy in total.
Therefore, the probability of both events occurring is:
P(R1 and R2) = P(R1) * P(R2 given R1)
= (13/55) * (12/54)
= 0.043 or 0.0432 (rounded to three decimal places)
Therefore, the probability of drawing and immediately eating two red candies in a row from the bag is 0.043 or 4.3% (rounded to three decimal places).
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The individual events are independent. The probability of the combined event is 0.043. The correct answer is A.
For two events to be independent, the occurrence of one event should not affect the probability of the other event. In this case, randomly drawing and immediately eating two red pieces of candy from a bag containing 13 red pieces out of 55 total pieces.
Since the first candy is immediately eaten and removed from the bag before the second candy is drawn, the probability of drawing a red candy on the second draw is still the same as the probability of drawing a red candy on the first draw.
The probability of drawing a red candy on the first draw is 13/55 since there are 13 red candies out of 55 total candies.
The probability of drawing a red candy on the second draw, assuming the first candy was red and removed, is also 13/55. The events are independent because the probability of the second draw is unaffected by the outcome of the first draw.
To find the probability of the combined event (drawing and immediately eating two red candies in a row), we multiply the probabilities of the individual events:
P(Combined Event) = P(Draw Red Candy on 1st Draw) * P(Draw Red Candy on 2nd Draw)
P(Combined Event) = (13/55) * (13/55)
P(Combined Event) ≈ 0.043 (rounded to three decimal places)
Therefore, the individual events are independent, and the probability of the combined event is approximately 0.043.
If the individual events were dependent, it would mean that the probability of the second event is influenced by the outcome of the first event. However, in this scenario, the events are independent as explained in part A. Therefore, the probability of the combined event is 0.043, and the correct answer is A.
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For f(x) = 5x - 4 and g(x) = (x + 4) / 5, find the following functions.
a. (f o g)(x); b. (g o f)(x); c. (f o g)(5); d. (g o f)(5)
a. (f o g) (x) =
(Simplify your answer.)
For the given function : (f o g)(x) = x, (g o f)(x) = x/5, (f o g)(5) = 6, (g o f)(5) = 1.64.
Now,
a.f(g(x)) = 5((x+4)/5) - 4 = x
b. (g o f)(x) =
g(f(x)) = (5x-4 + 4)/5 = x/5
c. (f o g)(5) =
f(g(5)) = f((5+4)/5) = f(1.8) = 5(1.8) - 4 = 6
d. (g o f)(5) =
g(f(5)) = g(5*5-4) = g(21/5) = (21/5 + 4)/5 = 1.64
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yalianny and gabby are training for softball. during a break in practice they found that one softball weighs 180 grams. the team has a total of 60 soft balls. how many kilograms does the teams soft balls weigh in total?
The solution is, 10.8 kg. does the teams soft balls weigh in total.
Here, we have,
given that,
yalianny and gabby are training for softball. during a break in practice they found that one softball weighs 180 grams. the team has a total of 60 soft balls.
now, we have to find that how many kilograms does the teams soft balls weigh in total.
so, to get the total weight we have to multiply 60 with 180.
as, we have,
one softball weighs 180 grams
and, the team has a total of 60 soft balls.
so total weight = 180 * 60
=10800 gm.
=10.8 kg.
Hence, The solution is, 10.8 kg. does the teams soft balls weigh in total.
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Now calculate BA:
[132] [21] [22
34
d₁1=
d21=
d₁1 d12
d21 d22
d12 = 1
d22 = 1
The matrix for d11 = 5 and d21 = 11
How do we solve the Matrix?For the matrix [1, 2; 3, 4] × [1, -1; 2, 1] = [d11, d12; d21, d22]
d11 = 1×1 + 2×2
= 1 + 4
=5
d21 = 3×1 + 4×2
= 3 + 8
= 11
The above answer is based on the question below;
solve the matrix
[1, 2; 3, 4] × [1, -1; 2, 1] = [d_11, d_12; d_21, d_22]
d_11 = d_12 = 1
d_21 = d_22 = 1
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A composite figure is represented in the image. A six-sided composite figure. A vertical line on the left is labeled 4 meters. The base is labeled 9 meters. There is a small portion from the vertical line that is parallel to the base that is labeled 3 meters. This portion leads to two segments that come to a point, and from that point, there is a height of 3 meters labeled. What is the total area of the figure?
If this portion leads to two segments that come to a point, and from that point, there is a height of 3 meters labeled. The total area is 45 square meters.
How to find the total area?Since the rectangle has a length of 4 meters and a width of 9 meters we need to find the area of rectangle
Area of rectangle = length × width
Area of rectangle = 4 m × 9 m
Area of rectangle = 36 m^2
Since the triangle has a base of 6 meters (9 meters - 3 meters o) and a height of 3 meters we need to find the Area of triangle
Area of triangle = (1/2) × base × height
Area of triangle = (1/2) × 6 m × 3 m
Area of triangle = 9 m^2
Now let find the total area of the composite figure
Total area = Area of rectangle + Area of triangle
Total area = 36 m^2 + 9 m^2
Total area = 45 m^2
Therefore the total area of the figure is 45 square meters.
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Evaluate f(x)=-x-8 when x=4
Answer:
-12
Step-by-step explanation:
Show below in the image.
Answer: -12
Step-by-step explanation:
plug in 4 into the function
instead of it being just f(x)=-x-8 it will be f(4)= -4-8
When you evaluate it, it will add up to -12
on this $5$ by $5$ grid of points, what fraction of the larger square's area is inside the shaded square? express your answer as a common fraction.
The fraction of the larger square's area that is inside the shaded square is 9/16. To find the fraction of the larger square's area that is inside the shaded square on a 5x5 grid of points, follow these steps:
1. Calculate the area of the larger square: Since it's a 5x5 grid, the larger square has side lengths of 4 units (there are 4 spaces between the 5 points). So, the area of the larger square is 4 x 4 = 16 square units.
2. Calculate the side length of the shaded square: The shaded square has one less point on each side, so it has side lengths of 3 units (3 spaces between the 4 points).
3. Calculate the area of the shaded square: The area is 3 x 3 = 9 square units.
4. Find the fraction of the larger square's area that is inside the shaded square: To do this, divide the area of the shaded square by the area of the larger square. So, the fraction is 9/16.
Therefore, the fraction of the larger square's area that is inside the shaded square is 9/16.
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here is net of a right rectangular prism. the area of prism
The surface area of rectangular prism is 48 square units
The surface area of rectangular prism is 2(lw+wh+hl)
From the figure the height is 2 units
width is 2 units
length is 5 units
Plug in these values in formula
Surface area = 2(5×2 + 2×2 + 2×5)
=2(10+4+10)
=2(24)
=48
Hence, the surface area of rectangular prism is 48 square units
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can someone help me?
The distance between two cities on a map is 25 inches. The actual distance between the two cities is 500 miles. How many miles would 35 inches be on the map?
1.75 miles
20 miles
510 miles
700 miles
Answer: The answer is (d) 700 miles. 35 inches on the map represents 700 miles in actual distance
Step-by-step explanation:
This is a Unitary method problem.
If 25 inches on the map represents 500 miles in actual distance, then we can write:
25 inches / 500 miles = 35 inches / x miles
where x is the number of miles represented by 35 inches on the map.
To solve for x, we can cross-multiply and simplify:
25 inches * x miles = 500 miles * 35 inches
25x = 17500
x = 700
Therefore, 35 inches on the map represents 700 miles in actual distance.
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