If the commission rate is %6.5 for the real estate agency, the real estate agency made $20,475 on the house. The agent earned $4,095 in commission.
First, let's determine the commission earned by the real estate agency. To do this, we'll multiply the house price ($315,000) by the commission rate (6.5%).
$315,000 * 6.5% = $20,475
The real estate agency made $20,475 on the house.
Next, let's determine the commission earned by the agent. We'll multiply the commission earned by the real estate agency ($20,475) by the agent's commission rate (20%).
$20,475 * 20% = $4,095
The agent earned $4,095 in commission.
So, the real estate agency made $20,475 on the house, and the agent earned $4,095 in commission.
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Find the exact location of all the relative and absolute extrema of the function. (Order your answers from smallest to largest x.) g(x) = 3x³ - 36x with domain [-4, 4] g has an absolute minimum at (x,y) =
We can see that the absolute minimum occurs at (x, y) = (2, -48).
To find the relative and absolute extrema of the function g(x) = 3x³ - 36x on the domain [-4, 4], we first need to find the critical points. We do this by finding the first derivative, setting it to zero, and solving for x.
g'(x) = d(3x³ - 36x)/dx = 9x² - 36
Setting g'(x) to 0:
0 = 9x² - 36
x² = 4
x = ±2
These are our critical points. To determine if these are minima, maxima, or neither, we use the second derivative test.
g''(x) = d(9x² - 36)/dx = 18x
At x = -2:
g''(-2) = -36 < 0, so it's a relative maximum.
At x = 2:
g''(2) = 36 > 0, so it's a relative minimum.
Now, we need to compare the function values at the critical points and endpoints of the domain to determine the absolute extrema.
g(-4) = 3(-4)³ - 36(-4) = -192
g(-2) = 3(-2)³ - 36(-2) = 48 (relative maximum)
g(2) = 3(2)³ - 36(2) = -48 (relative minimum)
g(4) = 3(4)³ - 36(4) = 192
From the above values, we can see that the absolute minimum occurs at (x, y) = (2, -48).
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Find the indicated real nth root(s) of a. n=3, a=27
The indicated real nth root(s) of a, where n=3 and a=27 is 3.
You need to find the indicated real nth root(s) of a, where n=3 and a=27. In other words, you need to find the real number(s) that, when raised to the power of 3, equal 27.
Here's a step-by-step explanation:
1. Identify the given values: n=3 and a=27.
2. Write the equation: x^n = a, where x is the real nth root you're trying to find.
3. Substitute the given values: x^3 = 27.
4. Solve the equation for x: x = 3, since 3^3 = 27.
Your answer is x = 3, which is the real 3rd root of 27.
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Rewrite the polynomial 2x^2+x^3+-7x+1 in standard form. Show your steps
So the polynomial 2x² + x³ - 7x + 1 in standard form is x³ + 2x² - 7x + 1.
What is the polynomial?To rewrite the polynomial 2x² + x³ - 7x + 1 in standard form, we need to write the terms in descending order of degree.
So we start with the highest degree term:
x³
Then we add the next highest degree term: 2x²
Followed by the next highest degree term: -7x
Finally, we add the constant term: +1
Putting all the terms together, we get:
x³ + 2x² - 7x + 1
So the polynomial 2x² + x³ - 7x + 1 in standard form is x³ + 2x² - 7x + 1.
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9. the square footage and monthly rental of 15 similar one-bedroom apartments yield the linear
regression formula y = 1.3485x + 840.51, where x represents the square footage and y represents
the monthly rental price. round answers to the nearest whole number.
Based on the linear regression formula y = 1.3485x + 840.51, you can calculate the monthly rental price (y) for a one-bedroom apartment by plugging in the square footage (x) of the apartment.
The linear regression formula for the 15 similar one-bedroom apartments is y = 1.3485x + 840.51, where x represents the square footage and y represents the monthly rental price. This means that for every square foot increase in the apartment size, the monthly rental price is predicted to increase by $1.35.
The y-intercept of the formula is $840.51, which represents the predicted monthly rental price for an apartment with 0 square footage (this is not possible in reality, but is used in the formula for mathematical purposes). To get the rental price, round your answer to the nearest whole number. For example, if an apartment has 500 square feet, you'd calculate: y = 1.3485(500) + 840.51 ≈ 1344.76, which rounds to $1,345 as the monthly rental price.
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Choose the system for the graph.
The system of inequalities in the graph is the one in option A.
y ≥ (-2/5)x - 2/5
y ≥ (3/2)*x - 1
Which is the system of inequalities in the graph?Here we can see the graph of a system of inequalities, on the graph we can see two lines.
The first one is a line with a positive slope, it has an y-intercept of -1, the shaded region is above that line, and it is a solid line, so one of the inequalities is:
y ≥ a*x - 1
Where a is positive.
The second line has a negative slope, and we can see that the shaded region is also above the line, so this second inequality is like:
y ≥ line with negative slope.
It is easy to identify the correct option because there is only one with these properties, which is the first option:
y ≥ (-2/5)x - 2/5
y ≥ (3/2)*x - 1
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Create trig ratios for sin, cos, and tan:
You can look the image.
It is very clear.
Answer:
[tex]\sin (Z)=\sf\dfrac{9}{15}[/tex] [tex]\cos (Z)=\sf\dfrac{12}{15}[/tex] [tex]\tan(Z)=\sf \dfrac{9}{12}[/tex]
Step-by-step explanation:
To create trigonometric ratios for angle Z in the given right triangle XYZ, we can use the trigonometric ratios.
[tex]\boxed{\begin{minipage}{9.4 cm}\underline{Trigonometric ratios} \\\\$\sf \sin(\theta)=\dfrac{O}{H}\quad\cos(\theta)=\dfrac{A}{H}\quad\tan(\theta)=\dfrac{O}{A}$\\\\where:\\ \phantom{ww}$\bullet$ $\theta$ is the angle. \\ \phantom{ww}$\bullet$ $\sf O$ is the side opposite the angle. \\\phantom{ww}$\bullet$ $\sf A$ is the side adjacent the angle. \\\phantom{ww}$\bullet$ $\sf H$ is the hypotenuse (the side opposite the right angle). \\\end{minipage}}[/tex]
From inspection of the right triangle XYZ:
θ = ZO = XY = 9A = YZ = 12H = XZ = 15Substitute these values into the three ratios to create the trigonometric ratios for angle Z:
[tex]\sin (Z)=\sf \dfrac{O}{H}=\dfrac{9}{15}[/tex]
[tex]\cos (Z)=\sf \dfrac{A}{H}=\dfrac{12}{15}[/tex]
[tex]\tan(Z)=\sf \dfrac{O}{A}=\dfrac{9}{12}[/tex]
What is the area that has 160ft tall 100 feet wide and another area that has 60ft long and 40ft wide , add both shapes together
The area for the first shape is 16,000 square feet, the area for the second shape is 2,400 square feet. The total area of both shapes added together is 18,400 square feet.
To find the area of the first shape, which is a rectangle that is 160 feet tall and 100 feet wide, we can use the formula:
Area = length x width
So, for the first shape, the area is:
Area = 160 ft x 100 ft
Area = 16,000 square feet
To find the area of the second shape, which is a rectangle that is 60 feet long and 40 feet wide, we can use the same formula:
Area = length x width
So, for the second shape, the area is:
Area = 60 ft x 40 ft
Area = 2,400 square feet
To find the total area of both shapes added together, we simply add the two areas:
Total Area = 16,000 square feet + 2,400 square feet
Total Area = 18,400 square feet
Therefore, the total area of both shapes added together is 18,400 square feet.
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Grady is comparing three investment accounts offering different rates.
Account A: APR of 4. 95% compounding monthly
Account B: APR of 4. 85% compounding quarterly
Account C: APR of 4. 75% compounding daily Which account will give Grady at least a 5% annual yield? (4 points)
Group of answer choices
Account A
Account B
Account C
Account B and Account C
The account that will give Grady at least a 5% annual yield is Account C
Why account C will give Grady at least a 5% annual yield?We can use the formula for compound interest to compare the three investment accounts and find the one that will give Grady at least a 5% annual yield:
FV = PV × (1 + r/n)^(n*t)
where FV is the future value, PV is the present value, r is the annual interest rate as a decimal, n is the number of times the interest is compounded per year, and t is the number of years.
For Account A:
APR = 4.95%, compounded monthly
r = 0.0495
n = 12
t = 1
FV = PV × (1 + r/n)^(nt)
FV = PV × (1 + 0.0495/12)^(121)
FV = PV × 1.050452
To get at least a 5% annual yield, we need FV/PV ≥ 1.05
1.050452/PV ≥ 1.05
PV ≤ 1.000497
Therefore, Account A will not give Grady at least a 5% annual yield.
For Account B:
APR = 4.85%, compounded quarterly
r = 0.0485
n = 4
t = 1
FV = PV × (1 + r/n)^(nt)
FV = PV × (1 + 0.0485/4)^(41)
FV = PV × 1.049375
To get at least a 5% annual yield, we need FV/PV ≥ 1.05
1.049375/PV ≥ 1.05
PV ≤ 1.000351
Therefore, Account B will not give Grady at least a 5% annual yield.
For Account C:
APR = 4.75%, compounded daily
r = 0.0475
n = 365
t = 1
FV = PV × (1 + r/n)^(nt)
FV = PV × (1 + 0.0475/365)^(3651)
FV = PV × 1.049038
To get at least a 5% annual yield, we need FV/PV ≥ 1.05
1.049038/PV ≥ 1.05
PV ≤ 1.000525
Therefore, Account C will give Grady at least a 5% annual yield.
Therefore, the account that will give Grady at least a 5% annual yield is Account C.
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The table shows the number of cups of flour, f, that a bakery needs for the number of pound cakes that they make, p.
Pound Cakes, p 3 6 9 14
Cups of Flour, f 8. 25 16. 5 24. 75 ?
Part A
Which equation relates the number of cups of flour to the number of pound cakes that the bakery makes?
f = 2. 75p
f = 0. 343p
f = 2. 75p + 8. 25
f = 0. 343p + 16. 5
Part B
How many cups of flour are needed for 14 cakes?
4. 802
21. 302
38. 5
46. 75
A) The equation relates the number of cups of flour to the number of pound cakes that the bakery makes is f = 2.75p
B) Cups of flour are needed for 14 cakes is 38.5
A) The number of cups of flour, f, that a bakery needs for the number of pound cakes that they make, p is directly proportional to each other which can be written in form ,
f/p = 8.25/3
f = (8.25/3)×p
f = 2.75 p
The equation forms is f = 2.75p
B) Cups of flour are needed for 14 cakes
Here p = 14
by putting the value in the equation we get ,
f = 2.75(14)
f = 38.5
hence , cups of flour are needed for 14 cakes is 38.5
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Of 100 random students surveyed, 42 own a dog, 34 own a cat, 15 own a dog and a cat, and 9 own neither a dog nor a cat. Based upon the results, how many of the next 20 students surveyed would you expect to own a dog and a cat?
In the next 20 students surveyed, you would expect 5 to own a dog and a cat
How many of the next 20 students surveyed would you expect to own a dog and a cat?From the question, we have the following parameters that can be used in our computation:
Dog = 42
Cat = 34
Dog and cat = 15
Neither = 9
This means that
P(Dog and cat) = 15/100
When evaluated, we have
P(Dog and cat) = 5/20
So, when the next 20 students surveyed, we have
Dog and cat = 5/20 * 20
Evaluate
Dog and cat = 5
Hence, the number of dogs and cats is 5
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Lorena es una estudiante que utiliza una red social cada 8 días. Su amigo Luis accede cada 6 días y su hermana Alexa ingresa cada 10 días. Si ellos coincidieron en su visita a esta red social el día 24 de julio
The next time they will coincide is on November 21. when Lorena uses a social network every 8 days, Luis logs in every 6 days, and his sister and Alexa log in every 10 days.
To find the time when all three coincided, we need to find the least common multiple (LCM) of 6, 8, and 10. The LCM of 6, 8, and 10 is given as,
6 8 10 | 2
3 4 5 | 3
1 4 5 | 4
1 1 5 | 5
1 1 1
LCM = 2 × 3 × 4 × 5 = 120
if they coincided on July 24, To find the time when all three coincided we need to add 120 days to July 24 to find the next time they will coincide. if we add 120 days to July 24 we will get the result as November 21.
Therefore, The next time they will coincide is on November 21.
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The question is,
Lorena is a student who uses a social network every 8 days. His friend Luis logs in every 6 days and his sister Alexa logs in every 10 days. If they coincided with their visit to this social network on July 24 when will they coincide next time?
400 people attended a concert 10% of the people came from Scotland 25% of the people came form Wales How many more pepole came from Wales than Scotland
If 400 people attended a concert 10 percent of the people came from Scotland 25 percent of the people came form Wales, there were 60 more people from Wales than from Scotland.
To find out how many more people came from Wales than Scotland at a concert with 400 attendees, we'll first calculate the number of people from each region.
1. Determine the number of people from Scotland:
Since 10% of the people came from Scotland, we'll multiply the total attendees (400) by 10% (0.10).
400 * 0.10 = 40 people from Scotland.
2. Determine the number of people from Wales:
Since 25% of the people came from Wales, we'll multiply the total attendees (400) by 25% (0.25).
400 * 0.25 = 100 people from Wales.
3. Calculate the difference between the number of attendees from Wales and Scotland:
Subtract the number of people from Scotland (40) from the number of people from Wales (100).
100 - 40 = 60 more people from Wales than Scotland.
In conclusion, at the concert with 400 attendees, there were 60 more people from Wales than from Scotland.
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How do you do this problem?
Knowing that tan(x) = 3/5 and using a trigonometric identity, we will get that:
tan(2x) = 1.875
How to find the tangent of 2x?There is a trigonometric identity we can use for this, we know that:
[tex]tan(2x) = \frac{2tan(x)}{1 - tan^2(x)}[/tex]
So we only need to knos tan(x), which we already know that is equal to 3/5, then we can replace it in the formula above to get:
[tex]tan(2x) = \frac{2*3/5}{1 - (3/5)^2}\\\\tan(2x) = \frac{6/5}{1 - 9/25} \\tan(2x) = 1.875[/tex]
That is the value of the tangent of 2x.
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Its linear equation world problems please help asap also do them step by step i need the equation also
the three angles of a triangle are
(2x +5) ⃘
(2x +5) ⃘
,
(x −10) ⃘ and 65 ⃘
(x −10) ⃘ and 65 ⃘
calculate the size of each angle.
determine three consecutive odd numbers whose sum is 33.
determine three consecutive even numbers whose sum is 102.
The size of three angles of the triangle are 55 degrees, 55 degrees, and 15 degrees. The three consecutive odd numbers are 9, 11, and 13 and three consecutive even numbers are 32, 34, and 36.
1.To find the size of each angle in the triangle, we know that the sum of all angles in a triangle is 180 degrees. So we can set up an equation:
(2x + 5) + (2x + 5) + (x - 10) + 65 = 180
Simplifying and solving for x, we get:
5x + 55 = 180
5x = 125
x = 25
Now we can substitute x back into the expressions for each angle and simplify:
2x + 5 = 55 degrees
2x + 5 = 55 degrees
x - 10 = 15 degrees
Therefore, the three angles of the triangle are 55 degrees, 55 degrees, and 15 degrees.
2. Let's call the first odd number x. Then the next two consecutive odd numbers would be x + 2 and x + 4. We know that the sum of these three numbers is 33, so we can set up an equation:
x + (x + 2) + (x + 4) = 33
Simplifying and solving for x, we get:
3x + 6 = 33
3x = 27
x = 9
Therefore, the three consecutive odd numbers are 9, 11, and 13.
3. Let's call the first even number x. Then the next two consecutive even numbers would be x + 2 and x + 4. We know that the sum of these three numbers is 102, so we can set up an equation:
x + (x + 2) + (x + 4) = 102
Simplifying and solving for x, we get:
3x + 6 = 102
3x = 96
x = 32
Therefore, the three consecutive even numbers are 32, 34, and 36.
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A manufacturer measures the number of cell phones sold using the binomial 0. 015c+2. 81. She also measures the wholesale price on these phones using a binomial 0. 011c+3. 52. Calculate her revenue if she sells 100,000 cell phones. Revenue = (numberofcellphones)(wholesaleprice) = (0. 015c+2. 81)(0. 011c+3. 52)
When the manufacturer sells 100,000 cell phones, her revenue will be approximately $1,657,993.39.
To find the revenue for selling 100,000 cell phones, we will first evaluate both binomials for the given number of cell phones (c = 100,000) and then multiply them together.
Step 1: Evaluate the first binomial (number of cell phones sold) for c = 100,000:
0.015c + 2.81 = 0.015(100,000) + 2.81 = 1,500 + 2.81 = 1,502.81
Step 2: Evaluate the second binomial (wholesale price) for c = 100,000:
0.011c + 3.52 = 0.011(100,000) + 3.52 = 1,100 + 3.52 = 1,103.52
Step 3: Calculate the revenue by multiplying the results of the two binomials:
Revenue = (1,502.81)(1,103.52) = 1,657,993.3912
So, when the manufacturer sells 100,000 cell phones, her revenue will be approximately $1,657,993.39. This calculation is based on the binomial expressions provided for the number of cell phones sold (0.015c+2.81) and the wholesale price (0.011c+3.52).
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if loga 3=p and log 5=q then loga 45 is equivalent to which of the following:
QP^2, Q+2P, 5Q+3P, 3(Q+P), or 3(Q+2P)
the answer to log 45 will be Q + 2P.
What is Logarithmic functions?
A logarithmic function is a type of function that can be expressed in the form: f(x) = a log(bx + c) + d where a, b, c, and d are constants and x is the independent variable. The base of the logarithm is usually assumed to be 10, but can be any other positive number.
Logarithmic functions are used in a variety of applications, including finance, physics, and engineering. In finance, logarithmic functions are used to calculate compound interest. In physics, logarithmic functions are used to describe exponential decay and growth. In engineering, logarithmic functions are used to model the behavior of electrical circuits and other systems.
log a (45) = log a (9) + log a (5)
Next, we can use the fact that log a (x^n) = n log a (x) to simplify the first term:
log a (9) = log a (3²) = 2 log a (3) = 2p
Finally, we can substitute the given values for p and q and simplify the expression:
log a (45) = 2p + q = 2 log a (3) + log a (5) = log a (3²) + log a (5) = log a (3² * 5)
Therefore, we have:
log a (45) = log a (3² * 5)
Now, using the property that log a (x * y) = log a (x) + log a (y), we can simplify this expression even further:
log a (45) = log a (3²) + log a (5) = 2 log a (3) + log a (5) = Q + 2P
Therefore, log a (45) is equivalent to Q + 2P.
Therefore, the answer is Q + 2P.
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a car drives 10.5 miles in 1/6 hour. what is its speed in miles per hour
Answer:
(Credit to guy/girl above) 63 miles 10 1/2 x 6 is 63.
Step-by-step explanation:
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Debra has these snacks from a birthday party in a bag.
4 bags of chips
5 fruit snacks
6 chocolate bars
3 pieces of bubble gum
Debra will randomly choose one snack from the bag. Then she will put it back and randomly choose another snack. What is the probability that she will choose a chocolate bar and then a piece of gum?
A. 1/2
B. 1/3
C. 1/9
D. 1/18
Your answer is D. 1/18 is the probability that she will choose a chocolate bar and then a piece of gum
First, let's determine the total number of snacks in the bag:
4 bags of chips + 5 fruit snacks + 6 chocolate bars + 3 pieces of bubble gum = 18 snacks
Next, let's find the probability of choosing a chocolate bar:
There are 6 chocolate bars and 18 snacks total, so the probability is 6/18, which simplifies to 1/3.
Since she puts the chocolate bar back, the total number of snacks remains the same. Now, let's find the probability of choosing a piece of gum:
There are 3 pieces of gum and 18 snacks total, so the probability is 3/18, which simplifies to 1/6.
Finally, to find the probability of both events happening, multiply the probabilities together:
(1/3) * (1/6) = 1/18
So, the probability that Debra will choose a chocolate bar and then a piece of gum is 1/18. Your answer is D. 1/18.
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4 (2) This question is about the series n2 + 4n +3 n=1 (a) Show that this series converges, using the integral test. (Hint: Partial fraction decomposition.) (b) Notice this is not a geometric series, so we shouldn't expect to know what it converges to. But use the decomposition 4 into the difference n2 4n of two sums. (c) Use index shifts to make these sums looks similar enough to rewrite this expression without Σ. 4 (d) Take the limit as B+ 0 to find n2 + 4n +3 B from part (a) to break m2 + An + 3 n=1 n=1 (2) 10
(a) Given: f(x) = x^2 + 4x + 3.
The partial fraction decomposition of f(x) is:
f(x) = (x+1)(x+3)
Now, we need to find the integral of this function from 1 to infinity:
∫[1,∞] (x+1)(x+3) dx
Since the integral converges, we can conclude that the series also converges.
(b) This series is not geometric, so we don't know what it converges to. However, we can decompose the given series as the difference of two sums:
Σ(n^2 + 4n + 3) = Σ(n^2) - Σ(4n)
(c) We can use index shifts to make these sums look similar enough to rewrite the expression without Σ:
Σ(n^2) - Σ(4n) = Σ(n^2 - 4n)
(d) To find the limit as B approaches 0, we can evaluate the limit of the expression n^2 + 4n + 3:
lim(B→0) (n^2 + 4n + 3) = n^2 + 4n + 3
So, the limit of the series is n^2 + 4n + 3.
Given the following joint PDF function of two continuous random variables x and y :
[tex]f(x,y) = \left \{ {{1/4x^2 +1/4y^2 +1/6xy} \atop {0}} \right. 0\leq x\leq 1 ; 0\leq y\leq 2[/tex]\
a) find the distribution function F(x,y)
b) find marginal PDF for f(x) and f(y)
c) find P ( 0[tex]0\leq x\leq 1/2 , 0\leq y\leq 1/2[/tex]
d) if u= 2x-y and v = -x+y find the dense joint density function of u and v
A. The distribution function F(x,y) is ¹¹/₁₈ + ¹/₁₂ x² - ¹/₁₈ y² + ¹/₁₂ xy
B. The marginal PDF of x is ¹/₂x + ¹/₆ + ¹/₁₂x² for 0≤x≤1 and for y is /₂y + ¹/₆ + ¹/₁₂y² for 0≤y≤2
C. P(0≤x≤1/2, 0≤y≤1/2) is ¹/₃₂ + ¹/₉₆ x² for 0≤x≤1/2
D. The joint PDF of u=2x-y and v=-x+y is f(u,v) = (1/27)(2u^2+2v^2-2uv)
How did we get these values?a) To find the distribution function F(x,y), integrate the joint PDF over the appropriate limits.
F(x,y) = ∫∫f(u,v)dudv
The limits of integration are not specified, so, determine them from the limits of the variables x and y.
So,
F(x,y) = ∫∫f(u,v)dudv
= ∫∫f(x+y,x-y)dudv (substituting u = x+y and v = x-y)
= ∫∫(¹/₄(u²+v²)+¹/₆(u²-v²))dudv (substituting x and y back in terms of u and v)
The limits of integration for u and v can be found by solving for u and v in terms of x and y as follows:
u = x+y
v = x-y
x = (u+v)/2
y = (u-v)/2
0 ≤ x ≤ 1; 0 ≤ y ≤ 2
implies
0 ≤ (u+v)/2 ≤ 1; 0 ≤ (u-v)/2 ≤ 2
Solving the above inequalities gives the following limits:
0 ≤ u ≤ 2; -u ≤ v ≤ u;
Thus,
F(x,y) = ∫∫(¹/₄(u²+v²)+¹/₆(u²-v²))dudv
= ∫²₀ ∫ᵘ_(-u) (1/4(u²+v²)+¹/₆(u²-v²))dvdu
= ¹¹/₁₈ + ¹/₁₂ x² - ¹/₁₈ y² + ¹/₁₂ xy
b) To find the marginal PDF of x, integrate the joint PDF over all possible values of y:
f(x) = ∫f(x,y)dy
So,
f(x) = ∫²₀ (¹/₄x + ¹/₄y²/x + ¹/₆y) dy
= ¹/₂x + ¹/₆ + ¹/₁₂x² for 0≤x≤1
In the same way, find the marginal PDF of y, by integrating the joint PDF over all possible values of x:
f(y) = ∫f(x,y)dx
So,
f(y) = ∫¹₀ (¹/₄x²/y + ¹/₄y + ¹/₆xy) dx
= ¹/₂y + ¹/₆ + ¹/₁₂y² for 0≤y≤2
c) To find P(0≤x≤1/2, 0≤y≤1/2), integrate the joint PDF over the appropriate limits:
P(0≤x≤1/2, 0≤y≤1/2) = ∫∫f(x,y)dxdy
So,
P(0≤x≤1/2, 0≤y≤1/2) = ∫¹₀ ∫^(1/2)_0 (¹/₄x² + ¹/₄y²/x + ¹/₆xy) dydx
= ¹/₃₂ + ¹/₉₆ x² for 0≤x≤1/2
d) To find the joint PDF of u=2x-y and v=-x+y, express x and y in terms of u and v and then apply transformation formula.
From the given equations, solve for x and y in terms of u and v as follows:
x = (u+v)/3
y = (v-u)/3
Now, find the Jacobian of the transformation:
J = ∂(x,y)/∂(u,v) =
| ∂x/∂u ∂x/∂v |
| ∂y/∂u ∂y/∂v |
=
| 1/3 1/3 |
| -1/3 1/3 |
So, |J| = 2/9
Using the transformation formula for joint PDFs:
f(u,v) = f(x(u,v), y(u,v)) |J|
Substituting x and y in terms of u and v:
f(u,v) = f((u+v)/3, (v-u)/3) (2/9)
Substituting the given joint PDF for f(x,y), we get:
f(u,v) = (¼((u+v)/3)² + ¼((v-u)/3)² + ⅙((u+v)/3)((v-u)/3))(2/9)
Simplify:
f(u,v) = (1/27)(2u²+2v²-2uv)
So, the joint PDF of u=2x-y and v=-x+y is:
f(u,v) = (1/27)(2u²+2v²-2uv)
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what fraction is less greater than 1/2 and less than 4/5
A fraction that is greater than 1/2 and less than 4/5, we need to consider fractions between these two values. A fraction that is greater than 1/2 and less than 4/5 is 6/10.
Compare the two given fractions by finding a common denominator.
The lowest common denominator for 1/2 and 4/5 is 10.
Convert both fractions to equivalent fractions with a denominator of 10.
1/2 = 5/10
4/5 = 8/10
Identify a fraction between 5/10 and 8/10.
One possible fraction between these two is 6/10.
A fraction that is greater than 1/2 and less than 4/5 is 6/10.
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A ring-shaped region is shown below.
Its inner radius is 9m, and its outer radius is 13m.
Find the area of the shaded region.
Use 3.14 for Pie. Do not round your answer.
The area of the ring-shaped region with radii of 9m and 13m is approximately 276.32 square meters.
What is Area?
The area is the region defined by an object's shape. The area of a shape is the space covered by a figure or any two-dimensional geometric shape in a plane.
What is Perimeter?
The perimeter of a shape is defined as the total distance surrounding the shape. It is the length of any two-dimensional geometric shape's outline or boundary.
According to the given information:
The given shape is a two concentric circles with radii of 9m and 13m, we can calculate the area of this region using the formula for the area of a circle:
Area of shaded region = Area of outer circle - Area of inner circle
The area of a circle is given by the formula A = πr^2, where r is the radius of the circle.
Area of inner circle = π(9)^2 = 81π
Area of outer circle = π(13)^2 = 169π
Area of shaded region = 169π - 81π = 88π
Using the value of π = 3.14, we get:
Area of shaded region = 88π = 88(3.14) = 276.32 square meters (rounded to two decimal places)
Therefore, the area of the ring shaped region with radii of 9m and 13m is approximately 276.32 square meters.
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pyramid A and pyramid B are similar. find the surface area of pyramid B to the nearest hundredth.
The surface area of pyramid B to the nearest hundredth is 58.67 cm²
What are similar figures?Similar figures are two figures having the same shape. The ratio of the corresponding sides of similar shapes are equal.
The scale ratio of the height of the pyramid A to B is
9/6 = 3/2
Area factor = (3/2)² = 9/4
9/4 = 132/x
9x = 132×4
9x = 528
divide both sides by 9
x = 528/9
x = 58.67cm²
Therefore the surface area of pyramid B is 58.67cm².
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Gabby had 578 yards of fabric. she used 3215 yards of fabric. estimate the amount of fabric gabby has left. 1 yard 2 yards 3 yards 4 yards
Gabby does not have any fabric left, as she used more fabric than she had to start with.
How much fabric does Gabby have left after using 3215 yards, and what is the estimate?
Based on the information given, Gabby started with 578 yards of fabric and used 3215 yards of fabric. To estimate the amount of fabric Gabby has left, we need to subtract the amount of fabric used from the starting amount of fabric:
578 yards - 3215 yards = -2637 yards
Since the result is a negative number, it doesn't make sense in this context. It's possible that there was a mistake in the numbers given, or Gabby used more fabric than she had to start with.
Without further information or clarification, we cannot estimate the amount of fabric Gabby has left.
To estimate the amount of fabric Gabby has left, we can subtract the amount of fabric she used from the amount of fabric she had initially.
So, to find the estimate for the amount of fabric Gabby has left, we can perform the following calculation:
Estimate for the amount of fabric Gabby has left = 578 yards (initial amount) - 3215 yards (amount used)
Estimate for the amount of fabric Gabby has left = -2637 yards
However, the result is negative, which means that Gabby doesn't have any fabric left, and she needs to purchase an additional 2637 yards to make up for the shortfall.
Therefore, the estimate for the amount of fabric Gabby has left is 0 yards (she needs to purchase more fabric to continue her work).
What is the value of X in circle O below?
Need help on all step by step preferably
Answer:
a. x = 68
b. x = 55
c. x = 18
Step-by-step explanation:
Formula
Inscribed angle = Central angle/2
a.
x = 136/2
x = 68
b.
x = ( 360 - 150 - 100 )/2
= 110/2
x = 55
c.
x = 18
Which number line shows the sum of -8, 4, and -2?
o
a +++++
-15
10
-5
0
5
10
15
b the
- 15
- 10
-5
0
15
10
15
o
chef
15
-10
5
0
5
10
15
o
d
-15
-10
0
5
110
15
Add the given numbers: -8 + 4 + (-2) = -6. So, the sum of -8, 4, and -2 is -6.
Which number line shows the sum of -8, 4, and -2?To represent -6 on a number line, we need to find its position relative to zero. Since -6 is negative, it will be located to the left of zero. We count 6 units to the left of zero on the number line to represent -6. Therefore, the number line that shows the sum of -8, 4, and -2 is:
o----+----+----+----+----+----+----+----+----+----o
-15 -10 -5 0 5 10 15 20 25 30
-6
So, the complete answer is:
The sum of -8, 4, and -2 is -6.
To represent -6 on a number line, locate 6 units to the left of zero.
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Using technology, calculate the weighted mean of the RORs for each portfolio. Based on the results, which list shows a comparison of the overall performance of the portfolios, from best to worst?
The ranking from worst to best is Portfolio 3, Portfolio 2, and Portfolio 1. So, correct option is B.
To calculate the weighted mean of the RORs for each portfolio, we need to first multiply each ROR by the corresponding portfolio value and then sum the products for each portfolio. We then divide the total by the sum of the portfolio values.
The weighted mean for Portfolio 1 = [(10.4% x $700) + (-29.7% x $12,000) + (37.2% x $600) + (7.5% x $4,400) + (6.3% x $250)] / ($700 + $12,000 + $600 + $4,400 + $250) = -16.8%
Similarly, the weighted mean for Portfolio 2 = 3.8% and for Portfolio 3 = 11.2%.
Based on the results, the list that shows a comparison of the overall performance of the portfolios from worst to best is option b) Portfolio 3, Portfolio 2, Portfolio 1. Portfolio 3 has the highest weighted mean return of 11.2%, followed by Portfolio 2 with a return of 3.8%, and Portfolio 1 has the lowest weighted mean return of -16.8%.
Therefore, correct option is B.
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Complete question is:
ROR Portfolio 1 Portfolio 2 Portfolio 3
10.4% $700 $6,000 $3,500
-29.7% $12,000 $9,000 $5,500
37.2% $600 $4,500 $5,750
7.5% $4,400 $2,000 $1,500
6.3% $250 $1,100 $4,500
Calculate the weighted mean of the RORs for each portfolio. Based on the results, which list shows a comparison of the overall performance of the portfolios, from worst to best?
a) Portfolio 3, Portfolio 1, Portfolio 2
b) Portfolio 3, Portfolio 2, Portfolio 1
c) Portfolio 1, Portfolio 2, Portfolio 3
d) Portfolio 1, Portfolio 3, Portfolio 2
Sam has a box shaped like a rectangular prism. It measures 1/6 inches in height, 1/3 in. Wide and 1/2 in. Long. What is the volume of the box? Leave your answer as an improper fraction
A rectangular prism is a three-dimensional shape with six faces, all of which are rectangles. The volume of a rectangular prism can be found by multiplying the length, width, and height of the prism.
In this case, Sam's box has a height of 1/6 inches, a width of 1/3 inches, and a length of 1/2 inches. To find the volume, we need to multiply these three dimensions:
(1/6) x (1/3) x (1/2) = 1/36 cubic inches.
Therefore, the volume of Sam's box is 1/36 cubic inches, which is an improper fraction because the numerator is greater than the denominator.
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The regular polygon has the following measures.
a = 2√3 yd
s = 4 yd
Segment a is drawn from the center of the polygon
perpendicular to one of its sides.
What is the vocabulary term for segment a?
What is the area of the polygon?
Round to the nearest tenth and include correct units.
Show all your work.
The vocabulary for the segment a is the apothem
The area of the polygon is about 41.6 yd²
What is the area of a regular figure?The area of a regular figure is the extent of the planer space the figure occupies.
The length of each side of the regular polygon, s = 4 yd
The length of the segment a = 2·√3
The vocabulary term for the segment a drawn from from the center of the polygon and perpendicular to one of its sides is the apothem
Therefore, the vocabulary term for segment a is the apothem
The polygon is a hexagon.
The area of a hexagon is; A = ((3·√3)/2) × s²
Therefore, the area of the polygon is; A = ((3·√3)/2) × (4)² = 24·√3 ≈ 41.6
The area of the polygon is about 41.6 yd²
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Miles is buying a new rain barrel to help with his watering problem. the rain barrel is shaped like a right circular cylinder. what is the volume of the rain barrel if it is 27 inches tall and has a diameter of 22 inches. use 3.14 for pi.
The volume of the rain barrel is approximately 10,256.58 cubic inches.
To get the volume of the rain barrel, which is shaped like a right circular cylinder, you need to use the formula for the volume of a cylinder: V = πr²h. Here, V represents the volume, r is the radius, and h is the height of the cylinder.
The given diameter of the rain barrel is 22 inches. To find the radius (r), you need to divide the diameter by 2:
r = 22 / 2 = 11 inches.
The height (h) of the rain barrel is given as 27 inches.
Now, you can plug these values into the formula and use 3.14 for pi (π):
V = πr²h
V = 3.14 * (11²) * 27
V = 3.14 * (121) * 27
V = 3.14 * 3267
V ≈ 10,256.58 cubic inches
So, the volume of the rain barrel is approximately 10,256.58 cubic inches.
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