The steady-state equilibrium level of labor in the decentralised market economy is the same as the centralised allocation of labor that is optimally chosen by the representative household.
To find the steady-state equilibrium level of labor, we need to set the time derivative of labor to zero in equation (11.18):
dK/dt = 0 = RK + W(1 - * ) - C - 8*K
Solving for * , we get:
W*(1 - * ) = C + (R - 8)*K
Dividing both sides by W and rearranging, we get:
1 - * = (C/W) + [(R/W) - (8/W)]*K
Now, we substitute the expression for consumption from equation (11.17):
C = e-pt[In(Ct) + Bln(1 - * )]dt
Taking the derivative of the above equation with respect to * , we get:
dC/d* = -B*e-pt/(1 - * )
Substituting this expression for C in the equation for * , we get:
1 - * = [e-pt/W]*[-B/(1 - * ) + (R/W) - (8/W)]*K
Multiplying both sides by (1 - * ) and rearranging, we get:
(1 + B/W)* * = 1 + (R/W) - (8/W)
Simplifying, we get:
= [1/(1 + B/W)]*[1 + (R/W) - (8/W)]
Substituting the expression for a from equation (11.16), we get:
= 1/[1 + B/(1 - a)]*[1 + (R/W) - (8/W)]
Simplifying further, we get:
= 1/[1 + B/(1 - a)]*[1 - a + a(R/W) - a(8/W)]
= [1 - a + a(R/W) - a(8/W)]/[1 + B - Ba]
Substituting the values of a, R, and W from equations (10.25), (10.24), and (11.6), respectively, we get:
= 1/[1 + B/(1 + p)]*[1 - (1 + p) + (1 + p)(d + n)/w - (1 + p)(1 - d - n)/w]
Simplifying further, we get:
= 1/[1 + B/(1 + p)]*[p/(1 + p) + (d + n - (1 - d - n)(1 + p))/(1 + p)]
= 1/[1 + B/(1 + p)]*[p/(1 + p) + (2d + n - 1 - np)/(1 + p)]
= [p + (2d + n - 1 - np)*[1 + p/(B + 1)]]/[1 + p(B + 1)/(B + 1)]
Simplifying the above expression, we get:
= [p + (2d + n - 1 - np)*(B + 2)/(B + 1)]/[Bp/(B + 1) + p + 1]
This is the same expression as equation (10.26) in the centralised economy of the Ramsey model. Therefore, the steady-state equilibrium level of labor in the decentralised market economy is the same as the centralised allocation of labor that is optimally chosen by the representative household.
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3. Using the image below, which of the labeled points is not on the x-y plane?
B
8 7 6 5 4 3 2
sz
3
2
-2
A
D
1 2 3
}}
4 5 6 7
In order to identify labeled points that do not lie on the x-y plane, several methods can be utilized.
How to identify the pointsThe software tools MATLAB, Python's Matplotlib or Excel can be used to create a 3D plot of the labeled points. Through this approach, non-planar points become easily recognizable. It is possible to label points with different colors or symbols, based on their classification which would provide an added advantage in noticing any types of pattern or trends.
An alternate route involves having access to equation(s) of the fitted plane (e.g., by means of linear regression). Herein lies the ability to measure the distance between each point and the plane using the point-to-plane distance formula. Based upon fitting, if any point has substantial distance from the plane then it is likely to be situated off the plane.
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a tank contains 1000 l of brine with 10kg of dissolved salt. brine that contains 0.01 kg of salt per liter of water enters the tank at a rate of 15 l/min. the solution is kept thoroughly mixed and drains from the tank at the same rate.(4pts) a) how much salt is in the tank after t minutes? b)how much salt is in the tank after 30 minutes
a. There are 10 kg salt in the tank after t minutes
b. After 30 minutes, the amount of salt in the tank is still 10 kg.
a) After t minutes, the amount of salt in the tank can be found by the formula:
Amount of salt = initial amount of salt + (rate of salt in - rate of salt out) x time
The initial amount of salt is 10 kg, and the rate of salt in is 0.01 kg/L x 15 L/min = 0.15 kg/min. The rate of salt out is also 0.01 kg/L x 15 L/min = 0.15 kg/min, because the solution is kept thoroughly mixed. Therefore, the amount of salt in the tank after t minutes is:
Amount of salt = 10 + (0.15 - 0.15) x t = 10 kg
b) After 30 minutes, the amount of salt in the tank is still 10 kg. This is because the rate of salt in and the rate of salt out are equal, and so the amount of salt in the tank remains constant. Therefore, the answer is the same as part (a), which is 10 kg
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30 children were participants in a study that used Ainsworth's Strange Situation procedure. We want to know if reaction scores from their first separation with their mother are significantly different from scores from their second separation. Which test would we use? A. one-tailed dependent samples t-test B. two-tailed dependent samples t-test C. one-tailed independent samples t-test D. two-tailed independent samples t-test
The appropriate answer would be option B: two-tailed dependent samples t-test.
Since we are comparing scores from the same group of participants at two different points in time (first separation vs second separation), we would use a dependent samples t-test.
Therefore, the options are A and B. We cannot determine whether the test would be one-tailed or two-tailed based on the information given.
A one-tailed test would be appropriate if we had a specific directional hypothesis (e.g., we expect the scores to be higher on the first separation compared to the second separation). A two-tailed test would be appropriate if we had a non-directional hypothesis (e.g., we expect there to be a difference between the scores, but we do not have a specific expectation about the direction of the difference).
Since we do not have information about the directional hypothesis, the appropriate answer would be option B: two-tailed dependent samples t-test.
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1. The table shows the numbers of points scored and numbers of rebounds for players
in a basketball game.
Player
Number of Points
Number of Rebounds
Number of Rebounds 10
11
9
7
5
A
3
18
1
B
0 1 3 5 7
7
4
C
D
11 28
4
6
E
5
3
F
16
Number of Points
6
G
a. Construct a scatter plot of the numbers of points scored and the numbers of rebounds.
Players in a Basketball Game
9
3
H
5
2
I
12
1
9 11 13 15 17 19 21 23 25 27 29
b. Do you notice an association between the number of points scored and the number
of rebounds? Explain.
J
0
2
c. Based on the scatter plot, can you conclude that greater numbers of points scored cause
greater or lesser numbers of rebounds?
TA
EXI
CKE
50
Note that this prompt examines the given data using scatter plot whose details is analyzed below.
What is the analysis of the scatter plot?1) The scatter plot showing the relationship between the numbers of points scored and the numbers of rebounds is attached.
2) The association between the numbers of points scored and the numbers of rebounds is a positive one. This means that generally, there is a tendency to get more points when the number of rebounds is high.
3) No, we cannot conclude that greater numbers of points scored cause
greater or lesser numbers of rebounds. This would be an inverse relationship which contradicts our findings above.
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A research scientist wants to know how many times per hour a certain strand of bacteria reproduces. The mean is found to be 6.6 reproductions and the population standard deviation is known to be 2.3. If a sample of 432 was used for the study, construct the 90 % confidence interval for the true mean number of reproductions per hour for the bacteria. Round your answers to one decimal place
Lower Endpoint:??
Upper Endpoint:??
The confidence interval:
Lower Endpoint: 6.418
Upper Endpoint: 6.782
To construct the confidence interval, we can use the formula:
CI = x ± z(σ/√n)
Where:
x = sample mean = 6.6
σ = population standard deviation = 2.3
n = sample size = 432
z = z-score for 90% confidence level = 1.645 (from the standard normal distribution table)
Plugging in the values, we get:
CI = 6.6 ± 1.645(2.3/√432)
CI = 6.6 ± 0.182
Therefore, the 90% confidence interval for the true mean number of reproductions per hour for the bacteria is:
Lower Endpoint: 6.418
Upper Endpoint: 6.782
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A team of swimmers is training for a swim meet. The table shows the number of laps each person has swum so far and how long the laps took. Name Laps Time (minutes)
Jonathan 2 4
Julian 1 1
Seth 3 6
Bennett 7 21
Taylor 4 7
The relationship between time and the number of laps is not proportional across all swimmers. Which two swimmers swam at the same rate (had time and laps in the same proportion)?
Jonathan and Seth both had a time per lap of 2 minutes, which means they swam at the same rate.
To determine who swam at the same rate, we need to calculate the time per lap for each swimmer. This can be done by dividing the time by the number of laps.
Jonathan: 4 ÷ 2 = 2 minutes per lap
Julian: 1 ÷ 1 = 1 minute per lap
Seth: 6 ÷ 3 = 2 minutes per lap
Bennett: 21 ÷ 7 = 3 minutes per lap
Taylor: 7 ÷ 4 = 1.75 minutes per lap
From the calculations, we can see that Jonathan and Seth both had a time per lap of 2 minutes, which means they swam at the same rate.
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Question 4: (6 + 8+ 6 marks) a. Divide: *3-27 9-x2 x2+3x+9 x2 +9x+18 b. Solve: V3x + 2-27x=0 C. Solve: 3x7 - 24 x4=0
The solutions of the given expressions are as follows :
(a) (x^2+3x+9) / (x^2+9x+18) = x+2
(b) x ≈ 0.004 or x ≈ 0.056
(c) we have two solutions: x = 0 or x = V8 (cube root of 8)
a. To divide *3-27 by 9-x^2, we can first factor both expressions :
*3-27 = 3*(-9)
9-x^2 = (3-x)(3+x)
So we have:
(*3-27) / (9-x^2) = (3*(-9)) / ((3-x)(3+x))
To divide x^2+3x+9 by x^2+9x+18, we can use long division or synthetic division. Using long division, we have:
x + 2
-------------------
x^2 + 9x + 18 | x^2 + 3x + 9
-x^2 - 2x
----------
x + 9
-x - 9
-------
0
So we have:
(x^2+3x+9) / (x^2+9x+18) = x+2
b. To solve V3x + 2-27x = 0, we can first isolate the radical:
V3x = 27x - 2
Then we can square both sides:
3x = (27x - 2)^2
Expanding the right side and simplifying, we get:
3x = 729x^2 - 108x + 4
Bringing everything to one side, we have:
729x^2 - 111x + 4 = 0
Using the quadratic formula, we get:
x = (111 ± V(111^2 - 4*729*4)) / (2*729)
x ≈ 0.004 or x ≈ 0.056
c. To solve 3x^7 - 24x^4 = 0, we can factor out x^4:
3x^4(x^3 - 8) = 0
So we have two solutions:
x = 0 or x = V8 (cube root of 8)
Note that the equation has a total of seven roots (since it is a seventh-degree equation), but we only found two of them. The other five roots are complex numbers.
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the sum of the first three terms of a decreasing geometric progression is 7 and the product is 8. find the common ratio and the first three terms of the g.p
Answer:
ratio: 1/2first terms: 4, 2, 1, ...Step-by-step explanation:
You want the common ratio and first 3 terms of a decreasing geometric progression with the sum of the first three terms being 7, and their product being 8.
SetupLet the first term be represented by x, and let r represent the common ratio. Then the first three terms are ...
x, xr, xr²
Their sum is ...
7 = x +xr +xr²
Their product is ...
8 = (x)(xr)(xr²) = (xr)³
SolutionTaking the cube root of the product equation, we have ...
2 = xr
Substituting this into the first equation, we have ...
7 = x +2 + 2r
5 = x +2r ⇒ x = 5 -2r
And substituting back into the above, we get ...
2 = (5 -2r)(r)
2r² -5r +2 = 0
(2r -1)(r -2) = 0
r = 2 or 1/2
We want r < 1, so r = 1/2.
x = 5 -2(1/2) = 4
ProgressionFor x = 4, r = 1/2, the first three terms are ...
x, xr, xr² = 4, 2, 1
__
Additional comment
The equations are nicely solved by a graphing calculator. In the attached, we used y instead of r. We want the solution with y<1.
The two solutions give rise to terms 4, 2, 1 (decreasing) or 1, 2, 4 (increasing).
First, using Y for the Laplace transform of y(t), i.e., Y = {y(t)}, find the equation you get by taking the Laplace transform of the differential equation Now solve for Y(s) = and write the above answer in its partial fraction decomposition, Y(s) = where a < b Y(s) = Now by inverting the transform, find y(t) = Use the Laplace transform to solve the following initial value problem: First, using Y for the Laplace transform of y(t), i.e., Y = {y(t)}, find the equation you get by taking the Laplace transform of the differential equation Now solve for Y(s) = and write the above answer in its partial fraction decomposition, Y(s) = where a < b Y(s)= Now by inverting the transform, find y(t) = Use the Laplace transform to solve the following initial value problem: First, using Y for the Laplace transform of y(t), i.e., Y = {y(t)}, find the equation you get by taking the Laplace transform of the differential equation and solving for Y: Y(s) = Find the partial fraction decomposition of y(s) and its inverse Laplace transform to find the solution of the DE: Use the Laplace transform to solve the following initial value problem: x(0) = 0, y(0) = 0 Let X(s) = {x:(t)},and Y(s) = {y(t)} Find the expressions you obtain by taking the Laplace transform of both differential equations and solving for y(s) and X(s): X(s) = Y(s) = Find the partial fraction decomposition of X(s) and y(s) and their inverse Laplace transforms to find the solution of the system of DEs: x(t) = y(t) =
And then write:
Y(s) = (-4X(s))/s
Let's take a step-by-step approach to solving this problem.
First, we are given the differential equation:
y'' + 4y = 0
To solve this using Laplace transforms, we take the Laplace transform of both sides:
L{y'' + 4y} = L{0}
Using the linearity property of the Laplace transform and the fact that L{y''} = s^2Y(s) - s*y(0) - y'(0), we can simplify this to:
s^2Y(s) - s*y(0) - y'(0) + 4Y(s) = 0
Next, we solve for Y(s):
Y(s)(s^2 + 4) = s*y(0) + y'(0)
Y(s) = (s*y(0) + y'(0))/(s^2 + 4)
To find the partial fraction decomposition of Y(s), we factor the denominator:
s^2 + 4 = (s + 2i)(s - 2i)
And then use partial fractions to write:
Y(s) = (a/(s + 2i)) + (b/(s - 2i))
To solve for a and b, we multiply both sides by the denominators:
Y(s)(s + 2i)(s - 2i) = a(s - 2i) + b(s + 2i)
And then substitute s = -2i and s = 2i to get two equations:
a(-4i) = -2iy(0) + y'(0) - b(4i)
a(4i) = 2iy(0) + y'(0) + b(4i)
Solving for a and b, we get:
a = (y(0) + 2iy'(0))/(4i)
b = (y(0) - 2iy'(0))/(4i)
Now, we can write the partial fraction decomposition of Y(s):
Y(s) = ((y(0) + 2iy'(0))/(4i))/ (s + 2i) + ((y(0) - 2iy'(0))/(4i))/(s - 2i)
To find y(t), we need to take the inverse Laplace transform of Y(s). We can use the partial fraction decomposition to do this:
y(t) = (1/2)*(y(0)cos(2t) + (y'(0)/2)sin(2t))
Now, we move on to the second part of the problem, which is to use Laplace transforms to solve the initial value problem:
x(0) = 0, y(0) = 0
We are given the following system of differential equations:
x' = y
y' + 4x = 0
Taking the Laplace transform of both equations, we get:
sX(s) = Y(s)
sY(s) + 4X(s) = 0
Solving for Y(s) and X(s), we get:
Y(s) = X(s)/s
X(s) = -4Y(s)/s
To find the partial fraction decomposition of X(s) and Y(s), we factor the denominators:
sY(s) + 4X(s) = 0
sX(s) = Y(s)
s(sY(s) + 4X(s)) = 0
sX(s) = Y(s)
s^2Y(s) + 4sX(s) = 0
sX(s) = Y(s)
And then write:
Y(s) = (-4X(s))/s
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making a profit rotter partners is planning a major investment. from experience, the amount of profit x (in millions of dollars) on a randomly selected invest- ment of this type is uncertain, but an estimate gives the following probability distribution: profit: 1 1.5 2 4 10 probability: 0.1 0.2 0.4 0.2 0.1 based on this estimate, mx
Rotter Partners is planning a major investment, and to ensure that the investment is profitable, it is essential to understand the expected profit from the investment. The probability distribution of profits from similar investments indicates that the expected profit (mx) can be calculated as the weighted average of profits, where the weights are the probabilities associated with each profit level.
Based on the given probability distribution, the expected profit (mx) can be calculated as follows:
mx = (1 x 0.1) + (1.5 x 0.2) + (2 x 0.4) + (4 x 0.2) + (10 x 0.1)
mx = 0.1 + 0.3 + 0.8 + 0.8 + 1
mx = 2.7
Therefore, the expected profit from the investment is $2.7 million. This estimate is valuable to Rotter Partners as it can help them make informed decisions about the investment. If the expected profit is lower than the cost of the investment, then the investment may not be worthwhile. On the other hand, if the expected profit is higher than the cost of the investment, then the investment is likely to be profitable. In any case, the expected profit is a useful metric for assessing the potential success of the investment.
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helpppppp!! The mass of a car is 1990 kg rounded to the nearest kilogram. The mass of a person is 58.7 kg rounded to 1 decimal place. Write the error interval for the combined mass, m , of the car and the person in the form a ≤ m < b .
Find the prime factorization for the 168 ___
Write the prime factorization for each of the
(a) 294 ___
(b) 1,584 ___
(c) 187 ___
(d) 51 ___
The prime factorization for 168 is 2 x 2 x 2 x 3 x 7.
(a) The prime factorization for 294 is 2 x 3 x 7 x 7.
(b) The prime factorization for 1,584 is 2 x 2 x 2 x 2 x 3 x 3 x 7.
(c) The prime factorization for 187 is 11 x 17.
(d) The prime factorization for 51 is 3 x 17.
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f(x)=x^2. what is g(x)? :)
Answer: B
Step-by-step explanation:
Hope this helps! :)
Suppose the final step of a Gauss-Jordan elimination is as follows: [1 -2 21 01 10 0 11-2 LO 0 ol 1 What can you conclude about the solution(s) for the system?
In other words, the system has infinitely many solutions, parameterized by the values of the free variables a and b.
The final step of the Gauss-Jordan elimination can be interpreted as the following system of equations:
x1 - 2x2 + 21x3 = 0
x4 + x5 = 1
x6 - 2x7 = 0
x8 + x9 = 1
From the second and fourth equations, we can conclude that x4 and x8 are free variables, which means they can take on any value. Let's set them to be a and b, respectively.
Then, using the first and third equations, we can solve for x2, x3, x5, and x7 in terms of a and b:
x2 = (21/2)a - (1/2)b
x3 = a/2 - (21/4)b
x5 = 1 - a
x7 = b/2
Finally, substituting these values into the remaining equations, we can solve for x1 and x6:
x1 = 2x2 - 21x3 = -19a + (209/4)b
x6 = 2x7 = b
Therefore, the solution to the system of equations is:
x1 = -19a + (209/4)b
x2 = (21/2)a - (1/2)b
x3 = a/2 - (21/4)b
x4 = a
x5 = 1 - a
x6 = b
x7 = b/2
x8 = a
x9 = 1 - a
In other words, the system has infinitely many solutions, parameterized by the values of the free variables a and b.
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Assume that adults have IQ scores that are normally distributed with a mean of 101.1 and a standard deviation of 17. Find the probability that a randomly selected adult has an IQ greater than 134.4
The probability that a randomly selected adult from this group has an IQ greater than 134.4 is ?
The probability that a randomly selected adult has an IQ greater than 134.4 is 0.025 or 2.5%
To find the probability that a randomly selected adult has an IQ greater than 134.4, we need to calculate the z-score and then find the corresponding area under the standard normal distribution curve.
The z-score is calculated as: [tex]z= \frac{x-μ}{σ}[/tex]
where x is the IQ score, μ is the mean IQ score, and σ is the standard deviation of IQ scores.
Substituting the given values, we get:
[tex]z = \frac{(134.4 - 101.1)}{17}[/tex]
z = 1.96
Using a standard normal distribution table, we find that the area to the right of z = 1.96 is approximately 0.025. Therefore, the probability that a randomly selected adult has an IQ greater than 134.4 is 0.025 or 2.5%.
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at 2:00pm a car's speedometer reads and at 2:10pm it reads use the mean value theorem to find an acceleration the car must achieve.
The car must achieve an acceleration of 120 mi/h² at some point between 2:00pm and 2:10 pm.
To find the acceleration the car must achieve using the Mean Value Theorem (MVT), we need to follow these steps:
1. Calculate the change in speed.
2. Calculate the change in time.
3. Apply the MVT to find the acceleration.
Step 1: The car's speedometer reads 50mph at 2:00 pm and 70mph at 2:00 pm. The change in speed is 70mph - 50mph = 20mph.
Step 2: The change in time is 10 minutes, which we need to convert to hours. To do this, divide 10 by 60 (since there are 60 minutes in an hour). So, 10/60 = 1/6 hour.
Step 3: Apply the MVT. The MVT states that there must be a point in time where the average acceleration equals the instantaneous acceleration. The average acceleration (a) can be found using the formula a = Δv/Δt. Here, Δv is the change in speed (20mph) and Δt is the change in time (1/6 hour).
So, a = (20mph) / (1/6 hour) = 20 * 6 = 120 mi/h².
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The ratio to pens and pencils in a box is 3 to 5. If there are 96 pens and pencils in the box altogether ,how many more pens should be put in the box to make the ratio of pens to pencils 1:1?
Answer:
3x + 5x = 96
8x = 96, so x = 12
There are currently 3(12) = 36 pens and 5(12) = 60 pencils in the box, so 60 - 36 = 24 more pens should be put in the box.
4. Obtain (a) the half-range cosine series and (b) the half-range sine series for the function f(t) = 0, 0
This is because the function f(t) is a constant function, which is an even function and has no odd component.
The half-range Fourier series is a representation of a periodic function over a finite interval, where the function is assumed to be even or odd. In the case of the function f(t) = 0, the function is even and the interval is from 0 to π.
(a) The half-range cosine series:
To find the half-range cosine series, we first need to find the Fourier coefficients:
[tex]a_0 &= \frac{2}{\pi} \int_0^{\pi} f(t) dt = \frac{2}{\pi} \int_0^{\pi} 0 dt = 0 \a_n &= \frac{2}{\pi} \int_0^{\pi} f(t) \cos(nt) dt = \frac{2}{\pi} \int_0^{\pi} 0 \cos(nt) dt = 0 \\[/tex]
Since all the Fourier coefficients are zero, the half-range cosine series for f(t) is:
[tex]$\begin{align*}f(t) &= \frac{a_0}{2} + \sum_{n=1}^{\infty} a_n \cos(nt) \&= 0\end{align*}$[/tex]
b) The half-range sine series:
To find the half-range sine series, we need to find the Fourier coefficients:
[tex]b_n &= \frac{2}{\pi} \int_0^{\pi} f(t) \sin(nt) dt = \frac{2}{\pi} \int_0^{\pi} 0 \sin(nt) dt = 0 \\[/tex]
Since all the Fourier coefficients are zero, the half-range sine series for f(t) is:
[tex]$\begin{align*}f(t) &= \sum_{n=1}^{\infty} b_n \sin(nt) \&= 0\end{align*}$[/tex]
Therefore, both the half-range cosine series and the half-range sine series for f(t) are zero. This is because the function f(t) is a constant function, which is an even function and has no odd component.
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Maria bought a cake and divided it equally among her 4 children. Ana and Benito ate their whole piece, Carlos ate half of his piece and Diana only ate a fifth of hers. What slice of the cake was left over?
Answer:
70/200
Step-by-step explanation:
1/8+1/20
5/40+2/40
70/200
Answer:
the answer isnt on there but i got 27/40.....
Step-by-step explanation:
1 cake + 4 kids = 4 pieces of cake
Ana ( one full piece) + Benito ( one full piece) = 2/4 or 1/2
so we already know half the cake is gone.
Carlos ate half, so 1/2 of 1/4 equals 1/8
Diana ate 1/5 of her's, so 1/5 of 1/4 equals 1/20
now, we add.
1/4 + 1/4 + 1/8 + 1/20 = 27/40
Complete the statement blank is a function of blank
Fill in each blank so that the resulting statement is true: A function f has an inverse that is a function if there is no vertical line that intersects the graph of f at more than one point. Such a function is called a/an injective function or a one-to-one function.
A function is injective if every distinct input produces a distinct output. Geometrically, this means that the function does not repeat any output values . If there is a vertical line that intersects the graph of f at more than one point, then the function fails to be injective, since two distinct input values will produce the same output value. In this case, the function does not have an inverse that is a function.
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Full Question ;
Fill in each blank so that the resulting statement is true. A function f has an inverse that is a function if there is no ____ line that intersects the graph of f at more than one point. Such a function is called a/an ____ function.
The display summarizes home sales in the months from September to December.
Segmented bar chart titled home sales with four vertical bars. Each bar is divided into two parts, less than $150,000 and $150,000 or more. For September, less than $150,000 is 0 to 40 percent and $150,000 or more is 40 to 100 percent. For October, less than $150,000 is 0 to 45 percent and $150,000 or more is 45 to 100 percent. For November, less than $150,000 is 0 to 55 percent and $150,000 or more is 55 to 100 percent. For December, less than $150,000 is 0 to 68 percent and $150,000 or more is 68 percent to 100 percent.
Which of the following describes the data set?
The data is univariate and categorical.
The data is univariate and numerical.
The data is bivariate and categorical.
The data is bivariate and numerical.
The statement which correctly describes the data set include the following:
D. the data is bivariate and numerical.
In Mathematics, a bivariate data can be defined as a type of data set which comprises information that are based on two (2) variables, usually two types of related data.
In Mathematics and statistics, a numerical data can be defined as a type of data set that is primarily expressed in numbers only. This ultimately implies that, a numerical data simply refers to a type of data set consisting of numbers (numerals), rather than words or letters.
Thus, In conclusion, we can logically deduce that the given data set is both bivariate and numerical.
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49
(
x
+
4
)
=
7
(
5
x
−
1
Answer: is x=3
Step-by-step explanation:
Answer:
The awnser is 9
Step-by-step explanation:
1 × 9 = 9 9 dovided by 7 = -2 + 8 is 6 6 times 0 is 0 0 + 1 = 1 1 × 6 = 6
find the 9th term of the following geometric sequence 10, 40, 250, 1250, ....
The 9th term of this geometric sequence 10, 40, 250, 1250, .... include the following: 655,360.
How to calculate the nth term of a geometric sequence?In Mathematics, the nth term of a geometric sequence can be calculated by using this mathematical equation (formula):
aₙ = a₁rⁿ⁻¹
Where:
aₙ represents the nth term of a geometric sequence.r represents the common ratio.a₁ represents the first term of a geometric sequence.Next, we would determine the common ratio as follows;
Common ratio, r = a₂/a₁
Common ratio, r = 40/10
Common ratio, r = 4
For the 9th term, we have:
a₉ = 10(4)⁹⁻¹
a₉ = 655,360.
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Side Effects for Migraine Medicine (4 points) In clinical trials and extended studies of a medication whose purpose is to reduce the pain associated with migraine headaches, 3% of the patients in the study experienced weight gain as a side effect. Suppose a random sample of 500 users of this medication is obtained. Show your work or calculator functions to answer the following questions. 1. Explain why you can use normal approximation to the binomial distribution to approximate the probabilities below. 2. Approximate, up to 4 decimal digits, the probability that 15 or fewer users will experience weight gain as a side effect. You want to be sure and show the problem you are working on as well as the calc function and the decimal. Here is the way we want you to answer this one! Notice the 5 correction that was used!!!! P(x515)=normalcdf (–1E99,15.5,15, 3.814)=0.5522 3. Approximate, up to 4 decimal digits, the probability that 24 or more users experience weight gain as a side effect. 4. Approximate, up to 4 decimal digits, the probability that between 12 and 20 patients, inclusive will experience weight gain as a side effect. 181120
The approximate probability that between 12 and 20 patients, inclusive will experience weight gain as a side effect is 0.4147.
Normal approximation can be used to approximate the binomial distribution when the sample size is large enough (n >= 30) and the probability of success (p) and failure (q=1-p) are not too small or too large. In this case, we have a sample size of 500, which is sufficiently large, and the probability of success (p=0.03) and failure (q=0.97) are not too small or too large.
To approximate the probability that 15 or fewer users will experience weight gain as a side effect, we can use the normal approximation to the binomial distribution with mean (μ) = np = 500 x 0.03 = 15 and standard deviation (σ) = sqrt(npq) = sqrt(500 x 0.03 x 0.97) = 3.814. Then, we can use the normal cumulative distribution function (normalcdf) to calculate the probability that X ≤ 15, where X is the number of users who experience weight gain.
normalcdf(–1E99,15.5,15, 3.814) = 0.5522
Therefore, the approximate probability that 15 or fewer users will experience weight gain as a side effect is 0.5522.
To approximate the probability that 24 or more users experience weight gain as a side effect, we can use the normal approximation to the binomial distribution with the same mean and standard deviation as before. Then, we can use the normal complementary cumulative distribution function (normalccdf) to calculate the probability that X ≥ 24.
normalccdf(23.5,15,3.814) = 0.0097
Therefore, the approximate probability that 24 or more users experience weight gain as a side effect is 0.0097.
To approximate the probability that between 12 and 20 patients, inclusive will experience weight gain as a side effect, we can use the normal approximation to the binomial distribution with the same mean and standard deviation as before. Then, we can use the normal cumulative distribution function (normalcdf) to calculate the probability that 12 ≤ X ≤ 20.
normalcdf(11.5,20.5,15,3.814) = 0.6081 - 0.1934 = 0.4147
Therefore, the approximate probability that between 12 and 20 patients, inclusive will experience weight gain as a side effect is 0.4147.
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Bianca invested $6,500 at an interest rate of 3%. How much will the simple interest be in 8 years?
Please help
$1,560
Steps:
To calculate simple interest, we use the formula:
Simple interest = Principal * Rate * Time
Given that Bianca invested $6,500 at a rate of 3%, the principal is $6,500 and the rate is 0.03 (since 3% is equivalent to 0.03 as a decimal).
We are asked to find the simple interest after 8 years, so the time is 8 years.
Using the formula, we get:
Simple interest = $6,500 * 0.03 * 8
Simple interest = $1,560
Therefore, the simple interest on Bianca's investment will be $1,560 after 8 years.
A group of students was surveyed in a middle school class. They were asked how many hours they work on math homework each week. The results from the survey were recorded.
Number of hours Total number of students
0 1
1 3
2 2
3 5
4 9
5 7
6 3
Determine the probability that a student studied for 5 hours.
23.0
0.70
0.23
0.16
Result:
Probability that a student studied for 5 hours = C. 0.23
How do we calculate the probability that a student studied for 5 hours?The find out the probability a student studied for 5 hours:
Divide the number of students who studied for 5 hours by the total number of students surveyed:
Probability = Number of students who studied / Total number of students surveyed
Given:
Number of students who studied for 5 hours = 7
Total number of students surveyed = 1 + 3 + 2 + 5 + 9 + 7 + 3 = 30
Therefore, probability for a student studied for 5 hours =
7 / 30 = 0.23 or 23%.
So, option C. 0.23 is correct.
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13) What is the solution to the equation 2√x + 6-3 = 19?
a) -3
b) -1
c) 5
d) 7
e) 7
First, we can simplify the equation by isolating the variable on one side:
2√x + 6 - 3 = 19
2√x + 3 = 19
2√x = 16
√x = 8
Now we can square both sides of the equation to isolate x:
(√x)² = 8²
x = 64
Therefore, the solution to the equation 2√x + 6 - 3 = 19 is x = 64, which corresponds to answer choice (e).
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Find Value of X round if nesscessary
The value of x is 11.6 ( option C).
What are similar triangles?Similar triangles are triangles that have the same shape, but their sizes may vary. The angles of similar triangles are congruent.
Also the ratio corresponding sides of similar triangles are equal. This means for two triangles to be similar , the corresponding angles must be equal and the ratio of corresponding sides are equal.
Therefore,
29/50 = x/20
29×20 = 50x
580 = 50x
divide both sides by 50
580/50 = x
x = 580/50
x = 58/5
x = 11.6
therefore the value of x 11.6
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46. A factory produces a particular make of flat screen television at a rate of 3 per day on average. The number produced in a week has a Poisson distribution. Find the probability that (a) no flat screen television was produced on a particular day, (b) there are at most nine flat screen televisions produced in 3 days. (c) If the production line only functions 8 hours a day, what is the probability that more than one flat screen television will be produced in 2 hours? (answer: (a) 0.0498, (b) 0.5874, (c) 0.17336)
Previous question
The probability that more than one flat screen television will be produced in 2 hours is 0.2642.
(a) To find the probability that no flat screen television was produced on a particular day, we can use the Poisson distribution formula:
P(X = 0) = (e^(-λ) * λ^0) / 0!
where λ is the average number of flat screen televisions produced per day, which is 3 in this case.
P(X = 0) = (e^(-3) * 3^0) / 0! = 0.0498 (rounded to four decimal places)
Therefore, the probability that no flat screen television was produced on a particular day is 0.0498.
(b) To find the probability that there are at most nine flat screen televisions produced in 3 days, we can use the cumulative Poisson distribution formula:
P(X ≤ 9) = ∑(k=0 to 9) [(e^(-λ) * λ^k) / k!]
where λ is the average number of flat screen televisions produced per day, which is 3 in this case. To find the probability for 3 days, we need to multiply λ by 3.
P(X ≤ 9) = ∑(k=0 to 9) [(e^(-9) * 9^k) / k!] = 0.5874 (rounded to four decimal places)
Therefore, the probability that there are at most nine flat screen televisions produced in 3 days is 0.5874.
(c) If the production line only functions 8 hours a day, we can adjust λ accordingly. Since there are 24 hours in a day and the production line is functioning for 8 hours, the average number of flat screen televisions produced in 2 hours would be λ/3.
So, the new λ would be 3/3 = 1.
To find the probability that more than one flat screen television will be produced in 2 hours, we can use the Poisson distribution formula:
P(X > 1) = 1 - P(X ≤ 1)
P(X ≤ 1) = (e^(-1) * 1^0) / 0! + (e^(-1) * 1^1) / 1! = 0.7358 (rounded to four decimal places)
P(X > 1) = 1 - 0.7358 = 0.2642 (rounded to four decimal places)
Therefore, the probability that more than one flat screen television will be produced in 2 hours is 0.2642.
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A bag of carrots weight 3 kilograms scan of beans weight 420 grams what’s the total
From mass unit conversion where using a numeric constant ( 0.001), the total weight of vegitables ( carrots and beans) in a bag is equals to the 3.420 kilograms.
A unit conversion is used to expresses the same property as a different unit of measurement. Unit conversion is a process with serval steps that involves multiplication or division by a numerical factor called conversion factor. So, there are different unit conversions charts like mass unit conversation, length unit conversion etc. Now, we have, a bag contains carrots and beans.
Weight of carrots in bag = 3 kg
weight of beans in bag = 420 grams
We have to determine total weight that bag contains. As we see both weights are present in different units ( i.e, kg and grams). Using unit conversion, 1 kilogram = 1000 grams
=>[tex] 1 gram= \frac{1}{1000}=0.001 kg[/tex]
So, 420 grams = 420× 0.001 = 0.420 kg
Total weight of vegitables in bag = weight of carrots + weight of beans
= 3 kg + 0.420 kg
= 3.420 kg
Hence, required value is 3.420 kilograms.
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