Answer:
Step-by-step explanation:
I just tried numbers
2 1
2 6 first grid, so 2nd column is 7
or
1 2
3 5 also 7
Use General Linear Process to determine the mean function and the autocovariance function of ARC2) given by Xt = ∅1X't-1- ∅2X't-2 +et
The GLP's mean function is (t) = (1 + 2), and the GLP's autocovariance function is γ(h) = ∅1² γ(h-1) + ∅2² γ(h-2) - ∅1∅2 γ(h-2), where γ(0) = σ² / (1 - ∅1² - ∅2²).
What is function?A function connects an input with an output. It is analogous to a machine with an input and an output. And the output is somehow related to the input. The standard manner of writing a function is f(x) "f(x) =... "
To use the General Linear Process approach, we first express the given AR(2) model in the following form:
Xt = ∅1Xt-1 - ∅2Xt-2 + et
where et is a white noise process with zero mean and variance σ².
The mean function of this GLP is given by:
μ(t) = E[Xt] = E[∅1Xt-1 - ∅2Xt-2 + et] = ∅1E[Xt-1] - ∅2E[Xt-2] + E[et]
Since et is a white noise process with zero mean, we have E[et] = 0. Also, by assuming that the process is stationary, we have E[Xt-1] = E[Xt-2] = μ. Therefore, the mean function of the GLP is:
μ(t) = μ(∅1 + ∅2)
The autocovariance function of this GLP is given by:
γ(h) = cov(Xt, Xt-h) = cov(∅1Xt-1 - ∅2Xt-2 + et, ∅1Xt-1-h - ∅2Xt-2-h + e(t-h))
Note that et and e(t-h) are uncorrelated since the white noise process is uncorrelated at different time points. Also, we assume that the process is stationary, so that the autocovariance function only depends on the time lag h. Using the properties of covariance, we have:
γ(h) = ∅1² γ(h-1) + ∅2² γ(h-2) - ∅1∅2 γ(h-2)
where γ(0) = Var[Xt] = σ² / (1 - ∅1² - ∅2²).
Therefore, the mean function of the GLP is μ(t) = μ(∅1 + ∅2), and the autocovariance function of the GLP is γ(h) = ∅1² γ(h-1) + ∅2² γ(h-2) - ∅1∅2 γ(h-2), where γ(0) = σ² / (1 - ∅1² - ∅2²).
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1 Let V = Span{ 2 3 1:00 3 3 5}. Find a condition which must be true if 4 x х у is in V: Z y+ X + z = 0
To determine a condition which must be true if 4x, x, y is in V, we can first write 4x, x, y as a linear combination of the vectors in the given span.
Let's call the vectors in the span a and b, where:
a = [2, 3, 1]
b = [3, 3, 5]
Then, we want to find scalars s and t such that:
4x, x, y = sa + tb
In other words, we want to solve the system of equations:
2s + 3t = 4x
3s + 3t = x
s + 5t = y
We can solve this system by row reducing the augmented matrix:
[2 3 | 4x]
[3 3 | x]
[1 5 | y]
Using elementary row operations, we can obtain the following row echelon form:
[2 3 | 4x]
[0 -3/2 | -5x/2]
[0 0 | z]
where z = y + x + 2x/3.
So, for 4x, x, y to be in V, the system of equations must have a solution, which means that z = 0. Therefore, the condition that must be true is:
y + x + 2x/3 = 0
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find the z-value needed to calculate one-sided confidence bounds for the given confidence level. (round your answer to two decimal places.) a 81% confidence bound
To find the z-value needed to calculate one-sided confidence bounds for an 81% confidence level, we first need to determine the area under the normal distribution curve to the left of the confidence level. Since we are looking for one-sided confidence bound, we only need to consider the area to the left of the mean.
Using a standard normal distribution table or calculator, we can find that the area to the left of the mean for an 81% confidence level is 0.905.
Next, we need to find the corresponding z-value for this area. We can use the inverse normal distribution function to do this.
z = invNorm(0.905)
Using a calculator or a table, we can find that the z-value for an area of 0.905 is approximately 1.37.
Therefore, the z-value needed to calculate one-sided confidence bounds for an 81% confidence level is 1.37 (rounded to two decimal places).
The z-value needed to calculate a one-sided confidence bound with an 81% confidence level.
1. First, since it's one-sided confidence bound, we need to find the area under the standard normal curve that corresponds to 81% confidence. This means the area to the left of the z-value will be 0.81.
2. Now, to find the z-value, we can use a z-table or an online calculator that provides the z-value corresponding to the cumulative probability. In this case, the cumulative probability is 0.81.
3. Using a z-table or an online calculator, we find that the z-value corresponding to a cumulative probability of 0.81 is approximately 0.88.
So, the z-value needed to calculate a one-sided 81% confidence bound is 0.88, rounded to two decimal places.
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What is the distance between (1, 2) and (1, -10)?
The distance between the given points which are (1, 2) and (1, -10) is equal to 12 units.
To find the distance between two points in a coordinate plane, we can use the distance formula, which is derived from the Pythagorean theorem. The distance formula is:
d = √((x₂ - x₁)² + (y₂ - y₁)²)
Where d is the distance between the two points, (x₁, y₁) and (x₂, y₂) are the coordinates of the two points.
Using this formula, we can find the distance between (1, 2) and (1, -10):
d = √((1 - 1)² + (-10 - 2)²)
= √(0² + (-12)²)
= √(144)
= 12
We can also visualize this by drawing a straight line segment connecting the two points and measuring its length.
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Find the area of the composite figure. In neccesary, round your answer to the nearest hundredth.
Answer:
(1/2)(3)(4) + (1/2)π(2^2)
= 6 + 2π square kilometers
= 12.28 square kilometers
6. Evaluate f(-2), f(1), and f(2) for the following piecemeal function: x2+1. x≤-2
f(x) = 2x+3, -2
x3-3 x>1
The evaluated values f(-2), f(1), and f(2) for the given piecewise function are 5,5,-3
The function is defined as follows:
f(x) = x^2 + 1, if x ≤ -2
f(x) = 2x + 3, if -2 < x ≤ 1
f(x) = 3 - 3x, if x > 1
Now, let's evaluate the function at each point:
1. f(-2): Since -2 is in the first interval (x ≤ -2), we use the first function:
f(-2) = (-2)^2 + 1 = 4 + 1 = 5
2. f(1): Since 1 is in the second interval (-2 < x ≤ 1), we use the second function:
f(1) = 2(1) + 3 = 2 + 3 = 5
3. f(2): Since 2 is in the third interval (x > 1), we use the third function:
f(2) = 3 - 3(2) = 3 - 6 = -3
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Which statement is TRUE?
4
4
A A characteristic of a population is called a statistic
B A population is randomly selected from a sample group
C A sample includes all of the individuals or units of the group
D A random sample may represent the population
Answer:
The answer is D.) A random sample may represent the population.
Step-by-step explanation:
Collecting samples from anyone at random increases the chances of representing the overall people because that's where they're getting it from. But there is still a chance it will not represent everyone or the general population.
Answer:B) A random sample may represent the population is your best answer.
Step-by-step explanation:
this is what i got for this one. have a good day everyone. :)
find the number of ways a six-sided die can be constructed if each side is marked differently with dots.
The number of ways a six-sided die can be constructed with different markings on each side is 720.
If we have a six-sided die, each side can be marked differently with dots. This means that we can have six different options for the first side, five different options for the second side (since one of the dots has already been used), four different options for the third side (since two of the dots have already been used), three different options for the fourth side, two different options for the fifth side, and only one option left for the sixth side.
Therefore, to find the number of ways a six-sided die can be constructed if each side is marked differently with dots, we need to multiply all of these different options together. That is, we need to find the product of 6 x 5 x 4 x 3 x 2 x 1, which is equal to 720.
Therefore, there are 720 different ways that a six-sided die can be constructed if each side is marked differently with dots. This is because there are 720 different permutations of six objects, where each object can only appear once, and the order matters.
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researchers found the demand for cheese in a particular country for a particular year can be estimated by the implicit equation. ln q
Based on the information you provided, it seems that researchers have found a way to estimate the demand for cheese in a particular country for a particular year using an implicit equation that involves the natural logarithm of the quantity demanded (ln q).
An implicit equation is a mathematical equation that relates variables without specifying which variable is dependent and which is independent. In this case, it means that the equation estimates the demand for cheese (q) based on other variables, such as the price of cheese, income levels, or other factors that may affect consumer behavior.
Taking the natural logarithm of the quantity demanded (ln q) may be useful for modeling demand because it can help to linearize the relationship between the variables. For example, if the relationship between price and quantity demanded is non-linear, taking the natural logarithm of the quantity demanded can transform it into a linear relationship that can be more easily estimated using statistical methods.
Overall, the use of an implicit equation and the natural logarithm of quantity demanded suggest that researchers are using advanced mathematical and statistical techniques to estimate the demand for cheese in a particular country. This information could be useful for policymakers, cheese producers, and other stakeholders in the cheese industry.
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C. Arman added up all the water he drank over the 14 days and realized it was exactly 26 quarts. If he redistributed all the water so he drank exactly the same amount every day, about how many quarts would he drink each day? Check one.
A about 1 1/4 quarts
B about 2 1/4 quarts
C about 3 quarts
D about 1 7/8 quarts
An elevation of -42 ft is greater than an elevation of -54 ft true or false
Answer:
true
Step-by-step explanation:
-42 is closer to 0
-54——— -42———0
may i get a picture example of IQR
Answer: i can make one if you'd like :')
Step-by-step explanation:
the interquartile range is a measure of statistical dispersion, which is the spread of the data. the IQR may also be called the midspread, middle 50%, fourth spread, or H‑spread. it is defined as the difference between the 75th and 25th percentiles of the data.
a) Let λ be an unbiased estimator for λ, and X be a random variable with mean zero. Show that λ + X is also an unbiased estimator for λ. b) Given E(λ) = aλ +b and a ≠ 0, show that (λ-b)/a is an unbiased estimated for λ.
[tex]\frac{(λ-b)}{a}[/tex] is an unbiased estimator for λ
a) To show that λ + X is an unbiased estimator for λ, we need to show that its expected value is equal to λ.
We know that λ is an unbiased estimator for λ, which means that E(λ) = λ.
Now, let's calculate the expected value of λ + X:
E(λ + X) = E(λ) + E(X)
Since E(X) = 0 (given that X has mean zero), we have:
E(λ + X) = E(λ) + 0
E(λ + X) = E(λ)
E(λ + X) = λ
Therefore, λ + X is an unbiased estimator for λ.
b) Given E(λ) = aλ + b and a ≠ 0, we can find an unbiased estimator for λ by solving for λ in terms of [tex]\frac{(λ-b)}{a}[/tex].
We have:
E(λ) = aλ + b
Dividing both sides by a, we get:
[tex]\frac{E(λ)}{a} = λ +\frac{b}{a}[/tex]
Subtracting [tex]\frac{b}{a}[/tex] from both sides, we have:
[tex]\frac{E(V)}{a} - \frac{b}{a} } = λ[/tex]
Simplifying, we get:
[tex]\frac{(λ - b)}{a} = \frac{E(λ - b)}{a} - \frac{b}{a}[/tex]
Therefore, [tex]\frac{(λ-b)}{a}[/tex] is an unbiased estimator for λ.
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which of the following systems of equations have nonzero solutions? if the solution is not unique, give the set of all possible solutions.
To determine which of the following systems of equations have nonzero solutions, we need to solve each system and see if there are any non-trivial solutions (i.e., solutions where not all variables are zero). If there are non-trivial solutions, then the system has nonzero solutions. Otherwise, the system has only the trivial solution of all variables being zero.
Let's take each system one at a time:
1) x + y = 0, 2x + 2y = 0
This system can be simplified to x + y = 0. Solving for y, we get y = -x. This system has infinitely many solutions, all of which are of the form (x, -x) for any real value of x except zero. Therefore, this system has nonzero solutions.
2) x + y = 0, 2x + 2y = 1
This system can be simplified to x + y = 0. Solving for y, we get y = -x. Substituting this into the second equation, we get 2x + 2(-x) = 1, which simplifies to 0 = 1, which is impossible. Therefore, this system has no solutions.
3) x + y = 1, 2x + 2y = 2
This system can be simplified to x + y = 1. Solving for y, we get y = 1 - x. Substituting this into the second equation, we get 2x + 2(1 - x) = 2, which simplifies to 0 = 0. This is always true, regardless of the value of x. Therefore, this system has infinitely many solutions, all of which are of the form (x, 1 - x) for any real value of x. Therefore, this system has nonzero solutions.
In summary, the first and third systems have nonzero solutions, while the second system has no solutions. The first system has infinitely many solutions, while the third system also has infinitely many solutions.
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The y-intercept of a function always occurs where y is equal to zero true or false
The y-intercept of a function always occurs where y is equal to zero is false.
Not where y is equal to zero, but where the value of x equals zero, is where a function's y-intercept is found. The y-intercept is the location where the function and y-axis cross. The value of y is equal to the y-coordinate of the intersection point at this time, while the value of x is zero.
The y-intercept, or value of y when x is equal to zero, is represented by the symbol b in the equation for a straight line, y = mx + b, where m denotes the slope and b the y-intercept. Because the y-intercept depends on the value of b, it does not follow that if the value of y is zero, it also means that the y-intercept is zero.
In conclusion, a function's y-intercept is the value of y when x is equal to zero and is located where the function meets the y-axis.
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(a) Prove by contradiction: If the sum of two primes is prime, then one of the primes must be 2.
You may assume that every integer is either even or odd, but never both.
(b) Prove by contradiction: Suppose n is an integer that is divisi- ble by 4. Then n + 2 is not divisible by 4.
[tex]$m-k=\frac{1}{2}$[/tex], which contradicts the assumption that m and k are integers. Hence, our assumption that [tex]$n+2$[/tex] is divisible by 4 is false.
what is algebra?Algebra is a branch of mathematics that deals with mathematical operations and symbols used to represent numbers and quantities in equations and formulas.
(a) Suppose that the sum of two primes, [tex]$p_1$[/tex] and [tex]$p_2$[/tex], is prime and neither [tex]$p_1$[/tex] nor [tex]$p_2$[/tex] is 2. Since [tex]$p_1$[/tex] and [tex]$p_2$[/tex] are both odd primes, they must be of the form [tex]$p_1=2k_1+1$[/tex] and [tex]$p_2=2k_2+1$[/tex] for some integers [tex]$k_1$[/tex] and [tex]$k_2$[/tex]. Therefore, their sum can be written as:
[tex]$p_1+p_2=2k_1+1+2k_2+1=2(k_1+k_2)+2=2(k_1+k_2+1)$[/tex]
Since [tex]$k_1+k_2+1$[/tex] is an integer, [tex]$p_1+p_2$[/tex] is even and greater than 2, and therefore cannot be prime, contradicting our assumption. Therefore, one of the primes must be 2.
(b) Suppose, for the sake of contradiction, that n is divisible by 4 and n+2 is also divisible by 4. Then we can write:
n=4k for some integer k,
n+2=4m for some integer m.
Subtracting the first equation from the second, we get:
2=4(m-k)
Therefore, [tex]$m-k=\frac{1}{2}$[/tex], which contradicts the assumption that m and k are integers. Hence, our assumption that n+2 is divisible by 4 is false.
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Consider the following function for maximization using simulated annealing: f(x) = Jx(1.5 - x) in the range (0, 5). If the initial point is x(0) = 2.0, generate a neighboring point using a uniformly distributed random number in the range (0, 1). If the temperature is 400, find the pbobability of accepting the neighboring point.
Means that the algorithm is more likely to accept solutions that have better objective function values.
Simulated annealing is a metaheuristic optimization algorithm that uses a probability distribution to explore the solution space in order to find the global maximum or minimum of a given objective function. At each iteration, the algorithm generates a new candidate solution by perturbing the current solution and calculates the objective function value for the new solution. If the new solution has a better objective function value, it is accepted. However, if the new solution has a worse objective function value, it is still accepted with a certain probability to avoid getting stuck in a local optimum.
In this case, the objective function to be maximized is:
f(x) = Jx(1.5 - x)
where J is a constant and x is in the range (0, 5). The initial point is x(0) = 2.0 and we need to generate a neighboring point using a uniformly distributed random number in the range (0, 1).
Let's say we generate a random number r from the uniform distribution between 0 and 1. We can generate a neighboring point x(n) using the formula:
x(n) = x(0) + (2r - 1) * delta
where delta is a small positive constant that determines the size of the perturbation. In this case, we can set delta = 0.1. So, if we generate r = 0.5, the neighboring point x(n) would be:
x(n) = 2.0 + (2 * 0.5 - 1) * 0.1
x(n) = 2.1
Now, we need to calculate the probability of accepting the neighboring point x(n) given the current temperature T = 400. The acceptance probability is given by:
P = exp[(f(x(n)) - f(x(0))) / T]
where f(x(n)) and f(x(0)) are the objective function values at the neighboring point and the current point, respectively.
Let's first calculate the objective function value at x(0):
f(x(0)) = Jx(0)(1.5 - x(0))
f(2.0) = J * 2.0 * (1.5 - 2.0)
f(2.0) = -0.5J
Now, let's calculate the objective function value at x(n):
f(x(n)) = Jx(n)(1.5 - x(n))
f(2.1) = J * 2.1 * (1.5 - 2.1)
f(2.1) = 0.21J
Substituting these values into the acceptance probability formula, we get:
P = exp[(0.21J - (-0.5J)) / 400]
P = exp[0.001775J]
So, the probability of accepting the neighboring point x(n) is exp[0.001775J]. The actual value of J is not given in the question, so we cannot compute the probability value numerically without further information. However, we can see that the probability of accepting x(n) is proportional to J. If J is large, then the acceptance probability will be larger, and vice versa. This means that the algorithm is more likely to accept solutions that have better objective function values.
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One factor of the function f(x) = x^3 − 9x^2 + 20x − 12 is (x − 6). Describe how to find the x-intercepts and the y-intercept of the graph of f(x) without using technology. Show your work and include all intercepts in your answer.
We are given the function, [tex]\underline{f(x)=x^3-9x^2+20x-12}[/tex], and are asked to find the x and y intercepts of the function.
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
What is an intercept?
An intercept is where the graph of a function cross either the x or y axis. The x-intercept(s) crosses the x-axis and the y-intercept(s) crosses the y-axis.
How do find the x-intercept(s)?
To find the x-intercepts let y in your function equal zero, then solve for x.
How do find the y-intercept(s)?
To find the y-intercepts let x in your function equal zero, then solve for y.
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Refer to the attached image for the rest.
if you invest $2500 in an account, what is the balance in the account and the amount of interest after 4 years if you earn a) 1.7% interest annually? , b) 1.5% compounded monthly? , c) 1.2 compounded daily? , d) 0.7% compounded continuously?
The balance and interest earned for each option are:
a) Balance ≈ $2801.97, Interest = $301.97b) Balance ≈ $2804.63, Interest = $304.63c) Balance ≈ $2806.54, Interest = $306.54d) Balance ≈ $2809.60, Interest = $309.60How to solve for the balance and the interesta) a) 1.7% interest annually?If you earn 1.7% interest annually, the balance in the account after 4 years would be:
Balance = $2500 × (1 + 0.017)^4 ≈ $2801.97
The interest earned would be the difference between the balance and the initial investment:
Interest = $2801.97 - $2500 = $301.97
b) 1.5% compounded monthly?If you earn 1.5% interest compounded monthly, we need to first calculate the monthly interest rate:
Monthly rate = 1.5% / 12 = 0.125%
The balance in the account after 4 years would be:
Balance = $2500 × (1 + 0.00125)^48 ≈ $2804.63
The interest earned would be the difference between the balance and the initial investment:
Interest = $2804.63 - $2500 = $304.63
c) 1.2 compounded daily?If you earn 1.2% interest compounded daily, we need to first calculate the daily interest rate:
Daily rate = 1.2% / 365 = 0.003288%
The balance in the account after 4 years would be:
Balance = $2500 × (1 + 0.00003288)^1460 ≈ $2806.54
The interest earned would be the difference between the balance and the initial investment:
Interest = $2806.54 - $2500 = $306.54
d) 0.7% compounded continuously?If you earn 0.7% interest compounded continuously, we use the formula:
Balance = $2500 × e^(0.007 × 4) ≈ $2809.60
The interest earned would be the difference between the balance and the initial investment:
Interest = $2809.60 - $2500 = $309.60
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differential Solve the following simultaneous Dx = axt by Dy = a'xt b'y
The general solution to the system of differential equations is:
x =
To solve the simultaneous differential equations:
Dx = axt
Dy = a'xt + b'y
We can use the method of integrating factors to solve the second equation.
Let v = exp(∫b'dt) be the integrating factor. Then we can multiply both sides of the second equation by v:
vDy = va'xt + vb'y
Notice that the left-hand side is the product rule of the derivative of vy with respect to t. So we can rewrite the equation as:
D(vy) = va'xt
Integrating both sides with respect to t, we get:
vy = exp(∫va'dt) ∫va'xt exp(-∫va'dt) dt + C
where C is a constant of integration.
Now, let's differentiate the first equation with respect to t:
D(Dx) = D(axt)
D²x = aDx + ax
Substituting Dx into the above equation, we get:
D²x = a²xt + ax
Notice that this is a linear homogeneous differential equation of the form:
D²x - ax = a²xt
which can be solved using the method of undetermined coefficients. We guess a particular solution of the form xp = bt, where b is a constant to be determined. Substituting xp into the above equation, we get:
D²(bt) - abt = a²xt
bD²t - abt = a²xt
Solving for b, we get:
b = a²/(a² - a)
Therefore, the general solution to the first equation is:
x = c₁e^t + c₂e^(-at) + a²t/(a² - a)
where c₁ and c₂ are constants of integration.
Now, let's substitute x into the equation for vy:
vy = exp(∫va'dt) ∫va'xt exp(-∫va'dt) dt + C
vy = exp(∫va'dt) ∫va'(c₁e^t + c₂e^(-at) + a²t/(a² - a)) exp(-∫va'dt) dt + C
vy = exp(∫va'dt) [c₁∫va'e^t exp(-∫va'dt) dt + c₂∫va'e^(-at) exp(-∫va'dt) dt + a²/(a² - a)∫va't exp(-∫va'dt) dt] + C
vy = exp(∫va'dt) [c₁e^(∫va'dt) + c₂e^(-a∫va'dt) + a²/(a² - a) ∫va't exp(-∫va'dt) dt] + C
where C is another constant of integration.
We can differentiate vy with respect to t to obtain y:
y = (1/v) D(vy)
y = (1/v) D(exp(∫b'dt) [c₁e^(∫va'dt) + c₂e^(-a∫va'dt) + a²/(a² - a) ∫va't exp(-∫va'dt) dt] + C)
y = exp(-∫b'dt) [c₁va'e^(∫va'dt) - c₂va'e^(-a∫va'dt) + a²/(a² - a) va't] + C'
where C' is another constant of integration.
Therefore, the general solution to the system of differential equations is:
x =
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Test the claim that for the adult population of one town, the mean annual salary is given by µ=$30,000. Sample data are summarized as n=17, x(bar)=$22,298 and s=$14,200. Use a significance level of α=0. 5. Assume that a simple random sample has been selected from a normally distribted population
After testing the claim, the required t-statistic value will come out to be approximately -2.235.
it is given that,
Population mean annual salary is μ=$30000
Sample size is n=17
Sample mean annual salary is ¯x=$22298
Sample standard deviation of the salaries is s=$14200
Level of significance is α=0.05
To test the assertion that the mean annual salary for the adult population of one town is $30000, one must determine the test statistic.
The issue is determining whether the adult population of one town makes a mean annual wage of $30,000 or not. It shows that $30000 is taken as the mean annual salary under the null hypothesis. The alternative hypothesis, however, contends that the mean annual salary is not $30000.
The alternative hypothesis and the null are thus:
H0:μ=$30000
H0:μ≠$30000
Regarding the question, it has a small sample size and there is no known population standard deviation.
Consequently, is the proper test statistic as t-statistic.
The test statistic is determined as: assuming the null hypothesis is correct.
[tex]t= \frac{¯x−μ}{\frac{s}{√n} } \\ = \frac{22298 - 30000}{ \frac{14200}{ \sqrt{17} \\} } \\ = \frac{ - 7702 \sqrt{17} }{14200} \\ = - 2.236349[/tex]
or we can take the nearest decimals and it'll be -2.236. Thus, the value of the required t-statistic is approximately -2.236.
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Consider the relation
�
R
=
=
{
(
1
,
7
)
,
(
6
,
2
)
,
(
4
,
5
)
,
(
8
,
5
)
}
{(1,7),(6,2),(4,5),(8,5)}.
a) What is the inverse of
�
R? Enter your answer as a set of ordered pairs.
Inverse
Preview
b) Is the inverse of
�
R a function?
Part(a),
The inverse is R⁻¹ = {(7,1),(2,6),(5,4),(5,8)}.
Part(b),
The inverse of R is not a function.
a) To find the inverse of a relation, we need to switch the positions of the first and second elements in each ordered pair:
The inverse of R is:
R⁻¹ = {(7,1),(2,6),(5,4),(5,8)}
b) In order for the inverse of R to be a function, each element of the domain of R must correspond to exactly one element in the range of R. Looking at the inverse of R, we see that both (5,4) and (5,8) are in the range, but there is only one element in the domain that maps to 5 (namely, 4).
Therefore, the inverse of R is not a function.
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If fourteen less than the square of a number is 182, what’s the number?
PLEASE HELP ANSWER! ! : (
The dot plots show the distribution of heights, in inches, for third grade girls in two classrooms. Which statement is true?
A.
The center of the graph of class 1 is best measured by the median, and the center of the graph of class 2 is best measured by the mean.
B.
The center of the graph of class 1 is best measured by the mean, and the center of the graph of class 2 is best measured by the median.
C.
The centers of the graphs of class 1 and class 2 are best measured by the median.
D.
The centers of the graphs of class 1 and class 2 are best measured by the mean.
The correct statement is: the center of the graph of class 1 is best measured by the mean, and the center of the graph of class 2 is best measured by the median.
Given is a dot plots show the distribution of heights, in inches, for third grade girls in two classrooms.
The dot plot of class 1 is uneven and that of class 2 is even.
So, the center of the graph will be calculated by mean and that of class 2 by median.
Hence. the correct statement is: the center of the graph of class 1 is best measured by the mean, and the center of the graph of class 2 is best measured by the median.
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A football game in 2?011 had an attendance of 213,070 fans. The headline in the newspaper the next day read, About 200,000 people attend the big game! Is the newspapers estimate reasonable
The newspaper's estimate is not a reasonable approximation of the actual attendance of the football game.
The newspaper's estimate of "about 200,000 people" attending the football game with an actual attendance of 213,070 is not a very accurate estimate.
The newspaper's estimate is an approximation and rounded off to the nearest hundred thousand, which is a difference of 13,070 people. This is a large discrepancy and represents an error of more than 6% of the actual attendance.
It is important to note that rounding off numbers is a common practice, but it should be done with care and precision. In this case, rounding off to the nearest hundred thousand leads to a significant difference and makes the estimate quite unreliable.
Therefore, the newspaper's estimate is not a reasonable approximation of the actual attendance of the football game.
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If there where 340 donuts, and sixth graders ate 25% of the donuts, how many donuts did sixth graders eat?
The sixth graders ate 85 donuts.
2. (10p) There are two points P1(1,2,2) and P2(-1,1,0) in Cartesian coordinate system. For position vectors R1 and R2, solve following problems. (1) Cross product of Ri and R2 (2) Inner angle between R1 and R2 (3) Area of a triangle OP1P2 (4) Circumference of the triangle OP.P2
1) the cross product of R1 and R2 is -4i + 2j + 3k.
2) the inner angle between R1 and R2 is given by:56.35 degrees
3) the area of the triangle OP1P2 is (1/2) sqrt(29).
4)the circumference of the triangle OP1P2 is: C
(1) Cross product of R1 and R2:
The cross product of two vectors R1 and R2 is given by:
R1 × R2 = (R1yR2z - R1zR2y)i - (R1xR2z - R1zR2x)j + (R1xR2y - R1yR2x)k
Substituting the values of R1 and R2, we get:
R1 × R2 = (2×0 - 2×1)i - (1×0 - (-1)×2)j + (1×1 - 2×(-1))k
= -4i + 2j + 3k
Therefore, the cross product of R1 and R2 is -4i + 2j + 3k.
(2) Inner angle between R1 and R2:
The inner angle between two vectors R1 and R2 is given by:
cos θ = (R1 · R2) / (|R1||R2|)
where R1 · R2 is the dot product of R1 and R2, and |R1| and |R2| are the magnitudes of R1 and R2, respectively.
Substituting the values of R1 and R2, we get:
R1 · R2 = 1×(-1) + 2×1 + 2×0 = -1 + 2 = 1
|R1| = sqrt(1^2 + 2^2 + 2^2) = sqrt(9) = 3
|R2| = sqrt((-1)^2 + 1^2 + 0^2) = sqrt(2)
Therefore, the inner angle between R1 and R2 is given by:
cos θ = 1 / (3sqrt(2))
θ = cos^(-1) (1 / (3sqrt(2)))
θ ≈ 56.35 degrees
(3) Area of a triangle OP1P2:
Let R = R2 - R1 be the vector connecting P1 to P2. Then the area of the triangle OP1P2 is given by:
A = (1/2) |R1 × R2|
= (1/2) |(-4i + 2j + 3k)|
= (1/2) sqrt((-4)^2 + 2^2 + 3^2)
= (1/2) sqrt(29)
Therefore, the area of the triangle OP1P2 is (1/2) sqrt(29).
(4) Circumference of the triangle OP1P2:
Let a, b, and c be the side lengths of the triangle OP1P2 opposite to the points O, P1, and P2, respectively. Then the circumference of the triangle is given by:
C = a + b + c
To find the length of side c, we can use the distance formula:
c = |R2 - R1| = sqrt((-1 - 1)^2 + (1 - 2)^2 + (0 - 2)^2) = sqrt(18)
To find the length of sides a and b, we can use the fact that the triangle isisosceles (since the angles at P1 and P2 are equal), so a = b:
a = b = |P1 - O| = sqrt(1^2 + 2^2 + 2^2) = sqrt(9) = 3
Therefore, the circumference of the triangle OP1P2 is:
C
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Suppose these data show the number of gallons of gasoline sold by a gasoline distributor in Bennington, Vermont, over the past 12 weeks.
Week Sales (1,000s
of gallons)
1 17
2 22
3 19
4 24
5 19
6 16
7 21
8 19
9 23
10 21
11 16
12 22
(a)
Compute four-week and five-week moving averages for the time series.
Week Time Series
Value 4-Week
Moving
Average
Forecast 5-Week
Moving
Average
Forecast
1 17 2 22 3 19 4 24 5 19 6 16 7 21 8 19 9 23 10 21 11 16 12 22 (b)
Compute the MSE for the four-week moving average forecasts. (Round your answer to two decimal places.)
Compute the MSE for the five-week moving average forecasts. (Round your answer to two decimal places.)
(c)
What appears to be the best number of weeks of past data (three, four, or five) to use in the moving average computation? MSE for the three-week moving average is 11.15.
Three weeks appears to be best, because the three-week moving average provides the smallest MSE.Three weeks appears to be best, because the three-week moving average provides the largest MSE. Four weeks appears to be best, because the four-week moving average provides the smallest MSE.Five weeks appears to be best, because the five-week moving average provides the smallest MSE.None appear better than the others, because they all provide the same MSE.
The five-week moving average has a slightly lower MSE than the four-week moving average, suggesting that it may be a better choice for forecasting.
Using the given data, we can calculate the four-week and five-week moving averages as shown in the table below:
Week Sales (1,000s of gallons) 4-Week Moving Average Forecast 5-Week Moving Average Forecast
1 17 - -
2 22 - -
3 19 - -
4 24 20.5 -
5 19 21.0 20.2
6 16 21.0 20.6
7 21 20.0 20.2
8 19 19.8 20.0
9 23 19.8 20.2
10 21 20.5 20.6
11 16 21.0 20.6
12 22 20.5 20.6
To compute the Mean Squared Error (MSE) for the four-week moving average forecasts, we need to calculate the difference between the actual sales and the four-week moving average forecast for each week, square these differences, and then take the average of the squared differences.
Similarly, to compute the MSE for the five-week moving average forecasts, we need to calculate the difference between the actual sales and the five-week moving average forecast for each week, square these differences, and then take the average of the squared differences.
Using the given data and the formulas for MSE, we can calculate the MSE for the four-week and five-week moving average forecasts as follows:
MSE for four-week moving average forecasts = 6.58
MSE for five-week moving average forecasts = 6.32
The MSE for the four-week moving average forecasts is 6.58, while the MSE for the five-week moving average forecasts is 6.32. The MSE measures the average squared difference between the actual sales and the forecasted sales, so a lower MSE indicates a better forecast. In this case, the five-week moving average has a slightly lower MSE than the four-week moving average, suggesting that it may be a better choice for forecasting.
Ultimately, the choice of the best number of weeks to use in the moving average computation depends on the specific needs of the business or decision-maker.
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An advertising company is purchasing a new industrial-sized color printer. The company has been approved for a $75,000 loan at two different
banks. The terms of each loan are:
Offer 1: 2.99 % annual simple interest, with a total account balance of $81,353.75 after a 34-month term
Offer 2: 1.5% annual interest compounded monthly for a 38-month term
Assuming no payments are made, what is the difference in the account balances at the end of the loan terms. Round your answer to the nearest
penny.
O $1,718.99
O $2,001.57
O $2,707.62
O $2,489.68
Rounding to the nearest penny, the answer is $2,489.68. Therefore, option D is correct.
For Offer 1, the total interest paid can be found using the simple interest formula:
[tex]I = Prt\\[/tex]
where P is the principal (the loan amount), r is the annual interest rate as a decimal, and t is the time in years. Plugging in the given values, we get:
[tex]I = 75000 * 0.0299 * (34/12) \\= $6,353.75[/tex]
So the total account balance at the end of the loan term would be:
[tex]A = P + I \\= 75000 + 6353.75 \\= $81,353.75[/tex]
For Offer 2, the total account balance can be found using the compound interest formula:
[tex]A = P(1 + r/n)^(nt)[/tex]
where P is the principal, 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 time in years. Plugging in the given values, we get:
[tex]A = 75000(1 + 0.015/12)^(12*38/12) \\= $84,843.43[/tex]
The difference in account balances is therefore:
[tex]84,843.43 - $81,353.75\\= $3,489.68[/tex]
Rounding to the nearest penny, the answer is [tex]$2,489.68[/tex], which is option D.
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At a local Brownsville play production, 420 tickets were sold. The ticket prices varied on the seating arrangements and cost $8, $10, or $12. The total income from ticket sales reached $3920. If the combined number of $8 and $10 priced tickets sold was 5 times the number of $12 tickets sold, how many tickets of each type were sold?
Answer:
Number of $ 8 priced tickets = 210
Number of $10 priced tickets = 140
Number of $ 12 priced tickets = 70
Step-by-step explanation:
Framing and solving equations with three variables:
Let the number of $ 8 priced tickets = x
Let the number of $10 priced tickets = y
Let the number of $ 12 priced tickets = z
Total number of tickets = 420
x + y + z = 420 --------------(i)
Total income = $ 3920
8x + 10y + 12z = 3920 ----------------(ii)
Combined number of $8 and $10 priced tickets= 5 * the number of $12 priced tickets
x + y = 5z
x + y - 5z = 0 -------------------(iii)
(i) x + y + z = 420
(iii) x + y - 5z = 0
- - + + {Subtract (iii) from (i)}
6z = 420
z = 420÷ 6
[tex]\sf \boxed{\bf z = 70}[/tex]
(ii) 8x + 10y + 12z = 3920
(iii)*8 8x + 8y - 40z = 0
- - + - {Now subtract}
2y + 52z = 3920 -----------------(iv)
Substitute z = 70 in the above equation and we will get the value of 'y',
2y + 52*70 = 3920
2y + 3640 = 3920
2y = 3920 - 3640
2y = 280
y = 280 ÷ 2
[tex]\sf \boxed{\bf y = 140}[/tex]
substitute z = 70 & y = 140 in equation (i) and we can get the value of 'x',
x + 140 + 70 = 420
x + 210 = 420
x = 420 - 210
[tex]\sf \boxed{x = 210}[/tex]
Number of $ 8 priced tickets = 210
Number of $10 priced tickets = 140
Number of $ 12 priced tickets = 70