Evaluate each expression using the values given in the table. 1 х f(x) g(x) -3 -2 -4 -3 3 - 1 -2. 0 0 -1 1 ON a. (fog)(1) d.(gof)(0) b. (fog)(-1) e. (gog)(-2) c. (gof)(-1) f. (fof)(-1)

Answers

Answer 1

Evaluating each expression using the values given in the table :

a. (f ∘ g)(1) = -2

b. (f ∘ g)(-1) = 3

c. (g ∘ f)(-1) = 0

d. (g ∘ f)(0) = -1

e. (g ∘ g)(-2) = 1

f. (f ∘ f)(-1) = 3

Here is the explanation :

To evaluate each expression, we need to substitute the given values into the functions f(x) and g(x) and perform the indicated composition.

a. (f ∘ g)(1):

First, find g(1) = 0.

Then, substitute g(1) into f: f(g(1)) = f(0) = -2.

b. (f ∘ g)(-1):

First, find g(-1) = 1.

Then, substitute g(-1) into f: f(g(-1)) = f(1) = 3.

c. (g ∘ f)(-1):

First, find f(-1) = 1.

Then, substitute f(-1) into g: g(f(-1)) = g(1) = 0.

d. (g ∘ f)(0):

First, find f(0) = -2.

Then, substitute f(0) into g: g(f(0)) = g(-2) = -1.

e. (g ∘ g)(-2):

First, find g(-2) = -1.

Then, substitute g(-2) into g: g(g(-2)) = g(-1) = 1.

f. (f ∘ f)(-1):

First, find f(-1) = 1.

Then, substitute f(-1) into f: f(f(-1)) = f(1) = 3.

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Related Questions

abby is comparing monthly phone charges from two companies. phenix charges $30 plus $.5 per minute. Nuphone charges $40 plus $.10 per minute. in how many minutes will the total be the same

Answers

Answer:

In 25 minutes, the monthly phone charges of both companies will be the same.

Step-by-step explanation:

If we allow m to represent the number of minutes, we can create two equations for C, the total cost of phone charges from both companies:

Phoenix equation:  C = 0.5m + 30

Nuphone equation: C - 0.10m + 40

Now, we can set the two equations equal to each other.  Solving for m will show us how many minutes must Abby use for the total cost at both companies to be the same:

0.5m + 30 = 0.10m + 40

Step 1:  Subtract 30 from both sides:

(0.5m + 30 = 0.10m + 40) - 30

0.5m = 0.10m + 10

Step 2:  Subtract 0.10m from both sides:

(0.5m = 0.10m + 10) - 0.10m

0.4m = 10

Step 3:  Divide both sides by 0.4 to solve for m (the number of minutes it takes for the total cost of both companies to be the same)

(0.4m = 10) / 0.4

m = 25

Thus, Abby would need to use 25 minutes for the total cost at both companies to be the same.

Optional Step 4: Check the validity of the answer by plugging in 25 for m in both equations and seeing if we get the same answer:

Checking m = 25 with Phoenix equation:

C = 0.5(25) + 30

C = 12.5 + 30

C = 42.5

Checking m = 25 with Nuphone equation:

C = 0.10(25) + 40

C = 2.5 + 40

C = 42.5

Thus, m = 25 is the correct answer.

NEED HELP ASAP!!!
What is the probability that the event will occur?

Answers

Answer:  0.67

Work Shown:

n(A only) = number of items inside set A only

n(A only) = 12

n(A and B) = 16

n(B only) = 20

n(A or B) = n(A only) + n(A and B) + n(B only)

n(A or B) = 12 + 16 + 20

n(A or B) = 48

n(Total) = n(A only) + n(A and B) + n(B only) + n(Not A, not B)

n(Total) = 12+16+20+24

n(Total) = 72

P(A or B) = n(A or B)/n(Total)

P(A or B) = 48/72

P(A or B) = 0.67 approximately

Consider the rational function 1 -a-12 Instruction: Use the Graphing Strategy Step 1 Analyze f(x).. A). Find the domain of f(x), B). Find the intercepts of f(x). C). Find asymptotes. Step 2. Analyze.f'(x) Determine the intervals where f(x) is increasing, decreasing, and find local maxima and local minima. Step 3 Analyze f'(x) Determine the intervals on which the graph of f(x) is concave upward or concave downward, and find the inflection points. Step 4. Sketch the graph of f(x) using all the steps above.

Answers

The given rational function 1/(x^2 - a - 12) is analyzed by finding the domain, intercepts, asymptotes, intervals of increase/decrease, local extrema, and concavity to sketch its graph.

To analyze the rational function 1/(x^2 - a - 12), we will follow the given graphing strategy:

Analyze f(x)

A) Domain of f(x): The function is defined for all real values of x except where the denominator becomes zero. So, the domain of f(x) is all real numbers except for the values of x that make the denominator, x^2 - a - 12, equal to zero.

B) Intercepts of f(x): To find the x-intercepts, we set f(x) = 0 and solve for x. To find the y-intercept, we evaluate f(0).

C) Asymptotes: To find the vertical asymptotes, we determine the values of x that make the denominator zero. To find the horizontal asymptotes, we examine the behavior of the function as x approaches positive and negative infinity.

Analyze f'(x)

Determine the derivative f'(x) and analyze its intervals to find where f(x) is increasing or decreasing. Identify any local maxima and minima by finding the critical points where f'(x) = 0 or does not exist.

Analyze f''(x)

Find the second derivative f''(x) and analyze its intervals to determine where the graph of f(x) is concave upward or concave downward. Identify any inflection points where the concavity changes.

Sketch the graph of f(x) using all the information gathered from the previous steps, including the domain, intercepts, asymptotes, intervals of increase/decrease, local maxima/minima, and concavity.

By following this strategy, we can sketch the graph of the rational function 1/(x^2 - a - 12) and visualize its characteristics.

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From the set of whole numbers 1 to 10 , we randomly select one number .

The probability that the number is greater than 4 ( > 4 ) is 0.6 .

True

False

Answers

From the set of whole numbers 1 to 10 , we randomly select one number . The probability that the number is greater than 4 ( > 4 ) is 0.6. True

The statement is true because the probability given is greater than 0.5, indicating a higher likelihood of selecting a number greater than 4 from the set of whole numbers 1 to 10.

To understand this, we can consider the concept of probability. Probability is a measure of the likelihood of an event occurring, ranging from 0 (impossible) to 1 (certain). In this case, the probability of selecting a number greater than 4 is given as 0.6, which is greater than 0.5.

When the probability is greater than 0.5, it means that the event is more likely to happen than not. In other words, there is a higher chance of selecting a number greater than 4 from the set of whole numbers 1 to 10.

Since the set of numbers includes values from 1 to 10, and the probability is specifically stated for selecting a number greater than 4, it aligns with the understanding that a number greater than 4 has a higher likelihood of being chosen. Thus, the statement is true.

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Given f(x)=11^x, what is f^-1(x)?

Answers

Answer:

The first one

[tex] log_{11} \: (x)[/tex]

Step-by-step explanation:

f(x) = 11^x

Here are the steps to find the inverse of a function:

1. Let f(x)=y

2. Make x the subject of formula.

3. Replace y by x.

[tex]11 {}^{x} = y \\ \: log(11 {}^{x} ) = log(y) \\ x log(11) = log(y) \\ x = \frac{ log(y) }{ log(11) } = log_{11}(y) \\ f {}^{ - 1} (x) = log_{11}(x) [/tex]

A simple random sample of size n is drawn from a population that in normally distributed. The sample mean, is found to be 100, and the sample stamdard deviation is found to be 8.
Construct a 98% confidence interval about µ, if the samplesize n, is 20,
Lower bound: _______ Upper bound: ____________
(Round to one decimal place as needed

Answers

As per the confidence interval, Lower Bound is 94.874 and the Upper Bound is 105.126

Sample Mean = 100

Sample Standard Deviation = 8

Sample Size = 20

Calculating the confidence interval -

Confidence Interval = Sample Mean ± (Critical Value) x (Standard Deviation / √(Sample Size))

Substituting the values

= 100 ± (2.860) x (8 / √20)

= 100 ± 2.860 x (8 / 4.472)

= 100 ± 2.860 x 1.789

= 100 ± 5.126

Calculating the lower bound -

Lower Bound = 100 - 5.126 = 94.874

Calculating the upper bound -

Upper Bound = 100 + 5.126 = 105.126

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GCF factor the following. 1. 6x² + 3x2.-4x^3 – 8x² 3. 16x²y - 20x²y² 4. 7x² - 5x

Answers

GCF factor,

1. 6x² + 3x² - 4x³ - 8x² = x²(-4x - 2)

2. 16x²y - 20x²y² = 4x²y(4 - 5y)

3. 7x² - 5x. (No further factorization possible)

Let's factor in the given expressions:

1. 6x² + 3x² - 4x³ - 8x²:

First, we can factor out the greatest common factor (GCF) of the terms, which is 1x².

GCF = x²

After factoring out the GCF, we have:

x²(6 + 3 - 4x - 8)

x²(-4x - 2)

Therefore, the factored form is x²(-4x - 2).

2. 16x²y - 20x²y²:

Again, we can factor out the GCF of the terms, which is 4x²y.

GCF = 4x²y

Factoring out the GCF, we get:

4x²y(4 - 5y)

So, the factored form is 4x²y(4 - 5y).

3. 7x² - 5x:

In this expression, there is no common factor between the terms other than 1.

Therefore, the factored form remains the same: 7x² - 5x.

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Use the Gram-Schmidt process to obtain an orthogonal basis of Col(K): 1 -1 3 1 0 -1 -2 1 K= -3 -1 3 1 -2 1 3 -2 -3 0 -1 -1 2 6 3 2 -1 2 -1 0 1 0 ܝ

Answers

To obtain an orthogonal basis of Col(K) using the Gram-Schmidt process, we start with the given vectors in K:

v₁ = [1, -1, 3, 1],

v₂ = [0, -1, -2, 1],

v₃ = [-3, 0, -1, -1],

v₄ = [2, 6, 3, 2],

v₅ = [-1, 2, -1, 0],

v₆ = [1, 0, 1, 0].

We will perform the Gram-Schmidt process step by step:

Step 1: Set the first vector as the first basis vector:

u₁ = v₁ = [1, -1, 3, 1].

Step 2: Compute the projection of v₂ onto u₁ and subtract it from v₂ to obtain the second orthogonal vector:

u₂ = v₂ - projₙ(v₂, u₁),

where projₙ(v, u) is the projection of vector v onto vector u.

Calculating the projection:

projₙ(v₂, u₁) = (v₂ · u₁) / (u₁ · u₁) * u₁,

where · denotes the dot product.

projₙ(v₂, u₁) = ((0*1) + (-1*(-1)) + (-2*3) + (1*1)) / ((1*1) + (-1*(-1)) + (3*3) + (1*1)) * [1, -1, 3, 1],

projₙ(v₂, u₁) = 2/12 * [1, -1, 3, 1],

projₙ(v₂, u₁) = [1/6, -1/6, 1/2, 1/6].

Subtracting the projection from v₂:

u₂ = v₂ - projₙ(v₂, u₁),

u₂ = [0, -1, -2, 1] - [1/6, -1/6, 1/2, 1/6],

u₂ = [5/6, -5/6, -11/6, 5/6].

Step 3: Repeat the process for the remaining vectors v₃, v₄, v₅, and v₆.

u₃ = v₃ - projₙ(v₃, u₁) - projₙ(v₃, u₂),

u₄ = v₄ - projₙ(v₄, u₁) - projₙ(v₄, u₂) - projₙ(v₄, u₃),

u₅ = v₅ - projₙ(v₅, u₁) - projₙ(v₅, u₂) - projₙ(v₅, u₃) - projₙ(v₅, u₄),

u₆ = v₆ - projₙ(v₆, u₁) - projₙ(v₆, u₂) - projₙ(v₆, u₃) - projₙ(v₆, u₄) - projₙ(v₆, u₅).

Calculating each projection and subtraction, we get:

u₃ = [13/3, 1/3, 5/3, 1/3],

u₄ = [4/15, 26/15, -1/15, -2/15],

u₅ = [2/5, -4/5, -1/5

, 0],

u₆ = [5/13, 0, 5/13, 0].

Therefore, an orthogonal basis for Col(K) is given by:

{u₁, u₂, u₃, u₄, u₅, u₆} = {[1, -1, 3, 1], [5/6, -5/6, -11/6, 5/6], [13/3, 1/3, 5/3, 1/3], [4/15, 26/15, -1/15, -2/15], [2/5, -4/5, -1/5, 0], [5/13, 0, 5/13, 0]}.

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Solve the dual problem associated to the following problem Minimize P=2x+9y

s. t. 3x + 5y ≥ 3
9x + 5y ≥ 8
x, y ≥ 0

Answers

The dual of the linear problem is

Max P = 3x + 8y

Subject to:

3x + 9y + a₁ ≥ 2

5x + 5y + a₂ ≥ 9

a₁ + a₂ ≥ 0

How to calculate the dual of the linear problem

From the question, we have the following parameters that can be used in our computation:

Max P = 2x + 9y

Subject to:

3x + 5y ≥ 3

9x + 5y ≥ 8

x, y ≥ 0

Convert to equations using additional variables, we have

Max P = 2x + 9y

Subject to:

3x + 5y + s₁ = 3

9x + 5y + s₂ = 8

x, y ≥ 0

Take the inverse of the expressions using 3 and 8 as the objective function

So, we have

Max P = 3x + 8y

Subject to:

3x + 9y + a₁ ≥ 2

5x + 5y + a₂ ≥ 9

a₁ + a₂ ≥ 0

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what are the foci of the ellipse given by the equation 225x^2 144y^2=32400

Answers

The foci of the ellipse given by the equation 225x^2 + 144y^2 = 32400 can be found by identifying the major and minor axes of the ellipse and using the formula for the foci coordinates. The foci of the ellipse are located at (±c, 0). Therefore, the foci are approximately (±15.87, 0).

The equation of the ellipse can be rewritten in standard form:

(225x^2)/32400 + (144y^2)/32400 = 1

We can identify the major and minor axes of the ellipse by comparing the coefficients of x^2 and y^2. The square root of the denominator gives the lengths of the semi-major axis (a) and semi-minor axis (b) of the ellipse.

a = sqrt(32400/225) = 24

b = sqrt(32400/144) = 18

The foci of the ellipse can be calculated using the formula:

c = sqrt(a^2 - b^2)

c = sqrt(24^2 - 18^2)

c = sqrt(576 - 324)

c = sqrt(252)

c ≈ 15.87

The foci of the ellipse are located at (±c, 0). Therefore, the foci are approximately (±15.87, 0).

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Describe the quotient space of R by the equivalence relation ~ r-yeZ.

Answers

We can describe the quotient space of R by R/~, R/~ = {[r] | r in R}, i.e., the quotient space is the set of all equivalence classes of real numbers under the relation ~.

In algebra, a quotient is a type of number that is the result of division. In topology, a quotient space is a set formed by collapsing certain subsets of another space in a particular way.

A quotient space can also be defined as a topological space that is formed by collapsing a subspace. In this way, the new space has the same topology as the original space.

To describe the quotient space of R by the equivalence relation ~ r-yeZ, we need to look at the set of real numbers R and the equivalence relation ~, where r ~ y if r-y is an element of Z, the set of integers.

Let us denote the equivalence class of an element r in R by [r]. The equivalence class is the set of all real numbers that are equivalent to r under the equivalence relation, i.e., [r] = {y in R | r ~ y}.

We can partition R into equivalence classes in this way:

For any r in R, the equivalence class [r] is the set of all real numbers of the form r+n, where n is an element of Z, i.e., [r] = {r+n | n in Z}. Thus, each equivalence class is a set of real numbers that are all equivalent to each other under the equivalence relation ~.

The quotient space of R by the equivalence relation ~ is the set of all equivalence classes under the relation ~.

We can denote the quotient space by R/~. Thus, R/~ = {[r] | r in R}, i.e., the quotient space is the set of all equivalence classes of real numbers under the relation ~.

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Solve the given initial-value problem. dy + P(x)y = ex, y) = -3, where dx ſ 1, 1, 0

Answers

Given: dy + P(x)y = ex, y) = -3; dx ſ 1, 1, 0 To solve the initial-value problem, we need to apply the integrating factor method which involves the following steps:

Find the integrating factor `IF(x)` by multiplying both sides of the differential equation by the integrating factor `IF(x)`. By using the product rule, find the left-hand side of the differential equation in the form of d/dx[IF(x)y(x)] = IF(x)ex , that is, the derivative of the product `IF(x)y(x)` equals to `IF(x)ex` Integrate both sides of the differential equation and solve for y by dividing both sides of the equation by the integrating factor `IF(x)`. Now, let's solve the given initial-value problem using the above steps: Solve the initial value problem: dy + P(x)y = ex, y) = -3. Here, P(x) is a coefficient of y so the given differential equation is a first-order linear differential equation. For any first-order linear differential equation `dy/dx + P(x)y = Q(x)`, the integrating factor `IF(x)` is given by: `IF(x) = e^(∫P(x) dx)`Multiplying both sides of the differential equation by the integrating factor `IF(x)`, we get: `IF(x)dy + IF(x)P(x)y = IF(x)ex`

Therefore, the left-hand side of the differential equation is the derivative of the product `IF(x)y(x)`, so by using the product rule, we get: d/dx[IF(x)y(x)] = IF(x)ex Multiplying both sides of the above equation by dx and integrating both sides, we get:`∫d/dx[IF(x)y(x)] dx = ∫IF(x)ex dx``. IF(x)y(x) = ∫IF(x)ex dx + C` where C is the constant of integration. By dividing both sides of the above equation by the integrating factor `IF(x)`, we get: `y(x) = [∫IF(x)ex dx + C] / IF(x)`Substituting the values of P(x) and IF(x) in the above equation, we get: `P(x) = 1`IF(x) = e^(∫dx) = e^x`y(x) = [∫e^xex dx + C] / e^x``y(x) = [∫e^(2x) dx + C] / e^x``y(x) = e^(-x) [1/2 * e^(2x) + C]`Using the initial condition y(1) = -3, we get: `y(1) = e^(-1) [1/2 * e^2 + C]``-3 = 1/2 * e + C`. Solving for C, we get: `C = -3 - 1/2 * e`.

Therefore, the solution of the initial-value problem dy + P(x)y = ex, y) = -3; dx ſ 1, 1, 0 is given by: `y(x) = e^(-x) [1/2 * e^(2x) - 3 - 1/2 * e]`. Hence, the required solution is `y(x) = e^(-x) [1/2 * e^(2x) - 3 - 1/2 * e]`.

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Classify the system and identify the number of solutions. x - 3y - 8z = -10 2x + 5y + 6z = 13 3x + 2y - 2z = 3

Answers

The equations is inconsistent and has infinitely many solutions. The solution set can be written as {(x, (33-22z)/11, z) : x, z E R}.

This is a system of three linear equations with three variables, x, y, and z. The system can be represented in matrix form as AX = B where A is the coefficient matrix, X is the variable matrix, and B is the constant matrix.

A = |1 -3 -8| |2 5 6| |3 2 -2|

X = |x| |y| |z|

B = |-10| |13| | 3|

To determine the number of solutions for this system, we can use Gaussian elimination to reduce the augmented matrix [A|B] to row echelon form.

R2 - 2R1 -> R2

R3 - 3R1 -> R3

A = |1 -3 -8| |0 11 22| |0 11 22|

X = |x| |y| |z|

B = |-10| |33| |33|

Now we can see that there are only two non-zero rows in the coefficient matrix A. This means that there are only two leading variables, which are y and z. The variable x is a free variable since it does not lead any row.

We can express the solutions in terms of the free variable x:

y = (33-22z)/11

x = x

z = z

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Please look at the picture for context

Another sample of 250 students had a sample mean (bar) of 550. The P-value for this outcome is

Answers

It should be noted that the p-value for this outcome is 0.0057.

How to calculate the value

In order to calculate the p-value, we need to first calculate the test statistic. The test statistic is the difference between the sample mean and the hypothesized mean, divided by the standard error of the mean. In this case, the test statistic is:

t = (x - μ₀) / s / √n

= (550 - 570) / 125 / √250

= -2.53

We can find the p-value by looking up -2.53 in a t-table. The t-table tells us that the p-value is 0.0057.

Since the p-value is less than 0.05, we can reject the null hypothesis. This means that there is sufficient evidence to conclude that the mean GMAT score for college seniors in the Philippines is less than 570.

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If(-4,2) is a point on the graph of a one-to-one function f, which of the following points is on the graph off"12 Choose the correct answer below. a. (-4,-2) b. (4.-2) c. (-2.4) d. (2, 4)

Answers

Only option d. (2, 4) matches the point on the graph of f^(-1) corresponding to the y-value of -12.

Given that (-4, 2) is a point on the graph of a one-to-one function f, we can determine the point on the graph of f^(-1) (the inverse function of f) corresponding to the y-value of -12.

To find this point, we need to swap the x and y coordinates of the given point (-4, 2) and consider it as the new point (2, -4).

Now, we need to determine which of the listed points is on the graph of f^(-1) with a y-value of -12.

Let's evaluate each of the listed points:

a. (-4, -2): Swapping the x and y coordinates gives (-2, -4), which does not match the given point (2, -4).

b. (4, -2): Swapping the x and y coordinates gives (-2, 4), which does not match the given point (2, -4).

c. (-2, 4): Swapping the x and y coordinates gives (4, -2), which does not match the given point (2, -4).

d. (2, 4): Swapping the x and y coordinates gives (4, 2), which matches the given point (2, -4).

Among the given options, only option d. (2, 4) matches the point on the graph of f^(-1) corresponding to the y-value of -12.

Therefore, the correct answer is d. (2, 4).

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Consider the function z = f(x,y) = In(3 - 3x - y). What is the domain of this function?

Answers

The domain of the function f(x, y) is the set of all (x, y) values that satisfy the inequality y < 3 - 3x.

To determine the domain, we need to consider the restrictions on the variables x and y that would result in a valid logarithmic function. In this case, the natural logarithm ln is defined only for positive arguments.

For ln(3 - 3x - y) to be defined, the expression inside the logarithm (3 - 3x - y) must be greater than zero.

Thus, the domain of the function is the set of all (x, y) values that satisfy the inequality 3 - 3x - y > 0. This inequality can be rearranged as y < 3 - 3x.

Therefore, the domain of the function f(x, y) is the set of all (x, y) values that satisfy the inequality y < 3 - 3x.

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The simplified expression for the volume is

8x2 + 9x + 3.

8x2 + 14x + 3.

8x3 + 9x2 + 3x.

8x3 + 14x2 + 3x.

Answers

The simplified expression for the volume is 8x³ - 2x² - 3x. The answer is option C.

The length of the rectangular prism be x units. The width of the rectangular prism is given by the expression 2x + 1 units. The height of the rectangular prism is given by the expression 4x - 3 units. The volume of a rectangular prism is given by the formula V = lwh. Therefore the volume of the rectangular prism can be expressed as;V = x(2x + 1)(4x - 3)We can simplify this expression by using algebraic factorization. Hence;V = x(2x + 1)(4x - 3)V = x(8x² - 6x + 4x - 3)V = x(8x² - 2x - 3)V = 8x³ - 2x² - 3xHence, the simplified expression for the volume is 8x³ - 2x² - 3x. The answer is option C.

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The simplified expression is D) 8x3 + 14x2 + 3x.

Edge 2023

Find the area under the standard normal curve. from z = 0 to z = 1.46 from z = -0.32 to z = 0.98 from z = 0.07 to z = 2.51 to the right of z = 2.13 to the left of z = 1.04 B. Find the value of z so that the area under the standard normal curve from 0 to z is (approximately) 0.1965 and z is positive between 0 and z is (approximately) 0.2740 and z is negative in the left tail is (approximately) 0.2050 to the right of z is (approximately) 0.6285

Answers

The area under the standard normal curve to the left of z = 1.04 is approximately 0.8508.

To find the areas under the standard normal curve, we can use a standard normal distribution table or a statistical software. I will provide the calculated areas for the given scenarios:

a. Area from z = 0 to z = 1.46:

The area under the standard normal curve from z = 0 to z = 1.46 is approximately 0.4306.

b. Area from z = -0.32 to z = 0.98:

The area under the standard normal curve from z = -0.32 to z = 0.98 is approximately 0.5531.

c. Area from z = 0.07 to z = 2.51:

The area under the standard normal curve from z = 0.07 to z = 2.51 is approximately 0.4940.

d. Area to the right of z = 2.13:

The area under the standard normal curve to the right of z = 2.13 is approximately 0.0166.

e. Area to the left of z = 1.04:

The area under the standard normal curve to the left of z = 1.04 is approximately 0.8508.

Now let's move on to the second part:

B. Find the value of z for the given areas:

To find the value of z corresponding to a specific area under the standard normal curve, we can use a standard normal distribution table or a statistical software. Here are the approximate values of z for the given areas:

For an area under the curve from 0 to z of approximately 0.1965, the corresponding value of z is approximately -0.84.

For an area under the curve from 0 to z of approximately 0.2740, the corresponding value of z is approximately 0.61.

For an area in the left tail of approximately 0.2050, the corresponding value of z is approximately -0.84.

For an area to the right of z of approximately 0.6285, the corresponding value of z is approximately 0.33.

Please note that these values are approximations based on the standard normal distribution.

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Let X (respectively, Y) be the random variable that describes the load capacity index of the front (respectively rear) tire of a new car. Assume that the random pair (X,Y) has a joint probability function given by X Y 52 54 55 16 29 56 16 125 375 125 16 16 58 29 125 125 375 60 29 16 16 375 125 125 Calculate the expected value of X+Y conditional on Y= 52. Indicate the result to at least four decimal places.

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The expected value of X+Y conditional on Y = 52 is approximately 2.816, rounded to at least four decimal places.

To calculate the expected value of X+Y conditional on Y = 52, we need to consider the values of X+Y when Y = 52 and their corresponding probabilities.

From the given joint probability function, we can see that when Y = 52, the possible values of X are 55, 58, and 60. The probabilities corresponding to these values are 16, 29, and 16, respectively.

Now let's calculate the expected value:

E(X+Y | Y = 52) = (55 * 16/125) + (58 * 29/125) + (60 * 16/125)

E(X+Y | Y = 52) = 0.704 + 1.344 + 0.768

E(X+Y | Y = 52) = 2.816

Therefore, the expected value of X+Y conditional on Y = 52 is 2.816, rounded to at least four decimal places.

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8, 10, 11, 12, 16, 20, 24, 28, 32, 33, 37
Using Statkey or other technology, find the following values for the above data. Click here to access StatKey.
The mean and the standard deviation. Round your answers to one decimal place.
mean = ____________ standard deviation = ________

Answers

Answer:

Mean = 21.0

Standard deviation = 9.9

Step-by-step explanation:

I used my TI-84 Plus CE calculator to find the mean and the standard deviation of your data.  However, I will explain how to find the mean and standard deviation

First, I'll provide the steps to find the mean:

Mean:

Step 1:  Find the sum of the data:

The sum of the data is given by:

8 + 10 + 11 + 12 + 16 + 20 + 24 + 28 + 32 + 33 + 37 = 231

Step 2:  Divide this sum by the total number of data points:

There are 11 data points in your data set.  Thus, we can find the mean by dividing 231 by 11:

Mean = 231 / 11

Mean = 21.0

Thus, the mean of the data is 21.0.

Now, I'll provide the steps to find the standard deviation:

Standard Deviation:

Step 1:  Find the mean:

We've already determined that the mean of the data set is 21.0.

Step 2:  Subtract the mean from each data point.  Then, square the result:

(8 - 21.0)^2 = (-13)^2 = 169

(10 - 21.0)^2 = (-11)^2 = 121

(11 - 21.0)^2 = (-10)^2 = 100

(12 - 21.0)^2 = (-9)^2 = 81

(16 - 21.0)^2 = (-5)^2 = 25

(20 - 21.0)^2 = (-1)^2 = 1

(24 - 21.0)^2 = (3)^2 = 9

(28 - 21.0)^2 = (7)^2 = 49

(32 - 21.0)^2 = (11)^2 = 121

(33 - 21.0)^2 = (12)^2 = 144

(37 - 21.0)^2 = (16)^2 = 256

Step 3:  Find the variance by finding the average of these squared differences:

Mean = (169 + 121 + 100 + 81 + 25 + 1 + 9 + 49 + 121 + 144 + 256) / 11

Mean = (1076) / 11

Mean = 97.81818182 (Let's not round at the intermediate step and round at the end).

Step 4:  Take the square root of the variance to find the standard deviation:

Standard deviation = √(97.81818182)

Standard deviation = 9.890307468

Standard deviation = 9.9

Thus, the standard deviation of the data set is 9.9

in a random sample of 400 headache suffers, 85 prefer a particular brand of pain killer. how large a sample is required if we want to be 99% confidence that our estimate of percentage of people with headaches who prefer this particular brand of pain killer is within 2 percentage points? round your answer to the next whole number. n:

Answers

A sample size of 669 is required to be 99% confident that the estimate of the percentage of people with headaches who prefer this particular brand of painkiller is within 2 percentage points.

To determine the sample size required to estimate the percentage of people with headaches who prefer a particular brand of painkiller with a 99% confidence level and a margin of error of 2 percentage points, we can use the formula for sample size calculation for proportions.

The formula is given by:

[tex]n = (Z^2 * p * (1 - p)) / E^2[/tex]

Where:

n = required sample size

Z = Z-score corresponding to the desired confidence level (in this case, for a 99% confidence level, Z = 2.576)

p = estimated proportion (we can use the proportion from the initial sample, which is 85/400 = 0.2125)

E = margin of error (0.02 or 2 percentage points)

Substituting the values into the formula:

[tex]n = (2.576^2 * 0.2125 * (1 - 0.2125)) / 0.02^2[/tex]

Calculating the expression:

n = 668.34

Rounding up to the nearest whole number, the required sample size is 669.

Therefore, a sample size of 669 is required to be 99% confident that the estimate of the percentage of people with headaches who prefer this particular brand of painkiller is within 2 percentage points.

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Consider a single server queue with a Poisson arrival process at rate \, and exponentially distributed service times with rate µ. All interarrival times and service times are independent of each other. This is similar to the standard M|M|1 queue, but in this queue, as the queue size increases, arrivals are more and more likely to decide not to join it. If an arrival finds n people already in the queue ahead of them (including anyone being served), then they join with probability 1/(n+1). Let N(t) be the number in the queue at time t. (c) Find the equilibrium distribution for this queue, when it exists. (d) What are conditions on A and under which the equilibrium distribution exists?

Answers

In the described single server queue with a Poisson arrival process and exponentially distributed service times, the equilibrium distribution exists under certain conditions.

To determine the equilibrium distribution, we need to consider the conditions under which it exists. In this case, the equilibrium distribution exists if and only if the arrival rate (λ) is less than or equal to the service rate (μ).

Mathematically, λ ≤ μ. This condition ensures that the system is stable and can handle the incoming arrivals without continuously growing.

When the equilibrium distribution exists, we can find the probabilities for different queue lengths. However, the specific form of the equilibrium distribution depends on the arrival rate (λ) and service rate (μ), as well as the probability that an arrival joins the queue when it already has n people ahead.

The equilibrium distribution can be derived using balance equations or matrix methods. It represents the probability of having different numbers of customers in the queue at equilibrium.

In summary, the equilibrium distribution for the described queue exists when the arrival rate is less than or equal to the service rate. The specific form of the equilibrium distribution depends on the arrival and service rates, as well as the probability of joining the queue with n people already in it.

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Solve the initial value problem y' = (x + y − 3)2 with y(0) = 0. = a.

Answers

If the 2 meant *2 then:

Expand and move y to left side to get

y’-2*y=2*x-6.

The homog eqn is yh’-2*yh=0 so yh=k1*exp(2*x) by trying y=exp(m*x) or separating.

Assume yp=a*x+b so yp’=a then

a-2*(a*x+b)=2*x-6 or

-2*a*x+a-2*b=2*x-6 so

-2*a=2 so a=-1 and a-2*b=-6 so

-1–2*b=-6 so -2*b=-5 and b=5/2 so we have yp=-x+5/2 which yields the general soln y=yh+yp=k1*exp(2*x)-x+5/2.

For y(0)=0, we see k1+5/2=0 so k1=-5/2 and the solution is

y=5*(1-exp(2*x))/2-x.

This heads exponentially to minf for larger x.

If the 2 is ^2 then

y’=(x+y-3)^2 and let y=v-x+3 so y’=v’-1 and y’=(x+y-3)^2 becomes v’-1=v^2 or

v’=1+v^2 so separate as dv/(1+v^2)=dx and integrate to get

atan(v)=x+k2 so v=tan(x+k2)=y+x-3 so y=tan(x+k2)-x+3 and y(0)=0 becomes

0=tan(k2)+3 and tan(k2)=-3 so k2=-atan(3) which makes y=tan(x-atan(3))-x+3.

This has singularities for x=atan(3)+%pi*(2*n+1)/2 for integer

Create your own Transportation Problem (with at least 4 demand and 3 supply units) and solve it with transportation alg. (use Vogel App. Method for starting solution)

Answers

To find the total transportation cost, the allocation cost for each cell is multiplied by the unit cost, and the sum is taken. The sum of these costs is $12,800.

Transportation Problem: A manufacturing firm has three warehouses supplying to four retail outlets. The following table shows the unit transportation costs (in $) from each warehouse to each outlet and the units of demand and supply at each location.

The transportation algorithm can be used to solve this problem with the Vogel approximation method being the starting solution. Below is the transportation table (in dollars):

|      | Retail Outlet 1 | Retail Outlet 2 | Retail Outlet 3 | Retail Outlet 4 | Supply |

Warehouse 1  |        6        |       5         |       3         |       7         |  300   |

Warehouse 2  |        9        |       7         |       4         |       6         |  200   |

Warehouse 3  |        2        |       8         |       5         |       9         |  250   |

Demand      |       200       |      150        |      100        |      200        |        |

The Vogel approximation method is an iterative procedure that selects the smallest difference between the two smallest costs for each row or column and then assigns the maximum possible allocation to it.

Step 1:

Subtract the smallest cost from the second-smallest cost and record the differences for each row and column. The difference is written in the same row or column as the subtracted number. The differences are calculated as follows:

|      | Retail Outlet 1 | Retail Outlet 2 | Retail Outlet 3 | Retail Outlet 4 | Supply |

Warehouse 1  |        6        |       5         |       3         |       7         |  300   |

Warehouse 2  |        9        |       7         |       4         |       6         |  200   |

Warehouse 3  |        2        |       8         |       5         |       9         |  250   |

Demand      |       200       |      150        |      100        |      200        |        |

The differences are as follows:

|      | Retail Outlet 1 | Retail Outlet 2 | Retail Outlet 3 | Retail Outlet 4 | Supply |

Warehouse 1  |        1        |       2         |       0         |       4         |  300   |

Warehouse 2  |        3        |       1         |       0         |       2         |  200   |

Warehouse 3  |        3        |       1         |       0         |       4         |  250   |

Demand      |       200       |      150        |      100        |      200        |        |

Step 2:

Identify the largest difference for each row or column and then select the smallest number in that row or column for the next allocation. The Vogel approximation method is used to determine the maximum allocation for that row or column. The total cost is then multiplied by the unit cost. The table below shows the maximum allocation and cost for each row or column.

The cost of transportation is shown below:

|        | Retail Outlet 1 | Retail Outlet 2 | Retail Outlet 3 | Retail Outlet 4 | Supply |

Warehouse 1   |        6        |       5         |       3         |       7         |  300   |

Warehouse 2  |        9        |       7         |       4         |       6         |  200   |

Warehouse 3  |        2        |       8         |       5         |       9         |  250   |

Demand          |       200       |      150        |      100        |      200        |        |

To find the total transportation cost, the allocation cost for each cell is multiplied by the unit cost, and the sum is taken. The sum of these costs is $12,800.

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The final solution to the given transportation problem, with a minimum cost of 2050 units, is shown below:

D1 | D2 | D3 | D4 | S1 | 30 | 20 | 30 | 20 | S2 | 0 | 60 | 20 | 30 | S3 | 10 | 0 | 10 | 40 | Total Cost | 1800 | 600 | 650 | 2050 |

Explanation:

A transportation problem is one of the most fundamental optimization problems that exist. In this problem, goods are transported from various supply sources to various demand locations in the most efficient and cost-effective manner possible. When demand and supply quantities are known, transportation issues occur.

Let us now build a transportation problem with at least four demand and three supply units. We'll solve it using the transportation algorithm, and we'll use the Vogel App method to begin.

The problem is as follows:

Let us suppose that there are three factories (supply locations), S1, S2, and S3, and four warehouses (demand locations), D1, D2, D3, and D4. The supply amounts available at each factory and the requirements of each warehouse are shown below.

Supply (units) | Demand (units) | S1 | S2 | S3 | D1 | 60 | 30 | 40 | 50 | D2 | 30 | 70 | 20 | 30 | D3 | 40 | 20 | 10 | 40 | D4 | 20 | 60 | 30 | 10 |

To begin, let us generate the initial table below, which includes the amount of units available from each source to each destination.

Supply (units) | Demand (units) | S1 | S2 | S3 | Availability | D1 | 60 | 30 | 40 | 130 | D2 | 30 | 70 | 20 | 120 | D3 | 40 | 20 | 10 | 70 | D4 | 20 | 60 | 30 | 110 |

Requirement | 50 | 30 | 40 | 120 |

We'll begin by calculating the difference between the two smallest costs for each supply and demand row. Then we'll choose the row with the biggest difference as our starting point.

In this case, the differences for the supply rows are:

Supply (units) | Demand (units) | S1 | S2 | S3 | Availability | D1 | 60 | 30 | 40 | 130 | 20 | D2 | 30 | 70 | 20 | 120 | 30 | D3 | 40 | 20 | 10 | 70 | 10 | D4 | 20 | 60 | 30 | 110 | 20 |

Requirement | 50 | 30 | 40 | 120 |

Difference | 10 | 20 | 30 |  |

We'll choose the third row (supply from S3) as our starting point since it has the largest difference of 30. We'll provide as much as possible to the minimum cost cell (D2, S1), which is 20. We'll update the availability column and the demand row and cross out the cell.

D1 | D2 | D3 | D4 | S1 | 40 | 0 | 40 | 20 | S2 | 30 | 70 | 20 | 30 | S3 | 0 | 0 | 0 | 50 |

Availability | 20 | 50 | 10 | 90 |

Requirement | 50 | 10 | 40 | 120 |

We'll now update the differences based on the available cells (we only have two remaining).

Supply (units) | Demand (units) | S1 | S2 | S3 | Availability | D1 | 40 | 0 | 40 | 110 | 20 | D2 | 0 | 50 | 0 | 100 | 10 | D3 | 40 | 20 | 10 | 70 | 10 | D4 | 20 | 10 | 30 | 100 | 20 |

Requirement | 50 | 20 | 40 | 120 |

Difference | 10 | 40 | 20 |  |

The second row (supply from S2) has the largest difference, so we'll select it.

The minimum cost cell with the highest availability is (D2, S3), and we'll give it as much as possible (10).

D1 | D2 | D3 | D4 | S1 | 40 | 10 | 30 | 20 | S2 | 30 | 60 | 20 | 30 | S3 | 0 | 0 | 10 | 40 |

Availability | 20 | 40 | 0 | 80 |

Requirement | 50 | 30 | 40 | 120 |

We'll now update the differences based on the available cells (we only have one remaining).

Supply (units) | Demand (units) | S1 | S2 | S3 | Availability | D1 | 40 | 0 | 30 | 110 | 20 | D2 | 0 | 60 | 0 | 90 | 20 | D3 | 30 | 20 | 0 | 50 | 10 | D4 | 20 | 0 | 10 | 90 | 30 |

Requirement | 50 | 0 | 40 | 120 |

Difference | 10 | 10 | 10 |  |

There is only one available row left, so we'll select the first one and provide as much as possible to the minimum cost cell (D1, S2), which is 10.

We'll cross it out and update the availability and demand rows.

D1 | D2 | D3 | D4 | S1 | 30 | 20 | 30 | 20 | S2 | 30 | 50 | 20 | 30 | S3 | 0 | 0 | 10 | 40 |

Availability | 10 | 30 | 0 | 60 |

Requirement | 40 | 0 | 40 | 120 |

The final solution, with a minimum cost of 2050 units, is shown below:

D1 | D2 | D3 | D4 | S1 | 30 | 20 | 30 | 20 | S2 | 0 | 60 | 20 | 30 | S3 | 10 | 0 | 10 | 40 | Total Cost | 1800 | 600 | 650 | 2050 |

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The average test score is a 65 with a standard deviation of 12. a. If Dan scored a 83, what would his 2-score be? b. This means Dan scored better than of his classmates. (enter a percentage, do not round)

Answers

a. Dan's z-score is 1.5.

b. Dan scored better than approximately 6.68% of his classmates.

To find Dan's z-score, we'll use the formula:

z = (x - μ) / σ

Where:

x = Dan's score (83)

μ = mean (65)

σ = standard deviation (12)

a. To find Dan's z-score:

z = (83 - 65) / 12

z = 1.5

Therefore, Dan's z-score is 1.5.

b. To find the percentage of students Dan scored better than, we need to find the area under the normal curve to the left of Dan's z-score.

From the z-score table, we can see that the area to the left of z = 1.5 is approximately 0.9332.

To find the percentage of students Dan scored better than, we subtract this value from 1 and multiply by 100:

Percentage = (1 - 0.9332) * 100

Percentage = 6.68

Therefore, Dan scored better than approximately 6.68% of his classmates.

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Write the product as a sum: __________

10 sin (30c)sin (22c) = __________

Answers

The product 10 sin(30c)sin(22c) can be expressed as a sum using the trigonometric identity for the product of two sines: sin(A)sin(B) = 0.5[cos(A-B) - cos(A+B)]. Therefore, the expression simplifies to 5[cos(30c - 22c) - cos(30c + 22c)].

To express the product 10 sin(30c)sin(22c) as a sum, we can utilize the trigonometric identity sin(A)sin(B) = 0.5[cos(A-B) - cos(A+B)]. By applying this identity, we have:

10 sin(30c)sin(22c) = 10 * 0.5[cos(30c-22c) - cos(30c+22c)]

                    = 5[cos(8c) - cos(52c)]

Therefore, the product can be expressed as the sum 5[cos(8c) - cos(52c)]. We use the trigonometric identity to transform the product of sines into a difference of cosines. By simplifying the expression, we achieve a sum representation that involves the difference of two cosine functions evaluated at different angles.

This sum representation provides a way to rewrite the given product in a more concise form, making it easier to manipulate or analyze further if needed.

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Fill in the blanks
Linear Pair of Angles:
two angles that form a (blank) - they are (blank)

Answers

Linear Pair of Angles: two angles that form a straight line - they are supplementary.A linear pair of angles refers to two adjacent angles that add up to 180 degrees.

It is important to note that the sum of the angles in a linear pair of angles will always equal 180 degrees. A linear pair of angles must be adjacent, meaning that they share a common vertex and a common side but no other interior points.

Linear pairs of angles can be used to solve problems involving complementary, supplementary, and vertical angles. Since they add up to 180 degrees, they are considered to be supplementary angles. This is because supplementary angles are two angles that add up to 180 degrees.

Therefore, a linear pair of angles is also supplementary because it contains two adjacent angles that add up to 180 degrees. In other words, if two angles form a straight line, then they are considered to be supplementary.

The use of linear pairs of angles is prevalent in geometry problems involving parallel lines, triangles, and polygons.

The concept of a linear pair of angles is also important in understanding the different types of angles, including acute, obtuse, and right angles. For instance, an acute angle can form a linear pair with an obtuse angle, while a right angle can only form a linear pair with another right angle.

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beginning with s2, the ball takes the same amount of time to bounce up as it does to fall, and so the total time elapsed before it comes to rest is given by t = 1 2 [infinity] (0.8)n. n = 1

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With n = 1, the total time elapsed before the ball comes to rest is 0.4 units of time. The total time elapsed before the ball comes to rest is represented by the formula t = (1/2)∑(0.8)^n as n approaches infinity.

The ball takes the same amount of time to bounce up as it does to fall, starting from the second bounce (n = 1). This means that for each subsequent bounce, the time it takes for the ball to reach its maximum height and return to the ground is the same.

The total time elapsed before the ball comes to rest is given by the formula t = (1/2)∑(0.8)^n, where n represents the number of bounces and ∑ denotes the summation notation. In this case, the summation starts from n = 1 and goes to infinity.

To calculate the total time, we substitute n = 1 into the formula: t = (1/2)(0.8)^1 = 0.4. Therefore, with n = 1, the total time elapsed before the ball comes to rest is 0.4 units of time.

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Functions 1.1 + 3(x - 1) / 2.1 + 4(x - 1) + 10 * (x - 1) ^ 2 / 4 * on [- 1, 1] form the basis of the space of polynomials of degree 2 at most which is orthogonal with respect to the weight function w(x) = (1 + x) and associated inner product (f,g)w . For a given function x^5 , find the polynomial P(x) such that the error integral at w(x) * (x ^ 5 - P(x)) ^ 2 dx from -1 to 1 is minimized among all polynomial of degree 2

Answers

The polynomial P(x) that minimizes the error integral w(x) * (x ^ 5 - P(x)) ^ 2 dx from -1 to 1 among all polynomials of degree 2 is P(x) = -3x^3 + 3x^2 + 3x + 1.

The error integral w(x) * (x ^ 5 - P(x)) ^ 2 dx from -1 to 1 can be minimized by choosing P(x) to be the orthogonal projection of x^5 onto the space of polynomials of degree 2 that are orthogonal with respect to the weight function w(x) = (1 + x). The orthogonal projection of x^5 onto this space can be found using the Gram-Schmidt process.

The Gram-Schmidt process gives us the following three polynomials that form a basis for the space of polynomials of degree 2 that are orthogonal with respect to the weight function w(x) = (1 + x):

p1(x) = 1.1

p2(x) = 3(x - 1) / 2.1

p3(x) = 4(x - 1) + 10 * (x - 1) ^ 2 / 4

The polynomial P(x) can then be found by projecting x^5 onto the space spanned by these three polynomials. This gives us the following equation for P(x):

[tex]P(x) = (x^5)(1.1) / (1.1) + (x^5) (3(x - 1) / 2.1) / (2.1) + (x^5) (4(x - 1) + 10 * (x - 1) ^ 2 / 4) / (4)[/tex]

Simplifying this equation gives us the following polynomial for P(x):

[tex]P(x) = -3x^3 + 3x^2 + 3x + 1[/tex]

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Find the p-value for the following hypothesis test. H0: μ = 21, H1: μ< 21, n = 81, x = 19.25, σ= 7 Round your answer to four decimal places. p =

Answers

The p-value for the hypothesis test is 0.0143 (rounded to four decimal places).

To find the p-value for the hypothesis test, we need to calculate the test statistic and then find the corresponding p-value from the t-distribution.

Given:

H0: μ = 21 (null hypothesis)

H1: μ < 21 (alternative hypothesis)

Sample size: n = 81

Sample mean: x = 19.25

Population standard deviation: σ = 7

First, we calculate the test statistic (t-value) using the formula:

t = (x - μ) / (σ / sqrt(n))

t = (19.25 - 21) / (7 / sqrt(81))

t = -1.75 / (7 / 9)

t = -1.75 * (9 / 7)

t = -2.25

Next, we find the p-value associated with the test statistic. Since the alternative hypothesis is μ < 21, we are looking for the probability of observing a t-value less than -2.25 in the t-distribution with degrees of freedom (df) = n - 1 = 81 - 1 = 80.

Using a t-distribution table or a statistical software, we find that the p-value is approximately 0.0143.

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simplify each of the following.5.1. [tex]2 sin(90 - x ) - cos(360 - x)[/tex] If 25% of a number is 65 and 60% of the same number is 156, find 35% of that number. selects a piece of candy and eats it (so it is NOT replaced!) Then selects a piece of candy and eats it. Find the probability of each event Find the value of the expression belowwhen x =3/44x + 8x - 5 Construct an equation for a function with a zero at -2 and a double zero at 3. Mikel is trying to save for college expenses. He has a job, but can only afford to put $20 per month aside. He has 4 years until he will need to pay for college. How much will he have saved by the end of 4 years? Which graph BEST represents the relationship between the potential energy and kinetic energy of a cannon ball as it flies over thebow of a ship and then falls onto the beach on the other side? Note that the dotted line represents potential energy while the solidline represents kinetic energy what two number have an absolute value of 12? maths equation : solve (2 - x) < 4/25 i need number 22 PLS AND THANK YOU! Jasmine scored a 85 on the last math test. The class average was a 76 with a standard deviation of 4.5. So, XN(76,4,5) Jasmine's Z-score is This tells you that 85 is standard deviations to the left or right) of the mean, 14. The number of problems on all math exams are normal distributed. What is the probability a randomly selected math exam has fewer than 15 questions if the mean is 20 questions with a standard deviation of 2.5? Use the empirical rule. Enter your answer as a percent rounded to two decimal places if necessary. A city has around 890 thousand people. There are 123 parks in this city. What is the number of parks per capita in this city? Write your answer in scientific notation. Exam Lesson Name: American Innovations in theExam Guidelines20. The composer to rose to Dvorak's challenge and used Native American themes in hisWorks was Shirley is saving money to buy a computer. The computer she will buy costs $1,200.00 She has already saved $300.00Shirley will save $60.00 per week until she has enough money to buythe computer. What is the value of the output when theinput is 18? an abstract about why tourism marketing is important2.1 discuss the key differences between marketing a product and service2.2 based on the above abstract, explain how effective marketing addresses these two characteristics of tourism: integrity and variability2 3" it is also crucial that marketers keep up with the latest trends" with this in mind discuss how marketers can keep up with the trends and yet still implement reasonable tourism marketing2.4 the tourism market are is required to implement various marketing approaches. explain these marketing approaches Who believed that the mind began as a blank tablet but could be developed through reason? roger bacon john locke robert boyle isaac newton Describe the map of North America in 1750 What are the legislations for age discrimination LaMont works for a company in downtown Chicago. The company encourages employees to use public transportation (to save the environment) by providing them with transit passes at a cost of $290 per month. rev: 09_23_2020_QC_CS-230013a. If LaMont receives one pass (worth $290) each month, how much of this benefit must he include in his gross income each year Real versus nominal GDP Consider a simple economy that produces two goods: pencils and muffins. The following table shows the prices and quantities of the goods over a three-year period Pencils Muffins Price Quantity (Number of pencils) 125 170 150 Price Year 2012 2013 2014 Quantity (Number of muffins) 200 230 170 (Dollars per pencil) (Dollars per muffin) Use the information from the preceding table to fill in the following table. Nominal GDP Dollars) Real GDP Year 2012 2013 2014 (Base year 2012, dollars) GDP Deflator From 2013 to 2014, nominal GDP and real GDP The inflation rate in 2014 was Why is real GDP a more accurate measure of an economy's production than nominal GDP? Real GDP includes the value of exports, but nominal GDP does not. Real GDP measures the value of the goods and services an economy produces, but nominal GDP measures the value of the goods and services an economy consumes. Real GDP is not influenced by price changes, but nominal GDP is