Follow the steps and graph the quadratic equation. 1) x²-y=-4x-3
a. Make sure the equation is in standard form y=ax² +bx+c. Determine the direction of the parabola by the value of a. b. Find the axis of symmetry using the b formula x= -b/2a c. Find the vertex by substituting the value of x into the quadratic equation. d. Find the y-intercept from the quadratic equation.

For the numbers 1716 and 936

b. The GCD is 52.

c. The LCM is 8586.

a. Prime factor trees for 1716 and 936:

Prime factor tree for 1716:

    1716

   /     \

  2       858

         /    \

        2      429

              /    \

             3      143

                   /    \

                  11     13

Prime factor tree for 936:

     936

   /     \

  2       468

         /    \

        2      234

              /    \

             2      117

                   /    \

                  3      39

                        /   \

                       3     13

b. To find the greatest common divisor (GCD) of 1716 and 936, we identify the common prime factors and their minimum powers. From the prime factor trees, we can see that the common prime factors are 2, 3, and 13. Taking the minimum powers of these common prime factors:

GCD(1716, 936) = 2² × 3¹ × 13¹ = 52

c. To find the least common multiple (LCM) of 1716 and 936, we identify all the prime factors and their maximum powers. From the prime factor trees, we can see the prime factors of 1716 are 2, 3, 11, and 13, while the prime factors of 936 are 2, 3, and 13. Taking the maximum powers of these prime factors:

LCM(1716, 936) = 2² × 3¹ × 11¹ × 13¹ = 8586

Therefore, the GCD of 1716 and 936 is 52, and the LCM of 1716 and 936 is 8586.

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Using the quadratic formula to solve quadratic equation, we ge.t L1 = 0.266 m and L2 = 1.23 m.

The compound beam shown in figure 1 is shown below:

Given:

p1 = 840

N p2 = 1150

Nw = 410 N/m.

Point e is located just to the left of 840 N force.

Force equilibrium: ΣFy = 0R1 + R2 = p1 + p2 + wL ----(1)

Moment equilibrium:ΣMy = 0

p1 (L1 + L2) + p2 L2 + wL²/2 = R2 L2 + R1 L1 ----(2)

Here, the length of the first span is L1, the length of the second span is L2, and the total length of the beam is L.

Since point e is located just to the left of 840 N force, it is the location where the first span meets the second span.

Therefore, L1 + e = L2 R1 = ? R2 = ?

Using equation (1),

R1 + R2 = p1 + p2 + wLR1 + R2

= 840 + 1150 + 410 * LR1 + R2

= 1990 + 410 LR2 - R1

= wL R2 - R1

= 410 L - R1

Substituting equation (5) into equation (4),

R1 + 410 L - R1 = 410 LR = 410 L/2R = 205 L.

Therefore, R1 = 205 L - 840 N and

R2 = 1150 + 205 L - 410 L= -255 L + 1150 N.

Now, substituting the values of R1 and R2 into equation (2),

P1 (L1 + L2) + P2 L2 + wL²/2

= (-255 L + 1150 N) L2 + (205 L - 840 N) L1840 (L1 + L2) + 1150 L2 + 410 L²/2

= -255 L³ + 1150 L² + 205 L² - 840 L1 + 840 L1 - 205 L² + 255 L³ 840 L1 + 1395 L² + 895 L - 410 L²/2

= 0L1 + 2.59 L² + 1.06 L - 0.48 = 0.

Using the quadratic formula to solve this quadratic equation, we get L1 = 0.266 m and L2 = 1.23 m.

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A geometric shape known as an angle is created by two rays or line segments that meet at a location known as the vertex. The sides of the angle are the rays or line segments. Correct answer is b.

Angles are commonly expressed as radians (rad) or degrees (°).

For any angle,

sin²θ + cos²θ = 1.

sin²θ + cos²θ = 1 - cos²θ.

Therefore, sin²θ - cos²θ = 1 - 2cos²θ. Hence, the answer is (B).

Question 22: If tanz = 1, then z = 45°. Therefore,

cotz = cosz/sinz. When

sinz = 1/√2 and

cosz = 1/√2, then

cotz = 1. Hence, the answer is (A)

.Question 23: Simplify (-3¹). (-3¹) = -3. Therefore, the answer is (A). Thus, the answers for the given questions are- 21. B22. A23. A

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Based on the information provided, there is a statistically significant relationship between the two variables.

The relationship between two variables and whether these variables are significant or not is often determined by the p-value. The general rule is that the p-value should be smaller than 0.05 for a variable to be considered significant.

In this case, the p-value is 0.0, which shows its value is smaller than 0.05 and therefore it is significant.

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(i) The value of Fo for 75,615 is not provided in the question, and therefore cannot be determined.

(ii) The value of X²0.975, 12 is approximately 21.026.

(iii) The value of t0.9, 22 is approximately 1.717.

(iv) The value of z0.025 is approximately -1.96.

(v) The value of Fo.05, 9, 10 is not provided in the question, and therefore cannot be determined.

(vi) The value of k for a two-sided tolerance interval with a sample size of 15, a tolerance level of 99%, and a confidence level of 95% is not provided in the question, and therefore cannot be determined.

(i) The value of Fo for 75,615 is not given, and without additional information or a specific distribution, it is not possible to determine the corresponding value from statistical tables.

(ii) The value of X²0.975, 12 can be found using the chi-square distribution table. With a degree of freedom of 12 and a significance level of 0.025 (two-tailed test), we find that X²0.975, 12 is approximately 21.026.

(iii) The value of t0.9, 22 can be found using the t-distribution table. With a significance level of 0.1 and 22 degrees of freedom, we find that t0.9, 22 is approximately 1.717.

(iv) The value of z0.025 can be found using the standard normal distribution table. The significance level of 0.025 corresponds to a two-tailed test, so we need to find the value that leaves 0.025 in both tails. From the table, we find that z0.025 is approximately -1.96.

(v) The value of Fo.05, 9, 10 is not given in the question, and without additional information or a specific distribution, it is not possible to determine the corresponding value from statistical tables.

(vi) The value of k for a two-sided tolerance interval depends on the sample size, tolerance level, and confidence level. However, the specific values for these parameters are not provided in the question, making it impossible to determine the corresponding value of k from statistical tables.

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a) The PMF of X is described in the following table:

X | 0 | 1 | 2

P(X) | 0.5 | 0.3 | 0.15

b) The expected value of X is 0.6.

(a) Probability mass function (PMF) of X:

The experiment ends when a red marble is drawn.

X represents the number of green marbles drawn before the first red marble is drawn.

X can take values from 0 to 2, as there are only 3 green marbles in the urn.

The probability of drawing 0 green marbles (X = 0):

P(X = 0) = (3/6) = 0.5

The probability of drawing 1 green marble (X = 1):

P(X = 1) = (3/6) * (3/5) = 0.3

The probability of drawing 2 green marbles (X = 2):

P(X = 2) = (3/6) * (2/5) * (3/4) = 0.15

(b) Expected value (E(X)):

E(X) = (0 * 0.5) + (1 * 0.3) + (2 * 0.15)

E(X) = 0 + 0.3 + 0.3

E(X) = 0.6

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The cost function is given by C(x) = $70,000 + $25x.

Given data:Fixed monthly cost = $70,000

Production cost per unit = $25

Selling price per unit = $30

Let's assume the number of units produced per month to be x

.The cost function C(x) is given by the sum of the fixed monthly cost and the production cost per unit multiplied by the number of units produced per month.

C(x) = Fixed monthly cost + Production cost per unit × Number of units produced

C(x) = $70,000 + $25x

Hence, the cost function is given by C(x) = $70,000 + $25x.

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We need to evaluate the definite integral [tex]\int\frac{dx}{x+6}[/tex]. The definite integral is a mathematical operation that calculates the signed area between the curve of a function and the x-axis over a given interval.

To evaluate the definite integral [tex]\int\frac{dx}{x+6}[/tex], we can apply the fundamental theorem of calculus. The integral represents the area under the curve of the function [tex]\frac{1}{x+6}[/tex] over the interval from x = 0 to x = 4.

To find the antiderivative of [tex]\frac{1}{x+6}[/tex] , we can use the natural logarithm function. Applying the logarithmic property, we can rewrite the integral as ln|x + 6| evaluated from x = 0 to x = 4. The antiderivative is ln|x + 6|.

Applying the fundamental theorem of calculus, the definite integral evaluates to ln|4 + 6| - ln|0 + 6|. Simplifying further, we get ln(10) - ln(6).

The final result of the definite integral is ln(10) - ln(6), which represents the area under the curve of the function [tex]\frac{1}{x+6}[/tex]from x = 0 to x = 4.

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The given expression is not purely a vector or scalar but a combination of both. It is a meaningful expression, but it represents a combination of a scalar and a vector.

The given expression is:

(ả × ĉ) · (à × b) - (b + c)

To determine whether this expression is a vector, scalar, or meaningless, we need to examine the properties and definitions of vectors and scalars.

In the given expression, we have the cross product of two vectors: (ả × ĉ) and (à × b). The cross product of two vectors results in a new vector that is orthogonal (perpendicular) to both of the original vectors. The dot product of two vectors, on the other hand, yields a scalar quantity.

Let's break down the expression:

(ả × ĉ) · (à × b) - (b + c)

The cross product (ả × ĉ) results in a vector, and the cross product (à × b) also results in a vector. Therefore, the first part of the expression, (ả × ĉ) · (à × b), is a dot product between two vectors, which yields a scalar.

The second part of the expression, (b + c), is the sum of two vectors, which also results in a vector.

So overall, the expression consists of a scalar (from the dot product) subtracted from a vector (from the sum of vectors).

Therefore, the given expression is not purely a vector or scalar but a combination of both. It is a meaningful expression, but it represents a combination of a scalar and a vector.

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The equation of the transformed logarithm is `f(x) = log(x + c) + k` . The correct option is `(x + c)` to `f(x) = log(x + c) + k`.

The transformed logarithm that is shown below is given as;

`f(x) = (x + c)`.

And, the equation for the transformed logarithm is of the form

`f(x) = a log [b(x - h)] + k`

where `a`, `b`, `h`, and `k` are constants.

We need to find the equation for the transformed logarithm. The function value `f(x) = (x + c)` has only a vertical translation; there is no horizontal translation, reflection, or stretching.

The vertical scaling of the function is `a = 1`.

The constant `h` in the equation of the logarithmic function is equal to `-c`.

This is the equation of the transformed logarithm:

`f(x) = log [1(x - (-c))] + k

= log(x + c) + k`

The equation of the transformed logarithm is

`f(x) = log(x + c) + k` (where `k` is the vertical translation).

Hence, the correct option is `(x + c)` to `f(x) = log(x + c) + k`.

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The required sample size necessary for the survey is given as follows:

n = 97.

A confidence interval of proportions has the bounds given by the rule presented as follows:

[tex]\pi \pm z\sqrt{\frac{\pi(1-\pi)}{n}}[/tex]

In which the variables used to calculated these bounds are listed as follows:

The confidence level is of 95%, hence the critical value z is the value of Z that has a p-value of [tex]\frac{1+0.95}{2} = 0.975[/tex], so the critical value is z = 1.96.

The margin of error is obtained as follows:

[tex]M = z\sqrt{\frac{\pi(1-\pi)}{n}}[/tex]

We have no estimate, hence:

[tex]\pi = 0.5[/tex]

Then the required sample size for M = 0.1 is obtained as follows:

[tex]0.1 = 1.645\sqrt{\frac{0.5(0.5)}{n}}[/tex]

[tex]0.1\sqrt{n} = 1.96 \times 0.5[/tex]

[tex]\sqrt{n} = 1.96 \times 5[/tex]

[tex](\sqrt{n})^2 = (1.96 \times 5)^2[/tex]

n = 97.

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Given vectors = [9,-6, 12] and w = [-12, 8,-16]. In this case, we find that v = -3 * w, indicating that they are indeed collinear.

Collinear vectors are vectors that lie on the same line or are parallel to each other. If v and w are collinear, it means that one vector can be obtained by scaling the other vector by a constant factor. Mathematically, this can be represented as v = k * w, where k is a scalar.

In our case, we have v = [9, -6, 12] and w = [-12, 8, -16]. To check if they are collinear, we need to find a scalar k such that v = k * w. We can perform scalar multiplication on w by multiplying each component by k.

By comparing the corresponding components of v and k * w, we find that 9 = -12k, -6 = 8k, and 12 = -16k. Solving these equations, we find that k = -3 satisfies all of them. Therefore, we can write v as -3 times w, or v = -3 * w, confirming that v and w are collinear.

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The probability that the sample mean cost for these 38 schools is at least $25248 is 0.998215. Option b is correct.

Given that the mean undergraduate cost for tuition, fees, room and board for four year institutions was $26737, the standard deviation is $3150 and 38 four-year institutions are randomly selected. We have to find the probability that the sample mean cost for these 38 schools is at least $25248.

We can use the central limit theorem to solve the given problem. According to this theorem, the sample means are normally distributed with a mean of the population and a standard deviation equal to population standard deviation/ √ sample size.

So, the z-score corresponding to the given sample mean can be calculated as follows:

z = (x - μ) / σ√n

= ($25248 - $26737) / $3150/√38

= -1489 / 510 = -2.918.

On a standard normal distribution curve, the z-score of -2.918 has a probability of 0.001785 (approximately) of occurring.

Hence, the correct option is B. 0.998215.

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The solutions to the equation on the interval [0,27) are: x = π/6, 7π/6, 13π/6, 19π/6, 25π/6.

To solve the equation 3sin(x) = sin(x) + 1 on the interval [0,27),

let's first simplify the left side of the equation by using the identity

3sin(x) = sin(x) + 2sin(x).

This gives us:

sin(x) + 2sin(x) = sin(x) + 1

Simplifying further, we get:

2sin(x) = 1sin(x)

= 1/2

Now we need to find all values of x on the interval [0,27) that satisfy this equation.

We can start by looking at the unit circle to find the values of x where sin(x) = 1/2.

The first such value occurs at π/6, and then every π radians after that.

However, we need to restrict our solutions to the interval [0,27), so we can only consider values of x in this interval that satisfy sin(x) = 1/2.

These values are:

π/6, 7π/6, 13π/6, 19π/6, 25π/6

Thus, the solutions to the equation 3sin(x) = sin(x) + 1 on the interval [0,27) are:

x = π/6, 7π/6, 13π/6, 19π/6, 25π/6.

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To maximize the fenced area while considering cost, the length of the side facing the river should be 54 feet. Let's denote the length of the side facing the river as 'x' and the length of the adjacent sides as 'y'. The cost of the fence along the river is $10 per foot, so the cost for that side would be 10x.

The cost of the other two sides is $4 per foot, resulting in a combined cost of 8y.

The total cost of the fence is the sum of the costs for each side. It can be expressed as:

Total Cost = 10x + 8y

We know that the total cost is $1,372. Substituting this value, we have:

10x + 8y = 1372

To maximize the fenced area, we need to find the maximum value for xy. However, we can simplify the problem by solving for y in terms of x. Rearranging the equation, we get:

8y = 1372 - 10x

y = (1372 - 10x)/8

Now, we can express the area A in terms of x and y:

A = x * y

A = x * [(1372 - 10x)/8]

To find the maximum area, we can differentiate A with respect to x and set it equal to zero:

dA/dx = (1372 - 10x)/8 - 10x/8 = 0

Simplifying the equation, we get:

1372 - 10x - 10x = 0

1372 - 20x = 0

20x = 1372

x = 68.6

Since the length of the side cannot be in decimal form, we round down to the nearest whole number. Therefore, the length of the side facing the river should be 68 feet.

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The eigenvalues of A are 4, -5, and -6. The eigenvectors corresponding to the eigenvalues 4 and -5 are (1, 2) and (-2, 1), respectively. The eigenvector corresponding to the eigenvalue -6 is (0, 1).

To find the eigenvalues of A, we can use the characteristic equation:

| A - λI | = 0

This gives us the equation:

(4 - λ)(λ^2 + λ - 6) = 0

This equation has three solutions: λ = 4, λ = -5, and λ = -6.

To find the eigenvectors corresponding to each eigenvalue, we can solve the system of equations:

A - λI v = 0

For λ = 4, this gives us the system of equations:

[4 - 4I] v = 0

This system has the solution v = (1, 2).

For λ = -5, this gives us the system of equations:

[-5 - 4I] v = 0

This system has the solution v = (-2, 1).

For λ = -6, this gives us the system of equations:

[-6 - 4I] v = 0

This system has the solution v = (0, 1).

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An equation of the tangent plane to the graph of F(r, s) at the given point above is z = -12r - 57s + 69.

Given the function F(r, s) = 3(1/3)^3 - 3r^2(1/s)^05. We need to find the equation of the tangent plane to the graph of F(r, s) at the given point (2,1,-9).

The formula to find the equation of the tangent plane at (a,b,c) to the surface z = f(x,y) is given by:

z - c = f x (a,b) (x - a) + f y (a,b) (y - b)

where f x and f y are the partial derivatives of the function f(x,y) with respect to x and y respectively.

So, here, we have, f(r,s) = 3(1/3)^3 - 3r^2(1/s)^05

Differentiating partially with respect to r, we get:

f r = -6r/s^05

Differentiating partially with respect to s, we get:f s = 9/s^6 - 15r^2/s^6

Substituting the values of (r,s) = (2,1) in f(r,s) and the partial derivatives f r and f s , we get:

f(2,1) = 3(1/3)^3 - 3(2)^2(1/1)^05= 3(1/27) - 12 = -11/3

f r (2,1) = -6(2)/1^05 = -12

f s (2,1) = 9/1^6 - 15(2)^2/1^6= -57

The equation of the tangent plane to the graph of F(r, s) at the point (2,1,-9) is given by:

z - (-9) = (-12)(r - 2) + (-57)(s - 1) => z = -12r - 57s + 69.

Hence, the required answer is z = -12r - 57s + 69.

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A. The required matrix answer is-

P = [x₁ x₂]

= [23 25] [-1 1]
P⁻¹ = (1/48) [-25 -25] [1 23]

B. We can predict the diagonalatrix

D = [23 0] [0 -25]

C. D = P-¹AP

By calculating the inverse of P and multiplying the 3 matrices.

D = [-575 0] [0 575]

Given matrix is

A = [¹] [24]a.

a. Diagonalizing A:

A = [¹] [24]

To diagonalize A, we have to find its eigenvalues and eigenvectors.
|A - λI| = 0
|[¹ - λ] [24] | = 0
| [24] [¹ - λ]|
(1 - λ)(1 - λ) - 24.24 = 0
λ² - 2λ - 575 = 0
(λ - 23)(λ + 25) = 0

Eigenvalues are λ₁ = 23 and λ₂ = -25.

Eigenvector for λ₁ = 23:
(A - λ₁I)x = 0
[¹ - 23] [24] [x₁] = [0]
[0] [¹ - 23] [x₂] [0]
x₁ - 23x₂ = 0
x₁ = 23x₂

Eigenvector for λ₂ = -25:
(A - λ₂I)x = 0
[¹ + 25] [24] [x₁] = [0]
[0] [¹ + 25] [x₂]=[0]
x₁ + 25x₂ = 0
x₁ = -25x₂
Let P = [x₁ x₂] be the matrix of eigenvectors.

Then P⁻¹AP = D is the diagonal matrix whose diagonal entries are the eigenvalues of A.
P = [x₁ x₂]

= [23 25] [-1 1]
P⁻¹ = (1/48) [-25 -25] [1 23]
b. Diagonal matrix D:

We can predict the diagonal matrix D without further calculations because D is obtained by replacing the eigenvalues of A along the diagonal of a square matrix of size n.

Therefore,

D = [23 0] [0 -25]

c. D = P⁻¹AP:

D = P⁻¹AP
D = (1/48) [-25 -25] [1 23] [¹ 24] [23 -25]
D = (1/48) [-25 -25] [1 23] [23 24(25)] [-23 24(23)]
D = [-575 0] [0 575]

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For the first example, we are given a geometric sequence with the first three terms as 4, x, and x + 24.

To find the value of the car at a specific time, you need to calculate the depreciation for each year up to that time and subtract it from the initial value of £15,645.

In a geometric sequence, each term is found by multiplying the previous term by a constant called the common ratio.

Let's assume the common ratio is denoted by r.

Based on this information, we can write the following equations:

x = 4 × r,

x + 24 = x × r.

To find the possible values of x, we need to solve these equations simultaneously.

From the first equation, we can express r in terms of x: r = x/4.

Substituting this value of r into the second equation, we get:

x + 24 = (x/4) × x.

Simplifying this equation, we have:

4x + 96 = x².

Rearranging the equation, we get:

x² - 4x - 96 = 0.

Now we can solve this quadratic equation for x. Factoring or using the quadratic formula will yield the possible values of x.

For the second example, we are given that a car was purchased for £15,645 on 1st January 2021, and its value depreciates each year.

To determine the value of the car at a given time, we need to know the rate of depreciation.

Let's assume the rate of depreciation is d (expressed as a decimal).

The value of the car at the end of each year can be calculated as follows:

Year 1: £15,645 - d × £15,645,

Year 2: (£15,645 - d × £15,645) - d × (£15,645 - d × £15,645),

Year 3: [£15,645 - d × (£15,645 - d × £15,645)] - d × [£15,645 - d × (£15,645 - d × £15,645)],

and so on.

To find the value of the car at a specific time, you need to calculate the depreciation for each year up to that time and subtract it from the initial value of £15,645.

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We are given the function f(x, y) = 2(1 - 3x - 3y), and we need to find the quadratic and cubic approximations of f near the origin using Taylor's formula.  The quadratic and cubic approximations of f near the origin are the same. Both approximations yield the function 2 - 6x - 6y.

To find the quadratic approximation of f near the origin, we use the second-order Taylor expansion. The quadratic approximation is given by:

Q(x, y) = f(0, 0) + ∇f(0, 0) · (x, y) + (1/2) Hf(0, 0) · (x, y)²,

where f(0, 0) is the value of f at the origin, ∇f(0, 0) is the gradient of f at the origin, Hf(0, 0) is the Hessian matrix of f at the origin, and (x, y)² represents the element-wise square of (x, y).

Calculating the necessary terms:

f(0, 0) = 2(1 - 0 - 0) = 2,

∇f(0, 0) = (-6, -6),

Hf(0, 0) = [[0, 0], [0, 0]].

Substituting these values into the quadratic approximation formula, we have:

Q(x, y) = 2 - 6x - 6y.

For the cubic approximation, we use the third-order Taylor expansion. The cubic approximation is given by:

C(x, y) = f(0, 0) + ∇f(0, 0) · (x, y) + (1/2) Hf(0, 0) · (x, y)² + (1/6) ∇³f(0, 0) · (x, y)³,

where ∇³f(0, 0) is the third derivative of f at the origin.

Calculating the necessary term:

∇³f(0, 0) = 0.

Substituting this value into the cubic approximation formula, we have:

C(x, y) = 2 - 6x - 6y.

In this case, the quadratic and cubic approximations of f near the origin are the same. Both approximations yield the function 2 - 6x - 6y.

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The expected value of the distribution is 1.98.

Given probability distribution is, [tex]X  0 1 2 3 4 5[/tex]

Probability [tex](P(X)) 0.14 0.1 0.16 0.18 0.05 0.09 0.67(i) \\Mean (μ) \\= ∑xP(X)X P(X)0 0.14 1 0.1 2 0.16 3 0.18 4 0.05 5 0.09μ \\= ∑xP(X) \\= (0 × 0.14) + (1 × 0.1) + (2 × 0.16) + (3 × 0.18) + (4 × 0.05) + (5 × 0.09) \\= 1.98[/tex]

Therefore, the mean is 1.98.

(ii) Variance (σ2) [tex]= ∑ (x - μ)2P(X)x P(X)x - μP(X)(x - μ)2P(X)0 0 - 1.98 (-1.98)2 0.03842 1 0.1 - 1.98 (-0.98)2 0.08408 2 0.16 - 1.98 (-0.98)2 0.08408 3 0.18 - 1.98 (1.02)2 0.18612 4 0.05 - 1.98 (2.98)2 0.22322 5 0.09 - 1.98 (3.98)2 0.28326 σ2 = ∑ (x - μ)2P(X) \\= 0.03842 + 0.08408 + 0.08408 + 0.18612 + 0.22322 + 0.28326 \\= 0.89918[/tex]

Therefore, the variance is 0.89918.

(iii) Standard deviation

[tex](σ) = √σ2\\= √0.89918\\= 0.9482(approx)[/tex]

Therefore, the standard deviation is 0.9482 (approx).

(iv) Expected value [tex]= E(X) \\= ∑xP(X)x P(X)0 0.14 1 0.1 2 0.16 3 0.18 4 0.05 5 0.09E(X) \\= ∑xP(X) \\= (0 × 0.14) + (1 × 0.1) + (2 × 0.16) + (3 × 0.18) + (4 × 0.05) + (5 × 0.09) \\= 1.98[/tex]

Therefore, the expected value of the distribution is 1.98.

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Given that the two numbers are -1 - 3i and its conjugate. We need to find the product of these numbers. Let's begin the solution : Solution We know that [tex](a + bi)(a - bi) = a^2]^2 - (bi)^2i^2 = a^2 + b^2[/tex]Where a and b are real numbers

Now, we will calculate the product of -1 - 3i and its conjugate.

[tex]\[\left( { - 1 - 3i} \right)\left( { - 1 + 3i} \right)\] = \[1 + 3i - 3i - 9{i^2}\] = \[1 - 9\left( { - 1} \right)\] = 1 + 9 = 10[/tex]

Therefore, the product of -1 - 3i and its conjugate is 10.We know that the product of -1 - 3i and its conjugate is 10.

So, the real number a equals 5 and the real number b equals 0. The answer is:Real number a = 5Real number b = 0.

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The intermediate step in the form (x + a)² = b after completing the square is (x + 3)² = -9

To complete the square for the equation x² + 18 = -6x, we follow these steps:

Move the constant term to the other side of the equation:

x² + 6x + 18 = 0

Divide the coefficient of the linear term (6) by 2 and square the result:

(6/2)² = 9

Add the result from step 2 to both sides of the equation:

x² + 6x + 9 + 18 = 9

x² + 6x + 9 = -9

The intermediate step in the form (x + a)² = b after completing the square is:

(x + 3)² = -9

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The sample size at 99.9% confidence is 25517

The sample size at 99.5% confidence is 6902

The sample size at 96% confidence is 127

99.9% confident within 1% of the true population proportion

The sample size can be calculated using

n = (z² * p * (1-p)) / E²

Where

z = 3.291 i.e. z-score at 99.9% CI

p = 0.38

E = 1% = 0.01

So, we have

n = (3.291² * 0.38 * (1-0.38)) / 0.01²

Evaluate

n = 25517

99.5% confident within 1.5% of the true population proportion

The sample size can be calculated using

n = (z² * p * (1-p)) / E²

Where

z = 2.807 i.e. z-score at 99.5% CI

p = 0.27

E = 1.5% = 0.015

So, we have

n = (2.807² * 0.27 * (1 - 0.27)) / 0.015²

Evaluate

n = 6902

96% confidence level

The sample size can be calculated using

n = (z² * σ²) / E²

Where

z = 2.05 i.e. z-score at 99.5% CI

σ = 22

E = 4

So, we have

n = (2.05² * 22²) /4²

Evaluate

n = 127

Hence, the sample size is 127

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Green's Theorem relates a line integral around a closed curve to a double integral over the region enclosed by the curve. It states that for a vector field F = (P, Q) and a curve C enclosing a region D.

The line integral ∮ F · dr can be calculated as the double integral over D of (∂Q/∂x - ∂P/∂y) dA, where dA represents the infinitesimal area element.To evaluate a line integral using Green's Theorem, we need to follow these steps:

Determine the vector field F = (P, Q).

Find the partial derivatives ∂P/∂y and ∂Q/∂x.

Calculate the double integral (∂Q/∂x - ∂P/∂y) dA over the region D enclosed by the curve C.

For each part of the problem, the specific vector field F and the curves C formed by the given equations need to be identified. Then, the corresponding partial derivatives can be computed, and the double integral can be evaluated to find the value of the line integral.

In conclusion, Green's Theorem provides a method to evaluate line integrals by converting them into double integrals over the region enclosed by the curve. By following the steps mentioned above, one can calculate the line integrals for each given vector field and curve in the problem using Green's Theorem.

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The length of one side of the rhombus is 17 units. It's worth noting that the length of a side can also be found by using either of the diagonals since they are both equal in a rhombus. However, in this case, we used the Pythagorean theorem to demonstrate the relationship between the diagonals and the sides

In a rhombus, the diagonals intersect at right angles and bisect each other. Let's denote the length of one side of the rhombus as "s."

The diagonals of the rhombus have lengths of 16 and 30 units. Let's label them as "d1" and "d2" respectively.

Since the diagonals bisect each other, they form four congruent right triangles within the rhombus. The sides of these right triangles are half the lengths of the diagonals. Therefore, we can set up the Pythagorean theorem for one of the right triangles:

[tex](d1/2)^2 + (d2/2)^2 = s^2[/tex]

Plugging in the values of the diagonals, we have:

[tex](16/2)^2 + (30/2)^2 = s^2[/tex]

[tex]8^2 + 15^2 = s^2[/tex]

[tex]64 + 225 = s^2[/tex]

[tex]289 = s^2[/tex]

Taking the square root of both sides, we find:

s = √289

s = 17

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Answer: The probability of the first player being the center fielder is 1 out of 9 because there is only one center fielder on the team.

After the center fielder is chosen, there are 8 players remaining, and the probability of the second player being the shortstop is 1 out of 8 because there is only one shortstop on the team.

To calculate the probability of both events occurring in order, we multiply the individual probabilities:

Probability = (1/9) * (1/8) = 1/72

Therefore, the probability that the first two players in the lineup will be the center fielder and the shortstop, in that order, is 1 out of 72.

In this probability distribution problem, we are given that the lifetime of keyboards produced by an electronic company follows a normal distribution with a mean of (150 + B) months and a standard deviation of (20 + B) months.

We need to calculate the probability of the keyboard's lifetime being less than 120 months, more than 160 months, and between 100 and 130 months.

a) To find the probability that the keyboard's lifetime is less than 120 months, we can standardize the value using the z-score formula:

z = (x - μ) / σ

where x is the given value, μ is the mean, and σ is the standard deviation. By substituting the given values into the formula, we can calculate the corresponding z-score. Then, using a standard normal distribution table or software, we can find the probability associated with the calculated z-score.

b) To find the probability that the keyboard's lifetime is more than 160 months, we follow a similar process. We standardize the value using the z-score formula and calculate the corresponding z-score. Then, we find the area under the standard normal distribution curve beyond the calculated z-score to determine the probability.

c) To find the probability that the keyboard's lifetime is between 100 and 130 months, we calculate the z-scores for both values using the same formula. Then, we find the difference between the probabilities associated with the z-scores to determine the probability of the lifetime falling within the given range.

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The position of a particle y, as per the given function, is y(t) = t³ − 14t² + 9t − 1.The acceleration of the particle is represented by the second derivative of the position function with respect to time. So, here is the solution to the given problem;

Position of a particle: The position of a particle y, as per the given function, is

y(t) = t³ − 14t² + 9t − 1.Velocity of the particle:

To find out the velocity of the particle we can take the first derivative of the position function with respect to time. So, the velocity function will be:

v(t) = dy(t)/dt

= 3t² - 28t + 9.

We need to find the values of t where the velocity function is equal to zero.

So, we will equate the above velocity function to zero:0 = 3t² - 28t + 9t = 1/3(28 ± √(28² - 4(3)(9)))/6 = 0.1849 sec and t = 7.4818 sec. Thus, the velocity of the particle is zero at t = 0.1849 sec and t = 7.4818 sec.Position of the particle at t = 0.1849 sec:

To find out the position of the particle at t = 0.1849 sec, we will substitute this value in the position function:y(0.1849)

= (0.1849)³ − 14(0.1849)² + 9(0.1849) − 1y(0.1849)

= -0.7237 units.

Thus, the position of the particle at t = 0.1849 sec is -0.7237 units.

Position of the particle at t = 7.4818 sec:To find out the position of the particle at t = 7.4818 sec, we will substitute this value in the position function:y(7.4818)

= (7.4818)³ − 14(7.4818)² + 9(7.4818) − 1y(7.4818) = -321.096 units. Thus, the position of the particle at t = 7.4818 sec is -321.096 units.

Acceleration of the particle:To find out the acceleration of the particle we can take the second derivative of the position function with respect to time. So, the acceleration function will be:a(t) = d²y(t)/dt²= 6t - 28.Now, we can substitute the values of t where the velocity of the particle is zero:At t = 0.1849 sec:a(0.1849) = 6(0.1849) - 28a(0.1849) = -25.686 sec^-2.At t = 7.4818 sec: a(7.4818) = 6(7.4818) - 28a(7.4818) = 22.891 sec^-2.Graph of y(t) for 0 ≤ t ≤ 1.

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To find the inverse of a given matrix, we will perform Gaussian elimination to transform the matrix into row echelon form and then into reduced row-echelon form.

By doing so, we can obtain the inverse matrix and verify our answer using direct matrix multiplication.

Let's solve each matrix separately:

(i) Matrix A:

-2 -1 -2

-3 -3 1

-2 3 -2

We will perform row operations to convert the matrix into row echelon form:

R2 = R2 + (3/2)R1

R3 = R3 + R1

The resulting matrix in row echelon form is:

-2 -1 -2

0 3 2

0 2 0

Next, we perform row operations to convert the matrix into reduced row-echelon form:

R2 = (1/3)R2

R3 = R3 - (2/3)R2

The resulting matrix in reduced row-echelon form is:

-2 -1 -2

0 1 2/3

0 0 -4/3

Therefore, the inverse matrix A^-1 is:

-2 -1 -2

0 1 2/3

0 0 -4/3

To verify our answer, we can multiply matrix A with its inverse A^-1 and check if the result is the identity matrix:

A * A^-1 = I

(ii) Matrix A:

1 1 1

1 2 -1

2 -1 -2

By following the same steps as in (i), we obtain the inverse matrix A^-1:

1/3 1/3 -1/3

-1/3 1/3 2/3

-1/3 2/3 1/3

To verify our answer, we can multiply matrix A with its inverse A^-1 and check if the result is the identity matrix.

(iii) The matrix provided in (iii) seems to have some formatting issues. Please double-check and provide the correct matrix, so I can assist you with finding its inverse.

Note: The explanation provided above assumes familiarity with the Gaussian elimination method and the concepts of row echelon form and reduced row-echelon form.

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