The height of a soccer ball is modelled by h(t) = −4.9t² + 19.6t + 0.5, where height, h(t), is in metres and time, t, is in seconds. a) What is the maximum height the ball reaches? b) What is the height of the ball after 1 s?

a. To find the curl of F, we calculate the cross product of the del operator (∇) and the vector F. The curl of F is given by curl F = (∂F₃/∂y - ∂F₂/∂z)i + (∂F₁/∂z - ∂F₃/∂x)j + (∂F₂/∂x - ∂F₁/∂y)k.

b. The answer to part (a) tells us about the circulation of the vector field F around a closed curve C. By Stokes' theorem, the line integral of F around a closed curve C is equal to the surface integral of the curl of F over any surface S bounded by C. Therefore, curl F represents the circulation density of the vector field F around a given curve. c. If C' is any closed curve, we can say that the line integral of F around C' is equal to the surface integral of the curl of F over any surface bounded by C'. This is a consequence of Stokes' theorem, which relates the circulation of a vector field around a closed curve to the flux of the curl of the vector field through any surface bounded by that curve.

d. Now, considering the half circle C' defined by (x - 10)² + (y - 25)² = 1 with y > 25, traversed from (11, 25) to (9, 25), we can use the result from part (c). Since C' is a closed curve, we can apply Stokes' theorem. We can take C as the combination of C' and the line segment connecting the endpoints of C. By Stokes' theorem, the line integral of F around C is equal to the surface integral of the curl of F over any surface bounded by C. We can evaluate the line integral by calculating the surface integral of the curl F over the surface bounded by C, which includes C' and the line segment.

However, without a specific surface bounded by C, it is not possible to provide a numerical value for ScF.dr. The result would depend on the specific surface chosen.

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Given a transition matrix A with values as || 1/2 1/2 1/656 1/26The steady-state probability vector can be determined by calculating the eigenvalues and eigenvectors of A. For this purpose, let's first calculate the eigenvalues of A using the following equation,

|A-λI| = 0, where λ is the eigenvalue and I is the identity matrix.
Here, A is the given matrix as mentioned above. Therefore, we have to perform matrix subtraction as shown below:
|A-λI| = |-λ 1/2 1/2 1/656 1/26 0 1/2 -λ 1/656 1/26 0 1/2 1/656 -λ 1/2 1/26 1/2 1/656 1/2 1/2 -1 1/656 -25/26|
By using elementary row operations such as adding the second and third row to the first row, we get:
|-λ 0 0 1/328 1/13 0 1/2 -λ 1/656 1/26 0 1/2 1/656 -λ 1/2 1/26 1/2 1/656 0 0 -1 1/656 -25/26|
We can simplify this expression as:
(-λ) [(4λ^3) - (11881λ^2) - (3(6^12))] = 0
We can solve this equation and obtain the eigenvalues for the matrix A as λ1 is 1 and λ2, λ3, λ4 is -1/2.
Next, we need to find the eigenvectors for each eigenvalue. We begin by calculating the eigenvector corresponding to the eigenvalue λ1 = 1. We do this by solving the following equation:
(A - λ1 I) x = 0, where I is the identity matrix and x is the eigenvector.
This gives us the following equation:
|1/2 -1/2 -1/656 -1/26| |x1|

= |0|  |1/2 -1/2 -1/656 -1/26| |x2|   |0|  |1/2 1/2 1/656 -1/26| |x3|   |0|  |-1/2 -1/2 -1/656 27/26| |x4|   |0|
Solving the system of equations using row reduction, we obtain:
|x1| = |x2|,  

|x3| = 656x1,  

|x4| = -169x1
Substituting x2 = x1 into the second equation,

we get x3 = 656x1.
Substituting these values into the fourth equation, we obtain x4 = -169x1.
Now, we need to normalize the vector x so that its components sum to 1. This gives us:
x = (1/2, 1/2, 1/656, -1/169)
Thus, the steady-state probability vector for the Markov process with transition matrix A is:
(1/2, 1/2, 1/656, -1/169)
Finally, we normalize the vector x so that its components sum to 1.

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In two linearly independent solutions the value of n is 2, a1, a2, a3, r2 and b2  are undetermined, b1 = 0 and b3 = 0.

To find the linearly independent solutions of the given differential equation, we can assume solutions in the form:

Y1 = x(1 + a1x + a2[tex]x^{2}[/tex] + a3[tex]x^{3}[/tex] + ...)

Y2 = [tex]x^{2}[/tex](1 + b1x + b2[tex]x^{2}[/tex] + b3[tex]x^{3}[/tex] + ...)

where a1, a2, a3, b1, b2, b3, etc., are coefficients to be determined.

First, let's calculate the derivatives of Y1 and Y2:

Y1' = (1 + 2a1x + 3a2[tex]x^{2}[/tex] + 4a3[tex]x^{3}[/tex] + ...) + x(a1 + 2a2x + 3a3[tex]x^{2}[/tex] + ...)

Y1'' = (2a1 + 6a2x + 12a3[tex]x^{2}[/tex] + ...) + (a1 + 2a2x + 3a3[tex]x^{2}[/tex] + ...) + x(2a2 + 6a3x + ...)

Y2' = (2 + 3b1x + 4b2[tex]x^{2}[/tex] + 5b3[tex]x^{3}[/tex] + ...) + 2x(1 + b1x + b2[tex]x^{2}[/tex] + b3[tex]x^{3}[/tex] + ...)

Y2'' = (3b1 + 8b2x + 15b3[tex]x^{2}[/tex] + ...) + (2 + 3b1x + 4b2[tex]x^{2}[/tex] + 5b3[tex]x^{3}[/tex] + ...) + 2x(2b1 + 4b2x + 6b3[tex]x^{2}[/tex] + ...)

Now, substitute these derivatives into the given differential equation:

2[tex]x^{2}[/tex]Y1'' - xY1 + (3x + 1)Y1 = 0

2[tex]x^{2}[/tex]Y2'' - xY2 + (3x + 1)Y2 = 0

Simplifying the equations by substituting the expressions for Y1 and Y2:

2[tex]x^{2}[/tex][(3b1 + 8b2x + 15b3[tex]x^{2}[/tex] + ...) + (2 + 3b1x + 4b2[tex]x^{2}[/tex] + 5b3[tex]x^{3}[/tex] + ...) + 2x(2b1 + 4b2x + 6b3[tex]x^{2}[/tex] + ...)]

x[(1 + 2a1x + 3a2[tex]x^{2}[/tex] + 4a3[tex]x^{3}[/tex] + ...) + x(a1 + 2a2x + 3a3[tex]x^{2}[/tex] + ...)]

(3x + 1)[x(1 + a1x + a2[tex]x^{2}[/tex] + a3[tex]x^{3}[/tex] + ...)] = 0

Grouping terms with the same powers of x:

2(3b1) + 2(2) + 2(2b1) = 0 (for [tex]x^{0}[/tex] term)

2(8b2 + 3b1) + (1 + 2a1) - (a1) = 0 (for [tex]x^{1}[/tex] term)

2(15b3 + 4b2) + (2a1 + 3a2) - (2a1) = 0 (for [tex]x^{2}[/tex] term)

2(5b3) + (3a2 + 4a3) = 0 (for [tex]x^{3}[/tex] term)

...

...

...

From these equations, we can see that the coefficients b1 and b2 are arbitrary (since they do not appear in the equations for the x^0 and x^1 terms). We can set b1 = 0 and b2 = 0 for simplicity.

The equations can be further simplified to:

6b1 + 4 = 0

15b3 = 0

(3a2 + 4a3) = 0

...

Solving these equations, we find:

b1 = 0

b3 = 0

a2 = -4a3/3

Hence, the values are:

n = 2 (since we have two linearly independent solutions)

a1, a3, r2 are undetermined since they are not involved in the equations.

Therefore, the values of n, a1, a2, a3, r2, b1, b2, and b3 are:

n = 2

a1, a2, a3 (undetermined)

r2 (undetermined)

b1 = 0

b2 (undetermined)

b3 = 0

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Domain of this function is alll real numbers,range of this fuction is all real numbers,Asymptotes of this fuction is that there are no vertical or horizontal asymptotes and the graph in Linear function.

The given function is f(x) = 4x - 3/(x + 4). To determine the domain of this function, we need to consider any values of x that would make the denominator, x + 4, equal to zero. However, since division by zero is undefined, we exclude x = -4 from the domain. Therefore, the domain of the function is all real numbers except x = -4.

Next, let's determine the range of the function. Since the function is a rational function, it can take any real value except the values that would make the numerator zero. In this case, the numerator is 4x - 3, which can never be equal to zero for any real value of x. Therefore, the range of the function is also all real numbers.

Moving on to the asymptotes, we can analyze the behavior of the function as x approaches positive or negative infinity. Since the degree of the numerator is less than the degree of the denominator, the function has a horizontal asymptote. However, in this case, the degree of the numerator is equal to the degree of the denominator, resulting in a slant asymptote rather than a horizontal asymptote. To find the equation of the slant asymptote, we can perform long division or synthetic division on the function. Upon doing so, we find that the slant asymptote is y = 4x - 7.

Finally, since the function is a linear function (degree 1), the graph will be a straight line. The graph will approach the slant asymptote as x approaches positive or negative infinity, but it will not have any vertical or horizontal asymptotes.

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The mean of a random variable X is a measure of its average value or expected value. In this exercise, we are given the probabilities associated with each possible value of X. To find the mean of X, we need to multiply each value by its corresponding probability and sum them up.

To calculate the mean of X, we multiply each value (1, 2, 3, 4) by its corresponding probability (p, 0.4, 0.25, 0.3) and sum them up:Mean of X = (1 * p) + (2 * 0.4) + (3 * 0.25) + (4 * 0.3)Simplifying the expression, we have:Mean of X = p + 0.8 + 0.75 + 1.2Combining the terms, we getMean of X = p + 2.75Therefore, the mean of X is given by the expression 2.75 + p. Hence, the correct answer is option b) 2.75 + p.

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a) The formula for the vector in terms of c1 and c2 arey(0) = c1y(1) = c1 cos(1) + c2 sin(1)y(3) = c1 cos(3) + c2 sin(3)y(4) = c1 permutation cos(4) + c2

sin(4)∴ The vector can be expressed in the form of a matrix[tex]$$\begin{b matrix} y(0) \\ y(1) \\ y(3) \\ y(4)[/tex]

[tex]\end{bmatrix} = \begin{bmatrix} 1 & 0 \\ \cos(1) & \sin(1) \\ \cos(3) & \sin(3) \\ \cos(4) & \sin(4) \end{bmatrix} \begin{bmatrix} c_1 \\ c_2 \end{bmatrix}$$b)  Let x = $\begin{bmatrix} c_1 \\ c_2 \end{bmatrix}$, then:$$Ax = \begin{bmatrix} 1 & 0 \\ \cos(1) & \sin(1) \\ \cos(3) & \sin(3) \\ \cos(4) & \sin(4) \end{bmatrix} \begin{bmatrix} c_1 \\ c_2 \end{bmatrix} =[/tex]

[tex]\begin{bmatrix} y(0) \\ y(1) \\ y(3) \\ y(4) \end{bmatrix} = b$$c) The normal equation for the minimization of $\|Ax - b\|^2$ is:$$(A^TA)x = A^Tb$$Substituting the given values of A and b in the above equation, we get:$$\begin{bmatrix} 1 & \cos(1) & \cos(3) & \cos(4) \\ 0 & \sin(1) & \sin(3) & \sin(4) \end{bmatrix} \begin{bmatrix} 1 & 0 \\ \cos(1) & \sin(1) \\ \cos(3) & \sin(3) \\ \cos(4) & \sin(4) \end{bmatrix}[/tex]

[tex]\begin{bmatrix} c_1 \\ c_2 \end{bmatrix} = \begin{bmatrix} 1 & \cos(1) & \cos(3) & \cos(4) \\ 0 & \sin(1) & \sin(3) & \sin(4) \end{bmatrix} \begin{bmatrix} y(0) \\ y(1) \\ y(3) \\ y(4) \end{bmatrix}$$[/tex]

Solving the above equation using a calculator, we get:

[tex]$$\begin{bmatrix} 12.7433 & -3.4182 \\ -3.4182 & 2.1846 \end{bmatrix} \begin{bmatrix} c_1 \\ c_2 \end{bmatrix} = \begin{bmatrix} -0.7 \\ 0.3252 \end{bmatrix}$$d)[/tex]

Solving the above system of equations, we get:

[tex]$c_1 = 0.8439$ and $c_2 = -1.2904$[/tex]

Hence, the best-fitting trigonometric function is:y(t) = 0.8439 cos(t) - 1.2904 sin(t)

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The correct answer is (c) determining the linearity between two vectors.

The dot product is indeed useful in calculating the area of a triangle (option a) using the formula [tex]\frac{1}{2} \times \text{base} \times \text{height}[/tex], where the base is the magnitude of one of the vectors forming the triangle and the height is the perpendicular distance between the base and the other vector.

The dot product is also useful in determining a perpendicular vector (option b) by checking if the dot product of two vectors is zero. If the dot product is zero, it indicates that the vectors are orthogonal and therefore perpendicular to each other.

Additionally, the dot product is used in finding the angle between two vectors (option d) using the formula [tex]\cos(\theta) = \frac{{\mathbf{A} \cdot \mathbf{B}}}{{|\mathbf{A}| \cdot |\mathbf{B}|}}[/tex], where A and B are the vectors and (A · B) represents the dot product.

However, the dot product is not directly used in determining the linearity between two vectors (option c). Linearity between vectors refers to whether one vector can be expressed as a linear combination of other vectors. This concept is typically explored using concepts like linear independence, linear dependence, and span.

Therefore, the correct answer is (c) determining the linearity between two vectors.

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The zeros of the function f(x) = 2x⁵ + 11x⁴ + 44x³+ 31x³ - 148x + 60 are: -2±4i, 1, 1, -3.

The function f(x) has multiple zeros, which can be determined by setting f(x) equal to zero and solving the resulting equation. The zeros of f(x) are -2±4i, 1, 1, and -3. The term "±4i" represents complex solutions, indicating that the function has non-real zeros. The values 1 and -3 are repeated zeros, meaning they occur multiple times. None of the zeros are given in exact form, as the complex solutions are expressed using the imaginary unit "i" and the repeated zeros are listed as they are.

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L¹(R) is not a subspace of L²(R). L²(R) is not a subspace of L¹(R). Let f € L²(R) have compact support.

Let A = supp(f). Therefore, f is non-zero only on the compact set A. Hence, f(x) belongs to L¹(R). Therefore, we can conclude that f(x) belongs to L²(R) ∩ C₀(R) = L¹(R). Let f(x) = x^{-1/4} on R-\{0\}. It can be observed that f(x) belongs to L¹(R), however, it does not belong to L²(R). Therefore, L¹(R) is not a subspace of L²(R).:Let f(x) = 1/{(1+x^2)^{1/4}} on R. It can be observed that f(x) belongs to L²(R), however, it does not belong to L¹(R). Therefore, L²(R) is not a subspace of L¹(R). For the given exercise, we need to show that L¹(R) and L²(R) are not subspaces of each other. We also need to show that if f € L²(R) has compact support, then it is in L¹(R).

To show that L¹(R) is not a subspace of L²(R), we need to find a function in L¹(R) that does not belong to L²(R). For this, let f(x) = x^{-1/4} on R-\{0\}. It can be observed that f(x) belongs to L¹(R), however, it does not belong to L²(R). Hence, L¹(R) is not a subspace of L²(R).

To show that L²(R) is not a subspace of L¹(R), we need to find a function in L²(R) that does not belong to L¹(R). For this, let f(x) = 1/{(1+x^2)^{1/4}} on R. It can be observed that f(x) belongs to L²(R), however, it does not belong to L¹(R). Hence, L²(R) is not a subspace of L¹(R).

f € L²(R) with compact support is in L¹(R):To show that if f € L²(R) has compact support, then it is in L¹(R), we need to prove that supp(f) is compact. Let A = supp(f). Since f is non-zero only on the compact set A, it follows that f(x) belongs to L¹(R). Hence, we can conclude that f(x) belongs to L²(R) ∩ C₀(R) = L¹(R).Therefore, we can conclude that L²(R) ∩ C₀(R) = L¹(R).

In conclusion, the given exercise related L²(R) and L¹(R) and the following are true: L¹(R) is not a subspace of L²(R). L²(R) is not a subspace of L¹(R).f € L²(R) with compact support is in L¹(R) which further shows that L²(R) ∩ C₀(R) = L¹(R).

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Let's denote the original price of the car as "P". During the sale, the price was marked down by 15%, which means the customer paid 85% of the original price. We can set up the following equation:

0.85P = $18,700

To find the original price "P," we can divide both sides of the equation by 0.85:

P = $18,700 / 0.85

Calculating this expression gives us:

P ≈ $21,976.47

Therefore, the original price of the car was approximately $21,976.47.

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Answer: 61.2 degrees Fahrenheit

Step-by-step explanation:

Explanation is as attached below.

The annual growth rate in population of 1.2% means that the population is increasing by 1.2% of the current population each year. To find the time it will take for the population to reach 10 billion, we need to use the following formula:P(t) = P0 × (1 + r)^twhere P0 is the initial population, r is the annual growth rate, t is the time (in years), and P(t) is the population after t years.

We can use this formula to solve the problem as follows: Let [tex]P0 = 7.6 billion, r = 0.012 (since 1.2% = 0.012)[/tex], and P(t) = 10 billion. Plugging these values into the formula, we get: 10 billion = 7.6 billion × (1 + 0.012)^t Simplifying the right side of the equation, we get:10 billion = 7.6 billion × 1.012^tDividing both sides by 7.6 billion, we get:1.3158 = 1.012^tTaking the natural logarithm of both sides,

we get:ln[tex](1.3158) = ln(1.012^t)[/tex] Using the property of logarithms that ln [tex](a^b) = b ln(a)[/tex], we can simplify the right side of the equation as follows:ln(1.3158) = t ln(1.012)Dividing both sides by ln(1.012), we get:t = ln(1.3158) / ln(1.012)Using a calculator to evaluate the right side of the equation, we get:t ≈ 36.8Therefore, it will take about 36.8 years for the world's population to reach 10 billion at an annual growth rate of 1.2%.

In conclusion, It will take approximately 36.8 years for the world's population to reach 10 billion at an annual growth rate of 1.2%. The calculation was done using the formula P(t) = P0 × (1 + r)^t, where P0 is the initial population, r is the annual growth rate, t is the time (in years), and P(t) is the population after t years.

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The correct option is: The null should NOT be rejected. There is NOT a significant difference in the average salaries.

The test statistic is given by the formula below:[tex]t = (x1 − x2 − (μ1 − μ2)) / (sqrt ((s1^2 / n1) + (s2^2 / n2)))[/tex]

where x1 and x2 are the sample means, s1 and s2 are the sample standard deviations, n1, and n2 are the sample sizes, μ1 and μ2 are the population means, and σ1 and σ2 are the population standard deviations.

Substituting the given values we get[tex],t = (51 - 47 - 0) / (sqrt ((12^2 / 72) + (10^2 / 55)))≈ 1.0235[/tex]

The p-value is the probability of getting a test statistic as extreme or more extreme than the one calculated from the sample data.

This is a two-tailed test, so we need to find the area in both tails under the t-distribution curve with 125 degrees of freedom.

Using a t-distribution table or calculator, we get a p-value of approximately 0.3074.

At the 5% level of significance, the critical value is given by:[tex]t = ± 1.9800[/tex]

Since the calculated test statistic (1.0235) falls within the acceptance region [tex](-1.9800 < t < 1.9800)[/tex], we fail to reject the null hypothesis.

Therefore, we can conclude that there is NOT a significant difference in the average salaries.

So, the correct option is:

The null should NOT be rejected. There is NOT a significant difference in the average salaries.

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a. The equation of the plane A₁A₂A₃ is: 10x + 4y - 20z + 46 = 0

b. The equation of the line using the point-slope form: (x - 3)/(-4) = (y - 1)/5 = (z - 4)/(-3)

c. The equation of the line is then: x = 3 + 10t, y = 1 + 4t, z = 4 - 20t

d. The equation of the line is: (x + 1)/(-4) = (y - 1)/5 = (z - 6)/(-3)

e. cos θ = (n · (0, 0, 1)) / (||n|| ||z-axis||) = -20 / (2√129).

a. To find the equation of the plane A₁A₂A₃, we can use the point-normal form of the equation, which is given by:

Ax + By + Cz + D = 0

To determine the coefficients A, B, C, and D, we can use the three points A₁(3, 1, 4), A₂(-1, 6, 1), and A₃(-1, 1, 6).

First, we need to find two vectors that lie in the plane. We can use the vectors formed by the differences of the points:

v₁ = A₂ - A₁ = (-1 - 3, 6 - 1, 1 - 4) = (-4, 5, -3)

v₂ = A₃ - A₁ = (-1 - 3, 1 - 1, 6 - 4) = (-4, 0, 2)

Next, we find the cross product of v₁ and v₂, which will give us the normal vector to the plane:

n = v₁ × v₂ = (-4, 5, -3) × (-4, 0, 2)

= (10, 4, -20)

Now, we can write the equation of the plane using the point-normal form:

10x + 4y - 20z + D = 0

To find the value of D, we substitute the coordinates of one of the points, let's say A₁(3, 1, 4), into the equation:

10(3) + 4(1) - 20(4) + D = 0

30 + 4 - 80 + D = 0

D = 46

Therefore, the equation of the plane A₁A₂A₃ is:

10x + 4y - 20z + 46 = 0

b. To find the equation of the line A₁A₂, we can use the point-slope form, which is given by:

(x - x₁)/a = (y - y₁)/b = (z - z₁)/c

Using the points A₁(3, 1, 4) and A₂(-1, 6, 1), we can find the direction ratios of the line:

a = -1 - 3 = -4

b = 6 - 1 = 5

c = 1 - 4 = -3

Now, we can write the equation of the line using the point-slope form:

(x - 3)/(-4) = (y - 1)/5 = (z - 4)/(-3)

c. To find the equation of the line AM perpendicular to the plane A₁A₂A₃, we can use the parametric form of the equation. Since the line is perpendicular to the plane, its direction vector will be parallel to the normal vector of the plane. We already found the normal vector to be n = (10, 4, -20).

We can use the point A₁(3, 1, 4) as the reference point on the line. The equation of the line is then:

x = 3 + 10t

y = 1 + 4t

z = 4 - 20t

d. To find the equation of the line A₃N parallel to the line A₁A₂, we can use the point-slope form. Since A₃(-1, 1, 6) lies on the line A₁A₂, the direction ratios of the line A₁A₂ will also be the direction ratios of the line A₃N.

Using the point A₃(-1, 1, 6), we can write the equation of the line as:

(x + 1)/(-4) = (y - 1)/5 = (z - 6)/(-3)

e. To find the equation of the plane containing point A₄ and the line A₁A₂, we can use the point-normal form. We have the point A₄(0, 4, -1), and since the line A₁A₂ lies in the plane, its direction ratios can be used as the normal vector.

Using the direction ratios of the line A₁A₂, we can write the equation of the plane as:

4x + 5y - 3z + D = 0

To find the value of D, we substitute the coordinates of the point A₄(0, 4, -1) into the equation:

4(0) + 5(4) - 3(-1) + D = 0

20 + 3 + D = 0

D = -23

Therefore, the equation of the plane containing point A₄ and the line A₁A₂ is:

4x + 5y - 3z - 23 = 0

B. Now, let's calculate the given quantities:

a. To find sin θ, where θ is the angle between the line A₁A₄ and the plane A₁A₂A₃, we can use the dot product of the direction vector of the line and the normal vector of the plane.

The direction vector of the line A₁A₄ is given by v = A₄ - A₁ = (0 - 3, 4 - 1, -1 - 4) = (-3, 3, -5).

The normal vector of the plane A₁A₂A₃ is given by n = (10, 4, -20).

The dot product of v and n is given by:

v · n = (-3)(10) + (3)(4) + (-5)(-20)

= -30 + 12 + 100

= 82

The magnitude of v is given by ||v|| = √((-3)^2 + 3^2 + (-5)^2) = √(9 + 9 + 25) = √43.

Therefore, sin θ = (v · n) / (||v|| ||n||) = 82 / (√43 ||n||).

b. To find cos θ, where θ is the angle between the coordinate plane z = 0 and the plane A₁A₂A₃, we can use the dot product of the normal vector of the plane and the direction vector of the z-axis, which is (0, 0, 1).

The normal vector of the plane A₁A₂A₃ is given by n = (10, 4, -20).

The dot product of n and the direction vector of the z-axis is given by:

n · (0, 0, 1) = (10)(0) + (4)(0) + (-20)(1)

= 0 + 0 - 20

= -20

The magnitude of n is given by ||n|| = √(10^2 + 4^2 + (-20)^2) = √(100 + 16 + 400) = √516 = 2√129.

Therefore, cos θ = (n · (0, 0, 1)) / (||n|| ||z-axis||) = -20 / (2√129).

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If AC = 13 and  BC = 10 then the radius is  8.30.

Given that,

For the given triangle,

AC = 13

BC = 10

Here we can see that the perpendicular of triangle is the radius circle.

Then,

We have to calculate AB

The given triangle ABC is right angled triangle,

We know that the Pythagoras theorem for a right angled triangle:

Therefore,

⇒ (Hypotenuse)²= (Perpendicular)² + (Base)²

⇒ (AC)²= (AB)² + (BC)²

⇒    13² = (AB)² + 10²

⇒ (AB)² = 169 - 100

⇒ (AB)² =  69

⇒    AB = 8.30

Hence the radius of circle  is 8.30.

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The complete question is attached below:

The length of the rectangle is 6x² - 7x + 5, and the width is 1.

We have,

To factor the expression 6x² - 7x + 5 and determine the expressions for the length and width of the rectangle, we need to find two binomial expressions that, when multiplied, give us the given expression.

The expression 6x² - 7x + 5 cannot be factored into two binomial expressions with integer coefficients.

Therefore, we'll represent the length and width of the rectangle using the given expression itself.

Length = 6x² - 7x + 5

Width = 1 (or any constant value)

Thus,

The length of the rectangle is 6x² - 7x + 5, and the width is 1.

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The functions f(x) = |x| and g(x) is obtained from f(x) = |x| if we reflect f across the x-axis, shift 4 units to the right and 3 units upwards.

(1) Equation of g(x):

When f(x) = |x| is reflected across the x-axis, it is transformed into -|x|.

To shift 4 units to the right, we need to replace x with x - 4.

To shift 3 units upwards, we need to add 3 to the resulting expression.

Thus, the equation of g(x) is given by:

g(x) = -|x - 4| + 3(2)

Graph of g:

Start with the graph of f(x) = |x|, which is as follows:

Graph of f(x) = |x|

In order to transform f(x) into g(x),

we need to apply the following transformations:

Reflect f(x) across the x-axis:

Graph of -|x|

Shift 4 units to the right:

Graph of -|x - 4|

Shift 3 units upwards:

Graph of -|x - 4| + 3

Thus, the graph of g(x) is as follows:

Graph of g(x)(3)

Steps of transformation for h(x):

The function h(x) = 5 - 2|x - 3| can be obtained by applying the following transformations to f(x) = |x|:

Shift 3 units to the right: f(x - 3)

Graph of f(x - 3)

Stretch vertically by a factor of 2: 2f(x - 3)

Graph of 2f(x - 3)

Reflect across the x-axis: -2f(x - 3)

Graph of -2f(x - 3)

Shift 5 units upwards: -2f(x - 3) + 5

Graph of h(x) = -2f(x - 3) + 5 = 5 - 2|x - 3|

Thus, the steps of transformation that we need to apply to f(x) to obtain h(x) are as follows:

Shift 3 units to the right.

Stretch vertically by a factor of 2.

Reflect across the x-axis.

Shift 5 units upwards.

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If two right triangles have congruent acute angles, then the triangles are similar.

Right Triangle Similarity Theorems are a set of geometric principles that relate to the similarity of right triangles.

Here are two examples of these theorems:

Angle-Angle (AA) Similarity Theorem:

According to the Angle-Angle Similarity Theorem, if two right triangles have two corresponding angles that are congruent, then the triangles are similar.

In other words, if the angles of one right triangle are congruent to the corresponding angles of another right triangle, the triangles are similar.

For example, if triangle ABC is a right triangle with a right angle at vertex C, and triangle DEF is another right triangle with a right angle at vertex F, if angle A is congruent to angle D and angle B is congruent to angle E, then triangle ABC is similar to triangle DEF.

Side-Angle-Side (SAS) Similarity Theorem:

According to the Side-Angle-Side Similarity Theorem, if two right triangles have one pair of congruent angles and the lengths of the sides including those angles are proportional, then the triangles are similar.

For example, if triangle ABC is a right triangle with a right angle at vertex C, and triangle DEF is another right triangle with a right angle at vertex F, if angle A is congruent to angle D and the ratio of the lengths of the sides AB to DE is equal to the ratio of the lengths of BC to EF, then triangle ABC is similar to triangle DEF.

These theorems are fundamental in establishing the similarity of right triangles, which is important in various geometric and trigonometric applications.

They provide a foundation for solving problems involving proportions, ratios, and other geometric relationships between right triangles.

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The solution to the logarithmic equation log 8x - log(1-x) = 2 is x = [tex]\frac{7}{9}[/tex]

The given logarithmic equation log 8x - log(1-x) = 2 can be solved algebraically in three steps.

First, we can use the property of logarithms that states log(a) - log(b) = log([tex]\frac{a}{b}[/tex]). Applying this property to the equation, we get log([tex]\frac{8x}{(1-x)}[/tex]) = 2.

In the second step, we can rewrite the equation in exponential form: [tex]10^2[/tex] = [tex]\frac{8x}{(1-x)}[/tex]. Simplifying further, we have 100 = 8x - [tex]8x^2[/tex].

Rearranging the terms, we obtain the quadratic equation [tex]8x^2[/tex] - 8x + 100 = 0. By solving this equation using the quadratic formula, we find two solutions: x = (1 ± [tex]\frac{\sqrt{(-19))}}{4}[/tex].

However, since the square root of a negative number is not defined in the real number system, we discard the negative solution. Therefore, the final solution to the equation is x = [tex]\frac{7}{9}[/tex].

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3.The flux of the vector field f(x, y, z) = [tex](x^2 - yxy, -2(2xz + y))[/tex] is -7/12.

4. The flux of the vector field F(x, y, z) = (x, y, z) is 1/2 + 1/2z.

3.We have the vector field f(x, y, z) = [tex](x^2 - yxy, -2(2xz + y))[/tex]. The surface σ is the face of the tetrahedron in the first octant bounded by x + y + z = 1 and the coordinate planes.

To determine the bounds for integration, let's analyze the tetrahedron and its intersection with the coordinate planes.

The equation of the plane x + y + z = 1 can be rewritten as z = 1 - x - y.

We know that the tetrahedron is in the first octant, so the bounds for x, y, and z will be:

0 ≤ x ≤ 1

0 ≤ y ≤ 1 - x

0 ≤ z ≤ 1 - x - y

Now, let's calculate the flux:

We have:

∂r/∂x = (1, 0, -1)

∂r/∂y = (0, 1, -1)

Taking the cross product:

dA = (1, 0, -1) × (0, 1, -1) dx dy

  = (1, 1, 1) dx dy

Now, let's calculate the flux integral:

Φ = ∫∫f · dA

Φ = ∫∫([tex](x^2 - yxy, -2(2xz + y))[/tex] · (1, 1, 1)) dx dy

  = ∫∫[tex](x^2 - yxy - 4xz - 2y)[/tex]dx dy

Since the tetrahedron is bounded by the coordinate planes, the integration limits are:

0 ≤ x ≤ 1

0 ≤ y ≤ 1 - x

Now, we can perform the integration:

Φ = [tex]\int_0^1\int_0^{1-x} (x^2 - yxy - 4xz - 2y) dy dx[/tex]

Let's first integrate with respect to y:

[tex]\int_0^{1-x} (x^2 - yxy - 4xz - 2y) dy = [x^2y - (1/2)xy^2 - 2xy - y^2] [0,1-x][/tex]

[tex]\int_0^{1-x} (x^2 - yxy - 4xz - 2y) dy = (x^2(1-x) - (1/2)x(1-x)^2 - 2x(1-x) - (1-x)^2) - (0 - 0 - 0 - 0)[/tex]

[tex]\int_0^{1-x} (x^2 - yxy - 4xz - 2y) dy = (x^2 - (1/2)x(1-x) - 2x(1-x) - (1-x)^2)[/tex]

Now, let's integrate the outer integral with respect to x:

Φ = [tex]\int_0^1(x^2 - (1/2)x(1-x) - 2x(1-x) - (1-x)^2) dx[/tex]

Simplifying:

Φ = [tex]\int_0^1 (x^2 - (1/2)x(1-x) - 2x + 2x^2 - (1-2x+x^2)) dx[/tex]

Φ = [tex]\int_0^1 ((5/2)x^2 - (1/2)x - 1) dx[/tex]

Φ =[tex](5/6(1)^3 - (1/4)(1)^2 - (1)) - (5/6(0)^3 - (1/4)(0)^2 - (0))[/tex]

Φ = (5/6 - 1/4 - 1) - (0 - 0 - 0)

Φ = (5/6 - 1/4 - 1)

Φ = -7/12

Therefore, the flux of the vector field f(x, y, z) = [tex](x^2 - yxy, -2(2xz + y))[/tex]across the surface σ, the face of the tetrahedron in the first octant bounded by x + y + z = 1 and the coordinate planes, with positive orientation, is -7/12.

4. We have the vector field F(x, y, z) = (x, y, z). The surface σ is the surface of the solid defined by the tetrahedron in the first octant bounded by x + y + z = 1 and the coordinate planes.

To determine the bounds for integration, we can use the same bounds as in problem 3:

0 ≤ x ≤ 1

0 ≤ y ≤ 1 - x

0 ≤ z ≤ 1 - x - y

Now, let's calculate the flux::

We have:

∂r/∂x = (1, 0, -1)

∂r/∂y = (0, 1, -1)

Taking the cross product:

dA = (1, 0, -1) × (0, 1, -1) dx dy

  = (1, 1, 1) dx dy

Now, let's calculate the flux integral:

Φ = ∫∫F · dA

Φ = ∫∫((x, y, z) · (1, 1, 1)) dx dy

  = ∫∫(x + y + z) dx dy

Since the tetrahedron is bounded by the coordinate planes, the integration limits are the same as in problem 3:

0 ≤ x ≤ 1

0 ≤ y ≤ 1 - x

Now, we can perform the integration:

[tex]\phi = \int_0^1\int_0^{1-x} (x + y + z) dy dx[/tex]

Let's first integrate with respect to y:

[tex]\int {0,1-x} (x + y + z) dy[/tex] = (x(1-x) + y(1-x) + z(1-x)) [0,1-x]

[tex]\int_0^{1-x} (x + y + z) dy = (x(1-x) + (1-x)^2 + z(1-x))[/tex]

Now, let's integrate the outer integral with respect to x:

[tex]\phi = \int _0^1 (x(1-x) + (1-x)^2 + z(1-x)) dx[/tex]

Simplifying:

[tex]\phi= \int _0^1 (x - x^2 + 1 - 2x + x^2 + z - zx) dx[/tex]

[tex]\phi = [x - (1/2)x^2 + zx - (1/2)zx^2] |_0^1[/tex]

Φ = (1 - (1/2) + z - (1/2)z) - (0 - 0 + 0 - 0)

Φ = (1 - 1/2 + z - 1/2z)

Φ = 1/2 + 1/2z

Therefore, the flux of the vector field F(x, y, z) = (x, y, z) across the surface σ, which is the surface of the solid defined by the tetrahedron in the first octant bounded by x + y + z = 1 and the coordinate planes, with positive orientation, is 1/2 + 1/2z.

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The given problem statement consists of four different scenarios, each requiring a program to perform specific calculations and display certain outputs.

The first scenario involves tracking Trina's trip and calculating fuel efficiency. The second scenario involves calculating the percentage contribution of different cookie types to total sales. The third scenario involves calculating the total revenue from first-class and coach seats on an airplane. The fourth scenario involves calculating an employee's gross pay, taxes withheld, and net pay based on hours worked and various tax rates. An IPO chart is requested for each scenario.

1. Trina's Trip:

Input: Initial trip meter reading, miles traveled, gallons of gas consumed.

Process: Calculate fuel efficiency (miles per gallon).

Output: Fuel efficiency.

2. Cookie Sales:

Input: Number of boxes sold for each cookie type.

Process: Calculate the total number of boxes sold and the percentage contribution of each cookie type to the total.

Output: Percentage contribution for each cookie type.

3. Airplane Seats:

Input: Number of first-class and coach seats sold, ticket prices.

Process: Calculate the total revenue from first-class seats and coach seats.

Output: Total revenue.

4. Payroll Calculation:

Input: Hours worked, hourly pay rate, FWT rate, FICA tax rate, state tax rate.

Process: Calculate gross pay, FWT amount, FICA tax amount, state tax amount, and net pay.

Output: Gross pay, FWT amount, FICA tax amount, state tax amount, and net pay.

An IPO chart outlines the inputs (I), processes (P), and outputs (O) for each scenario, providing a clear understanding of the program requirements and functionalities for each specific problem.

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The radius of convergence of a power series is determined by the limit of the sequence of coefficients. If the limit L exists and is between 0 and infinity, the radius of convergence is 1. If L is 0, the radius of convergence is infinity, and if L is infinity, the radius of convergence is 0.

(a) If the limit L exists and is between 0 and infinity, then according to the Ratio Test, the series converges absolutely for |x - xo| < R, where R is the radius of convergence. Since L is finite, we have lim |an+1/an| = L. By the Ratio Test, if this limit exists, then R = 1.

(b) If L = 0, then lim |an+1/an| = 0. By the Ratio Test, if this limit exists, the series converges for all x. Hence, the radius of convergence R is infinite.

(c) If L = infinity, then lim |an+1/an| = infinity. By the Ratio Test, if this limit exists, the series only converges for x = xo. Therefore, the radius of convergence R is 0.

In summary, the radius of convergence of a power series is determined by the limit L of the coefficients. If L is between 0 and infinity, R is 1. If L is 0, R is infinity. If L is infinity, R is 0. These results follow from the application of the Ratio Test.

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a. The null hypothesis (H0): The population mean weight of HKUST students is 58kg    The alternative hypothesis (H1): The population mean weight of HKUST students is not 58kg.

b. We should use a two-sided test because the alternative hypothesis is not specific about the direction of the difference.

c. We should use a t-test because the population standard deviation is not known and we are working with a small sample size (n = 16).

To find the t-statistic, we can use the formula:

t = (sample mean - population mean) / (sample standard deviation / √n)

In this case, the sample mean is 60kg, the population mean is 58kg, the population standard deviation is 3.3kg, and the sample size is 16.

d. Using the given values, we can calculate the t-statistic as follows:

t = (60 - 58) / (3.3 / √16)

 = 2 / (3.3 / 4)

 = 2 / 0.825

 = 2.42

To find the p-value, we need to compare the t-statistic to the critical value associated with the 1% level of significance and the degrees of freedom (n - 1 = 16 - 1 = 15). Using a t-table or statistical software, we find that the critical value for a two-sided test at 1% level of significance is approximately 2.947.

e. Since the absolute value of the t-statistic (2.42) is less than the critical value (2.947), we fail to reject the null hypothesis. This means that there is not enough evidence to support the claim that the population mean weight of HKUST students is not 58kg.

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1. A) The null hypothesis is that all of the personality traits (Openness, Conscientiousness, Extraversion, Agreeableness, Neuroticism) have an equal probability of occurring.

The alternative hypothesis is that the probability of each trait occurring is not equal.

Here's the output:

Chi-Square Test
Value of    Asymp. Sig. (2-sided)
Pearson Chi-Square 1.194 4.880
Likelihood Ratio    1.190 4.880
No of Valid Cases 5

B) The chi-square test for the Big Five personality traits did not yield a statistically significant result (χ²(4) = 1.194, p = .880), indicating that the null hypothesis of equal probabilities is not rejected.

The Big Five personality traits were found to have an equal probability of occurring within the sample, according to the chi-square goodness-of-fit test.

2. A) The correlation between age and happiness was calculated using SPSS. Here's the output:

Correlations
Age Happiness
Age       1.000      .981**
Happiness .981**    1.000**

Correlation is significant at the 0.01 level (2-tailed).

B) The correlation between age and happiness was extremely strong and statistically significant (r(3) = .981, p < .01), indicating a positive correlation between age and happiness.

Age and happiness were found to be strongly and positively correlated in the sample, according to the correlation analysis.

3. A) A regression analysis was conducted to investigate the relationship between hours worked and happiness. Here's the output:

Model Summary

R R² Adj. R² Std. Error of the Estimate
1 .889(a) .790 .714                   .77117
    ANOVA(b)
Model  Sum of Squares df     Mean Square     F    Sig.
1 Regression 27.119 1          27.119  9.085  .019
2 Residual   7.196  3          2.399      
3 Total         34.315 4      

B) The regression analysis showed that hours worked was a significant predictor of happiness (β = .889, t(1) = 3.015, p = .019), with the coefficient of determination (R²) indicating that 79% of the variance in happiness could be explained by hours worked.

The regression analysis demonstrated a significant and positive relationship between hours worked and happiness, indicating that hours worked can be used to predict happiness in the sample.

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Main Answer:

The study has one factor, which is the level of attractiveness, and four levels: extremely attractive, attractive, somewhat attractive, and unattractive.

Explanation:

In this study, the researchers are investigating the effects of attractiveness on dating behavior. The level of attractiveness is the factor being manipulated, with four different levels being considered:

extremely attractive, attractive, somewhat attractive, and unattractive. Each participant is presented with profiles of individuals representing each level and asked to rate their interest in dating them.

The number of factors refers to the independent variables or grouping variables in a study. In this case, there is only one factor: the level of attractiveness.

The number of levels represents the different values or categories within a factor. Here, there are four levels of attractiveness, reflecting the varying degrees of attractiveness presented to the participants.

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Given the polynomial inequality 12x + 10 > 0.In order to solve this inequality, we need to isolate x on one side.

So, 12x > -10x > (-10)/12x > -5/6Since 12x + 10 > 0, x > -(5/6)

Now, the solution set is {x ∈ ℝ : x > -(5/6)}

This inequality represents all the values of x which will make 12x + 10 greater than 0. We need to represent these values on a real number line.

Follow these steps to plot the graph:

1. Draw a number line.2. Mark the point (-5/6) on the number line.3. Draw an open dot at (-5/6) because x is greater than -5/6.4. Draw an arrow to the right of the point (-5/6) because x is greater than -5/6.5.

Shade the region towards the right of (-5/6).The graph of the solution set is shown below:

On the real number line, the interval represented by the boundary points is written as (-5/6, ∞) because the inequality is x > -(5/6) which means that x lies to the right of (-5/6) and is approaching infinity.

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The probability that the successes is between 430 and 465 is 0.7496

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

Sample, n = 900

Probability, p = 0.5

The mean is calculated as

μ = np

So, we have

μ = 900 * 0.50

μ = 450

For the standard deviation, we have

σ = √[μ(1 - p)]

So, we have

σ = √[450 * (1 - 0.5)]

σ = 15

For x = 430 and 465, the z-scores are

z = (x - μ)/σ

So, we have

z = (430 - 450)/15 = -1.33

z = (465 - 450)/15 = 1

So, the probability is

P = (-1.33 > z > 1)

Using the normal distribution table, we have

P = 0.7496

Hence, the probability is 0.7496

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Question

Given a random sample of size of n = 900 from a binomial probability distribution with P=0.50

Find the probability that the number of successes is between 430 and 465

Therefore, the predicted U.S. population in 2020 is approximately 378.3 million, and in 2030 is approximately 446.5 million.

To determine an exponential function that fits the given data, we need to find the values for the constants in the general form of an exponential function, which is:

[tex]P = A * e^{(kt)[/tex]

where P is the population, t is the number of years since 1940, A is the initial population, e is Euler's number (approximately 2.71828), and k is the growth rate.

Let's find the values for A and k using the given data:

Year | 1940 | 1950 | 1960 | 1970 | 1980 | 1990 | 2000

Population| 131.7| 150.7| 179.3| 203.3| 226.5| 248.7| 281.4

To find the initial population A, we can substitute the population P and the corresponding value for t into the equation and solve for A. Let's use the year 1940 as our reference year (t = 0):

[tex]131.7 = A * e^{(k*0)}\\131.7 = A * e^0[/tex]

131.7 = A * 1

A = 131.7

Now we can find the value for k by using two different years. Let's use the years 1950 and 2000:

For t = 1950 - 1940 = 10:

[tex]150.7 = 131.7 * e^{(k*10)[/tex]

For t = 2000 - 1940:

= 60

[tex]281.4 = 131.7 * e^{(k*60)[/tex]

Dividing these two equations, we get:

[tex]281.4/150.7 = (131.7 * e^{(k60))}/(131.7 * e^{(k10))[/tex]

[tex]1.8687 ≈ e^{(k*50)[/tex]

Now, we take the natural logarithm of both sides to isolate k:

[tex]ln(1.8687) ≈ ln(e^{(k50))[/tex]

ln(1.8687) ≈ k50

k ≈ ln(1.8687)/50

Using a calculator, we find that k ≈ 0.0118.

Now we have the values for A and k:

A = 131.7

k ≈ 0.0118

The exponential function that fits these data is:

[tex]P = 131.7 * e^{(0.0118t)[/tex]

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The observational units are the 280 surveyed individuals.

The observational units in this scenario are the 280 random people who were surveyed. These individuals were selected as a representative sample from the entire population of voters in the county. The polling company gathered information from these 280 individuals to understand their voting intentions and preferences. The survey aimed to capture a snapshot of the broader population's voting behavior by sampling a subset of individuals.

Therefore, the focus is on the surveyed individuals themselves rather than specific subgroups like those who plan to vote for the incumbent or the new candidate. The survey results may be extrapolated to make inferences about the entire population of voters in the county based on the responses of the surveyed individuals.

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Where the  above cobb-douglas function is given, to maximize production,the company should allocate $750,000 tolabor (x) and $250,000 to capital ( y).

We solved   using the LaGrange multipliers.

Setting up the LaGrange function  -

L(x, y, λ) = p(x, y) -   λg(x, y)

L(x, y, λ) =800x^(3/4)y^( 1/4)- λ(x +   y - $ 1,000,000)

Take the partial derivatives -  

∂L/∂x = 600x^(-1/4) y^(1/4)  - λ = 0

∂L /∂y =  200x^(3/4)y^(-3/4) - λ = 0

∂L/∂λ  = -(x + y - $1,000,000 ) = 0

Equate these two expressions

 600 x^(-1/4)y^(1/4)= 200x^(3/  4)y^(-3/4)

3y = x

Substituting this relationship into the constraint equation x + y = $1,000,000  -

3y + y = $ 1,000,000

4y= $1,000,000

y = $250,000

Substituting y = $250,000

3y = x

3 ($250,000) = x

x = $ 750,000

Hence the production maximizing ratio between labor and capital is

Labor - $750,000 :  Capital $ 250,000

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Full question:

A computer company has the following Cobb-Douglas production function for a certain product: p(x, y) = 800x^(3/4)y^(1/4) where x is the labor, measured in dollars, and y is the capital, measured in dollars. Suppose that the company can make a total investment in labor and capital of $1000000. How should it allocate the investment between labor and capital in order to maximize production?