computing the average number of dollars college students have on their credit card balances examplifies a. summarizing data. b. generalizing data. c. comparing data. d. relating data.

Using the sum or difference formula, the exact values of sine, cosine, and tangent of the angle 105° (which can be expressed as the sum of 60° and 45°) can be calculated as follows: sine(105°) = (√6 + √2)/4, cosine(105°) = (√6 - √2)/4, and tangent(105°) = (√6 + √2)/(√6 - √2).



To find the exact values of sine, cosine, and tangent of 105°, we can utilize the sum or difference formulas for trigonometric functions. By recognizing that 105° can be expressed as the sum of 60° and 45°, we can apply these formulas to determine the exact values.For sine, we use the sum formula: sin(A + B) = sin(A)cos(B) + cos(A)sin(B). Plugging in the values of sin(60°), cos(45°), cos(60°), and sin(45°), we can calculate sin(105°) as (√6 + √2)/4.

Similarly, for cosine, we apply the sum formula: cos(A + B) = cos(A)cos(B) - sin(A)sin(B). Substituting the values of cos(60°), cos(45°), sin(60°), and sin(45°), we can calculate cos(105°) as (√6 - √2)/4.Lastly, for tangent, we use the tangent sum formula: tan(A + B) = (tan(A) + tan(B))/(1 - tan(A)tan(B)). Substituting the values of tan(60°), tan(45°), and simplifying the expression, we can determine tan(105°) as (√6 + √2)/(√6 - √2).

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The given series Σαν 6 57 4+24 can be analyzed using the limit comparison test. Let's compare it to the series Σ1/n, where n represents the term number.

By applying the limit comparison test, we take the limit of the ratio of the terms of both series as n approaches infinity:

lim (n→∞) (αₙ / (1/n))

Simplifying this expression, we get:

lim (n→∞) (n * αₙ)

If this limit is positive and finite, both series converge or diverge together. If the limit is zero or infinite, they diverge differently.

To determine whether the series Σαν 6 57 4+24 converges or diverges, we need to compute the limit (n * αₙ) and analyze its behavior.

Please provide the values or expression for αₙ and 6 57 4+24 so that I can proceed with the calculations.

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The number of ways to choose three solo performers from eight dancers, where order matters, is given by the formula P(8, 3) = 8! / (8 - 3)!.

To find the number of ways to choose three solo performers from eight dancers, where order matters, we can use the formula for permutations.

P(8, 3) represents the number of permutations of three dancers chosen from a group of eight.

Using the formula, we calculate:

P(8, 3) = 8! / (8 - 3)!

       = 8! / 5!

Simplifying further:

8! = 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1

5! = 5 * 4 * 3 * 2 * 1

Canceling out the common terms:

P(8, 3) = (8 * 7 * 6 * 5 * 4 * 3 * 2 * 1) / (5 * 4 * 3 * 2 * 1)

The terms (5 * 4 * 3 * 2 * 1) in the numerator and denominator cancel out:

P(8, 3) = 8 * 7 * 6 = 336

Therefore, there are 336 different ways to choose three solo performers from eight dancers, where the order of selection matters.

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The statement "Initial value problems have all of their conditions specified at the initial point" is true.

An initial value problem (IVP) is a type of differential equation problem where the conditions are specified at a single point, usually the initial point. The conditions typically include the value of the unknown function and its derivatives at that point. In an IVP, we are given the initial conditions, and our goal is to find the solution that satisfies these conditions throughout a given interval.

The statement is true because in an initial value problem, all the conditions are indeed specified at the initial point. These conditions include the value of the unknown function, as well as the values of its derivatives, at the initial point. These initial conditions serve as the starting point for finding the solution to the differential equation. Unlike IVPs, BVPs do not have all of their conditions specified at a single point but rather at different points or boundaries.

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Evaluate whether the following statements about initial value problem (IVP) and boundary value problem (BVP) are true or false (i) Initial value problems have all of their conditions specified at the same value of the independent variable in the equation, where that value is at the lower value of the boundary of the domain (ii) BVP avoid the need to specify conditions at the extremes of the independent variable

The polynomial that satisfies the given conditions is P(x) = [tex]4x^3 + 4x^2 - 8x[/tex].

We can take advantage of the fact that the polynomial is a product of linear factors corresponding to its zeros to obtain a polynomial of degree 3 with real coefficients and zeros at -2, 1, and 0. As a result, the factors are (x + 2), (x - 1), and x.

These components added together give us P(x) = (x + 2)(x - 1)(x).

The result of enlarging and simplifying is P(x) = (x2 + x - 2)(x) = x3 + x2 - 2x.

We enter x = 2 into the polynomial and check to see if it equals 32 in order to satisfy the constraint P(2) = 32.

P(2) = [tex]2^3 + 2^2 - 2(2)[/tex]= 8 + 4 - 4 = 8 + 0 = 8.

Option C because P(2) is not equal to 32.

P(x) = [tex]4x^3 + 4x^2 - 8x[/tex], or option C, is the right polynomial because it fits the requirements.

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The length ST of the triangle STU is 12.2 units.

Similar triangles are the triangles that have corresponding sides in

proportion to each other and corresponding angles equal to each other.

Therefore, using the similarity ratios, the side ST of the triangle STU can be found as follows:

Therefore,

PQ / ST = QR / TU

Hence,

61 / ST = 50 / 10

cross multiply

610 = 50 ST

divide both sides by 50

ST = 610 / 50

ST = 610 / 50

ST = 12.2 units

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The surface area of the resulting solid of revolution is 648.77.

The curve y - 1 - 3x², 0 ≤ x ≤ 1, is revolved about the y-axis.

Surface area of revolution is given by- A = 2π ∫a^b y √[1 + (dy/dx)²] dx, where y is the curve and (dy/dx) is the derivative of y with respect to x and a and b are the limits of integration.

Given the curve is y - 1 - 3x², 0 ≤ x ≤ 1. And it is revolved around the y-axis

So, the radius (r) will be x and the height (h) will be y - 1 - 3x². Now, we can use the formula for surface area of revolution:

A = 2π ∫a^b y √[1 + (dy/dx)²] dx

The derivative of y with respect to x is: d/dx [y - 1 - 3x²] = -6x

On substituting the values in the formula, we get: A = 2π ∫0^1 (y - 1 - 3x²) √[1 + (-6x)²] dx

Now, integrating using the limits 0 and 1, we get: A = 2π [ ∫0^1 (y - 1 - 3x²) √[1 + (-6x)²] dx]⇒ A = 2π [ ∫0^1 (y√[1 + 36x²] - √[1 + 36x²] - 3x²√[1 + 36x²]) dx]Putting the value of y as y = 1 + 3x², we get,

A = 2π [ ∫0^1 ((1 + 3x²)√[1 + 36x²] - √[1 + 36x²] - 3x²√[1 + 36x²]) dx]

⇒ A = 2π [ ∫0^1 ((1 - √[1 + 36x²]) + 3x²(√[1 + 36x²] - 1)) dx]

Let u = 1 + 36x², then du/dx = 72x dx ∴ dx = du/72x

Substituting for dx and u in the integral, we get:

⇒ A = 2π [1/72 ∫37^73 u^½ - u^-½ - 1/12 (u^(½) - 1) du]

⇒ A = 2π [1/72 ((2/3 u^(3/2) - 2u^(1/2)) - 2ln|u| - 1/12 (2/3 (u^(3/2) - 1) - u))][limits from 37 to 73]

⇒ A = 2π [1/72 ((2/3 (73)^(3/2) - 2(73^(1/2))) - 2ln|73| - 1/12 (2/3 ((73)^(3/2) - 1) - 73)) - (1/72 ((2/3 (37)^(3/2) - 2(37)^(1/2))) - 2ln|37| - 1/12 (2/3 ((37)^(3/2) - 1) - 37))]

⇒ A = 2π [103.39]⇒ A = 648.77

Thus, the surface area of the resulting solid of revolution is 648.77.

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(a) The area of parallelogram ABCD as a function of c is |AB × AD| = √(17 + 3c²).

(b) For c = -2, the parametric equations of the line passing through D and perpendicular to parallelogram ABCD are x = -1 - t, y = -4 + t, z = 3 + 3t.

(a) To find the area of parallelogram ABCD:

1. Calculate the vectors AB and AD using the given coordinates of points A, B, and D.

  AB = B - A = (0-1, 2-1, 3-2) = (-1, 1, 1)

  AD = D - A = (-1-(1), c+3.4-1, 3-2) = (-2, c+2.4, 1)

2. Find the cross product of AB and AD:

  AB × AD = (-1, 1, 1) × (-2, c+2.4, 1) = (-1 - (c+2.4), -2 - (c+2.4), (-2)(c+2.4) - (-1)(-2)) = (-c-3.4, -c-4.4, -2c-4.8 + 2) = (-c-3.4, -c-4.4, -2c-2.8)

3. Calculate the magnitude of the cross product to find the area of the parallelogram:

  |AB × AD| = √((-c-3.4)² + (-c-4.4)² + (-2c-2.8)²) = √(17 + 3c²).

(b) For c = -2, substitute the value into the parametric equations:

  x = -1 - t

  y = -4 + t

  z = 3 + 3t

  These equations describe a line passing through point D and perpendicular to parallelogram ABCD, where t is a parameter.

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The first term of the arithmetic sequence is 4.In an arithmetic sequence with a common difference of 3, if the sum of the first 20 terms is 650, we need to find the first term of the sequence.

Let's denote the first term of the arithmetic sequence as 'a' and the common difference as 'd'. The formula to find the sum of the first n terms of an arithmetic sequence is given by:

[tex]\text{Sum} = \frac{n}{2} \cdot (2a + (n-1)d)[/tex]

We are given that the common difference is 3 and the sum of the first 20 terms is 650. Plugging these values into the formula, we have:

[tex]650 = \frac{20}{2} \cdot (2a + (20-1) \cdot 3)[/tex]

Simplifying the equation:

650 = 10 * (2a + 19*3)

65 = 2a + 57

2a = 65 - 57

2a = 8

a = 8/2

a = 4

Therefore, the first term of the arithmetic sequence is 4.

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The equation of the ellipse can be reduced to normal form as x^2/4 + (y-1)^2/4 = 1. The coordinates of the vertices are (±2, 1), and the foci are located at (±√3, 1).

To reduce the equation of the ellipse to normal form, we need to isolate the terms containing x and y, and rearrange them accordingly. Starting with the given equation:

212x^2 - 42x + 4y + 4 = 4

We can divide the entire equation by 4 to simplify it:

53x^2 - 10.5x + y + 1 = 1

Next, we can complete the square for both x and y terms separately. For the x terms, we need to factor out the coefficient of x^2:

53(x^2 - (10.5/53)x) + y + 1 = 1

To complete the square for x, we need to take half of the coefficient of x, square it, and add it inside the parentheses:

53(x^2 - (10.5/53)x + (10.5/106)^2) + y + 1 = 1

Simplifying further:

53(x^2 - (10.5/53)x + (10.5/106)^2) + y = 0

Now, we can write the x terms as a squared expression:

53[(x - 10.5/106)^2] + y = 0

To isolate y, we move the x terms to the other side:

53(x - 10.5/106)^2 = -y

Finally, we can rewrite the equation in normal form by dividing both sides by -y:

(x - 10.5/106)^2 / (-y/53) = 1

Simplifying the equation:

(x - 10.5/106)^2 / (y/(-53)) = 1

We can further simplify the equation by multiplying both sides by -53:

(x - 10.5/106)^2 / (y/53) = -53

Therefore, the equation of the ellipse in normal form is x^2/4 + (y-1)^2/4 = 1. From this equation, we can determine that the semi-major axis is 2, the semi-minor axis is 2, and the center of the ellipse is located at (0, 1). The coordinates of the vertices can be found by adding/subtracting the semi-major axis from the x-coordinate of the center, giving us (±2, 1). The foci can be determined by using the formula c = √(a^2 - b^2), where a is the semi-major axis (2) and b is the semi-minor axis (2). Therefore, the foci are located at (±√3, 1).

For the hyperbola, the equation provided seems to be incomplete or contain a typo, as it is unclear what is meant by "r?".

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The area under the curve y = 2x³ + 1, bordered by the x-axis and x = 0, x = 3, is equal to 43.5 square units.

The area under the curve y = 2x³ + 1, bounded by the x-axis, x = 0, and x = 3, can be found by evaluating the definite integral ∫[0, 3] (2x³ + 1) dx.

Integrating the given function, we get:

∫[0, 3] (2x³ + 1) dx = [∫(2x³) dx] + [∫(1) dx] = (1/2)x⁴ + x |[0, 3]

Evaluating the definite integral within the given bounds:

[(1/2)(3⁴) + 3] - [(1/2)(0⁴) + 0] = (1/2)(81) + 3 = 40.5 + 3 = 43.5

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The Cobb-Douglas production function is: P(L, K) = 17LºA K^0.6 where L is labour, K is capital, A is the technology, and P is the level of output. In this question, we are required to find the marginal productivity of labour and capital. To do this, we take the partial derivative of the production function with respect to L and K.

The marginal productivity of labour is defined as the change in output as a result of a unit change in labour holding other variables constant. It is expressed as MPL = ∂P/∂L. The marginal productivity of capital is defined as the change in output as a result of a unit change in capital holding other variables constant. It is expressed as MPK = ∂P/∂K.

The partial derivative of the production function with respect to L is MPL = ∂P/∂L= 17L^0A*0*K^0.6= 17A*0L^0K^0.6= 0*K^0.6= 0.

The partial derivative of the production function with respect to K is MPK = ∂P/∂K= 17L^0A*0.6K^0.6-1= 10.2L^0AK^-0.4.

Therefore, the marginal productivity of the labour function is MPL = 0 and the marginal productivity of the capital function is MPK = 10.2L^0AK^-0.4.

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The number of terms required is D. 2.

The answer to the question can be determined by considering the Taylor series expansion of the function sin(x).

The Taylor series expansion for sin(x) is given by:

sin(x) = x - (x^3/3!) + (x^5/5!) - (x^7/7!) + ...

The error of the approximation can be estimated using the remainder term in the Taylor series expansion, which is given by:

R_n(x) = f^(n+1)(c) * (x-a)^(n+1) / (n+1)!

where f^(n+1)(c) is the (n+1)-th derivative of f(x) evaluated at some point c between a and x.

To approximate sin(x) with an error less than 0.0001, we need to find the smallest value of n such that the remainder term is less than 0.0001 for all x within the desired range.

In this case, since the Taylor series for sin(x) is an alternating series and the terms decrease in magnitude, we can use the Alternating Series Estimation Theorem to find the number of terms required. According to the theorem, the error of the approximation is less than the absolute value of the first neglected term.

In the given Taylor series for sin(x), we can see that the first neglected term is (x^7/7!). Therefore, we need to find the value of n such that (x^7/7!) is less than 0.0001 for all x within the desired range.

Simplifying the inequality:

(x^7/7!) < 0.0001

x^7 < 0.0001 * 7!

x^7 < 0.0001 * 5040

x^7 < 0.504

Taking the seventh root of both sides:

x < 0.504^(1/7)

x < 0.667

Therefore, to approximate sin(x) with an error less than 0.0001, we need to choose n such that the approximation is valid for x values less than 0.667. Since the question asks for the number of terms required, the answer is D. 2, as we only need the terms up to the second degree (x - (x^3/3!)) to satisfy the given error condition for x values less than 0.667.

It's important to note that the Taylor series expansion for sin(x) is an infinite series, but we can truncate it to a finite number of terms based on the desired level of accuracy.

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The answer are:

What is domain of a function?

The domain of a function refers to the set of all possible input values (or independent variables) for which the function is defined. It represents the valid inputs that can be used to evaluate the function and obtain meaningful output values.

The given functions are:

a.6 * (x) = x

b.(x) = x

c.x

1.To find the value of (+)(0), we need to substitute 0 into the function (+):

(+)(0) = 6 * ((0) + (0))

= 6 * (0 + 0)

= 6 * 0

= 0

Therefore, (+)(0) = 0.

2.To find the domain of (+0)(x), we need to determine the values of x for which the function is defined. Since the function (+0) is a composition of functions, we need to consider the domains of both functions involved.

The first function, 6 * ((x) = x, is defined for all real numbers.

The second function, (x) = x, is also defined for all real numbers.

Therefore, the domain of (+0)(x) is the set of all real numbers, expressed in interval notation as (-∞, ∞).

3.To find (1-7)(0), we need to substitute 0 into the function (1-7):

(1-7)(0) = 1 - 7 * (0)

= 1 - 7 * 0

= 1 - 0

= 1

Therefore, (1-7)(0) = 1.

Regarding the function (-9), if there is no variable involved, it means the function is a constant function. In this case, the constant value is -9. Since there is no variable, the domain is irrelevant. The function is defined for all real numbers.

Therefore, the domain of (-9) is (-∞, ∞) (all real numbers), expressed in interval notation.

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The present value of the investment, considering continuous compounding at an annual interest rate of 0.9% for 9 years, is approximately $91,244.10.

To calculate the present value, we can use the continuous compound interest formula:

[tex]P = A / e^{rt}[/tex],

where P is the present value, A is the future value or income generated ($12,000 per year), e is the base of the natural logarithm (approximately 2.71828), r is the annual interest rate (0.9% or 0.009), and t is the time period (9 years).

Plugging the values into the formula, we have:

[tex]P = 12,000 / e^{0.009 * 9}\\P = 12,000 / e^{0.081}\\P = 12,000 / 1.0843477\\P = 11,063.90[/tex]

Therefore, the present value of the investment is approximately $11,063.90.

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To determine the convergence of the series ∑(n=1 to infinity) sin(n)/(2n), we will analyze its convergence using the Comparison Test.

In the given series, we have sin(n)/(2n). To apply the Comparison Test, we need to find a series with non-negative terms that can help us determine the convergence behavior of the given series.

For n ≥ 1, we know that sin(n) lies between -1 and 1, while 2n is always positive. Therefore, we have 0 ≤ |sin(n)/(2n)| ≤ 1/(2n) for all n ≥ 1.

Now, let's consider the series ∑(n=1 to infinity) 1/(2n). This series is a harmonic series, and we know that it diverges. Since the terms of the given series, |sin(n)/(2n)|, are bounded by 1/(2n), we can conclude that the given series also diverges by comparison with the harmonic series.

Hence, the series ∑(n=1 to infinity) sin(n)/(2n) is divergent.

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Based on the given information, we have the function f(x) = x + 3, ε = 0.2, x₁ = 2, and L = 5. We need to find a positive value δ such that for all x satisfying 0 < |x - x₁| < 6, we have |f(x) - L| < ε.

Let's consider the distance between f(x) and L:

|f(x) - L| = |(x + 3) - 5| = |x - 2|

To ensure that |f(x) - L| < ε, we need to choose a value of δ such that |x - 2| < ε.

Substituting ε = 0.2 into the inequality, we have:

|x - 2| < 0.2

To find the maximum value of δ that satisfies this inequality, we choose δ = 0.2.

Therefore, for all x satisfying 0 < |x - 2| < 0.2, we can guarantee that |f(x) - L| < ε = 0.2.

In summary, the value of δ that satisfies the given conditions is δ = 0.2.

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To graph the function f(x) = -2 cos (π/3 x - 2π/3), we need to understand its properties and behavior.

First, let's consider the amplitude of the cosine function, which is 2 in this case. This means that the graph will oscillate between -2 and 2 along the y-axis. Next, let's determine the period of the function. The period of a cosine function is given by 2π divided by the coefficient of x inside the cosine function. In this case, the coefficient is π/3. So the period is: Period = 2π / (π/3) = 6. This means that the graph will complete one full oscillation every 6 units along the x-axis.

Now, let's plot the graph on a coordinate plane: Start by labeling the x-axis with appropriate units based on the period. For example, if we choose each unit to represent 1, then we can label the x-axis from -6 to 6. Label the y-axis to represent the amplitude of the function, from -2 to 2. Plot some key points on the graph, such as the x-intercepts, by setting the function equal to zero and solving for x. In this case, we have:

-2 cos (π/3 x - 2π/3) = 0 . cos (π/3 x - 2π/3) = 0. To find the x-intercepts, we solve for (π/3 x - 2π/3) = (2n + 1)π/2, where n is an integer. From this equation, we can determine the x-values at which the cosine function crosses the x-axis.

Finally, sketch the graph by connecting the key points and following the shape of the cosine function, which oscillates between -2 and 2.

Note: Without specific values for the x-axis units, it is not possible to accurately label the x-axis with specific values. However, the general shape and behavior of the graph can still be depicted.

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The indefinite integral, represented as an infinite series centered at x=9, can be found by expanding the integrand into a Taylor series and integrating each term. The first five non-zero terms of the series are determined based on the coefficients of the Taylor expansion.

To evaluate the indefinite integral as an infinite series centered at x=9, we start by expanding the integrand into a Taylor series. The coefficients of the Taylor expansion can be determined by taking derivatives of the function at x=9. Once we have the Taylor series representation, we integrate each term of the series to obtain the series representation of the indefinite integral.

To find the first five non-zero terms of the series, we calculate the coefficients for these terms using the Taylor expansion. These coefficients determine the contribution of each term to the overall series. The terms with non-zero coefficients are included in the series representation, while terms with zero coefficients are omitted.

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Complete question:

Evaluate the indefinite integral as an infinite series

[tex]\int \frac{\sin x}{4x} dx[/tex]

Find the first five non-zero terms of series representation centered at x=9

The partial derivatives for f(x, y, z) = xyʻz + 4xy with respect to x, y, and z are fx = yz, fy = xz + 4x, and fz = xy. The second-order partial derivatives of f(x, y) = x + y - y + ln(x) are fx = 0, fxy = 1, fyx = 1, fyy = -1, and fyx = 0.

To find partial derivatives, we take the derivative of the function with respect to each variable while keeping the other variables constant.

To find the partial derivatives of f(x, y, z) = xyʻz + 4xy:

fx = ∂f/∂x = yz

fy = ∂f/∂y = xz + 4x

fz = ∂f/∂z = xy

For f(x, y) = x + y - y + ln(x), the partial derivative with respect to x is f = 1 + 1/x, and the partial derivative with respect to y is f_y = 1.

To find the second-order partial derivatives of f(x, y) = x + y - y + ln(x):

fx = ∂²f/∂x² = 0

fxy = ∂²f/∂x∂y = 1

fyx = ∂²f/∂y∂x = 1

fyy = ∂²f/∂y² = -1

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To calculate the probability that the average lifetime of 500 randomly selected electronic components falls between 5990 hours and 6010 hours, assumptions such as the normality of the distribution, independence of lifetimes, and random sampling need to be met before applying statistical theory and computations.

Before computing the probability, we need to make some assumptions and use statistical theory. Here are the questions that need to be answered:

Is the distribution of the lifetime of the electronic component approximately normal?

Are the lifetimes of the 500 components independent of each other?

Are the components in the sample randomly selected from the population?

If the assumptions are met, we can proceed to compute the probability using the properties of the normal distribution and the Central Limit Theorem.

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There are number of 42 different types of shirts are available from this company.

We have to given that,

A shirt company had 3 designs each of which can be made with short or long sleeves.

And, There are 7 patterns available.

Hence, Total number of different types of shirts are available from this company are,

⇒ 3 × 2 × 7

⇒ 42

Thus, There are 42 different types of shirts are available from this company.

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To determine whether the polynomial 1 + 2x is a linear combination of the given polynomials P1 = 2x + 2 + 1, P2 = x - 1, and P3 = 1 + 3x, we need to check if there exist coefficients a, b, and c such that aP1 + bP2 + cP3 = 1 + 2x.

By setting up the equation a(2x + 2 + 1) + b(x - 1) + c(1 + 3x) = 1 + 2x, we can simplify it to (2a + b + 3c)x + (2a - b + c) = 1 + 2x.

Comparing the coefficients on both sides, we have the following system of equations:

2a + b + 3c = 2

2a - b + c = 1

Solving this system of equations, we can determine the values of a, b, and c. If a solution exists, then the polynomial 1 + 2x is a linear combination of P1, P2, and P3.

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The inverse Laplace transform of the given function is -i ln [s - Ci / s + Ci]

(b) B(s) = (s - 3)20The inverse Laplace transform of the given function is obtained by applying partial fraction decomposition method, which is given as;Now, taking inverse Laplace transform of both the fractions in the given function as shown below;L⁻¹[2 / s - 3] = 2L⁻¹[1 / (s - 3)2] = t etL⁻¹ [B(s)] = 2e3t(b) C(s) = cot⁻¹CSolution:Laplace transform of C(s) is given as;C(s) = cot⁻¹CNow, taking inverse Laplace transform of the given function, we get;L⁻¹[cot⁻¹C] = -i ln [s - Ci / s + Ci]T

The product MN of the given matrices represents the total labor cost for administering the final exams in College Algebra and Business Math at CSUN and CSU Fullerton.

The (1, 2)-entry of the matrix MN gives the labor cost associated with the staff for administering the exams.

To compute the product MN, we multiply the matrices M and N by performing matrix multiplication. Each entry of the resulting matrix MN is obtained by taking the dot product of the corresponding row of M and the corresponding column of N.

The resulting matrix MN is:

MN = [54.5 0.5 2]

      [21 7 2.5]

      [16 18 9]

      [40 16 18]

      [9 11]

The (1, 2)-entry of the matrix MN is 0.5. This means that the labor cost associated with the staff for administering the exams at CSUN and CSU Fullerton is $0.5 per hour.

In the context of administering the exams, the (1, 2)-entry represents the labor cost per hour for the staff members who are involved in composing, photocopying, and proctoring the exams. It indicates the cost incurred for each hour of work performed by the staff members in administering the exams.

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a. The vector from (2, -7, 0) to (1, -3, -5)  is (-1, 4, -5).

b.  The vector from (1, -3, -5) to (2, -7, 0) is (1, -4, 5).

c. The position vector for (-90, 4) is (-90, 4).

(a) The vector from (2, -7, 0) to (1, -3, -5):

To find the vector between two points, we subtract the coordinates of the initial point from the coordinates of the final point. Therefore, the vector can be calculated as follows:

(1 - 2, -3 - (-7), -5 - 0) = (-1, 4, -5)

So, the vector from (2, -7, 0) to (1, -3, -5) is (-1, 4, -5).

(b) The vector from (1, -3, -5) to (2, -7, 0):

Similarly, we subtract the coordinates of the initial point from the coordinates of the final point to find the vector:

(2 - 1, -7 - (-3), 0 - (-5)) = (1, -4, 5)

Therefore, the vector from (1, -3, -5) to (2, -7, 0) is (1, -4, 5).

(c) The position vector for (-90, 4):

The position vector describes the vector from the origin (0, 0, 0) to a specific point. In this case, the position vector for (-90, 4) can be found as follows:

(-90, 4) - (0, 0) = (-90, 4)

Thus, the position vector for (-90, 4) is (-90, 4). This vector represents the displacement from the origin to the point (-90, 4) and can be used to describe the location or direction from the origin to that specific point in space.

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The conditions of the alternating series test are satisfied, and the given series σ(-1)⁽⁸ⁿ⁾ln(n)/n² converges.

for the first series σ(-1)⁽⁸ⁿ⁾ln(n)/n², we can determine its convergence or divergence by applying the alternating series test and considering the convergence of the underlying series.

the alternating series test states that if the terms of an alternating series satisfy two conditions: 1) the absolute value of the terms decreases monotonically, and 2) the limit of the absolute value of the terms approaches zero, then the series converges.

let's check these conditions for the given series:

1) absolute value: |(-1)⁽⁸ⁿ⁾ln(n)/n²| = ln(n)/n²

2) monotonic decrease: to show that the absolute value of the terms decreases monotonically, we can take the derivative of ln(n)/n² with respect to n and show that it is negative for all n > 1. this can be verified by applying calculus techniques.

next, we need to verify if the limit of ln(n)/n² approaches zero as n approaches infinity. since the numerator ln(n) grows logarithmically and the denominator n² grows polynomially, the limit of ln(n)/n² as n approaches infinity is indeed zero. for the second question about the series σcos(x)/n⁽⁶⁷⁾, we can determine its convergence or divergence by considering the convergence of the underlying p-series.

the given series can be written as σcos(x)/n⁽⁶⁷⁾, which resembles a p-series with p = 6/7. the p-series converges if p > 1 and diverges if p ≤ 1.

in this case, p = 6/7 > 1, so the series σcos(x)/n⁽⁶⁷⁾ converges.

for the third question about finding the limit of (49x² + x - 7x)/(x - ?), the expression is incomplete. the limit cannot be determined without knowing the value of "?" since it affects the denominator.

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