True or False a) Assume fis continuous and non-negative on the interval [a, b]. The limits would be equal asno, for both the lower and upper sums. b) To compute the Riemann sum, the partition size must be of equal width c) The left-hand Riemann sum of a continuous function f(x) is always its right-hand Riemann sum. n n(n+1)(n+2) d) ? - ( min + 1}{2n + 21 ) -2)

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Answer 1

They may differ depending on the behavior of the function within each subinterval.

True or False: a) The limit of the lower and upper sums is always equal for a continuous and non-negative function on the interval [a, b]?

The limits of the lower and upper sums may not be equal for a continuous and non-negative function on the interval [a, b].

It depends on the specific function and the partition used.

False. The partition size does not need to be of equal width to compute the Riemann sum.

The partition can have varying widths as long as the width approaches zero as the number of subintervals increases

False. The left-hand Riemann sum and right-hand Riemann sum of a continuous function f(x) are generally not equal.

The expression provided seems incomplete or unclear. Could you please rephrase or provide additional information?

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2x Consider the rational expression 3x² + 10x +3 A B 1. Write out the form of the partial fraction expression, i.e. factor 1 factor 2 2. Clear the resulting equation of fractions, then use the "wipeout" method to find A and B. 3. Now, write out the complete partial fraction decomposition. +

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The partial fraction expression for the given rational expression is:

[tex]\frac{2x}{3x^2 + 10x + 3} = \frac{A}{factor 1} + \frac{B}{factor 2}[/tex]. The resulting equation of fractions A is -6 = -9A - 8B and for B it is -2/3 = 26/9A - 2/3B. The complete partial fraction decomposition is: [tex]\frac{2x}{3x^2 + 10x + 3} = \frac{A}{factor 1} + \frac{B}{factor 2}[/tex].

The partial fraction expression for the given rational expression is:

[tex]\frac{2x}{3x^2 + 10x + 3} = \frac{A}{factor 1} + \frac{B}{factor 2}[/tex].

Here, "factor 1" and "factor 2" represent the irreducible quadratic factors in the denominator, which can be found by factoring the quadratic equation 3x² + 10x + 3

To find the values of A and B, we clear the equation of fractions by multiplying both sides by the common denominator, which is (factor₁)(factor₂) = (3x + 1)(x + 3):

2x = A(x + 3) + B(3x + 1)

Now, we can use the "wipeout" method to find the values of A and B.

For factor₁:

Setting x = -3, we get:

2(-3) = A(-3 + 3) + B(3(-3) + 1)

-6 = -9A - 8B

For factor₂:

Setting x = -1/3, we get:

2(-1/3) = A(-1/3 + 3) + B(3(-1/3) + 1)

-2/3 = 26/9A - 2/3B

Solving the system of equations formed by the two equations above, we can find the values of A and B.

After solving the system of linear equations, we obtain the values of A and B. The complete partial fraction decomposition is:

[tex]\frac{2x}{3x^2 + 10x + 3} = \frac{A}{factor 1} + \frac{B}{factor 2}[/tex].

Substituting the values of A and B that we obtained, we can express the given rational expression as a sum of the partial fractions.

In conclusion, Partial fraction decomposition simplifies complex rational expressions and allows them to be expressed as a sum of simpler fractions.

By using the "wipeout" method, the values of unknowns A and B can be determined, leading to the complete partial fraction decomposition. This technique is useful for the integration of rational functions.

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Complete Question:

Consider the rational expression [tex]\frac{2x}{3x^2 + 10x +3}[/tex]

1. Write out the form of the partial fraction expression, i.e. [tex]\frac{A}{factor 1}[/tex] + [tex]\frac{B}{factor 2}[/tex]

2. Clear the resulting equation of fractions, then use the "wipeout" method to find A and B.

3. Now, write out the complete partial fraction decomposition.

If x2 + y2 = 4, find dx dt = 2 when x = 4 and y = 6, assume x and y are dependent upon t.

Answers

If x = 4, y = 6, and dx/dt = 2, the value of differentiation dy/dt is -4/3.

To find dx/dt when x = 4 and y = 6, we can differentiate both sides of the equation x^2 + y^2 = 4 with respect to t, treating x and y as functions of t.

Differentiating both sides with respect to t:

2x(dx/dt) + 2y(dy/dt) = 0

Since we are given that dx/dt = 2, x = 4, and y = 6, we can substitute these values into the equation and solve for dy/dt:

2(4)(2) + 2(6)(dy/dt) = 0

16 + 12(dy/dt) = 0

12(dy/dt) = -16

dy/dt = -16/12

dy/dt = -4/3

Therefore, when x = 4, y = 6, and dx/dt = 2, the value of dy/dt is -4/3.

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Find a parametric representation for the surface. the part of the sphere x2 + y2 + z2 = 144 that lies between the planes z = 0 and z = 63. (Enter your answer as a comma-separated list of equations. Le

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To find a parametric representation for the surface that lies between the planes z = 0 and z = 63 and satisfies the equation x^2 + y^2 + z^2 = 144, we can use spherical coordinates.

In spherical coordinates, a point on the surface of a sphere is represented by (r, θ, φ), where r is the radius, θ is the polar angle, and φ is the azimuthal angle.

For this particular case, we have the constraint that z lies between 0 and 63, which corresponds to the range of φ between 0 and π.

The equation x^2 + y^2 + z^2 = 144 can be rewritten in spherical coordinates as r^2 = 144.

To find the parametric representation, we can express x, y, and z in terms of r, θ, and φ. The equations are:

x = r sin(θ) cos(φ)

y = r sin(θ) sin(φ)

z = r cos(θ)

By substituting the constraints and equations into the parametric representation, we get:

0 ≤ φ ≤ π

0 ≤ θ ≤ 2π

0 ≤ r ≤ 12

In summary, the parametric representation for the surface of the sphere x^2 + y^2 + z^2 = 144 that lies between the planes z = 0 and z = 63 is given by the equations:

x = r sin(θ) cos(φ)

y = r sin(θ) sin(φ)

z = r cos(θ)

where r ranges from 0 to 12, θ ranges from 0 to 2π, and φ ranges from 0 to π. These equations define the surface and allow us to generate points on it by varying the parameters r, θ, and φ within their specified ranges.

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The population of an aquatic species in a certain body of water is 40,000 approximated by the logistic function G(t) = - 1+10e-0.66t where t is measured in years. Calculate the growth rate after 7 yea

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The growth rate of the aquatic species after 7 years is approximately 4.42 individuals per year.

The given population model is a logistic function represented by G(t) = -1 + 10e^(-0.66t), where t is the number of years. To calculate the growth rate after 7 years, we need to find the derivative of the population function with respect to time (t).

Taking the derivative of G(t) gives us:

dG/dt = -10(0.66)e^(-0.66t)

To calculate the growth rate after 7 years, we substitute t = 7 into the derivative equation:

dG/dt = -10(0.66)e^(-0.66 * 7)

Calculating the value yields:

dG/dt ≈ -10(0.66)e^(-4.62) ≈ -10(0.66)(0.0094) ≈ -0.062

The negative sign indicates a decreasing population growth rate. The absolute value of the growth rate is approximately 0.062 individuals per year. Therefore, after 7 years, the growth rate of the aquatic species is approximately 0.062 individuals per year, or approximately 4.42 individuals per year when rounded to two decimal places.

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given: (x is number of items) demand function: d ( x ) = 3888/√x supply function: s ( x ) = 3√x find the equilibrium quantity:______. find the consumers surplus at the equilibrium quantity: ____

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Calculating the integral, we find the consumer surplus at the equilibrium quantity.  the equilibrium quantity is approximately 432.

Setting the demand and supply functions equal to each other, we have d(x) = s(x), which becomes 3888/√x = 3√x.

To solve for x, we can first square both sides of the equation to eliminate the square roots: (3888/√x)^2 = (3√x)^2.

Simplifying, we get (3888)^2 / x = (3^2)(x).

Cross-multiplying, we have (3888)^2 = 9x^3.

Dividing both sides by 9, we get x^3 = (3888)^2 / 9.

Taking the cube root of both sides, we find x = ∛((3888)^2 / 9).

Calculating the value, we find x ≈ 432.

Therefore, the equilibrium quantity is approximately 432.

To find the consumer surplus at the equilibrium quantity, we need to calculate the area between the demand curve and the price line at that quantity. Consumer surplus represents the difference between the maximum price a consumer is willing to pay (represented by the demand curve) and the actual price (represented by the supply curve) for the given quantity.

Since the demand function is given by d(x) = 3888/√x, we need to calculate the integral of this function from 0 to 432.

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3. Given the 2-D vector field: (a) 6(xy) = (-y) + (2x) Describe and sketch the vector field along both coordinate axes and along the diagonal lines y = tx. 2 (b) Compute the work done by G(x, y) along

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(a) The 2-D vector field is given by G(x, y) = ⟨-y + 2x, 6xy⟩. Along the x-axis, the vector field has a constant y-component of 0 and a varying x-component.

Along the y-axis, the vector field has a constant x-component of 0 and a varying y-component. Along the diagonal lines y = tx, the vector field's components depend on both x and y, resulting in varying vectors along the lines. To sketch the vector field, we can plot representative vectors at different points along the axes and diagonal lines. Along the x-axis, the vectors will point in the positive x-direction. Along the y-axis, the vectors will point in the positive y-direction. Along the diagonal lines, the direction of the vectors will depend on the slope t. (b) To compute the work done by G(x, y) along a given curve, we need the parametric equations for the curve. Without specifying the curve, it is not possible to compute the work done. The work done by a vector field along a curve is calculated by evaluating the line integral of the dot product between the vector field and the tangent vector of the curve.

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what is the area of the opening in a duct that has a diameter of 7 inches? round the answer to the nearer thousandth square inch.

Answers

The opening area for a 7 inch diameter channel is approximately 38.484 square inches.

The area of ​​a circular opening can be found using the circle area formula given by [tex]A = \pi r^2[/tex]. where A is the area and r is the radius of the circle. In this case, the duct diameter is 7 inches. The radius can be calculated by dividing the diameter by 2, so the radius is 7/2 = 3.5 inches.

Substituting the radius into the equation gives A = π(3,5)^2. Evaluating this formula gives A = [tex]\pi[/tex](12.25) ≈ 38.484 square inches. Rounding the result to the nearest thousandth, the area of ​​the channel opening is approximately 38.484 square inches.

Therefore, a 7 inch diameter duct has an orifice area of ​​approximately 38.484 square inches. 


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My 2. (10.08 HC) The function h is defined by the power series h(x) => Mx)= x x x x+1 no2n+1 Part A: Determine the interval of convergence of the power series for h. (10 points) Part B: Find h '(-1) a

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Part A: The interval of convergence for the power series of function h is (-1, 1).

Part B: To find h'(-1), we need to differentiate the power series term by term. Differentiating the given power series h(x) term by term results in h'(x) = 1 - 4x^2 + 9x^4 - 16x^6 + ...  Evaluating this at x = -1, we get[tex]h'(-1) = 1 - 4 + 9 - 16 + ... = -1 + 9 - 25 + 49 - ... = -15.[/tex]

Part A: The interval of convergence for a power series is the range of x values for which the series converges. In this case, the given power series is of the form [tex]Σ(Mn*x^n)[/tex] where n starts from 0. To determine the interval of convergence, we need to find the values of x for which the series converges. Using the ratio test or other convergence tests, it can be shown that the given series converges for |x| < 1, which means the interval of convergence is (-1, 1).

Part B: To find h'(-1), we differentiate the power series term by term. The derivative of xn is nx^(n-1), so differentiating the given power series term by term gives us h'(x) = 1 - 4x^2 + 9x^4 - 16x^6 + ... Evaluating this at x = -1 gives us h'(-1) = 1 - 4 + 9 - 16 + ... which is an alternating series. By evaluating the series, we find that the sum is -1 + 9 - 25 + 49 - ..., which can be written as an infinite geometric series with a common ratio of -4. Using the formula for the sum of an infinite geometric series, we find the sum to be -15. Therefore, h'(-1) = -15.

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1. Evaluate ((2x + y2) dx + 2xy dy), where C' is the line segment from (1,0) to (3, 2) lo () in two different ways: (a) Directly as a line integral (parameterise C). (b) By using the Fundamental Theor

Answers

(a) Directly as a line integral: Evaluate ((2x + y^2) dx + 2xy dy) by parameterizing the line segment from (1,0) to (3,2).

(b) By using the Fundamental Theorem of Line Integrals: Find a potential function F(x, y) such that ∇F = (2x + y^2, 2xy), and evaluate F at the endpoints of the line segment. Subtract the values of F to obtain the line integral.

In order to evaluate the line integral directly, we need to parameterize the line segment from (1,0) to (3,2). We can do this by defining a parameter t that varies from 0 to 1, and expressing the x and y coordinates in terms of t. Let's call the parameterized function as r(t) = (x(t), y(t)).

For this line segment, we can choose x(t) = 1 + 2t and y(t) = 2t. Now, we can calculate the differentials dx and dy as dx = x'(t) dt and dy = y'(t) dt, where x'(t) and y'(t) denote the derivatives of x(t) and y(t) with respect to t.

Substituting these values into the given expression ((2x + y^2) dx + 2xy dy), we get:

[tex]((2(1 + 2t) + (2t)^2) (1 + 2t) dt + 2(1 + 2t)(2t) dt).[/tex]

Now we can integrate this expression with respect to t, from t = 0 to t = 1, to find the value of the line integral.

On the other hand, we can also evaluate the line integral by using the Fundamental Theorem of Line Integrals. According to this theorem, if there exists a potential function F(x, y) such that its gradient ∇F is equal to the given vector field (2x + y^2, 2xy), then the line integral over any curve C that starts at point A and ends at point B is equal to the difference of the potential function evaluated at B and A, i.e., F(B) - F(A).

Therefore, in order to apply this theorem, we need to find a potential function F(x, y) such that ∇F = (2x + y^2, 2xy). By integrating the first component with respect to x and the second component with respect to y, we can determine F. once we have the potential function F, we evaluate it at the endpoints of the line segment (1,0) and (3,2), and subtract the values to obtain the line integral. both methods should yield the same result for the line integral.

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Question 5 < > Compt 3 Details Given L = 3 [(*+( 0 - 1)(a +48 - 1) 4+ ( 72 sin express the limit of L, as no as a definite integral; that is, provide a, b and f(x) in the expression fizdz. a = b = f(x

Answers

we have the definite integral representation of L with the given values of a, b, and f(x): L = ∫[0, 1] (x^4 + (72 sin(x))^2) dz

To express the limit L as a definite integral, we can represent it as follows:

L = ∫[a, b] f(x) dz

Given that a = 0, b = 1, and f(x) = (x^4 + (72 sin(x))^2, we can substitute these values into the expression to obtain the definite integral representation of L:

L = ∫[0, 1] (x^4 + (72 sin(x))^2) dz

Please note that the original question specified "fizdz" as the expression, but it seems to be a typo. The correct expression is "f(x) dz".

Now, we have the definite integral representation of L with the given values of a, b, and f(x):

L = ∫[0, 1] (x^4 + (72 sin(x))^2) dz

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A 6-foot long piece of wire is to be cut into two pieces. One piece is used to make a circle and the other a square. Find the exact amount of wire used for the square so as to make the combined area of the square and the circle a minimum.

Answers

Therefore, the exact amount of wire used for the square is 6/5 feet and for the circle is 24/5 feet in order to minimize the combined area of the square and the circle.

Let's denote the length of the wire used for the square as "s" (in feet) and the length of the wire used for the circle as "c" (in feet).

The total length of the wire is 6 feet, so we can express this as an equation:

s + c = 6

To find the minimum combined area of the square and the circle, we need to express the area in terms of "s" and then minimize it.

Let's start with the square. The perimeter of the square is equal to the length of the wire used for the square:

4s = s

The area of the square is given by:

A_square = s^2

Now, let's consider the circle. The circumference of the circle is equal to the length of the wire used for the circle:

2πr = c

Since the total length of the wire is 6 feet, we can express "c" in terms of "s":

c = 6 - s

The radius of the circle, denoted as "r," is related to its circumference by the formula:

Circumference = 2πr

Substituting the value of "c" and solving for "r," we get:

2πr = 6 - s

r = (6 - s) / (2π)

The area of the circle is given by:

A_circle = πr^2

Substituting the value of "r" and simplifying, we get:

A_circle = π((6 - s) / (2π))^2

A_circle = ((6 - s)^2) / (4π)

Now, let's express the combined area of the square and the circle, denoted as "A_total," as a function of "s":

A_total = A_square + A_circle

A_total = s^2 + ((6 - s)^2) / (4π)

To find the minimum combined area, we can take the derivative of "A_total" with respect to "s" and set it equal to zero:

d(A_total) / ds = 2s - (12 - 2s) / (4π)

d(A_total) / ds = 2s - (12 - 2s) / (4π) = 0

Simplifying the equation, we have:

2s = (12 - 2s) / (4π)

8s = 12 - 2s

10s = 12

s = 12/10

s = 6/5

Now, we have the value of "s" which corresponds to the minimum combined area. To find the exact amount of wire used for the square, we substitute this value into the equation for the total length of the wire:

s + c = 6

6/5 + c = 6

c = 6 - 6/5

c = 30/5 - 6/5

c = 24/5

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5. (-/1 Points] DETAILS MY Verify that the points are the vertices of a parallelogram, and find its area. A(1, 1, 3), B(-7, -1,6), C(-5, 2, -1), D(3,4,-4) Need Help? Read It Watch It 6. [-11 Points] D

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The given points A(1, 1, 3), B(-7, -1, 6), C(-5, 2, -1), and D(3, 4, -4) form the vertices of a parallelogram. The area of the parallelogram can be calculated using the cross product of two of its sides.

To determine if the given points form a parallelogram, we need to check if opposite sides are parallel. We can find the vectors representing the sides of the parallelogram using the coordinates of the points.

Vector AB = B - A = (-7 - 1, -1 - 1, 6 - 3) = (-8, -2, 3)

Vector DC = C - D = (-5 - 3, 2 - 4, -1 - (-4)) = (-8, -2, 3)

The vectors AB and DC have the same direction, indicating that opposite sides AB and DC are parallel. Similarly, we can calculate the vectors representing the other pair of sides.

Vector BC = C - B = (-5 - (-7), 2 - (-1), -1 - 6) = (2, 3, -7)

Vector AD = D - A = (3 - 1, 4 - 1, -4 - 3) = (2, 3, -7)

Again, the vectors BC and AD have the same direction, confirming that the opposite sides BC and AD are parallel. Therefore, the given points A, B, C, and D form the vertices of a parallelogram.

To find the area of the parallelogram, we can calculate the magnitude of the cross product of vectors AB and AD (or BC and DC) since the magnitude of the cross product represents the area of the parallelogram.

Cross product AB x AD = |AB| * |AD| * sin(theta)

where |AB| and |AD| are the magnitudes of vectors AB and AD, respectively, and theta is the angle between them. However, since AB and AD have the same direction, the angle between them is 0 degrees or 180 degrees, and sin(theta) becomes zero.

Therefore, the area of the parallelogram formed by the given points is zero.

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write an expression!!​

Answers

The area of the shaded region in terms of 'x' would be (25-[tex]x^{2}[/tex]) square inches.

Area of a square = [tex]side^{2}[/tex] square units

Side of the larger square = 5 inches

Area of the larger square = 5×5 square inches

                                          = 25 square inches

Side of smaller square = 'x' inches

Area of the smaller square = 'x'×'x' square inches

                                            = [tex]x^{2}[/tex] square inches

Area of shaded region = Area of the larger square - Area of the white square

                                      = 25 - [tex]x^{2}[/tex] square inches

∴ The expression for the area of the shaded region as given in the figure is (25-[tex]x^{2}[/tex]) square inches

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a) Take the derivative of the function: y = ln(x/26 - 2) f 1 [x W x6 - 2 x x d dy x 6-2 b) Evaluate the indefinite integral: x + 3 dx x2 + 6x + 7

Answers

a) The derivative of y = ln(x/26 - 2) is 1/(x - 52).

b) The indefinite integral of (x + 3)/(x^2 + 6x + 7) is (1/6)ln|x + 1| + (5/6)ln|x + 7| + C.

a) To find the derivative of the function y = ln(x/26 - 2), we can use the chain rule. Let's go step by step:

Let u = x/26 - 2

Applying the chain rule, we have:

dy/dx = (dy/du) * (du/dx)

To find (dy/du), we differentiate ln(u) with respect to u:

(dy/du) = 1/u

To find (du/dx), we differentiate u = x/26 - 2 with respect to x:

(du/dx) = 1/26

Now, we can combine these results:

dy/dx = (dy/du) * (du/dx)

= (1/u) * (1/26)

= 1/(26u)

Substituting u = x/26 - 2 back into the equation:

dy/dx = 1/(26(x/26 - 2))

Simplifying further:

dy/dx = 1/(26x/26 - 52)

= 1/(x - 52)

Therefore, the derivative of y = ln(x/26 - 2) is dy/dx = 1/(x - 52).

b) To evaluate the indefinite integral of (x + 3)/(x^2 + 6x + 7), we can use the method of partial fractions.

First, we need to factorize the denominator (x^2 + 6x + 7). It can be factored as (x + 1)(x + 7).

Now, let's write the expression in partial fraction form:

(x + 3)/(x^2 + 6x + 7) = A/(x + 1) + B/(x + 7)

To find the values of A and B, we need to solve for them. Multiplying both sides by (x + 1)(x + 7) gives us:

(x + 3) = A(x + 7) + B(x + 1)

Expanding the right side:

x + 3 = Ax + 7A + Bx + B

Comparing the coefficients of like terms on both sides, we get the following system of equations:

A + B = 1 (coefficient of x)

7A + B = 3 (constant term)

Solving this system of equations, we find A = 1/6 and B = 5/6.

Now, we can rewrite the original integral as:

∫[(x + 3)/(x^2 + 6x + 7)] dx = ∫[A/(x + 1) + B/(x + 7)] dx

= ∫(1/6)/(x + 1) dx + ∫(5/6)/(x + 7) dx

Integrating each term separately:

= (1/6)ln|x + 1| + (5/6)ln|x + 7| + C

Therefore, the indefinite integral of (x + 3)/(x^2 + 6x + 7) is:

∫[(x + 3)/(x^2 + 6x + 7)] dx = (1/6)ln|x + 1| + (5/6)ln|x + 7| + C, where C is the constant of integration.

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lim (1 point) Find the limits. Enter "DNE' if the limit does not exist. 1 - cos(7xy) (x,y)--(0,0) ху X - y lim (x.99–18.8) 4 - y 11

Answers

The limit of (1 - cos(7xy)) as (x,y) approaches (0,0) exists between -1 and 2, but the exact value cannot be determined. The limit of [tex](x^0.99 - 18.8) / (4 - y^11)[/tex]as (x,y) approaches (x,y) is -4.7.

To find the limits, let's evaluate each one:

1. lim (x,y)→(0,0) (1 - cos(7xy)):

We can use the squeeze theorem to determine the limit. Since -1 ≤ cos(7xy) ≤ 1, we have:

-1 ≤ 1 - cos(7xy) ≤ 2

Taking the limit as (x,y) approaches (0,0) of each inequality, we get:

-1 ≤ lim (x,y)→(0,0) (1 - cos(7xy)) ≤ 2

Therefore, the limit exists and is between -1 and 2.

2.[tex]lim (x,y)\rightarrow(x,y) (x^0.99 - 18.8) / (4 - y^11):[/tex]

Since the limit is not specified, we can evaluate it by substituting the values of x and y into the expression:

[tex]lim (x,y)\rightarrow(x,y) (x^0.99 - 18.8) / (4 - y^11) = (0^0.99 - 18.8) / (4 - 0^11) = (-18.8) / 4 = -4.7[/tex]

Thus, the limit of the expression is -4.7.

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9. The vectors a and b have lengths 2 and 1, respectively. The vectors a +5b and 2a - 36 are Vectors a perpendicular. Determine the angle between a and b.

Answers

The angle between vectors a and b is 90 degrees or pi/2 radians.

To determine the angle between vectors a and b, we can use the dot product formula:

a · b = |a| |b| cos(theta),

where a · b is the dot product of vectors a and b, |a| and |b| are the lengths of vectors a and b, and theta is the angle between the two vectors.

Given that the lengths of vectors a and b are 2 and 1, respectively, we have:

|a| = 2 and |b| = 1.

We are also given two other vectors, a + 5b and 2a - 36, and we know that vector a is perpendicular to one of these vectors.

Let's check the dot product of a and a + 5b:

(a · (a + 5b)) = |a| |a + 5b| cos(theta).

Since a is perpendicular to one of the vectors, the dot product should be zero:

0 = 2 |a + 5b| cos(theta).

Simplifying, we have:

|a + 5b| cos(theta) = 0.

Since the length |a + 5b| is a positive value, the only way for the equation to hold is if cos(theta) = 0.

The angle theta between vectors a and b is such that cos(theta) = 0, which occurs at 90 degrees or pi/2 radians.

Therefore, the angle between vectors a and b is 90 degrees or pi/2 radians.

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help me solve tbis oelase!!!!
Find the sum of the series Σ (-1)+12? n InO 322

Answers

To find the sum of the series Σ (-1)^(n-1) * (1/2^n), we can use the formula for the sum of an infinite geometric series.

The formula states that if the absolute value of the common ratio r is less than 1, then the sum of the series is given by S = a / (1 - r), where a is the first term. In this case, the first term a is -1, and the common ratio r is 1/2.

The series Σ (-1)^(n-1) * (1/2^n) can be rewritten as Σ (-1)^(n-1) * (1/2)^(n-1) * (1/2), where we have factored out (1/2) from the denominator.

Comparing the series to the formula for an infinite geometric series, we can see that the first term a is -1 and the common ratio r is 1/2.

According to the formula, the sum of the series is given by S = a / (1 - r). Substituting the values, we have:

S = -1 / (1 - 1/2).

Simplifying the denominator, we get:

S = -1 / (1/2).

To divide by a fraction, we multiply by its reciprocal:

S = -1 * (2/1) = -2.

Therefore, the sum of the series Σ (-1)^(n-1) * (1/2^n) is -2.

In conclusion, using the formula for the sum of an infinite geometric series, we find that the sum of the given series is -2.

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Evaluate the definite integral. 9v dv Need Help? Read It Watch it 2. (-/1 Points) DETAILS LARAPCALC10 5.4.020.

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To evaluate the definite integral ∫[a,b] 9v dv, we can use the fundamental theorem of calculus.  The first step is to find the antiderivative of the integrand, which is 9v.

The antiderivative of 9v with respect to v is (9/2)v^2 + C, where C is the constant of integration. Next, we can apply the fundamental theorem of calculus to evaluate the definite integral. By substituting the limits of integration a and b into the antiderivative, we can find the difference between the antiderivative evaluated at b and the antiderivative evaluated at a: ∫[a,b] 9v dv = [(9/2)v^2 + C] evaluated from a to b = [(9/2)b^2 + C] -[(9/2)a^2 + C] = (9/2)b^2 - (9/2)a^2

Therefore, the value of the definite integral ∫[a,b] 9v dv is given by (9/2)b^2 - (9/2)a^2. In conclusion, the definite integral ∫[a,b] 9v dv evaluates to (9/2)b^2 - (9/2)a^2. This represents the difference between the antiderivative of 9v evaluated at the upper limit b and the antiderivative evaluated at the lower limit a. The value of the integral depends on the specific values of a and b provided.

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Each unit of a product can be made on either machine A or machine B. The nature of the machines makes their cost functions differ. x² Machine A: C(x) = 10+ 6 13 Machine B: cly) = 160+ Total cost is given by C(x,y) =C(x) + C(y). How many units should be made on each machine in order to minimize total costs if x+y=12,210 units are required? The minimum total cost is achieved when units are produced on machine A and units are produced on machine B.

Answers

To minimize the total cost and produce 12,210 units, approximately ¼ unit should be made on machine A and approximately 12,209.75 units should be made on machine B.

To minimize the total cost, we need to determine the number of units that should be made on each machine, given the cost functions and the total units required. Let’s denote the number of units made on machine A as x and on machine B as y.

The cost function for machine A is C(x) = 10x + 6x², and for machine B, it is C(y) = 160 + 13y. The total cost is given by C(x, y) = C(x) + C(y).

Since the total units required are 12,210 units, we have the constraint x + y = 12,210.

To minimize the total cost, we can use the method of optimization. We need to find the values of x and y that satisfy the constraint and minimize the total cost function C(x, y).

We can rewrite the total cost function as:

C(x, y) = 10x + 6x² + 160 + 13y.

Using the constraint x + y = 12,210, we can express y in terms of x: y = 12,210 – x.

Substituting this into the total cost function, we have:

C(x) = 10x + 6x² + 160 + 13(12,210 – x).

Simplifying the expression, we get:

C(x) = 6x² - 3x + 159,110.

To minimize the cost, we take the derivative of C(x) with respect to x and set it equal to zero:

C’(x) = 12x – 3 = 0.

Solving for x, we find x = ¼.

Substituting this value back into the constraint, we have:

Y = 12,210 – (1/4) = 12,209.75.

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Use a substitution of the form u = ax + b to evaluate the indefinite integral below. [(x+6372 .. Six = 6)72 dx=0 +6312

Answers

The indefinite integral of [(x+6372)^6 dx] is :

(1/7)(x - 6372)^7 + C.

To evaluate this indefinite integral using the substitution u = ax + b, we first need to determine the values of a and b. We can do this by setting u = ax + b equal to the expression inside the integral, which is (x + 6372)^6.

Setting u = ax + b, we have:

u = ax + b
u = (1/a)(ax + 6372) + 6372    (since we want the expression (x + 6372) to appear in our substitution)
u = (1/a)x + (6372 + b/a)

Comparing the coefficients of x in both expressions, we get:

1/a = 1     (since we want to simplify the substitution as much as possible)
a = 1

Comparing the constant terms in both expressions, we get:

6372 + b/a = 0
b = -6372

Therefore, our substitution is u = x - 6372.

Next, we substitute u = x - 6372 into the integral and simplify:

∫ [(x+6372)^6 dx] = ∫ [u^6 du]     (since x + 6372 = u)
= (1/7)u^7 + C
= (1/7)(x - 6372)^7 + C

Therefore, the indefinite integral of [(x+6372)^6 dx] is (1/7)(x - 6372)^7 + C.

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Find the vector components of x along a and orthogonal to a. 5. x=(1, 1, 1), a = (0,2, -1)

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The vector components of x along a are (1/3, 2/3, -1/3), and the vector components orthogonal to a are (2/3, -1/3, 2/3).

To find the vector components of x along a, we can use the formula for projecting x onto a. The component of x along a is given by the dot product of x and the unit vector of a, multiplied by the unit vector of a. Using the given values, we calculate the dot product of x and a as (10 + 12 + 1*(-1)) = 1. The length of a is √(0^2 + 2^2 + (-1)^2) = √5.

Therefore, the vector component of x along a is (1/√5)*(0, 2, -1) = (0, 2/√5, -1/√5) ≈ (0, 0.894, -0.447).

To find the vector components orthogonal to a, we subtract the vector components of x along a from x. Hence, (1, 1, 1) - (0, 0.894, -0.447) = (1, 0.106, 1.447) ≈ (1, 0.106, 1.447). Thus, the vector components of x orthogonal to a are (2/3, -1/3, 2/3).

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get the exact solution of the following polynomial: y' = 3+t-y notices that y(0)=1.

Answers

The given differential equation is y' = 3 + t - y, with the initial condition y(0) = 1. To find the exact solution, we can solve the differential equation by separating variables and then integrating.

Rearranging the equation, we have:

dy/dt + y = 3 + t.

We can rewrite this as:

dy + y dt = (3 + t) dt.

Next, we integrate both sides:

∫(dy + y dt) = ∫(3 + t) dt.

Integrating, we get:

y + 0.5y^2 = 3t + 0.5t^2 + C,

where C is the constant of integration.

Now, we can apply the initial condition y(0) = 1. Substituting t = 0 and y = 1 into the equation, we have:

1 + 0.5(1)^2 = 3(0) + 0.5(0)^2 + C,

1 + 0.5 = C,

C = 1.5.

Substituting this value back into the equation, we obtain:

y + 0.5y^2 = 3t + 0.5t^2 + 1.5.

This is the exact solution to the given differential equation with the initial condition y(0) = 1.

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joan has just moved into a new apartment and wants to purchase a new couch. To determine if there is a difference between the average prices of couches at two different stores, she collects the following data. Test the hypothesis that there is no difference in the average price. Store 1, x1=$650, standard deviation= $43, n1=42, Store 2, x2=$680, standard deviation $52, n2=45.

Answers

We can use statistical software or a t-distribution table to determine the p-value. Whether or not we reject the null hypothesis depends on the p-value attached to the derived test statistic.

To test the hypothesis that there is no difference in the average price of couches between the two stores, we can conduct a two-sample t-test.

Let's define the null hypothesis (H0) as there is no difference in the average prices of couches between the two stores. The alternative hypothesis (H1) would then be that there is a difference.

H0: μ1 - μ2 = 0 (There is no difference in the average prices)

H1: μ1 - μ2 ≠ 0 (There is a difference in the average prices)

We will use the formula for the two-sample t-test, which takes into account the sample means, sample standard deviations, and sample sizes of both stores.

The test statistic (t) is calculated as follows:

t = (x1 - x2) / √[(s1²/n1) + (s2²/n2)]

Where x1 and x2 are the sample means, s1 and s2 are the sample standard deviations, and n1 and n2 are the sample sizes.

Substituting the given values into the formula:

x1 = $650, s1 = $43, n1 = 42

x2 = $680, s2 = $52, n2 = 45

Calculating the test statistic:

t = ($650 - $680) / √[($43²/42) + ($52²/45)]

Calculating the numerator and denominator separately:

Numerator: ($650 - $680) = -$30

Denominator: √[($43²/42) + ($52²/45)]

Using a calculator or software, we can calculate the value of the test statistic as:

t ≈ -1.305

Next, we need to determine the critical value or p-value to make a decision about the null hypothesis. The critical value depends on the desired level of significance (e.g., α = 0.05).

If the p-value is less than the chosen level of significance (0.05), we reject the null hypothesis and conclude that there is a significant difference in the average prices of couches between the two stores. If the p-value is greater than the chosen level of significance, we fail to reject the null hypothesis.

To obtain the p-value, we can consult a t-distribution table or use statistical software. The p-value associated with the calculated test statistic can determine whether we reject or fail to reject the null hypothesis.

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Use the function f(x) to answer the questions:
f(x) = 4x2 − 7x − 15
Part A: What are the x-intercepts of the graph of f(x)? Show your work.
Part B: Is the vertex of the graph of f(x) going to be a maximum or a minimum? What are the coordinates of the vertex? Justify your answers and show your work.
Part C: What are the steps you would use to graph f(x)? Justify that you can use the answers obtained in Part A and Part B to draw the graph.

Answers

The x-intercepts of the graph of f(x) are x = -1.25 and x = 3

The vertex is minimum and the coordinare is (0.875, -18.0625)

Part A: What are the x-intercepts of the graph of f(x)?

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

f(x) = 4x² - 7x - 15

Factorize the function

So, we have

f(x) = (x + 1.25)(x - 3)

So, we have

x = -1.25 and x = 3

Hence, the x-intercepts are x = -1.25 and x = 3

Part B: The vertex of the graph of f(x)

We have

f(x) = 4x² - 7x - 15

The x value is calculated as

x = 7/(2 * 4)

So, we have

x = 0.875

Next, we have

f(x) = 4(0.875)² - 7(0.875) - 15

f(x) = -18.0625

So, the vertex is minimum and the coordinare is (0.875, -18.0625)

Part C: What are the steps you would use to graph f(x)?

The step is to plot the vertex and the x-intercepts

And then connect the points

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(8.14) In 2010, a Quinnipiac University Poll and a CNN Poll each asked a nationwide sample about their views on openly gay men and women serving in the military. Here are the two questions:
Question A: Federal law currently prohibits openly gay men and women from serving in the military. Do you think this law should be repealed or not?
Question B: Do you think people who are openly gay or homosexual should or should not be allowed to serve in the U.S. military?
One of these questions had 78% responding "should," and the other question had only 57% responding "should." Which wording is slanted toward a more negative response on gays in the military?
a-- question a
b-- question b
c-both

Answers

Question B is slanted toward a more negative response on gays in the military for the given sample.

The answer to Question B, which asks if those who identify as openly gay or homosexual should be permitted to serve in the U.S. military, is biassed more against gays serving in the military. This can be inferred from the fact that less people answered "should" to this question than to Question A for the sample.

Because Question B's language specifically mentions being openly gay or homosexual, it may have an impact on how certain respondents feel and act. The inquiry may incite biases or preconceptions held by people who are less accepting of homosexuality because it specifically mentions sexual orientation. This phrase may serve to reinforce societal stigma and prejudices, resulting in a decline in the proportion of respondents who support the inclusion of openly gay people.

Question A, on the other hand, approaches the matter without specifically addressing sexual orientation. The article focuses on the current law that forbids openly gay men and women from joining the military and debates whether it ought to be repealed. The question is likely to elicit more support for the change by framing it in terms of abolishing an existing legislation, leading to a higher percentage of respondents selecting "should."

The conclusion that Question B is biased towards a more unfavourable answer on gays in the military than Question A may be drawn from the information provided.

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= = = > = 3ă + = (1 point) Suppose à = (3,-6), 7 = (0,7), c = (5,9,8), d = (2,0,4). Calculate the following: a+b=( 46 = { ) lal = la – 51 = ita- 38 + 41 - { = — = = 4d = 2 16 = = = lë – = =

Answers

The answer is: ||a × d|| = √(24^2 + 12^2 + (-12)^2) = √(576 + 144 + 144) = √864 = 12√6.

To calculate the given expressions involving vectors, let's go step by step:

a + b:

We have a = (3, -6) and b = (0, 7).

Adding the corresponding components, we get:

a + b = (3 + 0, -6 + 7) = (3, 1).

||a||:

Using the formula for the magnitude of a vector, we have:

||a|| = √(3^2 + (-6)^2) = √(9 + 36) = √45 = 3√5.

||a - b||:

Subtracting the corresponding components, we get:

a - b = (3 - 0, -6 - 7) = (3, -13).

Using the formula for the magnitude, we have:

||a - b|| = √(3^2 + (-13)^2) = √(9 + 169) = √178.

a · c:

We have a = (3, -6) and c = (5, 9, 8).

Using the dot product formula, we have:

a · c = 3*5 + (-6)*9 + 0*8 = 15 - 54 + 0 = -39.

||a × d||:

We have a = (3, -6) and d = (2, 0, 4).

Using the cross product formula, we have:

a × d = (3, -6, 0) × (2, 0, 4).

Expanding the cross product, we get:

a × d = (0*(-6) - 4*(-6), 4*3 - 2*0, 2*(-6) - 0*3) = (24, 12, -12).

Using the formula for the magnitude, we have:

||a × d|| = √(24^2 + 12^2 + (-12)^2) = √(576 + 144 + 144) = √864 = 12√6.

In this solution, we performed vector calculations involving the given vectors a, b, c, and d. We added the vectors a and b by adding their corresponding components.

We calculated the magnitude of vector a using the formula for vector magnitude. We found the magnitude of the difference between vectors a and b by subtracting their corresponding components and calculating the magnitude.

We found the dot product of vectors a and c using the dot product formula. Finally, we found the cross product of vectors a and d by applying the cross product formula and calculated its magnitude using the formula for vector magnitude.

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Need solution for 7,9,11
7. RS for points R(5, 6, 12) and S(8, 13,6) 8. PQ for points P6, 8, 14) and Q(10, 16,9) 9. BA for points A(9, 13, -4) and B(3, 6, -10) 10. DC for points C(2,9, 0) and D(1, 4, 8) 11. Tree House Problem

Answers

(7) the distance RS is approximately 9.695.

(8) the distance PQ is approximately 10.247.

(9) the distance BA is 11.

What is the distance?

Distance refers to the amount of space between two objects or points. It is a measure of the length of the path traveled by an object or a person from one point to another. The most common units of distance are meters, kilometers, feet, miles, and yards.

7. To find the distance RS between points R(5, 6, 12) and S(8, 13, 6), we can use the distance formula in three-dimensional space:

RS = √((x2 - x1)² + (y2 - y1)² + (z2 - z1)²)

  = √((8 - 5)² + (13 - 6)² + (6 - 12)²)

  = √(3² + 7² + (-6)²)

  = √(9 + 49 + 36)

  = √94

  ≈ 9.695

Therefore, the distance RS is approximately 9.695.

8. To find the distance PQ between points P(6, 8, 14) and Q(10, 16, 9), we use the distance formula:

PQ = √((x2 - x1)² + (y2 - y1)² + (z2 - z1)²)

  = √((10 - 6)² + (16 - 8)² + (9 - 14)²)

  = √(4² + 8² + (-5)²)

  = √(16 + 64 + 25)

  = √105

  ≈ 10.247

Therefore, the distance PQ is approximately 10.247.

9. To find the distance BA between points A(9, 13, -4) and B(3, 6, -10), we use the distance formula:

BA = √((x2 - x1)² + (y2 - y1)² + (z2 - z1)²)

  = √((3 - 9)² + (6 - 13)² + (-10 - (-4))²)

  = √((-6)² + (-7)² + (-6)²)

  = √(36 + 49 + 36)

  = √121

  = 11

Therefore, the distance BA is 11.

Hence, (7) the distance RS is approximately 9.695.

(8) the distance PQ is approximately 10.247.

(9) the distance BA is 11.

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Consider a population of foxes and rabbits. The number of foxes and rabbits at time t are given by f(t) and r(t) respectively. The populations are governed by the equations df = 5f-9r dr =3f-7r. dt a.

Answers

The derivative of f(t) with respect to t is [tex]d²f/dt² = -2f + 18r[/tex].The derivative of r(t) with respect to t is [tex]d²r/dt² = -6f + 22r[/tex].

To find the derivative of f(t) and r(t) with respect to t, we can apply the chain rule.

Given:

[tex]df/dt = 5f - 9r ...(1)dr/dt = 3f - 7r ...(2)[/tex]

Taking the derivative of equation (1) with respect to t:

[tex]d²f/dt² = 5(df/dt) - 9(dr/dt)[/tex]

Substituting the expressions for df/dt and dr/dt from equations (1) and (2), respectively:

[tex]d²f/dt² = 5(5f - 9r) - 9(3f - 7r)= 25f - 45r - 27f + 63r= -2f + 18r[/tex]

Therefore, the derivative of f(t) with respect to t is [tex]d²f/dt² = -2f + 18r.[/tex]

Similarly, taking the derivative of equation (2) with respect to t:

[tex]d²r/dt² = 3(df/dt) - 7(dr/dt)[/tex]

Substituting the expressions for df/dt and dr/dt from equations (1) and (2), respectively:

[tex]d²r/dt² = 3(5f - 9r) - 7(3f - 7r)= 15f - 27r - 21f + 49r= -6f + 22r[/tex]

Therefore, the derivative of r(t) with respect to t is[tex]d²r/dt² = -6f + 22r.[/tex]

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a dj is preparing a playlist of songs. how many different ways can the dj arrange the first songs on the playlist?

Answers

To determine the number of different ways the DJ can arrange the first songs on the playlist, we need to know the total number of songs available and how many songs the DJ plans to include in the playlist.

Let's assume the DJ has a total of N songs and wants to include M songs in the playlist. In this case, the number of different ways the DJ can arrange the first songs on the playlist can be calculated using the concept of permutations.

The formula for calculating permutations is:

P(n, r) = n! / (n - r)!

Where n is the total number of items, and r is the number of items to be selected.

In this scenario, we want to select M songs from N available songs, so the formula becomes:

P(N, M) = N! / (N - M)!

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14. Let f(x) = x3 + 6x2 – 15% - 10. = – Explain the following briefly. (1) Find the intervals of increase/decrease of the function. (2) Find the local maximum and minimum points. (3) Find the inte

Answers

(1) The intervals of increase/decrease is between critical points x = 1 and x = -5.

(2) The local maximum and minimum points are 50 and -18.

To analyze the function f(x) = x^3 + 6x^2 - 15x - 10, we can follow these steps:

(1) Finding the Intervals of Increase/Decrease:

To determine the intervals of increase and decrease, we need to find the critical points by setting the derivative equal to zero and solving for x:

f'(x) = 3x^2 + 12x - 15

Setting f'(x) = 0:

3x^2 + 12x - 15 = 0

This quadratic equation can be factored as:

(3x - 3)(x + 5) = 0

So, the critical points are x = 1 and x = -5.

We can test the intervals created by these critical points using the first derivative test or by constructing a sign chart for f'(x). Evaluating f'(x) at test points in each interval, we can determine the sign of f'(x) and identify the intervals of increase and decrease.

(2) Finding the Local Maximum and Minimum Points:

To find the local maximum and minimum points, we need to examine the critical points and the endpoints of the given interval.

To evaluate f(x) at the critical points, we substitute them into the original function:

f(1) = 1^3 + 6(1)^2 - 15(1) - 10 = -18

f(-5) = (-5)^3 + 6(-5)^2 - 15(-5) - 10 = 50

We also evaluate f(x) at the endpoints of the given interval, if provided.

(3) Finding the Integral:

To find the integral of the function, we need to specify the interval of integration. Without a specified interval, we cannot determine the definite integral. However, we can find the indefinite integral by finding the antiderivative of the function:

∫ (x^3 + 6x^2 - 15x - 10) dx

Taking the antiderivative term by term:

∫ x^3 dx + ∫ 6x^2 dx - ∫ 15x dx - ∫ 10 dx

= (1/4)x^4 + 2x^3 - (15/2)x^2 - 10x + C

Where C is the constant of integration.

So, the integral of the function f(x) is (1/4)x^4 + 2x^3 - (15/2)x^2 - 10x + C, where C is the constant of integration.

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1. Let z = 2 + 5i and w = a + bi where a, b R. Without using acalculator,(a) determine zw , and hence, b in terms of a such that zw is real;(b) determine arg{z 7};(c) determine1. Let z = 2 + 5i and w = a + bi where a, b R. Without using a calculator, (a) determine - and hence, b in terms of a such that is real; W Answer: (b) determine arg{z - 7}; (c) determine 3113 Answ Calculate the following double integral. I = I = (Your answer should be entered as an integer or a fraction.) 3 x=0 (5 + 8xy) dx dy This feedback is based on your last submitted answer. Submit your ch Joseph William Turner was essentially ............., but was also a fervent and lifelong supporter of the royal academy. The tanakh contains the primary religious traditions of what religion? Use this definition with right endpoints to find an expression for the area under the graph of f as a limit. Do not evaluate the limit. f(x)=x x 3+6,1x4 A=lim n[infinity] i=1n An investor sells 1,000 shares of DEF short at 50 and meets the initial margin requirement. If DEF falls to 45, what is the equity in the account?A) 35000.B) 40000.C) 30000.D) 20000. Find the length and direction (when defined) of uxv and vxu. u=2i, v = - 3j The length of u xv is. (Type an exact answer, using radicals as needed.) a share of stock is now selling for $100. it will pay a dividend of $9 per share at the end of the year. its beta is 1. what do investors expect the stock to sell for at the end of the year? The final step in the strategic management process is:a. environmental analysis.b. strategy control.c. strategy implementation.d. tactical implementation. Find the measure of the indicated angle to the nearest degree.22) 27 ? 17 how to find a random sample of 150 students has a test score average of 70 with a standard deviation of 10.8. find the margin of error if the confidence level is 0.99 using statcrunch A. 2.30 B. 0.19 C. 0.87 D. 0.88 find the wave length of the curre r=2sio (93) : 05 02 311 in the polar coordinate plane PLEASEE HURRY AND HELP ME NO WRONG ANSWERS :( !!!!!!!!!!LOOK AT THE IMAGES BELOW !!!!!!!!!!!!! Find the second derivative of the given function. f(x) = 712 7-x = Consider the following random variables (r.v.s). Identify which of the r.v.s have a distribution that can be referred to as a sampling distribution. Select all that apply. O Sample Mean, O Sample Variance. S2 Population Variance, o2 Population Mean, u Population Median, 0 Sample Median Classify the expression by the number of terms. 4x^(5)-x^(3)+3x+2 7. Find the integrals along the lines of a scalar field S(x,y,z) = -- along the curve C given by r(t) = In(t) i+tj+2k when 1< t The curve with equation y = 47' +6x? is called a Tschirnhausen cubic. Find the equation of the tangent line to this curve at the point (1,1). An equation of the tangent line to the curve at the point (1.1) is Operations in which airspace requires filing an IFR flight plan?A- Any airspace when the visiblity is less than 1 mileB- class E airspace with IMC and Class A airspaceC- positive control area continental control area and all other airspace if the visibility is less than 1 mile fraction numerator 6 square root of 27 plus 12 square root of 15 over denominator 3 square root of 3 end fraction equals x square root of y plus w square root of z