Question 3 (26 Marksiu to novin Consider the function bus lastamedaulluquo to ed 2x+3 2001-08: ud i f(a) In a) Find the domain D, of f. [2] b) Find the a and y-intercepts. [3] e) Find lim f(a), where e is an accumulation point of D, which is not in Df. Identify any possible asymptotes. [5] d) Find lim f(a). Identify any possible asymptote. [2] 8418 e) Find f'(a) and f(x). [4] f) Does f has any critical numbers?

To find the cost function, we integrate the marginal cost function with respect to x: ∫(dC/dx) dx = ∫(3/(16x + 3)) dx. The cost of producing 80 units is approximately $745.33.

To integrate this expression, we can use the natural logarithm function:

∫(3/(16x + 3)) dx = 3∫(1/(16x + 3)) dx = 3/16 ∫(1/(x + 3/16)) dx

Using a substitution, let u = x + 3/16, then du = dx, we have:

3/16 ∫(1/u) du = 3/16 ln|u| + C1 = 3/16 ln|x + 3/16| + C1

Now, we need to find the constant term C1 using the given information that when x = 17, C = 140:

C = 3/16 ln|17 + 3/16| + C1 = 140

Simplifying this equation, we can solve for C1:

3/16 ln(273/16) + C1 = 140

ln(273/16) + C1 = 16/3 * 140

ln(273/16) + C1 = 746.6667

C1 = 746.6667 - ln(273/16)

Therefore, the cost function C is: C = 3/16 ln|x + 3/16| + (746.6667 - ln(273/16))

To find the cost of producing 80 units, we substitute x = 80 into the cost function: C = 3/16 ln|80 + 3/16| + (746.6667 - ln(273/16))

Calculating this expression, we can find the cost:

C ≈ 3/16 ln(1280/16) + (746.6667 - ln(273/16))

C ≈ 3/16 ln(80) + (746.6667 - ln(273/16))

C ≈ 3/16 (4.3820) + (746.6667 - 2.1581)

C ≈ 0.8175 + 744.5086

C ≈ 745.3261

The cost of producing 80 units is approximately $745.33.

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The precise formula for the radius of the curve y = x(2/3) over the range [x = 8, x = 125].

To find the exact arc length of the curve y = x^(2/3) over the interval [x = 8, x = 125], we can use the arc length formula for a curve defined by a function f(x):

Arc Length = ∫[a, b] sqrt(1 + (f'(x))^2) dx

First, let's find the derivative of y = x^(2/3) with respect to x:

dy/dx = (2/3)x^(-1/3)

Next, we substitute this derivative into the arc length formula and calculate the integral:

Arc Length = ∫[tex][8, 125] sqrt(1 + (2/3x^{-1/3})^2) dx[/tex]

          =∫ [tex][8, 125] sqrt(1 + 4/9x^{-2/3}) dx[/tex]

          = ∫[tex][8, 125] sqrt((9x^{-2/3} + 4)/(9x^{-2/3})) dx[/tex]

          = ∫[tex][8, 125] sqrt((9 + 4x^{2/3})/(9x^{-2/3})) dx[/tex]

To simplify the integral, we can rewrite the expression inside the square root as:

[tex]sqrt((9 + 4x^{2/3})/(9x^{-2/3})) = sqrt((9x^{-2/3} + 4x^{2/3})/(9x^{-2/3})) \\= sqrt((x^{-2/3}(9 + 4x^{2/3}))/(9x^{-2/3})) \\ = sqrt((9 + 4x^{2/3})/9)[/tex]

Now, let's integrate the expression:

Arc Length = ∫[8, 125] (9 + 4x^(2/3))/9 dx

          = (1/9) ∫[8, 125] (9 + 4x^(2/3)) dx

          = (1/9) (∫[8, 125] 9 dx + ∫[8, 125] 4x^(2/3) dx)

          = (1/9) (9x∣[8, 125] + 4(3/5)x^(5/3)∣[8, 125])

Evaluating the definite integrals:

Arc Length = [tex](1/9) (9(125 - 8) + 4^{3/5} (125^{5/3} - 8^{5/3}))[/tex]

Simplifying further:

Arc Length = [tex](1/9) (117 + 4^{3/5} )(125^{5/3} - 8^{5/3})[/tex]

This is the exact expression for the arc length of the curve y = [tex]x^{2/3}[/tex]over the interval [x = 8, x = 125].

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The standard equation of the circle is (x + 8)² + (y + 6)² = 25.

In this problem we find the representation of a circle set on Cartesian plane, whose standard equation must be found. Every circle is described both by its center and its radius. After a quick inspection, we notice that the circle has its center at (x, y) = (- 8, - 6) and a radius 5.

The standard equation of the circle is introduced below:

(x - h)² + (y - k)² = r²

Where:

If we know that (x, y) = (- 8, - 6) and r = 5, then the standard equation of the circle is:

(x + 8)² + (y + 6)² = 25

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The value of C = 0So, the integral function is $F(t) = t^2 / 2V + 236t$ after substitution by t = Vx.

Given the function $f(x) = Vx^2 + 236$.

To determine the integral function of the given function by substitution t = Vx.(1) Write an integrate function dependent on variable t after substitution by t = Vx

We have given that t = Vx

Squaring both sides, t^2 = Vx^2x^2 = t^2 / V

For x > 0, x = t / Vx dx = 1 / V dt

Thus, the given function f(x) = Vx^2 + 236 can be rewritten as: f(x) = t + 236 / V^2

After substituting the values of x and dx, we get

Integrating both sides, we get F(t) = t^2 / 2V + 236t + C is the integral function dependent on variable t after substitution by t = Vx, where C is the constant of integration.

(2) Determining the value of C

We have given that $F(t) = t^2 / 2V + 236t + C$

Since F(0) = 0, then $F(0) = C$

Therefore, the value of C = 0So, the integral function is $F(t) = t^2 / 2V + 236t$ after substitution by t = Vx.

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visualize the situation by plotting a normal distribution curve with the mean of 73.9 and standard deviation of 8.09. Shade the area representing the top 21% of the distribution and identify the corresponding cutoff score on the x-axis.

To find the cutoff score for selecting the top 21% of applicants, we need to determine the z-score corresponding to this percentile and then convert it back to the raw score using the mean and standard deviation of the normal distribution.

Given:- Mean (μ) = 73.9

- Standard deviation (σ) = 8.09- Percentile = 21% (or 0.21)

To find the z-score, we can use the standard normal distribution table or a z-score calculator.

the number of standard deviations away from the mean.

Z-score = InvNorm(Percentile) = InvNorm(0.21)

Once we have the z-score, we can convert it back to the raw score using the formula:

Raw score = Mean + (Z-score * Standard deviation)

Cutoff score = 73.9 + (Z-score * 8.09)

Now, you can calculate the z-score using a statistical software or a standard normal distribution table and then substitute it into the formula to find the cutoff score.

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The integral that would determine the volume of revolution from revolving the region enclosed by y = x(3 - x) and the x-axis about the y-axis is:[tex]$$\int_{0}^{3}\pi x^2(3 - x) \ dx$$[/tex]

To set up the integral that would determine the volume of revolution from revolving the region enclosed by y = x(3 - x) and the x-axis about the y-axis, you need to use the disk method. The disk method involves integrating the area of a series of disks that fit inside the region of revolution. Here are the steps to find the integral:

Step 1: Sketch the region of revolution. First, we need to sketch the region of revolution.

This can be done by graphing y = x(3 - x) and the x-axis to find the points of intersection. These points are x = 0 and x = 3. The region of revolution is bounded by these points and the curve y = x(3 - x). The region of revolution is shown below:

Step 2: Identify the axis of revolutionNext, we need to identify the axis of revolution. In this case, the region is being revolved about the y-axis, which is vertical.

Step 3: Determine the radius of each diskThe radius of each disk is the distance between the axis of revolution (y-axis) and the edge of the region. Since we are revolving the region about the y-axis, the radius is equal to the distance from the y-axis to the curve y = x(3 - x). The distance is simply x.

Step 4: Determine the height of each disk

The height of each disk is the thickness of the region. In this case, it is dx.Step 5: Write the integral. The integral for the volume of revolution using the disk method is given by:[tex]$$\int_{a}^{b}\pi r^2 h \ dx$$[/tex] Where r is the radius of each disk, h is the height of each disk, and a and b are the limits of integration along the x-axis.In this case, we have a = 0 and b = 3, so we can write the integral as:[tex]$$\int_{0}^{3}\pi x^2(3 - x) \ dx$$[/tex]

Therefore, the integral that would determine the volume of revolution from revolving the region enclosed by y = x(3 - x) and the x-axis about the y-axis is:[tex]$$\int_{0}^{3}\pi x^2(3 - x) \ dx$$[/tex]

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The curl of the vector field F is ∇ × F = <-2y, -2z, 2x-y>.

To find the curl of the vector field F = <y^2, xz, zy^3>:

1. The curl of a vector field F = <P, Q, R> is given by the cross product of the gradient operator (∇) with F, i.e., ∇ × F.

2. Applying the curl operation, we obtain the components of the curl as follows:

  - The x-component: ∂R/∂y - ∂Q/∂z = 2x - y.

  - The y-component: ∂P/∂z - ∂R/∂x = -2y.

  - The z-component: ∂Q/∂x - ∂P/∂y = -2z.

3. Combining the components, we have ∇ × F = <-2y, -2z, 2x-y>.

Therefore, the curl of the vector field F is ∇ × F = <-2y, -2z, 2x-y>.

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The indefinite integral of the given expression is:

∫(u^2 + u^10) du = (1/3)u^3 + (1/11)u^11 + C,

To simplify the integrand by distributing u^(-5) to each term, we have:

∫(u^2 + u^10) du = ∫u^2 du + ∫u^10 du.

Integrating each term separately:

∫u^2 du = (1/3)u^3 + C1, where C1 is the constant of integration.

∫u^10 du = (1/11)u^11 + C2, where C2 is another constant of integration.

Therefore, the indefinite integral of the given expression is:

∫(u^2 + u^10) du = (1/3)u^3 + (1/11)u^11 + C,

where C = C1 + C2 is the combined constant of integration.

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The proportion of blue balls in each urn and the likelihood of selecting each urn.  the probability that the chosen ball is blue is 46.6% when an urn is selected randomly from the two urns provided.

To calculate the probability of selecting a blue ball, we consider the two urns separately. The probability of selecting the first urn is 1 out of 2 (50%) since there are two urns to choose from. Within the first urn, there are 6 blue balls out of a total of 20 balls, giving us a probability of 6/20, or 30%, of selecting a blue ball.

Similarly, the probability of selecting the second urn is also 50%. Within the second urn, there are 12 blue balls out of a total of 19 balls, resulting in a probability of 12/19, or approximately 63.2%, of selecting a blue ball.

To calculate the overall probability of selecting a blue ball, we take the weighted average of the probabilities from each urn. Since the probability of selecting each urn is 50%, we multiply each individual probability by 0.5 and add them together: (0.5 * 30%) + (0.5 * 63.2%) = 15% + 31.6% = 46.6%.

Therefore, the overall probability of selecting a blue ball is calculated by taking the weighted average of the probabilities from each urn, which yields 46.6% (0.5 * 30% + 0.5 * 63.2%).

Therefore, the probability that the chosen ball is blue is 46.6% when an urn is selected randomly from the two urns provided.

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The given function is: f(x) = Σn=0 ∞xⁿ, which is a geometric series. Here a = 1 and r = x, so we have:$$\sum_{n=0}^{\infty}x^n = \frac{1}{1-x}$$Now we will find a power series representation for the function

By expressing it as a sum of powers of x:$$\frac{1}{1-x} = 1 + x + x^2 + x^3 + \cdots = \sum_{n=0}^{\infty}x^n$$Therefore, the power series representation for the given function centered at x = 0 is:$$f(x) = \sum_{n=0}^{\infty}x^n$$The interval of convergence of this power series is (-1, 1), which we can find by using the ratio test:$$\lim_{n\to\infty} \left|\frac{a_{n+1}}{a_n}\right| = \lim_{n\to\infty} \left|\frac{x^{n+1}}{x^n}\right| = \lim_{n\to\infty} |x| = |x|$$The series converges if $|x| < 1$ and diverges if $|x| > 1$. Therefore, the interval of convergence is (-1, 1).

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Answer :  1) the result of the integration is x^3 + x^2 + x + C, where C is the constant of integration, 2) the result of the integration is (1/4) * (sin(3x) + (1/3) * sin(9x)) + C, where C is the constant of integration.

1. ∫(3x^2 + 2x + 1) dx:

To integrate this polynomial function, we can use the power rule of integration. The power rule states that for a term of the form ax^n, the integral is (a/(n+1)) * x^(n+1).

∫(3x^2 + 2x + 1) dx = (3/3) * x^3 + (2/2) * x^2 + x + C

                   = x^3 + x^2 + x + C

So, the result of the integration is x^3 + x^2 + x + C, where C is the constant of integration.

2. ∫[cos(x) sin(sin(x))] dx:

This integral involves nested trigonometric functions. Unfortunately, there isn't a simple closed form for the integral of this function. It can be expressed using special functions such as the Fresnel integral or elliptic integrals, but those are more advanced topics.

So, the integral of cos(x) sin(sin(x)) cannot be evaluated in a simple closed form.

3. ∫[8^|cos(x) – sin(x)|] dx:

To evaluate this integral, we need to consider the absolute value expression. Let's break down the integral based on the sign of the expression inside the absolute value.

When cos(x) - sin(x) ≥ 0 (i.e., cos(x) ≥ sin(x)), the absolute value is not needed.

∫[8^(cos(x) - sin(x))] dx = ∫[8^(cos(x)) * 8^(-sin(x))] dx

Using the property a^m * a^n = a^(m+n), we can rewrite the integral as:

∫[8^(cos(x)) * 8^(-sin(x))] dx = ∫[8^(cos(x)) / 8^(sin(x))] dx

Using the property (a^m)/(a^n) = a^(m-n), we can simplify further:

∫[8^(cos(x)) / 8^(sin(x))] dx = ∫[8^(cos(x) - sin(x))] dx

                             = ∫[8^(cos(x) - sin(x))] dx

When sin(x) - cos(x) ≥ 0 (i.e., sin(x) ≥ cos(x)), the expression inside the absolute value becomes -(cos(x) - sin(x)).

∫[8^(cos(x) - sin(x))] dx = ∫[8^(-(cos(x) - sin(x)))] dx

                          = ∫[1/8^(cos(x) - sin(x))] dx

Combining the two cases:

∫[8^|cos(x) – sin(x)|] dx = ∫[8^(cos(x) - sin(x))] dx + ∫[1/8^(cos(x) - sin(x))] dx

Solving these integrals requires numerical methods or approximations.

4. ∫[|x^4 – 2x^3 + 2x^2 – 4x|] dx:

To integrate this absolute value function, we need to consider the intervals where the expression inside the absolute value is positive and negative.

When x^4 - 2x^3 + 2x^2 - 4x ≥ 0 (i.e., x^4 - 2x^3 + 2x^2 - 4x ≥ 0), the absolute value is not needed.

∫[|x^4 - 2x^3 + 2x^2 - 4x|] dx = ∫[x^4 -

2x^3 + 2x^2 - 4x] dx

Integrating this polynomial function:

∫[x^4 - 2x^3 + 2x^2 - 4x] dx = (1/5) * x^5 - (1/2) * x^4 + (2/3) * x^3 - 2x^2 + C

When x^4 - 2x^3 + 2x^2 - 4x < 0 (i.e., x^4 - 2x^3 + 2x^2 - 4x < 0), the expression inside the absolute value changes sign.

∫[|x^4 - 2x^3 + 2x^2 - 4x|] dx = -∫[x^4 - 2x^3 + 2x^2 - 4x] dx

Integrating this polynomial function:

-∫[x^4 - 2x^3 + 2x^2 - 4x] dx = -(1/5) * x^5 + (1/2) * x^4 - (2/3) * x^3 + 2x^2 + C

So, depending on the sign of x^4 - 2x^3 + 2x^2 - 4x, we have two cases for the integration.

5. ∫[cos^(3)(3x)] dx:

This integral involves the cosine function raised to the power of 3. To evaluate it, we can use the power-reducing formula:

cos^(3)(3x) = (1/4) * (3cos(3x) + cos(9x))

Now, we can integrate each term separately:

∫[cos^(3)(3x)] dx = (1/4) * ∫[(3cos(3x) + cos(9x))] dx

                 = (1/4) * (3∫[cos(3x)] dx + ∫[cos(9x)] dx)

                 = (1/4) * (3 * (1/3) * sin(3x) + (1/9) * sin(9x)) + C

                 = (1/4) * (sin(3x) + (1/3) * sin(9x)) + C

So, the result of the integration is (1/4) * (sin(3x) + (1/3) * sin(9x)) + C, where C is the constant of integration.

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The limit of (-1)^n^3 as n approaches infinity does not exist (DNE).

The expression (-1)^n^3 represents a sequence that alternates between positive and negative values as n increases. Let's analyze the behavior of the sequence for even and odd values of n.

For even values of n, (-1)^n^3 = (-1)^(2m)^3 = (-1)^(8m^3) = 1, where m is a positive integer. Therefore, the sequence is always 1 for even values of n.

For odd values of n, (-1)^n^3 = (-1)^(2m+1)^3 = (-1)^(8m^3 + 12m^2 + 6m + 1) = -1, where m is a positive integer. Therefore, the sequence is always -1 for odd values of n.

Since the sequence alternates between 1 and -1 as n increases, it does not approach a single value. Hence, the limit of (-1)^n^3 as n approaches infinity does not exist (DNE).

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Equation of the path of the particle: y = (x-2)^2 + 2. Velocity vector at t=2: v = (4i + 4j). Acceleration vector at t=2: a = (2i + 0j)

The position of the particle is given by the vector-valued function r(t) = (t-2) i + (x^2+2) j. To find the equation of the path of the particle, we need to eliminate the parameter t. We can do this by completing the square in the y-coordinate.

The y-coordinate of r(t) is given by y = x^2 + 2. Completing the square, we get y = (x-1)^2 + 1. Therefore, the equation of the path of the particle is y = (x-2)^2 + 2.

To find the velocity vector of the particle, we need to take the derivative of r(t). The derivative of r(t) is v(t) = i + 2x j. Therefore, the velocity vector at t=2 is v = (4i + 4j). To find the acceleration vector of the particle, we need to take the derivative of v(t). The derivative of v(t) is a(t) = 2i. Therefore, the acceleration vector at t=2 is a = (2i + 0j).

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To evaluate the integral ∫(7x + 2) / √(x) dx, we can use the substitution method. Let's substitute[tex]u = √(x), then du = (1 / (2√(x))) dx.[/tex]

Rearranging the substitution, we have dx = 2√(x) du.

Substituting these values into the integral, we get:

[tex]∫(7x + 2) / √(x) dx = ∫(7u^2 + 2) / u * 2√(x) du= ∫(7u + 2/u) * 2 du= 2∫(7u + 2/u) du.[/tex]

Now, we can integrate each term separately:

[tex]∫(7u + 2/u) du = 7∫u du + 2∫(1/u) du= (7/2)u^2 + 2ln|u| + C.[/tex]

Substituting back u = √(x), we have:

[tex](7/2)u^2 + 2ln|u| + C = (7/2)(√(x))^2 + 2ln|√(x)| + C= (7/2)x + 2ln(√(x)) + C= (7/2)x + ln(x) + C.[/tex]integration

Therefore, the evaluation of the integral[tex]∫(7x + 2) / √(x) dx is (7/2)x + ln(x) +[/tex]C, where C is the constant of .

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The equation of the plane containing the points (-1, 3, 4), (-1, 9, 4), and (1, -1, 1) is x - y - z = 0. An additional point on the plane is (1, -1, -1).

To find the equation of a plane, we can use the point-normal form of the equation, which states that the equation of a plane can be expressed as ax + by + cz = d, where (a, b, c) is the normal vector to the plane, and (x, y, z) are the coordinates of any point on the plane.

To determine the normal vector, we can use the cross product of two vectors that lie in the plane. Taking the vectors formed by the given points (-1, 3, 4), (-1, 9, 4), and (1, -1, 1), we can calculate the cross product:

v1 = (-1, 9, 4) - (-1, 3, 4) = (0, 6, 0)

v2 = (1, -1, 1) - (-1, 3, 4) = (2, -4, -3)

Taking the cross product of v1 and v2, we have:

n = v1 x v2 = (6, 0, -12)

Now, we can substitute the coordinates of one of the given points (e.g., (-1, 3, 4)) and the normal vector (6, 0, -12) into the point-normal form equation to obtain the equation of the plane:

6(x + 1) - 12(y - 3) + 0(z - 4) = 0

6x - 12y - 12z = -6 + 36 + 0

6x - 12y - 12z = 30

Dividing both sides by 6, we get:

x - 2y - 2z = 5

Therefore, the equation of the plane containing the given points is x - 2y - 2z = 5. To find an additional point on this plane, we can substitute the coordinates into the equation and solve for one of the variables. For example, substituting x = 1 and y = -1 into the equation gives:

1 - 2(-1) - 2z = 5

1 + 2 - 2z = 5

3 - 2z = 5

-2z = 2

z = -1

Hence, an additional point on the plane is (1, -1, -1).

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The volume of the solid of revolution is π(e^4 - 2)/2 cubic units.

The solid of revolution is formed by revolving the region R about the z-axis. To find the volume of the solid, we use the method of cylindrical shells.

Consider a vertical strip of thickness dx at a distance x from the y-axis. The height of this strip is given by the difference between the upper and lower bounds of y, which are y = 2 and y = ln x, respectively.

The radius of the cylindrical shell is simply x, which is the distance from the z-axis to the strip. Therefore, the volume of the shell is given by:

dV = 2πx(y - ln x)dx

Integrating this expression over the interval [1, e^2], we obtain:

V = ∫[1, e^2] 2πx(y - ln x)dx

= 2π ∫[1, e^2] xydx - 2π ∫[1, e^2] xln x dx

The first integral can be evaluated using integration by substitution with u = x^2/2:

∫[1, e^2] xydx = ∫[1/2, (e^2)/2] u du

= [(e^4)/8 - 1/8]

The second integral can be evaluated using integration by parts with u = ln x and dv = dx:

∫[1, e^2] xln x dx = [x(ln x - 1/2)]|[1,e^2] - ∫[1,e^2] dx

= (e^4)/4 - (3/4)

Substituting these results back into the expression for V, we get:

V = 2π[(e^4)/8 - 1/8] - 2π[(e^4)/4 - 3/4]

= π(e^4 - 2)/2

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The table of slopes of secant lines for the function f(x) = 19 cos(x) at x = -2 is as follows:

Based on the table of slopes of secant lines, we can make a conjecture about the slope of the tangent line at x = -2 for the function f(x) = 19 cos(x). As the x-values in the table approach -2 from both sides (left and right), the slopes of the secant lines appear to be converging to a certain value. This value can be interpreted as the slope of the tangent line at x = -2.

To confirm the conjecture, we would need to take the limit as x approaches -2 of the slopes of the secant lines. However, based on the pattern observed in the table, we can make an initial conjecture that the slope of the tangent line at x = -2 for the function f(x) = 19 cos(x) is approximately equal to the average of the slopes of the secant lines as x approaches -2 from both sides. This is because the average of the slopes of the secant lines represents the limiting slope of the tangent line at that point.

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The cost for a production level of 850 pairs of skis is approximately $44,912 (to the nearest dollar).

To find the cost function C(x), we need to integrate the marginal cost function C'(x) with respect to x. The given marginal cost function is C'(x) = 1 + 0.05x.

The integral of C'(x) with respect to x gives us the total cost function C(x):

C(x) = ∫(C'(x))dx

C(x) = ∫(1 + 0.05x)dx

Using the table of integrals, we can find the antiderivative of each term:

∫(1)dx = x

∫(0.05x)dx = 0.05 * (x^2) / 2 = 0.025x^2

Now we can write the cost function C(x):

C(x) = x + 0.025x^2 + C

Where C is the constant of integration. Since the fixed costs are given as $25,000, we can determine the value of C by substituting the values of x and C(x) at a certain point. Let's use the point (0, 25,000):

25,000 = 0 + 0 + C

C = 25,000

Now we can rewrite the cost function C(x) as:

C(x) = x + 0.025x^2 + 25,000

To determine the production level that produces a cost of $125,000, we can set C(x) equal to 125,000 and solve for x:

125,000 = x + 0.025x^2 + 25,000

Rearranging the equation:

0.025x^2 + x + 25,000 - 125,000 = 0

0.025x^2 + x - 100,000 = 0

To solve this quadratic equation, we can either use factoring, completing the square, or the quadratic formula. Let's use the quadratic formula:

x = (-b ± √(b^2 - 4ac)) / (2a)

In our equation, a = 0.025, b = 1, and c = -100,000. Substituting these values into the quadratic formula:

x = (-(1) ± √((1)^2 - 4(0.025)(-100,000))) / (2(0.025))

Simplifying further:

x = (-1 ± √(1 + 10,000)) / 0.05

x = (-1 ± √10,001) / 0.05

Now we can calculate the approximate values using a calculator:

x ≈ (-1 + √10,001) / 0.05 ≈ 199.95

x ≈ (-1 - √10,001) / 0.05 ≈ -200.05

Since the production level cannot be negative, we can disregard the negative solution. Therefore, the production level that produces a cost of $125,000 is approximately 200 pairs of skis.

To find the cost for a production level of 850 pairs of skis, we can substitute x = 850 into the cost function C(x):

C(850) = 850 + 0.025(850)^2 + 25,000

C(850) = 850 + 0.025(722,500) + 25,000

C(850) = 850 + 18,062.5 + 25,000

C(850) ≈ 44,912.5

Therefore, the cost for a production level of 850 pairs of skis is approximately $44,912 (to the nearest dollar).

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Answer:

²√202

Step-by-step explanation:

To find the magnitude of AB with initial point A(0,8) and terminal point B(-9,-3), we can use the distance formula:

distance = square root((x2 - x1)^2 + (y2 - y1)^2)

where (x1, y1) is the initial point A and (x2, y2) is the terminal point B.

where (x1, y1) is the initial point A and (x2, y2) is the terminal point B.Plugging in the values, we get:

distance = square root((-9 - 0)^2 + (-3 - 8)^2)

= square root((-9)^2 + (-11)^2)

= square root(81 + 121)

= square root(202)

Therefore, the magnitude of AB is square root(202).

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The parametrization of the path C, a line segment from (0,0) to (2,4), is given by r(t) = (2t, 4t). Evaluating the expression [(x^2 + y^2) ds], where ds represents the arc length, requires using the parametrization to calculate the integrand and perform the integration.

To parametrize the line segment C from (0,0) to (2,4), we can express it as r(t) = (2t, 4t), where t ranges from 0 to 1. This parametrization represents a straight line that starts at the origin (0,0) and ends at (2,4), with t acting as a parameter that determines the position along the line.

To evaluate [(x^2 + y^2) ds], we need to calculate the integrand and perform the integration. First, we substitute the parametric equations into the expression: [(x^2 + y^2) ds] = [(4t^2 + 16t^2) ds]. The next step is to determine the differential ds, which represents the infinitesimal arc length. In this case, ds can be calculated using the formula ds = sqrt((dx/dt)^2 + (dy/dt)^2) dt.

Substituting the values of dx/dt and dy/dt into the formula, we obtain ds = sqrt((2)^2 + (4)^2) dt = sqrt(20) dt. Now, we can rewrite the expression as [(4t^2 + 16t^2) sqrt(20) dt]. To evaluate the integral, we integrate this expression over the range of t from 0 to 1.

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The derivative dy/dx using implicit differentiation dy/dx = (10*9e^(9x) - m*u^(m-1) * du/dx) / (3y^2).
.

To find dy/dx by implicit differentiation, we need to differentiate both sides of the equation with respect to x.
Starting with the given equation:

1u^m + 1y^3 = 10e^(9x)

We first take the derivative of each term separately using the chain rule:

d/dx (1u^m) = m*u^(m-1) * du/dx
d/dx (1y^3) = 3y^2 * dy/dx
d/dx (10e^(9x)) = 10*9e^(9x)

Now, putting it all together using the chain rule and solving for dy/dx:

m*u^(m-1) * du/dx + 3y^2 * dy/dx = 10*9e^(9x)
dy/dx = (10*9e^(9x) - m*u^(m-1) * du/dx) / (3y^2)

And there you have it, the derivative dy/dx using implicit differentiation.

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The area of the surface given by z = f(x, y) that lies above the region R is π/8 x².

To find the area of the surface given by z = f(x, y) that lies above the region R,

where f(x, y) = ln(sec(x)) and R = {(x, x): 0 ≤ x ≤ π/4, 0 ≤ y ≤ x tan(x)}, set up the double integral over the region R.

The area can be calculated using the double integral as follows:

Area = ∬R dA

Here, dA = differential area element.

To evaluate the double integral, use the iterated integral and convert it into polar coordinates since the region R is defined in terms of x and y.

In polar coordinates, x = rcos(θ) and y = rsin(θ), where r = radius and θ = angle.

The limits of integration for the radius r and the angle θ will depend on the region R.

The region R is defined as 0 ≤ x ≤ π/4 and 0 ≤ y ≤ x tan(x).

Using the polar coordinate transformation, the limits for r will be 0 ≤ r ≤ x, and the limits for θ will be 0 ≤ θ ≤ π/4.

Therefore, the double integral can be written as:

Area = ∫(θ=0 to π/4) ∫(r=0 to x) r dr dθ

To evaluate this integral, integrate with respect to r first and then with respect to θ.

∫(r=0 to x) r dr = 1/2 x²

Substituting this result into the double integral:

Area = ∫(θ=0 to π/4) (1/2 x²) dθ

Now, integrate with respect to θ:

Area = 1/2 ∫(θ=0 to π/4) x² dθ

The limits of integration are 0 to π/4.

Evaluating this integral:

Area = 1/2 [x² θ] (θ=0 to π/4)

Area = 1/2 [x² (π/4) - x² (0)]

Area = π/8 x²

Therefore, the area of the surface given by z = f(x, y) that lies above the region R is π/8 x².

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The correct choices are:

A. A local minimum occurs at (0, 1).

The local minimum value is undefined.

B. There are no local maxima.

A. A saddle point occurs at (0, 1).

In mathematics, a function is a unique arrangement of the inputs (also referred to as the domain) and their outputs (sometimes referred to as the codomain), where each input has exactly one output and the output can be linked to its input.

To find the local maxima, local minima, and saddle points of the function f(x, y) = xy - x', we need to calculate the partial derivatives with respect to x and y and find the critical points.

Partial derivative with respect to x:

∂f/∂x = y - 1

Partial derivative with respect to y:

∂f/∂y = x

Setting both partial derivatives equal to zero, we have:

y - 1 = 0  --> y = 1

x = 0

So, the critical point is (0, 1).

To determine the nature of this critical point, we can use the second partial derivative test. Let's calculate the second partial derivatives:

∂²f/∂x² = 0

∂²f/∂y² = 0

∂²f/∂x∂y = 1

The discriminant of the Hessian matrix is:

D = (∂²f/∂x²)(∂²f/∂y²) - (∂²f/∂x∂y)² = (0)(0) - (1)² = -1

Since the discriminant is negative, we have a saddle point at the critical point (0, 1).

Therefore, the correct choices are:

A. A local minimum occurs at (0, 1).

The local minimum value is undefined.

B. There are no local maxima.

A. A saddle point occurs at (0, 1).

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System consists of three equations with three variables: 8x - 3y + 5z = 9, 4x + 3y - z = -32, and 14x + 9y = 14. We will represent system in matrix form, perform row operations to eliminate variables, and find values of x, y, and z.

We will represent the given system of equations in matrix form as follows:

[8 -3 5 | 9]

[4 3 -1 | -32]

[14 9 0 | 14]

Performing row operations, we aim to reduce the matrix to its row-echelon form:

Replace R2 with R2 - (2*R1) to eliminate x in the second equation.

Replace R3 with R3 - (7*R1) to eliminate x in the third equation.

[8 -3 5 | 9]

[0 9 -11 | -50]

[0 30 -35 | -49]

Replace R3 with R3 - (3*R2) to eliminate y in the third equation.

[8 -3 5 | 9]

[0 9 -11 | -50]

[0 0 4 | 1]

Now, we have obtained the row-echelon form of the matrix. From the last row, we can determine the value of z: z = 1/4.

Substituting z = 1/4 into the second row, we find: 9y - 11(1/4) = -50.

Simplifying the equation, we get: 9y - 11/4 = -50.

Solving for y, we have: y = -221/36.

Substituting the values of y and z into the first row, we find: 8x - 3(-221/36) + 5(1/4) = 9.

Simplifying the equation, we get: 8x + 221/12 + 5/4 = 9.

Solving for x, we have: x = 157/96.

Therefore, the solution to the system of equations is x = 157/96, y = -221/36, and z = 1/4.

Since the system has a unique solution, it is consistent.

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The plane determined by the intersecting lines L1 and L2 can be found by taking the cross product of the direction vectors of the lines. Using the coefficient of -1 for x, the equation of the plane is -x - y + 6z = -6.

The given lines L1 and L2 are expressed in parametric form. For L1: x = -1 + t, y = 2 + 4t, z = 1 - 3t. For L2: x = 1 - 4s, y = 1 + 2s, z = 2 - 2s.

To find the direction vectors of the lines, we can take the coefficients of t and s in the parametric equations. For L1, the direction vector is <1, 4, -3>. For L2, the direction vector is <-4, 2, -2>.

Next, we find the cross product of the direction vectors to obtain the normal vector of the plane. Taking the cross product, we have:

<1, 4, -3> x <-4, 2, -2> = <8, -5, -12>.

Using the coefficient of -1 for x, we can write the equation of the plane as -x - y + 6z = -6. This is obtained by taking the dot product of the normal vector <8, -5, -12> and the vector <x, y, z> representing a point on the plane, and setting it equal to the dot product of the normal vector and another point on the plane (e.g., the point (-1, 2, 1) that lies on line L1).

Hence, the equation of the plane is -x - y + 6z = -6.

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25% of the kids are older than Evie.

To find the percentage of kids older than Evie, we need to determine the total number of kids who are older than 9 and divide it by the total number of kids (20), then multiply by 100.

The number of kids older than 9 is the sum of the kids who are 10 and 12 years old: 4 + 1 = 5.

Now we can calculate the percentage:

Percentage = (Number of kids older than 9 / Total number of kids) * 100

Percentage = (5 / 20) × 100

Percentage = 25%

Therefore, 25% of the kids are older than Evie.

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since the terms of Σ (9 - 7n) approach negative infinity as n increases, the series is divergent.

What are divergent and convergent?

A sequence is said to be convergent if the terms of the sequence approach a specific value or limit as the index of the sequence increases. In other words, the terms of a convergent sequence get arbitrarily close to a finite value as the sequence progresses. For example, the sequence (1/n) is convergent because as n increases, the terms approach zero.

a sequence is said to be divergent if the terms of the sequence do not approach a finite limit as the index increases. In other words, the terms of a divergent sequence do not converge to a specific value. For example, the sequence (n) is divergent because as n increases, the terms grow without bounds.

To determine whether the series [tex]\sum(n - 8n + 17)[/tex] is convergent or divergent, we need to analyze the behavior of the terms as n approaches infinity.

The given series can be rewritten as [tex]\sum (9 - 7n).[/tex] Let's consider the terms of this series:

Term 1: When n = 1, the term is[tex]9 - 7(1) = 2[/tex].

Term 2: When n = 2, the term is[tex]9 - 7(2) = -5.[/tex]

Term 3: When n = 3, the term is[tex]9 - 7(3) = -12.[/tex]

From this pattern, we observe that the terms of the series are decreasing without bound as n increases. In other words, as n approaches infinity, the terms become more and more negative.

When the terms of a series do not approach zero as n approaches infinity, the series is divergent. In this case, since the terms of [tex]\sum(9 - 7n)[/tex]approach negative infinity as n increases, the series is divergent.

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The price per square foot in dollars of prime space in a big city from 2010 through 2015 was highest around the year 2011 (when t ≈ 0.87), and lowest around the year 2014 (when t ≈ 3.41).

The given function R(t) = -0.509t³ +2.604t² + 5.067t + 236.5 represents the price per square foot in dollars of prime space in a big city from 2010 through 2015, where t represents the time in years (0 ≤ t ≤ 5).

Taking the derivative of R(t) with respect to t, we get:

R'(t) = -1.527t² + 5.208t + 5.067

Setting R'(t) equal to zero and solving for t, we get two critical points: t ≈ 0.87 and t ≈ 3.41. We can use the second derivative test to determine the nature of these critical points.

Taking the second derivative of R(t) with respect to t, we get:

R''(t) = -3.054t + 5.208

At t = 0.87, R''(t) is negative, which means that R(t) has a local maximum at that point. At t = 3.41, R''(t) is positive, which means that R(t) has a local minimum at that point.

The price per square foot in dollars of prime space in a big city from 2010 through 2015 is approximated by the function R(t) = -0.509t³ +2.604t² + 5.067t + 236.5 (0 ≤ t ≤ 5).

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The test statistic for the significance test is calculated as 3.6.

To determine if there is convincing evidence that the mean height of five-year-old children in this city is greater than 42.5 inches, we can perform a hypothesis test.

The null hypothesis, denoted as [tex]H_0[/tex], assumes that the mean height is equal to 42.5 inches, while the alternative hypothesis, denoted as [tex]H_a[/tex], assumes that the mean height is greater than 42.5 inches.

Using the given sample data, we can calculate the test statistic.

The sample mean height is 44.1 inches, and the standard deviation is 3.5 inches.

Since the population standard deviation is unknown, we can use a t-test.

The formula for the t-test statistic is given by (sample mean - hypothesized mean) / (sample standard deviation / √n).

Plugging in the values, we have (44.1 - 42.5) / (3.5 / √40) ≈ 3.6.

This test statistic measures how many standard deviations the sample mean is away from the hypothesized mean under the assumption of the null hypothesis.

To determine if the data provides convincing evidence, we compare the test statistic to the critical value corresponding to the significance level chosen for the test.

If the test statistic exceeds the critical value, we reject the null hypothesis in favor of the alternative hypothesis, providing evidence that the mean height of five-year-old children in this city is greater than 42.5 inches.

Without specifying the chosen significance level, we cannot definitively state if the data provides convincing evidence.

However, if the test statistic of 3.6 exceeds the critical value for a given significance level, we can conclude that the data provides convincing evidence at that specific level.

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(a) The coordinates of the two focal points of the ellipse x^2/9 + y^2/25 = 1 are (-4, 0) and (4, 0).

(b) The eccentricity of the ellipse is √(1 - b^2/a^2) = √(1 - 25/9) = √(16/9) = 4/3.

(a) The general equation of an ellipse centered at the origin is x^2/a^2 + y^2/b^2 = 1, where a is the semi-major axis and b is the semi-minor axis. Comparing this with the given equation x^2/9 + y^2/25 = 1, we can see that a^2 = 9 and b^2 = 25. Therefore, the semi-major axis is a = 3 and the semi-minor axis is b = 5. The focal points are located along the major axis, so their coordinates are (-c, 0) and (c, 0), where c is given by c^2 = a^2 - b^2. Plugging in the values, we find c^2 = 9 - 25 = -16, which implies c = ±4. Therefore, the coordinates of the focal points are (-4, 0) and (4, 0).

(b) The eccentricity of an ellipse is given by e = √(1 - b^2/a^2). Plugging in the values of a and b, we have e = √(1 - 25/9) = √(16/9) = 4/3. This represents the ratio of the distance between the center and either focal point to the length of the semi-major axis. In this case, the eccentricity of the ellipse is 4/3.


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