Find the relative maximum and minimum values. 2 2 f(x,y) = x² + y² = x² + y² - 6x +10y - 9 Select the correct choice below and, if necessary, fill in the answer boxes to complete your choice. A. The function has a relative maximum value of f(x,y) = at (x,y) = (Simplify your answers. Type exact answers. Type an ordered pair in the second answer box.) B. The function has no relative maximum value.

The value of the integral ∫(4r / √(14+2r^2)) dr is 2√(14+2r^2) + C.

To evaluate the integral ∫(4r / √(14+2r^2)) dr, we can use the substitution method. Let's make the substitution u = 14 + 2r^2. To find the differential du, we take the derivative of u with respect to r: du = 4r dr. Rearranging this equation, we have dr = du / (4r).

Substituting the values into the integral, we get: ∫(4r / √(14+2r^2)) dr = ∫(du / √u).

Now, the integral becomes ∫(1 / √u) du. We can simplify this integral by using the power rule of integration, which states that the integral of x^n dx equals (x^(n+1) / (n+1)) + C, where C is the constant of integration.

Applying the power rule, we have: ∫(1 / √u) du = 2√u + C. Substituting the original variable back in, we have:2√(14+2r^2) + C. Therefore, the value of the integral ∫(4r / √(14+2r^2)) dr is 2√(14+2r^2) + C.

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The exact arc length of the curve over the interval [1, 4] is 11/24.

To find the arc length of the given curve y = ((x + 2)/2)^4 + 1/(2(x + 2)^2) over the interval [1, 4], we can use the arc length formula for a function f(x) on the interval [a, b]:

L = ∫[a,b] √(1 + (f'(x))^2) dx

First, let's find the derivative of the function y = ((x + 2)/2)^4 + 1/(2(x + 2)^2):

y' = 4((x + 2)/2)^3 * (1/2) + (-1)(1/(2(x + 2)^2))^2 * 2/(x + 2)^3

= 2(x + 2)^3/16 - 1/(2(x + 2)^3)

= (2(x + 2)^6 - 8)/(16(x + 2)^3)

Now, we can substitute the derivative into the arc length formula and evaluate the integral:

L = ∫[1,4] √(1 + ((2(x + 2)^6 - 8)/(16(x + 2)^3))^2) dx

Simplifying the integrand:

L = ∫[1,4] √(1 + ((2(x + 2)^6 - 8)/(16(x + 2)^3))^2) dx

= ∫[1,4] √(1 + (2(x + 2)^6 - 8)^2/(16^2(x + 2)^6)) dx

= ∫[1,4] √(1 + (2(x + 2)^6 - 8)^2/256(x + 2)^6) dx

= ∫[1,4] √((256(x + 2)^6 + (2(x + 2)^6 - 8)^2)/(256(x + 2)^6)) dx

= ∫[1,4] √((256(x + 2)^6 + 4(x + 2)^12 - 32(x + 2)^6 + 64)/(256(x + 2)^6)) dx

= ∫[1,4] √((4(x + 2)^12 + 224(x + 2)^6 + 64)/(256(x + 2)^6)) dx

= ∫[1,4] √((4(x + 2)^6 + 8)^2/(256(x + 2)^6)) dx

= ∫[1,4] (4(x + 2)^6 + 8)/(16(x + 2)^3) dx

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

= 1/4 ∫[1,4] (1 + 2/(x + 2)^3) dx

Now, we can integrate the expression:

L = 1/4 ∫[1,4] (1 + 2/(x + 2)^3) dx

= 1/4 [x + -1/(x + 2)^2] | [1,4]

= 1/4 [(4 + -1/6) - (1 + -1/3)]

= 1/4 (4 - 1/6 - 1 + 1/3)

= 1/4 (12/3 - 1/6 - 6/6 + 2/6)

= 1/4 (12/3 - 5/6)

= 1/4 (8/2 - 5/6)

= 1/4 (16/4 - 5/6)

= 1/4 (11/6)

= 11/24

Therefore, 11/24 is the exact arc length of the curve over the interval [1, 4].

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(u, v) ≥ -1. The inner product of two unit vectors can't be less than -1.Therefore, the answer is option a. No.

Given: V is an inner product space, and let u, v E V be unit vectors.

We need to determine if it is possible that (u, v) < -1.

Answer: a. NoIt is not possible that (u, v) < -1.

The inner product of two vectors lies between -1 and 1, inclusive. We can prove it as follows:

Since u, v are unit vectors, we have:|u| = ||u|| = √(u, u) = 1|v| = ||v|| = √(v, v) = 1

Also,(u - v)² ≥ 0(u, u) - 2(u, v) + (v, v) ≥ 0 1 - 2(u, v) + 1 ≥ 0 (u, v) ≤ 1

Hence, (u, v) ≥ -1. The inner product of two unit vectors can't be less than -1.

Therefore, the answer is option a. No.

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(a) The area of parallelogram ABCD as a function of c can be found using the cross product of the vectors AB and AD. The magnitude of the cross product gives the area of the parallelogram.

(b) For c = -2, the parametric equations of the line passing through D and perpendicular to the parallelogram ABCD can be determined by finding the direction vector of the line, which is orthogonal to the normal vector of the parallelogram, and using the point D as the initial point.

(a) To find the area of parallelogram ABCD, we first calculate the vectors AB = B - A and AD = D - A. Then, we take the cross product of AB and AD to obtain the normal vector of the parallelogram. The magnitude of the cross product gives the area of the parallelogram as a function of c.

(b) To find the parametric equations of the line passing through D and perpendicular to the parallelogram ABCD, we use the normal vector of the parallelogram as the direction vector of the line. We start with the point D and add t times the direction vector to get the parametric equations, where t is a parameter representing the distance along the line. For c = -2, we substitute the value of c into the normal vector to obtain the specific direction vector for this case.

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The directional derivative duf at the point (3, 4) for the function f(x, y) = x² + y², with u being the unit vector in the same direction as (1, -1), is -sqrt(2).

to evaluate the directional derivative, denoted as duf, of the function f(x, y) = x² + y² at the point (3, 4), where u is the unit vector in the same direction as (1, -1), we need to find the dot product between the gradient of f at the given point and the unit vector u.

let's calculate it step by step:

step 1: find the gradient of f(x, y).

the gradient of f(x, y) is given by the partial derivatives of f with respect to x and y. let's calculate them:

∂f/∂x = 2x

∂f/∂y = 2yso, the gradient of f(x, y) is ∇f(x, y) = (2x, 2y).

step 2: normalize the vector (1, -1) to obtain the unit vector u.

to normalize the vector (1, -1), we divide it by its magnitude:

u = sqrt(1² + (-1)²) = sqrt(1 + 1) = sqrt(2)

u = (1/sqrt(2), -1/sqrt(2)) = (sqrt(2)/2, -sqrt(2)/2)

step 3: evaluate duf at the point (3, 4).

to find the directional derivative, we take the dot product of the gradient ∇f(3, 4) = (6, 8) and the unit vector u = (sqrt(2)/2, -sqrt(2)/2):

duf = ∇f(3, 4) · u = (6, 8) · (sqrt(2)/2, -sqrt(2)/2)

= (6 * sqrt(2)/2) + (8 * -sqrt(2)/2)

= 3sqrt(2) - 4sqrt(2)

= -sqrt(2)

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The consumer's surplus for one unit of the item is $1,872, representing the additional value gained by consumers when purchasing the item at a price below the equilibrium price.

To find the consumer's surplus, we need to calculate the area between the demand curve and the equilibrium price line. The demand function D(x) = 2,000 - 3x represents the relationship between the price and quantity demanded. The equilibrium price of $125 indicates the price at which the quantity demanded is equal to one unit. By evaluating the consumer's surplus, we can determine the additional value consumers receive from purchasing the item at a price lower than the equilibrium price. To calculate the consumer's surplus, we need to find the area between the demand curve and the equilibrium price line. In this case, the equilibrium price is $125, and we want to find the consumer's surplus for one unit of the item. The consumer's surplus represents the difference between the maximum price a consumer is willing to pay (indicated by the demand function) and the actual price paid (equilibrium price). To calculate the consumer's surplus, we first find the maximum price a consumer is willing to pay by substituting x = 1 (quantity demanded is one unit) into the demand function:

D(1) = 2,000 - 3(1) = 2,000 - 3 = 1,997

The consumer's surplus is then calculated as the difference between the maximum price a consumer is willing to pay and the actual price paid:

Consumer's Surplus = Maximum price - Actual price

= 1,997 - 125

= 1,872

Therefore, the consumer's surplus is $1,872, indicating the additional value consumers receive from purchasing the item at a price lower than the equilibrium price.

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a) To determine the demand function, let's assume that the motel has 100 rooms in total. If they charge $65 per night for a room, then their total revenue for a fully occupied motel would be:

Total Revenue = Price x Quantity

Total Revenue = $65 x 100

Total Revenue = $6,500

Now let's say they increase their price to $70 per night. Let's assume that at $70 per night, only 90 rooms are occupied. Then their total revenue would be:

Total Revenue = Price x Quantity

Total Revenue = $70 x 90

Total Revenue = $6,300

Repeating this process for different price points;

| Price | Quantity |

| 65 | 100 |

| 70 | 90 |

| 75 | 80 |

| 80 | 70 |

| 85 | 60 |

| 90 | 50 |

Using this data, we can estimate the demand function using linear regression:

Quantity = a - b x Price, where "a" is the intercept and "b" is the slope. Using Excel or a similar tool, we can calculate these values as:

a = 145

b = 2

Therefore, the demand function for this motel is:

Quantity = 145 - 2 x Price

To find out what price will maximize revenue, we need to differentiate the revenue function with respect to price and set it equal to zero:

Revenue = Price x Quantity

Revenue = Price (145 - 2 x Price)

dRevenue/dPrice = 145 - 4 x Price

Setting dRevenue/dPrice equal to zero and solving for Price, we get:

145 - 4 x Price = 0

Price = 36.25

Therefore, the price that maximizes revenue is $36.25 per night. To find out how many rooms will be occupied at this price point, substitute demand function:

Quantity = 145 - 2 x Price

Quantity = 145 - 2 x 36.25

Quantity = 72.5

Therefore, at a price of $36.25 per night, approximately 73 rooms will be occupied.

b) To calculate the revenue when marginal revenue is zero, we need to find the price that corresponds to this condition. Marginal revenue is the derivative of total revenue with respect to quantity:

Marginal Revenue = dRevenue/dQuantity

We know that marginal revenue is zero when revenue is maximized, so we can use the price we found in part a) to calculate revenue:

Revenue = Price x Quantity

Revenue = $36.25 x 72.5

Revenue = $2,625.63

Therefore, when marginal revenue is zero, the motel's revenue is approximately $2,625.63.

c) The sign of the derivative of marginal revenue with respect to quantity tells us whether revenue is increasing or decreasing as quantity increases. If the derivative is positive, then revenue is increasing; if it's negative, then revenue is decreasing; and if it's zero, then revenue is at a maximum or minimum point.

To find the derivative of marginal revenue with respect to quantity, we need to differentiate the demand function twice:

Quantity = 145 - 2 x Price

dQuantity/dPrice = -2

d^2Quantity/dPrice^2 = 0

Using these values, we can calculate the derivative of marginal revenue with respect to quantity as:

dMarginal Revenue/dQuantity = -2 x (d^2Revenue/dQuantity^2)

Since d^2Revenue/dQuantity^2 is zero, we know that dMarginal Revenue/dQuantity is also zero. Therefore, revenue is at a maximum point when marginal revenue is zero.

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(a) f(z) = (z)/(1 - z) is function f(z) with pole of order 1 at z = 1 (b)  an = [tex]1/(2πi) ∮C 1/(z-1) (z-1)n dz[/tex], bn = [tex]1/(2πi) ∮C 1/z (z-1)n dz[/tex] for the laurent series.

Laurent series: Laurent series are expansions of functions in power series about singularities.

Functions: Functions are the rule or set of rules that one needs to follow to map each element of one set with another set. Expand the given functions by the Laurent series.

a. f(z) = in the range of (a) 0 < 1z< 1; (b) 121 > 1Solution: The given function is f(z) = and the range is given as (a) 0 < |z| < 1 and (b) 1 < |z| < 21. Consider range (a), we can rewrite the given function f(z) as below: f(z) = (z)/(1 - z)The given function f(z) has a pole of order 1 at z = 1.

Therefore, Laurent series of f(z) in the range (a) 0 < |z| < 1 is given as below: [tex]f(z) = ∞∑n=0zn = 1+z+z2+... . . . (1)[/tex]  Consider range (b), we can rewrite the given function f(z) as below:f(z) = (1/z) - (1/(z-1))The given function f(z) has a pole of order 1 at z = 0 and a pole of order 1 at z = 1.

Therefore, Laurent series of f(z) in the range (b) 1 < |z| < 21 is given as below: f(z) =[tex]∞∑n=1an(z-1)n + ∞∑n=0bn(z-1)n . .[/tex]. (2) We can find out the coefficients an and bn as below: [tex]an = 1/(2πi) ∮C 1/(z-1) (z-1)n dz bn = 1/(2πi) ∮C 1/z (z-1)n dz[/tex]where C is a closed contour inside the region 1 < |z| < 2.

So, the coefficients an and bn are given as below:[tex]an = 1/(2πi) ∮C 1/(z-1) (z-1)n dzan = (1/2πi) 2πi (1/(n-1)) = -1/(n-1)bn = 1/(2πi) ∮C 1/z (z-1)n dzbn = (1/2πi) 2πi = 1[/tex] Thus, the Laurent series of f(z) in the range (b) 1 < |z| < 21 is given as below:

[tex]f(z) = ∞∑n=1(-1/(n-1))(z-1)n + ∞∑n=0(z-1)n = -1 - (1/(z-1)) + z + z2 + ... . . . (3)[/tex] Therefore, the Laurent series of the given function is as follows:(a) In the range of 0 < |z| < 1: [tex]f(z) = ∞∑n=0zn = 1+z+z2+... . . . (1)[/tex] (b) In the range of 1 < |z| < 21: [tex]f(z) = ∞∑n=1(-1/(n-1))(z-1)n + ∞∑n=0(z-1)n = -1 - (1/(z-1)) + z + z2 + ... . . . (3)[/tex].

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the lines with symmetric equations *73 - 972-25 and Item - 24 are not the same, and so does x- 4 X+1 + 9 -14 = -3.

To determine if the lines with symmetric equations 73 - 972-25 and Item - 24 are the same, we need to convert them into Cartesian equations.

For 73 - 972-25, we have:

x = 7
y = 3

For Item - 24, we have:

x = -2
y = 4

So these two lines have different Cartesian equations and therefore are not the same.

As for the second part of the question, the symmetric equation x-4 X+1 + 9-14 = -3 can be simplified to:

x - 3 = 0

This is the equation of a vertical line passing through the point (3, 0). So it is not the same as the first two lines we considered.

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Part A: the probability that a cow produces between 2.0 and 2.5 gallons is approximately 0.6826.

Part B: To calculate the probability that the total volume for one milking session for 20 cows exceeds 50 gallons, we need additional information about the correlation or independence of the milk volumes of the 20 cows.

Part A: To calculate the probability that a randomly selected cow produces between 2.0 and 2.5 gallons in a single milking session, we can use the normal distribution. We calculate the z-scores for the lower and upper bounds and then find the area under the curve between these z-scores. Using the mean of 2.3 gallons and standard deviation of 0.96 gallons, we can calculate the z-scores as (2.0 - 2.3) / 0.96 = -0.3125 and (2.5 - 2.3) / 0.96 = 0.2083, respectively. By looking up these z-scores in the standard normal distribution table or using a calculator, we can find the corresponding probabilities.

Part B: To calculate the probability that the total volume for one milking session for 20 cows exceeds 50 gallons, we need to consider the distribution of the sum of 20 independent normally distributed random variables. We can use the properties of the normal distribution to find the mean and standard deviation of the sum of these variables and then calculate the probability using the normal distribution.

Part C: Yes, we needed to know that the population distribution of milk volumes per milking session was normal in order to complete Parts A and B. The calculations in both parts rely on the assumption of a normal distribution to determine the probabilities. If the distribution were not normal, different methods or assumptions would be required to calculate the probabilities accurately.

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The general solution to the given system is x(t) = c₁e^(2t)[-1, 2] + c₂te^(2t)[-1, 2], where c₁ and c₂ can be any constants.

The given system is represented by the matrix equation x'(t) = AX(t), where A is the coefficient matrix. In order to find the eigenvectors, we need to solve the characteristic equation det(A - λI) = 0, where λ is the eigenvalue and I is the identity matrix.

In this case, the characteristic equation becomes:

det(A - λI) = det([[8-λ, -6], [20, 4-λ]]) = (8-λ)(4-λ) - (-6)(20) = (λ-2)(λ-10) = 0

The eigenvalues are λ₁ = 2 and λ₂ = 10. Since there is a repeated eigenvalue, we need to find the corresponding eigenvector(s) using the eigenvector equation (A - λI)v = 0.

For λ₁ = 2:

(A - 2I)v₁ = [[8-2, -6], [20, 4-2]]v₁ = [[6, -6], [20, 2]]v₁ = 0

Solving this system of equations yields the eigenvector v₁ = [-1, 2].

Now, we can construct the general solution using the formula x(t) = c₁e^(λ₁t)v₁ + c₂te^(λ₁t)v₁, where c₁ and c₂ are constants.

Therefore, the general solution to the given system is x(t) = c₁e^(2t)[-1, 2] + c₂te^(2t)[-1, 2], where c₁ and c₂ can be any constants.

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The integral [(5x3+7x+13) sin( 2 x) dx is -1/2 (5x³ + 7x + 13) cos(2x) + 1/2 (15x² + 7) sin(2x) - 15/8 sin(2x) + C

The integral ∫[(5x³ + 7x + 13)sin(2x)] dx, we can use integration by parts. The integration by parts formula states

∫[u dv] = uv - ∫[v du]

Let's assign u and dv as follows: u = (5x³ + 7x + 13) dv = sin(2x) dx

Taking the derivatives, we have: du = (15x² + 7) dx v = -1/2 cos(2x)

Now we can apply the integration by parts formula:

∫[(5x³ + 7x + 13)sin(2x)] dx = -1/2 (5x³ + 7x + 13) cos(2x) - ∫[-1/2 cos(2x)(15x² + 7) dx]

Simplifying the expression, we get:

∫[(5x³ + 7x + 13)sin(2x)] dx = -1/2 (5x³ + 7x + 13) cos(2x) + 1/2 ∫[cos(2x)(15x² + 7) dx]

Now we need to integrate the second term on the right side. We can again use integration by parts:

Let's assign u and dv as follows: u = (15x² + 7) dv = cos(2x) dx

Taking the derivatives, we have: du = (30x) dx v = 1/2 sin(2x)

Applying the integration by parts formula again, we get:

1/2 ∫[cos(2x)(15x² + 7) dx] = 1/2 (15x² + 7) sin(2x) - 1/2 ∫[sin(2x)(30x) dx]

Simplifying further, we have:

1/2 ∫[cos(2x)(15x^2 + 7) dx] = 1/2 (15x² + 7) sin(2x) - 1/2 ∫[sin(2x)(30x) dx]

Now we have a new integral to evaluate, but notice that it is similar to the original integral. We can use integration by parts once more to evaluate this integral:

Let's assign u and dv as follows:

u = 30x

dv = sin(2x) dx

Taking the derivatives, we have: du = 30 dx v = -1/2 cos(2x)

Applying the integration by parts formula again, we get:

-1/2 ∫[sin(2x)(30x) dx] = -1/2 (30x)(-1/2 cos(2x)) - 1/2 ∫[(-1/2 cos(2x))(30) dx]

-1/2 ∫[sin(2x)(30x) dx] = 15x cos(2x) + 15/4 ∫[cos(2x) dx]

15/4 ∫[cos(2x) dx] = 15/4 (1/2 sin(2x))

∫[(5x^3 + 7x + 13)sin(2x)] dx = -1/2 (5x³ + 7x + 13) cos(2x) + 1/2 (15x² + 7) sin(2x) - 15/8 sin(2x) + C

where C is the constant of integration.

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y = 3sin(x): Period = 2π, Phase shift = 0, Amplitude = 3, Vertical shift = 0

y = sin(3x): Period = 2π/3, Phase shift = 0, Amplitude = 1, Vertical shift = 0

y = -2cos(x): Period = 2π, Phase shift = 0, Amplitude = 2, Vertical shift = 0

y = cos(5x): Period = 2π/5, Phase shift = 0, Amplitude = 1, Vertical shift = 0

For y = 3sin(x), the period is 2π, meaning it completes one cycle in 2π units. There is no phase shift (0), and the amplitude is 3, which determines the vertical stretch or compression of the graph. The vertical shift is 0, indicating no upward or downward shift from the x-axis.

For y = sin(3x), the period is shortened to 2π/3, indicating a faster oscillation. There is no phase shift (0), and the amplitude remains 1. The vertical shift is 0.

For y = -2cos(x), the period is 2π, same as the regular cosine function. There is no phase shift (0), and the amplitude is 2, determining the vertical stretch or compression. The vertical shift is 0.

For y = cos(5x), the period is shortened to 2π/5, indicating a faster oscillation. There is no phase shift (0), and the amplitude remains 1. The vertical shift is 0.


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(a) The derivative of [tex]f(x) = 2x tan(1/e)[/tex]is obtained using the chain rule. The derivative is[tex]f'(x) = 2 tan(1/e) + 2x sec^2(1/e) * (-1/e^2).[/tex]

To find the derivative of f(x) = 2x tan(1/e), we apply the chain rule. The chain rule states that if we have a function of the form f(g(x)), the derivative is given by[tex]f'(g(x)) * g'(x).[/tex]

In this case, g(x) = 1/e, so g'(x) = 0 since 1/e is a constant. The derivative of tan(x) is sec^2(x), so we have f'(x) = 2 tan(1/e) + 2x sec^2(1/e) * g'(x). Since g'(x) = 0, the second term disappears, leaving us with f'(x) = 2 tan(1/e).

(b) The derivative of f(x) = cos(x) + 1 is obtained using the derivative rules. The derivative is f'(x) = -sin(x).

Explanation:

The derivative of cos(x) is -sin(x) according to the derivative rules. Since 1 is a constant, its derivative is 0. Therefore, the derivative of f(x) = cos(x) + 1 is f'(x) = -sin(x).

(c) The derivative of [tex]y = sin(2x) + tan(x + 1)[/tex] is obtained using the derivative rules. The derivative is [tex]y' = 2cos(2x) + sec^2(x + 1).[/tex]

Explanation:

To find the derivative of y = sin(2x) + tan(x + 1), we apply the derivative rules. The derivative of sin(x) is cos(x), and the derivative of tan(x) is sec^2(x).

For the first term, sin(2x), we use the chain rule. The derivative of sin(u) is cos(u), and since u = 2x, the derivative is cos(2x).

For the second term, tan(x + 1), the derivative is sec^2(x + 1) since the derivative of tan(x) is sec^2(x).

Combining these two derivatives, we get [tex]y' = 2cos(2x) + sec^2(x + 1)[/tex] as the derivative of[tex]y = sin(2x) + tan(x + 1).[/tex]

(d) It seems there is a typo or a formatting issue in the provided function [tex]f(x) = tan(x) + In(+1)[/tex] 1. Please clarify the function, and I will be happy to help you with its derivative.

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The profit function is P(x) = 17x - 90 - 0.1x.

The given function of total revenue is R(x) = 47x, and the total cost function is C(x) = 90 + 30x + 0.1x.

We can calculate profit as the difference between total revenue and total cost. So, the profit function P(x) can be expressed as follows: P(x) = R(x) - C(x)

Now, substituting R(x) and C(x) in the above equation, we have: P(x) = 47x - (90 + 30x + 0.1x)P(x) = 47x - 90 - 30x - 0.1xP(x) = 17x - 90 - 0.1x

Let's check the expression for profit: When x = 0, P(x) = 17(0) - 90 - 0.1(0) = -90 When x = 100, P(x) = 17(100) - 90 - 0.1(100) = 1610 - 90 - 10 = 1510

Therefore, the profit function is P(x) = 17x - 90 - 0.1x.

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The area that lies inside the curve r=3cosθ and outside the curve r=1+cosθ is [tex]A = \frac{3\sqrt3}{2} - \frac{4\pi}{3}[/tex]  square units.

What is the trigonometric ratio?

the trigonometric functions are real functions that relate an angle of a right-angled triangle to ratios of two side lengths. They are widely used in all sciences that are related to geometry, such as navigation, solid mechanics, celestial mechanics, geodesy, and many others.

To find the area that lies inside the curve r=3cosθ and outside the curve r=1+cosθ, we need to determine the limits of integration for θ and set up the integral for calculating the area.

First, let's plot the two curves to visualize the region:

The curves intersect at two points: θ= π/3 and θ= 5π/3.

To find the limits of integration for θ, we need to determine the values where the two curves intersect. By setting the two equations equal to each other:

3cosθ=1+cosθ

Simplifying:

2cosθ=1

cosθ= 1/2

​

The values of θ where the curves intersect are

θ= π/3 and θ= 5π/3.

To find the area, we'll integrate the difference of the outer curve equation squared and the inner curve equation squared with respect to θ, using the limits of integration from θ= π/3 and θ= 5π/3.

The area can be calculated using the following integral:

[tex]A=\int\limits^{5\pi/3}_{\pi/3} ((3cos\theta)^2 - (1+cos\theta)^2)d\theta[/tex]

Let's simplify and calculate this integral:

[tex]A=\int\limits^{5\pi/3}_{\pi/3} ((8cos^2\theta - 2cos\theta -1)^2)d\theta[/tex]

Now we can integrate this expression:

[tex]A=[ 8/3 sin\theta - sin2\theta) -\theta ]^{5\pi/3}_{\pi/3}[/tex]

Substituting the limits of integration:

[tex]A= ( 8/3 sin(5\pi/3) - sin(10\pi/3) - (5\pi/3) - ( 8/3 sin(\pi/3) - sin(2\pi/3) - (\pi/3)[/tex]

Simplifying the trigonometric values:

[tex]A= ( 8/3 \cdot \sqrt3 /2 - (-\sqrt3 /2) - (5\pi/3) - ( 8/3 \cdot \sqrt3 /2 - \sqrt3 /2 - (\pi/3)[/tex]

[tex]A = \frac{3\sqrt3}{2} - \frac{4\pi}{3}[/tex]

Therefore, the area that lies inside the curve r=3cosθ and outside the curve r=1+cosθ is [tex]A = \frac{3\sqrt3}{2} - \frac{4\pi}{3}[/tex]  square units.

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(i)The solution of the integral ∫√x dx * 3x^21+1 is 6x^(43/2) + C.

(ii)The result of the integral ∫(x^2)/(√(1 + 2x)) dx is (-1/3)(1 + 2x)^(3/2) + √(1 + 2x) + C.

(iii) The result of the integral ∫m^2(et – e^(-t)) dt is m^2 * et - m^2 * e^(-t) + C.

i. ∫√x dx

To solve this integral, we can use the power rule for integration:

∫x^n dx = (x^(n+1))/(n+1) + C

Applying the power rule with n = 1/2, we have:

∫√x dx = (2/3)x^(3/2) + C

Multiplying this result by the expression 3x^21+1, we get:

∫√x dx * 3x^21+1 = (2/3)x^(3/2) * 3x^21+1 + C

Simplifying the expression, we have:

2x^(3/2) * x^21 * 3 + C = 6x^(3/2 + 21) + C = 6x^(43/2) + C

Therefore, the result of the integral ∫√x dx * 3x^21+1 is 6x^(43/2) + C.

ii. ∫(x^2)/(√(1 + 2x)) dx

To solve this integral, we can substitute a variable to simplify the expression. Let's substitute u = 1 + 2x. Then, du/dx = 2, which implies dx = (1/2)du.

Using the substitution, we can rewrite the integral as:

∫((u - 1)^2)/(√u) * (1/2) du

Expanding the numerator and simplifying, we get:

(1/2) ∫((u^2 - 2u + 1)/(√u)) du

Splitting the integral into two separate integrals, we have:

(1/2) ∫(u^2/√u) du - (1/2) ∫(2u/√u) du + (1/2) ∫(1/√u) du

Now, we can integrate each term individually:

(1/2) * (2/3)u^(3/2) - (1/2) * (4/3)u^(3/2) + (1/2) * (2√u) + C

Simplifying further, we obtain:

(1/3)u^(3/2) - (2/3)u^(3/2) + √u + C

Combining like terms, we have:

(-1/3)u^(3/2) + √u + C

Replacing u with 1 + 2x, we get the final result:

(-1/3)(1 + 2x)^(3/2) + √(1 + 2x) + C

Therefore, the result of the integral ∫(x^2)/(√(1 + 2x)) dx is (-1/3)(1 + 2x)^(3/2) + √(1 + 2x) + C.

iii. ∫m^2(et – e^(-t)) dt

To solve this integral, we can distribute the m^2 term:

∫m^2 * et dt - ∫m^2 * e^(-t) dt

For the first integral, we can directly integrate m^2 * et with respect to t:

m^2 * ∫et dt = m^2 * et + C1

For the second integral, we can integrate m^2 * e^(-t) with respect to t:

m^2 * ∫e^(-t) dt = m^2

* (-e^(-t)) + C2

Combining the results of the two integrals, we obtain:

m^2 * et - m^2 * e^(-t) + C1 - C2

Since C1 and C2 are arbitrary constants, we can combine them into a single constant C:

m^2 * et - m^2 * e^(-t) + C

Therefore, the result of the integral ∫m^2(et – e^(-t)) dt is m^2 * et - m^2 * e^(-t) + C.

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For the function f(u, v) = 5u²v - 3uv³, the value of f(1, 2) is 4. The partial derivative fu(1, 2) is 10v - 6uv² evaluated at (1, 2), resulting in 14. The partial derivative fv(1, 2) is 5u² - 9uv² evaluated at (1, 2), resulting in -13.

To find f(1, 2), we substitute u = 1 and v = 2 into the function f(u, v). Plugging in these values, we get f(1, 2) = 5(1)²(2) - 3(1)(2)³ = 10 - 48 = -38.

To find the partial derivative fu, we differentiate the function f(u, v) with respect to u while treating v as a constant. Taking the derivative, we get fu = 10uv - 6uv². Evaluating this expression at (1, 2), we have fu(1, 2) = 10(2) - 6(1)(2)² = 20 - 24 = -4.

To find the partial derivative fv, we differentiate the function f(u, v) with respect to v while treating u as a constant. Taking the derivative, we get fv = 5u² - 9u²v². Evaluating this expression at (1, 2), we have fv(1, 2) = 5(1)² - 9(1)²(2)² = 5 - 36 = -31.

Therefore, the values are:

a) f(1, 2) = -38

b) fu(1, 2) = -4

c) fv(1, 2) = -31

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The flux of the vector field F = (y, -2, 2) across the part of the plane

z = 1+ 4x + 3y above the rectangle (0, 3) x (0,4) with upwards orientation is 96 Wb.

To find the flux of the vector field F = (y, -2, 2) across the given surface, we can use the surface integral formula. The flux (Φ) of a vector field across a surface S is given by:

Φ = ∬S F · dS

where F is the vector field, dS is the outward-pointing vector normal to the surface, and the double integral is taken over the surface S.

In this case, the surface S is the part of the plane z = 1 + 4x + 3y above the rectangle (0, 3) × (0, 4).

Let's parameterize the surface S. Let's introduce two parameters u and v to represent the coordinates on the rectangle. We can define the position vector r(u, v) = ( x(u, v), y(u, v), z(u, v) ) as follows:

x(u, v) = u

y(u, v) = v

z(u, v) = 1 + 4u + 3v

Next, we calculate the partial derivatives of r(u, v) with respect to u and v:

∂r/∂u = (1, 0, 4)

∂r/∂v = (0, 1, 3)

Now, we can calculate the cross product of the partial derivatives:

∂r/∂u × ∂r/∂v = (-4, -3, 1)

The magnitude of this cross product is the area of the parallelogram defined by ∂r/∂u and ∂r/∂v, which is √((-4)^2 + (-3)^2 + 1^2) = √26.

To find the flux Φ, we integrate the dot product of F and the outward-pointing vector dS over the surface S:

Φ = ∬S F · dS = ∬S (y, -2, 2) · (∂r/∂u × ∂r/∂v) du dv

Since the outward-pointing vector is ∂r/∂u × ∂r/∂v = (-4, -3, 1), we have:

Φ = ∬S (y, -2, 2) · (-4, -3, 1) du dv

  = ∬S (-4y + 6 + 2) du dv

  = ∬S (-4y + 8) du dv

The limits of integration are u = 0 to 3 and v = 0 to 4, representing the rectangle (0, 3) × (0, 4). Therefore, the integral becomes:

Φ = ∫₀³ ∫₀⁴ (-4y + 8) dv du

Now, let's evaluate the integral:

Φ = ∫₀³ ∫₀⁴ (-4y + 8) dv du

  = ∫₀³ [-4yv + 8v]₀⁴ du

  = ∫₀³ (-16y + 32) du

  = [-16yu + 32u]₀³

  = -48y + 96

Finally, we substitute the limits of integration for y:

Φ = -48y + 96 = -48 *4  + 96 = -192 + 96 = -96

Thus, the required flux is 96 Wb

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To find the upper sum for the region bounded by the graph of f(x) = x² and the x-axis between x = 0 and x = 2, we divide the interval [0, 2] into smaller subintervals and approximate the area under the curve by using the maximum value of f(x) within each subinterval as the height of a rectangle. The upper sum is obtained by summing up the areas of all the rectangles.

We divide the interval [0, 2] into n subintervals of equal width, where n determines the number of rectangles used in the approximation. The width of each subinterval is given by (b - a)/n, where a and b are the endpoints of the interval.

In this case, the interval is [0, 2], so the width of each subinterval is (2 - 0)/n = 2/n.

To find the upper sum, we evaluate the function f(x) = x² at the right endpoint of each subinterval and use the maximum value as the height of the rectangle within that subinterval. Since f(x) = x² is an increasing function in the interval [0, 2], the maximum value of f(x) within each subinterval occurs at the right endpoint.

The upper sum is then obtained by summing up the areas of all the rectangles:

Upper Sum = Area of Rectangle 1 + Area of Rectangle 2 + ... + Area of Rectangle n

The area of each rectangle is given by the width times the height:

Area of Rectangle = (2/n) * f(right endpoint)

After evaluating f(x) at the respective right endpoints and performing the calculations, we can simplify the expression and obtain the upper sum for the region bounded by the graph of f(x) = x² and the x-axis between x = 0 and x = 2.

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Based on the recorded results, purple appeared 12 times out of a total of 55 spins. If the spinner is spun 1000 more times, we can estimate that purple would appear approximately 218 times.

In the recorded results, the spinner was spun a total of 55 times, with purple appearing 12 times. To estimate the expected frequency of purple in 1000 additional spins, we can calculate the probability of landing on purple based on the recorded frequencies. The probability of landing on purple can be calculated by dividing the frequency of purple (12) by the total number of spins (55):

Probability of landing on purple = Frequency of purple / Total number of spins = 12 / 55

We can use this probability to estimate the expected frequency of purple in the additional 1000 spins:

Expected frequency of purple = Probability of landing on purple * Total number of additional spins

≈ (12 / 55) * 1000

≈ 218

Therefore, based on this estimation, we would expect purple to appear approximately 218 times if the spinner is spun 1000 more times.

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To find the sum of each convergent series by recognizing them as Taylor series evaluated at a particular value of x.the sum of the series is sin(π/4).

we need to identify the function represented by the series and the center of the series. Then, we can use the formula for the sum of a Taylor series to find the sum.

A. Let's analyze the series:

4 - 4/3! + 4/5! - 4/7! + ...

Recognizing this series as a Taylor series, we can see that it represents the function f(x) = sin(x) evaluated at x = π/4.

The Taylor series expansion of sin(x) centered at x = π/4 is given by:

[tex]sin(x) = (x - π/4) - (1/3!)(x - π/4)^3 + (1/5!)(x - π/4)^5 - (1/7!)(x - π/4)^7 + .[/tex]

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The value of det(2A-2B7) + 2 is 50.

To determine the value of the expression det(2A-2B7) + 2, we need to consider the properties of determinants and the given information.

Determinant of a Scalar Multiple:

For any matrix A and a scalar k, the determinant of the scalar multiple kA is given by det(kA) = k^n * det(A), where n is the size of the matrix. In this case, A is a 4x4 matrix, so det(2A) = (2^4) * det(A) = 16 * 3 = 48.

Determinant of a Sum/Difference:

The determinant of the sum or difference of two matrices is the sum or difference of their determinants. Therefore, det(2A-2B7) = det(2A) - det(2B7) = 48 - det(2B7).

Singular Matrix:

A singular matrix is a square matrix whose determinant is zero. In this case, B is given as a singular matrix. Therefore, det(B) = 0.

Now, let's analyze the expression det(2A-2B7) + 2:

det(2A-2B7) + 2 = 48 - det(2B7) + 2

Since B is a singular matrix, det(B) = 0, so:

det(2A-2B7) + 2 = 48 - det(2B7) + 2 = 48 - (2^4) * det(B7) + 2

= 48 - 16 * 0 + 2 = 48 + 2 = 50.

Therefore, the value of det(2A-2B7) + 2 is 50.

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We have the partial derivatives [tex]f_x = \frac{-3x}{[(6x^{2} + 4y^{2} + 9z^{2})^{3/2}]}, f_y = \frac{-2y}{[(6x^{2} + 4y^{2} + 9z^{2})^{3/2}]}, f_z = \frac{-9z}{[(6x^{2} + 4y^{2} + 9z^{2})^{3/2}]}[/tex]

Here's the step-by-step differentiation process for finding fₓ, fᵧ, and f₂,

To find fₓ:

1. Differentiate the function with respect to x, treating y and z as constants.

  fₓ = d/dx [1/√(6x² + 4y² + 9z²)]

2. Apply the chain rule:

[tex]f_x = \frac{-1}{2}(6x^{2} + 4y^{2} + 9z^{2})^{-1/2} * \frac{d}{dx}(6x^{2} + 4y^{2} + 9z^{2})[/tex]

3. Simplify and differentiate the expression inside the square root:

[tex]f_x = \frac{-1}{2}(6x^{2} + 4y^{2} + 9z^{2})^{-1/2} * 12x[/tex]

4. Combine the terms and simplify further:

[tex]f_x = \frac{-3x}{(6x^{2} + 4y^{2} + 9z^{2})^{-3/2}}[/tex]

To find fᵧ:

1. Differentiate the function with respect to y, treating x and z as constants.

  fᵧ = d/dy [1/√(6x² + 4y² + 9z²)]

2. Apply the chain rule:

[tex]f_x = \frac{-1}{2}(6x^{2} + 4y^{2} + 9z^{2})^{-1/2} * \frac{d}{dx}(6x^{2} + 4y^{2} + 9z^{2})[/tex]

3. Simplify and differentiate the expression inside the square root:

[tex]f_x = \frac{-1}{2}(6x^{2} + 4y^{2} + 9z^{2})^{-1/2} * 8y[/tex]

4. Combine the terms and simplify further:

[tex]f_x = \frac{-2y}{(6x^{2} + 4y^{2} + 9z^{2})^{-3/2}}[/tex]

To find f₂:

1. Differentiate the function with respect to z, treating x and y as constants.

  f₂ = d/dz [1/√(6x² + 4y² + 9z²)]

2. Apply the chain rule:

[tex]f_x = \frac{-1}{2}(6x^{2} + 4y^{2} + 9z^{2})^{-1/2} * \frac{d}{dx}(6x^{2} + 4y^{2} + 9z^{2})[/tex]

3. Simplify and differentiate the expression inside the square root:

[tex]f_x = \frac{-1}{2}(6x^{2} + 4y^{2} + 9z^{2})^{-1/2} * 18z[/tex]

4. Combine the terms and simplify further:

[tex]f_x = \frac{-9y}{(6x^{2} + 4y^{2} + 9z^{2})^{-3/2}}[/tex]

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

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Complete question - Find fₓ, fᵧ and f₂ if f(x, y, x) = 1/√(6x² + 4y² + 9z²)

A rectangular prism with a length of 9.3 centimeters, width of 5.9 centimeters, and height of 4.4 centimeters. The volume is 241.428 cu. cm (Option b).

The formula to calculate the volume of a rectangular prism is

V= l × w × h.

Here, l, w, and h represent the length, width, and height of the prism respectively. The length, width, and height of the rectangular prism are as follows:

Length (l) = 9.3 cm

Width (w) = 5.9 cm

Height (h) = 4.4 cm

Therefore, the formula to calculate the volume of the rectangular prism is:

V= l × w × h

On substituting the given values in the formula, we get

V = 9.3 × 5.9 × 4.4V = 241.428 cu. cm

Hence, the volume of the rectangular prism is 241.428 cubic centimeters. Option b is the correct answer.

Note: Always remember the formula V = l × w × h to calculate the volume of a rectangular prism.

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[tex]\textit{arc's length}\\\\ s = \cfrac{\theta \pi r}{180} ~~ \begin{cases} r=radius\\ \theta =\stackrel{degrees}{angle}\\[-0.5em] \hrulefill\\ r=26\\ \theta =265 \end{cases}\implies s=\cfrac{(265)\pi (26)}{180}\implies s\approx 120~in[/tex]

The distance the tip of the bat travels is approximately 12.135 inches.

To find the distance the tip of the bat travels, we need to calculate the length of the arc.

The formula to calculate the length of an arc in a circle is:

Arc length = (θ/360) × 2πr

where θ is the angle in degrees, r is the radius.

Given:

Radius (r) = 26 inches

Angle (θ) = 265°

Let's substitute these values into the formula to find the arc length:

Arc length = (265/360) × 2π × 26

To calculate this, we first convert the angle from degrees to radians:

θ (in radians) = (θ × π) / 180

θ (in radians) = (265 × 3.14159) / 180

Now, we can substitute the values and calculate the arc length:

Arc length = (265/360) × 2 × 3.14159 × 26

Arc length ≈ 0.7346 × 6.28318 × 26

Arc length ≈ 12.135 inches (rounded to three decimal places)

Therefore, the distance the tip of the bat travels is approximately 12.135 inches.

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Using the Lagrange multiplier method, we can find the maximum of the function f(x, y) = 3x + 4y subject to the constraint x + 7y^2 = 1.

To find the maximum of the function, we need to introduce a Lagrange multiplier λ and set up the following system of equations:

∇f = λ∇g

g(x, y) = 0

Here, ∇f represents the gradient of the function f(x, y), and ∇g represents the gradient of the constraint function g(x, y). In this case, the gradients are:

∇f = (3, 4)

∇g = (1, 14y)

Setting up the equations, we have:

3 = λ

4 = 14λy

x + 7y^2 - 1 = 0

From the second equation, we can solve for λ as λ = 4 / (14y). Substituting this value into the first equation, we get 3 = (4 / (14y)). Solving for y, we find y = 2 / 7. Plugging this value into the constraint equation, we can solve for x: x = 1 - 7(2 / 7)^2 = 9 / 14. Therefore, the maximum of the function f(x, y) = 3x + 4y subject to the constraint x + 7y^2 = 1 occurs at the point (9/14, 2/7).

The maximum value of the function f(x, y) = 3x + 4y subject to the constraint x + 7y^2 = 1 is obtained at the point (9/14, 2/7) with a maximum value of (3 * (9/14)) + (4 * (2/7)) = 27/14 + 8/7 = 34/7. The Lagrange multiplier method allows us to find the maximum by incorporating the constraint into the optimization problem using Lagrange multipliers and solving the resulting system of equations.

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To determine the local maxima and minima of the function f(x) = x^2 + 1, we need to find the critical points and analyze the behavior of the function around those points.

First, let's find the derivative of f(x) with respect to x:

f'(x) = 2x.

To find the critical points, we set f'(x) = 0 and solve for x:

2x = 0,

x = 0.

So the only critical point of the function is x = 0.

Next, we can analyze the behavior of the function around x = 0. Since the derivative is 2x, we can observe that:

- For x < 0, f'(x) < 0, indicating that the function is decreasing.

- For x > 0, f'(x) > 0, indicating that the function is increasing.

From this information, we can conclude that the function has a local minimum at x = 0. At this point, f(0) = (0)^2 + 1 = 1.

Therefore, the function f(x) = x^2 + 1 has a local minimum at x = 0, and there are no local maxima.

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The solution for the boundary-value problem is y(x) = 2[tex]e^{(4x)}[/tex] × (1 - x).

The given differential equation y'' – 8y' + 16y = 0 is a second-order homogeneous linear differential equation with constant coefficients.

The characteristic equation of this differential equation⇒r² - 8r + 16 = 0

This can be factored as (r - 4)² = 0 ∴⇒r = 4.

general solution ⇒ y(x) = (A(x) + B) × [tex]e^{(4x)}[/tex]

A and B are constants.

Now, we'll use the boundary conditions y(0) = 2 and y(1) = 0 to solve for A and B.

For the first boundary condition y(0) = 2:

2 = (A0 + B)× [tex]e^{(4*0)}[/tex]

2 = B

Substitute B = 2 into general solution:

y(x) = Ax × [tex]e^{(4x)}[/tex] + 2 × [tex]e^{(4x)}[/tex]

y(x) = [tex]e^{(4x)}[/tex] × (Ax + 2)

For the second boundary condition y(1) = 0:

0 =  [tex]e^{(4*1)}[/tex] × (A1 + 2)

0 = e⁴ × (A + 2)

As  e⁴ ≠ 0, we can solve for A:

A = -2

So the solution to the boundary value problem is:

y(x) =  [tex]e^{(4x)}[/tex]  × (-2x + 2) ⇒ y(x) = 2 [tex]e^{(4x)}[/tex] × (1 - x)

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The value of c that makes the function f(x) continuous is c = 25/4.

To find the value of c that makes the function f(x) continuous, we need to ensure that the function is continuous at x = 5. For a function to be continuous at a point, the left-hand limit and the right-hand limit at that point must be equal, and the value of the function at that point must also be equal to the limit.

For x < 5, the function is given by f(x) = x^2 - c/4x. To find the left-hand limit as x approaches 5, we substitute x = 5 into the function and simplify: lim(x→5-) f(x) = lim(x→5-) (x^2 - c/4x) = 5^2 - c/4 * 5 = 25 - 5c/4.

For x ≥ 5, the function is given by f(x) = c. To find the right-hand limit as x approaches 5, we substitute x = 5 into the function: lim(x→5+) f(x) = lim(x→5+) c = c.

To make the function continuous at x = 5, we equate the left-hand limit and the right-hand limit and set them equal to the value of the function at x = 5: 25 - 5c/4 = c. Solving this equation for c, we find c = 25/4. Therefore, the value of c that makes the function f(x) continuous is c = 25/4.

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The value of c that makes the function continuous is c = 5/6.

To find the value of c that makes the function continuous, we need to ensure that the two pieces of the function, defined for x < 5 and x ≥ 5, match at x = 5.

First, let's evaluate f(x) = x² - c when x < 5 at x = 5:

f(5) = (5)² - c

= 25 - c

Next, let's evaluate f(x) = 4x + 5c when x ≥ 5 at x = 5:

f(5) = 4(5) + 5c

= 20 + 5c

Since the function should be continuous at x = 5, the values of f(x) from both pieces should be equal.

Therefore, we set them equal to each other and solve for c:

25 - c = 20 + 5c

Let's simplify the equation:

25 - 20 = 5c + c

5 = 6c

Dividing both sides by 6:

c = 5/6

So, the value of c that makes the function continuous is c = 5/6.

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Complete question =

Let f(x) be the piecewise function

f(x) = {x²-c for x < 5,

        4x+5c for x≥5}

find the value of c that makes the function continuous. (use symbolic notation and fractions where needed.)