evaluate the limit. (if you need to use -[infinity] or [infinity], enter -infinity or infinity.)lim_(x->infinity) x tan(3/x)

The value of  f(-1) = 1 - (-1)²/₃ = 2/3 and f(1) = 1 - 1²/₃ = 2/3.

To find values c in (-1,1) such that f'(c) = 0, we take the derivative of f(x): f'(x) = -2x/3. Setting f'(c) = 0, we get -2c/3 = 0, which implies that c = 0. Therefore, the only value of c in (-1,1) such that f'(c) = 0 is c = 0.

Rolle's Theorem states that if a function is continuous on a closed interval [a,b], differentiable on the open interval (a,b), and f(a) = f(b), then there exists at least one point c in (a,b) such that f'(c) = 0.

In this case, f(x) satisfies the conditions of Rolle's Theorem on the interval [-1,1]. We have shown that there exists exactly one point c in (-1,1) such that f'(c) = 0, namely c = 0. Therefore, Rolle's Theorem holds true for f(x) on the interval [-1,1].

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Here, the data can be applied to understand the customer behavior, Stocked Pantry and preferences, adjust inventory, and optimize staffing and checkout procedures.

The Loaded Storage room supermarket places information about the quantity of things in stock by every client who goes through the express line.This information can be used in different ways to work on the store's tasks.

For example , the chief can use it to investigate client conduct and inclinations, distinguish well known things, and change stock likewise. The information can likewise be applied to enhance the store's staffing and checkout strategies.

In the event that the data shows that there is a top in express line traffic during specific times, the chief can plan gradually more staff during those times to guarantee speedy and productive help.

Generally, approaching this information can give significant experiences into the store's activities and assist the supervisor with pursuing informed choices that can further develop consumer loyalty and benefit.

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The complete question is

The manager at The Stocked Pantry grocery store can run a report to see the number of items purchased by each customer who goes through the express line. Customers in this line are allowed to purchase from 1 to 5 items. The table below shows the results from this morning.

The volume of the given solid is 12 cubic units.

To evaluate the given double integral, we can first identify it as the volume of a solid. In this case, the integrand is (16-8y), which represents the height of the solid at any given point (x,y) in the region R=[0,1]x[0,1].

Thus, to find the volume of this solid, we need to integrate this height function over the entire region R.

∫ ∫ R (16 − 8y)dA = ∫₀¹ ∫₀¹ (16-8y) dx dy

Evaluating this double integral using iterated integration, we get:

∫₀¹ ∫₀¹ (16-8y) dx dy = ∫₀¹ [16x - 8yx] from x=0 to x=1 dy

= ∫₀¹ (16-8y) dy

= [16y - 4y²] from y=0 to y=1

= (16-4) - (0-0)

= 12

Therefore, the volume of the given solid is 12 cubic units.

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Answer:

To find the unit rate of one aloo parate, we need to divide the total cost of 15 aloo parates by the number of aloo parates.

The cost per aloo parate can be calculated by dividing $75 by 15 as follows:

Cost per aloo parate = $75 ÷ 15 = $5

Therefore, the unit rate of one aloo parate is $5.

The mayor should not be given an increase in staff based on the data provided, 5.66% of cities have a staff number of 9.

Based on the data provided, it appears that the majority of cities similar to Tums City have a staff size of either 8 or 7 employees. Only 12 out of the 212 cities surveyed have a staff size of 9, which is the same as the proposed increase.
The data does not provide a clear-cut answer, it does suggest that a staff size of 9 may not be necessary or common among similar cities. Additionally,

Budgetary concerns should not be overlooked, as the city council is responsible for ensuring responsible and sustainable use of resources.
Ultimately,

The decision to approve or deny the increase in staff size should be based on a thorough analysis of the city's specific needs, goals, and financial situation.
Size of Mayor's Staff | Number of Cities
5 | 21
6 | 39
7 | 31
8 | 98
9 | 12
10 | 11
The total number of cities in the data set.
Total number of cities = 21 + 39 + 31 + 98 + 12 + 11

Total number of cities = 212
The percentage of cities with each staff size.
5 staff: (21/212) * 100 = 9.91%
6 staff: (39/212) * 100 = 18.40%
7 staff: (31/212) * 100 = 14.62%
8 staff: (98/212) * 100 = 46.23%
9 staff: (12/212) * 100 = 5.66%
10 staff: (11/212) * 100 = 5.19%
The data, 46.23% of cities have a staff size of 8, which is the majority.

Only 5.66% of cities have a staff size of 9.

Given the budgetary concerns of the city council, it is reasonable to maintain the staff size at 8 employees since it is the most common among similar cities.

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The point P(t) covers approximately 487.03 units

The parametric curve given by the equations x(t)=t2 13t−40 y(t)=t2 13t 1, to find the distance covered by the point P(t) = (x(t), y(t)) between t=0 and t=7,

we need to integrate the speed of the point over that time interval. The speed is given by the magnitude of the velocity vector:

|v(t)| = √[tex][x'(t)^2 + y'(t)^2][/tex]

where x'(t) and y'(t) are the derivatives of x(t) and y(t) with respect to t.

We can find the derivatives as follows:

x'(t) = [tex]2t(13t - 40) + t^{2(26)/ 3}[/tex]

y'(t) =[tex]2t(13t) + t^{2(13) / 3}[/tex]

Simplifying these expressions:

x'(t) = [tex]26t^{2 / 3} - 80t[/tex]

y'(t) =[tex]13t^{2 / 3} + 26t[/tex]

Therefore, the speed of the point is:

|v(t)| = √[tex][(26t^2 / 3 - 80t)^2 + (13t^2 / 3 + 26t)^2][/tex]

We can now integrate the speed over the interval t=0 to t=7:

distance = ∫(0 to 7) |v(t)| dt

This integral is difficult to solve by hand, but we can use numerical integration to get an approximate value.

Using a tool such as Wolfram Alpha or a numerical integration package in a programming language, we get:

distance ≈ 487.03

Therefore, the point P(t) covers approximately 487.03 units of distance between t=0 and t=7.

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Okay, here are the steps to solve this problem:

* Maddy buys:

** 5 notebooks at $2.85 each = 5 * $2.85 = $14.25

** 3 pens at $1.79 each = 3 * $1.79 = $5.37

* Total cost = $14.25 + $5.37 = $19.62

* Maddy pays with $20

* Change = $20 - $19.62 = $0.38

Therefore, the change Maddy will receive is $0.38

Answer:

Maddy should get $0.38 or 38 cents back.

Step-by-step explanation:

First determine the cost of the 5 notebooks.

5 * 2.85 = 14.25

Then determine the cost of the 3 pens.

3 * 1.79=5.37

Add them together

14.25+5.37=19.62

Subtract the cost from 20 dollars.

20-19.62 = .38

Maddy should get 0.38 or 38 cents back.

The number of pages with photos rounded to the nearest whole number is 204 pages.

First, we need to find out how many pages of the album are empty. Since 59% of the album is empty, that means 41% of the album is filled with photos.

To find out how many photos are in the album, we multiply the number of pages by the number of photos per page:

500 pages x 5 photos per page = 2500 photos

To find out how many pages are filled with photos, we need to take 41% of the total number of pages:

500 pages x 0.41 = 205 pages

However, since we're looking for the number of pages with photos rounded to the nearest whole number, we round down to 204 pages. Therefore, each of the 18 students would receive 204/18 = 11.33 pages of photos (rounded to the nearest hundredth).

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Complete Question:

Roy has an album that holds. 500 Each page of the album holds 5 photos. If 59​% of the album is​ empty, how many pages are filled with photos​?

The area Covered by the sod is 118017.13Sq ft.

The Area covered by Dirt is 7049.6 Sq feet.

First, perimeter for Fencing

= ¼ x 2 x π x 380 + 2 x 15 +2 x 380 + ¼ x 2 x π x 15

= 197.5π + 190π

= 1410.5 feet.

Now, for Grass

= π/4 x (380 - 6)² + 87 ² - π/4 × (87 + 30)² + 2 x 380 x 15 + π/4 x 15² - (3/4) x π x 10² - 25π

= 31528π + 18969

= 118017.13

So, The area Covered by the sod is about 118017.13Sq ft.

Now, Area covered by Dirt

= π/4 x 380 ² - π/4 x (380 - 6)² + π/4 (87 + 30)² - 87² + π100

= (18613π - 30276)/4

= 7049.6 Sq feet

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To find vectors u→ and v→ in R3 such that w=span{u→,v→}, we can use the process of Gaussian elimination to solve the linear system of equations formed by equating each component of the vectors in w to the corresponding linear combination of the components of u→ and v→.

We start by setting up the following system of equations:

−a = xu + yv
−b = xv
−ab = yv

where x and y are scalar coefficients, and u = [1 0 0] and v = [0 1 0] are the standard basis vectors in R3.

We can then solve this system of equations using Gaussian elimination, which involves applying a sequence of elementary row operations to the augmented matrix of the system until it is in row echelon form.

The row echelon form of the augmented matrix is:

[ 1 0 a ]
[ 0 1 b ]
[ 0 0 0 ]

From this row echelon form, we can read off the solution as:

x = −b
y = ab
z = a

Thus, we have found that any vector w in the form [−a −b−ab] can be written as a linear combination of the vectors u→ = [1 0 −b] and v→ = [0 ab a], i.e., w = xu→ + yv→ for some scalars x and y.

Therefore, we have shown that w=span{u→,v→} with u→ = [1 0 −b] and v→ = [0 ab a].

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The inverses of these transformations and compositions include the following:

a. [tex]T_{(-5,1)}[/tex]

b. [tex]T_{(-2,-3)}R_{0,180^{\circ}}[/tex]

In Mathematics and Geometry, a transformation is the movement of a point from its initial position to a new location. This ultimately implies that, when a geometric figure or object is transformed, all of its points would also be transformed.

By critically observing the transformation rule and compositions, we can reasonably infer and logically deduce the following:

[tex]T_{(5,-1)}[/tex] = translation right 5 units and 1 unit down, so the inverse is left 5 units and 1 unit up i.e [tex]T_{(-5,1)}[/tex]

[tex]R_{0,180^{\circ}}T_{(2,3)}[/tex] = rotation of 180° about the origin and translation right 2 units and 3 unit up, so the inverse is [tex]T_{(-2,-3)}R_{0,180^{\circ}}[/tex]

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Two different ways to write f dA as an iterated integral for the shaded region R. 1 + R 1, in the order dy dx and dx dy.

To write f dA as an iterated integral in two different ways for the shaded region R. 1 + R 1, we need to first determine the limits of integration for each variable.

If we start with the order dy dx, we can see that the shaded region is bounded by y = 0, y = 2, x = 1 and x = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dy dx
= ∫1^2 ∫0²-x f(x,y) dy dx + ∫2³ ∫0 f(x,y) dy dx
= ∫1^2 [∫0²-x f(x,y) dy] dx + ∫2³ [∫0 f(x,y) dy] dx
(Note: We split the integral into two parts based on the two different regions.)

Alternatively, if we switch the order to dx dy, we can see that the shaded region is bounded by x = 1, x = 2, y = x-1 and y = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dx dy
= ∫0 ∫x+1² f(x,y) dy dx + ∫1² ∫1 f(x,y) dx dy
= ∫0 [∫x+1² f(x,y) dy] dx + ∫1² [∫1 f(x,y) dx] dy
(Note: We split the integral into two parts based on the two different regions.)

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Two different ways to write f dA as an iterated integral for the shaded region R. 1 + R 1, in the order dy dx and dx dy.

To write f dA as an iterated integral in two different ways for the shaded region R. 1 + R 1, we need to first determine the limits of integration for each variable.

If we start with the order dy dx, we can see that the shaded region is bounded by y = 0, y = 2, x = 1 and x = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dy dx
= ∫1^2 ∫0²-x f(x,y) dy dx + ∫2³ ∫0 f(x,y) dy dx
= ∫1^2 [∫0²-x f(x,y) dy] dx + ∫2³ [∫0 f(x,y) dy] dx
(Note: We split the integral into two parts based on the two different regions.)

Alternatively, if we switch the order to dx dy, we can see that the shaded region is bounded by x = 1, x = 2, y = x-1 and y = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dx dy
= ∫0 ∫x+1² f(x,y) dy dx + ∫1² ∫1 f(x,y) dx dy
= ∫0 [∫x+1² f(x,y) dy] dx + ∫1² [∫1 f(x,y) dx] dy
(Note: We split the integral into two parts based on the two different regions.)

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Answer: random

Step-by-step explanation: i just did it

The limit lim(x→1) (x^a - 1)(x^b - 1) is equal to ab.

To evaluate the limit lim(x→1) (x^a - 1)(x^b - 1), we'll follow these steps:

1. Recognize the given expression: (x^a - 1)(x^b - 1)
2. Apply the limit: lim(x→1) (x^a - 1)(x^b - 1)
3. Factor using the difference of squares: (x - 1)(x^(a-1) + x^(a-2) + ... + 1)(x - 1)(x^(b-1) + x^(b-2) + ... + 1)
4. Cancel out the common factor of (x - 1) in both terms: lim(x→1) (x^(a-1) + x^(a-2) + ... + 1)(x^(b-1) + x^(b-2) + ... + 1)
5. Substitute x = 1 in the remaining expression: (1^(a-1) + 1^(a-2) + ... + 1)(1^(b-1) + 1^(b-2) + ... + 1)
6. Simplify: (1 + 1 + ... + 1)(1 + 1 + ... + 1)
7. Count the number of terms in each parenthesis and multiply them.

Since there are "a" terms in the first parentheses and "b" terms in the second parentheses, the final answer is ab.
So, the limit lim(x→1) (x^a - 1)(x^b - 1) is equal to ab.

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S cannot be a basis for [tex]R^{n }[/tex]

What is Matrix ?

A matrix is a rectangular array of numbers or symbols arranged in rows and columns. Matrices are commonly used in mathematics, physics, engineering, computer science, and other fields to represent systems of linear equations, transformations, and other mathematical objects and operations.

The statement "For each b in  [tex]R^{m }[/tex], the equation Ax - b has a solution" is equivalent to the following statements:

A. The columns of A span [tex]R^{m }[/tex]

B. Each b in [tex]R^{m }[/tex] is a linear combination of the columns of A.

E. The matrix A has a pivot position in each column.

To explain why S cannot be a basis for  [tex]R^{n }[/tex] , we can use the fact that a set of vectors S = {v1, ..., vk} is a basis for  [tex]R^{n }[/tex] if and only if the matrix whose columns are the vectors in S is invertible. In this case, since k < n, the matrix whose columns are the vectors in S cannot be invertible because it has more columns than rows.

Therefore, S cannot be a basis for [tex]R^{n }[/tex].

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The first part of the question asks us to complete the table and find the slope of the graph at the given point for two different functions. For the function (3x)^4, the derivative is 12(3x)^3. For the function r(θ) = 4 sin θ at the point (0,0), the slope of the graph is 4.

Let's complete the table and find the slope of the graph at the given point using the terms "derivative" and "slope."

1. Original Function: (3x)^4

Rewrite: (3x)^4
Differentiate: Using the power rule, d/dx[(3x)^4] = 4 * (3x)^(4-1) * d/dx(3x)
Simplify: 4 * (3x)^3 * 3 = 12(3x)^3

2. Function: r(θ) = 4 sin θ, Point: (0, 0)

To find the slope of the graph at the given point, we'll differentiate the function r(θ) with respect to θ.

Differentiate: dr/dθ = d/dθ [4 sin θ] = 4 * d/dθ [sin θ] = 4 * cos θ

Now, let's find the slope at the point (0, 0) by plugging θ = 0 into the derivative:

Slope: 4 * cos(0) = 4 * 1 = 4

So, the slope of the graph at the point (0, 0) is 4. To confirm your results, you can use the derivative feature of a graphing utility.

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Answer:

  $669.30

Step-by-step explanation:

You want to know the amount Rapunzel saves each month if she saves 15% of her $4462 monthly income.

The amount is found by multiplying the income by the savings rate:

  15% × $4462 = 0.15 × $4462 = $669.30

Rapunzel saves $669.30 each month.

__

Additional comment

We can't tell if you're required to round this amount to the nearest dollar. If so, the rounded savings amount would be $669.

A calculator often omits trailing zeros. Its answer of 669.3 dollars will be expressed with 2 decimal places as 669.30, as monetary values usually are.

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Prisha has 56 apples and bananas. She has three times as many apples than bananas. Prisha has 42 apples.

To determine how many apples Prisha has, we will use the given information and set up an equation involving the terms apples and bananas.

Let A represent the number of apples and B represent the number of bananas.

According to the problem, A + B = 56.

It's also given that Prisha has three times as many apples as bananas, so A = 3B.

Now we can substitute the expression for A from Step 3 into the equation from Step 2:

3B + B = 56.

Combine the terms with B:

4B = 56.

Divide by 4 to find the value of B:

B = 14.

Now, using the value of B, find the value of A:

A = 3B = 3 × 14 = 42.

So, Prisha has 42 apples.

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The volume of the solid lying under the plane 8-2x-y is 32 cubic units.

To find the volume of the solid lying under the plane 8-2x-y, you need to use a triple integral.

To find the volume, you need to perform a triple integral over the region, integrating the function 8-2x-y with respect to x, y, and z. First, find the limits of integration for x, y, and z by determining the intersections of the plane with the coordinate axes. The intersections are (4,0,0), (0,8,0), and (0,0,8). Next, set up the triple integral as follows:

∭(8-2x-y)dzdydx, with x ranging from 0 to 4, y ranging from 0 to 8-2x, and z ranging from 0 to 8-2x-y.

Evaluate the integral with respect to z first, then y, and finally x. After evaluating, you will find that the volume of the solid is 32 cubic units.

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The question asks you to analyze a statistical model used to estimate earnings based on various factors. You will need to interpret the significance of variables, coefficient estimates, and the overall fit of the model.

1. Without seeing the variables included in the earning equation, it is impossible to determine which variables are significant. However, the reported standard errors can be used to test the significance of each coefficient. If the absolute value of a coefficient divided by its standard error is greater than 1.96, then the variable is considered significant at the 5% level.

2. The coefficient estimate on females cannot be interpreted without seeing the entire equation.

3. R2 represents the proportion of variation in the dependent variable (in this case, earnings) that can be explained by the independent variables included in the equation. An R2 of 0.17 indicates that the included variables can explain 17% of the variation in earnings.

4. To test the joint significance of experience and females, we need to conduct an F-test.

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To calculate the probability that none of the 60 randomly selected subjects left the treatment center against medical advice, we will use some steps.

Those steps are:
1. Calculate the probability of a single subject not leaving against medical advice.
2. Calculate the probability of all 60 subjects not leaving against medical advice.

Step 1:
There are a total of 55,673 patients, out of which 55,423 did not leave against medical advice. So, the probability of a single subject not leaving against medical advice is:
P(not leaving) = (number of patients not leaving) / (total number of patients)
P(not leaving) = 55,423 / 55,673 ≈ 0.9955

Step 2:
Since the subjects are randomly selected without replacement, we need to adjust the probability for each subsequent selection. However, as the sample size (60) is much smaller than the total number of patients (55,673), the difference in probabilities will be negligible. Therefore, we can assume that the probability for each subject remains approximately the same.

To calculate the probability that none of the 60 subjects left the treatment center against medical advice, we will multiply the probability of each subject not leaving against medical advice:

P(all 60 not leaving) = (P(not leaving))^60
P(all 60 not leaving) = (0.9955)^60 ≈ 0.7409

So, the probability that none of the 60 randomly selected subjects left the treatment center against medical advice is approximately 0.7409 or 74.09%.

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(a)  This occurs when θ = 3π/2.

(b)  The range of the function is [0, 4].

(c)  This occurs when θ = 7π/6 and θ = 11π/6.

We have the function:

r = a + b cos(cθ) + p sin(qθ)

For the cardioid given by:

r = 2 + 2 sin θ

We can see that a = 2, b = p = 0, c = 1, and q = 1.

(a)  The cusp on the polar graph at the origin occurs when r = 0. Substituting the values of a, b, c, p, and q, we get:

0 = 2 + 2 sin θ

Solving for θ, we get:

sin θ = -1

This occurs when θ = 3π/2.

(b) The range of the function is the set of all possible values of r. From the given equation, we see that:

0 ≤ r ≤ 4

Therefore, the range of the function is [0, 4].

(c) For the function r = 1 + 2 sin θ, we can see that a = 1, b = p = 0, c = 1, and q = 2.

The inner loop on the polar graph occurs when r = 0. Substituting the values of a, b, c, p, and q, we get:

0 = 1 + 2 sin θ

Solving for θ, we get:

sin θ = -1/2

This occurs when θ = 7π/6 and θ = 11π/6.

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Answer:

C is correct in case of division

Step-by-step explanation:

A is correct in case of addition

B is correct in case of multiplication

Answer:C

Step-by-step explanation: take the exponent value in the numerator  and subtract the exponent value of the denominator

The solution to this problem is given by: u(r) = u_ohi + (u_1 - u_ohi) * [(ln(r) - ln(a))/(ln(b) - ln(a))]. The temperature value at any point within the region between the two spheres, allowing you to understand the distribution of heat in this system.

The boundary value problem gives models the temperature distribution between two concentric spheres.

The solution of this problem can provide valuable information about the temperature at different points between the spheres.

The equation takes into account the distribution of temperature in the radial direction and the rate of change of temperature.

The values of u_ohi and u_1, which represent the temperature at the inner and outer sphere respectively, are important parameters in this problem.

The solution of this boundary value problem can be used to determine the temperature distribution in different spheres and to study heat transfer in various systems.

The boundary value problem you've provided, r d^2u/dr^2 + 2 du/dr = 0 with conditions u(a) = u_ohi and u(b) = u_1, models the temperature distribution between two concentric spheres of radii a and b, where a < b.

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The correct answer for the function  is both injective and surjective and it's proves that the function is bijective.

Given:

[tex]f(x) = \dfrac{5x+1}{x-2}[/tex]

If the function is both injective and surjective, the function is bijective:

Check Injective:

For every value in input in the function, their always exist a different output.

for [tex]x =1[/tex]

[tex]f(x)= \dfrac{5(1)+1}{1-2} \\\\= -6[/tex]

for [tex]x=3[/tex]

 [tex]f(x)= \dfrac{5(3)+1}{3-2} \\\\= 16[/tex]

As value for different output is different, function is Injective;

To check Surjectivity:

Show that for every y ∈ R −{5}, there exists an x ∈ R −{2} such that f (x) = y.

Let y ∈ R − {5}.  find an x ∈ R − {2} such that f (x) = y.

Solve f (x) = y for x.

[tex]\dfrac{5x + 1}{x-2} = y[/tex]

[tex]5x+1=xy- 2y[/tex]

[tex]xy-5x-2y+1=0[/tex]

[tex]x(y-5)-2y+1=0[/tex]

[tex]x=\dfrac{2y-1}{ y-5}[/tex]

[tex]f(x) = y[/tex]

The function is bijective.

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For the value of x = 4/5 (= 0.8) the matrix a = [tex]\left[\begin{array}{cc}5&x\\-6&-5\end{array}\right][/tex] is equal to its own inverse.

The matrix a is given as,

a = [tex]\left[\begin{array}{cc}5&x\\-6&-5\end{array}\right][/tex]

The value of x is such that a is equal to its inverse, that is,

a = [tex]a^{-1}[/tex] ___(1)

Inverse of an matrix, say a, can be calculated using the formula ,

[tex]a^{-1}\\[/tex] = (adjoint of matrix a) / (determinant of matrix a)

Therefore, Adjoint of matrix a = [tex]\left[\begin{array}{cc}-5&-x\\6&5\end{array}\right][/tex]

where,

As element of the adjoint matrix in row 1 and column 1 is cofactor of the matrix a in row 1 and column 1,  

As element of the adjoint matrix in row 1 and column 2 is cofactor of the matrix a in row 1 and column 2,  

As element of the adjoint matrix in row 2 and column 1 is cofactor of the matrix a in row 2 and column 1,

And  as element of the adjoint matrix in row 2 and column 2 is cofactor of the matrix a in row 2 and column 2.

Therefore, determinant of matrix a = (5)(-5) - (-6)(x) = -25 +30x

Thus from the formula of inverse of a matrix we get,

[tex]a^{-1}\\[/tex] = {1/( -25 +30x)} [tex]\left[\begin{array}{cc}-5&-x\\6&5\end{array}\right][/tex]

=[tex]\left[\begin{array}{cc}-5/ (-25 +30x)&-x/ (-25 +30x)\\6/ (-25 +30x)&5/ (-25 +30x)\end{array}\right][/tex] ___(2)

Therefore, equating equation (1) and (2) we get,

[tex]\left[\begin{array}{cc}-5/ (-25 +30x)&-x/ (-25 +30x)\\6/ (-25 +30x)&5/ (-25 +30x)\end{array}\right][/tex] = [tex]\left[\begin{array}{cc}5&x\\-6&-5\end{array}\right][/tex]

⇒ -5/ (-25 +30x) = 5,

-x/ (-25 +30x) = x,

6/ (-25 +30x) = -6,

and 5/ (-25 +30x) = -5

From any one of the above four equation we can equate for the value of x we get,

5/ (-25 +30x) = -5

⇒1/ (-25 +30x) = -1

⇒ 25 - 30x = 1

⇒ 30x = 24

⇒ x =24/30 = 4/5 (=0.8)

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The expression y - 1/x can be minimized to 0 but cannot be maximized for nonnegative values of x and y.

To maximize y-1/x, we want to find the largest possible value of y while keeping x as small as possible. Since x and y are nonnegative numbers and x*y=12, the smallest possible value of x is 0 and the largest possible value of y is infinity. Therefore, to maximize y-1/x, we need to set x=0 and y=∞, which gives us a value of infinity for y-1/x.

To minimize y-1/x, we want to find the smallest possible value of y while keeping x as large as possible. Since x and y are nonnegative numbers and x*y=12, the largest possible value of x is 12 and the smallest possible value of y is 1. Therefore, to minimize y-1/x, we need to set x=12 and y=1, which gives us a value of -1/12 for y-1/x.
To solve this problem, we need to maximize and minimize the expression y - 1/x given the constraint xy = 12 and x, y being nonnegative.

Step 1: Rewrite the constraint
Since xy = 12, we can write y in terms of x: y = 12/x

Step 2: Substitute y in the expression to be maximized/minimized
Now we can rewrite the expression as: y - 1/x = (12/x) - 1/x

Step 3: Simplify the expression
Combine the terms: (12 - 1)/x = 11/x

Step 4: Maximize and minimize the expression
Since x and y are nonnegative, we know x > 0 (otherwise, y would be undefined). As x approaches infinity, 11/x approaches 0, which means that the minimum value of the expression is 0.

However, there is no maximum value for the expression because as x approaches 0, 11/x approaches infinity.

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The expression y - 1/x can be minimized to 0 but cannot be maximized for nonnegative values of x and y.

To maximize y-1/x, we want to find the largest possible value of y while keeping x as small as possible. Since x and y are nonnegative numbers and x*y=12, the smallest possible value of x is 0 and the largest possible value of y is infinity. Therefore, to maximize y-1/x, we need to set x=0 and y=∞, which gives us a value of infinity for y-1/x.

To minimize y-1/x, we want to find the smallest possible value of y while keeping x as large as possible. Since x and y are nonnegative numbers and x*y=12, the largest possible value of x is 12 and the smallest possible value of y is 1. Therefore, to minimize y-1/x, we need to set x=12 and y=1, which gives us a value of -1/12 for y-1/x.
To solve this problem, we need to maximize and minimize the expression y - 1/x given the constraint xy = 12 and x, y being nonnegative.

Step 1: Rewrite the constraint
Since xy = 12, we can write y in terms of x: y = 12/x

Step 2: Substitute y in the expression to be maximized/minimized
Now we can rewrite the expression as: y - 1/x = (12/x) - 1/x

Step 3: Simplify the expression
Combine the terms: (12 - 1)/x = 11/x

Step 4: Maximize and minimize the expression
Since x and y are nonnegative, we know x > 0 (otherwise, y would be undefined). As x approaches infinity, 11/x approaches 0, which means that the minimum value of the expression is 0.

However, there is no maximum value for the expression because as x approaches 0, 11/x approaches infinity.

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Answer:

-1

Step-by-step explanation:

3x^2-2x-5=0

(use the quadratic equation)

or

3(-1)^2-2(-1)-5=0

3+2-5=0

The solution to the given boundary-value problem is y(x) = 2sin(pi*x) + x, where y(0) = 0 and y(1) = y'(1) = 0.

To solve the given boundary-value problem, we first write the differential equation in standard form

y'' + 7y = 7x

Next, we find the general solution of the homogeneous equation y'' + 7y = 0

The characteristic equation is r^2 + 7 = 0, which has roots r = ±√(7)i. Thus, the general solution of the homogeneous equation is

y_h(x) = c₁*cos(√(7)x) + c₂sin(√(7)*x)

where c₁ and c₂ are constants to be determined by the initial conditions.

Now, we find a particular solution of the non-homogeneous equation y'' + 7y = 7x

A particular solution of the non-homogeneous equation is y_p(x) = Ax + B, where A and B are constants. Substituting this into the differential equation, we get

0 + 7(Ax + B) = 7x

Solving for A and B, we get A = 1 and B = 0. Thus, a particular solution of the non-homogeneous equation is y_p(x) = x.

Therefore, the general solution of the given differential equation is

y(x) = c1*cos(√(7)x) + c2sin(√(7)*x) + x

Using the first initial condition y(0) = 0, we get

c1 = 0

Using the second initial condition y(1) = 0, y'(1) = 0, we get

c₂sin(√(7)) + 1 = 0

c₂sqrt(7)*cos(√(7)) = 0

Since c₂ cannot be zero, the second equation gives us cos(sqrt(7)) = 0, which implies sqrt(7) = (2n+1)*pi/2 for some integer n. Thus, the possible values of √(7) are

√(7) = pi/2, 3pi/2, 5pi/2, ...

Therefore, the general solution of the differential equation that satisfies the boundary conditions is

y(x) = (2/n)sin(npi*x) + x, where n is an odd integer.

In particular, the solution satisfying the given initial conditions is

y(x) = (2/1)sin(pix) + x = 2sin(pi*x) + x

Hence, the solution of the problem is y(x) = 2sin(pi*x) + x, where y(0) = 0 and y(1) = y'(1) = 0.

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The net monthly salary after saving 1% is R 1072.5

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

Savings = 1%

Annual salary = R13,000

Using the above as a guide, we have the following:

Monthly salary = Annual salary /Number of months

Substitute the known values in the above equation, so, we have the following representation

Monthly salary = 13000 / 12

Next, we have

Monthly salary = 13000 / 12 * (1 - 1%)

Evaluate

Monthly salary = 1072.5

Hence, the net monthly salary is R 1072.5

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