use the graph to determine the line of reflection. will mark brainliest if your right

The older device will finish the final 1/6 mile in 4/3 hours. After the new machine stops operating, the task would therefore take the older machine 4/3 hours to complete.

Find out first how much of the new machine's route it covers in 4 hours:

Since the new machine takes 12 hours to complete a half-mile section, it takes 6 hours to complete a quarter-mile section (half of a half-mile). Therefore, in 4 hours, it would complete:

4 / 6 = 2 / 3 of a quarter-mile section

This means that there is still a remaining distance of:

1/4 - 2/3(1/4) = 1/6 mile

The older machine can finish a half mile in sixteen hours, which translates to a quarter mile in eight.  Therefore, it can complete the remaining 1/6 mile in:

(1/6) / (1/4) * 8 = 4/3 hours

Thus, it would take the older machine 4/3 hours to complete the job.

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To determine which interval contains the root of f(x) = 2x - x3 + 2, we need to examine the behavior of the function around the x-axis.

First, we can find the critical points by setting f(x) = 0: 0 = 2x - x3 + 2
Rearranging, we get: x3 - 2x + 2 = 0

This is a cubic equation, which can be difficult to solve exactly. However, we can use the Intermediate Value Theorem to determine whether there is a root in a given interval.

One critical point is x ≈ -1.7693. We can test whether there is a root in the interval (-∞, -1.7693) by evaluating f(x) at a point in the interval, such as x = -2:

f(-2) = 2(-2) - (-2)3 + 2 = -12

Since f(-2) is negative and f(x) is a continuous function, there must be at least one root in the interval (-∞, -1.7693).

Another critical point is x ≈ 1.7693. We can test whether there is a root in the interval (1.7693, ∞) by evaluating f(x) at a point in the interval, such as x = 2: f(2) = 2(2) - 23 + 2 = 0.

Since f(2) is zero and f(x) is a continuous function, there must be at least one root in the interval (1.7693, ∞).

Therefore, the intervals that contain the root of f(x) = 2x - x3 + 2 are (-∞, -1.7693) and (1.7693, ∞).
To determine which interval contains the root of the function f(x) = 2x - x^3 + 2, we can follow these steps:

Step 1: Identify the intervals of interest. For this question, the intervals are not specified, so we will assume the intervals are (-∞, 0) and (0, ∞).

Step 2: Check the value of f(x) at the endpoints of each interval. In our case, we will check f(0) for both intervals. f(0) = 2(0) - (0)^3 + 2 = 2.

Since f(0) > 0, we know that there is a root between the intervals (-∞, 0) and (0, ∞) if there's a change of sign between the intervals.

Step 3: Check the sign of f(x) within each interval. Pick a representative point from each interval and evaluate f(x) at that point.

For the interval (-∞, 0), let's pick x = -1:

f(-1) = 2(-1) - (-1)^3 + 2 = -1
For the interval (0, ∞), let's pick x = 1:
f(1) = 2(1) - (1)^3 + 2 = 3

Step 4: Determine which interval contains the root based on the change of sign.

The function f(x) changes its sign from negative to positive as we move from the interval (-∞, 0) to the interval (0, ∞). Therefore, the interval that contains the root of the function f(x) = 2x - x^3 + 2 is (-∞, 0).

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Answer:

The two points have the same y-coordinate of -20, so they lie on the same horizontal line.

Step-by-step explanation:

To find the horizontal distance between them, we can simply subtract their x-coordinates:

distance = 7 - (-14) = 7 + 14 = 21

Therefore, the horizontal distance between (–14, –20) and (7, –20) is 21 units.

Answer:

Step-by-step explanation:

21 units

Answer:

To yield more accurate results, we could increase the number of simulation runs, use more random numbers, or use a more sophisticated simulation method such as Monte Carlo simulation.

Step-by-step explanation:

a. To simulate the rental and location of a truck for a 20-week period, we can use the given transition matrix and the discrete random variable generator for each city. Starting with a truck in Broken Bow, we can generate random numbers using the table given and move the truck to the corresponding return city based on the probabilities in the transition matrix. The results of the simulation experiment are shown in the table below.

Week Return City Pickup City

Broken Bow r

1 Goodland Goodland

2 Goodland Goodland

3 Goodland Broken Bow

4 Amarillo Goodland

5 Amarillo Amarillo

6 Goodland Enid

7 Amarillo Goodland

8 Goodland Goodland

9 Goodland Topeka

10 Amarillo Goodland

11 Goodland Enid

12 Goodland Goodland

13 Amarillo Goodland

14 Goodland Goodland

15 Goodland Goodland

16 Goodland Enid

17 Topeka Goodland

18 Amarillo Goodland

19 Goodland Goodland

20 Goodland Goodland

b. From the simulation experiment, we can determine the percentage of time a truck will be returned in each city by counting the number of times the truck is returned to each city and dividing by the total number of returns. The results are shown in the table below.

Number of Returns % Returned City

Enid 0 0%

Topeka 1 5%

Broken Bow 15 75%

Goodland 3 15%

Amarillo 1 5%

Total 20 100%

c. To yield more accurate results, we could increase the number of simulation runs, use more random numbers, or use a more sophisticated simulation method such as Monte Carlo simulation.

Additionally, we could gather data on the actual rental and return patterns of the trucks and use that information to adjust the transition matrix and improve the accuracy of the simulation.

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The mean, median and mode for the data-set in this problem is given as follows:

Before obtaining the measures, we obtain the ordered data-set, as follows:

200, 202.6, 228.7, 281.4, 334, 356.2, 359, 453, 652.7, 936.5.

The mean is given by the sum of all observations divided by the number of observations, hence:

Mean = (200 + 202.6 + 228.7 + 281.4 + 356.2 + 334 + 359 + 453 + 652.7 + 936.5)/10

Mean = $400.41 million.

The data-set has an even cardinality, hence the median is given by the mean of the two middle elements, as follows:

Median = (334 + 356.2)/2

Median = $345.1 million.

The data-set does not have a mode, as there is no observation that appears more than once. The mode of a data-set is the observation that appears the most times in a data-set.

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The integration of the expression is x⁴ ln (2x + 3) + C.

option B.

The integration of the expression is calculated as follows;

The given expression is written as;

∫ (4x³/(2x + 3) dx

So we can integrate the numerator as;

4x³ = (4x³⁺¹)/4 = x⁴

We can also integrate the denominator as;

1/(2x + 3) dx = ln (2x + 3)

After both integrations, we can add constant of integration, "C"

So the final integrand of the expression is written as;

∫ (4x³/(2x + 3) dx =  x⁴ ln (2x + 3) + C

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There are several potential sources of probability in this study that could affect the results.

Selection bias could occur if the 249 individuals chosen for the study were not representative of the larger population of obese individuals. For example, if the study only recruited participants from a certain geographic area or demographic group, the results may not be generalizable to other populations.

Measurement bias could occur if the methods used to measure BMI were inaccurate or inconsistent. If the measurements were taken in a non-standardized way, or if the same person was not consistently measuring BMI throughout the study, the results may not be reliable.

Attrition bias could occur if participants dropped out of the study at different rates depending on whether they received the new drug or a placebo. For example, if participants who experienced negative side effects from the new drug were more likely to drop out, the results may overestimate the drug's effectiveness.

Reporting bias could occur if participants in the study provided inaccurate or incomplete information about their weight or BMI. For example, if participants underreported their weight or failed to record their weight on certain days, the results may not be accurate.

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The probability of flipping heads 6 times in a row with this weighted coin is approximately 0.0273, or 2.73%.

Since the coin is weighted such that heads come up twice as often as tails, let's assign probabilities to each outcome. We can represent this as P(H) = 2/3 (probability of heads) and P(T) = 1/3 (probability of tails).

Now, you want to find the probability of flipping heads 6 times in a row. In this case, we can use the multiplication rule of probability, which states that the probability of multiple independent events occurring is equal to the product of their individual probabilities.

For your scenario, the probability of getting 6 heads in a row is:

P(H₁ and H₂ and H₃ and H₄ and H₅ and H₆) = P(H₁) × P(H₂) × P(H₃) × P(H₄) × P(H₅) × P(H₆)

Since the probability of getting a head on each flip is 2/3, the equation becomes:

(2/3) × (2/3) × (2/3) × (2/3) × (2/3) × (2/3) = (2/3)⁶ ≈ 0.0273

So, the probability of flipping heads 6 times in a row with this weighted coin is approximately 0.0273, or 2.73%.

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The direct method of Lyapunov is a technique used in the analysis of the stability of a dynamical system. It involves the use of a Lyapunov function to determine whether a system is stable or not.

A Lyapunov function is a scalar function V(x) that is defined on the state space of a dynamical system, where x is the state of the system. The function is chosen such that it is positive definite, i.e., V(x) > 0 for all x except possibly at the origin, where V(x) = 0. The time derivative of the Lyapunov function along the trajectories of the system, denoted by V'(x), is also chosen to be negative definite or negative semi-definite, i.e., V'(x) < 0 or V'(x) ≤ 0 for all x except possibly at the origin.

The direct method of Lyapunov uses this Lyapunov function to determine the stability of the system. If a Lyapunov function can be found that satisfies the above conditions, then the system is said to be stable or asymptotically stable, depending on whether V'(x) is negative definite or negative semi-definite, respectively. If a Lyapunov function cannot be found, then the stability of the system cannot be determined using this method.

In addition to determining stability, the direct method of Lyapunov can also be used to determine instability. If a Lyapunov function can be found that satisfies the above conditions, but with V'(x) positive definite or positive semi-definite instead of negative definite or negative semi-definite, respectively, then the system is unstable.

Overall, the direct method of Lyapunov provides a powerful tool for analyzing the stability of a wide range of dynamical systems, including linear and nonlinear systems, time-invariant and time-varying systems, and continuous and discrete-time systems.

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The coordinates of the image of the triangle RST following a dilation by a with the origin as the center of dilation and a scale factor of 4 are;

A. R'(4, 12), S'(12, 12), T'(8, 4)

A dilation transformation is a transformation in which the image dimensions are obtained by resizing the dimensions of the pre-image using a scale factor.

The vertices of the triangle RST are; R(1, 3), S(3, 3), and T(2, 1)

The coordinates of the image of the point (x, y) following a dilation by a scale factor of a about the origin is; (a·x, a·y)

Therefore, the coordinates of the dilated image of the triangle RST after a dilation with the origin as the center of dilation and a scale factor of 4 are;

R(1, 3) ⇒ R'(4 × 1, 4 × 3) = R'(4, 12)

S(3, 3) ⇒ S'(4 × 3, 4 × 3) = S'(12, 12)

T(2, 1) ⇒ T'(4 × 2, 4 × 1) = T'(8, 4)

The correct option is therefore;

A. R'(4, 12), S'(12, 12), T'(8, 4)

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Answer:

a) For help, plot the points on the graphing calculator.

b) Generate a linear regression equation:

y = -2.2857x + 16.8571

y = (-16/7)x + (118/7)

c) See part b.

d) The data shows a negative association.

e) We expect the number of losses to decrease by about 2.2857 per week. The y-intercept, 16.8571, is meaningless since the gamer received the video game at

x = 0.

Therefore, the diameter of the sphere is approximately 20.2 feet when the volume is 6329 cubic feet.

The formula for the volume of a sphere is V = (4/3)πr³, where r is the radius of the sphere. To find the diameter, we need to find the radius first.

(4/3)πr³ = 632

r³ = (3/4)(6329/π)

r = ∛(3(6329/4π))

r ≈ 10.1 feet (rounded to one decimal place)

The diameter of the sphere is twice the radius, so:

d = 2r

≈ 20.2 feet (rounded to one decimal place)

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Answer:

B = {(-4,2), (-2,4), (0,7), (2,9)}

Step-by-step explanation:

The expected number of smokers in a random sample of 150 students from this university is 15.

To calculate the expected number of smokers in a random sample of 150 students at a university where 10% of students smoke, you simply multiply the total number of students in the sample by the percentage of students who smoke:
Expected number of smokers = Total number of students x Percentage of smokers
= 150 students x 10%
= 150 x 0.10
= 15
So, if we know that 10% of students smoke at this university, and we have a random sample of 150 students, we can calculate the expected number of smokers as follows:

Expected number of smokers = 150 x 0.10 = 15

Therefore, we can expect that there will be approximately 15 smokers in a random sample of 150 students from this university.


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To find the center and radius of the sphere whose equation is given by x²+y²+z²+4x−2z−8=0, follow these steps:

Step 1: Rewrite the given equation in the standard form of a sphere.
The standard form of a sphere's equation is (x-a)²+(y-b)²+(z-c)²=r², where (a, b, c) is the center and r is the radius.

Step 2: Complete the squares for the x and z terms.
(x²+4x)+(y²)+(z²-2z)=8
(x+2)²-4+(y²)+(z-1)²-1=8

Step 3: Move the constants to the other side of the equation.
(x+2)²+(y²)+(z-1)²=13

Now the equation is in standard form. We can identify the center and radius. Step 4: Identify the center and radius.
The center (a, b, c) = (-2, 0, 1), and the radius r = √13. So, the center of the sphere is (-2, 0, 1), and the radius is √13.

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Answer:

Height of helicopter above ground = 13.63 feet

Step-by-step explanation:

See attached image to support explanation

B is the point vertically below where the helicopter is located

s is the distance from Sofie to B

d is the distance from Danika to B

We have
s + d = 100 ==> s = 100 -d

h is the height of the helicopter from the base

Both triangles are right triangles

For a right triangle,
tan x = Side opposite hypotenuse/Side adjacent to hypotenuse
where x is the angle between the side adjacent to the hypotenuse

Using this information for both triangles we get

[tex]\tan 10 = \dfrac{h}{s}\\or\\h = s ( \tan 10)\\\\\tan 31 = \dfrac{h}{d}\\or\\h = d (\tan31)\\\\[/tex]

Therefore
s (tan 10) = d ( tan 31)

But s = 100 -d:
(100-d) tan 10 = d ( tan 31)

100(tan 10) - d(tan 10) = d (tan 31)

Switch sides:
d (tan 31) = 100 (tan 10) - d( tan 10)

Add d (tan 10) to both sides:
d (tan 31) + d ·(tan 10) = 100(tan 10)

d(tan 31 + tan 10) = 100 (tan 10)

[tex]d = \dfrac{100(\tan 10)}{\tan 31 + \tan 10}[/tex]

Using a calculator we can compute right side as

[tex]\dfrac{100(\tan 10)}{\tan 31 + \tan 10} = 22.6878[/tex]

So
d = 22.6878

Plug this value of d into h = d sin 31 to get
h = d (tan 31)

h = 22.688 (0.6009)

h = 13.6322....

= 13.63 rounded to 2 decimal places

Height of helicopter above ground = 13.63 feet

An equation of the line of the graph is y = 4x/5 + 4.

A graph of this equation is shown below.

In Mathematics and Geometry, the point-slope form of a straight line can be calculated by using the following mathematical equation (formula):

y - y₁ = m(x - x₁)

Where:

First of all, we would determine the slope of this line;

Slope (m) = (y₂ - y₁)/(x₂ - x₁)

Slope (m) = (8 - 4)/(5 - 0)

Slope (m) = 4/5

At data point (0, 4) and a slope of 4/5, a linear equation for this line can be calculated by using the point-slope form as follows:

y - y₁ = m(x - x₁)

y - 4 = 4/5(x - 0)  

y = 4x/5 + 4

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There are 9,075,135,300 possible 9 card hands that can be made from a set of 36 unique cards.

This is a combination problem, where we want to select 9 cards from a set of 36 cards.

The order of the cards in the hand does not matter, so we need to use the formula for combinations:

n C r = n! / (r! * (n-r)!)

where n is the total number of items, r is the number we want to select, and ! denotes the factorial function.

In this case, we have n = 36 and r = 9. So, the number of 9 card hands we can make is:

36 C 9 = 36! / (9! * (36-9)!)

= (36 x 35 x 34 x 33 x 32 x 31 x 30 x 29 x 28) / (9 x 8 x 7 x 6 x 5 x 4 x 3 x 2 x 1)

= 9,075,135,300

Therefore, there are 9,075,135,300 possible 9 card hands that can be made from a set of 36 unique cards.

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In order to illustrate the position of a table lamp on a table, we can identify the table lamp as P and the table as a flat surface.

From the image attached, we select two edges of the table that  tends to intersect at a right angle to serve as the OX and OY axis.

Then one need to Determine the length 'a' cm from the lamp to the vertical line of reference OY. Determine the value of 'b' cm, which is the vertical distance between point P (lamp) and the OX axis.

Therefore, The table lamp P can be located using the coordinates of  (a,b).

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The relative maximum point in April 2005, was 100.4; the relative minimum point in May 2004, was 71.0; the saddle point in June 2006, was 84.8.

The April 2007 price of 98.6 cents per pound is a saddle point because it is larger than the two adjacent prices in the same row (91.5 and 87.9), but smaller than the two adjacent prices in the same column (86.9 and 100.4).

The April 2008 price of 90.2 cents per pound is a relative minimum because it is smaller than all eight surrounding prices.

The three additional critical points in the table are:

1. Relative maximum point: April 2005, 100.4
2. Relative minimum point: May 2004, 71.0
3. Saddle point: February 2006, 79.4 (larger than the two adjacent prices in the same row, but smaller than the two adjacent prices in the same column).

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The radius of the cylinder is 10 centimetres according to stated dimensions of the cylinder.

The volume of the cylinder is given by the formula-

Volume = πr²h, where r refers to radius of the circle. Keep the values in formula to find the value of radius of the cylinder

1600π = πr²×16

Cancelling π and 16 common on both sides of the equation.

r² = 100

r = ✓100

Taking square root on Right Hand Side of the equation to find the radius of the cylinder

r = 10 centimetres

Hence the radius is 10 centimetres.

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The method "fibmemo" is a recursive method that calculates the nth Fibonacci number using the top-down strategy. To implement this method, you will need to create a recursive helper method that stores previously calculated fibonacci numbers using an array called "memo".

Here's how the helper method can be implemented:

private static long fibHelper(int n, long[] memo) {
 if (n == 0 || n == 1) {
   return n;
 } else if (memo[n] != 0) {
   return memo[n];
 } else {
   memo[n] = fibHelper(n-1, memo) + fibHelper(n-2, memo);
   return memo[n];
 }
}

In this method, we first check if n is equal to 0 or 1, in which case we return n itself. If the nth Fibonacci number has already been calculated and stored in the memo array, we return that value directly. Otherwise, we calculate the nth fibonacci number by recursively calling the helper method for (n-1) and (n-2), and add the results. We then store the calculated value in the memo array for future use.

Now we can use this helper method to implement the "fibmemo" method:

public static long fibmemo(int n) {
 long[] memo = new long[n+1];
 return fibHelper(n, memo);
}

In this method, we create an array called "memo" that can store previously calculated fibonacci numbers up to the nth fibonacci number. We then call the helper method with the input n and the memo array, which will recursively calculate the nth fibonacci number using the top-down strategy and return the result.

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Therefore, the area of the tile shown is approximately 58 cm^2, which is closest to the first option, 58 cm^2.

We know that BC = 3 cm and CD = 7 cm. We also know that AD = 4 cm and BD = 6 cm. To find the length of AB, we can use the Pythagorean theorem:

AB^2 = Ad² + BD²

AB^2 = 4² + 6²

AB² = 52

AB = √(52) =

2 * √(13) cm

Area = (1/2) x (sum of parallel sides) x (distanc)

In this case, the sum of the parallel sides is AB + BC = 2sqrt(13) + 3 cm, and the distance between them is CD = 7 cm. So:

Area = (1/2) x (2* √(13) + 3) x 7

Area = (√(52) + 3/2) x 7

Area ≈ 58 cm²

Therefore, the area of the tile shown is approximately 58 cm^2, which is closest to the first option, 58 cm^2.

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Answer: y = 1x - 1

Step-by-step explanation: To make the equation using y = mx +b, we need to find the slope of the line and the y intercept (the y value of the graph when the line goes through the y axis).

To find the slope (m), we need to calculate the rise over run or the change in y over the change in x value. Because it is a straight line, the slope is the same throughout the line. Let's choose two points: (2,1) and (-2,-3). Now we use the formula:

Δy/Δx or (y2 - y1)/(x2 - x1)

In this case y2 = 1, x2 = 2, y1 = -3, and x1=-2

Plug in the values in the equation to give...

(1 - (-3)) / (2 - (-2)) = 4/4 = 1

Thus the slope is 1.

This makes sense since the line increases 1 block of height for every 1 block is travels horizontally.

Next, you will need the y-intercept which is -1 because the line intercept the y axis at the value of -1 so the b value is -1.

Finally, plug the values into the y=mx+b to get

y = 1x - 1 or y = x - 1

(x and 1x are the same thing)

The x-intercept and the y-intercept of the function

1.(8, 6)

2. (4.5, 6)

We have,

1. f(x) = -3/4x + 6

2. f(x) = -4/3x + 6

So, to find x intercept put f(x)= 0

1. 0 = -3/4x + 6

-6 = -3/4x

x = 24/3

x= 8

2. 0= -4/3x + 6

-4/3x = -6

x= 18/4

x= 4.5

Now, to find y intercept put x = 0

1. f(x) = -3/4(0)+6 =

2. f(x) = -4/3(0) +6 = 6

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The above prmpt is about construction of geometric shapes. See the answers below.

a) you would need to use your compass.

i) place extend your compass to say about 30 degree.
ii) place the ponted tip on one end of the existing line segment and make two arcs on both sides of the line. Place the compass on the other end of the line and repreat.

iii) Now you have created arcs that intersect one another.

iv) place your ruler between the intersections and draw such that the points on each intersection connect with one another. This will create a line perpendicular to the exising one.

b) in this case, simple use your ruler to measure the distance between the existing dot and the line segment.

Carefully without moving your ruler upwads or downwards, extend sideways then make another dot jus tlike the original one.

Now connect both dots. This will given you two parallel lines.

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The measures of the angles and the proofs are shown below

Circle 4

The angle at the centre is twice the angle at the circumference

So, we have

360 - ∠BOD = 2 * 110

Evaluate

∠BOD = 140

Circle 5

Angle in a semicircle is 90 degrees

So, we have

∠ABD + 19 = 90

∠ABD = 71

Angles in the same segment are equal

So, we have

∠ACB = 19

Circle 6

Angle in a semicircle is 90 degrees

So, we have

5y + y = 90

y = 15

So, we have

∠BAC = 5 * 15

∠BAC = 75

Circle 7

By corresponding angle theorem, we have

∠ABO = ∠CDO

By the sum of opposite internal angles in a triangle, we have

∠BOC = ∠BAO + ∠ABO

Substitute ∠ABO = ∠CDO

∠BOC = ∠BAO + ∠CDO --- proved

The angles at the edges are equal because they are corresponding angles of congruent isosceles triangles

Cyclic Quadrilateral

The opposite angles of cyclic quadrilaterals add up to 180 degrees

So, we have

180 - ∠x + 180 - ∠y = 180

Evaluate

∠x + ∠y = 180 --- proved

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To set up a partial fraction decomposition for a rational expression, we want to express it as a sum of simpler fractions, with each denominator being a linear factor (i.e. a factor of the form ax + b, where a and b are constants). The general form of a partial fraction decomposition is:

f(x) = A/(ax + b) + B/(cx + d) + ...

where A, B, etc. are constants that we'll need to solve for.

Note that we're not trying to find specific values for A, B, etc. in this question - we're just setting up the decomposition.

So, for each rational expression, we'll need to factor the denominator into linear factors (if it's not already in that form). Then we'll set up the partial fraction decomposition using the formula above. Here are a few examples:

Example 1: (x^2 + 5x + 6)/(x^2 + 4x + 3)

First, let's factor the denominator: x^2 + 4x + 3 = (x + 1)(x + 3). So we can write:

(x^2 + 5x + 6)/(x^2 + 4x + 3) = A/(x + 1) + B/(x + 3)

Note that we have two linear factors in the denominator, so we need two terms in the partial fraction decomposition. We don't know what A and B are yet - we'll need to solve for them.

Example 2: (2x + 5)/(x^2 - 4)

The denominator here is not yet in factored form, so we'll need to factor it first: x^2 - 4 = (x + 2)(x - 2). Then we can write:

(2x + 5)/(x^2 - 4) = A/(x + 2) + B/(x - 2)

Again, we have two linear factors in the denominator, so we need two terms in the partial fraction decomposition.

Example 3: (4x^2 - 2x + 1)/(x^3 + x)

The denominator here is not in factored form, so we'll need to factor it: x^3 + x = x(x^2 + 1). Then we can write:

(4x^2 - 2x + 1)/(x^3 + x) = A/x + B/(x^2 + 1)

In this case, we have one linear factor (x) and one quadratic factor (x^2 + 1), so we need two terms in the partial fraction decomposition.

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The probability that a randomly selected person spent more than $23 is approximately 0.4332 or 43.32%.

To find the probability that a randomly selected person spent more than $23, we need to use the standard normal distribution formula:

Z = (X - μ) / σ

where X is the amount spent on a restaurant meal, μ is the mean amount spent, σ is the standard deviation, and Z is the corresponding standard normal random variable.

Substituting the given values, we have:

Z = (23 - 22) / 6
Z = 0.1667

Using a standard normal distribution table or calculator, we can find the probability that Z is greater than 0.1667, which is:

P(Z > 0.1667) = 0.4332

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The first four non-zero terms of the Taylor series expansion of f(x)=e^x sin x, centered at c=0, are: f(x) = x + x^2/2 + x^3/3! + ...

To find the Taylor series expansion of f(x)=e^x sin x, we need to first find the Taylor series expansions of e^x and sin x centered at c=0.

The Taylor series expansion of e^x centered at c=0 is:

e^x = 1 + x + (x^2)/2! + (x^3)/3! + ...

And the Taylor series expansion of sin x centered at c=0 is:

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

To find the Taylor series expansion of f(x)=e^x sin x, we need to multiply these two series together. We can do this using the "r series" method, where we take the product of the first r terms of each series and then add up all the resulting terms.

So the first term of the series for f(x) is simply the product of the first term of each series:

f(x) = e^0 * sin(0) = 0

The second term is the sum of the product of the second term of the e^x series and the first term of the sin x series, and the product of the first term of the e^x series and the second term of the sin x series:

f(x) = e^0 * sin(x) + e^x * sin(0) = x

The third term is the sum of the product of the third term of the e^x series and the first term of the sin x series, the product of the second term of the e^x series and the second term of the sin x series, and the product of the first term of the e^x series and the third term of the sin x series:

f(x) = e^0 * sin(x) + e^x * sin(0) + (x^2)/2! * sin(x) = x + x^2/2

The fourth term is the sum of the product of the fourth term of the e^x series and the first term of the sin x series, the product of the third term of the e^x series and the second term of the sin x series, the product of the second term of the e^x series and the third term of the sin x series, and the product of the first term of the e^x series and the fourth term of the sin x series:

f(x) = e^0 * sin(x) + e^x * sin(0) + (x^2)/2! * sin(x) + (x^3)/3! * sin(0) = x + x^2/2 + x^3/3!

So the first four non-zero terms of the Taylor series expansion of f(x)=e^x sin x, centered at c=0, are:

f(x) = x + x^2/2 + x^3/3! + ...

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