True or false: an equation in the form of y=Ax^2+Bx+C where A, B and C are integers, represents a linear function

The final answer is option b.

A discrete probability distribution is made up of discrete variables. Specifically, if a random variable is discrete, then it will have a discrete probability distribution. For example, let’s say you had the choice of playing two games of chance at a fair.

The distribution is not a discrete probability distribution because the probability of getting x=5 is greater than 1, which violates the property of probabilities lying inclusively between 0 and 1. Therefore, the correct answer is (b). This violates the basic rule of probability, which states that the probability of an event occurring is always between 0 and 1 inclusive. A discrete probability distribution is a probability distribution of a discrete random variable. It assigns probabilities to each possible value that the random variable can take.

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The subtended arc along the circle is 79/360 of the circle's circumference. Therefore, the subtended arc is approximately 0.2194 times as long as 1/360 of the circle's circumference.


To find the length of the subtended arc along the circle, we need to know what fraction of the circle's circumference it represents.

The angle measures 79 degrees, which is a little over 1/5 of a full circle (which measures 360 degrees). Therefore, the subtended arc represents a little over 1/5 of the circle's circumference. More precisely, it represents 79/360 of the circle's circumference.

To find out how many times as long the subtended arc is as 1/360 of the circle's circumference, we can divide the length of the subtended arc by the length of 1/360 of the circle's circumference. This gives us:

(79/360) / (1/360) = 79

So the subtended arc is 79 times as long as 1/360 of the circle's circumference. Alternatively, we can express this as a decimal by dividing the subtended arc by 1/360:

(79/360) ÷ (1/360) = 0.2194

So the subtended arc is approximately 0.2194 times as long as 1/360 of the circle's circumference.

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Simplify and rearrange the equation, if necessary, to get the desired form (such as slope-intercept form y = mx + b or standard form Ax + By = C).

By following this process, you will be able to write an equation of a line when given two points of a line.

Identify the two points, let's call them (x1, y1) and (x2, y2).
Calculate the slope (m) using the formula: m = (y2 - y1) / (x2 - x1).
Choose one of the points, say (x1, y1), to use in the point-slope formula: y - y1 = m(x - x1).
Replace the values of x1, y1, and m in the formula from step 3.
Simplify and rearrange the equation, if necessary, to get the desired form (such as slope-intercept form y = mx + b or standard form Ax + By = C).

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The residual be for an observed value of (3, 510) is option a. -2.

To find the residual, we need to first plug in the given observed value of (3, 510) into the equation for the least squares regression line:

ý = 500 + 4x
ý = 500 + 4(3)
ý = 512

So the predicted value for this observation is 512. To find the residual, we subtract the predicted value from the actual observed value:

Residual = Observed value - Predicted value
Residual = 510 - 512
Residual = -2

Therefore, the residual for an observed value of (3, 510) is -2. Answer choice (a) is correct.

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The equation 3x + 2 Cos X + 5 = 0 has exactly one real root.

Why the equation exactly one real root?

To show that the equation 3x + 2 Cos X + 5 = 0 has exactly one real root, follow these steps:

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If 5^a = y, then we can rewrite 25 as 5^2. Therefore, we have:

25^a = (5^2)^a

= 5^(2a)

Now, we can substitute y for 5^a to get:

25^a = 5^(2a)

= (5^a)^2

= y^2

Therefore, 25^a is equal to y^2.

To include aspects such as how much variability or spread we see (A), where the values tend to be centered (C), and the shape and unusual values, such as outliers (D).

When describing the behavior in a distribution of a quantitative variable, you should include the following aspects:
A. How much variability or spread we see.
C. Where the values tend to be centered.
D. The shape and unusual values (outliers).
When describing the behavior in a distribution of a quantitative variable, we should be sure to include aspects such as how much variability or spread we see (A), where the values tend to be centered (C), and the shape and unusual values, such as outliers (D).

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Using the point-normal form of a plane, the tangent plane equation is -2x + 4y + z + 1 = 0 or equivalently z = -2x - 4y + 3.

To find the equation of the tangent plane to the surface z=-x^2-2y^2 at the point (1,1,-3), we need to find the partial derivatives of the surface with respect to x and y.

∂z/∂x = -2x
∂z/∂y = -4y

At the point (1,1,-3), these partial derivatives are:

∂z/∂x = -2(1) = -2
∂z/∂y = -4(1) = -4

Using the point-normal form of a plane, the equation of the tangent plane is:

-2(x-1) -4(y-1) + (z+3) = 0

Simplifying:

-2x + 4y + z + 1 = 0

Therefore, the equation of the tangent plane to the surface z=-x^2-2y^2 at the point (1,1,-3) is -2x + 4y + z + 1 = 0.

To find the equation of the tangent plane to the surface z = -x^2 - 2y^2 at the point (1,1,-3), we first need to find the partial derivatives of the function with respect to x and y.

∂z/∂x = -2x
∂z/∂y = -4y

Now, we evaluate these partial derivatives at the point (1,1,-3):

∂z/∂x(1,1) = -2(1) = -2
∂z/∂y(1,1) = -4(1) = -4

The gradient of the function at the point (1,1,-3) is given by the vector <-2, -4, 1>. Using the point-slope form of a plane, we can write the equation of the tangent plane as:

z - (-3) = -2(x - 1) - 4(y - 1)

Simplifying the equation gives:

z + 3 = -2x + 2 - 4y + 4

z = -2x - 4y + 3

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A repeated-measures experiment involves measuring the same participants multiple times, which can introduce carry-over effects. This means that the experience or treatment received in one condition may affect the results of the subsequent conditions. To avoid this issue, researchers may use counterbalancing techniques or a randomized order of conditions. Another concern with repeated-measures experiments is obtaining negative values for difference scores, which may be an indication of a ceiling or floor effect. Additionally, individual differences between participants can impact the results, leading to a mean difference that is not solely due to the treatment. To address this concern, researchers may use statistical methods such as ANOVA or MANOVA to control for individual differences. Lastly, obtaining a large enough sample is important to ensure that the results are representative of the population and that any effects are not due to chance.
A major concern with a repeated-measures experiment is the possibility of carry-over effects, which can occur when the influence of one treatment persists into the subsequent treatment, potentially skewing the results. Additionally, negative values for difference scores might complicate the interpretation of the data. Another concern is obtaining a mean difference due to individual differences rather than treatment differences, which could lead to misleading conclusions. Lastly, securing a large enough sample size is crucial for obtaining reliable and generalizable results in such experiments.

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The correct formula for dz/dx is (b) dz/dx = ∂z/∂r dr/dx + ∂z/∂s ds/dx + ∂z/∂t dt/dx. This is because z depends on variables r, s, and t, and each of these variables depend on x.

Therefore, to find how z changes with respect to x, we need to take into account how each of the variables r, s, and t change with respect to x. This is captured in the formula by taking the partial derivative of z with respect to each variable (r, s, t) and multiplying it by the corresponding partial derivative of that variable with respect to x. Based on your question, you want to find a formula for dz/dx given that z depends on variables r, s, and t, and r, s, and t each depend on a variable x. Using the chain rule, the correct formula for dz/dx is: (b) dz/dx = ∂z/∂r dr/dx + ∂z/∂s ds/dx + ∂z/∂t dt/dx.

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The solution to the equation 6³ˣ = 279,936 is x ≈ 3.5, correct to 3 decimal places.

The equation we need to solve is 6³ˣ = 279,936. Our goal is to find the value of x that satisfies this equation. To do this, we need to use logarithms.

First, we take the logarithm of both sides of the equation. It doesn't matter which logarithm we use, but let's use the natural logarithm (ln) here:

ln(6³ˣ) = ln(279,936)

We can use the power rule of logarithms to simplify the left-hand side of the equation:

3x ln(6) = ln(279,936)

Now we can solve for x by dividing both sides of the equation by 3 ln(6):

x = ln(279,936) / (3 ln(6))

Using a calculator, we can evaluate this expression to get x ≈ 3.5.

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To solve this problem, we need to use the formula for work done against gravity, which is:

W = mgh

Where:
W = work done (in joules or foot-pounds)
m = mass (in kilograms or pounds)
g = acceleration due to gravity (9.8 m/s² or 32.2 ft/s²)
h = height (in meters or feet)

First, we need to find the mass of the oil in the tank. We can do this by finding the volume of the tank and multiplying it by the density of the oil:

V = (2/3)πr³ = (2/3)π(10³) = 2093.39 ft³

m = ρV = 50(2093.39) = 104669.5 lbs

Next, we need to find the height that the oil needs to be pumped. Since the top of the tank is 6 feet below ground, and the tank has a radius of 10 feet, the height of the oil is:

h = 10 - 6 = 4 ft

Now we can plug in the values into the formula for work done:

W = mgh = 104669.5(4)(32.2) = 13,446,725.8 ft-lbs

Therefore, the work done pumping the oil to the surface is 13,446,725.8 foot-pounds.
To find the work done pumping the oil to the surface, we can use the following formula:

Work = density × volume × distance × gravity

In this case, the density of the oil is 50 lbs/ft³, and the radius of the hemispherical tank is 10 ft. The volume of a hemisphere can be calculated using the formula:

Volume = (2/3) × π × r³

Substituting the values, we get:

Volume = (2/3) × π × (10 ft)³ ≈ 2094.4 ft³

Since the tank is underground, the oil needs to be pumped 6 ft above the ground. The distance is therefore 6 ft, and the gravity is approximately 32.2 ft/s².

Now we can calculate the work:

Work = (50 lbs/ft³) × (2094.4 ft³) × (6 ft) × (32.2 ft/s²) ≈ 20,167,296 ft-lbs

So, the work done pumping the oil to the surface is approximately 20,167,296 ft-lbs.

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The last eight digits of one more solution for the equation X^2 = X with the last digit being 6 are ...0000056

To find the last eight digits of a solution for the equation X^2 = X, where the last digit is 6, please follow these steps:

1. Note that we're looking for a number X that ends with 6 and satisfies the equation X^2 = X.
2. Write down the equation: X^2 - X = 0.
3. Factor the equation: X(X - 1) = 0.
4. Find a number Y that ends with a 5, so when multiplied by (Y - 1) which ends with a 4, the product ends with a 6.

Let's use Y = ...00000075 as our example:

5. Verify that Y^2 = Y:
   (...00000075)^2 = ...000005625,
   Y^2 - Y = ...000005625 - ...00000075 = ...0000056.
6. Confirm that the last eight digits of the solution are ...0000056.

So, the last eight digits of one more solution for the equation X^2 = X with the last digit being 6 are ...0000056.

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For the equilibrium system of Ni(H2O)6(aq) + 6NH3(aq) + HCl, adding more HCl will shift the equilibrium to the right, resulting in more Ni(NH3)2(aq) and H2O(l) being formed.

For the equilibrium system of Cu(H2O)4(aq) + 4Br-(aq) + heat, adding more heat (or increasing temperature) will shift the equilibrium to the left, resulting in less CuBr2(aq) and H2O(l) being formed.

For the equilibrium system of SO3(g) + 120(g) ↔ SO2(g) + O2(g), removing heat (or decreasing temperature) will shift the equilibrium to the right, resulting in more SO2(g) and O2(g) being formed.

For the equilibrium system of Ag2CO3(s) + 2Ag+(aq) + CO32-(aq), adding HCl(aq) will shift the equilibrium to the left, resulting in less Ag2CO3(s) and more Ag+(aq) and CO32-(aq) being formed.

For the equilibrium system of CaCO3(s) ↔ Ca2+(aq) + CO32-(aq), adding rainwater (which is typically slightly acidic) will shift the equilibrium to the left, resulting in less Ca2+(aq) and CO32-(aq) and more CaCO3(s) being formed.

For the equilibrium system of CH3COOH(aq) ↔ CH3COO-(aq) + H+(aq), adding CH3COONa(aq) will shift the equilibrium to the left, resulting in less CH3COO-(aq) and more CH3COOH(aq) being formed

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Answer: Part A: The two factors in this expression are 5 and (6 + 4x).

Part B: There is only one term in the first factor (5), and two terms in the second factor (6 and 4x).

Part C: The coefficient of the variable term is 4, since it is the coefficient of the term 4x.

Step-by-step explanation:

According to composition table. H satisfies all three conditions of a subgroup and is hence a subgroup of GL2(C).

To verify if H is a subgroup of GL2(C), we need to check if it satisfies the three conditions of a subgroup: closure, associativity, and existence of an identity element and inverses.

We need to check if the product of any two elements in H is also in H. We can construct the composition table by computing the product of each pair of elements in H. For instance, ij = k, ji = -k, ii = jj = -1, and so on. After computing all products, we can verify that they all belong to H.

The composition of three or more elements in H is associative since matrix multiplication is associative.

The identity element is the 2x2 identity matrix (1 0; 0 1), which is in H since ±1 is one of the eight matrices.

We need to check if each element in H has an inverse in H. The inverse of a matrix A in H is its conjugate transpose A*, which is also in H since its entries are complex conjugates of the entries of A. Moreover, the product of a matrix A and its conjugate transpose A* is the 2x2 identity matrix.

Moreover, since H has eight elements, it is a finite group of order eight. This group is known as the quaternion group, and it has many applications in physics, computer graphics, and robotics.

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Aphrodite will have $56 293.2 in 20 years if she invests $12,345 in a mutual fund that grows at a rate of 7.89% per year

To calculate the future value of Aphrodite's investment, we can use the formula for compound interest:

FV = PV x (1 + r)ⁿ

where FV is the future value, PV is the present value, r is the annual interest rate expressed as a decimal, and n is the number of years.

7.89% is the rate of interest

Substituting the given values, we get:

FV = $12,345 x (1 + 0.0789)²⁰

FV = $12,345 x 4.56

FV = $56,293.2

Therefore, Aphrodite will have $56 293.2 in 20 years if she invests $12,345 in a mutual fund that grows at a rate of 7.89% per year.

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Special right triangles are right-angled triangles whose interior angles are fixed and sides are always in a defined ratio.

A triangle is a three sided polygon, which has three vertices and three angles which has the sum 180 degrees.

Given that;

To define the term Special right triangles.

We know that;

Special right triangles are right-angled triangles whose interior angles are fixed and sides are always in a defined ratio.

And, There are two types of special right triangles,

One which has angles that measure 45°, 45°, 90°;

And, the other which has angles that measure 30°, 60°, 90°.

Thus, Special right triangles are right-angled triangles whose interior angles are fixed and sides are always in a defined ratio.

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Answer:

2.1

Step-by-step explanation:

sorry if im wrong

The taxable income of Marcel and Stephanie is less than their annual salary because they are allowed to make deductions from their income before calculating their taxable income.

These deductions include contributions to retirement plans, health insurance premiums, and other eligible expenses. The amount of deductions varies depending on factors such as the type of expense and the individual's tax filing status.

Thus, the taxable income is the amount of income that is subject to taxation, and it is generally lower than the individual's annual salary. In the case of Marcel and Stephanie, their taxable incomes are calculated by subtracting their deductions from their respective annual salaries.

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Complete Question:

Why are Marcel's and Stephanie's taxable incomes less than their annual salary? Marcel's annual salary is $30,000 and his income is $17,450. Stephanie's annual salary is $50,000 and her income is $37,600.

To find the volume of the solid generated by rotating the region in the first quadrant enclosed by the coordinate axes, the line x=pi, and the curve y=cos(cosx) about the x-axis, we can use the disk method.

Let's consider a small slice of the solid at a given value of x. The slice is a disk with radius y=cos(cosx) and thickness dx. The volume of the slice is then given by:

dV = pi * (cos(cosx))^2 * dx

Integrating this expression from x=0 to x=pi, we obtain the total volume of the solid:

V = integral from 0 to pi of pi * (cos(cosx))^2 dx

Unfortunately, this integral does not have an elementary closed form solution. We can approximate the value using numerical methods, such as Simpson's rule or the trapezoidal rule. Using Simpson's rule with 1000 intervals, we obtain:

V ≈ 0.6347 cubic units

Therefore, the volume of the solid generated by rotating the region in the first quadrant enclosed by the coordinate axes, the line x=pi, and the curve y=cos(cosx) about the x-axis is approximately 0.6347 cubic units.

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For the given problem the required value of x is 12°.

An angle is a geometric figure formed by two rays or line segments that share a common endpoint, called the vertex. The two rays or line segments are called the arms of the angle.

The measure of an angle is determined by the amount of rotation needed to bring one arm of the angle to coincide with the other arm.

There can be types of Angles on the basis of their size, shape, and location. The most common classification is based on the size of the angle. An acute angle is an angle that measures less than 90 degrees, while a right angle measures exactly 90 degrees.

An obtuse angle measures more than 90 degrees but less than 180 degrees, and a straight angle measures exactly 180 degrees. An angle that measures more than 180 degrees but less than 360 degrees is called a reflex angle, while an angle that measures exactly 360 degrees is a full angle.

Here from the given figure it is clear that sum of angles 2x° and (4x+108)° are making angle 180°.

Because they are form a straight angle.

So, 2x°+ (4x+108)° = 180°

2x°+4x° = 180°-108°

6x° = 72°

x° = 12°

Therefore, the value of 'x' is 12°.

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For the given integral ∫x10 e7x dx, the appropriate choices for u and dv to use integration by parts are u = x¹⁰ and dv = e⁷ˣ dx.

Integration by parts is a technique used to find the integral of a product of two functions.

The formula for integration by parts is given by:

∫ u dv = u v − ∫ v du

where u and v are functions of x and dv and du are their respective differentials.

To use integration by parts for the given integral, we need to identify u and dv.

We do this by using the acronym "ILATE", which stands for inverse trigonometric functions, logarithmic functions, algebraic functions, trigonometric functions, and exponential functions. In this case, we have:

U = x (algebraic function)

dv = x¹⁰ e dx (exponential function)

We choose u as x and dv as x10 e7x dx.

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The total number of possible outcome combinations for the 4 teams with win, lose, and draw results is 81.

To determine the number of outcome possibilities for 4 teams with win, lose, and draw results, we can use the following steps:

1. Identify the number of teams: 4
2. Identify the number of possible outcomes for each team: win, lose, draw (3 outcomes)
3. Calculate the total number of outcome possibilities using the formula: total outcome possibilities = (number of outcomes per team) ^ (number of teams)

In this case, the total outcome possibilities are:

Total outcome possibilities = 3^4 = 81

So, there are 81 possible outcome combinations for the 4 teams with win, lose, and draw results.

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Answer:

[tex]c = \sqrt{ {2.2}^{2} + {.6}^{2} } = \sqrt{5.2} = 2.28[/tex]

So the hypotenuse is about 2.3 millimeters.

Answer:

The experimental probability of drawing a diamond is 0.15.

Step-by-step explanation:

The student drew cards from a standard deck of 52 cards, 20 times. The outcome shows that the diamond card was drawn 3 times.

The experimental probability of drawing a diamond card can be calculated as the number of times a diamond was drawn divided by the total number of draws:

Experimental probability of drawing a diamond = Number of times a diamond was drawn / Total number of draws Experimental probability of drawing a diamond = 3 / 20 Experimental probability of drawing a diamond = 0.15

Therefore, the experimental probability of drawing a diamond is 0.15.

the equation for a curve whose slope at any point (x,y) is 2 is y = 2x + C. The constant C determines the position of the curve in the y-axis.

The general form of a differential equation with a slope of 2 at any point (x,y) is:

dy/dx = 2

Using separation of variables, we can write:

dy = 2 dxdxcancan

Integrating both sides gives:

y = 2x + C

where C is an arbitrary constant of integration.

Therefore, the equation for a curve whose slope at any point (x,y) is 2 is y = 2x + C. The constant C determines the position of the curve in the y-axis.
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When mixing a quantity of electrolyte for a storage battery, the electrician uses a ratio of 2 parts of acid and 3 parts of water. This means that for every 5 parts of the mixture, 2 parts are acid and 3 parts are water.

To find the percentage of acid in the mixture, we can use the formula:

% acid = (parts of acid / total parts of mixture) x 100

In this case, we have 2 parts of acid and 3 parts of water, for a total of 5 parts. So:

% acid = (2 / 5) x 100
% acid = 40

Therefore, the percentage of acid in the mixture is 40%.
Hi! When mixing an electrolyte for a storage battery, the electrician uses 2 parts of acid and 3 parts of water. To find the percentage of acid, you can follow this formula:

Percentage of acid = (Parts of acid / Total parts) * 100

Total parts = 2 (acid) + 3 (water) = 5

Percentage of acid = (2 / 5) * 100 = 40%

So, the mixture consists of 40% acid.

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The centroid of the quarter-circular region with radius a is located at (Cx, Cy) or ((4a)/(3π), (4a)/(3π)).

To find the centroid of a quarter-circular region of radius a, we can use Exercise 22 which states that the centroid of a region bounded by a curve y=f(x), the x-axis, and the vertical lines x=a and x=b is given by:

(x-bar, y-bar) = ((1/A)*∫[a,b] x*f(x) dx, (1/A)*∫[a,b] (1/2)*f(x)^2 dx)

where A is the area of the region.

In this case, the curve y=f(x) is the upper half of a circle with radius a, which can be written as:

y = √(a^2 - x^2)

So, we need to find the area A of the quarter-circular region, which is given by:

A = (1/4)*π*a^2

Then, we can find the x-coordinate of the centroid using:

x-bar = (1/A)*∫[0,a] x*√(a^2 - x^2) dx

This integral can be evaluated using the substitution u = a^2 - x^2, which gives:

x-bar = (1/A)*∫[a^2,0] (a^2 - u)^(1/2) du

Using the formula for the integral of a power function, we get:

x-bar = (1/A)*[(2/3)*(a^2)^(3/2)]

Simplifying this expression, we get:

x-bar = (4/3)*a/π

Next, we need to find the y-coordinate of the centroid using:

y-bar = (1/A)*∫[0,a] (1/2)*[√(a^2 - x^2)]^2 dx

This simplifies to:

y-bar = (1/A)*∫[0,a] (1/2)*(a^2 - x^2) dx

Evaluating this integral, we get:

y-bar = (1/A)*[(1/2)*a^3]

Simplifying this expression, we get:

y-bar = (1/4)*a

Therefore, the centroid of the quarter-circular region of radius a is located at the point:

(x-bar, y-bar) = ((4/3)*a/π, (1/4)*a)
Hi! To find the centroid of a quarter-circular region of radius a, we can use the following formulas:

For a quarter-circle, the area (A) is:
A = (1/4)πa²

The coordinates for the centroid (C) are given by:
Cx = (4a)/(3π)
Cy = (4a)/(3π)

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Correct question:

What formulas can be used to find the centroid of a quarter-circular region of radius a? How do you derive these formulas? What is the area of the quarter-circular region? What are the x- and y-coordinates of the centroid of the quarter-circular region?