E. Prove the following (quantification) argument is invalid All BITSians are intelligent. Rahul is intelligent. Therefore, Rahul is a BITSian.

To solve the problem and calculate the original principal, we need more information or context. The options given (4406, 4718, 4500, none of them) seem to be potential values for the original principal, but there isn't any calculation or formula given to use.

In order to calculate the original principal, we typically need additional information such as the interest rate, the time period, and possibly the final amount or the interest earned. Without this information, we cannot determine the exact value of the original principal.

Hence for solving the given question we need sufficient amount of information in form of values to apply it in the given question and find the optimum and correct solution.

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The term that describes the distribution of the given graph is "skewed left."

Based on the given dot plot, the distribution of the graph can be described as skewed left.

A skewed left distribution, also known as a negatively skewed distribution, is characterized by a longer tail on the left side of the graph.

In this case, the values 1, 1, 1, 2, and 3 are clustered on the left side, indicating a concentration of lower values.

The distribution gradually becomes less dense as the values increase.

The term "skewed left" accurately describes the shape of the graph in this dot plot.

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Part 1: The solution to the inequality -3(x - 2) ≤ 0 is x ≥ 2.

Part 2: The solution to the inequality is any value of x that is greater than or equal to 2.

Part 3: Verifying the solution, we substitute x = 2 and x = 3 into the original inequality and find that both values satisfy the inequality.

Part 1:

To solve the inequality -3(x - 2) ≤ 0, we need to isolate the variable x.

-3(x - 2) ≤ 0

Distribute the -3:

-3x + 6 ≤ 0

To isolate x, we'll subtract 6 from both sides:

-3x ≤ -6

Next, divide both sides by -3. Remember that when dividing or multiplying by a negative number, we flip the inequality sign:

x ≥ 2

Therefore, the solution to the inequality is x ≥ 2.

Part 2:

A verbal statement describing the solution to the inequality is: "The solution to the inequality is any value of x that is greater than or equal to 2."

Part 3:

To verify the solution, we can substitute two elements of the solution set into the original inequality and check if the inequality holds true.

Let's substitute x = 2 into the inequality:

-3(2 - 2) ≤ 0

-3(0) ≤ 0

0 ≤ 0

The inequality holds true.

Now, let's substitute x = 3 into the inequality:

-3(3 - 2) ≤ 0

-3(1) ≤ 0

-3 ≤ 0

Again, the inequality holds true.

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The rate of change for the given linear function on the coordinate plane is 5.

To find the rate of change of a linear function, we can use the formula:

Rate of change = (change in y-coordinates)/(change in x-coordinates).

Given the points (1, -1) and (2, 4), we can calculate the change in y-coordinates as 4 - (-1) = 5, and the change in x-coordinates as 2 - 1 = 1.

Substituting these values into the formula, we have:

Rate of change = 5/1 = 5.

Therefore, the rate of change for the given linear function is 5.

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Answer:

AM: 8.6 units

BM: 8.6 units

M is the center

Step-by-step explanation:

We are given that the diameter of a circle is AB, where point A is at (-1, -9) and point B is (-11, 5).

We know that point M, which is at (-6, -2) is on AB. We want to know if it is the center of the circle.

If it is the center, then it means that the distance (measure) of AM is the same as the distance (measure) of BM.

Recall that the distance formula is [tex]\sqrt{(x_2-x_1)^2+(y_2-y_1)^2}[/tex], where [tex](x_1,y_1)[/tex] and [tex](x_2,y_2)[/tex] are points.

The endpoints are point A and point M. We can label the values of the points to get:

[tex]x_1=-1\\y_1=-9\\x_2=-6\\y_2=-2[/tex]

Now, plug them into the formula.

[tex]d=\sqrt{(x_2-x_1)^2+(y_2-y_1)^2}[/tex]

[tex]d=\sqrt{(-6--1)^2+(-2--9)^2}[/tex]

[tex]d=\sqrt{(-6+1)^2+(-2+9)^2}[/tex]

[tex]d=\sqrt{(-5)^2+(7)^2}[/tex]

[tex]d=\sqrt{25+49}[/tex]

[tex]d=\sqrt{74}[/tex] ≈ 8.6 units

The endpoints are point B and point M. We can label the values and get:

[tex]x_1=-11\\y_1=5\\x_2=-6\\y_2=-2[/tex]

Now, plug them into the formula.

[tex]d=\sqrt{(x_2-x_1)^2+(y_2-y_1)^2}[/tex]

[tex]d=\sqrt{(-6--11)^2+(-2-5)^2}[/tex]

[tex]d=\sqrt{(-6+11)^2+(-2-5)^2}[/tex]

[tex]d=\sqrt{(5)^2+(-7)^2}[/tex]

[tex]d=\sqrt{25+49}[/tex]

[tex]d=\sqrt{74}[/tex] ≈ 8.6 units.

Since the length of AM an BM are the same, M is the center of the circle.

The determinant of the given matrix is 15.

By observing the matrix [4 6 -1 2 3 2 1 -1 1], we get the value of the determinant to be 15.

To verify this result, we can compute the determinant as follows:`Δ = [4(3(-1) - (-1)(2)) - 6(2(-1) - 1(2)) + (-1)(2(2) - 3(1))]

`Expanding the equation, we get: `Δ = [4(-5) - 6(-6) + (-1)(-1)]`

Δ = [-20 + 36 - 1]

`Δ = 15`

Therefore, the determinant of the given matrix is 15.

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Answer:

F(b) - F(a)

Step-by-step explanation:

[tex]F(x) = \int f(x) \, dx[/tex]

a)  Contingency tables: Total   100.00% 100.00%  100.00%

b) Based on the column percentages, we can see that among those who felt overloaded with too much information, a higher percentage were female (88.08%) compared to male (58.65%).

a. Contingency tables:

Total Percentages:

         Male   Female    Total

Yes      28.55%  45.20%   73.82%

No       20.13%   6.12%   26.18%

Total    48.68%  51.32%  100.00%

Row Percentages:

          Male   Female    Total

Yes       38.70%  61.30%  100.00%

No        76.69%  23.31%  100.00%

Total     48.68%  51.32%  100.00%

Column Percentages:

         Male   Female    Total

Yes      58.65%  88.08%   73.82%

No       41.35%  11.92%   26.18%

Total   100.00% 100.00%  100.00%

b. Based on the total percentages, we can see that overall, 73.82% of the survey respondents felt overloaded with too much information.

Based on the row percentages, we can see that a higher percentage of females (61.30%) felt overloaded with too much information compared to males (38.70%).

Based on the column percentages, we can see that among those who felt overloaded with too much information, a higher percentage were female (88.08%) compared to male (58.65%).

Therefore, we can conclude that there is a gender difference in terms of feeling overloaded with too much information, with a higher percentage of females reporting information overload compared to males.

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The numerical value of x in the measure of the vertical angles is 16.

Vertical angles are simply angles which are opposite of one another when two lines cross.

Vertical angles have the same angle measure, hence, they are congruent.

From the diagram, as the two lines crosses, the two angles are opposite of each other, hence the angles are vertical angles.

Angle 1 = 65 degrees

Angle 2 = ( 4x + 1 ) degrees

Since vertical angles are congruent.

Angle 1 = Angle 2

Hence:

65 = ( 4x + 1 )

We can now solve for x:

65 = 4x + 1

Subtract 1 from both sides:

65 - 1 = 4x + 1 - 1

64 = 4x

x = 64/4

x = 16

Therefore, the value of x is 16.

Option D) 16 is the correct answer.

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The general solution of the given second-order differential equation is:

y = c₁e^x + c₂e^(2x)

The given second-order differential equation is:

y'' − 3y' + 2y = 0

To solve this differential equation, we will first find its characteristic equation by assuming a solution of the form y = e^(rx), where r is a constant. Substituting this into the differential equation, we get:

r²e^(rx) − 3re^(rx) + 2e^(rx) = 0

Factoring out e^(rx), we have:

e^(rx) (r² − 3r + 2) = 0

For this equation to hold true for all values of x, the term in the parentheses must be equal to zero:

r² − 3r + 2 = 0

We can factorize this quadratic equation:

(r - 1)(r - 2) = 0

Setting each factor to zero, we find the roots of the characteristic equation:

r = 1 and r = 2

Therefore, the general solution of the given second-order differential equation is:

y = c₁e^x + c₂e^(2x)

where c₁ and c₂ are arbitrary constants that can be determined using the initial conditions of the differential equation.

To verify this solution, you can substitute y = e^(rx) into the given differential equation and solve for r. You will find that the characteristic equation is satisfied by the roots r = 1 and r = 2, confirming the validity of the general solution.

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The correct answer is d) 2π / 5.

The period of a Ferris wheel is the time it takes to complete one full revolution or loop.

In this case, the Ferris wheel made 5 loops in a total time of 12 seconds.

To find the period, we need to divide the total time by the number of loops. In this case, 12 seconds divided by 5 loops gives us a period of 2.4 seconds per loop.

However, the question asks for the period, k, in terms of π. To convert the period to π, we divide the period (2.4 seconds) by the value of π.

So, k = 2.4 / π.

Now, we need to find the answer choice that matches the value of k.

Therefore, the correct answer is d) 2π / 5.

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The average angular speed of the hand is ω = 1800 / t rad/s and 103140 / t degrees/s and the average linear speed of the hand is 5D / t m/s.  The answers to A and B are not the same as they refer to different quantities with different units and different values.

A) To find the average angular speed of the hand, we need to use the formula:

angular speed (ω) = (angular displacement (θ) /time taken(t))

= 5 × 360 / t

Here, t is the time for 5 rotations

So, average angular speed of the hand is ω = 1800 / trad/s

To convert this into degrees/s, we can use the conversion:

1 rad/s = 57.3 degrees/s

Therefore, ω in degrees/s = (ω in rad/s) × 57.3

= (1800 / t) × 57.3

= 103140 / t degrees/s

B) To find the average linear speed of the hand, we need to use the formula:linear speed (v) = distance (d) /time taken(t)

Here, the distance of the hand is the length of the arm.

Distance from shoulder to middle of hand = D

Similarly, the time taken to complete 5 rotations is t

Thus, the total distance covered by the hand in 5 rotations is D × 5

Therefore, average linear speed of the hand = (D × 5) / t

= 5D / t

= 5 × distance of hand / time for 5 rotations

C) No, the answers to A and B are not the same. This is because angular speed and linear speed are different quantities. Angular speed refers to the rate of change of angular displacement with respect to time whereas linear speed refers to the rate of change of linear displacement with respect to time. Therefore, they have different units and different values.

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The construction on page 734 involves a step-by-step process to solve a specific problem or demonstrate a mathematical concept.

The construction on page 734 is a methodical procedure used in mathematics to solve a particular problem or illustrate a concept. It typically involves a series of steps that are carefully chosen and executed to achieve the desired outcome.

The purpose of the construction can vary depending on the specific context, but it generally aims to provide a visual representation, demonstrate a theorem, or solve a given problem.

In the explanation provided on page 734, the construction steps are detailed and justified. Each step is crucial to the overall process and contributes to the final result.

The author likely presents the reasoning behind each step to help the reader understand the underlying principles and logic behind the construction.

It is important to note that without specific details about the construction mentioned on page 734, it is challenging to provide a more specific explanation. However, it is essential to carefully follow the given steps and their justifications, as they are likely designed to ensure accuracy and validity in the mathematical context.

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The constant of variation is -4/5.

Suppose y varies directly with x, and y=-4 when x=5. What is the constant of variation?

Suppose y varies directly with x. The formula for direct variation is:

y = kx

where

k is the constant of variation.

If y = -4 when x = 5, then we can substitute these values into the formula and solve for k as follows:-

4 = k(5)

Divide both sides by 5 to isolate k:

k = -4/5

Therefore, the constant of variation is -4/5.

Another way to check if the variation is direct is to use a ratio of the two sets of variables given: If the ratio is always the same, the variation is direct. Here is an example with the values given:

y1 / x1 = y2 / x2

where

y1 = -4, x1 = 5,

y2 = y, and

x2 = x.

Substitute the values and simplify:

y1 / x1 = y2 / x2(-4) / 5 = y / xy = (-4 / 5) x

Hence, the constant of variation is -4/5.

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The polynomial division of (x^3 - 13x - 12) divided by (x - 4) results in a quotient of x^2 + 4x + 3 and a remainder of 0.

To perform polynomial division, we divide the given polynomial (x^3 - 13x - 12) by the divisor (x - 4). We start by dividing the highest degree term of the dividend (x^3) by the highest degree term of the divisor (x). This gives us x^2 as the first term of the quotient.

Next, we multiply the divisor (x - 4) by the first term of the quotient (x^2) and subtract the result from the dividend (x^3 - 13x - 12). This step cancels out the x^3 term and brings down the next term (-4x^2).

We repeat the process by dividing the highest degree term of the remaining polynomial (-4x^2) by the highest degree term of the divisor (x). This gives us -4x as the second term of the quotient.

We continue the steps of multiplication, subtraction, and division until we have no more terms left in the dividend. In this case, after further calculations, we obtain a final quotient of x^2 + 4x + 3 with a remainder of 0.

Therefore, the polynomial division of (x^3 - 13x - 12) by (x - 4) results in a quotient of x^2 + 4x + 3 and a remainder of 0.

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The values of x and y in the given system of equations are x = 4.00 and y = 5.00. These values are obtained by solving the system using the method of substitution.

The given system of linear equations is:

0.50x + 0.20y = 3.00 ...(Equation 1)

x + y = 9.00 ...(Equation 2)

To solve this system of equations, we can use the method of substitution or elimination. Let's solve it using the method of substitution:

From Equation 2, we can express x in terms of y:

x = 9.00 - y

Substituting this expression for x in Equation 1, we have:

0.50(9.00 - y) + 0.20y = 3.00

Expanding and simplifying:

4.50 - 0.50y + 0.20y = 3.00

-0.30y = -1.50

Dividing both sides by -0.30:

y = -1.50 / -0.30

y = 5.00

Now, substitute this value of y back into Equation 2 to find x:

x + 5.00 = 9.00

x = 9.00 - 5.00

x = 4.00

Therefore, the values of x and y in the given system of equations are x = 4.00 and y = 5.00.

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To prove that if each of a, b, and c are relatively prime to n, then the product abc is also relatively prime to n, we can use the property that the greatest common divisor (gcd) of two numbers remains the same if one of the numbers is multiplied by a constant.

Let's assume that gcd(a, n) = gcd(b, n) = gcd(c, n) = 1. This means that a, b, and c are all relatively prime to n.
We want to show that gcd(abc, n) = 1.
To do this, we can use the fact that gcd(a, n) = gcd(b, n) = gcd(c, n) = 1. This implies that there exist integers x, y, and z such that ax + ny = 1, bx + ny = 1, and cx + nz = 1.

Now, let's multiply these equations together:
(ax + ny)(bx + ny)(cx + nz) = 1 * 1 * 1

Expanding this expression, we get:
abxcx + abxnz + axnycx + axnynz + nybxcx + nybxnz + nyanycx + nyanynz = 1

Simplifying further, we obtain:
abc(xcx) + ab(nzx) + a(nycx) + a(nynz) + b(nycx) + b(nynz) + n(ybxcx) + n(ybxnz) + n(yanycx) + n(yanynz) = 1

Notice that each term in this equation has at least one factor of n. Therefore, we can rewrite it as:
n[abc(xcx) + ab(nzx) + a(nycx) + a(nynz) + b(nycx) + b(nynz) + ybxcx + ybxnz + yanycx + yanynz] + abc(xcx) + ab(nzx) + a(nycx) + a(nynz) + b(nycx) + b(nynz) + ybxcx + ybxnz + yanycx + yanynz = 1

The left side of the equation contains n as a factor, so the right side must also contain n as a factor. However, the right side is equal to 1, which is not divisible by n. Therefore, the only possibility is that the coefficient of n on the left side is 0:
abc(xcx) + ab(nzx) + a(nycx) + a(nynz) + b(nycx) + b(nynz) + ybxcx + ybxnz + yanycx + yanynz = 0

This implies that abc is relatively prime to n, as gcd(abc, n) = 1.
Therefore, we have proven that if gcd(a, n) = gcd(b, n) = gcd(c, n) = 1, then gcd(abc, n) = 1.

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The value of inverse function [tex]f^{(-1)}(5)[/tex] is 2 when function f(x)=√x+2+3.

To find [tex]f^{(-1)}(5)[/tex], we need to determine the value of x that satisfies f(x) = 5.

Given that f(x) = √(x+2) + 3, we can set √(x+2) + 3 equal to 5:

√(x+2) + 3 = 5

Subtracting 3 from both sides:

√(x+2) = 2

Now, let's square both sides to eliminate the square root:

(x+2) = 4

Subtracting 2 from both sides:

x = 2

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The statement "If 0 is the only eigenvalue of A ∈ M₁x3(C), then A = 0" is false.

To demonstrate this, we can provide a counter-example. Consider the following matrix:

A = [0 0 0]

[0 0 0]

In this case, the only eigenvalue of A is 0. However, A is not equal to the zero matrix. Therefore, the statement is false.

The matrix A can have all zero entries, except for the possibility of having non-zero entries in the last row. In such cases, the matrix A will still have 0 as the only eigenvalue, but it won't be equal to the zero matrix. Hence, the statement is not true in general.

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Answer:

5

Step-by-step explanation:

let x = missing exponent

x - 2 + 1 = 4

x -1 = 4

x = 5

You can upload a picture of the constructed angle of measure 320 degrees and the tool used to create it.

To construct an angle of measure 320 degrees on paper, follow these steps:

Step 1: Draw a straight line of arbitrary length using a ruler.

Step 2: Place the point of the protractor on one endpoint of the line. Align the base of the protractor with the line, ensuring that the zero mark of the protractor is at the endpoint of the line and the line of the protractor passes through the endpoint and the other end of the line.

Step 3: Locate and mark a point along the protractor's arc that corresponds to the measure of 320 degrees.

Step 4: Use the ruler to draw a line from the endpoint of the original line, passing through the marked point on the protractor's arc. This line will form an angle of 320 degrees with the original line.

Finally, you can upload a picture of the constructed angle of measure 320 degrees and the tool used to create it.

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Answer:

Not specific enough... but it should be m = 15/(5a).

Step-by-step explanation:

To solve for m in the equation 5am = 15, we can isolate the variable m by dividing both sides of the equation by 5a:

5am = 15

Divide both sides by 5a:

(5am)/(5a) = 15/(5a)

Simplify:

m = 15/(5a)

Therefore, the solution for m is m = 15/(5a).

Step-by-step explanation:

-5x+2y= 4         <==== Multiply entire equation by -3 to get:

15x-6y = -12  

2x+3y= 6          <====  Multiply entire equation by 2 to get :

4x+6y = 12    Add the two underlined equations to eliminate 'y'

19x = 0     so x = 0

sub in x = 0 into any of the equations to find:  y = 2

(0,2)

a. The statement "No dogs are rabbits" is equivalent to the statement "There are no dogs that are not rabbits."

b. The negation of the quantified statement "No dogs are rabbits" is "Some dogs are rabbits."

a. Answer: A. There are no dogs that are not rabbits.

b. Answer: C. Not all dogs are rabbits.

a. The quantified statement "No dogs are rabbits" can be expressed in an equivalent way as "There are no dogs that are not rabbits." This means that every dog is a rabbit.

b. The negation of the quantified statement "No dogs are rabbits" is "Some dogs are rabbits." This means that there exists at least one dog that is also a rabbit.

a. In order to express the quantified statement in an equivalent way, we need to convey the idea that every dog is a rabbit. Among the given options, the expression that matches this meaning is A. "There are no dogs that are not rabbits."

b. To find the negation of the quantified statement, we need to consider the opposite scenario. The statement "Some dogs are rabbits" indicates that there exists at least one dog that is also a rabbit.

Among the given options, the negation is D. "Some dogs are not rabbits."

By expressing the quantified statement in an equivalent way and understanding its negation, we can clarify the relationship between dogs and rabbits in terms of their existence or non-existence.

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The probability of rolling a 6 on a 6-sided die is 1/6.

Rolling a 6-sided die gives us six possible outcomes: 1, 2, 3, 4, 5, or 6. Since we're interested in the event of rolling a 6, there is only one favorable outcome, which is rolling a 6. The total number of outcomes is six (one for each face of the die). Therefore, the probability of rolling a 6 is calculated by dividing the number of favorable outcomes (1) by the total number of outcomes (6), resulting in 1/6.

Probability is a measure of how likely an event is to occur. In this case, we have a fair 6-sided die, which means each face has an equal chance of landing face-up. The probability of rolling a specific number, such as 6, is determined by dividing the number of ways that event can occur (1 in this case) by the total number of equally likely outcomes (6 in this case). So, in a single roll of the die, there is a 1/6 chance of rolling a 6.

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The unique solution to the initial value problem is: y = 1 + x + 6x².

To solve the non-homogeneous problem y" = 12(2x²), let's go through the steps:

1) Homogeneous problem:

The homogeneous equation is y" = 0. The auxiliary equation is ar² + br + c = 0.

2) The roots of the auxiliary equation:

Since the coefficient of the y" term is 0, the auxiliary equation simplifies to just c = 0. Therefore, the root of the auxiliary equation is r = 0.

3) Fundamental set of solutions:

For the homogeneous problem y" = 0, since we have a repeated root r = 0, the fundamental set of solutions is Y₁ = 1 and Y₂ = x. So the complementary solution is Yc = C₁(1) + C₂(x) = C₁ + C₂x, where C₁ and C₂ are arbitrary constants.

4) Particular solution:

To find a particular solution, we can use the method of undetermined coefficients. Since the non-homogeneous term is 12(2x²), we assume a particular solution of the form yp = Ax² + Bx + C, where A, B, and C are constants to be determined.

Taking the derivatives of yp, we have:

yp' = 2Ax + B,

yp" = 2A.

Substituting these into the non-homogeneous equation, we get:

2A = 12(2x²),

A = 12x² / 2,

A = 6x².

Therefore, the particular solution is yp = 6x².

5) General solution and initial value problem:

The general solution is the sum of the complementary solution and the particular solution:

y = Yc + yp = C₁ + C₂x + 6x².

To solve the initial value problem y(0) = 1 and y'(0) = 1, we substitute the initial conditions into the general solution:

y(0) = C₁ + C₂(0) + 6(0)² = C₁ = 1,

y'(0) = C₂ + 12(0) = C₂ = 1.

Therefore, the unique solution to the initial value problem is:

y = 1 + x + 6x².

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The rule states that if a statement is true of an arbitrary object, then it is true of all objects.

An axiomatization by using and adding a rule of universal generalization is as follows:((∀1∀1) ∀x A→A(y/x) ∀x A→A(y/x), provided yy is free for xx in AA). Axiomatization in a theory is to provide a precise description of the objects, properties, and relationships that are meaningful in the field of study that the theory belongs to. In addition to the axioms, a formal theory may also specify certain rules of inference that allow us to derive new statements from old ones.

The addition of a rule of universal generalization to the system of axioms and rules of inference allows us to infer statements about all objects in a domain from statements about individual objects.  The generalization rule is as follows: If AA is any statement and xx is any variable, then ∀x A is also a statement. The variable xx is said to be bound by the universal quantifier ∀x. The quantifier ∀x binds the variable xx in statement A to the left of it.

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To calculate the probability that an adult over 40 years of age is diagnosed with the disease, we need to consider the given probabilities: the probability of selecting an adult over 40 with the disease,

the probability of correctly diagnosing a person with the disease, and the probability of incorrectly diagnosing a person without the disease. The probability can be calculated using the formula for conditional probability.

Let's denote the probability of selecting an adult over 40 with the disease as P(D), the probability of correctly diagnosing a person with the disease as P(C|D), and the probability of incorrectly diagnosing a person without the disease as having the disease as P(I|¬D).

The probability that an adult over 40 years of age is diagnosed with the disease can be calculated using the formula for conditional probability:

P(D|C) = (P(C|D) * P(D)) / (P(C|D) * P(D) + P(C|¬D) * P(¬D))

Given the probabilities:

P(D) = probability of selecting an adult over 40 with the disease,

P(C|D) = probability of correctly diagnosing a person with the disease,

P(I|¬D) = probability of incorrectly diagnosing a person without the disease as having the disease,

P(¬D) = probability of selecting an adult over 40 without the disease,

we can substitute these values into the formula to calculate the probability P(D|C).

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Answer: The original price is $460.

Step-by-step explanation: Since the sofa is sold at a 68% discount (0.68) from the original price, the sofa during the sale cost 32% (0.32) of the original price. Therefore, $147.20 =  (0.32)* original price and dividing both sides by 0.32, the original price is $460.