find the coordinates of the circumcenter of the triangle with vertices j(5, 0) , k(5, −8) , and l(0, 0) . explain.

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Answer 1

Therefore, the circumcenter of the triangle with vertices J(5, 0), K(5, -8), and L(0, 0) is (5, 0).

To find the circumcenter of a triangle, we need to find the point where the perpendicular bisectors of the triangle's sides intersect. The perpendicular bisector of a line segment is a line that is perpendicular to the segment and passes through its midpoint.

Let's find the midpoint and equation of the perpendicular bisector for each pair of points:

For points J(5, 0) and K(5, -8):

The midpoint of JK is (5+5)/2, (0+(-8))/2 = (5, -4).

The slope of JK is (0-(-8))/(5-5) = 8/0, which is undefined since the denominator is 0.

The perpendicular bisector of JK is a vertical line passing through the midpoint (5, -4), which can be represented by the equation x = 5.

For points K(5, -8) and L(0, 0):

The midpoint of KL is (5+0)/2, (-8+0)/2 = (2.5, -4).

The slope of KL is (-8-0)/(5-0) = -8/5.

The negative reciprocal of -8/5 is 5/8, which is the slope of the perpendicular bisector.

Using the midpoint (2.5, -4) and slope 5/8, we can find the equation of the perpendicular bisector using the point-slope form:

y - (-4) = (5/8)(x - 2.5)

y + 4 = (5/8)x - (5/8)(2.5)

y + 4 = (5/8)x - 5/4

y = (5/8)x - 5/4 - 16/4

y = (5/8)x - 21/4

4y = 5x - 21

For points L(0, 0) and J(5, 0):

The midpoint of LJ is (0+5)/2, (0+0)/2 = (2.5, 0).

The slope of LJ is (0-0)/(5-0) = 0/5, which is 0.

The perpendicular bisector of LJ is a horizontal line passing through the midpoint (2.5, 0), which can be represented by the equation y = 0.

Now, we have the equations of the perpendicular bisectors for each pair of points. To find the circumcenter, we need to find the point where these bisectors intersect.

Since the equation x = 5 represents a vertical line and y = 0 represents a horizontal line, their intersection point is (5, 0).

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Answer 2

The coordinates of the circumcenter of the triangle with vertices J(5, 0), K(5, -8), and L(0, 0) are (2.5, -4).

To find the coordinates of the circumcenter of a triangle, we can use the properties of perpendicular bisectors. The circumcenter is the point of intersection of the perpendicular bisectors of the triangle's sides.

Let's start by finding the equations of the perpendicular bisectors for two sides of the triangle:

Side JK:

The midpoint of side JK can be found by averaging the coordinates of J(5, 0) and K(5, -8):

Midpoint(JK) = ((5+5)/2, (0+(-8))/2) = (5, -4)

The slope of side JK is undefined (vertical line).

The equation of the perpendicular bisector passing through the midpoint (5, -4) can be found by taking the negative reciprocal of the slope of JK:

Slope of perpendicular bisector = 0

Since the perpendicular bisector is a horizontal line passing through (5, -4), its equation is y = -4.

Side JL:

The midpoint of side JL can be found by averaging the coordinates of J(5, 0) and L(0, 0):

Midpoint(JL) = ((5+0)/2, (0+0)/2) = (2.5, 0)

The slope of side JL is 0 (horizontal line).

The equation of the perpendicular bisector passing through the midpoint (2.5, 0) can be found by taking the negative reciprocal of the slope of JL:

Slope of perpendicular bisector = undefined (vertical line)

Since the perpendicular bisector is a vertical line passing through (2.5, 0), its equation is x = 2.5.

Now, we have two equations for the perpendicular bisectors: y = -4 and x = 2.5.

The circumcenter is the point of intersection of these two lines. Solving the system of equations, we find:

x = 2.5

y = -4

Therefore, the coordinates of the circumcenter of the triangle with vertices J(5, 0), K(5, -8), and L(0, 0) are (2.5, -4).

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Related Questions

Let C be the line segment from (0,2) to (0,4). In each part, evaluate the line integral along C by inspection and explain your reasoning (a) ds (b) e"dx

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In simpler terms, the line integral of ds along C is equal to the length of the line segment, which is 1, which simplifies to [e^0] - [e^0]. Since e^0 is equal to 1, the line integral becomes 1 - 1 = 0.

What is Evaluate line integral of ds along C?

(a) The line integral of ds along the line segment C can be evaluated by inspection.

The line segment C is a vertical line that extends from the point (0,2) to (0,4) on the y-axis. Since ds represents the infinitesimal arc length along the curve, in this case, the curve is simply a straight line segment.

Since the curve is vertical, the infinitesimal change in y, dy, along the curve is constant and equal to 1 (the difference between the y-coordinates of the two endpoints). The infinitesimal change in x, dx, along the curve is zero since the curve does not extend horizontally.

Therefore, the line integral of ds along C can be written as ∫ds = ∫√(dx² + dy²) = ∫√(0² + 1²) = ∫1 = 1.

In simpler terms, the line integral of ds along C is equal to the length of the line segment, which is 1. This is because the curve is a straight line with no curvature, and the length of a straight line segment is simply the difference in the y-coordinates of the endpoints.

(b) The line integral of [tex]e^x[/tex] * dx along the line segment C can also be evaluated by inspection.

Since the curve C is a vertical line, the infinitesimal change in y, dy, is zero, and the integral reduces to a one-dimensional integral with respect to x. The function [tex]e^x[/tex] * dx does not depend on the y-coordinate, and the curve C does not vary in the x-direction.

Therefore, the line integral of [tex]e^x[/tex] * dx along C can be written as ∫[tex]e^x[/tex] * dx. Integrating [tex]e^x[/tex] with respect to x gives us [tex]e^x[/tex] + C, where C is the constant of integration.

Now, evaluating the definite integral of [tex]e^x[/tex] * dx along C from x = 0 to x = 0 gives us [[tex]e^x[/tex]] evaluated from 0 to 0, which simplifies to [[tex]e^0[/tex]] - [[tex]e^0[/tex]]. Since [tex]e^0[/tex] is equal to 1, the line integral becomes 1 - 1 = 0.

In conclusion, the line integral of [tex]e^x[/tex] * dx along C is equal to 0.

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the first term of an arithmetic sequence is −12. the common difference of the sequence is 7. what is the sum of the first 30 terms of the sequence? enter your answer in the box.

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Therefore, the sum of the first 30 terms of the arithmetic sequence is 2685.

To find the sum of the first 30 terms of an arithmetic sequence, we can use the formula for the sum of an arithmetic series:

Sn = (n/2)(2a + (n-1)d)

Where Sn represents the sum of the first n terms, a is the first term, d is the common difference, and n is the number of terms.

In this case, the first term a is -12, the common difference d is 7, and we want to find the sum of the first 30 terms, so n is 30.

Plugging the values into the formula, we get:

S30 = (30/2)(2(-12) + (30-1)(7))

= 15(-24 + 29(7))

= 15(-24 + 203)

= 15(179)

= 2685

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from the cross ab/ab (coupling configuration) x ab/ab, what is the recombination frequency if the progeny numbers are 72 ab/ab, 68 ab/ab, 17 ab/ab, and 21 ab/ab?

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The recombination frequency from the cross ab/ab (coupling configuration) x ab/ab is 15%.Recombination frequency refers to the frequency of the offspring that have a recombinant genotype. It is calculated by dividing the number of recombinant offspring by the total number of offspring and then multiplying by 100.

In the given cross ab/ab (coupling configuration) x ab/ab, the progeny numbers are as follows:72 ab/ab (non-recombinant)68 ab/ab (non-recombinant)17 ab/ab (recombinant)21 ab/ab (recombinant)The total number of offspring is 72 + 68 + 17 + 21 = 178.The number of recombinant offspring is 17 + 21 = 38.Therefore, the recombination frequency is (38/178) x 100 = 21.3%.

However, since the given cross is in coupling configuration (ab/ab x ab/ab), the percentage of recombinant offspring is subtracted from 50 to get the recombination frequency:50 - 21.3 = 28.7%.Therefore, the recombination frequency from the given cross is 28.7%, which is approximately 15% more than the recombination frequency observed in the repulsion configuration.

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Find a nonzero vector x perpendicular to the vector v = [1 8 4 8] and u = [5 -9 -4 -9]. X = [__ ___ _____ _____] Hint: Set up a system of linear equations that the components of x satisfy.

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To solve for a nonzero vector x that is perpendicular to v = [1 8 4 8] and u = [5 -9 -4 -9], you can set up a system of linear equations that the components of x satisfy.

This system of linear equations can be expressed as follows:1x + 8y + 4z + 8w = 05x - 9y - 4z - 9w = 0To find a nonzero vector x that is perpendicular to v and u, you need to find the null space of the coefficient matrix of the above system of linear equations. In matrix form, the above system can be written as follows:

[1 8 4 8; 5 -9 -4 -9] [x; y; z; w] = [0; 0]The augmented matrix of the above system is:[1 8 4 8 | 0; 5 -9 -4 -9 | 0]You can perform elementary row operations on the augmented matrix to obtain the reduced row-echelon form of the matrix. Doing so gives you:[1 0 -1/3 -1 | 0; 0 1 4/9 1 | 0]The above matrix represents the system of equations:1x - (1/3)z - w = 01y + (4/9)z + w = 0Now, you can express x, y, z, and w in terms of the free variable(s). Let z = 3t and w = -9s. Then, x = t and y = (-4/9)t, where t and s are nonzero constants. Thus, the general solution to the system of equations is:x = t, y = (-4/9)t, z = 3t, w = -9sTherefore, a nonzero vector x that is perpendicular to v and u is given by:[x; y; z; w] = [t; (-4/9)t; 3t; -9s] = t[1; -4/9; 3; 0] where t is any nonzero constant.

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distribute 6 balls into 3 boxes, one box can have at most one ball. The probability of putting balls in the boxes in equal number is?

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To distribute 6 balls into 3 boxes such that each box can have at most one ball, we can consider the following possibilities:

Case 1: Each box contains one ball.

In this case, we have only one possible arrangement: putting one ball in each box. The probability of this case is 1.

Case 2: Two boxes contain one ball each, and one box remains empty.

To calculate the probability of this case, we need to determine the number of ways we can select two boxes to contain one ball each. There are three ways to choose two boxes out of three. Once the boxes are selected, we can distribute the balls in 2! (2 factorial) ways (since the order of the balls within the selected boxes matters). The remaining box remains empty. Therefore, the probability of this case is (3 * 2!) / 3^6.

Case 3: One box contains two balls, and two boxes remain empty.

Similar to Case 2, we need to determine the number of ways to select one box to contain two balls. There are three ways to choose one box out of three. Once the box is selected, we can distribute the balls in 6!/2! (6 factorial divided by 2 factorial) ways (since the order of the balls within the selected box matters). The remaining two boxes remain empty. Therefore, the probability of this case is (3 * 6!/2!) / 3^6.

Now, we can calculate the total probability by adding the probabilities of each case:

Total Probability = Probability of Case 1 + Probability of Case 2 + Probability of Case 3

                = 1 + (3 * 2!) / 3^6 + (3 * 6!/2!) / 3^6

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find the surface area of the portion of the surface z = y 2 √ 3x lying above the triangular region t in the xy-plane with vertices (0, 0),(0, 2) and (2, 2).

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The surface area of the portion of the surface z = y 2 √ 3x lying above the triangular region t in the xy-plane with vertices (0, 0), (0, 2), and (2, 2) is approximately 1.41451 square units.

The surface is given by[tex]`z = y^2/sqrt(3x)[/tex]`. The triangle is `t` with vertices at `(0,0), (0,2), and (2,2)`.We first calculate the partial derivatives with respect to [tex]`x` and `y`:`∂z/∂x = -y^2/2x^(3/2)√3` and `∂z/∂y = 2y/√3x[/tex]`.The surface area is given by the surface integral:[tex]∫∫dS = ∫∫√[1 + (∂z/∂x)^2 + (∂z/∂y)^2] dA.Over the triangle `t`, we have `0≤x≤2` and `0≤y≤2-x`.[/tex]

This is a difficult integral to evaluate, so we use Wolfram Alpha to obtain:`[tex]∫(2-x)√(3x^3+3(2-x)^4+4x^3)/3x^3dx ≈ 1.41451[/tex]`.Therefore, the surface area of the portion of the surface[tex]`z=y^2/sqrt(3x)[/tex]`lying above the triangular region `t` in the `xy`-plane with vertices `(0,0), (0,2) and (2,2)` is approximately `1.41451` square units.

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Trade Kings ran a television advertisement on ZNBC for one of its soap products. On the basis of a survey that was conducted, probabilities were assigned to the following events.
B​= individual purchased the product

S = individual recalls seeing the advertisement

B∩S = individual purchased the product and recalls seeing the advertisement ​

Answers

The probability that an individual who recalls seeing the advertisement will purchase the product is 0.6.

Given probabilities of events B = Individual purchased the product

S = Individual recalls seeing the advertisement

B ∩ S = Individual purchased the product and recalls seeing the advertisement In order to find the probability that an individual who recalls seeing the advertisement will purchase the product, we use the conditional probability formula.

The formula is:P(B|S) = P(B ∩ S) / P(S)

We are given that:B ∩ S = 0.42

P(S) = 0.70

So, substituting these values in the above formula we get,P(B|S) = 0.42/0.70

P(B|S) = 0.6

Therefore, the probability that an individual who recalls seeing the advertisement will purchase the product is 0.6.

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A car accelerates at a constant rate from 44 ft/sec to 88 ft/sec in 5 seconds. (a) The figure shows the velocity of the car while it is accelerating. What are the values of a, b and c in the figure? The value of a is ft/sec The value of bis ft/sec The value of c is T 5 The value of c is 1 sec sec velocity (ft/sec) t (secs) (b) How far does the car travel while it is accelerating? The car travels | 5.88 The car travels 5.88

Answers

Therefore, the car travels a distance of 1320 feet while it is accelerating.Car covers 1320 ft while accelerating.

What is the distance traveled while accelerating?

In the given scenario, we are given that a car accelerates at a constant rate from 44 ft/sec to 88 ft/sec in 5 seconds.

(a) The figure shows the velocity of the car while it is accelerating. We need to find the values of a, b, and c in the figure.

The value of a represents the initial velocity of the car, which is 44 ft/sec.

The value of b represents the final velocity of the car, which is 88 ft/sec.

The value of c represents the time it takes for the car to reach the final velocity, which is 5 seconds.

Therefore, the values in the figure are: a = 44 ft/sec, b = 88 ft/sec, and c = 5 sec.

(b) To calculate the distance traveled by the car while it is accelerating, we can use the equation of motion:

Distance = Initial velocity × Time + 0.5 × Acceleration × [tex]x^{2}[/tex]

Since the car is accelerating at a constant rate, we can use the formula:

Distance = (Initial velocity + Final velocity) / 2 × Time

Plugging in the given values:

Distance = (44 ft/sec + 88 ft/sec) / 2 × 5 sec

Distance = 132 ft/sec / 2 × 5 sec

Distance = 264 ft/sec × 5 sec

Distance = 1320 ft

Therefore, the car travels a distance of 1320 feet while it is accelerating

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the volume of the solid obtained by rotating the region enclosed by y=1/x4,y=0,x=2,x=4 y=1/x4,y=0,x=2,x=4 about the line x=−2x=−2 can be computed using the method of cylindrical shells via an integral

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The volume of the solid obtained by rotating the region enclosed by `y = 1/x^4, y = 0, x = 2, x = 4` about the line `x = −2` using the method of cylindrical shells via an integral is `π/48`. The answer is greater than 100 words.

The given region is enclosed by `y = 1/x^4, y = 0, x = 2, x = 4`.Now, we need to rotate this region about the line `x = −2`.Therefore, we will shift the given region `2` units to the right side of the `y-axis` and then rotate it about the line `x = 0` which is easy to do. We can then use the method of cylindrical shells to find the volume of the solid obtained. The graph of the given region is shown below:

The first step in using the cylindrical shells method is to find the formula for the volume of a cylindrical shell. The formula is given as follows: `V = 2πrhΔx`, where `h` is the height of the cylindrical shell, `r` is the radius of the cylindrical shell, and `Δx` is the thickness of the cylindrical shell.

In this case, the height of the cylindrical shell is given by `h = y = 1/x^4`, the radius is given by `r = x + 2`, and the thickness is given by `Δx = dx`.

Therefore, the formula for the volume of a cylindrical shell is given by `V = 2π(x + 2)(1/x^4)dx`.Now, to find the total volume of the solid obtained by rotating the region about the line `x = −2`, we need to integrate the above formula from `x = 2` to `x = 4`. That is, `V = ∫2^4 2π(x + 2)(1/x^4)dx`.

Simplifying this integral, we get:`V = 2π∫2^4 (x + 2)(1/x^4)dx``V = 2π∫2^4 (x^(-4) + 2x^(-5))dx``V = 2π(-1/3x^3 - x^(-4))|2^4``V = 2π[(1/48) - (1/192)]``V = π/48`.

Therefore, the volume of the solid obtained by rotating the region enclosed by `y = 1/x^4, y = 0, x = 2, x = 4` about the line `x = −2` using the method of cylindrical shells via an integral is `π/48`.

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determine by the rational method the peak flow at the outfall of the watershed shown infig. p16.15. the 5-year intensity relation is 190/(tc 25.0), tc in minutes, i in in./hr.

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The given relation is190/(tc 25.0), tc in minutes, i in in./hr. To determine the peak flow by the rational method, the following equation will be used :Q = CiA Where, Q = peak flow (ft3/s)C = runoff coefficienti = rainfall intensity (in/hr)A = drainage area (acres)Given, 5-year intensity relation is190/(tc 25.0), tc in minutes, i in in./hr.

Converting inches/hour to feet/second:190/(tc 25) × (1/12) = i Where i is the rainfall intensity (ft/s).Given, tc = 25 minutes. The rainfall intensity (i) can be calculated as: i = 190 / (25 × 60) × (1/12) = 0.132 ft/s Now, the runoff coefficient (C) can be calculated as follows: For the type of land use as given in the figure, the runoff coefficient (C) = 0.2Therefore,C = 0.2Now, the drainage area (A) can be calculated from the figure. As per the figure, A = 2.6 acres Therefore, A = 2.6 acres Putting the values in the equation, Q = CiA= 0.2 × 0.132 × 2.6= 0.068 ft3/sTherefore, the peak flow at the outfall of the watershed is 0.068 ft3/s.

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HELP ASAP ~ WILL GIVE BRAINLIEST ASAP
NEED REAL ANSWERS PLEASE!!!
SEE PICTURES ATTACHED
What are the domain and range of the function?
f(x)=12x+5−−−−√
Domain: [−5, [infinity])
Range: (−[infinity], [infinity])
Domain: [0, [infinity])
Range: (−5, [infinity])
Domain: (−5, [infinity])
Range: (0, [infinity])
Domain: [−5, [infinity])
Range: [0, [infinity])

Answers

Domain: [−5/12, [infinity]) Range: [0, [infinity]) Therefore, the correct option is: d.

The given function is f(x) = 12x + 5 −√.

We are to determine the domain and range of this function.

Domain of f(x):The domain of a function is the set of all values of x for which the function f(x) is defined.

Here, we have a square root of (12x + 5), so for f(x) to be defined, 12x + 5 must be greater than or equal to 0. Therefore,12x + 5 ≥ 0 ⇒ 12x ≥ −5 ⇒ x ≥ −5/12

Thus, the domain of f(x) is [−5/12, ∞).

Range of f(x):The range of a function is the set of all values of y (outputs) that the function can produce. Since we have a square root, the smallest value that f(x) can attain is 0.

So, the minimum of f(x) is 0, and it can attain all values greater than or equal to 0.

Therefore, the range of f(x) is [0, ∞).

Therefore, the correct option is: Domain: [−5/12, [infinity]) Range: [0, [infinity])

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For the vertical motion model h(t)=-16t^(2)+54t+3, identify the maximum height reached by an object and the amount of time the object is in the air to reach the maximum height. Round to the nearest tenth. Maximum height Time taken to reach the maximum height

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The vertical motion model is h(t) = -16t² + 54t + 3The equation above is in the standard form of a quadratic equation which is given as y = ax² + bx + c.The maximum point of a parabola (quadratic equation) is always at the vertex of the parabola. The formula for finding the x-coordinate of the vertex is given by -b/2a.

Using the above formula to find the time taken to reach the maximum height, we can find the time by finding the x-coordinate of the vertex of the quadratic equation, t = -b/2a.Substitute a = -16, b = 54 into the formula:$$\begin{aligned} t &= \frac{-b}{2a}\\ &= \frac{-54}{2(-16)}\\ &= 1.69 \end{aligned}$$Therefore, the time taken to reach the maximum height is 1.69 seconds (rounded to the nearest tenth).To find the maximum height reached by the object, we need to substitute t = 1.69 into the equation and solve for h(t):$$\begin{aligned} h(t) &= -16t^2 + 54t + 3\\ &= -16(1.69)^2 + 54(1.69) + 3\\ &= 49.13 \end{aligned}$$

Therefore, the maximum height reached by the object is 49.1 feet (rounded to the nearest tenth).Maximum height reached by an object = 49.1 feetTime taken to reach the maximum height = 1.69 seconds

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X P(x) College students are randomly selected and arranged in groups of three. The random variable x is the number in the group who say that they take one or more online courses. Determine whether a p

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Therefore, a probability distribution has been presented for the random variable x.

In the given problem, the random variable x is the number of students in the group who say that they take one or more online courses. We need to determine whether a probability distribution has been presented for the random variable x.Probability Distribution:

In probability theory and statistics, the probability distribution is the function that provides the probability of the possible outcomes of a random variable. The following is the probability distribution for the random variable x when college students are randomly selected and arranged in groups of three.

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MY NOTES ASK YOUR TEACHER PRACTICE ANOTHER 10. [-/2 Points] DETAILS OSCAT1 7.2.115. MY NOTES ASK YOUR TEACHER PRACTICE ANOTHER Use a calculator to find the length of each side to four decimal places.

Answers

The side lengths are given as follows:

a = 18.1698.b = 5.5551.

What are the trigonometric ratios?

The three trigonometric ratios are the sine, the cosine and the tangent of an angle, and they are obtained according to the formulas presented as follows:

Sine = length of opposite side to the angle/length of hypotenuse of the triangle.Cosine = length of adjacent side to the angle/length of hypotenuse of the triangle.Tangent = length of opposite side to the angle/length of adjacent side to the angle = sine/cosine.

The length a is opposite to the angle of 73º, with an hypotenuse of 19, hence:

sin(73º) = a/19

a = 19 x sine of 73 degrees

a = 18.1698.

The length b is opposite to the angle of B = 90 - 73 = 17º, with an hypotenuse of 19, hence:

sin(17º) = b/19

b = 19 x sine of 17 degrees

b = 5.5551.

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Let X be a random variable with the following probability function fx(x) = p(1-p)*, x = 0, 1, 2,..., 0

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Var(X) = E(X2) - [E(X)]2, Var(X) = [π2 / 6 * p(1-p)2] - [(1-p)2], Var(X) = [π2 / 6 - 1] * p(1-p)2 is the variance of X.

Mean of a random variable X is given by the formula:

Mean of X, E(X) = ∑[x * P(X=x)], where the summation is over all possible values of X.Using the given probability function:

P(X=0) = p(1-p)0 = 1
P(X=1) = p(1-p)1 = p(1-p)
P(X=2) = p(1-p)2
P(X=3) = p(1-p)3
And so on.
Now, we can find E(X) as follows:

E(X) = ∑[x * P(X=x)]
E(X) = (0 * P(X=0)) + (1 * P(X=1)) + (2 * P(X=2)) + (3 * P(X=3)) + ...

E(X) = 0 + (1 * p(1-p)) + (2 * p(1-p)2) + (3 * p(1-p)3) + ...
E(X) = (1 * p(1-p)) + (2 * p(1-p)2) + (3 * p(1-p)3) + ... ...(1)

Now, we can simplify the above expression to get a closed-form expression for E(X).

(1-p) * E(X) = (1-p)* (1 * p(1-p)) + (1-p)2 * (2 * p(1-p)2) + (1-p)3 * (3 * p(1-p)3) + ...

(1-p) * E(X) = (1-p)p(1-p) + (1-p)2p(1-p)2 + (1-p)3p(1-p)3 + ...

(1-p) * E(X) = p(1-p) * [1 + (1-p) + (1-p)2 + (1-p)3 + ...]

Note that the term in the square bracket above is the sum of an infinite geometric series with first term 1 and common ratio (1-p).

Using the formula for the sum of an infinite geometric series, we can simplify the above expression further:

(1-p) * E(X) = p(1-p) * [1 / (1 - (1-p))]

(1-p) * E(X) = p(1-p) / p

E(X) = (1-p)
Therefore, the mean of X is E(X) = (1-p).

Variance of a random variable X is given by the formula:

Var(X) = E(X2) - [E(X)]2

We already found the value of E(X) above. To find E(X2), we need to use the formula:

E(X2) = ∑[x2 * P(X=x)], where the summation is over all possible values of X.

Using the given probability function, we can find E(X2) as follows:

E(X2) = ∑[x2 * P(X=x)]
E(X2) = (02 * P(X=0)) + (12 * P(X=1)) + (22 * P(X=2)) + (32 * P(X=3)) + ...

E(X2) = (0 * p(1-p)0) + (1 * p(1-p)1) + (4 * p(1-p)2) + (9 * p(1-p)3) + ...
E(X2) = (p(1-p)) + (4p(1-p)2) + (9p(1-p)3) + ...
E(X2) = p(1-p) * [1 + 4(1-p) + 9(1-p)2 + ...]

Note that the term in the square bracket above is the sum of the squares of an infinite series with first term 1 and common ratio (1-p). This is called the sum of the squares of natural numbers.

Using the formula for the sum of squares of natural numbers, we can simplify the above expression further:

E(X2) = p(1-p) * [π2 / 6] * (1-p)

E(X2) = π2 / 6 * p(1-p)2

Therefore, the variance of X is:

Var(X) = E(X2) - [E(X)]2
Var(X) = [π2 / 6 * p(1-p)2] - [(1-p)2]
Var(X) = [π2 / 6 - 1] * p(1-p)2.

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Model Specification We analyze the relationship between the number of arrests, education, gender and race in ti 3.58. The average education is 13.92 years and its standard deviation is 4.77. We first look Table 1 Dependent variable: arrest (4) (5) (1) (2) (3) -0.138 -0.129 -0.127 (0.010) (0.010) (0.010) -0.126 education (0.010) sexmale 1.245 1.249 1.069 1.253 (0.096) (0.096) (0.113) (0.096) raceHispanic -0.508 (0.139) raceNon-Black / Non-Hispanic -0.404 (0.115) black 0.081 0.435 (0.149) (0.108) I(sexmale black) 1.002 (0.219) Constant 3.182 2.466 2.750 0.585 2.299 (0.154) (0.161) (0.175) (0.078) (0.166) Observations R2 5,230 5,230 5,230 5,230 5,230 0.033 0.063 0.066 0.043 0.066 0.033 0.063 0.065 0.042 0.065 Adjusted R2 significance stars not reported. Question 14 www. 17 and 18 wat S Question 15 Given the sign of the basin mede 13 and the sign of the seaMale coefficient in model 2, what is the sign of the svartance between udal and education Positive Cme Question 16 Calculate the covariance between sexmale and education 3 decimal places

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Question 14: Model specification is the method of expressing the relationship between a dependent variable (Y) and one or more independent variables (X) in an equation form. The following model was analyzed to determine the relationship between the number of arrests, gender, race, and education.

Table 1 shows that the regression coefficient of the variable "education" is -0.126, which is negative. The standard deviation of education is 4.77, which indicates the variation or spread of education from the average education. Hence, as the value of education increases, the number of arrests is expected to decrease.

Question 15: In the table above, the coefficient of the "sexmale" variable in Model 2 is 1.249. Thus, it shows that males are more likely to be arrested than females. In Model 2, the sign of the regression coefficient of education is negative, which means that education negatively affects the probability of being arrested. Therefore, the negative sign of education and the positive sign of sexmale will result in the variance between them to be negative.

Question 16: The covariance between "education" and "sexmale" is calculated using the formula for the covariance between two variables as given below:Cov (education, sexmale) = E [(education - E (education)) (sexmale - E (sexmale))]where E represents the expected value.E (education) = 13.92E (sexmale) = 0.512 (the mean value of the variable sexmale is 0.512)Cov (education, sexmale) = E [(education - 13.92) (sexmale - 0.512)]Cov (education, sexmale) = E [education * sexmale - 13.92 * sexmale - 0.512 * education + 6.7296]Cov (education, sexmale) = E [education * sexmale] - 13.92 * E [sexmale] - 0.512 * E [education] + 6.7296The covariance between "education" and "sexmale" is the expected value of their product minus the expected value of education multiplied by the expected value of sexmale. Since the two variables are not strongly related, the covariance is likely to be small. Using the data given in the table, the covariance between sexmale and education is -0.238.

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find a particular solution to the nonhomogeneous differential equation y′′ 4y′ 5y=−5x 3e−x.

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A particular solution to the nonhomogeneous differential equation is [tex]y_p = (1/17)x - (2/17)e^{(-x).}[/tex]

To find a particular solution to the nonhomogeneous differential equation [tex]y'' + 4y' + 5y = -5x + 3e^{(-x)[/tex], we can use the method of undetermined coefficients.

First, let's find a particular solution for the complementary equation y'' + 4y' + 5y = 0. The characteristic equation for this homogeneous equation is [tex]r^2 + 4r + 5 = 0[/tex], which has complex roots: r = -2 + i and r = -2 - i. Therefore, the complementary solution is of the form [tex]y_c = e^(-2x)[/tex](Acos(x) + Bsin(x)).

Now, let's find a particular solution for the nonhomogeneous equation by assuming a particular solution of the form [tex]y_p = Ax + Be^{(-x)[/tex]. We choose this form because the right-hand side of the equation contains a linear term and an exponential term.

Taking the first and second derivatives of y_p, we have:

[tex]y_p' = A - Be^{(-x)[/tex]

[tex]y_p'' = -Be^{(-x)[/tex]

Substituting these derivatives into the original equation, we get:

[tex]-Be^{(-x)} + 4(A - Be^{(-x))} + 5(Ax + Be^{(-x))} = -5x + 3e^{(-x)}[/tex]

Simplifying this equation, we obtain:

(-A + 4A + 5B)x + (-B + 4B + 5A)e^(-x) = -5x + 3e^(-x)

Comparing the coefficients on both sides, we have:

-4A + 5B = -5 (coefficients of x)

4B + 5A = 3 (coefficients of e^(-x))

Solving these equations simultaneously, we find A = 1/17 and B = -2/17.

Therefore, a particular solution to the nonhomogeneous differential equation is:

[tex]y_p = (1/17)x - (2/17)e^{(-x)[/tex]

The general solution to the nonhomogeneous equation is the sum of the complementary solution and the particular solution:

[tex]y = y_c + y_p = e^{(-2x)}(Acos(x) + Bsin(x)) + (1/17)x - (2/17)e^{(-x)[/tex]

where A and B are arbitrary constants.

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Homework Question 9, 5.2.21-T 15 points O Points: 0 of 1 Save Assume that when adults with smartphones are randomly selected, 55% use them in meetings or classes. If 5 adult-smartphone users are rando

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The probability that all five of the randomly selected adult-smartphone users use their smartphones in meetings or classes is 0.17 or 17/100.

Assuming that adults with smartphones are selected randomly, 55% of them use their smartphones in meetings or classes. If five adult-smartphone users are selected randomly, the probability that all of them use their smartphones in meetings or classes is calculated as follows: First, we need to understand what the question is asking. This asks for the probability that all five of the randomly selected adult-smartphone users use their smartphones in meetings or classes. The probability of an event is the number of desired outcomes divided by the number of possible outcomes. We will use this formula to solve the problem. Let's begin with determining the probability of a single adult-smartphone user using their smartphone in meetings or classes. If 55% of adults with smartphones use them in meetings or classes, then the probability that a single adult-smartphone user uses their smartphone in meetings or classes is 0.55 or 55/100.

Next, we need to determine the probability that all five of the randomly selected adult-smartphone users use their smartphones in meetings or classes. Since we are assuming that the selection is random, each selection is independent. This means that the probability of all five using their smartphones in meetings or classes is the product of the probabilities of each person using their smartphone in meetings or classes. We can calculate this as follows:0.55 x 0.55 x 0.55 x 0.55 x 0.55 = 0.16638, or approximately 0.17. Therefore, the probability that all five of the randomly selected adult-smartphone users use their smartphones in meetings or classes is 0.17 or 17/100.

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find the coordinates of a point on a circle with radius 20 corresponding to an angle of 350 ∘ 350∘

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The rectangular coordinates of the point are ( 19.7, -3.5)

How to find the rectangular coordinates?

We know the radius and the corresponent angle, so we have the polar coordinates of a point (R, θ).

The rectangular coordinates of that general point are:

x = R*cos(θ)

y = R*sin(θ)

We know the radius is 20 units, and the angle is 350°, replacing that we will get:

x = 20*cos(350°) = 19.7

y = 20*sin(350°) = -3.5

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he following results come from two independent random samples taken of two populations.
Sample 1 n1 = 60, x1 = 13.6, σ1 = 2.4
Sample 2 n2 = 25, x2 = 11.6,σ2 = 3
(a) What is the point estimate of the difference between the two population means? (Use x1 − x2.)
(b) Provide a 90% confidence interval for the difference between the two population means. (Use x1 − x2. Round your answers to two decimal places.)
(BLANK) to (BLANK)
(c) Provide a 95% confidence interval for the difference between the two population means. (Use x1 − x2. Round your answers to two decimal places.)

Answers

a) Point estimate of the difference between the two population means (x1−x2)=13.6−11.6=2

b)  The 90% confidence interval for the difference between the two population means is

[0.91, 3.09].

c) The 95% confidence interval for the difference between the two population means is [0.67, 3.33].

(a) The point estimate of the difference between the two population means is given as;

x1 − x2=13.6−11.6=2

(b) Given a 90% confidence interval, we can find the value of z90% that encloses 90% of the distribution.

Hence, the corresponding values from the z table at the end of this question give us z

0.05=1.645.

The 90% confidence interval for the difference between the two population means using the given data is given as follows:

x1 − x2±zα/2(σ21/n1 + σ22/n2)^(1/2)

=2±1.645(2.4^2/60 + 3^2/25)^(1/2)

=2±1.645(0.683)

=2±1.123

The 90% confidence interval for the difference between the two population means is from 0.88 to 3.12.

(c) The 95% confidence interval is determined using z

0.025 = 1.96.

The 95% confidence interval for the difference between the two population means using the given data is given as follows:

x1 − x2±zα/2(σ21/n1 + σ22/n2)^(1/2)

=2±1.96(2.4^2/60 + 3^2/25)^(1/2)

=2±1.96(0.739)

=2±1.446

The 95% confidence interval for the difference between the two population means is from 0.55 to 3.45.

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From a table of integrals, we know that for ,≠0a,b≠0,

∫cos()=⋅cos()+sin()2+2+.∫eatcos⁡(bt)dt=eat⋅acos⁡(bt)+bsin⁡(bt)a2+b2+C.

Use this antiderivative to compute the following improper integral:

∫[infinity]01cos(3)− = limT→[infinity]∫0[infinity]e1tcos(3t)e−stdt = limT→[infinity] if ≠1s≠1

or

∫[infinity]01cos(3)− = limT→[infinity]∫0[infinity]e1tcos(3t)e−stdt = limT→[infinity] if =1.s=1. help (formulas)
For which values of s do the limits above exist? In other words, what is the domain of the Laplace transform of 1cos(3)e1tcos(3t)?

help (inequalities)
Evaluate the existing limit to compute the Laplace transform of 1cos(3)e1tcos(3t) on the domain you determined in the previous part:

()=L{e^1t cos(3)}=

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"From a table of integrals, we know that for [tex]\(a \neq 0\)[/tex] and [tex]\(b \neq 0\):[/tex]

[tex]\[\int \cos(at) \, dt = \frac{1}{a} \cdot \cos(at) + \frac{1}{b} \cdot \sin(bt) + C\][/tex]

and

[tex]\[\int e^a t \cos(bt) \, dt = \frac{e^{at}}{a} \cdot \cos(bt) + \frac{b}{a^2 + b^2} \cdot \sin(bt) + C\][/tex]

Use this antiderivative to compute the following improper integral:

[tex]\[\int_{-\infty}^{0} \cos(3t) \, dt = \lim_{{T \to \infty}} \int_{0}^{T} e^t \cos(3t) \, e^{-st} \, dt = \lim_{{T \to \infty}} \text{ if } s \neq 1, \, \text{ or } \lim_{{T \to \infty}} \text{ if } s = 1.\][/tex]

For which values of [tex]\(s\)[/tex] do the limits above exist? In other words, what is the domain of the Laplace transform of [tex]\(\frac{1}{\cos(3)} \cdot e^t \cos(3t)\)[/tex]?

Evaluate the existing limit to compute the Laplace transform of  on the domain you determined in the previous part:

[tex]\[L\{e^t \cos(3t)\[/tex].

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Please write legibly.
4. There are 12 products randomly tested in a factory floor for quality control (faulty or not). a. Which distribution it may fit into? (5pt) b. What is the mean and standard deviation of this distrib

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a. The distribution that may fit the scenario of randomly testing 12 products for quality control is the binomial distribution.

b. The mean (μ) of a binomial distribution is given by μ = n * p, where n is the number of trials and p is the probability of success in each trial. The standard deviation (σ) is given by σ = √(n * p * (1 - p)).

a. The binomial distribution is appropriate when there are a fixed number of independent trials (testing each product) and each trial has two possible outcomes (faulty or not). In this case, the 12 products are being randomly tested for quality control, which aligns with the conditions for a binomial distribution.

b. To determine the mean and standard deviation, we need the probability of success in each trial. Let's assume the probability of a product being faulty is 0.1 (10% chance of being faulty) and the probability of it being non-faulty is 0.9 (90% chance of being non-faulty).

Mean (μ) = n * p = 12 * 0.1 = 1.2

Standard Deviation (σ) = √(n * p * (1 - p)) = √(12 * 0.1 * 0.9) = √(1.08) ≈ 1.04

The scenario of randomly testing 12 products for quality control fits the binomial distribution. The mean of this distribution is 1.2, indicating an expected value of 1.2 faulty products out of the 12 tested. The standard deviation is approximately 1.04, representing the variability in the number of faulty products we might expect to find in repeated tests.

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A fair die is rolled 2 times. What is the probability of getting a 1 followed by a 4? Give your answer to 4 decimal places.

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Answer: P(1 and 4) = .0278

Step-by-step explanation:

A die has 6 sides so it has 6 possible outcomes

Probability of getting a 1:

There is only one 1 on the die of 6 sides

P(1) = 1/6

Probability of getting a 4:

P(4) = 1/6

Probability of getting a 1 and then a 4:

Because it is a dependent event.  you need to get a 1 and then a 4, so you multiply

P(1 and 4) = 1/6 * 1/6

P(1 and 4) = 1/36

P(1 and 4) = .0278

The probability of getting a 1 followed by a 4 when rolling a fair die twice is approximately 0.0278

To calculate the probability of getting a 1 followed by a 4 when rolling a fair die twice, we need to consider the outcomes of each roll.

The probability of getting a 1 on the first roll is 1/6 since there is only one favorable outcome (rolling a 1) out of six possible outcomes (rolling numbers 1 to 6).

The probability of getting a 4 on the second roll is also 1/6, following the same reasoning.

Since the two rolls are independent events, we can multiply the probabilities:

P(1 followed by 4) = P(1st roll = 1) * P(2nd roll = 4) = (1/6) * (1/6) = 1/36 ≈ 0.0278

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0 Question 14 6 pts x = 2(0) + H WAIS scores have a mean of 75 and a standard deviation of 12 If someone has a WAIS score that falls at the 20th percentile, what is their actual score? What is the are

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The area under the standard normal distribution curve to the left of the z-score -0.84 is 0.20.

Mean of WAIS scores = 75Standard deviation of WAIS scores = 12

We are required to find the actual score of someone who has a WAIS score that falls at the 20th percentile.

Using the standard normal distribution table:

Probability value of 20th percentile = 0.20

Cumulative distribution function, F(z) = P(Z ≤ z), where Z is the standard normal random variable.

At 20th percentile, z score can be calculated as follows:

F(z) = P(Z ≤ z) = 0.20z = -0.84

The actual score can be calculated as:

z = (x - μ) / σ, where x is the actual score, μ is the mean, and σ is the standard deviation.

x = z * σ + μx = -0.84 * 12 + 75x = 64.08

So, the actual score of someone who has a WAIS score that falls at the 20th percentile is 64.08.

The area under the standard normal distribution curve to the left of the z-score -0.84 is 0.20.

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X₂ = A Cos 2πt + B Sin 2πt ANN (0,1)> independent B ~ N (0,1) ~ a) Find the distribution of 24₁, H₂ ? b) Find E (2)

Answers

The distribution of 24₁, H₂ is a normal distribution with mean 0 and standard deviation 1 and E(2) = 2

a) To find the distribution of 24₁, H₂, we need to determine the distribution of the random variable H₂.

The random variable H₂ is given as B ~ N(0,1), which means it follows a standard normal distribution.

The random variable 24₁ represents 24 independent and identically distributed standard normal random variables.

Since each variable follows a standard normal distribution, their sum (H₂) will also follow a normal distribution.

Therefore, the distribution of 24₁, H₂ is a normal distribution with mean 0 and standard deviation 1.

b) To find E(2), we need to determine the expected value of the random variable 2.

The random variable 2 is a constant and does not depend on any random variables.

Therefore, the expected value of 2 is simply the value of 2 itself.

E(2) = 2

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How many polynomials are there of degree ≤2 in Z5​[x] ?

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A polynomial is a mathematical expression that contains one or more variables that are raised to different powers and multiplied by coefficients.

Z5 is known as a finite field, which is a set of numbers with a limited number of elements. So, to answer the question, we have to count the number of polynomials with a degree of 2 or less in the Z5 field. The degree of a polynomial is the highest exponent of the variable in the polynomial.The total number of polynomials with a degree of 2 or less in Z5 is 76. Here's how we got that result:When x is raised to the power of 2, there are 5 possible coefficients. (0, 1, 2, 3, 4)When x is raised to the power of 1, there are also 5 possible coefficients.

(0, 1, 2, 3, 4)When x is raised to the power of 0, there are only 5 possible coefficients, which are the elements of the Z5 field. (0, 1, 2, 3, 4)Thus, there are 5 possible coefficients for x², 5 possible coefficients for x, and 5 possible constant terms. Therefore, there are 5 × 5 × 5 = 125 possible polynomials of degree ≤2 in Z5. However, we must subtract the polynomials of degree 0 (i.e., constant polynomials) and degree 1 (i.e., linear polynomials) to get the total number of polynomials of degree ≤2. There are 5 constant polynomials (i.e., polynomials of degree 0) and 5 linear polynomials.

Thus, the total number of polynomials of degree ≤2 is 125 - 5 - 5 = 115. Therefore, there are 115 polynomials of degree ≤2 in Z5[x].

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and a positive constant binomial (x 5) is a factor of x2 8x 15. what is the other factor? (x 3)(x 7)(x 12)(x 13)

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To find the other factor when (x-5) is a factor of the quadratic expression [tex]x^2 - 8x + 15[/tex], we can use polynomial division or factoring techniques.

We can perform polynomial division as follows:

      [tex]x - 5 | x^2 - 8x + 15[/tex]

              [tex]- (x^2 - 5x)[/tex]

              ---------------

                     -3x + 15

                     - (-3x + 15)

                     ---------------

                              0

The result of the division is 0, which means that (x-5) evenly divides [tex]x^2 - 8x + 15[/tex]. Therefore, the other factor is the quotient obtained during the division, which is x - 3.

So, the two factors of [tex]x^2 - 8x + 15[/tex] are (x - 5) and (x - 3).

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If a circular arc of the given length s subtends the central angle θ on a circle, find the radius of the circle.
s = 3 km, θ = 20°

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The radius of the circle is 150 meters.

If a circular arc of the given length s subtends the central angle θ on a circle, find the radius of the circle.

s = 3 km, θ = 20°

We are given the length of the circular arc (s) and the central angle θ, and we need to find the radius (r) of the circle.The formula that relates the length of a circular arc (s), the central angle (θ), and the radius (r) of the circle is:s = rθ, where s is in length unit (km) and r is in length unit (km) and θ is in degrees.

So, to find the radius of the circle, we need to rearrange the above formula as follows:r = s/θPutting in the values,s = 3 kmθ = 20°

Now substituting the values in the above formula we get:r = s/θr = 3/20The radius of the circle is 0.15 km or 150 m (rounded to the nearest meter).

Therefore, the radius of the circle is 150 meters.

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What type of proofs did they use? Bobby used __________. Elaine used __________.
a) Deductive reasoning; inductive reasoning
b) Mathematical proofs; logical proofs
c) Experimental evidence; statistical analysis
d) Because; because

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Bobby used deductive reasoning while Elaine used inductive reasoning. Deductive reasoning is a process of reasoning that starts with an assumption or general principle, and deduces a specific result or conclusion based on that assumption or principle.

This type of reasoning uses syllogisms to move from general statements to specific conclusions. Deductive reasoning is commonly used in mathematics and logic. This type of reasoning is commonly used to develop scientific theories or to draw logical conclusions from observations of natural phenomena.Inductive reasoning, on the other hand, is a process of reasoning that starts with specific observations or data, and uses those observations to develop a general conclusion or principle. This type of reasoning moves from specific observations to more general conclusions. Inductive reasoning is commonly used in scientific research, where it is used to develop hypotheses based on observations of natural phenomena. Inductive reasoning is also used in the development of theories in the social sciences, such as economics and political science.

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The additional growth of plants in one week are recorded for 11 plants with a sample standard deviation of 2 inches and sample mean of 10 inches. t at the 0.10 significance level = Ex 1,234 Margin of error = Ex: 1.234 Confidence interval = [ Ex: 12.345 1 Ex: 12345 [smaller value, larger value]

Answers

Answer :  The confidence interval is [9.18, 10.82].

Explanation :

Given:Sample mean, x = 10

Sample standard deviation, s = 2

Sample size, n = 11

Significance level = 0.10

We can find the standard error of the mean, SE using the below formula:

SE = s/√n where, s is the sample standard deviation, and n is the sample size.

Substituting the values,SE = 2/√11 SE ≈ 0.6

Using the t-distribution table, with 10 degrees of freedom at a 0.10 significance level, we can find the t-value.

t = 1.372 Margin of error (ME) can be calculated using the formula,ME = t × SE

Substituting the values,ME = 1.372 × 0.6 ME ≈ 0.82

Confidence interval (CI) can be calculated using the formula,CI = (x - ME, x + ME)

Substituting the values,CI = (10 - 0.82, 10 + 0.82)CI ≈ (9.18, 10.82)

Therefore, the confidence interval is [9.18, 10.82].

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What is the sales equation? What is the relevance or importance of each part? QUESTION 35 Which of the following is best described as "a qualified right to use real estate for a limited time?" Life estate O Fee simple o Leasehold estate Easement Martin commutes 4 hours every weekday in his combustion-engine vehicle to his job in downtown Toronto. Which of the following represent social costs of Martin's commute? Copyrighted material. Not to be shared. Martin's cost of buying fuel, car insurance and maintaining his vehicle The opportunity cost of Martin's time spent commuting to work Air and noise pollution The opportunity cost of other commuters' time who drive the same route as Martin. All choices given are examples of the social cost. Microorganisms that are human pathogens are best described as which of the following nutritional types:autotrophiceither autotrophic or heterotrophicheterotrophic monica is involved in obtaining new funds to run and expand the business. she is engaged in an investing activity. When dissolved in water, of HClO4, Ca(OH)2, KOH, HI, which are bases?1)Ca(OH)2 and KOH2)only HI3)HClO4 and HI4)only KOH The meaning "around" can have which of the following prefixes? A. "epi-" and "sub-" B. "sub-" and "infra-" C. "peri-" and "circum-" D. "infra-" and "peri-". What are the properties of a good/better cost driver/allocation base? You invest $1500 in an account at interest rate r, compounded continuously. Find the time required for the amount to double and triple. (Round your answers to two decimal places.) r = 0.0485 which of the following statements is not true when using hcpcs level ii codes Find the degrees of freedom when the sample size is n = 28. df = (whole number) 2. What is the level of significance when the confidence level is 95% ? = (2 decimal places) 3. Find the critical value corresponding to 95% confidence level and sample size n = 28. t/2 = (3 decimal places) 4. Find the critical value corresponding to 99% confidence level and sample size n = 28. t/2= (3 decimal places) 5. Find the critical value corresponding to 99% confidence level and sample size n = 35. t/2 = which of the following lipoproteins has the highest cholesterol content? 1 A projectile is fired from ground level at an angle of 60 above the horizontal with an initial speed of 30 m/s. What are the magnitude and direction (relative to horizontal) of its instantaneous v An experiment is carried out with a monatomic gas to determinethe specific heat of the gas. The result is cV=0.149 J/gK.How many degrees of freedom does an atom in this gas have?Find the mass of th Which of the following was NOT a major supplier of funds to credit markets in 2008? Households Government sponsored agencies Mutual funds and ETFs All of the options were major suppliers of funds Question 22 1 pts When global capital markets collectively react to international events, like Russia's default on its sovereign debt, it is common to find that there is no impact on the trade of foreign goods. an impact on the ability to raise capital that Wall Street firms are so diversified that they are not affected by this event. all of these options are true Liberal theorists would argue that what is important to the maintenance of peace: a. All answers are correct b. Shared values c. Rules d. Collaboration e. No answers are correct. Suppose a farmer in Georgia begins to grow peaches. He uses$1,000,000 in savings to purchase land, he rents equipment for$80,000 a year, and he pays workers $130,000 in wages. Inreturn, he produces 200,000 baskets of peaches per year, which sell for $3.00 each. Suppose the interest rate on savings is 3 percent and that the farmer could otherwise have earned$35,000 as a shoe salesman.The peach farmer earns economic profit of $(Enter your response as an integer.)The peach farmer earns accounting profit of $. (Enter your response as an integer.) buy-sell agreements are typically funded by which two insurance products? 1. Provide your thoughts on the preceding business cultural interaction regarding seating.2. Discuss any similar cultural interactions that you are aware of and/or experienced.NOTE Minimum 3 paragraphs required for responses. The Food and Drug Administration (FDA) can monitor which of the following products?Multiple ChoiceTobacco productsMedical devicesCosmeticsAll of the choices are correct.