Susan wants to make aprons for cooking. She needs 1 1/2 yards of fabric for the front of the apron and 1/8 yards of fabric for the tie.
Part A: Calculate how much fabric is needed to make 3 aprons? Show every step of your work.
(5 points)
Part B: If Susan originally has 7 yards of fabric, how much is left over after making the aprons?
Show every step of your work. (5 points)
Part C: Does Susan have enough fabric left to make another apron? Explain why or why not. Please help me

The simplified expressions are:

In order to solve the algebraic expressions:

a. 3x(x²+2x-6)

Distribute 3x across the terms inside the parenthesis:

= 3x^3 + 6x^2 - 18x

b, -5x (2x² - 4x - 8)

In order to solve this too, we would do the same thing as the first one and distribute -5x

= -10x^3 + 20x^2 + 40x

c.  -2x(3x² + 7x + 1)

We also distribute -2x

This would give us the expression which is

= -6x^3 - 14x^2 - 2x

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We fail to reject the null hypothesis and conclude that there is insufficient evidence to support the claim that the mean number of days before visible results begin to show is different between the three types of facial creams.

c. We fail to reject the null hypothesis and conclude that there is insufficient evidence at a 0.025 level of significance to support the claim that the mean number of days before visible results begin to show is different between the three types of facial creams.

To test the hypothesis, we use a one-way ANOVA test since we have three independent samples. The null hypothesis is that there is no difference in the mean number of days for the three creams, and the alternative hypothesis is that at least one of the means is different. We can perform the ANOVA test and obtain an F-statistic and p-value. If the p-value is less than our significance level of 0.025, we reject the null hypothesis.

Using statistical software or a calculator, we obtain an F-statistic of 1.52 and a p-value of 0.249. Since the p-value is greater than 0.025, we fail to reject the null hypothesis and conclude that there is insufficient evidence to support the claim that the mean number of days before visible results begin to show is different between the three types of facial creams.

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Jim prepared a few pancakes. He used 9 cups of milk for every 5 cups of flour. Jim's pancakes have a flour-to-milk ratio of 5:9.

To see why, let's break down what this ratio means. The colon in the ratio notation indicates a comparison between two quantities, in this case, flour and milk. The first number before the colon (5) represents the amount of flour, while the second number after the colon (9) represents the amount of milk. So the ratio 5:9 tells us that for every 5 cups of flour Jim used, he added 9 cups of milk.

We can also express this ratio as a fraction, by dividing the amount of flour by the amount of milk. Using Jim's recipe, this would be:

5 cups of flour / 9 cups of milk

Simplifying this fraction by dividing both the numerator and denominator by 5 gives:

1 cup of flour / (9/5) cups of milk

Multiplying the denominator by 5/5 to get a common denominator gives:

1 cup of flour / 45/5 cups of milk

Simplifying again by dividing both the numerator and denominator by 5 gives:

1/9 cup of flour / 1 cup of milk

So we can see that the ratio of flour to milk in Jim's pancakes is indeed 5:9, or equivalently 1/9 cup of flour to 1 cup of milk.

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Answer:

11668

2+2 = 4

+2*6*6*6*3*3*3

= 11668

Step-by-step explanation:

Answer:

Please mark me the brainliest.

Step-by-step explanation:

11668, trust me i used the calculator

The equation would have three roots.

The highest power term in a cubic equation is a variable raised to the third power, making it a polynomial equation of degree three. A cubic equation's general form is as follows:

Ax3 + Bx2 + Cx+ D = 0

There can be one, two, or three real roots in a cubic equation. Complex roots, which come in pairs called complex conjugates, are possible for cubic equations. The equation still has three roots in this instance, although they could not be true roots.

The roots of the equation are;

x1 = -2.19682

x2 = 0.14684

x3 = 1.54998

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The events "model YZ-99 is chosen" and "model XB-50 is chosen", these would be mutually exclusive events, because a bike cannot be both models at the same time.

a. To find the probability that a mountain bike is brown using the relative frequency assessment method, we need to divide the number of brown mountain bikes by the total number of mountain bikes:

Total number of brown mountain bikes = 105 + 205 = 310

Total number of mountain bikes = 302 + 105 + 200 + 40 + 205 + 130 = 982

Therefore, the probability that a mountain bike is brown is:

P(brown) = 310/982 ≈ 0.316

b. To find the probability that the mountain bike is a YZ-99, we need to divide the total number of YZ-99 bikes by the total number of mountain bikes:

Total number of YZ-99 bikes = 40 + 205 + 130 = 375

Therefore, the probability that the mountain bike is a YZ-99 is:

P(YZ-99) = 375/982 ≈ 0.382

c. To find the joint probability that a randomly selected mountain bike is a YZ-99 and brown, we need to find the number of YZ-99 bikes that are also brown, and divide by the total number of mountain bikes:

Number of YZ-99 bikes that are brown = 205

Total number of mountain bikes = 982

Therefore, the joint probability that a randomly selected mountain bike is a YZ-99 and brown is:

P(YZ-99 and brown) = 205/982 ≈ 0.209

d. Two events are mutually exclusive if they cannot occur at the same time. In this case, the events "model YZ-99 is chosen" and "a white product is chosen" are not mutually exclusive, because there are white YZ-99 bikes. Therefore, it is possible for both events to occur at the same time.

However, if the question was about the events "model YZ-99 is chosen" and "model XB-50 is chosen", these would be mutually exclusive events, because a bike cannot be both models at the same time.

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This is because there are mountain bikes that are both YZ-99 and white, so it is possible to choose a mountain bike that belongs to both events at the same time.

a. Based on the relative frequency assessment method, the probability that a mountain bike is brown is:

Total number of brown bikes / Total number of bikes

= (105 + 205) / (302 + 105 + 200 + 40 + 205 + 130)

= 310 / 982

= 0.3156 (rounded to 4 decimal places)

So the probability that a mountain bike is brown is 0.3156.

b. The probability that the mountain bike is a YZ-99 is:

Total number of YZ-99 bikes / Total number of bikes

= (40 + 205 + 130) / (302 + 105 + 200 + 40 + 205 + 130)

= 375 / 982

= 0.3819 (rounded to 4 decimal places)

So the probability that the mountain bike is a YZ-99 is 0.3819.

c. The joint probability that a randomly selected mountain bike is a YZ-99 and brown is:

Number of brown YZ-99 bikes / Total number of bikes

= 205 / 982

= 0.2088 (rounded to 4 decimal places)

So the joint probability that a randomly selected mountain bike is a YZ-99 and brown is 0.2088.

d. The events "model YZ-99 is chosen" and "a white product is chosen" are not mutually exclusive. This is because there are mountain bikes that are both YZ-99 and white, so it is possible to choose a mountain bike that belongs to both events at the same time.

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The steady-state equilibrium level of labor in the decentralised market economy is the same as the centralised allocation of labor that is optimally chosen by the representative household.

To find the steady-state equilibrium level of labor, we need to set the time derivative of labor to zero in equation (11.18):

dK/dt = 0 = RK + W(1 - * ) - C - 8*K

Solving for * , we get:

W*(1 - * ) = C + (R - 8)*K

Dividing both sides by W and rearranging, we get:

1 - * = (C/W) + [(R/W) - (8/W)]*K

Now, we substitute the expression for consumption from equation (11.17):

C = e-pt[In(Ct) + Bln(1 - * )]dt

Taking the derivative of the above equation with respect to * , we get:

dC/d* = -B*e-pt/(1 - * )

Substituting this expression for C in the equation for * , we get:

1 - * = [e-pt/W]*[-B/(1 - * ) + (R/W) - (8/W)]*K

Multiplying both sides by (1 - * ) and rearranging, we get:

(1 + B/W)* * = 1 + (R/W) - (8/W)

Simplifying, we get:

= [1/(1 + B/W)]*[1 + (R/W) - (8/W)]

Substituting the expression for a from equation (11.16), we get:

= 1/[1 + B/(1 - a)]*[1 + (R/W) - (8/W)]

Simplifying further, we get:

= 1/[1 + B/(1 - a)]*[1 - a + a(R/W) - a(8/W)]

= [1 - a + a(R/W) - a(8/W)]/[1 + B - Ba]

Substituting the values of a, R, and W from equations (10.25), (10.24), and (11.6), respectively, we get:

= 1/[1 + B/(1 + p)]*[1 - (1 + p) + (1 + p)(d + n)/w - (1 + p)(1 - d - n)/w]

Simplifying further, we get:

= 1/[1 + B/(1 + p)]*[p/(1 + p) + (d + n - (1 - d - n)(1 + p))/(1 + p)]

= 1/[1 + B/(1 + p)]*[p/(1 + p) + (2d + n - 1 - np)/(1 + p)]

= [p + (2d + n - 1 - np)*[1 + p/(B + 1)]]/[1 + p(B + 1)/(B + 1)]

Simplifying the above expression, we get:

= [p + (2d + n - 1 - np)*(B + 2)/(B + 1)]/[Bp/(B + 1) + p + 1]

This is the same expression as equation (10.26) in the centralised economy of the Ramsey model. Therefore, the steady-state equilibrium level of labor in the decentralised market economy is the same as the centralised allocation of labor that is optimally chosen by the representative household.

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The value of the cos z is 12/13.

We have,

Perpendicular = 36 unit

Hypotenuse = 39

Base = 15

Using Trigonometry

cos Z = YZ / XZ

cos Z = 36 / 39

cos Z = 12 / 13

Thus, the value of cos Z is 12/13.

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a. The length of the arc of the 10th swing is 12.08 inches.

b. The length of the arc is first less than 12 inches on the 29th swing.

a. To find the length of the arc of the 10th swing, we can use the formula L = 2πr (1 - cosθ), where L is the length of the arc, r is the length of the pendulum, and θ is the angle of the swing. We know that the initial arc length is 18 inches, so we can find the length of the arc for each successive swing by multiplying the previous length by 0.98. Thus, the length of the arc for the 10th swing would be:

18 inches × 0.98^9 = 12.08 inches

b. To find the swing on which the length of the arc is first less than 12 inches, we can use the same formula and solve for n, the number of swings:

2πr (1 - cosθ) = 12 inches

We know that the length of the arc for each successive swing is 0.98 times the previous length, so we can write:

2πr (1 - cosθ)^n = 18 inches × 0.98^(n-1)

Simplifying, we get:

(1 - cosθ)^n = (0.98/π)^n-1

Taking the logarithm of both sides, we get:

n log(1 - cosθ) = (n-1) log(0.98/π)

Solving for n, we get:

n = log(0.98/π) / (log(0.98/π) - log(1 - cosθ))

Plugging in 12 inches for the length of the arc, we can use trial and error to find the smallest integer value of n that satisfies the equation. We find that the length of the arc is first less than 12 inches on the 29th swing.

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the findings of the study highlight the importance of maintaining a sterile environment in medical facilities and the need to take measures to prevent the spread of bacteria and other microorganisms.

It is important for medical personnel to maintain a sterile environment to prevent the spread of bacteria and other microorganisms. The findings of the research suggest that neckties worn by physicians, physician assistants, and medical students may harbor microorganisms that can cause illness.

The fact that 47.6% of the neckties tested positive for microorganisms is concerning, as it suggests that there is a significant risk of contamination. However, it is important to note that the study only sampled neckties at one hospital, so it is unclear if the findings can be generalized to other hospitals or medical facilities.

It is also worth noting that only one of the 10 ties worn by security guards tested positive for microorganisms. This suggests that there may be differences in the level of contamination between different types of clothing or between different groups of people.

Overall, the findings of the study highlight the importance of maintaining a sterile environment in medical facilities and the need to take measures to prevent the spread of bacteria and other microorganisms. This may include implementing dress codes that require medical personnel to avoid wearing neckties or other clothing items that cancan harbor bacteria, as well as ensuring that proper sterilization procedures are followed.

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The slope of the line is 4/5.

Option C is the correct answer.

We have,

The slope of the line that passes through the points (3, -1) and (-2, -5) can be found using the slope formula:

slope = (y2 - y1) / (x2 - x1)

where (x1, y1) and (x2, y2) are the coordinates of the two points.

Plugging in the coordinates, we get:

slope = (-5 - (-1)) / (-2 - 3) = -4 / (-5) = 4/5

Therefore,

The slope of the line is 4/5.

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The integer which represents the location of the man when he is moved down to look at the coral is -37.

Given that,

A man went scuba diving.

He dove down 12 feet initially.

The he spotted an interesting coral formation and dove down another 25 feet to inspect it.

So from the top, he is at a distance of 12 feet + 25 feet = 37 feet down.

Since it is down, the integer represented here is -37 feet.

Hence the required integer value is -37.

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We used the chain rule and derivative of an inverse tangent function to find [tex]\frac{dy}{dx} &= \frac{d}{dx} \left[\tan^{-1}\left(\frac{2x}{1+x^2}\right)\right][/tex] and got [tex]$\frac{dy}{dx} = 2\left(\frac{1}{1+4x^2}\right)\left(\frac{1}{1+x^2}\right)$[/tex].

To find [tex]\frac{dy}{dx}[/tex] for [tex]$y = \tan^{-1}\left(\frac{2x}{1+x^2}\right)$[/tex], we can use the chain rule and the derivative of the inverse tangent function:

[tex]$\frac{dy}{dx} = \frac{d}{dx}\left[\tan^{-1}\left(\frac{2x}{1+x^2}\right)\right]$[/tex]

[tex]$= \frac{1}{\left(\frac{2x}{1+x^2}\right)^2+1} \cdot \frac{d}{dx}\left[\frac{2x}{1+x^2}\right] \quad $[/tex] [chain rule]

[tex]$= \frac{1}{\left(\frac{2x}{1+x^2}\right)^2+1} \cdot \frac{(1+x^2)\cdot2 - 2x\cdot2x}{(1+x^2)^2} \quad[/tex] [quotient rule]

[tex]$= \frac{2}{1+4x^2} \cdot \frac{1}{1+x^2}$[/tex]

Therefore, [tex]\frac{dy}{dx} = \frac{2}{1+4x^2} \cdot \frac{1}{1+x^2}$[/tex].

(a) To find [tex]\frac{dy}{dx} = (e^x\sqrt{2x})^4$[/tex], we can use the chain rule and the power rule:

[tex]\frac{dy}{dx} = \frac{d}{dx}\left[(e^x\sqrt{2x})^4\right][/tex]

[tex]= 4(e^x\sqrt{2x})^3 \frac{d}{dx}[e^x\sqrt{2x}][/tex]

[tex]= 4(e^x\sqrt{2x})^3 \left(e^x\frac{1}{2}(2x)^{-1/2} + e^x\sqrt{2x}\frac{1}{2}(2x)^{-3/2}\right) \quad[/tex] [chain rule]

[tex]= 2(e^x\sqrt{2x})^2\frac{1+\sqrt{2x}}{x}[/tex]

Therefore, dy/dx = [tex]= 2(e^x\sqrt{2x})^2\frac{1+\sqrt{2x}}{x}[/tex]

(b) To find [tex]\frac{dy}{dx} \quad[/tex] for [tex]\quad e^{xy} + \ln(xy) = 0[/tex] we can use implicit differentiation:

[tex]\quad e^{xy} + \ln(xy) = 0[/tex]

Taking the derivative of both sides with respect to x, we get:

[tex](e^{xy})(y + x\frac{dy}{dx}) + \frac{1}{xy}(xy' + y) = 0[/tex]

Simplifying and solving for [tex]\frac{dy}{dx}[/tex], we get:

[tex]\frac{dy}{dx} = \frac{-e^{xy} - \frac{y}{x^2y+1}}{xe^{xy}}[/tex]

Therefore, [tex]\frac{dy}{dx} = \frac{-e^{xy} - \frac{y}{x^2y+1}}{xe^{xy}}[/tex].

To find the indefinite integral of [tex]e^x sin2x[/tex], we can use integration by parts:

Let u = sin2x and [tex]\frac{dv}{dx} = e^x[/tex]. Then du/dx = 2cos2x and v = e^x.

Using the formula for integration by parts, we get:

[tex]\int e^x \sin 2x \ dx = e^x \sin 2x - \int 2e^x \cos 2x \ dx[/tex]

We can now integrate by parts again, letting u = cos2x and dv/dx = e^x. Then du/dx = -2sin2x and v = e^x.

Using the formula again, we get:

[tex]\int e^x \sin 2x \ dx = e^x \sin 2x - 2e^x \cos 2x + 4\int e^x \sin 2x \ dx[/tex]

Rearranging terms and dividing by 5, we get:

[tex]\int e^x \sin 2x \ dx = \frac{e^x}{5} (\sin 2x - 2\cos 2x) + C[/tex]

Therefore, the indefinite integral of e^x sin2x is [tex]\frac{e^x}{5} (\sin 2x - 2\cos 2x) + C[/tex]

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The correct answer is option B: "Because the probability of overloading is lower with the new ratings than with the old ratings, the new ratings appear to be safe when the boat is loaded with 16 passengers."

a) Using the given mean and standard deviation, we can standardize the weight of the passengers to find the z-score:

z = (x - μ) / σ

z = (178.2 - 140) / 39.2

z = 0.9719

Using a standard normal distribution table or calculator, we can find the probability of a z-score greater than 0.9719:

P(z > 0.9719) = 1 - P(z <= 0.9719) = 1 - 0.8349 = 0.1651

So the probability that the boat is overloaded because the mean weight of the 70 passengers is greater than 140 lb is 0.1651.

b) The new load limit is 2,736 lb, which means the average weight per passenger should be no more than 2736/16 = 171 lb. We can standardize the weight of the passengers again:

z = (171 - 178.2) / (39.2 / sqrt(16))

z = -2.3155

Using a standard normal distribution table or calculator, we can find the probability of a z-score less than -2.3155:

P(z < -2.3155) = 0.0104

So the probability that the boat is overloaded because the mean weight of the 16 passengers is greater than 171 lb is 0.0104.

Since the probability of overloading is lower with the new ratings than with the old ratings, the new ratings appear to be safe when the boat is loaded with 16 passengers. Therefore, the correct answer is option B: "Because the probability of overloading is lower with the new ratings than with the old ratings, the new ratings appear to be safe when the boat is loaded with 16 passengers."

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If  box is made out of a 20-inch x 20-inch piece of cardboard by folding then the volume is 8000 cubic inches

A box is made out of a 20-inch x 20-inch piece of cardboard by folding

The dimension of box are length 20 inches

Width is 20 inches

Height is 20 inches

Volume of box = length × width × height

=20×20×20

=8000 cubic inches

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The function that has a constant additive rate of -14 is y = -14x + 2

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

Constant additive rate of change of -14

A function that has a constant rate is a linear function

And linear functions take the form

y = mx + c

Where

Rate = m

So, we have

y = -14x + c

Assuming any value for c, we have

y = -14x + 2

Hence, the function is y = -14x + 2

The table of values are not clear. so the question is solved generally

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By giving an explanation, we have shown that 2 + 6 + 2 · 3² +.... +2.3ⁿ = 3ⁿ⁺¹ - 1 holds true for all non-negative integers, and completed the proof by mathematical induction.

Mathematical induction is a method of mathematical proof that is used to establish the validity of an infinite number of statements. It involves two steps:

Base case: Prove that the statement holds true for a specific value of n, often n=0 or n=1.

Inductive step: Assume that the statement holds true for some arbitrary value k, and use this assumption to prove that it holds true for k+1.

By showing that the statement holds true for the base case and that it implies that the statement holds true for k+1, we can conclude that the statement holds true for all values of n.

Here we have

2 + 6 + 2 · 3² +.... +2.3ⁿ= 3ⁿ⁺¹ - 1

To prove the given equation using mathematical induction, first show that it holds true for the base case, n = 0.

Then we will assume that the equation holds true for an arbitrary non-negative integer 'a' and show that it implies that the equation also holds for (a + 1). This will complete the proof by mathematical induction.

Base case:

When n = 0, we have:

=> 2 = 3⁰⁺¹ - 1 = 3 - 1

So the base case holds true.

Inductive step:

Let's assume that the equation holds true for some arbitrary non-negative integer 'a'. That is,

=> 2 + 6 + 2·3² + ... + 2·3ᵃ = 3ᵃ⁺¹- 1 --- Equation (1)

Now show that it implies that the equation also holds for k+1, that is,

=> 2 + 6 + 2·3² + ... + 2·3ᵃ+ 2·3ᵃ⁺¹ = 3ᵃ⁺¹⁺¹ - 1 --- Equation (2)

To do this, we start by adding 2·3⁽ᵃ⁺¹⁾ to both sides of Equation (1):

=> 2 + 6 + 2·3² + ... + 2·3ᵃ + 2·3ᵃ⁺¹ = (2 + 6 + 2·3² + ... + 2·3ᵃ) + 2·3ᵃ⁺¹

Using Equation (1) in the right-hand side of the above equation, we get:

=> 2 + 6 + 2·3² + ... + 2·3ᵃ + 2·3ᵃ⁺¹ = (3ᵃ⁺¹ - 1) + 2·3ᵃ⁺¹

Simplifying the right-hand side, we get:

=> 2 + 6 + 2·3² + ... + 2·3ᵃ + 2·3⁽ᵃ⁺¹⁾= 3ᵃ⁺¹ + 2·3⁽ᵃ⁺¹⁾ - 1

Using the laws of exponents, we can simplify the right-hand side further:

=> 2 + 6 + 2·3² + ... + 2·3ᵃ + 2·3⁽ᵃ⁺¹⁾= 3⁽ᵃ⁺¹⁾ ·3 - 1

=> 2 + 6 + 2·3² + ... + 2·3ᵃ + 2·3⁽ᵃ⁺¹⁾ = 3⁽ᵃ⁺¹⁾ - 1

This is precisely the right-hand side of Equation (2).

Therefore, Equation (2) holds true if Equation (1) holds true.

By giving an explanation, we have shown that 2 + 6 + 2 · 3² +.... +2.3ⁿ = 3ⁿ⁺¹ - 1 holds true for all non-negative integers, and completed the proof by mathematical induction.

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Complete Question:

Use mathematical induction to prove that for every nonnegative integer, it holds 2 + 6 + 2 · 3² +.... +2.3ⁿ = 3ⁿ⁺¹ - 1

Check the picture below.

so the area of the pyramid is really just the area of a 3x3 square with four triangles with a base of 3 and a height of 5.

[tex]\stackrel{ \textit{\LARGE Areas} }{\stackrel{ square }{(3)(3)}~~ + ~~\stackrel{ \textit{four triangles} }{4\left[\cfrac{1}{2}(\underset{b}{3})(\underset{h}{5}) \right]}}\implies 9+30\implies \text{\LARGE 39}~in^2\textit{ for the cardboard}[/tex]

For a piece of string art created by 16 evenly spaced nails around the circumference of a circle. The measure of angle BXC is equals to the 90°.

We have a piece of string art is made by placing 16 evenly spaced nails around the circumference of a circle. See the above figure. We have to determine the measure of angle BXC. Now, using the inscribed angle theorem , the measure of angle BXC, [tex] m\angle BXC = \frac{ 1}{2} ( m \hat {AD} + m \hat {BC}) [/tex]

Measure of AD = [tex] 2(\frac{ 1}{16})360°[/tex] = 45°

The measure of BC = [tex] 6(\frac{ 1}{16} )360°[/tex]

= 135°

Now, Using the above formula the measure of angle BXC [tex] = \frac{ 1}{2} ( m \hat {AD} + m \hat {BC})[/tex]

[tex]= \frac{ 1}{2} ( 45° + 135°)[/tex]

= 90°

Hence, required value is 90°.

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Complete question:

The above figure complete the question.

28. A piece of string art is made by placing 16 evenly spaced nails around the circumference

of a circle. A piece of string is wound from A to B to C to D. What is measure of angle BXC.

When determining sample sizes for probability designs, there are several factors to consider. One important factor is the level of confidence desired in the results.

As the desired level of confidence increases, the sample size needed also increases. This is because a larger sample size provides more data and reduces the likelihood of errors or outliers affecting the results.
Another factor to consider is the precision required in the sample results. The more precise the required results, the larger the sample size needed. This is because a larger sample size provides more accurate and reliable data, reducing the margin of error in the results.

The variability in the data being estimated is also a factor that affects the sample size needed. If the data has a high level of variability, a larger sample size is needed to ensure that the results are representative of the population being studied. Conversely, if the data has a low level of variability, a smaller sample size may be sufficient.

Finally, the desired level of error also plays a role in determining the sample size needed. The smaller the desired level of error, the larger the sample size needed to achieve that level of precision.

Overall, determining the appropriate sample size for probability designs involves considering multiple factors, including confidence, precision, variability, and error, and balancing these factors to ensure that the results are both accurate and representative of the population being studied.
The true statement among the options provided regarding factors that play an important role in determining sample sizes with probability designs is: "The more precise the required sample results, the larger the sample size."

Factors that affect sample size in probability designs include confidence level, desired precision, and variability in the data. A higher level of confidence indicates greater certainty in the results, but it requires a larger sample size to achieve. Similarly, more precise results require a larger sample size to decrease the margin of error.

In contrast, the statements claiming that a smaller sample size is needed for higher confidence or smaller desired error are incorrect. In reality, a larger sample size is necessary for both situations.

Lastly, the relationship between variability in the data and sample size is inverse; when there is lower variability in the data, a smaller sample size is needed to achieve a specific level of precision. Therefore, the statement claiming that lower variability requires a larger sample size is also incorrect.

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The measure of ∠DBA is 96 degrees.

The angle between a tangent and a chord is equal to the angle in the alternate segment.

An angle formed by a chord and a tangent that intersect on a circle is half the measure of the intercepted arc.

Therefore, the measure of ∠DBA can be defined as follows:

Hence,

∠DBA = 1 / 2 (192)

∠DBA = 96 degrees

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Lydia paid $34 for the shirt. Roger's percent error in measurement is 25%.

To find out how much Lydia paid for the shirt, we need to first calculate the discounted price, which is $32. Then we add the 5% tax, which is $1.6. So, the total cost is

To calculate the percent error in Roger's measurement, we use the formula:

In this case, the actual value is 12cm and the measured value is 15cm. So, the percent error is

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Answer: 3/40

Step-by-step explanation:

To change 7 1/2% to fraction percent

multiply 7x2  then add 1

=15/2%  but this is still a percent,  in order to change to a decimal we still need to divide by 100

=[tex]\frac{15}{2} / 100[/tex]   rules for dividing is Keep the first, change the sign, flip the second

=[tex]\frac{15}{2} *\frac{1}{100}[/tex]          reduce by dividing 15 by 5 and 100 by 5

=[tex]\frac{3}{2} *\frac{1}{20}[/tex]             that is all you can reduce so multiply across

=[tex]\frac{3}{40}[/tex]                  since we reduced earlier this is lowest term

The weighted mean for Joe's milk purchases for the week is $2.05 per gallon.

To calculate the weighted mean, you need to multiply each quantity by its corresponding weight, sum up the products, and divide by the total weight. In this case, the quantity represents the number of gallons of milk purchased, and the weight represents the cost per gallon.

Using the given data, the total weight is calculated by summing up the quantities for each day, which is 10 + 5 + 15 + 20 + 8 = 58 gallons. The products of the quantities and weights for each day are as follows:

Monday - 10 * 3.00 = 30.00
Tuesday - 5 * 4.00 = 20.00
Wednesday - 15 * 1.50 = 22.50
Thursday - 20 * 1.25 = 25.00
Friday - 8 * 3.50 = 28.00

The sum of these products is 30.00 + 20.00 + 22.50 + 25.00 + 28.00 = 125.50. Dividing this by the total weight of 58 gallons gives a weighted mean of 125.50 / 58 = $2.05 per gallon.

Therefore, the weighted mean for Joe's milk purchases for the week is $2.05 per gallon, which takes into account both the quantity and cost of milk purchased each day.

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The compute limit value of

[tex]lim_{n→\infty} \frac{6a_n b_n}{ 4 a_n - 3 b_n}[/tex] where, [tex]lim_{n → \infty} a_n [/tex], [tex]lim_{n → \infty} b_n = - 2[/tex] is equal to the [tex] \frac{ - 12}{5} [/tex]. So, option(3) is correct choice for answer.

The limit of a sequence is a numeric value that occur when a sequence approaches as the number of terms goes to infinity. This value depends on the sequence.

We have nᵗʰ terms of two sequence aₙ and bₙ. The limit of sequence aₙ is

[tex]lim_{n → \infty} a_n = 6 [/tex] and for bₙ, [tex]lim_{n→\infty} b_n= -2 [/tex]. We have to determine the limit value for the following: [tex]lim_{n→\infty} \frac{6a_n b_n}{ 4 a_n - 3 b_n}[/tex]

Solving the above expression step by step, [tex] = \frac{ 6 \: lim_{n → \infty} a_n .lim_{n → \infty}b_n }{4 \: lim_{n → \infty} a_n - 3 \: lim_{n → \infty} b_n } \\ [/tex]

Using the above values in formula,

[tex]= \frac{ 6 ×6 × -2}{4 ×6 \: - \: 3 ×- 2}[/tex]

[tex]= \frac{ -72 }{30} [/tex]

[tex]= \frac{ -12 }{5} [/tex]

Hence, required value is [tex]= \frac{ -12 }{5} [/tex].

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Complete question:

Compute the value, [tex]lim_{n→\infty} \frac{6a_n b_n}{ 4 a_n - 3 b_n}[/tex]

where [tex]lim_{n -> \infty} a_n = 6 [/tex]

[tex]lim_{n → \infty} b_n = - 2 [/tex]

1) Limit = -37/15

2) limit = 12/5

3) limit = - 12/5

4) limit does not exist

5) limit = 37/15

a)The power of the upper portion of the bifocals can be calculated using the formula as:

P(upper)= 1/F(upper)

where F(upper) is the focal length of the upper portion of the bifocals.

b)Far point=155cm

Hence, f(upper)=155cm-1.7cm=153.3cm

The power of the upper portion of the bifocals can be calculated as-

P(upper)=1/153.3cm=0.0065 diopters

c)The power of the lower portion of the bifocals can be calculated using the formula:

P(lower)=1 /F(lower)  or we can calculate it as: Power=1/(near point-N)

By using this formula we can determine the power of the lower portion of the bifocals, such that the person can clearly see objects that are located a distance N from his eyes.

d)Power=1/(near point-N) where near point=65cm, and N=25cm

On substituting the values and putting in the above equation, we get:

Hence power=1/(65cm-25cm)

Power=0.025 diopters

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There is a data set with data values 18, 16, _, 9, 12, 23. If mean of data set is 15, then the misssing number is equals to the twelve.

Mean means the average of a data set. It is calculated by adding all numbers together and then dividing the resultant sum by the number of numbers, i.e, count of numbers. It is denoted by

[tex] \bar X .[/tex] Mathematcally formula,

[tex]\bar X = \frac{\sum X_n}{n }[/tex]

Where, Xₙ --> data values or numbers

n --> count of values

We have a data set with data values : 18, 16, _, 9, 12, 23. Mean of this data set = 15

We have to determine the missing number. Let the missing number be x. The sum of numbers = 18 + 16 + x + 9 + 12 + 23 = 78 + x

Count of values = 6

Using above mean formula, [tex] 15 = \frac{ 78+ x}{6}[/tex]

=> 90 = 78 + x

=> x = 90 - 78

=> x = 12

So, required value is 12.

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The probability of winning the prize if you switch is 2/3.

When you initially choose a box, there is a 1/3 chance that the prize is in your chosen box and a 2/3 chance that it is in one of the other two boxes.

When the dealer opens one of the other two boxes and shows it to be empty, the probability that the prize is in the remaining unopened box is still 2/3.

This is because the dealer has effectively given you new information that eliminates one of the two boxes you did not choose, but does not affect the probability distribution of the prize in the remaining two boxes.

Thus, if you switch to the other unopened box, you have a 2/3 chance of winning the prize, whereas if you stick with your original box, you have only a 1/3 chance of winning. Therefore, it is advantageous to switch.

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Answer: x ≅ 0.5, and x ≅ −3.7

Step-by-step explanation:

[tex]4x^2 + 11x - 19 = -2x - 12[/tex]

[tex]4x^2 + 13x - 7 = 0[/tex]

Now use the quadratic formula with a = 4, b = 13, and c = -7

(if you dont know what that is, you should probably search it and understand/memorize).

Using the formula, we get two values:

x ≅ 0.5, and x ≅ −3.7

Answer:

67.6 grams

Step-by-step explanation:

First, find the volume of the cylindrical container which should provide the volume of water in the sample

Volume, V,  of a cylinder is given by the formula

[tex]V = \pi r^2h[/tex]

where,
r = radius of the cylinder
h = height of the cylinder

Given r = 8 cm and h = 11.6 cm. the volume of the container used by Parker
V = π · 8² · 11.6

   = 2332.31838 cubic centimeters

There are 0.029 grams of trace element for every cubic centimeter of water

Therefore the amount of trace element in 2332.31838 cc of water
= 2332.31838 x 0.029
= 67.63723302 grams'

Rounded to the nearest tenth that would be 67.6 grams

Answer:

Step-by-step explanation:

2332.31838 x 0.029

= 67.63723302 grams'

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