Mrs. Miller's statistics test scores are normally distributed
with a mean score of 85 (μ) and a standard deviation of 5 (σ).
Using the Empirical Rule, about 95% of the scores lie between which
two v

Answers

Answer 1

The range in which 95% of the scores lie is between 75 and 95.

According to the Empirical Rule: For a normal distribution, approximately 68% of the data falls within 1 standard deviation of the mean, approximately 95% of the data falls within 2 standard deviations of the mean, and approximately 99.7% of the data falls within 3 standard deviations of the mean.

So, about 95% of the scores lie between 75 and 95. T

This is because the mean score is 85 and one standard deviation is 5, so one standard deviation below the mean is 80 (85-5) and one standard deviation above the mean is 90 (85+5).

Two standard deviations below the mean are 75 (85-2*5) and two standard deviations above the mean is 95 (85+2*5).

Therefore, the range in which 95% of the scores lie is between 75 and 95.

Know more about range here:

https://brainly.com/question/2264373

#SPJ11


Related Questions

Regression results on the cleaned data set Coefficients Standard Error t Stat P-value Lower 95% Upper 95% Intercept 12.684 3.565 3.557 0.001 5.43 19.938 Internet access (%) 0.855 0.111 7.728 0.000 0.63 1.081 9. (2 marks) Use the regression equation to predict the Year 12 (%) completion of Indigenous Australians aged 20-24 with 32.1 Internet access (%): % (3dp) 10. (1 mark) With 95% confidence, we estimate from the data that, on average, for extra one per cent increase in the Internet access (%) is associated with a(n) → in the Year 12 (%) completion of Indigenous Australians aged 20-24. A. increase B. decrease C. stay the same % (3dp) (Hint: Upper Limit - 11. (2 marks) The width of the 95% confidence interval associated with an extra one per cent increase in the Internet access (%) is Lower Limit)

Answers

1. The regression equation to predict Year 12 completion for Indigenous Australians aged 20-24 with 32.1% Internet access:The regression equation for Year 12 completion rate of Indigenous Australians aged 20-24 would be Y = a + bX, where Y is the response variable (Year 12 completion rate).

X is the predictor variable (internet access), a is the intercept, and b is the slope. The equation can be expressed as follows:Y = 12.684 + 0.855 (32.1)Y = 12.684 + 27.453 = 40.137≈ 40.14The predicted Year 12 completion rate for Indigenous Australians aged 20-24 with 32.1% Internet access is 40.14 percent.2. Estimating the increase or decrease in Year 12 completion rate with a 95% confidence interval:From the regression output, we can see that for every one percent increase in internet access, the Year 12 completion rate increases by 0.855 percent on average.

Hence, for a 95% confidence interval, the estimate would be calculated as follows:Lower limit = 0.855 - 1.96 × 0.111 = 0.6394Upper limit = 0.855 + 1.96 × 0.111 = 1.0706Therefore, the 95% confidence interval for an extra one percent increase in internet access would be 0.6394 to 1.0706, or approximately 0.64 to 1.07.This means that we can be 95% confident that the true change in the Year 12 completion rate will be between 0.64% and 1.07% for every one percent increase in internet access. Hence, the answer is option A: increase.

To know more about regression visit:

https://brainly.com/question/31848267

#SPJ11

Given: ABCD - rectangle
Area of ABCD = 458m2
m∠AOB = 80°
Find: AB, BC

Answers

The lengths AB and BC cannot be determined without additional information or equations.

In a rectangle ABCD with an area of 458m² and m∠AOB = 80°, what are the lengths AB and BC?

In a rectangle ABCD, where the area of ABCD is 458m² and m∠AOB is 80°, we need to find the lengths AB and BC.

Since ABCD is a rectangle, opposite sides are equal in length. Let's assume AB represents the length and BC represents the width.

We know that the area of a rectangle is given by the formula:

Area = Length × Width

So we have:

458m² = AB × BC

Now, we need to find the values of AB and BC. However, without any additional information or equations, we cannot determine their exact values.

learn more about determined

brainly.com/question/29898039

#SPJ11

find the xx coordinate of the point on the parabola y=20x2−12x 13y=20x2−12x 13 where the tangent line to the parabola has slope 1818.

Answers

The x-coordinate of the point on the parabola where the tangent line has a slope of 18/18 is 5/8.

We are to find the x-coordinate of the point on the parabola y=20x²−12x/13 where the tangent line to the parabola has a slope of 18/18.  

The tangent line to the parabola has a slope of 18/18, so we can find the derivative of the equation y=20x²−12x/13 and set it equal to the given slope.dy/dx = 40x - 12/13

slope = 18/18 = 1

We can set the derivative equal to 1 and solve for x.40x - 12/13 = 1Multiplying both sides of the equation by 13, we have 40x - 12 = 13

Combining like terms, we get

40x = 25Dividing both sides by 40, we obtain x = 25/40 or x = 5/8.

Therefore, the x-coordinate of the point on the parabola where the tangent line has a slope of 18/18 is 5/8.

Know more about the parabola here:

https://brainly.com/question/29635857

#SPJ11

0.142857 is rational or not​

Answers

Answer:  not rational

Step-by-step explanation:

It's  not rational because it has no pattern and probably goes on forever

Irrational means goes on forever without pattern.  Ex. [tex]\pi[/tex] or √7

Help with this question pls

Answers

Answer: 9 s

Step-by-step explanation:

Given:

h(t) = -16t² + 144t

Find:

time when h=0    They want to know when the rocket hits the ground.  This happens when h=0

Solution:

0 = -16t² + 144t                     >Take out Greatest Common Factor

0 = (-16t )(t - 9)                      >Set each parenthesis = 0

(-16t ) = 0   and    (t - 9)=0           >Solve for t

t = 0          and      t =  9              >When the rocket launches t=0 and h=0

                                                      Also,    t=9 when h=0

t=9 s

Question 11 of 12 < > 1 Two sides and an angle are given. Determine whether a triangle (or two) exist, and if so, solve the triangle(s) a-√2.b-√7.p-105 How many triangles exist? Round your answers

Answers

1 solution of a triangle exists because all of the angles are less than 180 degrees and the sides and angles have non-negative values.

Therefore, there exists only one triangle.

The given values are:

a = √2, b = √7, and p = 105

The sine law is applied to determine the angle opposite to a. We know that sin(A)/a = sin(B)/b = sin(C)/c

where A, B, and C are the angles of a triangle, and a, b, and c are the opposite sides to A, B, and C, respectively.

Therefore, sin(A)/√2 = sin(B)/√7

We can now get sin(A) and sin(B) by cross-multiplication:

√7 * sin(A) = √2 * sin(B)sin(A) / sin(B) = √(2/7)

Using the sine law, we can now calculate the angle C:

sin(C)/p = sin(B)/b

Therefore, sin(C) = (105 sin(B))/√7

Using the equation sin²(B) + cos²(B) = 1, we can determine

cos(B) and cos(A)cos(B)

= √(1 - sin²(B)) = √(1 - 2/7)

= √(5/7)cos(A) = (b cos(C))/a

= (√7 cos(C))/√2Since sin(A)/√2

= sin(B)/√7sin(A)

= (√2/√7)sin(B)sin(A)

= (√2/√7) [√(1 - cos²(B))]

We can solve the equations above using substitution to find sin(B) and sin(A).

1 solution of a triangle exists because all of the angles are less than 180 degrees and the sides and angles have non-negative values.

Therefore, there exists only one triangle.

To know more about triangle visit:

https://brainly.com/question/2773823

#SPJ11

Use a graphing tool to solve the system. {13x + 6y = −30, x − 2y = −4}. Which ordered pair is the best estimate for the solution to the system?
a. (2, -5).
b. (-1, 2).
c. (4, 3). d. (0, -4).

Answers

(B) (-1, 2) ordered pair is the best estimate for the solution to the system.

To solve the system {13x + 6y = −30, x − 2y = −4} using a graphing tool, we need to plot the line for each equation and find the point where they intersect.

This point is the solution to the system.

The intersection point appears to be (-1, 2).

Therefore, the best estimate for the solution to the system is the ordered pair (-1, 2).

Therefore, option b. (-1, 2) is the correct option.

Know more about ordered pair here:

https://brainly.com/question/11139505

#SPJ11

#4
and #5
4. Find the value (score) that separates the top 15% of the data from the bottom 85% of the data for a normal distribution with a mean of 56 min and a standard deviation of 9 min. Express your answer

Answers

The normal distribution is approximately 65.328 minutes.

To find the value that separates the top 15% of the data from the bottom 85% in a normal distribution with a mean of 56 minutes and a standard deviation of 9 minutes, we can use the Z-score.

The Z-score represents the number of standard deviations a data point is from the mean. In a normal distribution, approximately 68% of the data falls within one standard deviation of the mean, 95% falls within two standard deviations, and 99.7% falls within three standard deviations.

To find the Z-score corresponding to the top 15% of the data, we need to find the Z-score that corresponds to the area of 0.15 in the tail of the distribution (above the mean).

Using a Z-table or a statistical calculator, we can find that the Z-score corresponding to the top 15% (above the mean) is approximately 1.0364.

To find the value that corresponds to this Z-score, we can use the formula:

Value = Mean + (Z-score * Standard Deviation)

Plugging in the values:

Mean = 56 minutes

Standard Deviation = 9 minutes

Z-score = 1.0364

Value = 56 + (1.0364 * 9)

Value = 56 + 9.328

Value ≈ 65.328

Therefore, the value (score) that separates the top 15% of the data from the bottom 85% for the given normal distribution is approximately 65.328 minutes.

To know more about normal distribution refer here:

https://brainly.com/question/15103234?#

#SPJ11

determine the value of from the plot of log(δ[i−3]/δ) versus log[s2o2−8]0 using data in trials 1, 2, and 3.

Answers

The value of m for this experiment will be the same regardless of the units used for δ[i-3]/δ and s2o2-8 for the given  oxidation state.

The oxidation state, or oxidation number, of an atom describes the degree of oxidation (loss of electrons) of the atom in a compound. The oxidation state is used to determine oxidation-reduction reactions. Oxygen's oxidation state is -2 in virtually all compounds, with two exceptions: peroxides and superoxides. The oxidation state of O2-2 in peroxides (e.g. H2O2) is -1, and the oxidation state of O2- in superoxides (e.g. KO2) is -1/2.

Logarithmic scales are used to compare very large or very small values that are hard to compare on a linear scale. It is represented as ln. It is the inverse operation of exponentiation using the Euler's number (e) as the base, which is approximately equal to 2.71828.The following formula is used to calculate the slope (m) of a line in a graph:
m = Δy / Δx
Where,Δy is the change in y-axis (vertical) coordinates,Δx is the change in x-axis (horizontal) coordinates.For this experiment, the value of m can be calculated using the graph of log(δ[i-3]/δ) versus log[s2o2-8]0 for trials 1, 2, and 3.

The slope of the line in the graph is equivalent to m. The formula for the slope of the line in the graph can be written as:
m = (y2 - y1) / (x2 - x1)Where (x1,y1) and (x2,y2) are two points on the line

Know more about the Euler's number

https://brainly.com/question/28914523

#SPJ11

Based upon the central limit theorem, what is the standard deviation of a sample distribution? The sample distribution standard deviation is the population standard deviation divided by the square roo

Answers

The standard deviation of a sample distribution, according to the central limit theorem, is equal to the population standard deviation divided by the square root of the sample size.

The central limit theorem states that when independent random variables are added, their sum tends toward a normal distribution, regardless of the shape of the original variables' distribution. This holds true under certain conditions, such as a sufficiently large sample size.

To calculate the standard deviation of a sample distribution, we divide the population standard deviation by the square root of the sample size. This adjustment accounts for the fact that as the sample size increases, the variability of the sample means decreases.

In summary, the standard deviation of a sample distribution is obtained by dividing the population standard deviation by the square root of the sample size. This relationship is based on the central limit theorem, which allows us to make inferences about a population based on a sample.

to know more about standard deviation of a sample distribution visit:

https://brainly.com/question/14467769

#SPJ11

Find the length of the third side. If necessary. Write in simplest radical form

Answers

Answer:

Hi

Please mark brainliest

Step-by-step explanation:

Using Pythagorean theorem

hyp² = opp² + adj²

= 8² +5³

= 64 + 25

= 89

x= 89

x= 9.43

4. Times of taxi trips to the airport terminal on Friday mornings from a certain location are exponentially distributed with mean 25 minutes. a. What is the probability that a random Friday morning ta

Answers

It is a given that the times of taxi trips to the airport terminal on Friday mornings from a certain location are exponentially distributed with a mean of 25 minutes.

We need to find the probability that a random morning taxi trip on Friday takes more than 40 minutes. We know that the exponential distribution function is given by:

$$f(x) = frac{1}{mu}e^{frac{x}{mu}}

Where μ is the mean of the distribution. Here, μ = 25 minutes. The probability that a random morning taxi trip on Friday takes more than 40 minutes is given by:

P(X > 40) = int_{40}^{infty} f(x)= int_{40}^{\infty} frac{1}{25} e^{frac{x}{25}} dx= e^{frac{40}{25}}= e^{frac{8}{5}}= 0.3012.

Hence, the probability that a random morning taxi trip on Friday takes more than 40 minutes is 0.3012.

Therefore, the probability that a random Friday morning taxi trip takes more than 40 minutes is 0.3012.

To know more about exponential distribution function visit:

brainly.com/question/30503086

#SPJ11

Consider the following pairs of measurements. x 3 8 5 4 D -1 0 y 5 4 9 4 b. What does the scatterplot suggest about the relationship between x and y? A As x increases, y tends to increase. Thus, there

Answers

The scatterplot suggests that the relationship between x and y is moderately scattered.

The given measurements are

x 3 8 5 4D -1 0y 5 4 9 4

The scatterplot suggests that the relationship between x and y is moderately scattered.

A scatterplot is a plot where a dependent and an independent variable are plotted to observe the relationship between them.

The correlation coefficient and regression lines are used to describe the correlation between the two variables.

When a scatterplot is moderately scattered, the points in the plot are not concentrated at a certain point and they do not follow a strict trend.

Instead, the plot will form a pattern of points that are spread out in a random way. It suggests that there is a weak to moderate correlation between x and y.

The scatterplot suggests that the relationship between x and y is moderately scattered.

Know more about scatterplot  here:

https://brainly.com/question/6592115

#SPJ11

Let (Sn)nzo be a simple random walk starting in 0 (i.e. So = 0) with p = 0.3 and q = 1-p = 0.7. Compute the following probabilities: (i) P(S₂ = 2, S5 = 1), (ii) P(S₂ = 2, S4 = 3, S5 = 1), (iii) P(

Answers

The probabilities have been computed to be as follows: i) P (S2 = 2, S5 = 1) = 0.0441, ii) P (S2 = 2, S4 = 3, S5 = 1) = 0.0189.

The probabilities can be computed using the formula:

P (Sn = i, Sm = j) = P (Sn = i, Sn - m = j - i) = P (Sn = i)*P (Sn - m = j - i),

where i, j ∈ Z, n > m ≥ 0.

Then,

P (Sn = i) = (p/q) ^ (n+i)/2√πn, and

P (Sn - m = j - i) = (p/q) ^ ((n-m+ (j-i))/2) √ ((n+m- (j-i))/π(n-m))

For, P (S2 = 2, S5 = 1), i.e., i = 2, j = 1, n = 5, m = 2.

Then,

P (S2 = 2, S5 = 1) = P (S2 = 2) * P (S3 = -1) * P (S4 = -2) * P (S5 - 2 = -1) = (0.3) * (0.7) * (0.7) * (0.3) = 0.0441

For, P (S2 = 2, S4 = 3, S5 = 1), i.e., i = 2, j = 1, n = 5, m = 4.

Then,

P (S2 = 2, S4 = 3, S5 = 1) = P (S2 = 2) * P (S2 = 3 - 4) * P (S5 - 4 = 1 - 2) = (0.3) * (0.7) * (0.3) = 0.0189

Thus, we have computed the required probabilities as follows:

P (S2 = 2, S5 = 1) = 0.0441

P (S2 = 2, S4 = 3, S5 = 1) = 0.0189

Learn more about probability visit:

brainly.com/question/30034780

#SPJ11

A trucking company determined that the distance traveled per truck per year is normally​ distributed, with a mean of

30

thousand miles and a standard deviation of

12

thousand miles. Complete parts​ (a) through​ (d) below.

What percentage of trucks can be expected to travel either less than

15

or more than

40

thousand miles in a​ year?

The percentage of trucks that can be expected to travel either less than

15

or more than

40

thousand miles in a year is

nothing

Answers

Approximately 30.79% of trucks can be expected to travel less than 15,000 or more than 40,000 miles per year.

What percentage of trucks fall in that range?

To determine the percentage of trucks that can be expected to travel either less than 15 or more than 40 thousand miles in a year, we can use the properties of the normal distribution.

Let's calculate the z-scores for 15,000 miles and 40,000 miles using the given mean and standard deviation:

For 15,000 miles:

z-score = (x - mean) / standard deviation

= (15,000 - 30,000) / 12,000

= -15,000 / 12,000

= -1.25

For 40,000 miles:

z-score = (x - mean) / standard deviation

= (40,000 - 30,000) / 12,000

= 10,000 / 12,000

= 0.8333

Now, we can use a z-table or a statistical calculator to find the percentage of trucks that fall below -1.25 or above 0.8333 in terms of z-scores.

From the z-table or calculator, we find the following probabilities:

For a z-score of -1.25, the corresponding probability is approximately 0.1056 or 10.56%.

For a z-score of 0.8333, the corresponding probability is approximately 0.7977 or 79.77%.

To find the percentage of trucks that travel either less than 15,000 or more than 40,000 miles in a year, we add the probabilities together:

10.56% + (100% - 79.77%) = 10.56% + 20.23% = 30.79%

Therefore, approximately 30.79% of trucks can be expected to travel either less than 15,000 or more than 40,000 miles in a year.

Learn more about trucks

brainly.com/question/20796021

#SPJ11

Suppose that the sitting back-to-knee length for a group of adults has a normal distribution with a mean of μ = 22.7 in. and a standard deviation of o=1.2 in. These data are often used in the design of different seats, including aircraft seats, train seats, theater seats, and classroom seats. Instead of using 0.05 for identifying significant values, use the criteria that a value x is significantly high if P(x or greater) ≤ 0.01 and a value is significantly low if P(x or less) ≤0.01. Find the back-to-knee lengths separating significant values from those that are not significant. Using these criteria, is a back-to-knee length of 24.9 in. significantly high? Find the back-to-knee lengths separating significant values from those that are not significant. in. are not significant, and values outside that range are considered significant. Back-to-knee lengths greater than in. and less than (Round to one decimal place as needed.) Using these criteria, is a back-to-knee length of 24.9 in. significantly high? A back-to-knee length of 24.9 in. significantly high because it is the range of values that are not considered significant.

Answers

The bounds of significant values are given as follows:

Low: 19.9 in.High: 25.5 in.

As 24.9 inches is less than 25.5 inches, it is not a significant high value.

How to obtain the measures with the normal distribution?

We first must use the z-score formula, as follows:

[tex]Z = \frac{X - \mu}{\sigma}[/tex]

In which:

X is the measure.[tex]\mu[/tex] is the population mean.[tex]\sigma[/tex] is the population standard deviation.

The z-score represents how many standard deviations the measure X is above or below the mean of the distribution, and can be positive(above the mean) or negative(below the mean).

The z-score table is used to obtain the p-value of the z-score, and it represents the percentile of the measure represented by X in the distribution.

The mean and the standard deviation for this problem are given as follows:

[tex]\mu = 22.7, \sigma = 1.2[/tex]

The 1st percentile is X when Z = -2.327, hence:

-2.327 = (X - 22.7)/1.2

X - 22.7 = -2.327 x 1.2

X = 19.9.

The 99th percentile is X when Z = 2.327, hence:

2.327 = (X - 22.7)/1.2

X - 22.7 = 2.327 x 1.2

X = 25.5.

More can be learned about the normal distribution at https://brainly.com/question/25800303

#SPJ4

If the coefficient of determination is equal to 0.81, and the linear regression equation is equal to ŷ = 15- 0.49x1, then the correlation coefficient must necessarily be equal to:

Answers

The correlation coefficient must necessarily be equal to -0.9.

The coefficient of determination (R²) is a statistical measure that indicates how well the regression line predicts the data points. It is a proportion of the variance in the dependent variable (y) that can be predicted by the independent variable (x).The value of R² ranges from 0 to 1, with 1 indicating a perfect fit between the regression line and the data points. The closer R² is to 1, the more accurate the regression line is in predicting the data points.

The formula to calculate the correlation coefficient (r) is as follows:r = (n∑xy - ∑x∑y) / √((n∑x² - (∑x)²) (n∑y² - (∑y)²))where x and y are the two variables, n is the number of data points, and ∑ represents the sum of the values.To find the correlation coefficient (r) from the coefficient of determination (R²), we take the square root of R² and assign a positive or negative sign based on the direction of the linear relationship (positive or negative).

The formula to find the correlation coefficient (r) from the coefficient of determination (R²) is as follows:

r = ±√R²For example, if R² is 0.81, then r = ±√0.81 = ±0.9

Since the linear regression equation is y = 15- 0.49

x1, this means that the slope of the line is -0.49.

This indicates that there is a negative linear relationship between the two variables, meaning that as x1 increases, y decreases.

Since the correlation coefficient (r) must have a negative sign, we have :r = -0.9

Know more about the correlation coefficient

https://brainly.com/question/4219149

#SPJ11

Como puedo resolver F(x)=-7x-11

Answers

When x is equal to -11/7, the Function F(x) evaluates to 22.

The equation F(x) = -7x - 11, you are looking for the values of x that make the equation true. In other words, you want to find the solutions for x that satisfy the equation.

To solve this linear equation, you can follow these steps:

Step 1: Set F(x) equal to zero:

-7x - 11 = 0.

Step 2: Add 11 to both sides of the equation:

-7x = 11.

Step 3: Divide both sides of the equation by -7 to isolate x:

x = 11 / -7.

Step 4: Simplify the fraction, if possible:

x = -11 / 7.

So, the solution to the equation F(x) = -7x - 11 is x = -11/7.

To verify the solution, you can substitute this value back into the original equation:

F(-11/7) = -7(-11/7) - 11

F(-11/7) = 11 + 11

F(-11/7) = 22.

Therefore, when x is equal to -11/7, the function F(x) evaluates to 22.

For more questions on Function .

https://brainly.com/question/11624077

#SPJ8

find the absolute maximum and minimum, if either exists, for f(x)=x^2-2x 5

Answers

Given that f(x) = x² - 2x + 5. We need to find the absolute maximum and minimum of the function.Let us differentiate the function to find critical points, that is, f '(x) = 2x - 2.We know that f(x) is maximum or minimum at critical points. So, f '(x) = 0 or f '(x) does not exist.

Let's solve for x.2x - 2 = 0⇒ 2x = 2⇒ x = 1Therefore, f '(1) = 2(1) - 2 = 0The critical point is x = 1.Now, we need to test if this critical point gives an absolute maximum or minimum.To do this, we can check the value of f(x) at this point as well as the values of f(x) at the endpoints of the domain of x. Here, the domain is -∞ < x < ∞.Let's begin by calculating f(x) at the critical point.x = 1⇒ f(1) = (1)² - 2(1) + 5= 4Therefore, the function has a maximum at x = 1.

Now, let's check the values of f(x) at the endpoints of the domain.x → -∞⇒ f(x) → ∞x → ∞⇒ f(x) → ∞Therefore, there are no minimum values of the function.To summarize, the absolute maximum of the function f(x) = x² - 2x + 5 is 4 and there is no absolute minimum value of the function as f(x) approaches infinity for both positive and negative values of x.

To know more about domain visit :

brainly.com/question/30133157

#SPJ11

Compute the circulation of the vector field F = around the curve C that is a unit square in the xy-plane consisting of the following line segments.

(a) the line segment from (0, 0, 0) to (1, 0, 0)

(b) the line segment from (1, 0, 0) to (1, 1, 0)

(c) the line segment from (1, 1, 0) to (0, 1, 0)

(d) the line segment from (0, 1, 0) to (0, 0, 0)

Answers

To compute the circulation of the vector field F around the curve C, we need to evaluate the line integral ∮C F · dr, where dr is the differential vector along the curve C. Let's calculate the circulation for each segment of the curve:

(a) Line segment from (0, 0, 0) to (1, 0, 0):

The differential vector dr along this segment is dr = dx i, where i is the unit vector in the x-direction, and dx represents the differential length along the x-axis. Since the vector field F = <y, 0, 0>, we have F · dr = (y)dx = 0, because y = 0 along this line segment. Hence, the circulation along this segment is zero.

(b) Line segment from (1, 0, 0) to (1, 1, 0):

The differential vector dr along this segment is dr = dy j, where j is the unit vector in the y-direction, and dy represents the differential length along the y-axis. Since the vector field F = <y, 0, 0>, we have F · dr = (y)dy = y dy. Integrating y dy from 0 to 1 gives us the circulation along this segment. Evaluating the integral, we get:

∫[0,1] y dy = [y^2/2] from 0 to 1 = (1^2/2) - (0^2/2) = 1/2.

(c) Line segment from (1, 1, 0) to (0, 1, 0):

The differential vector dr along this segment is dr = -dx i, where i is the unit vector in the negative x-direction, and dx represents the differential length along the negative x-axis. Since the vector field F = <y, 0, 0>, we have F · dr = (y)(-dx) = -y dx. Integrating -y dx from 1 to 0 gives us the circulation along this segment. Evaluating the integral, we get:

∫[1,0] -y dx = [-y^2/2] from 1 to 0 = (0^2/2) - (1^2/2) = -1/2.

(d) Line segment from (0, 1, 0) to (0, 0, 0):

The differential vector dr along this segment is dr = -dy j, where j is the unit vector in the negative y-direction, and dy represents the differential length along the negative y-axis. Since the vector field F = <y, 0, 0>, we have F · dr = (y)(-dy) = -y dy. Integrating -y dy from 1 to 0 gives us the circulation along this segment. Evaluating the integral, we get:

∫[1,0] -y dy = [-y^2/2] from 1 to 0 = (0^2/2) - (1^2/2) = -1/2.

To compute the total circulation around the curve C, we sum up the circulations along each segment:

Total Circulation = Circulation(a) + Circulation(b) + Circulation(c) + Circulation(d)

= 0 + 1/2 + (-1/2) + (-1/2)

= 0.

Therefore, the total circulation of the vector field F around the curve C, which is a unit square in the xy-plane, is zero.

To know more about vector visit-

brainly.com/question/32558946

#SPJ11

Evaluate the expression below when x = 6 and y = 2. 6 x 2/y 3

Answers

Answer:

27

Step-by-step explanation:

To evaluate an expression we need to find the numerical value of the expression by substituting appropriate values for the variables and performing the indicated mathematical operations.

Given rational expression:

[tex]\dfrac{6x^2}{y^3}[/tex]

To evaluate the given expression when x = 6 and y = 2, substitute x = 6 and y = 2 into the expression and solve.

[tex]\dfrac{6(6)^2}{(2)^3}[/tex]

Following the order of operations, begin by evaluating the exponents first.

To square a number, we multiply it by itself.

[tex]\implies 6^2 = 6 \times 6 = 36[/tex]

To cube a number, we multiply it by itself twice.

[tex]\implies 2^3 = 2 \times 2 \times 2 = 8[/tex]

Therefore:

[tex]\dfrac{6(6)^2}{(2)^3}=\dfrac{6 \cdot 36}{8}[/tex]

Multiply the numbers in the numerator:

[tex]\dfrac{216}{8}[/tex]

Finally, divide 218 by 8:

[tex]\dfrac{216}{8}=27[/tex]

Therefore, the evaluation of the given expression when x = 6 and y = 2 is 27.

[tex]\hrulefill[/tex]

As one calculation:

[tex]\begin{aligned}x=6, y=2 \implies \dfrac{6x^2}{y^3}&=\dfrac{6(6)^2}{(2)^3}\\\\&=\dfrac{6 \cdot 36}{8}\\\\&=\dfrac{216}{8}\\\\&=27\end{aligned}[/tex]

find the average value have of the function h on the given interval. h(u) = (18 − 9u)−1, [−1, 1]

Answers

Answer:

17

Step-by-step explanation:

Assuming the -1 is not a typo, we can see that the function h is a linear function. Thus we can simply plug in -1 and 1 for h, then take the average of the 2 values we get.

h(-1) = 26, and h(1) = 8.

Average = (26 + 8)/ 2 = 17

The problem asks to find the average value of h on the interval [-1,1]. To do this, use the formula avg = 1/(b-a)∫[a,b] h(x)dx, where a and b are the endpoints of the interval. The integral can be evaluated from -1 to 1, resulting in an average value of approximately 0.0611.

The problem is asking us to find the average value of the function h on the given interval. The function is h(u) = (18 − 9u)−1 and the interval is [−1, 1].

To find the average value of the function h on the given interval, we can use the following formula: avg = 1/(b-a)∫[a,b] h(x)dx where a and b are the endpoints of the interval. In this case, a = -1 and b = 1, so we have:

avg =[tex]1/(1-(-1)) ∫[-1,1] (18 - 9u)^-1 du[/tex]

Now we need to evaluate the integral. We can use u-substitution with u = 18 - 9u and du = -1/9 du:∫(18 - 9u)^-1 du= -1/9 ln|18 - 9u|We evaluate this from -1 to 1:

avg = [tex]1/2 ∫[-1,1] (18 - 9u)^-1 du[/tex]

= [tex]1/2 (-1/9 ln|18 - 9u|)|-1^1[/tex]

= 1/2 ((-1/9 ln|9|) - (-1/9 ln|27|))

= 1/2 ((-1/9 ln(9)) - (-1/9 ln(27)))

= 1/2 ((-1/9 * 2.1972) - (-1/9 * 3.2958))

= 1/2 ((-0.2441) - (-0.3662))

= 1/2 (0.1221)

= 0.0611

Therefore, the average value of the function h on the interval [-1,1] is approximately 0.0611.

To know more about average value Visit:

https://brainly.com/question/28123159

#SPJ11

answer please
Which of the following describes the normal distribution? a. bimodal c. asymmetrical d. symmetrical b. skewed

Answers

The correct answer is d. symmetrical. Therefore, neither a, c, nor b describes the normal distribution accurately.

The normal distribution, also known as the Gaussian distribution or bell curve, is a symmetric probability distribution. It is characterized by a bell-shaped curve, where the data is evenly distributed around the mean. In a normal distribution, the mean, median, and mode are all equal and located at the center of the distribution. A bimodal distribution refers to a distribution with two distinct peaks or modes. An asymmetrical distribution does not exhibit symmetry and can be skewed to one side. Skewness refers to the degree of asymmetry in a distribution, so a skewed distribution is not necessarily a normal distribution.

Learn more about distribution here:

https://brainly.com/question/28833459

#SPJ11

17. Let Y(t) = X² (t) where X(t) is the Wiener process. (a) Find the pdf of y(t). (b) Find the conditional pdf of Y(t2) and Y(t₁).

Answers

A. the pdf of Y(t) is given by fY(t) = 1/(2√(πt)Y(t)) e^(-(1/2t)(Y(t))).

B.  the conditional pdf of Y(t₂) given Y(t₁) is given by fY(t₂|t₁) = (1/√(2π(t₂-t₁))) y(t₂)/y(t₁) e^(-(y(t₂)+y(t₁))/(2(t₂-t₁))).

(a) The Wiener process X(t) is a continuous random variable. So, to find the pdf of Y(t) = X²(t), we need to use the transformation method. Let's use the change of variables method, which states that if Y = g(X), then the pdf of Y is given by fY(y) = fX(g^(-1)(y))|d/dy(g^(-1)(y))|.

We have Y(t) = X²(t) ⇒ X(t) = ±(Y(t))^(1/2).

Using g(x) = x², we have g^(-1)(y) = ±y^(1/2).

Differentiating g^(-1)(y) with respect to y, we have d/dy(g^(-1)(y)) = ±1/(2√y).

We consider X(t) = (Y(t))^(1/2). Therefore, the pdf of Y(t) is given by:

fY(t) = fX(t)|dX(t)/dY(t)|.

Since X(t) is a Wiener process, its pdf fX(t) is given by the normal distribution function N(0, t) with mean 0 and variance t. Therefore, we have:

fY(t) = 1/(√(2πt)) |1/(2√Y(t))| e^(-(1/2t)(Y(t))).

Simplifying the above expression, we get:

fY(t) = 1/(2√(πt)Y(t)) e^(-(1/2t)(Y(t))).

Hence, the pdf of Y(t) is given by fY(t) = 1/(2√(πt)Y(t)) e^(-(1/2t)(Y(t))).

(b) The conditional pdf of Y(t₂) and Y(t₁) is given by:

fY(t₂|t₁) = f(t₁,t₂)/fY(t₁),

where f(t₁,t₂) is the joint pdf of Y(t₁) and Y(t₂), which is given by:

f(t₁,t₂) = fX(x₁) fX(x₂),

where x₁ and x₂ are the values taken by X(t₁) and X(t₂) respectively.

Substituting fX(x) = 1/(√(2πt)) e^(-(x²/2t)) and X(t₁) = x₁ and X(t₂) = x₂, we have:

f(t₁,t₂) = 1/(2πt₁t₂) e^(-(x₁²/2t₁ + x₂²/2t₂)).

Now, substituting Y(t₁) = X²(t₁) = x₁² and Y(t₂) = X²(t₂) = x₂² in f(t₁,t₂), we have:

f(t₁,t₂) = 1/(2πt₁t₂) e^(-(y(t₁)/2t₁ + y(t₂)/2t₂)).

Therefore, the conditional pdf of Y(t₂) given Y(t₁) is given by:

fY(t₂|t₁) = f(t₁,t₂)/fY(t₁).

Substituting the values of f(t₁,t₂) and fY(t₁) from above, we have:

fY(t₂|t₁) = (1/√(2π(t₂-t₁))) y(t₂)/y(t₁) e^(-(y(t₂)+y(t₁))/(2(t₂-t₁)).

Hence, the conditional pdf of Y(t₂) given Y(t₁) is given by fY(t₂|t₁) = (1/√(2π(t₂-t₁))) y(t₂)/y(t₁) e^(-(y(t₂)+y(t₁))/(2(t₂-t₁))).

To learn more about conditional, refer below:

https://brainly.com/question/19258518

#SPJ11

Question 6 Find the value of x to the nearest degree. √√58 O 67 O 23 O 83 O 53 70 3

Answers

To the nearest degree, the value of x is 2 degrees.

So, the correct option is (B) 67.

Given equation is: √√58 = x

To find the value of x, we will proceed as follows:

We can also write the equation as follows:

x = (58)^(1/4)^(1/2)

x = (2*29)^(1/4)^(1/2)

x = (2)^(1/2) * (29)^(1/4)^(1/2)

x = √2 * √√29

So, we need to calculate the value of x in degrees.

Since, √2 = 1.4142 (approximately) and √√29 = 1.5555 (approximately)

So, the value of x is:

x = 1.4142 * 1.5555

= 2.203 (approximately)

To the nearest degree, the value of x is 2 degrees.

So, the correct option is (B) 67.

To know more about degree visit:

https://brainly.com/question/364572

#SPJ11

Consider the following. 1 3 1 1 8 38 1 V = Max. 15 = {[33][35)(-+ 1}::] [3} ] = M22 B 1 1 1 8 1 8 Complete the following statements. The elements of set B ---Select--- V linearly independent. The set B has elements and dim(M22) = Therefore, the set B -Select--- a basis for V.

Answers

The elements of set B are linearly independent. The set B has 6 elements. dim(M22) = 4. Therefore, the set B forms a basis for V.

From the given notation, it seems that we are dealing with a vector space V and a set B containing certain elements. We are asked to analyze the linear independence of the elements in set B, determine the number of elements in set B, and evaluate whether set B forms a basis for V.

Linear Independence:

To determine if the elements in set B are linearly independent, we need to check if any element in set B can be written as a linear combination of the other elements in set B. If no such combination exists, then the elements are linearly independent.

Number of Elements in Set B:

We need to count the number of elements in set B based on the given notation. From the provided information, it seems that there are 6 elements in set B.

Dimension of V:

The notation M22 suggests that the vector space V has a dimension of 4. This means that any basis for V should contain 4 linearly independent vectors.

Basis for V:

If the set B is found to be linearly independent and contains the same number of elements as the dimension of V, then it forms a basis for V. A basis is a set of vectors that is linearly independent and spans the entire vector space V.

To know more about linearly independent,

https://brainly.com/question/16466163

#SPJ11

The Downtown Parking Authority Of Tampa, Florida, Reported The Following Information For A Sample Of 220 Customers On The Number Of Hours Cars Are Parked And The Amount They Are Charged. Number Of Hours Frequency Amount Charged 1 15 $ 2 2
The Downtown Parking Authority of Tampa, Florida, reported the following information for a sample of 220 customers on the number of hours cars are parked and the amount they are charged.
Number of Hours Frequency Amount Charged
1 15 $ 2
2 36 6
3 53 9
4 40 13
5 20 14
6 11 16
7 9 18
8 36 22
220 a-1. Convert the information on the number of hours parked to a probability distribution. (Round your answers to 3 decimal places.)
Find the mean and the standard deviation of the number of hours parked. (Do not round the intermediate calculations. Round your final answers to 3 decimal places.)
How long is a typical customer parked? (Do not round the intermediate calculations. Round your final answer to 3 decimal places.)
Find the mean and the standard deviation of the amount charged. (Do not round the intermediate calculations. Round your final answers to 3 decimal places.)

Answers

The mean and the standard deviation of the number of hours parked are 3.360 and 1.590 respectively

The typical customer is parked for an average of 3.360 hours The mean and the standard deviation of the amount charged are $10.909 and $5.391 respectively.

a-1. To convert the information on the number of hours parked to a probability distribution, follow these steps:  Find the total number of cars parked. It is given that there are 220 customers.  Make a table and then calculate the relative frequency.

The relative frequency is the proportion of the number of cars parked in a given number of hours to the total number of cars parked. The table will be as follows: Number of Hours Frequency Relative Frequency 1 15 15/220 = 0.068 2 36 36/220 = 0.164 3 53 53/220 = 0.241 4 40 40/220 = 0.182 5 20 20/220 = 0.091 6 11 11/220 = 0.05 7 9 9/220 = 0.041 8 36 36/220 = 0.164 Total 220 1 a-2.

Mean

The mean of the number of hours parked is:  μ = Σxf / n

Where x = number of hours parked f = frequency n = total number of cars parked  μ = (1 × 15 + 2 × 36 + 3 × 53 + 4 × 40 + 5 × 20 + 6 × 11 + 7 × 9 + 8 × 36) / 220 = 3.36 (rounded to 3 decimal places)

Standard deviation

The standard deviation of the number of hours parked is:

[tex]σ = sqrt(Σf(x - μ)^2 / n) σ = sqrt((15(1 - 3.36)^2 + 36(2 - 3.36)^2 + 53(3 - 3.36)^2 + 40(4 - 3.36)^2 + 20(5 - 3.36)^2 + 11(6 - 3.36)^2 + 9(7 - 3.36)^2 + 36(8 - 3.36)^2) / 220) = 1.59 (rounded to 3 decimal places)[/tex]

Therefore, the mean and the standard deviation of the number of hours parked are 3.360 and 1.590 respectively.a-3.

How long is a typical customer parked?

The typical customer is parked for an average of 3.360 hours (rounded to 3 decimal places).a-4.

Mean

The mean of the amount charged is:  μ = Σxf / n

Where x = amount charged f = frequency n = total number of cars parked  μ = (2 × 15 + 6 × 36 + 9 × 53 + 13 × 40 + 14 × 20 + 16 × 11 + 18 × 9 + 22 × 36) / 220 = 10.909 (rounded to 3 decimal places)

Standard deviation

The standard deviation of the amount charged is:

[tex]σ = sqrt(Σf(x - μ)^2 / n) σ = sqrt((15(2 - 10.909)^2 + 36(6 - 10.909)^2 + 53(9 - 10.909)^2 + 40(13 - 10.909)^2 + 20(14 - 10.909)^2 + 11(16 - 10.909)^2 + 9(18 - 10.909)^2 + 36(22 - 10.909)^2) / 220) = 5.391 (rounded to 3 decimal places)[/tex]

Therefore, the mean and the standard deviation of the amount charged are $10.909 and $5.391 respectively.

To know more on mean visit:

https://brainly.com/question/1136789

#SPJ11

which equation can be used to find the measure of angle lkj? cos-1 (8.9/10.9) = x
cos-1( 10.9/8.9) = x
sin-1(10.9/8.9) = x
sin-1(8.9/10.9) = x

Answers

The equation that can be used to find the measure of angle LKJ is sin-1(8.9/10.9) = x.

Trigonometry is a branch of mathematics that studies the relationship between the sides and angles of triangles, especially right triangles.

An angle is a measure of the amount of rotation or inclination of two lines or planes about their intersection.  Angles can be measured in degrees, radians, or grads.

An equation is a mathematical statement that demonstrates that two things are equal. An equation consists of two sides, a left-hand side (LHS) and a right-hand side (RHS), separated by an equal sign.

Cosine is a trigonometric function that relates the ratio of the adjacent side of a right-angled triangle to the hypotenuse.

The sine function is a trigonometric function that is used to calculate the ratio of the length of the side opposite an acute angle in a right-angled triangle to the hypotenuse.

To know more about trigonometry function visit:

https://brainly.com/question/29286780

#SPJ11

what are all the roots for the function? f(x)= x^3+3x^2+x-5

Answers

The roots of the function f(x) =[tex]x^3 + 3x^2 + x - 5[/tex] are approximately x ≈ -2.27 (real root) and x ≈ -0.36 + 1.56i, x ≈ -0.36 - 1.56i,   [tex](x-1)(x^3+3x^2+x-5)[/tex].

To find the roots of the function f(x) = x^3 + 3x^2 + x - 5, we need to solve for values of x that make the function equal to zero.

One approach to finding the roots is by using factoring or synthetic division, but in this case, the function does not have any obvious rational roots. Therefore, we can use numerical methods such as the Newton-Raphson method or graphing techniques to approximate the roots.

Using a graphing calculator or software, we can plot the function f(x) = x^3 + 3x^2 + x - 5. By analyzing the graph, we can estimate the x-values where the function intersects the x-axis, indicating the roots.

Upon analyzing the graph or using numerical methods, we find that the function has one real root approximately equal to x ≈ -2.27.

The other two roots are complex conjugates, which means they come in pairs of the form a + bi and a - bi. For this particular function, the complex roots are approximately x ≈ -0.36 + 1.56i and x ≈ -0.36 - 1.56i.

For more such questions on roots

https://brainly.com/question/428672

#SPJ8

find the sum of the given vectors. a = 2, 0, 1 , b = 0, 8, 0

Answers

In other words, a + b = b + a. Vector addition is also associative, which means that the way the vectors are grouped for addition does not affect the result. In other words, (a + b) + c = a + (b + c).

To find the sum of the given vectors a = 2, 0, 1 and b = 0, 8, 0, we can simply add the corresponding components of the vectors as shown below: a + b = (2 + 0), (0 + 8), (1 + 0)= 2, 8, 1

Therefore, the sum of the given vectors a and b is 2, 8, 1.

The sum of two or more vectors is obtained by adding the corresponding components of the vectors. This operation is called vector addition and it is one of the basic operations of vector algebra. Vector addition is one of the fundamental operations in vector algebra.

In vector algebra, a vector is represented as an ordered set of numbers that describe its magnitude and direction. The magnitude of a vector is the length of the line segment representing the vector while the direction of a vector is the direction of the line segment that represents the vector.

When two or more vectors are added, their corresponding components are added to give the sum of the vectors. The sum of the vectors is a vector that represents the combined effect of the individual vectors. For example, if we have two vectors a and b, then the sum of the vectors is obtained by adding the corresponding components of the vectors.

If a = (a1, a2, a3) and b = (b1, b2, b3), then a + b = (a1 + b1, a2 + b2, a3 + b3). This is the basic rule for vector addition and it is easy to understand and apply. Vector addition is commutative, which means that the order of addition does not affect the result.

To know more about vectors visit:

https://brainly.com/question/24256726

#SPJ11

Other Questions
In our definition, the study of economics is concerned with which THREE major economic activities? Chinook salmon are able to move upstream faster by jumping out of the water periodically; this behavior is called porpoising. Suppose a salmon swimming in still water jumps out of the water with a speed of 6.26 m/s at an angle of 45 degrees, sails through the air a distance L before returning to the water, and then swims a distance L underwater at a speed of 3.58 m/s before beginning another porpoising maneuver.Determine the average speed of the fish. Call centre system provides a central number in an organization that customers call for technical support, sales information, and order status. Incoming calls arrive with interarrival times being exponentially distributed with a mean of 1 minute. This central number feeds 10 trunk lines. If all 10 lines are in use, a caller gets a busy signal, hopefully, the caller will try again later, but for our model, he just goes away. An answered caller hears a recording describing three options: transfer to technical support, sales information, or order-status inquiry a. Is this a Generalised or specialised system? b. What are two methods to model balking/rejection in Arena? c. What are the (5) five statistics of interest of this system? d. What is balking and how does it happen in a call centre system? e. calls? If the number of call increase by 100%, how can you optimise these system so that you can accommodate all USE THE FOLLOWING DATA FOR QUESTIONS 4-6: 4 A portfolio is equally invested in Stock A, Stock B, Stock C, and Treasury Bills (25% each). The expected returns of each of these holdings is 5%, 12%, 22%, and 1%, respectively. The Betas for each of the stocks is as follows: A 0.6, B 1.1, and C 2.5. Q4: What is the Expected Return of the Portfolio? PLEASE ENTER YOUR ANSWER AS A WHOLE NUMBER WITHOUT THE PERCENT SIGN (i.e. 5% should be entered as 5). Numeric Response the force per meter between the two wires of a jumper cable being utilized to start a stalled van is 0.215 n/m. Consider a hydrogenic atom. a) Plot the 3s, 3p, and 3d radial wave functions R. (r) on the same graph. b) How many radial nodes does each wave function have? Give the location, r, of each node in to at least two significant figures.c) How many angular nodes does each orbital have? d) What is the orbital angular momentum of an electron in each orbital? 2. Consider a hydrogenic atom. a) Plot the radial distribution function Pm (t) for the 3s, 3p, and 3d wave functions. b) In which orbital does an electron have the greatest probability of being near the nucleus? c) How do the radial distribution functions vary as a function of atomic number, Z? (This is akin to comparing H to Het to Lit, etc.) Does this make sense physically? Explain 3. Consider a 1s orbital in a hydrogen atom. (a) Prove that the maximum in the radial probability distribution, P. (c), occurs at r = ... (b) Find (r) as a function of a.. Explain any difference from your result in (a). What trends in your profession are you most excited about?What are some future challenges in healthcare human resources management that you see for your profession? Your organization?Based on what you have learned in this course, how would you address these challenges? Explain and do a critical analysis as to why national cultures are very important for the understanding of geopolitics but are difficult and tricky to assessRubrics are enclosed to help you understand what our expectations areThis is a group assignment so extensions will not be granted for individual reasons like one person travelling etc. how do adenosine triphosphate (atp) and lactic acid relate to cellular respiration? After 15 weeks of the reporting period have passed, Joness pay increases to $60 000 per annum, or $1 153.85 per week. At this time, the recorded balance of annual leave expense and annual leave payable is $1 355.70 ($90.38 per week 3 15 weeks). Jones is entitled to four weeks annual leave with a loading of 17.5%.RequiredWhat general journal entry(ies) should Joness employer record to recognise these events? approximately how many older people experience elder abuse each year? An improvable is a diamond that can be repolished to improve its clarityA. to Flawless.B. from I3 to SI2.C. to VVS1 or VVS2.D. to Internally Flawless 13. Projects can be categorized into Problem, Opportunity and Directive. A project to upgrade the firewall in order to provide better network security should be categorized under which one? a. Directive b. Problem c. Opportunity d. Cannot be decided, i.e. can be (a), (b) or (c). 14. Which of the following is a technique for quality control? a. Benchmarking b. Quality audit c. Probability / impact matrix d. Pareto diagram 15. Which of the following is/are true about a task on the critical path of a project? a. Its free slack and total slacks are both 0. b. Its (free slack + total slack) is 0. c. Its duration is greater than its (free slack + total slack). d. Its total slack is different from its free slack. 16. In a Gantt chart, which of the following symbols represents a higher-level task? a. Thick black bar b. Light horizontal bar c. Arrow d. Black diamond : Which of the following is a risit factor that can lead to SIDS? a) stress b) muscle weakness c) premature birth d) heart defects The Norton Anthology of Western Literature, 8th Edition, Vol.2.Identify the opposing arguments in Wordsworths"Expostulation and Reply" and "The Tables Turned." Use your new Digital Business Models Enterprises to comply with this assessment Assume that you need to use an Agent to develop your businesses. Establish an agreement between the parties involved and highlight the most important causes in that type of agreement Tips What causes/statements should you include in a Contract with the agent? Think about rights and duties of the agent, how do you include them in the Contract To be uploaded on VLE in Word or PDF (250 words) three out of four crashes happen within __________ miles of home. Miami Co. issued an 7% annual coupon bond, which has 20 years left to maturity. The bonds currently sell for $1,222. What is the YTM? O5.19% 8.00% O None of the answers is correct 7% 6.46% what is the name of the light producing substance in fireflies Determine the original set of data. 10 5 6 9 9 11 0 5 6 8 899 12 2 458 899 13 2 2 3 79 14 0 4 Legend: 512 represents 5.2 Choose the correct answer below. O A. 10.5, 10.6, 10.9, 10.9, 11.0, 11.5, 11.6,