I really need the answer to this question fast.

Therefore, the probability of selecting a red or orange item at random depends on the total number of items and the number of red and orange items and can be calculated by dividing the total number of red and orange items by the total number of items.

The probability of selecting a red or orange item at random depends on the total number of items and the number of red and orange items. Let's say there are 10 items in total and 4 of them are red, while 2 are orange. The probability of selecting a red or orange item would be 6/10 or 0.6. This means that there is a 60% chance of selecting either a red or orange item. In conclusion, the probability of selecting a red or orange item at random depends on the total number of items and the number of red and orange items and can be calculated by dividing the total number of red and orange items by the total number of items.

Therefore, the probability of selecting a red or orange item at random depends on the total number of items and the number of red and orange items and can be calculated by dividing the total number of red and orange items by the total number of items.

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The area of the triangle T with sides u = ⟨3, 3, 3⟩, v = ⟨6, 0, 6⟩, and u-v is 9√3 square units.

To find the area of the triangle T, we first calculate the cross product of vectors u and v, denoted as u × v. The magnitude of the cross product gives us the area of the corresponding parallelogram, and dividing it by 2 gives us the area of the triangle.

Calculating the cross product:

u × v = |i j k|

|3 3 3|

|6 0 6|

Expanding the determinant:

u × v = (36 - 30)i - (36 - 36)j + (30 - 36)k

= 18i - 0j - 18k

= 18(1, 0, -1)

The magnitude of the cross product:

|u × v| = |18(1, 0, -1)|

= 18|1, 0, -1|

= 18√(1² + 0² + (-1)²)

= 18√2

= 18√3 square units.

Therefore, the area of triangle T is half the area of the parallelogram, which is (1/2)(18√3) = 9√3 square units.

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The length of XY in the shaded sector that has an area of 3/2pi is calculated as: XY = 2 units.

The area of a shaded sector = ∅/360 * πr², where r is the radius and ∅ is the central angle.

Given the following:

m<YXZ (∅) = 135 degrees

Area of the shaded sector = 3/2π

Radius (r) = XY = ?

Substitute the values:

3/2π = 135/360 * πr²

Solve for r (XY):

1.5π = 0.375 * πr²

Divide both sides by 0.375π:

1.5π/0.375π = r²

4 = r²

r = 2

XY = 2 units

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6√3 inches is the length of the altitude of the equilateral triangle.

Let x be the length of one side of the equilateral triangle.

The perimeter of the equilateral triangle is 3x since all sides are equal.

So, 3x = 36 inches.

Dividing by 3 on both sides, we get x = 12 inches.

Let h be the altitude of the equilateral triangle.

The altitude bisects the base of the equilateral triangle and creates two right triangles, each with a base of 6 inches (half of 12 inches) and a hypotenuse of 12 inches (the side of the equilateral triangle).

Using the Pythagorean theorem, we can find the height of the right triangle:

[tex]h^2 + 6^2 = 12^2\\\\h^2 + 36 = 144\\\\h^2 = 108\\\\h = sqrt{(108)} = 6\sqrt3\ inches.[/tex]

Therefore, the length of the altitude of the equilateral triangle is h = 6√3 inches.

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Tea break in Nkubu High School starts at 10:00am, which is two hours after the start of the school day. The first time the bells ring at the same time for Junior Secondary and Senior Secondary classes is the signal for tea break.

For Junior Secondary (JS) classes, each lesson lasts for 30 minutes. Therefore, if the school starts at 8:00am, the first lesson for JS will end at:

8:00am + 0:30hrs = 8:30am

For Senior Secondary (SS) classes, each lesson lasts for 40 minutes. Therefore, if the school starts at 8:00am, the first lesson for SS will end at:

8:00am + 0:40hrs = 8:40am

Since the first time the bells ring at the same time, the children go out for tea break, the tea break will start at the earliest common multiple of 30 and 40, which is 120.

Therefore, tea break will start 120 minutes after 8:00am, which is:

8:00am + 2:00hrs = 10:00am

So, tea break will start at 10:00am.

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The area that was cut out is  457cm²

The formula for calculating the area of a semi-circle is expressed as;

A = 1/2 πr²

Given that the diameters = 2 radius

Radius = 20/2 = 10cm

Substitute the values

Area = 1/2 × 3.14 × 10²

Find the square and substitute

Area = 157 cm²

Area of the triangle = 1/2 × b  × h

Such that 'b' is the base and 'h' is the height

Substitute the values

Area = 1/2 × 20 × 30

Multiply the values

Area = 300cm²

Area cut out = 300 + 157 = 457cm²

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Based on the information we can infer that Sophie is a Savvy Shopper.

A "savvy shopper" is an informal term used to refer to a person who is an expert in finding and taking advantage of the best deals and promotions when shopping. Another outstanding characteristic of these people is that they plan their purchases in advance and take advantage of promotions and discounts.

According to the above, we can infer that if Sophie is a bargain shopper who collects coupons and plans her route to take advantage of sales. She is a savvy shopper.

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The percentag.e of female college runners between 114 - 138 pounds is 82%

Given that X is normally distributed with mean μ = 122 pounds and standard deviation σ = 8 pounds.

We want to find [tex]P(114 < X < 138)[/tex]

To get this, we will standardize X first:

[tex]P(114 < X < 138) = P((114 - 122)/8 < (X - 122)/8 < (138 - 122)/8)[/tex]

= P(-1 < Z < 2)

Using standard normal table, we find that probability of Z falling between -1 and 2 is:

= 0.8186

That means:

[tex]P(114 < X < 138)[/tex] = 0.8186

[tex]P(114 < X < 138)[/tex] = 81.86%

[tex]P(114 < X < 138)[/tex] = 82%

Missing options:

(A)18% (B) 32% (C) 68% (D) 82% (E)95%

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The series ∑(-5)^n/(n^2) is convergent.

The ratio test is a method for determining whether an infinite series converges or diverges. It involves taking the limit of the absolute value of the ratio of successive terms:

lim n→∞ |an+1/an|

If this limit is less than 1, then the series converges. If it is greater than 1, then the series diverges. If it is exactly equal to 1, then the test is inconclusive and another method must be used.

For the series ∑(-5)^n/(n^2), we have:

|a(n+1)/an| = |-5|^(n+1)/(n+1)^2 * n^2/(-5)^n

Simplifying this expression gives:

|a(n+1)/an| = (25(n^2))/((n+1)^2)

Taking the limit as n approaches infinity gives:

lim n→∞ |a(n+1)/an| = 25

Since the limit is greater than 1, the series diverges by the ratio test.

Therefore, we conclude that the series ∑(-5)^n/(n^2) is convergent.

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The length of the hypotenuse is approximately 50.16.

For the slope of the given triangle,

In general slope = Δy(horizontal)/Δx(verticle)

The slope = 4/50 = 1/12.5

This slope is under state regulation since it falls between the standard ratio.

As we can see in the given right angle triangle that is made in the given model,

the base is 50 and the height is 4, so  for the hypotenuse,

Let's label the hypotenuse as 'c.'

We have:

[tex]y^2 = 50^2 + 4^2\\\\y^2 = 2500 + 16\\\\y^2 = 2516[/tex]

To find the value of 'y,' we take the square root of both sides:

y ≈ √(2516)

y ≈ 50.16

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The gradient of the line, which is also the slope of the line is calculated as: m = -2.

The gradient of a line is the same as the slope of a line. It is calculated using the same slope formula which can be expressed as:

Gradient of a line (m) = change in y / change in x = rise/run = y2 - y1 / x2 - x1.

To calculate the gradient of the line, choose any two points on the graph:

(0, 5) = (x1, y1)

(3, -1) = (x2, y2)

Plug in the values into the formula:

Gradient of the line = (-1 - 5) / (3 - 0)

Gradient = -6/3 = -2.

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Note that given the above graph, the limit of j (x) as x approaches 3 is 4.

A line begins at an open circle (2, 6) on a coordinate plane and falls via (-2, 2), according to the query. (3, 6) is a full circle. A curve travels from a solid circle (2, 3) to an open circle (3, 4). A line (6, 5) connects the open and closed circles.

The graph shows that the function j(x) has a limit of 4 as the value of x approaches 3.

A graph is a diagram or graphical representation that organizes the portrayal of facts or values.

Note that the points on a graph are typically used to depict the relationships between two or more things.

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Full Question:

Although part of your question is missing, you might be referring to this full question:

See attached image..

The best guess for how many times you will choose a blue marble out of 12 trials is 8 times.

The likelihood of choosing a blue marble on each trial stays constant over the course of the 12 trials if there are 3 marbles total—2 blue and 1 green—and you choose one without looking.

The likelihood of selecting a blue marble on any given trial is 2/3, or 2 out of 3.

You may multiply the likelihood of selecting a blue marble on each trial by the number of trials to determine how many times you will choose a blue marble over the course of 12 trials:

E = Probability of blue marble * Number of trials

E = (2/3) * 12

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The ball hits the ground after a time of 3.05 seconds.

The quadratic function giving the ball's height after t seconds is given as follows:

h(t) = -16.1t² + 150.

(In which -16.1 is the gravity's effect, while 150 is the initial height).

The ball hits the ground when the height function has a numeric value of zero, that is:

h(t) = 0.

Hence the time is obtained solving the equation, isolating the variable t, as follows:

-16.1t² + 150 = 0

16.1t² = 150

t² = 150/16.1

[tex]t = \sqrt{\frac{150}{16.1}}[/tex]

t = 3.05 seconds.

The complete problem is:

The quadratic function h(t)=-16.1t^2 + 150 models a balls height, in feet, over time, in seconds, after it is dropped from a 15 story building. After how many seconds, rounded to the nearest hundredth, did the ball hit the ground?

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The statement is true. If a matrix B can be expressed as B = PDP^T, where P is an invertible matrix and D is a diagonal matrix, then B is a symmetric matrix.

This can be proven as follows:
First, let's take the transpose of B:

B^T = (PDP^T)^T = (P^T)^TD^T P^T

Since D is a diagonal matrix, its transpose is equal to itself:

D^T = D

Therefore, we can substitute D^T with D in the above equation:

B^T = PDP^T = B

Since B is equal to its transpose, it is a symmetric matrix.

In other words, if a matrix B can be diagonalized by an orthogonal matrix P, which means that P^T=P^-1, then B is a symmetric matrix. This is because orthogonal matrices preserve the dot product and the symmetry of a matrix. The diagonal matrix D represents the eigenvalues of B, which can be either positive, negative, or zero. Therefore, if all the eigenvalues of B are non-negative, then B is positive definite, and if they are non-positive, then B is negative definite. If some eigenvalues are positive and some are negative, then B is indefinite.

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Answer:

  4.49352×10¹²

Step-by-step explanation:

You want the product of 5.688×10⁹ and 7.9×10² expressed in scientific notation.

Generally, we use a calculator to simplify multiplication of such numbers. We can ask that same calculator to display the results in scientific notation. The number of significant digits in the product will be the sum of the numbers of significant digits in the given coefficients: 4 + 2 = 6.

  5.688×10⁹ · 7.9×10² = 4.49352×10¹²

__

Additional comments

A spreadsheet also gives you the option of displaying the number in scientific notation.

Note that many calculators use an "E" notation for entering the exponent of numbers in scientific notation. The key used for entering the exponent may be labeled EEX or EE or EXP. Some also use that same E notation for displaying the result.

The number of significant digits in the product that are of interest depends on the application. We have given the result of straight multiplication of these numbers. In a measurement or physics application, the result should be rounded to 2 significant digits, the number of digits in the least-precise factor. For general engineering application, you may want to round to about 4 significant digits, as more precision than that is often unneeded. If this is a value that will be added or subtracted with another, you probably want to keep the full precision available.

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The measure of the angle μ∠ABD subtended by the arc AD at the circumference is equal to 27°

The angle subtended by an arc of a circle at it's center is twice the angle it substends anywhere on the circles circumference. Also the arc measure and the angle it subtends at the center of the circle are directly proportional.

arc AD = 2(μ∠ABD)

Also arc AD = 54°

2(μ∠ABD) = 54°

μ∠ABD = 54°/2 {divide through by 2}

μ∠ABD = 27°

Therefore, the measure of the angle μ∠ABD subtended by the arc AD at the circumference is equal to 27°

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Therefore, the probability of drawing a green card is 0.0769 or 7.69%.

a. To determine the number of elements in the sample space, we need to know the number of cards in the deck and the possible outcomes for each card. Let's assume that the deck contains 52 cards with four different suits (clubs, diamonds, hearts, spades) and 13 cards in each suit (ace, 2, 3, 4, 5, 6, 7, 8, 9, 10, jack, queen, king).

The possible outcomes for each card are the suit and the rank. Therefore, there are 4 possible outcomes for the suit and 13 possible outcomes for the rank. Using the multiplication principle, we can determine the number of elements in the sample space by multiplying the number of possible outcomes for the suit by the number of possible outcomes for the rank:

Number of elements in the sample space = 4 x 13 = 52

Therefore, there are 52 elements in the sample space.

b. To find the probability of drawing a green card, we need to know how many green cards there are in the deck and how many cards there are in total. Let's assume that there are 4 different colors of cards in the deck: red, blue, yellow, and green. We also assume that there are 13 cards of each color in the deck.

Therefore, there are 4 green cards in the deck. The probability of drawing a green card can be calculated by dividing the number of green cards by the total number of cards in the deck:

Probability of drawing a green card = number of green cards / total number of cards

Probability of drawing a green card = 4 / 52

Probability of drawing a green card = 0.0769 or 7.69%

Therefore, the probability of drawing a green card is 0.0769 or 7.69%.

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The two points at which the line intersects the curve are (2, -2) and (4/3, -4).

To find the coordinates of the point at which the line with a gradient of 3 intersects the curve y = 3x² - 7x after passing through the point (2, -2), we can set the equation of the line equal to the equation of the curve and solve for x and y.

The equation of the line passing through (2, -2) with a gradient of 3 can be written as:

y = 3x - 8

Substituting this equation into the curve equation, we get:

3x - 8 = 3x² - 7x

Simplifying the equation:

3x² - 10x + 8 = 0

We can solve this quadratic equation to find the values of x. Using factoring or the quadratic formula, we find:

(x - 2)(3x - 4) = 0.

Setting each factor equal to zero:

x - 2 = 0 --> x = 2

3x - 4 = 0 --> x = 4/3

So, there are two possible x-values where the line can intersect the curve: x = 2 and x = 4/3.

Now, we can substitute these x-values back into the equation of the line to find the corresponding y-values:

For x = 2:

y = 3(2) - 8 = 6 - 8 = -2

For x = 4/3:

y = 3(4/3) - 8 = 4 - 8 = -4

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The probability that the child will catch 10 or more balls in 20 attempts, assuming a 0.2 probability of catching a ball on any single attempt, is very small, approximately 0.00014.

The probability that the child will catch 10 or more balls can be calculated using the binomial distribution.

Let X be the number of balls caught by the child in a total of 20 attempts. The probability of catching a ball on any single attempt is p = 0.2, assuming that each attempt is independent of the others.

The probability of catching exactly k balls in 20 attempts is given by the binomial distribution formula:

P(X = k) = (20 choose k) * p^k * (1-p)^(20-k)

where (20 choose k) is the binomial coefficient, which is equal to 20!/(k!(20-k)!).

The probability of catching 10 or more balls can be calculated as the sum of the probabilities of catching 10, 11, 12, ..., 20 balls:

P(X ≥ 10) = P(X = 10) + P(X = 11) + ... + P(X = 20)

Using a calculator or computer software, this probability can be found to be approximately 0.00014 (rounded to five decimal places).

Therefore, the probability that the child will catch 10 or more balls in 20 attempts, assuming a 0.2 probability of catching a ball on any single attempt, is very small, approximately 0.00014.

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a) The paired t-test is appropriate for these data as it compares the difference in the amount of rainfall between seeded and unseeded clouds.

The assumption needed to justify this is the  test is that the differences between the paired observations are normally distributed.

b) Based on the paired t-test, with a t-statistic of -3.641 and a p-value of 0.0012, there is strong evidence to reject the null of  hypothesis that there is no difference in the amount of rainfall between seeded and unseeded clouds.

Therefore, we can conclude that cloud seeding has a significant effect on the amount of rainfall.

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The result of applying formula 4 of the given theorem to the functions u(t) and v(t) is d/dt(u(t) · v(t)) = -20cos(4t) + 5cos(5t) + tcos(4t) + 5tsin(5t).

Formula 4 of the theorem states that the derivative of the product of two functions u(t) and v(t) is equal to u'(t)v(t) + u(t)v'(t).

In this case, we first take the derivative of u(t) and v(t) separately and then substitute into the formula to obtain the derivative of their product.

Applying this formula to the given functions u(t) = sin(5t), cos(4t), t and v(t) = t, cos(4t), sin(5t), we get d/dt(u(t) · v(t)) = (-5sin(5t))(t) + (cos(5t))(cos(4t)) + (1)(cos(4t)) + (tsin(5t))(5cos(5t)). Simplifying the expression gives us d/dt(u(t) · v(t)) = -20cos(4t) + 5cos(5t) + tcos(4t) + 5tsin(5t).

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Answer:

Out of the 200 students Judah asked, 60 said yes when asked if they play basketball while 140 said no. To determine the percentage of students who played basketball, we can divide the number of students who said yes by the total number of students and then multiply by 100. 

So, the percentage of students who played basketball is (60/200) x 100 = 30%.

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14 yards per minute is equal to 8.4 inches per second.

Unit multipliers is a method that is used to convert a measurement from one unit to another.

It is done by multiplying the main measurement by a fraction or ratio that is equal to one.

1 yard = 36 inches.

1 minute = 60 seconds.

We can cross multiply all there variables

14 yards/minute × (36 inches/1 yard) × (1 minute/60 seconds)

(14 /1) × (36/1) × (1/60)

14 × 36 × 1/60

(14 × 36) / 60

504 / 60

= 8.4

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True. In compound time signatures, the top number represents the number of beats per measure. Compound time signatures are typically used for music that has a more complex rhythmic structure, and they are characterized by the subdivision of each beat into three equal parts (known as triplets).

The most common compound time signatures are 6/8, 9/8, and 12/8, with each representing six, nine, and twelve beats per measure respectively.
In 6/8 time, for example, there are two beats per measure, each of which is subdivided into three equal parts. This results in a feeling of two larger beats, each consisting of three smaller beats. In 9/8 time, there are three beats per measure, each of which is subdivided into three equal parts. This results in a feeling of three larger beats, each consisting of three smaller beats. Similarly, in 12/8 time, there are four beats per measure, each of which is subdivided into three equal parts, resulting in a feeling of four larger beats, each consisting of three smaller beats.
Overall, the top number in a compound time signature represents the number of larger beats per measure, while the bottom number represents the duration of each beat (usually an eighth note).

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The five-number summary, as shown in the MINITAB output, includes the minimum value, Q1 (the first quartile), the median (Q2), Q3 (the third quartile), and the maximum value.

To calculate the interquartile range (IQR), we need to find the difference between Q3 and Q1. In this case, Q1 is 6 and Q3 is 11, so the IQR is 5.
To determine if there are any outliers in the data set, we can use the rule that any data points that are more than 1.5 times the IQR below Q1 or above Q3 are considered outliers. In this case, the lower limit would be 6 - (1.5 x 5) = -1.5 and the upper limit would be 11 + (1.5 x 5) = 18.5. Looking at the data in column 1, we can see that there are no values that fall outside of these limits, so there are no outliers in this set of data.
Using statistics software to calculate the five-number summary, IQR, and identify outliers is a quick and efficient way to analyze data. This information can provide valuable insights into the distribution of the data and help identify any potential issues or trends that need to be addressed.

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Answer:

Step-by-step explanation:

To calculate the surface area of an A-frame tent with a rectangular floor, you need to find the area of each of its three faces: the front, the back, and the roof.Assuming that the A-frame tent has a symmetrical design, the front and the back will be identical triangles with a base of 6 feet and a height of 4 feet. To find the area of one of these triangles, you can use the formula for the area of a triangle: A = 1/2 * base * height. Therefore, the area of one of the triangular faces is:A_front/back = 1/2 * 6 ft * 4 ft = 12 ft²The roof of the A-frame tent is also a triangle, but with a base of 9 feet and a height that is half of the tent's height (since the tent is symmetrical). So, the height of the roof triangle is 2 feet, and its area is:A_roof = 1/2 * 9 ft * 2 ft = 9 ft²To find the total surface area of the tent, you simply need to add up the areas of the three faces:Total surface area = 2 * A_front/back + A_roof

= 2 * 12 ft² + 9 ft²

= 33 ft²Therefore, you would need at least 33 square feet of canvas to make the A-frame tent described.

The length of the curve is 20√40 units.

To find the distance traveled by the particle as t varies from 0 to 2√40, we need to integrate the speed function, which is the magnitude of the velocity vector. The velocity vector is given by:

v(t) = (x'(t), y'(t)) = (10 sin(t) cos(t), -10 sin(t) cos(t))

The magnitude of the velocity vector is given by:

|v(t)| = √((10 sin(t) cos(t))^2 + (-10 sin(t) cos(t))^2) = 10 |sin(t) cos(t)|

So the distance traveled by the particle is given by:

D = ∫(0 to 2√40) |v(t)| dt = ∫(0 to 2√40) 10 |sin(t) cos(t)| dt

Using the identity sin(2t) = 2 sin(t) cos(t), we can simplify this to:

D = ∫(0 to 2√40) 5 sin(2t) dt = [-5 cos(2t)](0 to 2√40) = 5(cos(0) - cos(4√10)) = 10

So the distance traveled by the particle is 10 units.

To compare this with the length of the curve, we can use the formula for the arc length of a curve given by:

l = ∫(a to b) √(x'(t)² + y'(t)²) dt

Substituting the given values, we get:

l = ∫(0 to 2√40) √((10 sin(t) cos(t))² + (-10 sin(t) cos(t))²) dt

Simplifying this, we get:

l = ∫(0 to 2√40) 10 dt = 20√40

We can see that the distance traveled by the particle (10 units) is half of the length of the curve (20√40 units). This is because the particle completes one full cycle in the given time interval, and the length of one cycle of the curve is twice the distance traveled by the particle during that cycle.

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According to the information, we can infer that the sum of the squared deviations from the mean is 88.

To find the standard deviation of Jamie's rebounds, we need to calculate the sum of the squared deviations from the mean. In this case, we have to calculate the mean of the data set with the following procedure:

Also, we have to calculate the deviation of each value from the mean. We subtract the mean from each value:

Using the given data set, the deviations from the mean are:

Also, we have to comsider the squared deviations:

To conclude this procedure we sum up the squared deviations to find the sum of the squared deviations from the mean:

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