What is the range of exponential function g?
-10 -8 -6 -4
A.
B.
C.
O D.
g
2
104
84
+
2-
-2-
-4-
-6-
-8-
-10-
g(x) < 10
all real numbers
g(x) < 0
g(x) > -6
02 4 6
8 10
X

The pharmacist is left with 2100 ml(milliliter) of cough syrup.

According to the question,

Pharmacists have 3.6 L(liter) of cough syrup.

1 L = 1000 ml (Given)

Therefore, 3.6 L = 3.6 x 1000

                           = 3600 ml

It’s given in the question that the pharmacist fills a 1500 ml bottle with cough syrup.

To find the quantity of cough syrup left with the pharmacist, we will subtract the quantity of bottle from the total quantity of cough syrup.

Cough syrup left with her after filling the bottle = 3600 – 1500

                                                                              = 2100 ml

Hence, she is left with 2100 ml of cough syrup after filling up a bottle of 1500 ml quantity.

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Step-by-step explanation:The steps are hard to explain. But i did it Hope it helps!

[tex]\textit{volume of a cone}\\\\ V=\cfrac{\pi r^2 h}{3}~~ \begin{cases} r=radius\\ h=height\\[-0.5em] \hrulefill\\ h=9\\ r=4 \end{cases}\implies V=\cfrac{\pi (4)^2(9)}{3}\implies V\approx 150.80~cm^3[/tex]

Answer:

 Diameter

Step-by-step explanation:

You have to draw the diameter and perpendicularly bisect it. Then, where the bisector touches the circumference, connect them (there should be 4 points of contact).

Hope this helps!

There were 312 pieces of paper on the bulletin board by the end of the school year.

To find the number of pieces of paper on the bulletin board, we need to calculate the total area covered by the book titles and then divide it by the area of each piece of paper.

Area of the bulletin board: 34 2/3 square feet.

Let's first convert the area of the bulletin board to a fraction:

Area of bulletin board = 34 2/3 = (3 * 34 + 2)/3 = 104/3 square feet.

Next, we find the area of each piece of paper:

Area of each piece of paper = (1/3) ft * (1/3) ft = 1/9 square feet.

Now, we can find the number of pieces of paper on the bulletin board by dividing the total area covered by the area of each piece of paper:

Number of pieces of paper = Area of bulletin board / Area of each piece of paper

Number of pieces of paper = (104/3) / (1/9)

Number of pieces of paper = (104/3) * (9/1)

Number of pieces of paper = 936/3

Number of pieces of paper = 312

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The solution is: the required length is:

AE = 9 units

Explanation:

We know that the line joining two midpoints in a triangle is parallel to the third side and equals half its length

In the diagram, we are given that:

segment BD // segment AE and that segment BD is a mid-segment of the ΔACE

According the above theorem, we can conclude that:

BD = 0.5 × AE ......................> I

1- getting the length of BD:

Length of segment BD can be calculated using the distance formula:

Formula: distance= √(x_2-x_1)²+(y_2-y_1)²

We are given that:

B is at (3.5,1.5) which means that x₁ = 3.5 and y₁=1.5

D is at (-1,1.5) which means that x₂=-1 and y₂=1.5

Substitute in the formula:

BD = 4.5 units

2- getting the length of AE:

using equation I:

BD = 0.5 × AE

4.5 = 0.5 × AE

AE = 2 × 4.5

AE = 9 units

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complete question:

Find the length of AE if BD AE and BD is a midsegment of ACE

The required length is: AE = 9 units

We know that the line joining two midpoints in a triangle is parallel to the third side and equals half its length

In the diagram, we are given that:

segment BD // segment AE and that segment BD is a mid-segment of the ΔACE

According the above theorem, we can conclude that:

BD = 0.5 × AE ......................> I

1- getting the length of BD:

Length of segment BD can be calculated using the distance formula:

Formula: distance= √(x_2-x_1)²+(y_2-y_1)²

We are given that:

B is at (3.5,1.5) which means that x₁ = 3.5 and y₁=1.5

D is at (-1,1.5) which means that x₂=-1 and y₂=1.5

Substitute in the formula:

BD = 4.5 units

2- getting the length of AE:

using equation I:

BD = 0.5 × AE

4.5 = 0.5 × AE

AE = 2 × 4.5

AE = 9 units

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The question is incomplete complete question is given below

Find the length of AE if BD AE and BD is a midsegment of ACE

Approximately 91.92% of test-takers scored higher than 69 on this standardized test.

To find the percentage of scores that are greater than 69, we need to standardize the score by calculating its z-score:

z = (69 - 90) / 15 = -1.4

The z-score represents the number of standard deviations away from the mean a score is. Since the normal distribution is symmetric, we can find the percentage of scores greater than 69 by finding the area under the curve to the right of the z-score.

Using a standard normal distribution table or calculator, we find that the area to the right of a z-score of -1.4 is 0.9192.

Therefore, the percentage of scores greater than 69 is:

0.9192 x 100% = 91.92%

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A total of 37 people received a gift card over the weekend.

We may divide the total number of mall visitors on Saturday by the frequency to determine how many people received gift cards:

1,310 ÷ 80 = 16.375

We must round down to the nearest whole number because we are unable to have a fractional number of gift cards. So on Saturday, 16 people were given gift cards.

We can use the same procedures to determine the number of persons who received gift cards on Sunday:

1,714 ÷ 80 = 21.425

So, 21 people received a gift card on Sunday.

We can add the number of gift card recipients on Saturday and Sunday to determine the total number of persons who received a gift card during the weekend:

16 + 21 = 37

Therefore, a total of 37 people received a gift card over the weekend.

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The volume of a cube is given by the formula V = e³, where e represents the length of the side of the cube. In this case, the length of the side is 9cm. Therefore, the volume of the cube is V = 9³ = 729 cubic centimeters.

To find the volume of the cube, we need to raise the length of one side to the power of 3 since the volume of a cube is given by V = e³. In this case, the side of the cube measures 9cm, so we have e = 9.

Substituting this value into the formula, we get V = 9³ = 729 cubic centimeters. Therefore, the volume of the cube is 729 cubic centimeters. This means that the cube could hold 729 cubic

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The success of a student's transformation can be determined by analyzing their performance data, but there may be external factors that could affect the outcome, and further analysis may be necessary.

If the student's data show a clear improvement in their performance, skills, or knowledge after undergoing a specific transformation, then we can say that the transformation was successful. On the other hand, if there is no discernible improvement or even a decline in the student's performance, we can infer that the transformation was unsuccessful.

However, in some cases, the data might not be entirely conclusive, and there could be other factors affecting the outcome. For example, a student may have made some progress, but not enough to meet the expected outcomes fully. In such cases, we might need to analyze the data more thoroughly to determine the extent of the transformation's success.

There could be several reasons why a student's data might not match the expected outcome of a successful transformation. For instance, the student might not have fully embraced the transformation or might have faced challenges or obstacles that hindered their progress. Additionally, external factors such as socioeconomic background, family support, and access to resources could also impact the results.

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The constant ratio of successive y-values. is 1.5

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

The table of values of an exponential function

From the table, we have

x    y

0   11.25

1     16.875

Divide the y values

so, we have the following representation

Ratio = 16.875/11.25

Evaluate

Ratio = 1.5

Hence, the constant ratio of successive y-values. is 1.5

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Answer:

Step-by-step explanation:

To find the constant ratio of successive y-values of an exponential function, you need to divide one term by the previous term. That ratio should match for all y values1.

In this case, we can find the constant ratio by dividing each y-value by the previous one. For example, 7.5/5 = 1.5 and 11.25/7.5 = 1.5 and so on. Therefore, the constant ratio of successive y-values is 1.5

f(x) = 1/2 + x in the form 1 / (1 - r) and use the given equation. Here's a step-by-step explanation:

Step 1: Write down the given function:
f(x) = 1/2 + x

Step 2: Rewrite f(x) as a fraction:
f(x) = (1 + 2x) / 2

Step 3: Express f(x) in the form 1 / (1 - r):
To do this, we need to find a value of 'r' such that (1 + 2x) / 2 can be written as 1 / (1 - r).

Since we want to express the function in the form of 1 / (1 - r), we can set the numerators equal:

1 = 1 + 2x

Now, solve for 'x':

-2x = 0
x = 0

So, the value of 'r' that satisfies this condition is:

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

Now, f(x) can be expressed as:

f(x) = 1 / (1 - r) = 1 / (1 - 0) = 1 / 1

Finally, we can use this expression in any given equation, by replacing f(x) with 1 / (1 - 0).

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When multiple tests are done in analysis of variance (ANOVA), the family error rate is the probability of making at least one type I error (rejecting a true null hypothesis) in the family of tests.

To control the family error rate, several methods are available such as the Bonferroni correction, the Holm-Bonferroni method, the Benjamini-Hochberg procedure, among others. These methods adjust the significance level or p-value threshold for each individual test to ensure that the family-wise error rate is below a certain level, such as 0.05.

By controlling the family error rate, we reduce the chances of mistakenly concluding that there is a significant effect in any of the tests, which is important in avoiding false positives and ensuring the validity of the overall analysis.

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Answer:

trig identity proof

Using the trigonometric identity for the sine of the difference of two angles, we have:

sin(a - b) = sin(a)cos(b) - cos(a)sin(b)

Substituting a = π/4 and b = α, we get:

sin(π/4 - α) = sin(π/4)cos(α) - cos(π/4)sin(α)

sin(π/4 - α) = (1/√2)(cos(α) - sin(α))

Squaring both sides, we get:

sin^2(π/4 - α) = 1/2(cos^2(α) - 2cos(α)sin(α) + sin^2(α))

sin^2(π/4 - α) = 1/2(1 - sin(2α))

This proves the first equation.

For the second equation, we use the double angle formula for the sine:

sin(2x) = 2sin(x)cos(x)

Substituting x = 2π - α, we get:

sin(4π - 2α) = 2sin(2π - α)cos(2π - α)

sin(4π - 2α) = 2(-sin(α))(-cos(α))

sin(4π - 2α) = 2sin(α)cos(α)

Dividing both sides by 2sin^2(α), we get:

sin(4π - 2α)/(2sin^2(α)) = cos(α)/sin(α)

csc(4π - 2α) = cot(α)

Using the identity csc(x) = 1/sin(x) and simplifying, we get:

sin(4π - 2α) = (1 - sin^2(α))/sin(α)

sin(4π - 2α) = cos^2(α)/sin(α)

sin(4π - 2α) = (1 - sin^2(α))(1/sin(α))

sin(4π - 2α) = 1/sin(α) - sin(α)

Substituting the value of sin^2(π/4 - α) we found earlier, we get:

sin(4π - 2α) = 1/sin(α) - (1/2)(1 - sin(2α))

sin(4π - 2α) = (1/2)(1 + sin(2α))/sin(α)

This proves the second equation.

To find the estimated population growth between 2021 and 2039, we first need to determine how many years have passed since 2000. The population is estimated to grow by 21,000 people between 2021 and 2039.

Since we are looking at the time period between 2021 and 2039, we know that 21 years have passed since 2000. Therefore, we can use the formula for population growth:
P(t) = P(0) + r(t)
Where P(t) is the population at time t, P(0) is the initial population, and r(t) is the rate of growth per year. We can plug in the values we know:
P(t) = 45,000 + 1200t (since the rate of growth is 1200 people per year)
To find the population in 2021, we need to plug in t=21:
P(21) = 45,000 + 1200(21) = 72,600
To find the population in 2039, we need to plug in t=39:
P(39) = 45,000 + 1200(39) = 93,600
Therefore, the estimated population growth between 2021 and 2039 is:
93,600 - 72,600 = 21,000

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The expression (1.4 × 10¹)(8 × 10⁴) in scientific notation is 1.12 × 10⁵ and for expression (1.1 × 10⁻⁵)(3 × 10²) the  scientific notation is 3.3 × 10⁻³

The given expressions are (1.4 × 10¹)(8 × 10⁴) can be calculated as:

Firstly we will multiply the decimal numbers and whole numbers

1.4 × 8

One point four times eight is equal to eleven point two

= 11.2

Now we multiply the base with ten

10¹ × 10⁴

We know that when the bases are same then the powers will be added in multiplication

= 10⁵

Combining these results, we have 11.2 × 10⁵

Therefore, the result in scientific notation is 1.12 × 10⁵

Similarly, for (1.1 × 10⁻⁵)(3 × 10²)

We will multiply the decimal numbers and whole numbers

1.1 × 3 = 3.3

Now the base with ten will be multiplied

10⁻⁵ × 10²

The bases are same the powers will be added

= 10⁻³

Combining these results, we have 3.3 × 10⁻³

Therefore, the result in scientific notation is 3.3 × 10⁻³

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In the context of a linear system with 3 equations that is inconsistent, the rank of the coefficient matrix refers to the number of linearly independent rows or columns present in the matrix.

For an inconsistent system, there is no solution that satisfies all the equations simultaneously. In the case of a 3-equation system, if the rank of the coefficient matrix is less than 3, it implies that at least one of the equations is linearly dependent on the others, leading to an inconsistent system.

A possible value for the rank of the coefficient matrix of an inconsistent linear system with 3 equations is 2. This is because, when the rank is 2, it indicates that two of the equations are linearly independent, while the third is dependent on the other two, creating an inconsistency.

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The term that signifies the trend in the linear trend equation, ft k = at bt*k, is the coefficient bt*k. This coefficient represents the slope of the trend line, which indicates the direction and strength of the trend. A positive value of bt*k implies an increasing trend, while a negative value implies a decreasing trend. The magnitude of the coefficient indicates the rate of change in the trend over time. For example, a larger absolute value of bt*k indicates a faster rate of change than a smaller absolute value. Therefore, the bt*k term is crucial in determining the trend in the linear trend equation.

The linear trend equation is a mathematical representation of a trend in data over time. It can be used to identify and quantify the direction and magnitude of a trend. The equation has two components: a constant term (a) and a trend term (bt*k). The constant term represents the intercept of the trend line, while the trend term represents the slope of the trend line. The bt*k term is the coefficient of the trend term and is the primary determinant of the trend.

The bt*k term in the linear trend equation is the coefficient that signifies the trend. It represents the slope of the trend line and indicates the direction and strength of the trend. A positive value implies an increasing trend, while a negative value implies a decreasing trend. The magnitude of the coefficient indicates the rate of change in the trend over time. Therefore, understanding the bt*k term is essential in analyzing trends in data.

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The answer is f(-34)=-2310. The value of a function at a given point is known as its output or evaluation. The input is referred to as the point at which the function is evaluated.

The problem requires the evaluation of f(-34), given f(x)=-2x²+8x-17. To obtain this result, all instances of x should be replaced with -34.

The following steps can be used to achieve the solution. Step 1: Substitute -34 for x in the equation f(x)=-2x²+8x-17.f(-34)=-2(-34)²+8(-34)-17Step 2: Use the order of operations to solve the equation. f(-34)=-2(1156)-272-17f(-34)=-2310The final answer is f(-34)=-2310.

Therefore, substituting -34 for x in the equation f(x)=-2x²+8x-17 gives a result of -2310.What does it mean? This implies that if x is equal to -34, then the value of the function will be equal to -2310.

The value of a function at a given point is known as its output or evaluation. The input is referred to as the point at which the function is evaluated. Therefore, by following the above steps, the answer is f(-34)=-2310.

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If u is an orthogonal matrix and v is constructed by interchanging some of the columns of u, then v is also an orthogonal matrix. This is because the columns of an orthogonal matrix are orthonormal.

An orthogonal matrix is a square matrix whose columns are orthonormal. This means that each column has a length of 1 and is orthogonal to all the other columns. Formally, this can be written as:

u^T u = u u^T = I

where u^T is the transpose of u and I is the identity matrix.

Now suppose we construct a new matrix v by interchanging some of the columns of u. Let's say we interchange columns j and k, where j and k are distinct column indices of u. Then the matrix v is given by:

v = [u_1, u_2, ..., u_{j-1}, u_k, u_{j+1}, ..., u_{k-1}, u_j, u_{k+1}, ..., u_n]

where u_i is the ith column of u.

To show that v is orthogonal, we need to show that its columns are orthonormal. Let's consider the jth and kth columns of v. By construction, these columns are u_k and u_j, respectively, and we know from the properties of u that:

u_j^T u_k = 0 and u_j^T u_j = u_k^T u_k = 1

Therefore, the jth and kth columns of v are orthogonal and have a length of 1, which means they are orthonormal. Moreover, all the other columns of v are also orthonormal because they are simply copies of the corresponding columns of u, which are already orthonormal.

Finally, we can show that v is indeed an orthogonal matrix by verifying that v^T v = v v^T = I, using the definition of v and the properties of u. This completes the proof that v is an orthogonal matrix.

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If the coefficient of variation of w is 0.8739, then the value of k is 1.1.

Given that, P, Q and R are three independent and identically distributed Poisson random variables with mean k.

Here,

[tex]E(P)=E(Q)=E(R)=k[/tex]

[tex]V(P)=V(Q)=V(R)=k[/tex]

Let [tex]W=20p-5Q+10R[/tex]

[tex]= 20E(P)-5E(Q)+10E(R)[/tex]

[tex]= 20k-5k+10k[/tex]

[tex]= 25k[/tex]

[tex]V(W)=V(20p-5Q+10R)[/tex]

[tex]=400V(P)+25V(Q)+100V(R)[/tex]

[tex]= 400k+25k+100k[/tex]

[tex]= 525k[/tex]

We know that, coefficient of variance is

[tex]C.V=\frac{\sigma}{\mu}[/tex]

[tex]\frac{\sqrt{525k}}{25k}=0.8739[/tex]

[tex]\sqrt{525k}=21.8475 k[/tex]

[tex]525k = 477.313256 k^2[/tex]

[tex]k=\frac{525}{477.313256}[/tex]

[tex]k = 1.0999066[/tex]

[tex]k\approx1.1[/tex]

Therefore, the value of k is 1.1.

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To solve the equation x^2-14x-11=-30, we can first move all the terms to one side of the equation: x^2 - 14x - 11 + 30 = 0Simplifying the left side:

x^2 - 14x + 19 = 0

To solve for x, we can use the quadratic formula:  

x = (-b ± sqrt(b^2 - 4ac)) / 2a

In this case, a = 1, b = -14, and c = 19. Plugging these o solve the equation x^2-14x-11=-30, we can first move all the terms to one side of the equation:

x^2 - 14x - 11 + 30 = 0

Simplifying the left side:

x^2 - 14x + 19 = 0

To solve for x, we can use the quadratic formula:

x = (-b ± sqrt(b^2 - 4ac)) / 2a

In this case, a = 1, b = -14, and c = 19. Plugging these values into the formula, we get:

x = (14 ± sqrt(14^2 - 4(1)(19))) / 2(1)

Simplifying the square root:

x = (14 ± sqrt(108)) / 2

x = (14 ± 10.39) / 2

x ≈ 12.2 or x ≈ 1.8

Therefore, the solutions to the equation x^2-14x-11=-30 to the nearest tenth are x ≈ 12.2 and x ≈ 1.8.

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If a storage facility charges $1 per cubic yard and the storage space is 32 ft. The storage charge is $1999.97.

What is mathematical conversions?

Mathematical conversions refer to the process of changing one unit of measurement to another unit of measurement that is equivalent in value.

First, we need to convert the dimensions from feet to yards, since the rate is given per cubic yard.

32 feet = 10.6667 yards (dividing by 3)

160 feet = 53.3333 yards (dividing by 3)

10 feet = 3.3333 yards (dividing by 3)

Next, we can calculate the volume of the storage space in cubic yards by multiplying the three dimensions:

Volume = 10.6667 yards x 53.3333 yards x 3.3333 yards

Volume = 1999.97 cubic yards (rounded to two decimal places)

Finally, we can calculate the storage charge by multiplying the volume by the rate:

Charge = 1999.97 cubic yards x $1/cubic yard

Charge = $1999.97

Therefore, the storage charge is $1999.97.

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The area of the sector is 16π square inches.

To find the area of a sector of a circle, we need to use the formula:

Area of sector = (central angle/360) x [tex]\pi r^2[/tex]

where r is the radius of the circle.

In this case, the radius is given as 8 inches.

We are also given that the central angle measures from 60 to 150 degrees. To calculate the area of the sector, we need to find the size of the central angle first.

To do this, we subtract the smaller angle from the larger angle:

150 - 60 = 90 degrees

So, the central angle is 90 degrees.

Now, we can substitute the values into the formula:

Area of sector = (90/360) x [tex]\pi 8^2[/tex]

Area of sector = (1/4) x π(64)

Area of sector = 16π square inches

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The slope of the tangent line to the polar curve r=sin(5) at theta = pi/10 is -25cos(pi/10).

To find the slope of the tangent line, we need to differentiate the polar curve with respect to theta and then evaluate it at the given value of theta. So, we have r=sin(5) and we can write it in terms of x and y using the conversion formulae x=rcos(theta) and y=rsin(theta). Substituting r=sin(5), we get x=sin(5)*cos(theta) and y=sin(5)*sin(theta). Differentiating both x and y with respect to theta, we get dx/dtheta=-sin(5)*sin(theta) and dy/dtheta=sin(5)*cos(theta).

The slope of the tangent line is given by dy/dx, which is equal to dy/dtheta divided by dx/dtheta. Evaluating this expression at theta = pi/10, we get -25cos(pi/10).

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The volume of the second box is 270 in³.

Given that the volume of a box varies jointly with its width and height.

The original box has a volume of 240 cubic inches and has a width of 8 inches and a height of 2 inches.

We can say that the length here works as proportionality constant,

So,

240 = l × 2 × 8

l = 240 / 16

l = 15

Now, when the width of 6 inches and a height of 3 inches, the volume =

15 × 3 × 6 = 270 in³

Hence the volume of the second box is 270 in³.

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The integral of e^x dx on x=y^3 from (-1,-1) to (1,1) is approximately 2.17.

To solve this problem, we need to use substitution. Let y^3 = x, so that dx = 3y^2 dy. Substituting these expressions into the integral, we get:

∫e^x dx = ∫e^(y^3) * 3y^2 dy

We can now integrate this expression using the u-substitution method. Let u = y^3, so that du/dy = 3y^2. Substituting these expressions, we get:

∫e^(y^3) * 3y^2 dy = ∫e^u du

Integrating e^u with respect to u, we get e^u + C, where C is a constant of integration. Substituting back for u and simplifying, we get:

e^(y^3) + C

To find the value of the constant, we can use the limits of integration. Substituting (1,1) and (-1,-1) for (x,y), we get:

e^(1^3) - e^(-1^3) = e - 1/e

So the answer is approximately 2.17.

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