find the particular solution of the differential equation dydx ycos(x)=5cos(x) satisfying the initial condition y(0)=7. answer: y= your answer should be a function of x.

The assumption of the differences between the paired observations is necessary about the population distribution in order to perform a dependent means hypothesis test.

A dependent means hypothesis test, also known as paired or matched samples, must be conducted on the presumption that the population's differences between the paired observations are normally distributed. Because the test is dependent on the distribution of the sample mean differences, which is presumed to be normally distributed, this assumption is required.

The standard error of the mean difference and the construction of confidence intervals both need the assumption of normality. Other techniques, including non-parametric testing, may be more suited if the population distribution is not normal.

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The equation of the ellipse for foci (0,2)(0,6)  and vertices (0,0)(0,8)

is [tex]x^2[/tex]/16 +[tex](y - 4)^2[/tex]/12 = 1.

To find the equation of the ellipse with foci (0,2) and (0,6) and vertices (0,0) and (0,8), we first need to find the center of the ellipse, which is the midpoint between the foci. The center is (0,4).

Next, we need to find the distance between the center and one of the vertices, which is 4. This is the value of a, the semi-major axis.

The distance between the two foci is 2c, so c = 2. We can then use the relationship [tex]a^2 = b^2 + c^2[/tex] to find b, the semi-minor axis. Plugging in the values we have, we get:

[tex]4^2 = b^2 + 2^2[/tex]

[tex]16 = b^2 + 4\\b^2 = 12[/tex]

The equation of the ellipse is then:

[tex](x - 0)^2/4^2 + (y - 4)^2/12=1[/tex]

Simplifying, we get:

[tex]x^2/16 + (y - 4)^2/12 = 1[/tex]

So the equation of the ellipse is [tex]x^2/16 + (y - 4)^2/12 = 1.[/tex]

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The cube that is a unit cube is the one that is 15 centimeters long, 15 centimeters wide, and 15 centimeters high because all its edges are of the same length and measure 1 unit.

A unit cube is a cube with edges that are all of equal length and measure 1 unit. Therefore, out of the given options, the cube that is a unit cube is the one that is 15 centimeters long, 15 centimeters wide, and 15 centimeters high. This is because all its edges are of the same length and measure 1 unit, which is 15 centimeters. The other cubes given in the options are not unit cubes because their edges are not of the same length or do not measure 1 unit. For example, the cube that is 7 feet long, 7 feet tall, and 7 feet high has edges that are 7 feet long, which is not the same length as its height and width. Similarly, the cube that is 5 inches long, 5 inches wide, and 5 inches high has edges that measure 5 inches, which is not 1 unit.

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Rewrite the statements in if-then form: If I catch the 8:05 bus, then I will be on time for work.

To write this statement in if-then form, we start with the "if" part of the statement, which is the condition that needs to be satisfied for the conclusion to follow. In this case, the condition is "catching the 8:05 bus". The "then" part of the statement is the conclusion that follows if the condition is satisfied, which is "being on time for work".

Therefore, the statement "Catching the 8:05 bus is a sufficient condition for my being on time for work" can be written as "If I catch the 8:05 bus, then I will be on time for work" in if-then form. This form of expressing the statement makes it clear what the condition and conclusion are and how they are related to each other.

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Answer:

In a 30°-60°-90° right triangle, the length of the hypotenuse is twice the length of the shorter leg, and the length of the longer leg is √3 times the length of the shorter leg.

The length of the television is 15√3 inches, and the width of the television is 15 inches.

A. When an instrument is weak, then the TSLS estimator is biased (even in large samples), and TSLS t-statistics and confidence intervals are unreliable.

B. When an instrument is irrelevant, the TSLS estimator is consistent but the large-sample distribution of TSLS estimator is not that of a normal random variable, but rather the distribution of the product of two normal random variables.
C. When an instrument is irrelevant, the consistency of the TSLS estimator breaks down. The large-sample distribution of the TSLS estimator is not that of a normal random variable, but rather the distribution of a ratio of two normal random variables.

A. It is not possible to statistically test the exogeneity of the instruments when the coefficients are overidentified; i.e., when m>k.
B. It is possible to statistically test the exogeneity of instruments when the coefficients are exactly identified; i.e., when m=k.
C. It is possible to statistically test the exogeneity of the instruments when the coefficients are overidentified; i.e., when m>k.
D. It is not possible to statistically test the exogeneity of instruments when the coefficients are exactly identified; i.e., when m=k.

In large samples, if the instruments are not weak and the errors are homoskedastic, then, under the null hypothesis that the instruments are exogenous, the J-statistic follows a distribution with degrees of overidentification, which are also the degrees of freedom.
The consequences of estimating the two stage least square (TSLS) coefficients using either a weak or an irrelevant instrument include:

A. When an instrument is weak, the TSLS estimator is biased (even in large samples), and TSLS t-statistics and confidence intervals are unreliable.
C. When an instrument is irrelevant, the consistency of the TSLS estimator breaks down. The large-sample distribution of the TSLS estimator is not that of a normal random variable, but rather the distribution of a ratio of two normal random variables.

Regarding the possibility of statistically testing the exogeneity of instruments:

B. It is possible to statistically test the exogeneity of instruments when the coefficients are exactly identified; i.e., when m=k.
C. It is possible to statistically test the exogeneity of the instruments when the coefficients are overidentified; i.e., when m>k.

In large samples, if the instruments are not weak and the errors are homoskedastic, then, under the null hypothesis that the instruments are exogenous, the J-statistic follows a distribution with degrees of overidentification, which are also the degrees of freedom.

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The probability of Zack getting exactly 4 chocolate pastries is approximately 0.275, or 27.5%. To find the probability that Zack buys four chocolate pastries out of the eight he selects, we'll use the hypergeometric distribution. In this case, there are 20 pastries in total, with 12 being chocolate and 8 being non-chocolate.

Zack is buying 8 pastries, and we want to know the probability that exactly 4 of them are chocolate.

The hypergeometric probability formula is: P(X = k) = (C(K, k) * C(N - K, n - k)) / C(N, n)

Here, N = 20 (total pastries), K = 12 (chocolate pastries), n = 8 (pastries Zack buys), and k = 4 (desired number of chocolate pastries).

Plugging these values into the formula, we get:

P(X = 4) = (C(12, 4) * C(20 - 12, 8 - 4)) / C(20, 8)

P(X = 4) = (C(12, 4) * C(8, 4)) / C(20, 8)

Calculating the combinations, we find:

P(X = 4) = (495 * 70) / 125,970

P(X = 4) = 34,650 / 125,970

P(X = 4) ≈ 0.275

The probability of Zack getting exactly 4 chocolate pastries is approximately 0.275, or 27.5%.

However, this answer is not among the provided options (0.09, 0.50, 0.60). Double-check the question and options to ensure the values are correct.

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a) The equivalent double integral with the order of integration reversed is ∫∫D f(x, y) dy dx.

b)  To reverse the order of integration, we need to sketch the region of integration D and rewrite the original double integral with the opposite order of integration.

Since the provided information is incomplete, it is not possible to determine the specific region of integration or the function f(x, y) involved.

However, in general, reversing the order of integration involves swapping the order of integration limits and rewriting the integrand accordingly. This allows for the evaluation of the integral in a different order, which can be useful in certain cases for simplifying calculations or applying different integration techniques.

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The equation of the tangent plane is 2x-3y+z = -4

The surface area is π/3 ([tex]6^{3/2}[/tex] -8)

What is tangent plane?

Tangent plane is the plane through a point of a surface which contains the tangent lines to all the curves on the surface through the equivalent point.

The surface is defined by the function,

r(s, t)=〈s t, s+ t, s−t〉

The partial derivatives

[tex]r_{s[/tex]= <t, 1, 1>

[tex]r_{t}[/tex]= <s,1, -1>

Now the cross product that is

[tex]r_{s[/tex]×[tex]r_{t[/tex] = <-2, t+ s, t- s>

From the given value we get s= 2 and t=1

so r(2, 1)= < 2, 3, 1>

Now the normal vector to the tangent plane is given by the cross product and the value becomes <-2, 3, -1>

Now the equation of the tangent plane becomes

-2(x-2)+3(y-3)-1(z-1)=0

solving this we get,

2x-3y+z = -4

Now for the 2nd part let us find the surface area over the unit disk.

S=[tex]\int\limits\int\limits_D| {r_{s}r_{t} | } \, dA[/tex]

|[tex]r_{s[/tex]×[tex]r_{t[/tex]|= [tex]\sqrt{4+(t+s)^{2}+(t-s)^{2} }[/tex]

        = [tex]\sqrt{4+2(s^{2}+t^{2} ) }[/tex] ----(1)

Here we will take the help of polar coordinate to solve the double integration.

Let,

s= r cosα and t= r sinα

0≤α≤2π and 0≤r≤1  

so expression (1) becomes √(4+2r²)

[tex]\int\limits\int\limits\sqrt{4+2(s^{2}+t^{2} )} } \, dA[/tex]

=[tex]\int\limits \, \int\limits {\sqrt{4+2r^{2} } } \, rdrd\alpha[/tex]

At first solving from r for the limit 0 to 1 we get,

[tex]\frac{1}{6} [6^{3/2} - 4^{3/2} ][/tex] Then again integrating for α and putting the limit for α we get the value,

π/3([tex]6^{3/2}[/tex] -8)

Hence , the surface area is π/3([tex]6^{3/2}[/tex]-8)

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a.) The value of angle B= 52.3°

The value of angle C = 87.7°

The value of side c = 20.2

To calculate the missing angle of the given triangle, the sine rule must be obeyed. That is;

a /sinA = b/sinB

Where;

a = 13

A = 40

b = 16

B = ?

That is;

13/Sin40° = 16/sinB

make sinB subject of formula;

sin B = sin40°×16/13

= 0.642787609×16

= 10.28/13

= 0.7908

B. = Sin-1(0.7908)

= 52.3°

Therefore angle C;

180 = C+40+52.3

C = 180-40+52.3

= 180-92.3

= 87.7°

For length c;

a /sinA = c/sinC

13/Sin40° = c/sin87.7°

c = 13×0.999194395/0.642787609

= 20.2

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The solution to the system of equations 2x + y = 10 and x - y = 4 is x = 14/3 and y = 2/3.

Given the system of equation in the question;

2x + y = 10

x - y = 4

We can use substitution to solve this system of equations.

From the second equation, we can write:

x = y + 4

Now we can substitute this value of x into the first equation:

2(y + 4) + y = 10

Simplifying and solving for y, we get:

3y + 8 = 10

3y = 2

y = 2/3

Now that we know the value of y, we can substitute it back into the equation x = y + 4 that we obtained earlier:

x - y = 4

Plug in y = 2/3

x - 2/3 = 4

x = 2/3 + 4

x = 14/3

Therefore, the solution is (2/3, 14/3).

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We found that (a) the partial derivative of f(x, y) with respect to x evaluated at x=5 is 90y^3, and (b) the partial derivative of f(x, y) with respect to y evaluated at y=1 is 27x^2.

We have the function f(x, y) = 9x^2y^3, and we need to find (a) the partial derivative with respect to x and then evaluate it at 5, and (b) the partial derivative with respect to y and then evaluate it at 1.

(a) To find the partial derivative of f(x, y) with respect to x, we treat y as a constant and differentiate f(x, y) with respect to x:

∂f(x, y)/∂x = d(9x^2y^3)/dx = 18xy^3

Now, we need to evaluate this derivative at x=5:

∂f(5, y)/∂x = 18(5)y^3 = 90y^3

(b) To find the partial derivative of f(x, y) with respect to y, we treat x as a constant and differentiate f(x, y) with respect to y:

∂f(x, y)/∂y = d(9x^2y^3)/dy = 27x^2y^2

Now, we need to evaluate this derivative at y=1:

∂f(x, 1)/∂y = 27x^2(1)^2 = 27x^2

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The multiple standard error of estimate is a measure of the variability of the residuals in a regression model. It is used to estimate the amount of error that is likely to occur when predicting a response variable based on the predictor variables.

The multiple standard error of estimate is calculated as the square root of the mean squared error in the ANOVA table divided by the degrees of freedom for error. This measure is useful in assessing the accuracy of the regression model and in comparing the fit of different models. A smaller multiple standard error of estimate indicates a better fit between the model and the data, meaning that the model is better at explaining the variability in the response variable based on the predictor variables.

The multiple standard error of estimate measures the variability of the residuals. In other words, it gauges the dispersion of observed values around the predicted values in a multiple regression model. A smaller value indicates that the model has a better fit, while a larger value signifies that the model's predictions deviate more from the actual observed values. The multiple standard error of estimate helps assess the accuracy of the model's predictions and can be used to improve the model when necessary.

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1. The probability is very low that the waitress will get no tip from 7 customers on this Friday. 2. The probability of the team having at most 1 injury in this game is 27.6%. 3. the probability of the company receiving at least seven death claims on a randomly selected day is: P(x ≥ 7) = 1 - P(x < 7) P(x ≥ 7) = 1 - 0.501 P(x ≥ 7) = 0.499 or 49.9%

1. Assuming the probability of not getting a tip from a customer is 1/5 or 0.2, the probability of not getting a tip from 7 customers is:

(0.2)^7 = 0.00001 or 0.001%

So the probability is very low that the waitress will get no tip from 7 customers on this Friday.

2. The probability of having at most 1 injury in this game can be found using the Poisson distribution formula:

P(x ≤ 1) = e^(-λ) * (λ^0/0! + λ^1/1!)

where λ = 3.2

P(x ≤ 1) = e^(-3.2) * (3.2^0/0! + 3.2^1/1!)
P(x ≤ 1) = 0.276 or 27.6%

So the probability of the team having at most 1 injury in this game is 27.6%.

3. The probability of the company receiving at least seven death claims on a randomly selected day can be found using the Poisson distribution formula:

P(x ≥ 7) = 1 - P(x < 7)
P(x < 7) = ∑(k=0 to 6) (e^(-λ) * λ^k / k!)

where λ = 6

P(x < 7) = ∑(k=0 to 6) (e^(-6) * 6^k / k!)
P(x < 7) = 0.501 or 50.1%

So the probability of the company receiving at least seven death claims on a randomly selected day is:

P(x ≥ 7) = 1 - P(x < 7)
P(x ≥ 7) = 1 - 0.501
P(x ≥ 7) = 0.499 or 49.9%
1. To find the probability that the waitress will get no tip from 7 customers this Friday, we will use the Poisson distribution. Let λ represent the average number of customers who give no tip. In this case, λ = 5. We are interested in finding P(x = 7).

2. For the football game, we will also use the Poisson distribution. The average number of injuries is λ = 3.2, and we want to find the probability of having at most 1 injury, which means P(x ≤ 1).

3. For the life insurance company, the Poisson distribution will be used again. The average number of death claims per day is λ = 6. We need to find the probability that the company receives at least seven death claims on a randomly selected day, which means P(x ≥ 7).

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The value to use for the standard error of the mean is 1.5 (option C).

To answer your question about the standard error of the mean for a random sample of 81 automobiles traveling on a section of an interstate with an average speed of 60 mph and a standard deviation of 13.5 mph, we can use the following formula:

Standard Error of the Mean (SEM) = (Standard Deviation) / √(Sample Size)

In this case, the standard deviation is 13.5 mph and the sample size is 81. Plugging these values into the formula:

SEM = 13.5 / √(81)
SEM = 13.5 / 9
SEM = 1.5

The value to use for the standard error of the mean is 1.5 (option C).

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a. The mass of the wire is 2π√37.

b. The center of mass of the wire is located at the point (0,0,3).

c. The moment of inertia about the z-axis is 2π√37

A. To determine the mass of the wire, we need to integrate the density function p(x, y, z) along the curve x(t), y(t), z(t) from t=0 to t=2π:

m = ∫₀²π p(x(t), y(t), z(t)) ||r'(t)|| dt

where r(t) = x(t)i + y(t)j + z(t)k is the position vector of the wire at time t and ||r'(t)|| is the magnitude of the velocity vector, given by:

||r'(t)|| = ||(-sin t)i + cos(t)j + 6k|| = √(sin²t + cos²t + 6²) = √37

Substituting p(x, y, z) = 1, we get:

m = ∫₀²π ||r'(t)|| dt = √37 ∫₀²π dt = √37 (2π) = 2π√37

So, the mass of the wire is 2π√37.

B. To find the center of mass, we need to compute the triple integral:

(xc,yc,zc) = (1/m) ∭E (x,y,z) p(x,y,z) dV

where E is the region of the wire, p(x,y,z) = 1 is the constant density function, and (xc,yc,zc) are the coordinates of the center of mass.

Using cylindrical coordinates, we can parameterize the helix as:

x(r,t) = r cos t

y(r,t) = r sin t

z(r,t) = 6t/(2π)

where r varies from 0 to 1 and t varies from 0 to 2π. The volume element in cylindrical coordinates is dV = r dz dr dt, so the triple integral becomes:

(xc,yc,zc) = (1/m) ∫₀¹ ∫₀²π ∫₀⁶t/(2π) (r cos t, r sin t, z) r dz dr dt

Substituting m = 2π√37, we get:

(xc,yc,zc) = (1/(2π√37)) ∫₀¹ ∫₀²π ∫₀⁶t/(2π) (r cos t, r sin t, z) r dz dr dt

Evaluating the integrals, we get:

(xc,yc,zc) = (0, 0, 3)

So, the center of mass of the wire is located at the point (0,0,3).

C. The moment of inertia about the z-axis is given by the integral:

I = ∫c (x² + y²) p(x,y,z) ds

where c is the curve traced out by the wire.

Using the parameterization x(t) = cos t, y(t) = sin t, z(t) = 6t/(2π), we can write ds = ||r'(t)|| dt, where r(t) = x(t)i + y(t)j + z(t)k is the position vector of the wire at time t.

Substituting p(x, y, z) = 1, we get:

I = ∫₀²π [(cos²t + sin²t) ||r'(t)||] dt

From part A, we know that ||r'(t)|| = √37, so we have:

I = √37 ∫₀²π dt = √37 (2π) = 2π√37

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A. The mass of the wire is 2π√37 A.

B. The coordinates of the center of mass are (0, 0, 18π/√37).

C. The moment of inertia about the z-axis is 37(2π) A.

A. To determine the mass of the wire, we need to integrate the density function over the length of the wire:

[tex]M = ∫p(x,y,z)ds[/tex]

where s is the arc length of the curve x(t), y(t), z(t). Since the density function is constant, we can simplify this to:

[tex]M = ∫ds[/tex]

Using the arc length formula, we have:

[tex]M = ∫₀²π √(x'(t)² + y'(t)² + z'(t)²) dt[/tex]

where x'(t), y'(t), and z'(t) are the derivatives of x(t), y(t), and z(t), respectively. Substituting x(t) = cos t, y(t) = sin t, and z(t) = 6t, we get:

[tex]M = ∫₀²π √(sin²t + cos²t + 6²) dt\\= ∫₀²π √37 dt\\= 2π√3z[/tex]

Therefore, the mass of the wire is 2π√37 A.

B. To determine the coordinates of the center of mass, we need to find the position vector of the center of mass:

[tex]r = (xcm, ycm, zcm)[/tex]

where

[tex]xcm = (1/M) ∫xp(x,y,z)ds\\ycm = (1/M) ∫yp(x,y,z)ds\\zcm = (1/M) ∫zp(x,y,z)ds[/tex]

Since the density function is constant, we can simplify this to:

[tex]xcm = (1/M) ∫xds\\ycm = (1/M) ∫yds\\zcm = (1/M) ∫zds[/tex]

Using the arc length formula, we have:

[tex]xcm = (1/M) ∫₀²π cos t √(sin²t + cos²t + 6²) dt[/tex]

[tex]ycm = (1/M) ∫₀²π sin t √(sin²t + cos²t + 6²) dt[/tex]

[tex]zcm = (1/M) ∫₀²π 6t √(sin²t + cos²t + 6²) dt[/tex]

Substituting x(t) = cos t, y(t) = sin t, and z(t) = 6t, we get:

[tex]xcm = (1/M) ∫₀²π cos t √37 dt[/tex]

[tex]ycm = (1/M) ∫₀²π sin t √37 dt[/tex]

[tex]zcm = (1/M) ∫₀²π 6t √37 dt[/tex]

Evaluating these integrals, we get:

[tex]xcm = 0\\ycm = 0\\zcm = 18π/√37[/tex]

Therefore, the coordinates of the center of mass are (0, 0, 18π/√37).

C. To determine the moment of inertia about the z-axis, we need to use the formula:

[tex]I = ∫c(x² + y²)p(x,y,z)ds[/tex]

Substituting x(t) = cos t, y(t) = sin t, and z(t) = 6t, we get:

[tex]I = ∫₀²π [(cos²t + sin²t) + 6²] dt[/tex]

[tex]= ∫₀²π (37) dt\\= 37(2π)[/tex]

Therefore, the moment of inertia about the z-axis is 37(2π) A.

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The area of the regular nonagon is 1,582.5 ft².

The area of the nonagon is calculated by applying the following formula as shown below;

A = (9/4) a² (cos 20/sin 20)

where;

The given length of the nonagon = 16 ft.

The area of the nonagon is calculated as follows;

A = (9/4) a² (cos 20/sin 20)

A = (9/4) (16)² (cos 20/sin 20)

A = 1,582.5 ft²

Thus, the area of the regular nonagon is calculated by applying the formula given.

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The area of the triangle with sides a = 7, b = 5, and c = 5 is approximately 12.015 square units, rounded to three decimal places.

To find the area of a triangle with given side lengths a = 7, b = 5, and c = 5, we can use Heron's formula. Heron's formula states that the area (A) of a triangle can be calculated using the semi-perimeter (s) and the side lengths:

1. Calculate the semi-perimeter: s = (a + b + c) / 2
  s = (7 + 5 + 5) / 2
  s = 17 / 2
  s = 8.5

2. Apply Heron's formula: A = √(s * (s - a) * (s - b) * (s - c))
  A = √(8.5 * (8.5 - 7) * (8.5 - 5) * (8.5 - 5))
  A = √(8.5 * 1.5 * 3.5 * 3.5)

3. Calculate the area:
  A ≈ √(144.375)
  A ≈ 12.015

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The given sequence {0,1,0,0,1,0,0,0,1} converges to 1.

A convergent sequence is a sequence of numbers where the sequence approaches on something, that is the the limit exists.

It is finite.

Divergent sequence are sequences which does not contain the limit. The limit will be ±∞.

Given sequence is {0,1,0,0,1,0,0,0,1}.

Here there are 9 numbers in the sequence.

This sequence isfinite and approaches to 1.

So the limit is 1 and the sequence converges.

If the sequence was {0,1,0,0,1,0,0,0,1, ......}, the sequence is continuing.

The terms are either 0 or 1.

But it does not end.

So the sequence diverges.

Hence the given sequence converges to 1.

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The share of each girl is 1/6.

Given that, certain sum of money is divided among 2 boys and 3 girls.

One boy gets 2/7 and the other boy gets 3/14

Total amount of money boys gets = 2/7+3/14

= (4+3)/14

= 7/14

= 1/2

Remaining money = 1-1/2

= 1/2

The balance is divided equally among the 3 girls.

Let the amount of money each girl gets be x.

Now, 3x=1/2

x=1/6

Therefore, the share of each girl is 1/6.

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"Your question is incomplete, probably the complete question/missing part is:"

A certain sum of money is divided among 2 boys and 3 girls. One boy gets 2/7 and the other boy gets 3/14 the balance is divided equally among the 3 girls . Find the share of each girl.

The side lengths are given as follows:

The side lengths for this problem are obtained considering the triangle midsegment theorem, which states that the midsegment of the triangle divided the laterals of the triangle into two segments of equal length.

The congruent segments(segments of equal length) are given as follows:

Hence the lengths are given as follows:

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The correct answer is $4.50 option (c).

To calculate the cost of 2.6 lb of oatmeal at $1.73/lb, we simply multiply the weight of the oatmeal by the cost per pound.

2.6 lb × $1.73/lb = $4.498

Rounding to two decimal places, the cost of 2.6 lb of oatmeal is $4.50.

Therefore, the correct response is $4.50.

o find the cost of 2.6 lb of oatmeal, we can multiply the price per pound by the number of pounds. So:

Cost of oatmeal = price per pound x number of pounds

= $1.73/lb  × 2.6 lb

= $4.498

Rounding this to two decimal places gives us $4.50. Therefore, the correct answer is $4.50.

To calculate the cost of 2.6 lb of oatmeal at a price of $1.73/lb, we can use the formula:

Cost = Price per unit  × Quantity

In this case, the price per unit is $1.73/lb and the quantity is 2.6 lb. So the cost would be:

Cost = $1.73/lb  × 2.6 lb = $4.498

Rounding to the nearest cent, the cost of 2.6 lb of oatmeal would be $4.50. Therefore, the correct response is $4.50.

To calculate the cost of 2.6 lb of oatmeal at $1.73/lb, we need to multiply the weight (in pounds) by the price per pound.

So, the cost would be:

2.6 lb  × $1.73/lb = $4.498

Rounding this to two decimal places gives us $4.50, which is one of the options provided. Therefore, the correct answer is $4.50.

Complete Question:

oatmeal costs $1.73/lb. how much would 2.6 lb of oatmeal cost? responses

a. $1.50  

b. $4.48  

c. $4.50  

d. $4.58

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We used the given measurements of mean and standard deviation to determine the z-score of the value we were interested in, which allowed us to look up the corresponding probability in the standard normal distribution table or use a calculator.

The first step is to standardize the value of 61.5 inches using the formula z = (x - mu) / sigma, where x is the value we want to find the probability for, mu is the mean, and sigma is the standard deviation.

z = (61.5 - 56.9) / 4 = 1.15

Next, we look up the probability corresponding to this z-value in the standard normal distribution table or use a calculator. The probability that a randomly chosen child has a height less than 61.5 inches is the same as the probability that a standard normal variable is less than 1.15.

Using a table or calculator, we find that this probability is approximately 0.8749.

Therefore, the probability that a randomly chosen child has a height of less than 61.5 inches is approximately 0.8749 or 87.49%.

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As per the given information, the value of the house is 165,116

The current value of the house is = 213,000

The percentage with which the value of the house has decreased = 29%

Let the price of the house when it was purchased be = x

The value of the house is decreased by 29% = 0.29

It is required to understand that an exponential function is involved whenever we discuss a rise or decline.

Thus,

According to the question,

x + 29% of x = 213000

Solving,

x + 0.29x = 213000

1.29x = 213000

x = 213000/1.29

x = 165,116

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The solution is,  the volume of the solid is (5/6)π.

To use polar coordinates, we need to first express the equations of the surfaces in polar coordinates.

Here, we have,

In polar coordinates, we have x = r cosθ and y = r sinθ. Therefore, the equation x^2 + y^2 = 1 becomes r^2 = 1.

To find the volume of the solid, we can integrate over the region in the xy-plane bounded by the circle r=1. For each point (r,θ) in this region, the corresponding point in 3D space has coordinates (r cosθ, r sinθ, r^2+3)

Thus, the volume of the solid can be expressed as the double integral:

V = ∬R (r^2+3) r dr dθ

where R is the region in the xy-plane bounded by the circle r=1.

We can evaluate this integral using the limits of integration 0 to 2π for θ, and 0 to 1 for r:

V = ∫₀^¹ ∫₀^(2π) (r^3 + 3r) dθ dr

= ∫₀^¹ [(r^3/3 + 3rθ)]₀^(2π) dr

= ∫₀^¹ (2πr^3/3 + 6πr) dr

= 2π[(1/12) + (1/2)]

= 2π(5/12)

= (5/6)π

Therefore, the volume of the solid is (5/6)π.

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complete question:

Use a double integral in polar coordinates to find the volume of the solid bounded by the graphs of the equations z=x2+y2+3,z=0,x2+y2=1

.

Since J and K are complementary angles in a right triangle, we know that:[tex]J + K = 90 degrees[/tex]. The answer is (A) cosine of angle K.

Also, in a right triangle, the sine, cosine, and tangent of an angle are defined as follows:[tex]sin(A) = opposite/hypotenuse[/tex]

[tex]cos(A) = adjacent/hypotenuse[/tex]

[tex]tan(A) = opposite/adjacent[/tex]

Therefore, the cosine of angle J can be expressed as:

[tex]cos(J) = adjacent/hypotenuse[/tex]

And the cosine of angle K can be expressed as: [tex]cos(K) = adjacent/hypotenuse[/tex]

Since the two angles share the same right triangle adjacent side and hypotenuse, and since they add up to 90 degrees, we know that they must have opposite sides that are different. That is, the opposite side of angle J is the adjacent side of angle K, and vice versa.

Therefore, we can express the sine of angle K in terms of the opposite and hypotenuse of angle J:[tex]sin(K) = opposite/hypotenuse = adjacent/hypotenuse = cos(J)[/tex]

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Two pipes flowing together fill a water tank in 10 hours. The time needed for the second pipe to fill the tank is approximately 50.25 hours.

Let x be the time needed for the second pipe to fill the tank.
The first pipe can fill the same basin in x + 8 hours.
When the two pipes flow together, they fill 1/10 of the basin in 1 hour.
Thus, the first pipe can fill 1/(x+8) of the basin in 1 hour, and the second pipe can fill 1/x of the basin in 1 hour.
So, the equation is:
1/(x+8) + 1/x = 1/10
Multiplying both sides by 10x(x+8), we get:
10x + 10(x+8) = x(x+8)
Expanding and simplifying, we get:
x^2 - 52x - 80 = 0
Using the quadratic formula, we get:
x = (52 ± sqrt(52^2 + 4*80))/2
x ≈ 50.25 or x ≈ 1.51
Since x represents the time needed for the second pipe to fill the tank, we discard the smaller solution, x ≈ 1.51, and conclude that the time needed for the second pipe to fill the tank is approximately 50.25 hours.

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4000 cm^3 is the total volume of this octahedron

The volume of a pyramid is given by the formula:

V = (1/3) * base area * height

Since the base is a square with sides of 20 cm, its area is:

base area = 20^2 = 400 cm^2

The height of each pyramid is half the overall height of the octahedron, which is 30 cm. So the height of each pyramid is:

height = 30/2 = 15 cm

Now we can find the volume of one pyramid:

V = (1/3) * base area * height

V = (1/3) * 400 cm^2 * 15 cm

V = 2000 cm^3

Therefore, the total volume of the octahedron is twice the volume of one pyramid:

V_total = 2 * V

V_total = 2 * 2000 cm^3

V_total = 4000 cm^3

So the volume of the octahedron is 4000 cubic centimeters.

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Answer: Missing the statments

Step-by-step explanation:

To determine if two pools are similar, the pool company needs to check if the corresponding sides are proportional and the corresponding angles are equal. If these conditions are met, then the two pools are considered similar in geometry.

In mathematics, specifically in geometry, similar figures are figures that have the same shape but may differ in size. To determine if pool ABCD is similar to pool EFGH, the pool company needs to check the proportionality of corresponding sides and the equality of corresponding angles.

For instance, if the length and width of pool ABCD is twice that of pool EFGH, and all the corresponding angles are equal, then the two pools are similar. It's crucial to note that all corresponding sides should be in proportion and all corresponding angles should be equal for the figures to be considered similar.

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Answer: To fill the whole bucket, it will take 64 seconds so the remaining time is 40 seconds

Step-by-step explanation: As we are given 3/8 th part of the bucket is filled in 24 seconds. So by simply applying the unitary method we can say -

3/8 th part -----> 24 seconds

To fill the whole bucket multiply both sides by 8/3 in order to make the 1 unit of the bucket on the L.H.S, we get

1 bucket ----> 64 seconds.

The remaining times as it already passes 24 seconds and 3/8 th part of the bucket is filled, 64-24 seconds i.e 40 seconds is remaining in which bucket is full.

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