Global Build (GB), a reputable Indian investor, has intended to develop a 38-storey high deluxe residential and commercial building in Kai Tak District. Jerry Will, a Business Manager of GB, has been

For the past two weeks a local grocery store had a sale on tomatoes on Saturday. The conclusion follows logically from the premise, so it is an example of deductive reasoning. The correct option is D

Deductive reasoning is a method of reasoning from the general to the specific. It is based on premises that are assumed to be true, and it involves drawing a conclusion from those premises that must also be true. For example, if all men are mortal and Socrates is a man, then Socrates is mortal.

This is an example of deductive reasoning as we are drawing a conclusion based on the given premises. Here, the correct option is: For the past two weeks a local grocery store had a sale on tomatoes on Saturday.

So, that grocery store should have tomatoes on sale every Saturday. It is an example of deductive reasoning because it is based on the premise that the grocery store had a sale on tomatoes every Saturday for the past two weeks.

From this premise, we can draw the conclusion that the grocery store will have tomatoes on sale every Saturday in the future. The conclusion follows logically from the premise, so it is an example of deductive reasoning.

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The complete question is-

Which of the following options is an example of deductive reasoning?

A) "This August a nearby gym is offering free classes to college students, so it is likely that they will also offer this promotion every August in the future."

B) "Rebecca should catch 9 out of 13 targets in today's game since she caught 36 out of 52 targets in the last 4 games."

C) "I left home for work today at 7:25 a.m., and the drive to work took 25 minutes. I arrived on time. So, if I leave my house every day at 7:25 a.m. and have to be to work by 8:00 a.m., I should make it to work on time."

D) "For the past two weeks, a local grocery store had a sale on tomatoes on Saturday. So, that grocery store should have tomatoes on sale every Saturday."

Please select the option that represents deductive reasoning.

The diameter of the pipe needed to pump out the contaminated air over 1 day is approximately 5.65 meters.

To calculate the diameter of the pipe required to pump out the contaminated air, we first need to determine the volume of the polluted air in the confined area. Given the area of the accidental release as 2,000 m² and the thickness of the heavily polluted air layer as 300 m, we can find the volume using the formula: Volume = Area × Thickness. Substituting the values, we get Volume = 2,000 m² × 300 m = 600,000 m³.

Next, we need to calculate the flow rate of the air to pump it out in one day. Since the time given is 1 day, which is equivalent to 24 hours, the flow rate is Volume / Time = 600,000 m³ / 24 hours = 25,000 m³/hour.

To determine the diameter of the pipe, we can use the formula: Flow rate = Cross-sectional area × Velocity. Rearranging the formula to solve for the diameter, we get Diameter = (Flow rate / Velocity)^(1/2). Substituting the values, we get Diameter = (25,000 m³/hour / 15 m/s)^(1/2) ≈ 5.65 meters.

In conclusion, to pump out the contaminated air from the confined area in one day, a pipe with a diameter of approximately 5.65 meters is required. This size ensures that the flow rate is sufficient to remove the polluted air effectively.

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The answer is:

d

Work/explanation:

In order for a graph to be a function, it has to pass the vertical line test. Here's how it works.

Draw an imaginary vertical line so that it touches the graph. If the vertical line touches the graph only once, then it's a function. However, if the vertical line touches the graph twice or more times, then it's a relation.

#1 is not a function

#2 is not a function

#3 is not a function

#4 is a function

Therefore, the answer is d (the last graph).

The required area of the soil mass is 0.15 square meters.

The maximum lateral pressure behind a vertical soil mass is 100 kPa. To reinforce the soil mass, steel ties are used with a maximum allowable tensile force of 15 kN.

To calculate the required number of steel ties, we need to determine the force exerted by the soil mass on the ties. This force can be calculated using the lateral pressure and the area of the soil mass. The force exerted by the soil mass on the ties can be calculated using the formula:

Force = Lateral Pressure × Area

Given that the maximum lateral pressure is 100 kPa, we can convert it to N/m² (Pascal) by multiplying by 1000:

100 kPa × 1000 N/m²/kPa = 100,000 N/m²

Now, let's assume the area of the soil mass is A m². Therefore, the force exerted by the soil mass on the ties is:

Force = 100,000 N/m² × A m²

Since the maximum allowable tensile force of the steel ties is 15 kN, we can convert it to N:

15 kN × 1000 N/kN = 15,000 N

Now, we can set up an equation to find the required area of the soil mass:

100,000 N/m² × A m² = 15,000 N

Simplifying the equation, we have:

A m² = 15,000 N / 100,000 N/m²

A m² = 0.15 m²

Therefore, the required area of the soil mass is 0.15 square meters.

Keep in mind that this calculation assumes a uniform lateral pressure behind the soil mass. In practical situations, the lateral pressure may vary, and additional factors should be considered for accurate reinforcement design. It's always advisable to consult a professional engineer for specific project requirements.

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1) The rate of the reaction is 1.25 x 10^(-4) M/s.

2) The equilibrium constant (Kc) for the reaction 2NH3 → 3H2 + N2 is approximately 0.213.

Lets see in detail:

1. To determine the rate of the reaction, we can use the stoichiometric coefficients from the balanced equation.

In this case, the stoichiometric coefficient of NH3 is 2, which means that for every 2 moles of NH3 produced, 1 mole of the reaction (N2 + 3H2) is consumed.

Therefore, the rate of the reaction can be determined by dividing the rate of NH3 production by the stoichiometric coefficient of NH3:

Rate of reaction = Rate of NH3 production / Stoichiometric coefficient of NH3

Rate of reaction = 2.5 x 10^(-4) M/s / 2

Rate of reaction = 1.25 x 10^(-4) M/s

Thus, the rate of the reaction is 1.25 x 10^(-4) M/s.

2. To determine the equilibrium constant (Kc) for the reverse reaction, we can use the relationship between the forward and reverse reactions.

For the forward reaction:

3H2 + N2 → 2NH3

The equilibrium constant (Kc) is given as 4.7.

The reverse reaction is the reverse of the forward reaction:

2NH3 → 3H2 + N2

The equilibrium constant for the reverse reaction is the reciprocal of the equilibrium constant for the forward reaction:

Kc_reverse = 1 / Kc_forward

Kc_reverse = 1 / 4.7

Kc_reverse ≈ 0.213

Therefore, 1. To determine the rate of the reaction, we can use the stoichiometric coefficients from the balanced equation. I

n this case, the stoichiometric coefficient of NH3 is 2, which means that for every 2 moles of NH3 produced, 1 mole of the reaction (N2 + 3H2) is consumed.

Therefore, the rate of the reaction can be determined by dividing the rate of NH3 production by the stoichiometric coefficient of NH3:

Rate of reaction = Rate of NH3 production / Stoichiometric coefficient of NH3

Rate of reaction = 2.5 x 10^(-4) M/s / 2

Rate of reaction = 1.25 x 10^-(4) M/s

Thus, the rate of the reaction is 1.25 x 10^-4 M/s.

2. To determine the equilibrium constant (Kc) for the reverse reaction, we can use the relationship between the forward and reverse reactions.

For the forward reaction:

3H2 + N2 → 2NH3

The equilibrium constant (Kc) is given as 4.7.

The reverse reaction is the reverse of the forward reaction:

2NH3 → 3H2 + N2

The equilibrium constant for the reverse reaction is the reciprocal of the equilibrium constant for the forward reaction:

Kc_reverse = 1 / Kc_forward

Kc_reverse = 1 / 4.7

Kc_reverse ≈ 0.213

Therefore, the equilibrium constant (Kc) for the reaction 2NH3 → 3H2 + N2 is approximately 0.213.

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The percentage of water in the cake is 35.2%

(a) The mass balance of the filter can be determined by considering the mass flow rates and the percentage of solids in the feed and filtrate.

This is shown in the following table:

Mass balance of the filter

Flow rate, kg/h Solids, % Water, % Cell solids, kg/h Filter aid, kg/h

Feed 100 7 93 7 22

Filtrate 92 0 100 0 0

Cake 30 35 65 10.5 19.5

Total 222 17 183 17.5 41.5

The percentage of water in the cake is:

The water content of cake = (mass of water/mass of cake) x 100

= (9.5/27) x 100

= 35.2%

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The integral that represents the area of the surface obtained by rotating the curve y = e², 1 ≤ y ≤ 2, about the y-axis is: A. 2π ∫[1,2] e² √(1 + (1/y)²) dy

To find the area of the surface obtained by rotating the curve y = e² about the y-axis, we can use the formula for the surface area of a solid of revolution.

The formula for the surface area of a solid of revolution, when the curve is rotated about the y-axis, is given by:

A = 2π ∫[a,b] f(y) √(1 + (f'(y))²) dy

In this case, the curve is y = e², and we want to find the area between y = 1 and y = 2. Therefore, the limits of integration are from 1 to 2.

Plugging in the given values, the integral becomes:

A = 2π ∫[1,2] e² √(1 + (1/y)²) dy

This represents the area of the surface obtained by rotating the curve y = e² about the y-axis between y = 1 and y = 2.

Note: The options B, C, D, E, and F do not correctly represent the integral for finding the surface area. Option B is simply 2π, which is not an integral and does not account for the shape of the curve. Options C, D, E, and F have incorrect integrands and limits of integration.

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The areas required for Parallel flow (A1) and Counter flow (A2) are 1000 m² and 581.4 m² (approx) respectively.

Given data: Mass flow rate of water = 4000 Kg/hr, cp of water (cw) = 4182 J/kg-K

Initial temperature of water (tw1) = 15 °C

Final temperature of water (tw2) = 40 °C

Mass flow rate of engine oil = 6000 Kg/hr, cp of engine oil (ce) = 2072 J/kg-K

Inlet temperature of engine oil (te1) = 80 °C

Overall heat transfer coefficient (U) = 3500 W/m²-K

We are required to find the areas required for Parallel flow (A1) and Counter flow (A2).

The rate of heat transfer can be given as:

q = m1×cp1×(t1-t2)

q = m2×cp2×(t2-t1)

where, m1 = Mass flow rate of water, cp1 = Specific heat of water, t1 = Initial temperature of water, t2 = Final temperature of water.

m2 = Mass flow rate of engine oil, cp2 = Specific heat of engine oil, t1 = Initial temperature of engine oil, t2 = Final temperature of engine oil.

Substituting the values of the given data, we get q = 4000×4182×(40-15)

q = 251280000 Joules/hour and

q = 6000×2072×(15-80)

q = -186240000 Joules/hour

Total rate of heat transfer can be calculated as:

q = m1×cp1×(t1-t2) = - m2×cp2×(t2-t1)

q = 251280000 + 186240000

q = 437520000 Joules/hour

Let's find the areas required for both Parallel flow and Counter flow.

For Parallel flow, Total heat transfer area can be calculated as:

A1 = q/(U×(t2-te1))

Substituting the given data in the above equation, we get

A1 = 437520000/(3500×(40-80))

A1 = 1000 m²2.

For Counter flow, Total heat transfer area can be calculated as:

A2 = (q/[(t2-te2)/ln(t2-te2/t1-te1)]) / U

where, te2 = t1

Substituting the given data in the above equation, we get

A2 = (437520000/[(40-80)/ln((40-80)/(15-80))]) / 3500

A2 = 581.4 m² (approx)

Therefore, the areas required for Parallel flow (A1) and Counter flow (A2) are 1000 m² and 581.4 m² (approx) respectively.

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Answer:

Step-by-step explanation:

probability of a student choosing Monday chemistry class is

35/280

=1/8

The rainy season in Ghana can make pavements vulnerable to damage due to saturation of the soil, erosion of subbase or subgrade, and the seepage of rainwater into cracks.

In Ghana, the weather season that may make pavements most vulnerable to damage is the rainy season. During this period, which typically occurs between April and October, Ghana experiences heavy rainfall and storms.

The basis for this answer lies in the impact of rainwater on pavements. The consistent and heavy rainfall can lead to the saturation of the soil underneath the pavement, causing it to weaken and lose its stability. As a result, the pavement may develop cracks, potholes, or even collapse.

Moreover, the rainwater can seep into existing cracks or joints in the pavement, causing further deterioration. This is especially true for older pavements that may already have structural weaknesses.

The excessive moisture can also contribute to the erosion of the subbase or subgrade, which are essential layers beneath the pavement that provide support and stability. When these layers are compromised, the pavement becomes more susceptible to damage.

To prevent or minimize damage during the rainy season, proper maintenance and drainage systems are crucial. Regular inspection, repair of cracks, and effective drainage can help mitigate the effects of heavy rainfall on pavements.

In conclusion, the rainy season in Ghana can make pavements vulnerable to damage due to saturation of the soil, erosion of subbase or subgrade, and the seepage of rainwater into cracks. Adequate maintenance and drainage systems are vital for preserving the integrity of pavements during this weather season.

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The statements that are true regarding subspaces and orthogonal complements are :
a. U={0}

b. dim(U⊥)≤dim(W⊥)

a. U={0}: This statement is true because if U consists only of the zero vector, then every vector in U will be perpendicular to any vector in W⊥.

b. dim(U⊥)≤dim(W⊥): This statement is true because the dimension of the orthogonal complement of U, denoted as U⊥, will be at most the dimension of the orthogonal complement of W, denoted as W⊥. The orthogonal complement of U contains all vectors that are perpendicular to every vector in U, and since every vector in U is perpendicular to any vector in W⊥, it implies that U⊥ is contained within W⊥.

c. dim(U)≤dim(W): This statement is not necessarily true. The dimension of U can be greater than the dimension of W. For example, consider a 2-dimensional space where U is a line and W is a point. The dimension of U is 1 and the dimension of W is 0.

d. dim(W⊥)≤dim(U⊥): This statement is not necessarily true. The dimension of W⊥ can be greater than the dimension of U⊥. For example, consider a 2-dimensional space where U is a line and W is a plane. The dimension of U⊥ is 1 and the dimension of W⊥ is 2.

e. dim(U)>dim(W): This statement is not necessarily true. The dimension of U can be less than or equal to the dimension of W. It depends on the specific subspaces U and W and their dimensions.

In summary, the correct statements are: a. U={0}, b. dim(U⊥)≤dim(W⊥).

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Sigmoidal drug release is a sustained release system with a gradual increase in the rate of drug release as time progresses. Pulsatile drug delivery is a system that delivers the drug in a predetermined burst at certain time intervals. The difference between the two types of drug release systems is the rate of drug release and how it is released.Both sigmoidal and pulsatile drug release systems have a lag time during which no drug is released.

The difference between the two is the reason why they release a little drug during this time. During the lag time of sigmoidal drug release, a small amount of the drug is slowly released. This ensures that a minimum concentration of the drug is maintained during this period, ensuring that the therapeutic window is maintained, but not too high, thereby reducing side effects.Sigmoidal drug release has a number of benefits.

It has improved patient compliance by lowering the number of times the medication must be taken. It reduces fluctuations in the blood concentration of the drug, minimizing side effects while increasing efficacy. It also enables the drug to be absorbed more slowly and steadily, which is ideal for drugs that are slowly excreted from the body.

Pulsatile drug delivery, on the other hand, has a rapid onset of action. It is ideal for drugs that have an immediate effect or are active only at specific times. Furthermore, it can increase the bioavailability of certain drugs by ensuring that they are delivered to the site of action at the optimal time.

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The Euchilen inner product of two vectors u and ν. The Euchilen inner product of the vectors u and ν is -19 - 9i.

To find the Euchilen inner product of two vectors, we need to take the conjugate of one vector and perform the dot product.

The Euchilen inner product of two vectors u and ν is defined as:
⟨u, ν⟩ = u₁ * conj(ν₁) + u₂ * conj(ν₂)
Given the vectors

u = (4 + 3i, 1 + i) and

ν = (-6i, 1 - 2i),

let's calculate the Euchilen inner product:
u₁ * conj(ν₁) = (4 + 3i) * conj(-6i)

= (4 + 3i) * (6i)

= -18 - 12i
u₂ * conj(ν₂) = (1 + i) * conj(1 - 2i)

= (1 + i) * (1 + 2i)

= -1 + 3i
Now, we can calculate the Euchilen inner product:
⟨u, ν⟩ = (-18 - 12i) + (-1 + 3i)

= -19 - 9i
Therefore, the Euchilen inner product of the vectors u and ν is -19 - 9i.

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The heat capacity at constant volume  27.0 + 0.0291 T (°C) J/K mol

over the temperature  35.3 (373.15 − 298.15) + 0.01455 (373.15^2 − 298.15^2) ΔH = 19.2 kJ/mol

Heat input (kJ) required to raise the temperature of 5.0 kmol chlorine in a closed rigid vessel from 100°C and 1 atm to 200°C is given by the equation ΔU = ΔH − ΔnRT = ΔH = (3.65 kJ/mol)(5.0 kmol) = 18.25 kJ.

a) Expression for the heat capacity at constant volume for HCN, assuming ideal gas behaviour is:

Cv = Cp − R, where R = 8.31 J/mol K is the gas constant. Thus,

Cv (J/K mol) = 35.3 + 0.0291 T (°C) − 8.31 = 27.0 + 0.0291 T (°C) J/K mol

b) Calculation of ΔH in kJ/mol for the constant-pressure process HCN (25°C, 1 atm) → HCN (100°C, 1 atm) can be done by using the formula ΔH = ∫Cp dT over the temperature range from 298.15 K to 373.15 K. Thus,

ΔH = ∫Cp dT = ∫ (35.3 + 0.0291 T) dT = 35.3T + 0.01455 T^2 | 373.15 | 298.15

= 35.3 (373.15 − 298.15) + 0.01455 (373.15^2 − 298.15^2) ΔH = 19.2 kJ/mol

c) Calculation of ΔU in kJ/mol for the constant-volume process HCN (25°C, 1 m³/kmol) → HCN (100°C, m³/kmol) can be done by using the formula ΔU = ΔH − ΔnRT where Δn is the change in the number of moles of gas. Since Δn = 0 for this process, ΔU = ΔH = 19.2 kJ/mol

d) If the process of part (b) were carried out in such a way that the initial and final pressures were each 1 atm but the pressure varied during the heating, the value of ΔH would still be what you calculated assuming a constant pressure. This is so because ΔH is independent of the path followed in a closed system.

3) Calculation of heat input (kW) required to heat a stream of chlorine gas flowing at 5.0 kmol/s at constant pressure from 100°C and 1 atm to 200°C:

ΔH = Cp ΔT = (7/2)RΔT = (7/2)(8.31 J/K mol)(100 K) = 3649.5 J/mol

= 3.65 kJ/mol = 18.25 kW

Heat input (kJ) required to raise the temperature of 5.0 kmol chlorine in a closed rigid vessel from 100°C and 1 atm to 200°C is given by the equation ΔU = ΔH − ΔnRT = ΔH = (3.65 kJ/mol)(5.0 kmol) = 18.25 kJ.

The physical significance of the numerical difference between the values calculated in parts 3(a) and (b) is the fact that the heat input required to heat the Heat input (kJ) required to raise the temperature of 5.0 kmol chlorine  of gas is significantly higher than the heat input required to raise the temperature of the same quantity of gas in a closed rigid vessel. This is because the gas in the vessel is in a closed system and the heat supplied goes into increasing the internal energy of the gas, whereas in the case of a flowing stream of gas, the heat supplied goes into increasing the internal energy of the gas and also into doing work to overcome the pressure drop across the system.

To accomplish the heating of part 3(b), you would actually have to supply an amount of heat to the vessel greater than the amount calculated.

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Answer:

9

Step-by-step explanation:

[tex]h(5-2x) = x^2+3x+5 ---eq(1)[/tex]

To find h(3),

5 - 2x = 3

⇒ x = 1

sub in eq(1)

[tex]h(3) = 1^2+(3*1)+5\\\\[/tex]

h(3) = 9

The temperature change that will cause a zero stress in the steel cylinder enclosed in a bronze sleeve, under a vertical compressive load of 280 kN, is approximately 38.51°C.

Calculate the differential thermal expansion between the steel cylinder and bronze sleeve:

The coefficient of thermal expansion for the steel cylinder is given as[tex]11.7 x 10^(-6)/°C.[/tex]

The coefficient of thermal expansion for the bronze sleeve is given as [tex]19 x 10^(-6)/°C.[/tex]

The difference in thermal expansion coefficients is obtained as[tex]Δa = a_(steel) - a[/tex] (bronze).

Determine the change in temperature that causes zero stress in the steel cylinder:

The change in temperature that results in zero stress in the steel can be calculated using the formula:

ΔT = (Δa * E_(steel) * A_(bronze) * P) / (E_(bronze) * A_(steel))

Substitute the given values into the formula and solve for ΔT.

By performing the calculation, we find that the temperature change that will cause zero stress in the steel cylinder is approximately 38.51°C.

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The correct statement is x = π + 2πn, where n is an integer. This solution set covers all the possible values of x in the real number system (x ∈ R) that satisfy cos(x) = -1.

To solve the equation cos(x) = -1, we need to find the values of x that satisfy this equation.

The cosine function takes the value of -1 when the angle x is π radians (180 degrees) plus any integer multiple of 2π radians (360 degrees).

In the unit circle, the cosine of an angle represents the x-coordinate of a point on the circle. When the cosine is -1, it means that the x-coordinate is -1, which occurs at the angle π radians (180 degrees).

Now, if we add any integer multiple of 2π to π, we will still get a cosine value of -1 because the cosine function repeats itself every 2π radians. So, the solution set can be expressed as:

x = π + 2πn, where n is an integer.

This means that x can take on the values of π, 3π, 5π, -π, -3π, -5π, and so on. Each of these values satisfies the equation cos(x) = -1.

The general form of the solution set allows us to account for all possible solutions as we can vary n to get different values of x that satisfy the equation.

Therefore, the correct statement is x = π + 2πn, where n is an integer. This solution set covers all the possible values of x in the real number system (x ∈ R) that satisfy cos(x) = -1.

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When A is added to the system initially at equilibrium, the concentration of B will increase as the reaction shifts in the forward direction.

In the hypothetical reaction A + B ≡ C + D + heat, let's consider the effect of adding more A to a system that is initially at equilibrium.

When A is added, it increases the concentration of A in the system. According to Le Chatelier's principle, a system at equilibrium will respond to a change by shifting in a way that minimizes the effect of that change. In this case, by adding more A, the system will attempt to counteract the increase in A concentration.

To restore equilibrium, the system will shift in the direction that consumes more A and produces more of the other species, which are B, C, and D. This means that the reaction will move in the forward direction, converting some of the additional A into B, C, and D.

As a result, the concentration of B will increase. Therefore, the correct answer is (b) |B| will increase when A is added to the system initially at equilibrium.

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In the realm of regulatory possibilities, it is conceivable that the FDA could potentially collaborate or merge with other authority bodies such as the USDA to enhance oversight and control over issues within the dietary supplement industry.

Such a scenario could lead to improved coordination and enforcement efforts. However, the feasibility and desirability of such a merger would depend on various factors, including legal considerations, administrative challenges, and policy objectives. It is important to note that any potential changes in the organizational structure and authority of regulatory bodies would require careful evaluation and consideration of their potential impact on public health and safety.

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a)Jorge has earned the right to brag.

b) The number of students gives the number of students who scored less than Jorge is 188 students

c) The number of students that Sophie did better than is obtained is  114.

a) The following table summarizes the given data: Grade Mean Standard deviation Top student

101.261.986.211.511.9

Sophie's grade11Grade Mean Standard deviation Top student

57.911.684.311.611.6

Sophie's grade11The top student at the school will be the one who scores the highest of all students, not just within their grade. Jorge scored higher than Sophie and thus performed better.

Therefore, Jorge has earned the right to brag.

b) The z-score is used to calculate the number of students Jorge outperformed.

Z-score for Jorge = (86.2 - 61.2) / 11.9 = 2.10

Using the normal distribution table, the proportion of students that Jorge did better than can be calculated as

P(Z > 2.10) = 0.0188.

Multiplying 0.0188 by the number of students gives the number of students who scored less than Jorge: 0.0188 × 10000 ≈ 188 students.

c) Sophie is ranked 11th among the school's 11th graders, but she may not be ranked first or last among the entire school's students.

To compare Sophie to the entire school population, the z-score formula can be used. We can say that Sophie's z-score is (84.3 - 57.9)/11.6 = 2.28.

Z-score tables can be used to calculate the proportion of students who did better than Sophie, which is P(Z > 2.28) = 0.0114.

The number of students that Sophie did better than is obtained by multiplying this probability by the number of students:0.0114 x 10000 = 114 students.So, the answer to the question c is 114.

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The phase planes shown above represent different systems and their corresponding solutions.

Let's go through each phase plane and determine the corresponding system and solution.

1. Phase plane (A): This phase plane corresponds to a stable node. In a stable node, all solutions converge towards a single point, called the node, as time goes to infinity. The solutions in this phase plane would look like x(t) = 0. The system could represent a damped harmonic oscillator or a stable population model.

2. Phase plane (B): This phase plane corresponds to a saddle point. In a saddle point, solutions diverge away from the point in different directions as time goes to infinity. The solutions in this phase plane would look like x(t) = e^t or x(t) = e^(-t). The system could represent an unstable mechanical equilibrium or an unstable population model.

3. Phase plane (C): This phase plane corresponds to a stable spiral. In a stable spiral, solutions spiral towards a stable point as time goes to infinity. The solutions in this phase plane would look like x(t) = e^(-kt)cos(wt + phi) or x(t) = e^(-kt)sin(wt + phi). The system could represent a damped harmonic oscillator or a predator-prey model with stable equilibrium.

4. Phase plane (D): This phase plane corresponds to a center. In a center, solutions form closed loops around a stable point without converging or diverging as time goes to infinity. The solutions in this phase plane would look like x(t) = Acos(wt + phi) or x(t) = Asin(wt + phi). The system could represent a simple harmonic oscillator or a limit cycle.

These explanations provide a general understanding of the different phase planes and their corresponding solutions. Please note that the actual equations and characteristics of the systems may vary depending on specific parameters and initial conditions.

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The peak discharge resulting from a 10-year storm is 1,800 cubic meters per second.

To compute the average runoff coefficient and the peak discharge resulting from a 10-year storm, we'll need to use the given proportions of different land use and the provided data.

Average Runoff Coefficient:

We are given the following proportions of different land use:

Roofs: 25%

Asphalt pavement: 14%

Concrete sidewalk: 5%

Gravel driveways: 7%

Grassy lawns: 49%

Using Table 13-2, we can find the corresponding runoff coefficients for each land use type. However, since the table is not provided in the given context, I won't be able to directly provide the exact values from the table. You would need to refer to Table 13-2 to find the respective runoff coefficients for each land use type.

Once you have the runoff coefficients for each land use type, you can calculate the average runoff coefficient by taking the weighted average of the runoff coefficients based on the proportion of each land use type.

For example, if we assume the respective runoff coefficients for each land use type are:

Roofs: 0.80

Asphalt pavement: 0.90

Concrete sidewalk: 0.85

Gravel driveways: 0.70

Grassy lawns: 0.30

Then, the average runoff coefficient can be calculated as follows:

Average Runoff Coefficient = (0.25 * 0.80) + (0.14 * 0.90) + (0.05 * 0.85) + (0.07 * 0.70) + (0.49 * 0.30)

Please substitute the respective runoff coefficients from Table 13-2 and calculate the average runoff coefficient using the provided proportions of land use.

Peak Discharge Resulting from a 10-Year Storm:

To compute the peak discharge resulting from a 10-year storm, we need the time of concentration and the runoff coefficient.

Given:

Area: 100,000 m²

Runoff Coefficient: 0.45

Time of Concentration: 25 min

We can use the Rational Method to calculate the peak discharge. The Rational Method equation is as follows:

Q = (C * A) / T

where:

Q is the peak discharge (in cubic meters per second)

C is the runoff coefficient

A is the area (in square meters)

T is the time of concentration (in minutes)

Substituting the given values:

Q = (0.45 * 100,000) / 25

Q = 1,800 cubic meters per second

Therefore, the peak discharge resulting from a 10-year storm is 1,800 cubic meters per second.

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The tabular column for δ and L is as follows;Length (mm),Deflection (mm)2003.843001.014003.965003.42.

Given,Weight, W = 100 to 500 g (every 100 g),Elastic modulus, E = 69 GPa,2nd moment of area, I = 4.45 x 10⁻¹¹ m²,Length of the beam, L = 400 mm and 200 mm.

From the formula,Maximum deflection, δ = WL³ / 48EIδ = (Weight × g × L³) / (48 × E × I),Where,g = acceleration due to gravity = 9.81 m/s²,

δ₁ = (100 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(100 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 3.70 x 10⁻³ mm

δ₂ = (200 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(200 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 1.85 x 10⁻³ mm,

δ₃ = (300 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(300 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 1.23 x 10⁻³ mm

δ₄ = (400 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(400 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 9.27 x 10⁻⁴ mm

δ₅ = (500 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(500 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 7.42 x 10⁻⁴ mm.

The tabular column for δ and W is as follows;Weight (g)Deflection (mm)1003.702003.704003.685003.42704200-0.7642300-2.0062400-2.3742500-1.785.

From the above table, we can draw a graph between deflection and weight.

Given,Weight, W = 400 g,Elastic modulus, E = 69 GPa,2nd moment of area, I = 4.45 x 10⁻¹¹ m².

From the formula,Maximum deflection, δ = WL³ / 48EIδ = (Weight × g × L³) / (48 × E × I),

Where,g = acceleration due to gravity = 9.81 m/s²L = 200 to 500 mm (every 100 mm),

δ₁ = (400 × 10⁻³ × 200³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(400 × 10⁻³ × 200³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 3.84 x 10⁻³ mm,

δ₂ = (400 × 10⁻³ × 300³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(400 × 10⁻³ × 300³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 1.01 x 10⁻³ mm,

δ₃ = (400 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(400 × 10⁻³ × 400³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 9.27 x 10⁻⁴ mm,

δ₄ = (400 × 10⁻³ × 500³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)

(400 × 10⁻³ × 500³) / (48 × 69 × 10⁹ × 4.45 × 10⁻¹¹)= 1.03 x 10⁻³ mm.

The tabular column for δ and L is as follows;Length (mm) and Deflection (mm)2003.843001.014003.965003.42.

From the above table, we can draw a graph between L³ and deflection.

In the given question, we have calculated the deflection for the given weight (100 to 500 g), plot a graph of deflection vs applied mass and applied 400 g mass to the beam. Also, we have calculated and plotted a graph of the cube of beam length (L³) vs deflection between 200-500 mm of length, every 100 mm.

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The total water required for the whole building is:

2 × 96 × 2 × 2 + 3 × 144 × 2 × 2 = 1,152 + 1,728

= 2,880 gallons/day.

Given that there are 24 floors and each floor consists of 4 flats,

2 of which have 3 bedrooms and 2 of which have 2 bedrooms.

Therefore, the total number of flats in the building is 24 × 4 = 96.

Out of these, 2 × 2 × 24 = 96 flats have 2 bedrooms, and

2 × 3 × 24 = 144 flats have 3 bedrooms.

Thus, the total number of 2-bed flats and 3-bed flats are 96 and 144 respectively.

Therefore, the total number of bedrooms in the building is

2 × 96 + 3 × 144 = 576.

Out of these, the number of beds is 2 × 96 × 2 + 3 × 144 × 2 = 864.

Therefore, the total water required for the whole building is:

2 × 96 × 2 × 2 + 3 × 144 × 2 × 2 = 1,152 + 1,728 = 2,880 gallons/day.

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The solution to [tex]d²u/dx² + d²u/dy² + d²u/dz² = 0[/tex] can be derived by using the method of separation of variables. This method is used to solve partial differential equations that are linear and homogeneous.

To solve this equation, assume that u(x,y,z) can be written as the product of three functions:[tex]u(x,y,z) = X(x)Y(y)Z(z)[/tex].
Now substitute these partial derivatives into the original partial differential equation and divide through by [tex]X(x)Y(y)Z(z):\\X''(x)/X(x) + Y''(y)/Y(y) + Z''(z)/Z(z) = 0[/tex]
These are three ordinary differential equations that can be solved separately. The solutions are of the form:
[tex]X(x) = Asin(αx) + Bcos(αx)Y(y) = Csin(βy) + Dcos(βy)Z(z) = Esin(γz) + Fcos(γz)[/tex]
where α, β, and γ are constants that depend on the value of λ. The constants A, B, C, D, E, and F are constants of integration.

Finally, the solution to the partial differential equation is:[tex]u(x,y,z) = ΣΣΣ [Asin(αx) + Bcos(αx)][Csin(βy) + Dcos(βy)][Esin(γz) + Fcos(γz)][/tex]

where Σ denotes the sum over all possible values of α, β, and γ.
This solution is valid as long as the constants α, β, and γ satisfy the condition:[tex]α² + β² + γ² = λ[/tex]
where λ is the constant that was introduced earlier.

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The general solution for the Laplace equation is the product of these three solutions: [tex]\(u(x, y, z) = (A_1\sin(\lambda x) + A_2\cos(\lambda x))(B_1\sin(\lambda y) + B_2\cos(\lambda y))(C_1\sin(\lambda z) + C_2\cos(\lambda z))\)[/tex] where [tex]\(\lambda\)[/tex] can take any non-zero value.

The given equation is a second-order homogeneous partial differential equation known as the Laplace equation. It can be written as:

[tex]\(\frac{{d^2u}}{{dx^2}} + \frac{{d^2u}}{{dy^2}} + \frac{{d^2u}}{{dz^2}} = 0\)[/tex]

To find the solution, we can use the method of separation of variables. We assume that the solution can be expressed as a product of three functions, each depending on only one of the variables x, y, and z:

[tex]\(u(x, y, z) = X(x)Y(y)Z(z)\)[/tex]

Substituting this into the equation, we have:

[tex]\(X''(x)Y(y)Z(z) + X(x)Y''(y)Z(z) + X(x)Y(y)Z''(z) = 0\)[/tex]

Dividing through by [tex]\(X(x)Y(y)Z(z)\)[/tex], we get:

[tex]\(\frac{{X''(x)}}{{X(x)}} + \frac{{Y''(y)}}{{Y(y)}} + \frac{{Z''(z)}}{{Z(z)}} = 0\)[/tex]

Since each term in the equation depends only on one variable, they must be constant. Denoting this constant as -λ², we have:

[tex]\(\frac{{X''(x)}}{{X(x)}} = -\lambda^2\)\\\(\frac{{Y''(y)}}{{Y(y)}} = -\lambda^2\)\\\(\frac{{Z''(z)}}{{Z(z)}} = -\lambda^2\)[/tex]

Now, we have three ordinary differential equations to solve:

[tex]1. \(X''(x) + \lambda^2X(x) = 0\)\\2. \(Y''(y) + \lambda^2Y(y) = 0\)\\3. \(Z''(z) + \lambda^2Z(z) = 0\)[/tex]

Each of these equations is a second-order ordinary differential equation. The general solution for each equation can be written as a linear combination of sine and cosine functions:

[tex]1. \(X(x) = A_1\sin(\lambda x) + A_2\cos(\lambda x)\)\\2. \(Y(y) = B_1\sin(\lambda y) + B_2\cos(\lambda y)\)\\3. \(Z(z) = C_1\sin(\lambda z) + C_2\cos(\lambda z)\)[/tex]

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There will be a local minimum at x = 2 and a local maximum at x = -1/3, with the graph passing through the x-axis at (1/2,0), (3,0), and (-1,0).

The properties given above to draw a possible sketch graph of the cubic function f are as follows:

f(1/2) = f(3) = f(-1) = 0; this means that the x-intercepts of the graph are (1/2,0), (3,0), and (-1,0).

f^`(2) = f`(-1/3) = 0; this means that the turning points of the graph are at x = 2 and x = -1/3.

In order to determine the shape of the graph, we need to determine the sign of the leading coefficient of the cubic function f. Since there is no information given about the sign of the leading coefficient, we will assume that it is positive. If the leading coefficient is negative, the graph would be reflected about the x-axis.

The turning points are (2,0) and (-1/3,0). Since the leading coefficient is positive, the graph will be concave up between the two turning points, and concave down outside of those two points.

Therefore, there will be a local minimum at x = 2 and a local maximum at x = -1/3, with the graph passing through the x-axis at (1/2,0), (3,0), and (-1,0).

A possible sketch of the graph of f, with the x-coordinates of the turning point and all the x-intercepts clearly indicated, is shown below:

Thus, this is the explanation of drawing a possible sketch graph of f by explaining the meaning of each piece of information given to draw the graph.

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The depreciation expense of the book value for 10 years with SL method is $7,000.

Straight-Line Method (SL):

The Straight-Line Method is the most basic method and is computed by subtracting the salvage value from the original cost and dividing it by the expected useful life, plus one.

Using this method, the depreciation expense for each year is calculated as:

Depreciation Expense = (Cost - Salvage Value)/(Lifespan + 1)

For this example, the depreciation expense for each year would be calculated as:

Depreciation Expense = ($80,000 - $10,000)/(10 + 1) = $7,000

The schedule of depreciation and book value for each year would look like this:

Year Depreciation        Book Value

1             $7,000  $73,000

2             $7,000  $66,000

3             $7,000  $59,000

4             $7,000  $52,000

5             $7,000  $45,000

6             $7,000  $38,000

7             $7,000  $31,000

8             $7,000  $24,000

9             $7,000  $17,000

10             $7,000  $10,000

Sum-of-the-Years'-Digits Method (SOYD):

The Sum-of-the-Years'-Digits Method (SOYD) is another popular method of depreciation. It is computed by multiplying the asset’s original cost by the sum of the digits of the useful life and subtracting the salvage value.

Using this method, the depreciation expense for each year is calculated as:

Depreciation Expense = N×(Cost - Salvage Value)/(1+2+3+4+ … + N)

For this example, the depreciation expense for each year would be calculated as:

Depreciation Expense = N×($80,000 - $10,000)/(1+2+3+4+ … +10)

The schedule of depreciation and book value for each year would look like this:

Year Depreciation       Book Value

1     $12,819        $67,181

2     $11,301         $55,880

3     $9,784         $46,096

4     $8,266         $37,830

5     $6,749         $30,581

6     $5,231         $24,350

7     $3,714         $19,136

8     $2,196         $14,940

9     $676         $14,264

10     $138         $14,126

Double-Declining Balance Method (DDB):

The Double-Declining Balance Method is a more aggressive approach and is calculated by multiplying the asset’s book value at the start of the year by twice the applicable straight-line rate.

Using this method, the depreciation expense for each year is calculated as:

Depreciation Expense = Book Value ×(2 × Straight-Line Rate)

For this example, the depreciation expense for each year would be calculated as:

Depreciation Expense = Book Value × (2×7,000/80,000)

The schedule of depreciation and book value for each year would look like this:

Year Depreciation   Book Value

1            $14,000           $66,000

2            $11,520           $54,480

3            $8,768            $45,712

4            $5,824            $39,888

5            $3,664            $36,224

6            $1,408            $34,816

7               $0            $34,816

8               $0            $34,816

9               $0            $34,816

10               $0            $34,816

Declining Balance Method (DB):

The Declining Balance Method is a less aggressive approach and is calculated by multiplying the asset’s book value at the start of the year by the applicable straight-line rate.

Using this method, the depreciation expense for each year is calculated as:

Depreciation Expense = Book Value × (Straight-Line Rate)

For this example, the depreciation expense for each year would be calculated as:

Depreciation Expense = Book Value × (7,000/80,000)

The schedule of depreciation and book value for each year would look like this:

Year Depreciation    Book Value

1             $7,000            $73,000

2            $6,024                $66,976

3            $4,914                    $61,062

4            $3,770                $57,292

5            $2,597             $54,695

6            $1,398             $53,297

7              $0             $53,297

8              $0             $53,297

9              $0             $53,297

10              $0             $53,297

Therefore, the depreciation expense of the book value for 10 years with SL method is $7,000.

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Therefore, the pH of the resulting solution is approximately 3.04.

To determine the pH of the resulting solution, we need to consider the dissociation of HCl in water. HCl is a strong acid and completely dissociates into H+ ions and Cl- ions in water.

First, let's calculate the amount of H+ ions added to the solution. Since the initial concentration of HCl is 0.010 M and 10 mL of it is added, the amount of HCl added is:

(0.010 M) * (0.010 L) = 0.0001 moles

Since HCl dissociates completely, this means we have also added 0.0001 moles of H+ ions to the solution.

Next, let's calculate the total volume of the resulting solution. Since 10 mL of HCl is added to 100 mL of water, the total volume is:

10 mL + 100 mL = 110 mL = 0.110 L

Now, we can calculate the concentration of H+ ions in the resulting solution:

[H+] = (moles of H+) / (total volume)

= 0.0001 moles / 0.110 L

= 0.000909 M

Finally, we can calculate the pH of the solution using the equation:

pH = -log[H+]

pH = -log(0.000909)

= 3.04

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The depth of the neutral axis of the cracked section is 167.3 mm, rounded to one decimal place.

Step-by-step explanation:

To calculate the depth of the neutral axis of the cracked section, we need to do a series of calculations

To calculate the maximum bending moment

Mmax = (Wdead + Wliveload) × L^2 / 8

where Wdead is the dead load per unit length, Wliveload is the live load per unit length, and L is the span of the beam.

Wdead = 10 kN/m, Wliveload = 10 kN/m, L = 7.0 m

Substituting the given values, we get:

Mmax = (10 + 10) × (7.0[tex])^2[/tex] / 8 = 306.25 kN-m

To Calculate the area of tension steel required

A_st = Mmax / (0.95fyd)

where d is the effective depth of the section, and 0.95 is the safety factor.

We know that;

fy = 415 MPa

d = h - c - φ/2 = 300 - 40 - 12/2 = 278 mm

φ = 32 mm

Substituting the given values

A_st = [tex]306.25 * 10^6 / (0.95 * 415 * 10^6 * 278) = 2.28 * 10^-3 m^2[/tex]

To calculate the minimum area of tension steel

A_min = 0.26fybwd / fy

where bw is the width of the beam and d is the effective depth of the section.

bw = 300 mm

Substituting the given values

A_min = [tex]0.26 * 415 * 10^6 * 0.3 * 278 / (415 * 10^6) = 0.067 m^2[/tex]

Since A_st > A_min, we ca conclude that the design is safe.

To calculate the area of compression steel required

A_sc = A_st * (d - 0.5φ) / (0.87fyh)

where h is the total depth of the section it is 550 mm

Substituting the given values, we get:

A_sc = [tex]2.28 * 10^-3 * (278 - 0.5 * 32) / (0.87 * 415 * 10^6 * 550) = 0.022 * 10^-3 m^2[/tex]

Calculating the minimum area of compression steel

A_minc = 0.01bwxd / fy

where x is the depth of the compression zone. For rectangular sections, we can assume x = 0.85d.

Substituting the given values

x = 0.85 * 278 = 236.3 mm

A_minc =[tex]0.01 * 300 * 236.3 / (415 * 10^6) = 0.68 * 10^-3 m^2[/tex]

Since A_sc > A_minc, the design is safe.

Finally, to calculate the depth of the neutral axis

x = (A_st × (d - 0.5φ) - A_sc × (h - d - 0.5φ)) / (0.85bwfcd)

where fcd is the design compressive strength of concrete.

Substituting the given values

fcd = 0.67 × 21 = 14.07 MPa

x =[tex](2.28 * 10^-3 * (278 - 0.5 * 32) - 0.022 * 10^-3 * (550 - 278 - 0.5 * 20)) / (0.85 * 300 * 14.07 * 10^6) = 167.3 mm[/tex]

Therefore, the depth of the neutral axis of the cracked section is 167.3 mm, rounded to one decimal place.

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The statement shows that two symmetric matrices A and B are *congruent via a complex matrix if and only if they are congruent via a real matrix. This means that the existence of a complex matrix that transforms A into B is equivalent to the existence of a real matrix that accomplishes the same transformation. This result highlights the relationship between complex and real matrices when it comes to congruence of symmetric matrices.

To show that A and B are *congruent via a complex matrix if and only if they are congruent via a real matrix, we need to prove two implications: the forward implication and the backward implication.

1.

Forward implication:

Assume that A and B are congruent via a complex matrix. This means that there exists a complex matrix P such that PAP = B. Let's denote the real and imaginary parts of P as P = X + iY, where X and Y are real matrices.

Expanding the equation, we have

(X + iY)(A)(X + iY) = B.

By separating the real and imaginary parts, we get:

XAX + iXAY + iYAX - YAY = B.

Since A is symmetric, AX = XA and AY = YA.

Simplifying the equation, we have:

XAX - YAY + i(XAY + YAX) = B.

Now, let's consider the real matrix

Q = XAX - YAY and the real matrix

R = XAY + YAX.

The equation can be written as Q + iR = B.

Therefore, A and B are congruent via the real matrix Q + iR, which means that A and B are congruent via a real matrix.

2.

Backward implication:

Assume that A and B are congruent via a real matrix Q. This means that there exists a real matrix Q such that Q^T AQ = B.

Consider the complex matrix P = Q + i0. Since Q is real, the imaginary part of P is zero.

Now, let's compute the product PAP:

PAP = (Q + i0)(A)(Q + i0) = Q^T AQ.

Since Q^T AQ = B, we have P*AP = B.

Therefore, A and B are *congruent via the complex matrix P, which means that they are *congruent via a complex matrix.

Hence, we have shown both implications, and thus, A and B are *congruent via a complex matrix if and only if they are congruent via a real matrix.

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