Q3 Find the general solution of the second order differential equation y" - 5y +6 = 15+ 3e3+ + 10 sin z. (10 marks)

Based on the given system of differential equations this model describes a predator-prey relationship.

Based on the given system of differential equations:

dx/dt = 0.4x - 0.002x² - 0.001xy
dy/dt = 0.5y - 0.001y² - 0.004xy

This model describes a predator-prey relationship. The reason is that the interaction term (-0.001xy and -0.004xy) in both equations is negative, meaning that as one population (x or y) increases, it negatively impacts the growth rate of the other population. This type of interaction is characteristic of a predator-prey relationship, where one species feeds on the other, resulting in a decrease in the prey population and an increase in the predator population.

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There are 1470 commuters take both the bus and the subway.

To find the number of commuters who take both the bus and the subway, we can use the principle of inclusion-exclusion.

Let's denote:

A = Number of commuters who take the subway

B = Number of commuters who take the bus

N = Total number of commuters

From the given information:

A = 1190 (number of commuters who take the subway)

B = 640 (number of commuters who take the bus)

N = 1700 (total number of commuters)

We also know that 180 commuters do not take either the bus or the subway.

To find the number of commuters who take both the bus and the subway, we can use the formula:

A ∪ B = A + B - A ∩ B

where A ∪ B represents the union of A and B, and A ∩ B represents the intersection of A and B.

Substituting the values we have:

A ∪ B = 1190 + 640 - 180

A ∪ B = 1650

Therefore, 1650 commuters take either the bus or the subway (or both). To find the number of commuters who take both the bus and the subway, we subtract the number of commuters who take neither:

Number of commuters who take both the bus and the subway = A ∪ B - Neither

Number of commuters who take both the bus and the subway = 1650 - 180

Number of commuters who take both the bus and the subway = 1470

Therefore, 1470 commuters take both the bus and the subway.

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Hello !

Answer:

[tex]\boxed{\sf d=\sqrt{107}\approx10.34 }[/tex]

Step-by-step explanation:

The distance between two points A and B is given by the following formula:

[tex]\sf AB=\sqrt{(x_B-x_A)^2+(y_B-y_A)^2+(z_B-z_A)^2}[/tex]

Where [tex]\sf A(x_A,y_A,z_A)[/tex] and [tex]\sf B(x_B,y_B,z_B)[/tex].

Given :

Let's replace the coordinates with their values in the previous formula :

[tex]\sf AB=\sqrt{(0-5)^2+(3-(-6))^2+(13-12)^2}\\AB=\sqrt{25+81+1}\\\boxed{\sf AB=\sqrt{107}\approx10.34 }[/tex]

Have a nice day ;)

The volume of the given solid will be between the limits are :

-√(x - 4) ≤ y ≤ √(x - 4).

To find the volume of the given solid, we need to calculate the triple integral over the region enclosed by the surfaces. The region is defined by the curves x - y² and x - 4. By setting up and evaluating the triple integral, we can determine the volume of the solid.

The first step is to determine the bounds for the triple integral. We'll integrate with respect to x, y, and z. Looking at the region enclosed by the curves x - y² and x - 4, we need to find the limits for x, y, and z.

The curve x - y² intersects with x - 4 at two points: (4, 0) and (5, 1).

Therefore, the bounds for x are 4 ≤ x ≤ 5. The curve x - y² bounds the region from below, so for each value of x, the y-limits are given by :

-√(x - 4) ≤ y ≤ √(x - 4).

The surface z = 1 + x²y² defines the upper boundary of the solid. Thus, the z-limits are 1 + x²y² ≤ z.

Setting up the triple integral, we have:

∫∫∫ (1 + x^2y^2) dz dy dx

The innermost integral is with respect to z, and the limits for z are:

1 + x²y² ≤ z.

Moving on to the y-integration, the limits are -√(x - 4) ≤ y ≤ √(x - 4).

Finally, we integrate with respect to x, and the limits for x are 4 ≤ x ≤ 5.

Evaluating this triple integral will yield the volume of the given solid.

Complete Question:

Find the volume of the given solid. Under the surface z - 1 + x2y2 and above the region enclosed by x - y2 and x - 4 .

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The length of the side indicated by the variable is 6.59 units

To find the side indicated by the variable in the given triangle, we can use the trigonometric function cosine.

Given:

Angle = 17 degrees

Hypotenuse = 7 units

90-degree angle (right angle)

We need to find the length of one of the other sides in the triangle.

Using the cosine function:

cos(17 degrees) = adjacent side / hypotenuse

We can rearrange the formula to solve for the adjacent side:

adjacent side = hypotenuse ×cos(17 degrees)

Substituting the values into the equation:

adjacent side = 7 × cos(17 degrees)

adjacent side = 6.59

Therefore, the length of the side indicated by the variable is 6.59 units

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To solve the given system of equations we can use the method of Gaussian elimination or matrix operations to find the solution. Here, I'll use the Gaussian elimination method.

First, we'll rewrite the system in matrix form:

[A | B] =

⎡ -3 3 1 | -1 ⎤

⎢ -1 3 1 | -4 ⎥

⎢ 4 -1 3 | 9 ⎥

⎣ 1 -3 -1 | -10⎦

Performing row operations to simplify the matrix:

R2 = R2 + R1

R3 = R3 - 4R1

R4 = R4 - R1

[A | B] =

⎡ -3 3 1 | -1 ⎤

⎢ 0 6 2 | -5 ⎥

⎢ 0 -13 -1 | 13 ⎥

⎣ 0 -6 -2 | -9 ⎦

Next, perform additional row operations:

R3 = R3 + (13/6)R2

R4 = R4 + (6/13)R3

[A | B] =

⎡ -3 3 1 | -1 ⎤

⎢ 0 6 2 | -5 ⎥

⎢ 0 0 0 | 0 ⎥

⎣ 0 0 0 | 0 ⎦

From the row-echelon form of the augmented matrix, we can see that the system has dependent equations. This means there are infinite solutions.

To express the solution, we can assign a parameter to one of the variables. Let's assign w = t, where t is a real number.

The solution can be written as:

w = t

x = (2/3)t - (5/6)

y = -t + (5/6)

z = s

Here, t and s can take any real values, and the solution represents an infinite number of points in 4-dimensional space.

By performing Gaussian elimination on the augmented matrix, we simplify it to row-echelon form. From the form, we observe that the system has dependent equations, indicating infinite solutions. To express the solution, we assign a parameter to one variable and express the other variables in terms of that parameter. In this case, we assign w = t and express x, y, and z accordingly. The solution represents an infinite set of points in 4-dimensional space, parameterized by t and s.

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It will cost $300 to carpet a rectangular floor that is 10 feet by 12 feet.

The cost of carpeting a rectangular floor, we need to determine the area of the floor and multiply it by the cost per square foot.

The area of a rectangle is found by multiplying its length by its width. In this case, the length is 10 feet and the width is 12 feet.

Area = Length × Width Area

Area = 10 feet × 12 feet Area

Area = 120 square feet

Now, we can calculate the cost of carpeting by multiplying the area by the cost per square foot

Cost = Area × Cost per square foot Cost

Cost = 120 square feet × $2.50 per square foot

Cost = $300

Therefore, it will cost $300 to carpet a rectangular floor that is 10 feet by 12 feet.

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Mindy pay $ 6789 in Social Security tax if she earned $ 109,500 in 2016.

It is given that the piecewise function represents the Social Security taxes for 2016.

f(x) = { 0.062 x when 0 <  x < 111,800

     = { $ 7,621.60 when x > 111,800

We need to find Mindy's security tax if she earned  $109,500 in 2016.

Since 102,000 lies in 0 <  x < 111,800 , therefore

f(x) = 0.062 x

Put x = 109,500

f(x) = 0.062 × 109,500

= 6789

Therefore, Mindy pay $ 6789 in Social Security tax if she earned $ 109,500 in 2016.

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Given question is incomplete, the complete question is below

This piecewise function represents the Social Security taxes for 2016. How much did Mindy pay in Social Security tax if she earned $109,500 in 2016?

f(x) = { 0.062 x when 0 <  x < 111,800

     = { $ 7,621.60 when x > 111,800

The given statement "If π /2 < θ < π, then cos θ /2 < 0" is False. We are considering an angle in the second quadrant of the unit circle. In the second quadrant, the cosine function is negative, which means cos(θ/2) is also negative.

Given: π/2 < θ < π (This means θ lies in the second quadrant)

Let's consider θ/2:

θ/2 = (π/2)/2 = π/4

Now, let's evaluate cos(θ/2):

cos(π/4) = √2/2 (since cos(π/4) = √2/2)

We need to determine if cos(θ/2) is less than zero:

√2/2 > 0

Therefore, the statement "cos(θ/2) < 0" is false.

In conclusion, the statement is false because in the second quadrant, cos(θ/2) is positive, not negative.

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--The given question is incomplete, the complete question is given below " True or False? Explain your answer. If π /2 < θ < π, then cos θ /2 < 0."--

To answer your question, we first need to understand the terms "vertex" and "isomorphic". In graph theory, a vertex is a point in a graph, while isomorphic refers to the property of two graphs having the same structure, but possibly different labels or names assigned to the vertices.

Now, let's consider the statement "if we can find a vertex map under which the adjacency matrices are unequal, then the graphs are not isomorphic." This statement is actually true. If we have two graphs, G and H, and we can find a vertex map between them such that the adjacency matrices are not equal, then we can conclude that G and H are not isomorphic.
This is because the adjacency matrix is a representation of the structure of a graph, where the rows and columns correspond to the vertices of the graph. If the adjacency matrices of two graphs are not equal, it means that the two graphs have different structures and therefore cannot be isomorphic.
In conclusion, if we can find a vertex map under which the adjacency matrices are unequal, then the graphs are not isomorphic. It's important to note that this statement only applies to simple graphs (graphs without loops or multiple edges), as the adjacency matrix of a graph with loops or multiple edges can be different even if the graphs have the same structure. Additionally, it's worth mentioning that the converse of this statement is not necessarily true – just because two graphs have equal adjacency matrices doesn't mean they are isomorphic.

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A parameterization of the sphere of radius 2 centered at the origin that lies in the first octant and outside of the cylinder x^2 + y^2 = 1 is: x = 2sinθcosϕ, y = 2sinθsinϕ, z = 2cosθ where θ ranges from 0 to π/2 and ϕ ranges from 0 to π/2.

The parameterization given is in spherical coordinates. In this parameterization, θ represents the polar angle measured from the positive z-axis (ranging from 0 to π/2), and ϕ represents the azimuthal angle measured from the positive x-axis (ranging from 0 to π/2).

For the given parameterization, when θ and ϕ are restricted to the specified ranges, the resulting points lie in the first octant (x, y, and z are all positive). Additionally, the points lie on the surface of the sphere of radius 2 centered at the origin. This is because the x, y, and z coordinates are determined by the trigonometric functions of θ and ϕ, scaled by the radius 2.

By restricting ϕ to the range from 0 to π/2, we ensure that the points lie outside of the cylinder x^2 + y^2 = 1, which represents a cylinder of radius 1 centered along the z-axis. This restriction ensures that the points lie in the first octant and do not intersect the cylinder.

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Out of the 42 students, 22 take history, 17 take biology, and 8 take both history and biology. Therefore, there are 11 students who take neither biology nor history.

To find the number of students who take neither biology nor history, we need to subtract the number of students who take at least one of these subjects from the total number of students in the group.

Let's break down the information given:

Total number of students (n) = 42

Number of students taking history (H) = 22

Number of students taking biology (B) = 17

Number of students taking both history and biology (H ∩ B) = 8

To find the number of students who take at least one of these subjects, we can use the principle of inclusion-exclusion. The formula for the principle of inclusion-exclusion is:

n(A ∪ B) = n(A) + n(B) - n(A ∩ B)

In this case, A represents the set of students taking history, and B represents the set of students taking biology.

Using the formula, we can calculate the number of students taking at least one of these subjects:

n(H ∪ B) = n(H) + n(B) - n(H ∩ B)

= 22 + 17 - 8

= 31

Therefore, there are 31 students who take either history or biology or both.

To find the number of students who take neither biology nor history, we subtract this value from the total number of students:

Number of students taking neither biology nor history = Total number of students - Number of students taking at least one of the subjects

= 42 - 31

= 11

Hence, there are 11 students who take neither biology nor history.

In summary, out of the 42 students, 22 take history, 17 take biology, and 8 take both history and biology. Therefore, there are 11 students who take neither biology nor history.

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(a) The equilibria of the model can be found by setting dp/dt = 0 and solving for p. From the given differential equation, we have cp(1-p) - ep = 0. Rearranging this equation, we get cp - cp^2 - ep = 0. Factoring out p, we have p(cp - cp - e) = 0. Simplifying further, we find that the equilibria are p = 0 and p = (c - e)/c.

(b) To ensure that the nonzero equilibrium p = (c - e)/c lies between 0 and 1, we need the fraction to be positive and less than 1. This implies that c - e > 0 and c > e.

(c) The conditions for the nonzero equilibrium to be locally stable depend on the sign of the derivative dp/dt at that equilibrium. Taking the derivative dp/dt and evaluating it at p = (c - e)/c, we find dp/dt = (c - e)(1 - (c - e)/c) - e = (c - e)(e/c). For the equilibrium to be locally stable, we require dp/dt < 0. Therefore, the condition for local stability is (c - e)(e/c) < 0, which can be simplified to e < c.

In conclusion, the equilibria of the Levins model are p = 0 and p = (c - e)/c. The nonzero equilibrium lies between 0 and 1 when c > e, and it is locally stable when e < c.

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The volume of the solid region enclosed by the surface rho = 12 cos φ.

A. 288π

To find the volume of the solid region enclosed by the surface ρ = 12 cos φ in spherical coordinates, we integrate ρ^2 sin φ dρ dφ dθ over the appropriate ranges.

The range of φ is from 0 to π/2, and the range of θ is from 0 to 2π.

Setting up the integral, we have:

V = ∭ ρ^2 sin φ dρ dφ dθ

V = ∫[0, 2π] ∫[0, π/2] ∫[0, 12cosφ] (ρ^2 sin φ) dρ dφ dθ

Let's evaluate the integral step by step:

∫ ρ^2 sin φ dρ = (ρ^3 / 3) ∣[0, 12cosφ] = (12^3 cos^3 φ / 3) - (0^3 / 3) = (12^3 cos^3 φ / 3)

∫ (12^3 cos^3 φ / 3) dφ = (12^3 / 3) ∫ cos^3 φ dφ = (12^3 / 3) * (3/4) = 12^3 / 4

Now, we integrate with respect to θ:

∫ (12^3 / 4) dθ = (12^3 / 4) θ ∣[0, 2π] = (12^3 / 4) * 2π = 12^3 π / 2

Therefore, the volume of the solid region enclosed by the surface ρ = 12 cos φ is 12^3 π / 2.

Simplifying this expression, we get:

Volume = 12^3 π / 2 = 1728π / 2 = 864π

Therefore, the correct option is A. 288π.

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The task is to identify the graph that represents a binomial distribution with n = 20 (number of trials) and p = 0.25 (probability of success).

In a binomial distribution, the number of trials (n) and the probability of success (p) are crucial factors. A binomial distribution is characterized by discrete values and a specific shape. The probability mass function (PMF) for a binomial distribution follows the formula P(X=k) = (n choose k) * p^k * (1-p)^(n-k), where X represents the random variable and k represents the number of successes. To determine the correct graph, we should look for the following characteristics: the distribution should be discrete, have 20 possible values (n = 20), and the probability of success for each trial should be 0.25 (p = 0.25). By examining the provided graphs, we can identify the one that aligns with these criteria to represent a binomial distribution with n = 20 and p = 0.25.

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The line integral ∫[(r+2y)dr + (r - y)dy] along the curve C, defined by r = (2cos(t), 4sin(t)), where 0 ≤ t ≤ π/4, evaluates to π.



To evaluate the line integral ∫[(r+2y)dr + (r - y)dy] along the curve C given by r = (2cos(t), 4sin(t)), where 0 ≤ t ≤ π/4, we need to parameterize the curve and then integrate the given expression.

Let's start by expressing x and y in terms of t:

x = 2cos(t)

y = 4sin(t)

Now, let's find the differentials dx and dy:

dx = -2sin(t)dt

dy = 4cos(t)dt

Substituting these values into the line integral, we get:

∫[(r+2y)dr + (r - y)dy] = ∫[(2cos(t) + 2(4sin(t)))(-2sin(t)dt) + (2cos(t) - 4sin(t))(4cos(t)dt)]

Simplifying the expression, we have:

∫[(-4sin(t)cos(t) + 8sin^2(t) - 8sin(t)cos(t) + 8cos^2(t))dt]

= ∫[8(cos^2(t) - sin(t)cos(t) + sin^2(t))dt]

= ∫[8dt]

= 8t

Now, we evaluate the integral from t = 0 to t = π/4:

∫[8t] = [4t^2] evaluated from 0 to π/4

= 4(π/4)^2 - 4(0)^2

= π

Therefore, the value of the line integral along the curve C is π.

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The values of x where the tangent line to the graph of the function y = x^3 - 12x + 2 is horizontal are x = 2 and x = -2.

To find the values of x where the tangent line to the graph of the function y = x^3 - 12x + 2 is horizontal, we need to find the points on the graph where the derivative of the function is equal to zero.

First, let's find the derivative of the function with respect to x:

dy/dx = 3x^2 - 12

Next, set the derivative equal to zero and solve for x:

3x^2 - 12 = 0

Divide both sides of the equation by 3:

x^2 - 4 = 0

Factor the quadratic equation:

(x - 2)(x + 2) = 0

Setting each factor equal to zero:

x - 2 = 0 or x + 2 = 0

Solving for x:

x = 2 or x = -2

Therefore, the values of x where the tangent line to the graph of the function is horizontal are x = 2 and x = -2.

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One can have 90% confidence that the interval from the lower bound (0.021) to the upper bound (0.033) actually contains the true value of the population proportion of adverse reactions. Option C is correct.

To construct the confidence interval for the proportion of adverse reactions, we will use the sample data and the provided confidence level of 90%.

a) The best point estimate of the population proportion p is the sample proportion of adverse reactions. We calculate it by dividing the number of patients who developed adverse reactions (130) by the total number of patients treated with the drug (4731):

p = 130 / 4731 ≈ 0.027

b) The margin of error (E) can be calculated using the formula:

[tex]E = z\times \sqrt{\dfrac{\hat p \times (1 - \hat p) }{ n}}[/tex]

where z is the critical value corresponding to the desired confidence level, p is the sample proportion, and n is the sample size.

Since the confidence level is 90%, we need to find the critical value associated with a 95% confidence level (since it's a two-tailed test). This critical value is approximately 1.645.

[tex]E = 1.645 \times \sqrt{\dfrac{(0.027 \times (1 - 0.027) }{ 4731}} \\E =0.006[/tex]

c) To construct the confidence interval, we use the formula:

Confidence interval = p ± E

Substituting the values, we get:

Confidence interval = 0.027 ± 0.006

The lower bound of the confidence interval is obtained by subtracting the margin of error from the point estimate:

Lower bound = 0.027 - 0.006 ≈ 0.021 (rounded to three decimal places)

The upper bound of the confidence interval is obtained by adding the margin of error to the point estimate:

Upper bound = 0.027 + 0.006 ≈ 0.033 (rounded to three decimal places)

Therefore, the 90% confidence interval for the proportion of adverse reactions is approximately 0.021 to 0.033.

d) The correct interpretation of the confidence interval is:

One can have 90% confidence that the interval from the lower bound (0.021) to the upper bound (0.033) actually contains the true value of the population proportion of adverse reactions." (Option C)

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The area enclosed by one loop of the curve r = 3 cos(5θ) is (9π/2).

To find the area of the region enclosed by one loop of the polar curve r = 3 cos(5θ), we can use the formula for the area bounded by a polar curve:

A = (1/2) ∫[θ1, θ2] (r^2) dθ

In this case, we need to find the values of θ1 and θ2 that correspond to one complete loop of the curve. The curve r = 3 cos(5θ) completes one loop when θ goes from 0 to 2π.

So, we have:

θ1 = 0

θ2 = 2π

Now, we can calculate the area:

A = (1/2) ∫[0, 2π] (3 cos(5θ))^2 dθ

Simplifying the integral:

A = (1/2) ∫[0, 2π] 9 cos^2(5θ) dθ

Using the identity cos^2(θ) = (1/2)(1 + cos(2θ)), we have:

A = (1/2) ∫[0, 2π] 9 * (1/2)(1 + cos(10θ)) dθ

Simplifying further:

A = (9/4) ∫[0, 2π] (1 + cos(10θ)) dθ

Integrating:

A = (9/4) [θ + (1/10)sin(10θ)] evaluated from 0 to 2π

Evaluating the definite integral at the limits:

A = (9/4) [2π + (1/10)sin(20π) - (1/10)sin(0)]

Since sin(0) = sin(20π) = 0, the equation simplifies to:

A = (9/4) * 2π

Simplifying further:

A = 9π/2

Therefore, the area enclosed by one loop of the curve r = 3 cos(5θ) is (9π/2).

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The angle between [tex]\(\vec{a}\) and \(\vec{b}\) is \(60^\circ\).[/tex]

To find the angle between two vectors[tex]\(\vec{a}\) and \(\vec{b}\)[/tex], we can use the dot product formula:

[tex]\(\vec{a} \cdot \vec{b} = |\vec{a}| |\vec{b}| \cos(\theta)\),[/tex]

where [tex]\(|\vec{a}|\) and \(|\vec{b}|\)[/tex] are the magnitudes of the vectors and[tex]\(\theta\)[/tex]is the angle between them.

Given that [tex]\(\vec{a} \cdot \vec{b} = \sqrt{3}\),[/tex] we can rewrite the equation as:

[tex]\(\sqrt{3} = |\vec{a}| |\vec{b}| \cos(\theta)\).[/tex]

We are also given that [tex]\(\vec{a} \times \vec{b} = \langle 1, 2, 2 \rangle\),[/tex]which represents the cross product of the vectors.

The magnitude of the cross product is given by:

[tex]\(|\vec{a} \times \vec{b}| = |\vec{a}| |\vec{b}| \sin(\theta)\).[/tex]

Substituting the given values, we have:

[tex]\(|\vec{a} \times \vec{b}| = |\vec{a}| |\vec{b}| \sin(\theta) = |\langle 1, 2, 2 \rangle| = \sqrt{1^2 + 2^2 + 2^2} = \sqrt{9} = 3\).[/tex]

We can rearrange the equation to solve for [tex]\(|\vec{a}| |\vec{b}| \sin(\theta)\):\(3 = |\vec{a}| |\vec{b}| \sin(\theta)\).[/tex]

Now, we have two equations:

[tex]\(\sqrt{3} = |\vec{a}| |\vec{b}| \cos(\theta)\),\(3 = |\vec{a}| |\vec{b}| \sin(\theta)\).[/tex]

To eliminate the magnitudes [tex]\(|\vec{a}|\) and \(|\vec{b}|\)[/tex], we can square both equations and add them together:

[tex]\((\sqrt{3})^2 + 3^2 = (|\vec{a}| |\vec{b}|)^2 (\cos^2(\theta) + \sin^2(\theta))\)[/tex].

Simplifying, we get:

[tex]\(3 + 9 = (|\vec{a}| |\vec{b}|)^2\).\(12 = (|\vec{a}| |\vec{b}|)^2\).[/tex]

Taking the square root of both sides:

[tex]\(\sqrt{12} = |\vec{a}| |\vec{b}|\).\(\sqrt{12} = |\vec{a}| |\vec{b}| = |\vec{a}| |\vec{b}| \sqrt{\cos^2(\theta) + \sin^2(\theta)}\).[/tex]

Since [tex]\(\cos^2(\theta) + \sin^2(\theta) = 1\)[/tex], we have:

[tex]\(\sqrt{12} = |\vec{a}| |\vec{b}| \cdot 1\).\(\sqrt{12} = |\vec{a}| |\vec{b}|\).[/tex]

Now, we can substitute this back into the first equation:

[tex]\(\sqrt{3} = \sqrt{12} \cos(\theta)\).[/tex]

Simplifying, we get:

[tex]\(\cos(\theta) = \frac{\sqrt{3}}{\sqrt{12}} = \frac{\sqrt{3}}{2\sqrt{3}} = \frac{1}{2}\).[/tex]

To find the angle [tex]\(\theta\)[/tex], we take the inverse cosine (

arc cosine) of [tex]\(\frac{1}{2}\):[/tex]

[tex]\(\theta = \cos^{-1}\left(\frac{1}{2}\right)\).[/tex]

Using the unit circle or trigonometric identities, we find that[tex]\(\theta = \frac{\pi}{3}\) or \(60^\circ\).[/tex]

Therefore, the angle between [tex]\(\vec{a}\) and \(\vec{b}\) is \(60^\circ\).[/tex]

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Answer: Harry

Step-by-step explanation:

Because 1/4 is less than 1/2 and 3/4

The probability that Evie will be chosen for the committee is 0.21.

Given that, a committee of three people is to be chosen from a group of 14 people.

We know that, probability of an event = Number of favorable outcomes/Total number of outcomes.

Here, number of favorable outcomes = 3

Total number of outcomes = 14

Now, probability of an event = 3/14

= 0.21

Therefore, the probability that Evie will be chosen for the committee is 0.21.

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The asymptotes of the hyperbola are y = -2 + (2/9) * (x - 2) and y = -2 - (2/9) * (x - 2).

To identify the asymptotes of the hyperbola with equation (x - 2)² / 81 - (y + 2) ² / 4 = 1 / 4 = 1, we can examine the standard form of a hyperbola equation:

[(x - h) ² / a ²] - [(y - k) ² / b ²] = 1

The asymptotes of a hyperbola can be determined using the formulas:

y = k ± (b / a) * (x - h)

Comparing the given equation to the standard form, we have:

h = 2, k = -2, a ² = 81, b ² = 4

Calculating the values:

a = √81 = 9

b = √4 = 2

Substituting these values into the formula for the asymptotes:

y = -2 ± (2 / 9) * (x - 2)

Therefore, the asymptotes of the hyperbola are given by the equations:

y = -2 + (2 / 9) * (x - 2)

y = -2 - (2 / 9) * (x - 2)

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The limit as a definite integral is ∫[1 to 3][tex]x^8[/tex] dx.

To express the limit as a definite integral, we can use the Riemann sum approximation. Given the hint to consider the function f(x) = x^8, we can rewrite the limit as follows:

lim n→∞ Σ [i=1 to n] [tex](3i/n)^8[/tex]

This is a Riemann sum approximation for the integral of f(x) =[tex]x^8[/tex] over the interval [1, 3]. To express it as a definite integral, we can rewrite it as:

∫[1 to 3] [tex]x^8[/tex] dx

So, the limit can be expressed as the definite integral ∫[1 to 3] [tex]x^8[/tex] dx.

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The solution to the given initial-value problem, expressed as an elementary function, is y(x) = 9 - 72x - 72x².

To solve the initial-value problem y'' − 2xy' + 8y = 0 with initial conditions y(0) = 9 and y'(0) = 0 using the power series method, we can assume a power series solution of the form y(x) = ∑(n=0 to ∞) aₙxⁿ. Differentiating twice, we obtain y'' = ∑(n=0 to ∞) aₙn(n-1)xⁿ⁻² and y' = ∑(n=0 to ∞) aₙnxⁿ⁻¹. Substituting these expressions into the given differential equation and equating coefficients of like powers of x, we can derive a recurrence relation to determine the coefficients aₙ.

In the first paragraph, the summary of the answer is as follows:

By substituting the power series solution y(x) = ∑(n=0 to ∞) aₙxⁿ into the differential equation and equating coefficients, we obtain a recurrence relation for the coefficients aₙ. Solving this recurrence relation, we can determine the values of the coefficients aₙ and express the solution y(x) as an elementary function.

In the second paragraph, the explanation of the answer is provided:

Substituting the power series solution into the differential equation, we have:

∑(n=0 to ∞) aₙn(n-1)xⁿ⁻² - 2x ∑(n=0 to ∞) aₙnxⁿ⁻¹ + 8 ∑(n=0 to ∞) aₙxⁿ = 0.

Expanding the series and re-indexing the terms, we obtain:

a₀(0(-1)x⁻² + 8x⁰) + a₁(1(0)x⁻¹ - 2x¹ + 8x¹) + a₂(2(1)x⁰ - 2(1)x² + 8x²) + ∑(n=3 to ∞) (aₙn(n-1)xⁿ⁻² - 2aₙnxⁿ⁻¹ + 8aₙxⁿ) = 0.

Simplifying, we have:

8a₀ + a₁ + (2a₂ - 2a₀)x + ∑(n=3 to ∞) [(aₙn(n-1) - 2aₙn + 8aₙ)xⁿ] = 0.

To satisfy this equation, each coefficient of xⁿ must be zero. Therefore, we obtain a recurrence relation for the coefficients:

8a₀ + a₁ = 0,

2a₂ - 2a₀ = 0,

aₙn(n-1) - 2aₙn + 8aₙ = 0 for n ≥ 3.

Using the initial conditions y(0) = 9 and y'(0) = 0, we can determine the values of a₀ and a₁ as 9 and -72, respectively. Solving the recurrence relation, we find that a₂ = -72 and aₙ = 0 for n ≥ 3.

Therefore, the power series solution to the initial-value problem is:

y(x) = 9 - 72x - 72x².

Hence, the solution to the given initial-value problem, expressed as an elementary function, is y(x) = 9 - 72x - 72x².

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To estimate the position of the object at time t = 2.2 using a linear approximation, we can use the slope of the line connecting the two closest known points, which are (t, u(t)) = (2, 55) and (t, u(t)) = (5, 6).

The slope of the line is given by:

m = (u(t₂) - u(t₁)) / (t₂ - t₁)

Substituting the values:

m = (6 - 55) / (5 - 2) = -49 / 3

Now, we can use the point-slope form of a line to find the equation of the line:

u(t) - u(t₁) = m(t - t₁)

Substituting the values:

u(t) - 55 = (-49/3)(t - 2)

Now, we can substitute t = 2.2 into the equation to estimate the position of the object:

u(2.2) - 55 = (-49/3)(2.2 - 2)

Simplifying:

u(2.2) - 55 = (-49/3)(0.2)

u(2.2) - 55 = -49/15

To find the estimated position of the object at t = 2.2, we add the value to the initial position at t = 2:

u(2.2) = -49/15 + 55

Calculating the result:

u(2.2) ≈ 53.733

Therefore, the estimated position of the object at t = 2.2 is approximately 53.733 kilometers.

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The calculated value of the total interest is 12479.04

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

25998 x .08 x 6

In the above equation, we have

Principal = 25998

Rate of interest = 0.08

Time = 6

using the above as a guide, we have the following:

Total interest = 25998 x .08 x 6

Evaluate

Total interest = 12479.04

Hence, the total interest is 12479.04

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To calculate the margin of error, you need to determine the critical value associated with the desired level of confidence. The margin of error is then obtained by multiplying the critical value by the standard deviation.

Let's assume you want to calculate the margin of error for a 95% confidence level. For a normal distribution, the critical value corresponding to a 95% confidence level is approximately 1.96.

Margin of Error = Critical Value * Standard Deviation

Using the given values:

Standard Deviation = 0.08

For a 95% confidence level:

Critical Value = 1.96

Margin of Error = 1.96 * 0.08

Calculating the margin of error:

Margin of Error = 0.1568

Therefore, the margin of error is approximately 0.1568

The probability  of less than 15 questions in a randomly chosen maths test is 2.28%, rounded to two decimal places.

According to the empirical rule,

68% of the data falls within one standard deviation of the mean,

95% falls within two standard deviations of the mean,

And 99.7% falls within three standard deviations of the mean.

Since we want to find the probability of a math exam having fewer than 15 questions,

Which is more than one standard deviation below the mean,

we have to find the proportion of the data that falls outside of one standard deviation below the mean.

To do this, we first need to standardize the value of 15 using the formula ⇒ z = (x - mu) / sigma,

where x is the value we want to standardize,

mu is the mean, and sigma is the standard deviation.

In this case,

⇒ z = (15 - 20) / 2.5

       = -2.

Now, we can look up the proportion of data that falls beyond two standard deviations below the mean in a standard normal distribution table.

This is equivalent to finding the area to the left of z = -2,

which is approximately 0.0228.

Therefore, the probability of a randomly selected math exam having fewer than 15 questions is  2.28%, rounded to two decimal places.

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If it is 3:25 p.m. in the Philippines, the corresponding time in Cairo, Egypt, accounting for the time difference of -6 hours, would be 3:25 a.m. in the next day.

To find the time in Cairo, Egypt, we need to consider the time difference between Cairo and the Philippines. The given time difference is -6 hours. The negative sign indicates that Cairo is ahead of the Philippines in terms of time.

The given time in the Philippines is 3:25 p.m. To convert it to a 24-hour format, we add 12 hours to the time since 3:25 p.m. is in the afternoon. Therefore, 3:25 p.m. becomes 15:25.

Since the time difference is -6 hours, we need to subtract 6 hours from the time in the Philippines (15:25).

15:25 - 6:00 = 9:25

Therefore, the adjusted time in the Philippines, considering the time difference, is 9:25 p.m.

Now that we have the adjusted time in the Philippines, we can find the time in Cairo by adding the time difference to the adjusted time in the Philippines.

9:25 p.m. + (-6 hours) = 3:25 a.m.

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