que es la regla de los signos​

Answer:

Given:

A + B + C = π

To Prove:

cos2A + cos2B + cos2C = 1 - 2sinAsinBsinC

Solution:

1. Using the identity cos2A = 1 - 2sin2A,

we can expand cos2A + cos2B + cos2C as follows:

=cos2A + cos2B + cos2C

=(1 - 2sin2A) + (1 - 2sin2B) + (1 - 2sin2C)

=3 - 2(sin2A + sin2B + sin2C)

2. Using the identity sin2A + sin2B + sin2C = 1 - 2sinAsinB, we can simplify the expanded expression as follows:

=3 - 2(sin2A + sin2B + sin2C)

=3 - 2(1 - 2sinAsinB)

=3 - 2 + 4sinAsinB

=1 + 2sinAsinB

3. Simplifying the resulting expression to obtain 1 - 2sinAsinBsinC:

=1 + 2sinAsinB

=1 - 2(1 - sinAsinB)

=1 - 2(1 - 2sinAsinBcosC)

=1 - 2 + 4sinAsinBcosC

=1 - 2sinAsinBsinC

Therefore, we have proven that:

cos2A + cos2B + cos2C = 1 - 2sinAsinBsinC.

The correct answer to the question ,The United States paid Russia approximately $7,198,000 for Alaska.

In 1867, the United States purchased Alaska from Russia.

Alaska is about 5.9 × 105 square miles. The United States paid about $12.20 per square mile.

Approximately how much did the United States pay Russia for Alaska?

The United States paid Russia approximately $7,198,000 for Alaska.

Steps to answer the question:

1. The expression is: (5.9 × 105)(12.2) or (5.9 × 105) X (12.2)

2. Multiply the decimal values:≈ 71,980,0003.

Write in scientific notation:≈ 7.198 × 107

The United States paid Russia approximately $7,198,000 for Alaska.

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Answer: 1650

Step-by-step explanation:

(7.5*11*2.5) / .5^3

1650

The word "and" indicates that both statements must be true for the Compound statement to be true.

(a) To combine the statements p and q using the word "or," we can create the compound statement: "The total angles of a pie chart is 180 or 360."

(b) To combine the statements p and q using the word "and," we can create the compound statement: "1 is a perfect square and a perfect cube."

(c) To combine the statements p and q using the word "or," we can create the compound statement: "2x + 3 = 1 is a linear equation or 3x + 5 is a linear equation."

In compound statements, the word "or" indicates that either one or both statements can be true, while the word "and" indicates that both statements must be true for the compound statement to be true.

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The average rate of change is 1/2.

Graph is a mathematical representation of a network and it describes the relationship between lines and points.

From the graph attachment :

We have the information from the graph is:

[tex]x_1=0\\\\x_2=4\\\\f(x_1)=6\\\\f(x_2)=8[/tex]

We have to find the average rate of change.

Now, According to the question:

In order to find the average rate of change, use the following formula:

[tex]m =\frac{f(x_2)-f(x_1)}{x_2-x_1}[/tex]

Plug all the values in above formula :

[tex]m = \frac{8-6}{4-0}\\ \\m = \frac{2}{4}\\ \\m = \frac{1}{2}[/tex]

Hence, The average rate of change is 1/2.

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The expression is divisible by both 7 and 19, it is divisible by 133.

To prove that if n is a positive integer, then 133 divides 11^n + 122^(n-1), we need to show that the expression is divisible by 133. Note that 133 = 7 * 19. Let's check for divisibility by both 7 and 19.

Using modular arithmetic, consider the expression mod 7 and mod 19:
11^n (mod 7) ≡ (-3)^n (mod 7) and 122^(n-1) (mod 7) ≡ (-2)^(n-1) (mod 7).
11^n + 122^(n-1) (mod 7) ≡ (-3)^n + (-2)^(n-1) (mod 7).

Since both terms are congruent to 1 (mod 7) for all n, the sum is divisible by 7.

Similarly, 11^n (mod 19) ≡ (-8)^n (mod 19) and 122^(n-1) (mod 19) ≡ 9^(n-1) (mod 19).
11^n + 122^(n-1) (mod 19) ≡ (-8)^n + 9^(n-1) (mod 19).

Both terms are congruent to 1 (mod 19) for all n, so the sum is divisible by 19.
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11ⁿ • 122ⁿ⁻¹ can be expressed as the product of 133 and another integer. Therefore, we have proven that if n is a positive integer, then 133 divides 11ⁿ • 122ⁿ⁻¹.

To prove that 133 divides 11ⁿ • 122ⁿ⁻¹, it should be shown that there exists an integer k such that 11ⁿ • 122ⁿ⁻¹ = 133k.

Let's start by factoring the expression 11ⁿ • 122ⁿ⁻¹:

11ⁿ • 122ⁿ⁻¹ = (11 • 122)n² - 1

Now, rewrite 11 • 122 as 133 + 11:

(133 + 11)n² - 1

Expanding the expression, we get:

133n² + 11n² - 1

Now, rewrite 133n² as (133n)(n):

(133n)(n) + 11n² - 1

This expression can be further simplified as:

133n² + 11n² - 1 = (133n² + 11n²) - 1 = 144n² - 1

Now, let's focus on 144n² - 1. Notice that 144 = 11 • 13 + 1:

144n² - 1 = (11 • 13 + 1)n² - 1 = 11 • 13n² + n² - 1

Rearranging the terms, we get:

11 • 13n² + n² - 1 = 11(13n²) + (n² - 1)

The expression n² - 1 can be factored as (n - 1)(n + 1):

11(13n²) + (n² - 1) = 11(13n²) + (n - 1)(n + 1)

Now, we have an expression of the form 11 • (something) + (n - 1)(n + 1). We can see that (n - 1)(n + 1) represents the product of two consecutive integers, which means one of them must be even.

Let's consider two cases:

1. If n is even, then n = 2k for some integer k. Substituting this into the expression, we get:

11(13(2k)²) + ((2k) - 1)((2k) + 1)

Simplifying further:

11(13(4k²)) + (4k² - 1) = 572k² + 4k² - 1 = 576k² - 1

Now, we have an expression of the form 576k² - 1, which can be factored as (24k)² - 1²:

576k² - 1 = (24k)² - 1²

This is a difference of squares, which can be further factored as (24k - 1)(24k + 1). Therefore, we have expressed the original expression as a product of 133 and another integer (24k - 1)(24k + 1), which shows that 133 divides 11ⁿ • 122ⁿ⁻¹ when n is even.

2. If n is odd, then n = 2k + 1 for some integer k. Substituting this into the expression, we get:

11(13(2k + 1)²) + ((2k + 1) - 1)((2k + 1) + 1)

Simplifying further:

11(13(4k² + 4k + 1)) + (4k² + 2k) = 572k² + 572k + 143 + 4k² + 2k

Combining like terms:

576k² + 574k + 143

Now, we need to show that 576k² + 574k + 143 is divisible by 133. Let's express 133 as 11 • 12 + 1:

576k² + 574k + 143 = 11 • 12 • k² + 11 • 12 • k + 143

Now, we can rewrite 11 • 12 as 132 + 11:

11 • 12 • k² + 11 • 12 • k + 143 = (132 + 11)k² + (132 + 11)k + 143

Expanding the expression, we get:

132k² + 11k + 132k + 11k + 143

Combining like terms:

132k² + 264k + 143

Now, notice that 132k² + 264k is divisible by 132:

132k² + 264k = 132(k² + 2k)

Therefore:

132k² + 264k + 143 = 132(k² + 2k) + 143

We can express 143 as 132 + 11:

132(k² + 2k) + 143 = 132(k² + 2k) + (132 + 11)

Expanding the expression:

132k² + 264k + 132 + 11

Combining like terms:

132k² + 264k + 143

We have arrived at the original expression, which means that 576k² + 574k + 143 is divisible by 133 when n is odd.

In both cases, we have shown that 11n • 122ⁿ⁻¹ can be expressed as the product of 133 and another integer. Therefore, we have proven that if n is a positive integer, then 133 divides 11ⁿ • 122ⁿ⁻¹.

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The area of the region bounded above by y = 3x and below by y = 9x^2 is 270 square units.

To use Green's Theorem to calculate the area of the region bounded above by y = 3x and below by y = 9x^2, we need to first find a vector field whose divergence is 1 over the region.

Let F = (-y/2, x/2). Then, ∂F/∂x = 1/2 and ∂F/∂y = -1/2, so div F = ∂(∂F/∂x)/∂x + ∂(∂F/∂y)/∂y = 1/2 - 1/2 = 0.

By Green's Theorem, we have:

∬R dA = ∮C F · dr

where R is the region bounded by y = 3x, y = 9x^2, and the lines x = 0 and x = 6, and C is the positively oriented boundary of R.

We can parameterize C as r(t) = (t, 3t) for 0 ≤ t ≤ 6 and r(t) = (t, 9t^2) for 6 ≤ t ≤ 0. Then,

∮C F · dr = ∫0^6 F(r(t)) · r'(t) dt + ∫6^0 F(r(t)) · r'(t) dt

= ∫0^6 (-3t/2, t/2) · (1, 3) dt + ∫6^0 (-9t^2/2, t/2) · (1, 18t) dt

= ∫0^6 (-9t/2 + 3t/2) dt + ∫6^0 (-9t^2/2 + 9t^2) dt

= ∫0^6 -3t dt + ∫6^0 9t^2/2 dt

= [-3t^2/2]0^6 + [3t^3/2]6^0

= -54 + 324

= 270.

Therefore, the area of the region bounded above by y = 3x and below by y = 9x^2 is 270 square units.

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The optimal consumption vector and the minimum expenditures necessary to reach a utility of U =50 is $25.

The consumer can reach a maximum utility of 12.5 with an income of $20.

I. Expenditure minimization problem:

To find the optimal consumption vector and minimum expenditure, we use the Lagrangian function:

L = x y + λ(I – Px x – Py y)

Where λ is the Lagrange multiplier and I is the income of the consumer.

Taking the partial derivative of L with respect to x and y and equating them to zero, we get:

y/2λ = Px

x/2λ = Py

Solving for x and y, we get:

x = 2λPy and y = 2λPx

Substituting these values in the budget constraint, we get:

I = Px(2λPy) + Py(2λPx)

I = 4λPxPy

λ = I/(4PxPy) = 20/(412) = 2.5

Thus, the optimal consumption vector is (x,y) = (5,10) and the minimum expenditure necessary to reach a utility of U=50 is:

Expenditure = Px x + Py y = 1(5) + 2(10) = $25

II. Utility maximization problem:

To find the optimal consumption vector and maximum utility, we use the Lagrangian function:

L = x y + λ(I – Px x – Py y)

Taking the partial derivative of L with respect to x and y and equating them to zero, we get:

y/2λ = Px

x/2λ = Py

Substituting the values of Px, Py, I, and λ, we get:

x = 2λPy = 2.5(2) = 5

y = 2λPx = 2.5(1) = 2.5

Thus, the optimal consumption vector is (x,y) = (5,2.5) and the maximum utility the consumer can reach is:

U = xy = 5(2.5) = 12.5

Therefore, the consumer can reach a maximum utility of 12.5 with an income of $20.

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The optimal consumption bundle is (10, 2.5). The minimum expenditures necessary to reach a utility of U = 50 are 15.

I. To solve the expenditure minimization problem, we need to find the optimal consumption bundle that will allow the consumer to achieve a utility level of U = 50 while minimizing their total expenditures. The consumer's budget constraint is given by Pxx + Pyy = I, where Px and Py are the prices of x and y, respectively, and I is the consumer's income.

Using the utility function U = xy, we can rewrite the budget constraint as y = (I/Px) - (Px/Py)x. Substituting this equation into the utility function, we get U = x((I/Px) - (Px/Py)*x). Taking the derivative of U with respect to x and setting it equal to zero, we can find the optimal value of x:

dU/dx = (I/Px) - (2/Py)x = 0

x = (PyI)/(2*Px)

Substituting this value of x into the budget constraint, we can find the optimal value of y:

y = (I/Px) - (Px/Py)x

y = (I/Py) - (Px/Py)((PyI)/(2Px))

y = I/(2*Py)

So, the optimal consumption bundle is (x*, y*) = ((PyI)/(2Px), I/(2Py)) = (10, 2.5). The minimum expenditures necessary to reach a utility of U = 50 are Pxx* + Pyy = 110 + 22.5 = 15.

II. To solve the utility maximization problem, we need to find the optimal consumption bundle that will allow the consumer to maximize their utility level given their budget constraint. Using the same budget constraint as before, we can rewrite it as y = (I/Px) - (Px/Py)*x.

The Lagrangian function for this problem is L = xy + λ(I - Pxx - Pyy), where λ is the Lagrange multiplier. Taking the partial derivatives of L with respect to x, y, and λ and setting them equal to zero, we can find the optimal consumption bundle:

∂L/∂x = y - λPx = 0

∂L/∂y = x - λPy = 0

∂L/∂λ = I - Pxx - Pyy = 0

Solving these equations simultaneously, we get:

x = (PyI)/(2Px)

y = (I/Px) - (Px/Py)x

y = (I/Px) - (Px/Py)((PyI)/(2Px))

y = I/(2*Px)

So, the optimal consumption bundle is (x*, y*) = ((PyI)/(2Px), I/(2Px)) = (10, 5). The maximum utility the consumer can reach is U = xy = 10*5 = 50.

In summary, the consumer should consume 10 units of good x and 2.5 units of good y to achieve a utility level of U = 50 with minimum expenditures of 15. If the consumer has an income of I = 20, they should consume 10 units of good x and 5 units of good y to maximize their utility level of U = 50.

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The exact volume of the solid S is  [tex]V = (\frac{32}{3} )\sqrt{6}[/tex]cubic units.

Consider a vertical slice of the solid taken at a value of y between 0 and 4. The slice is an equilateral triangle with side length equal to the distance between the two points on the parabola with that y-coordinate.

Let's find the equation of the parabola in terms of y:

x^2 = 8y

x = ±[tex]2\sqrt{2} ^{\frac{1}{2} }[/tex]

Thus, the distance between the two points on the parabola with y-coordinate y is:[tex]d = 2\sqrt{2} ^{\frac{1}{2} }[/tex]

The area of the equilateral triangle is given by: [tex]A= \frac{\sqrt{3} }{4} d^{2}[/tex]

Substituting for d, we get:

[tex]A=\frac{\sqrt{3} }{4} (2\sqrt{2} ^{\frac{1}{2} } )^{2}[/tex]

A = 2√6y

Therefore, the volume of the slice at y is: dV = A dy = 2√6y dy

Integrating with respect to y from 0 to 4, we get:

[tex]V = [\frac{4}{3} (2\sqrt{x6}) y^{\frac{3}{2} }][/tex]

[tex]V = \int\limits \, dx (0 to 4) 2\sqrt{6} y dy[/tex]

[tex]V = [(\frac{4}{3} ) (0 to 4)[/tex]

[tex]V = (\frac{32}{3} )\sqrt{6}[/tex]

Hence, the exact volume of the solid S is  [tex]V = (\frac{32}{3} )\sqrt{6}[/tex]cubic units.

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The value of c f · dr is (e^-1 - e^-3)/e - 16 ln(e^-1e^-2).

To evaluate c f · dr, we need to first calculate the gradient vector of f which is ∇f = (z/y, z/x, ln(xy)). We are given that f = ∇f, hence f(x, y, z) = z ln(xy).

Next, we need to calculate the line integral c f · dr where r(t) = et, e2t, t2 for 1 ≤ t ≤ 3. To do this, we need to first find dr/dt, which is (e, 2e, 2t). Then, we can evaluate f(r(t)) at each value of t and take the dot product of f(r(t)) and dr/dt, and integrate from t=1 to t=3.

Plugging in the values of r(t) into f(x, y, z), we get f(r(t)) = e^-1t, e^-2t, ln(e^-1te^-2t) = (e^-1t)/e2t, (e^-2t)/et, -t ln(e^-1te^-2t).

Taking the dot product of f(r(t)) and dr/dt, we get [(e^-1t)/e2t]e + [(e^-2t)/et]2e + (-t ln(e^-1te^-2t))(2t) = (e^-1t)/e + 2(e^-2t) + (-2t^2)ln(e^-1te^-2t).

Finally, integrating from t=1 to t=3, we get the line integral c f · dr = [(e^-1)/e + 2(e^-6) - 18 ln(e^-1e^-2)] - [(e^-3)/e + 2(e^-6) - 2 ln(e^-1e^-2)] = (e^-1 - e^-3)/e - 16 ln(e^-1e^-2).
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Answer:

Step-by-step explanation: If you do L to North is 015° and from L to M is 096°. the straight line distance between L and Mis 122km,283km.notation.(a) L and K,(b) L and M ,(c)K and M​

it would cost $770 to install the window shown.

To calculate the cost of installing the window, we need to find the total area of the window and then multiply it by the cost per square foot.

The window consists of a rectangle and a trapezoid. Let's calculate the areas of each shape and then add them together.

Rectangle:

Length = 3.5 feet

Width = 1 foot

Area = Length * Width = 3.5 * 1 = 3.5 square feet

Trapezoid:

Base1 = 3.5 feet

Base2 = 2.5 feet

Height = 2.5 feet

Area = (Base1 + Base2) * Height / 2 = (3.5 + 2.5) * 2.5 / 2 = 6 * 2.5 / 2 = 15 / 2 = 7.5 square feet

Total Area = Area of Rectangle + Area of Trapezoid = 3.5 + 7.5 = 11 square feet

Now, we can calculate the cost of installing the window by multiplying the total area by the cost per square foot:

Cost = Total Area * Cost per square foot = 11 * $70 = $770

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Comparing this result to the expression provided, we find that it is indeed true. Therefore, the answer is a. true.

The statement is true.

When we multiply two complex numbers, we use the distributive property of multiplication over addition and the fact that i^2=-1.

So,

zw = (x+iy)(u+iv)

= xu + xiv + yiu + i^2yv

= xu + yv i + xiv + yiu

= xu - yv i + (xv + yu)i

= (xu - yv i) + (xv + yu)i

Therefore,

zw = xu - yv i + (xv + yu)i

= (xu - yv i) - (yu - xv i)

= (xu - yv i) - (xv i - yu i)

= (xu - yv i) - (yuxi - xyvi)

= (xu - yv i) - (yuxi + xyvi)i

= (xu - yv i) - (xyvi + yuxi)i

= (xu - yv i) - (xy + yu)i

= (xu - yv i) - (yx + uy)i

= (xu - yv i) + (-yx - uy)i

= (xu - yv i) + (-1)(yx + uy)i

= (xu - yv i) + (-1)(xv + yu)i

= xu - yv i xv yu

So, the statement is true.
Hi, I'd be happy to help with your question about complex numbers.

You asked: "let z=x+iy and w=u+iv be two complex numbers, then zw=xu-yv+i(xv+yu), is it a. true or b. false?"

To answer your question, let's perform the multiplication of the complex numbers z and w step-by-step:

1. z = x+iy, w = u+iv
2. zw = (x+iy)(u+iv)
3. zw = xu + xiv + iyu + i^2yv (by using the distributive property)
4. Recall that i^2 = -1, so zw = xu + xiv + iyu - yv
5. Now, group the real and imaginary parts together: zw = (xu - yv) + i(xv + yu)

Comparing this result to the expression provided, we find that it is indeed true. Therefore, the answer is a. true.

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The length of the segment indicated in the figure is 4.21 in.

Given are two right triangles with one having base and perpendicular on 6 in and 7 in respectively and the other one is having base and perpendicular on 3 in and 4 in respectively joined their hypotenuse,

we need to find the length of the segment indicated in the figure,

So to find the same we will find the length of the hypotenuse of both and subtract the smaller one from the larger one,

So, the hypotenuse of the rt. triangle with base and perpendicular on 6 in and 7 in = √6²+7² = √36+49 = 9.21

the hypotenuse of the rt. triangle with base and perpendicular on 3 in and 4 in = √3²+4² = 5

Therefore, the length of the segment indicated in the figure = 9.21-5 = 4.21 in

Hence the length of the segment indicated in the figure is 4.21 in.

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The least common denominator for the fractions 3/6 and 2/12 is 12.

We need to determine the smallest number that both 6 and 12 can evenly divide into.

The prime factorization of 6 is 2 * 3.

The prime factorization of 12 is 2 * 2 * 3.

To find the least common denominator, we take the highest power of each prime factor that appears in either denominator. In this case, the prime factors are 2 and 3.

From the prime factorizations, we can see that the least common denominator is 2 * 2 * 3 = 12.

Therefore, the least common denominator for the fractions 3/6 and 2/12 is 12.

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The value of the functions are;

f(g(-1)) = 29

g(f(4)) = 34

A function is described as an expression that shows the relationship between two variables

From the information given, we have the functions as;

f(x) = 2x²-3

g(x) = x+5

To determine the function f(g(-1)), first, we have;

g(-1) = (-1) + 5

add the values

g(-1) = 4

Substitute the value as x in f(x)

f(g(-1)) = 2(4)² - 3

Find the square and multiply

f(g(-1)) = 29

For the function , g(f(4))

f(4) = 2(4)² - 3 = 29

Substitute the value as x, we get;

g(f(4)) = 29 + 5

g(f(4)) = 34

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The standard line must be a best fit that passes through the origin because it ensures that the line represents the most accurate and unbiased estimate of the relationship between the variables.

By passing through the origin, the standard line accounts for the fact that when both variables are zero, the predicted value should also be zero.

This assumption is particularly important in certain contexts, such as linear regression analysis, where the intercept term may not have a meaningful interpretation or may introduce bias into the model.

When the standard line is forced to pass through the origin, it ensures that the line's slope, which represents the rate of change between the variables, is solely determined by the data points and not influenced by an arbitrary intercept. This helps in making valid predictions and generalizations based on the model.

By using a best fit line that passes through the origin, we aim to minimize the errors between the predicted values and the observed values, and to obtain the most accurate representation of the relationship between the variables.

It allows us to make unbiased inferences and draw conclusions based on the data, without introducing unnecessary assumptions or biases.

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We have that X and Y are two independent exponential random variables with mean 1, which implies that their respective probability density functions are given by fX(x) = e^(-x) and fY(y) = e^(-y) for x, y > 0.

To find the probability density function for W = Y/X, we can use the transformation method. Let w = y/x, so that y = wx. Then we can write:

fW(w) = fYX(wx, x) |J|

where J is the Jacobian of the transformation, given by |J| = |d(y,x)/d(w,x)|. Taking the partial derivatives, we have:

dy/dw = x, and dy/dx = w, so |J| = |xw| = wx.

Substituting in the expressions for fX(x) and fY(y) in terms of w and x, we have:

fW(w) = ∫[0,∞] fYX(wx, x) |J| dx

= ∫[0,∞] e^(-wx) e^(-x) wx dx

= ∫[0,∞] wx e^(-(1+w)x) dx

= w ∫[0,∞] x e^(-(1+w)x) dx.

We can evaluate this integral using integration by parts. Let u = x and dv = e^(-(1+w)x) dx. Then du = dx and v = (-1/(1+w)) e^(-(1+w)x). Thus,

∫[0,∞] x e^(-(1+w)x) dx = [-xe^(-(1+w)x)/(1+w)]|[0,∞] + ∫[0,∞] e^(-(1+w)x)/(1+w) dx

= [0 + (1/(1+w))] + [(-1/(1+w))^2 e^(-(1+w)x)]|[0,∞]

= 1/(1+w) + 0

= 1/(1+w).

Therefore, we have:

fW(w) = w/(1+w), for w > 0.

Thus, the answer is (A) fw(w) = 1/(1+w)^2, w > 0.

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An error will occur when trying to compile the code because the variable x is not declared in scope in function B. Therefore, the code will not execute, and no value will be printed.

The program provided defines two functions, A and B, where function A defines a variable x and a function fie that assigns the value of 1 to x, and function B defines a variable x and calls the fie function from function A.

However, the x variable in function B is not initialized with any value, so its value is undefined. Therefore, when the program attempts to print the value of x using the write(x) statement in function B, it is undefined behavior and the result is unpredictable.

In general, it is good practice to always initialize variables before using them to avoid this kind of behavior.

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There are 9 cups of granola used in Alexander's homemade cereal.

Given:

Ratio of granola to dried cranberries:

       3 cups of granola : 1 cup of dried cranberries

      Total cups of dried cranberries used: 3 cups

To find the amount of granola, we can set up the following proportion:

[tex]\frac{3\ cups\ of\ granola}{1 cup\ of\ dried\ cranberries} = \frac{X cups \ of granola}{ 3 \ cups \ of dried \ cranberries}[/tex]

Cross-multiplying the proportion, we get:

3 cups of granola * 3 cups of dried cranberries = 1 cup of dried cranberries * X cups of granola

9 cups of dried cranberries = X cups of granola

Therefore, there are 9 cups of granola used in Alexander's homemade cereal.

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The perimeter of Archer's triangle at the end of the class period is A. 24 inches.

A shape's perimeter is calculated mathematically using the idea of perimeter. You sum together the lengths of all the sides to find the perimeter. This applies to all shapes, including irregular polygons like triangles, rectangles, and pentagons.

It can be deduced that Archer's triangle is similar to Marilynn

We will make an assumption that one of the side is α

1/1.5=2/3

The long side  Archer :Marilynn

α=3/2α

each side of Marilynn is more 1/2 than Archer, then the perimeter of Marilynn  is 3/2 Archer

=36* 3/2= 24inch

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a) The modal class of time spent exercising is given as follows: 40 < x ≤ 50

b) The median lies on the class 30 < x ≤ 40.

The mode of a data-set is the observation that appears the most times in the data-set, hence, for item a, we consider that the mode lies in the class 40 < x ≤ 50, which has the highest number of observations, which is 21.

The total number of elements in the data-set is given as follows:

18 + 14 + 3 + 16 + 21 + 7 = 79.

Hence the median is the element at the cumulative position given as follows:

(79 + 1)/2 = 40.

Which is on the following class:

30 < x ≤ 40.

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The left-hand limit is 5, and the right-hand limit is 1. The limit of f(x) as x approaches 1 does not exist.

To find the limits, let's evaluate the left-hand limit and the right-hand limit separately.

Since x approaches 1 from the left side (values less than 1), we can use the expression f(x) = x² + 4.

Plugging in x = 1 into the expression gives us:

lim x → 1- f(x) = lim x → 1- (1² + 4)

                  = lim x → 1- (1 + 4)

                  = lim x → 1- (5)

                  = 5

lim x → 1+ f(x) = lim x → 1+ ((x - 2)²)

Since x approaches 1 from the right side (values greater than or equal to 1), we can use the expression f(x) = (x - 2)².

Plugging in x = 1 into the expression gives us:

lim x → 1+ f(x) = lim x → 1+ ((1 - 2)²)

                  = lim x → 1+ ((-1)²)

                  = lim x → 1+ (1)

                  = 1

To determine if the limit lim x → 1 f(x) exists, we need to compare the left-hand and right-hand limits. If they are equal, then the limit exists. Otherwise, the limit does not exist.

In this case, lim x → 1- f(x) = 5 and lim x → 1+ f(x) = 1. Since these limits are not equal, the limit lim x → 1 f(x) does not exist.

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To find the volume of the solid obtained by revolving the region enclosed by the curve y=e^x, the x-axis, and the lines x=0 and x=1 around the x-axis, we can use the method of cylindrical shells.First, we need to find the equation of the curve y=e^x. This is an exponential function with a base of e and an exponent of x. As x varies from 0 to 1, y=e^x varies from 1 to e.

Next, we need to find the height of the cylindrical shell at a particular value of x. This is given by the difference between the y-value of the curve and the x-axis at that point. So, the height of the shell at x is e^x - 0 = e^x.
The thickness of the shell is dx, which is the width of the region we are revolving around the x-axis.
Finally, we can use the formula for the volume of a cylindrical shell:
V = 2πrh dx
where r is the distance from the x-axis to the shell (which is simply x in this case), and h is the height of the shell (which is e^x).So, the volume of the solid obtained by revolving the region enclosed by the curve y=e^x, the x-axis, and the lines x=0 and x=1 around the x-axis is given by the integral:
V = ∫ from 0 to 1 of 2πxe^x dx
We can evaluate this integral using integration by parts or substitution. The result is:
V = 2π(e - 1)
Therefore, the volume of the solid is 2π(e - 1) cubic units.

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The actual distance travelled was 29569.89 miles.

When you change the size, it affects your odometer reading, the change will cause the odometer to read more mile than your actual travelling.

The actual distance travelled = final reading - initial reading × actual tire diameter / standard tire diameter

We have changed P205/65R16 tires to P215/65R16 tires,

P215/65R16 tires are 0.8% larger in diameter than the P205/65R16 tires.

Diameter of P205/65R16 = 27.9 in

Diameter of P215/65R16 = 27.5 in

The actual distance travelled = 30,000 × 27.5 / 27.9 = 29569.89 miles.

Hence the actual distance travelled was 29569.89 miles.

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The distinct equivalence classes of R are:  {-7}, {-6}, {-5}, {-4}, {-3}, {-2}, {-1}, {0}, {1, -1}, {3}.

First, we need to determine the equivalence class of an arbitrary element x in A. This equivalence class is the set of all elements in A that are related to x by the relation R. In other words, it is the set of all y in A such that x R y.

Let's choose an arbitrary element x in A, say x = 2. We need to find all y in A such that 2 R y, i.e., such that [tex]\frac{3}{(2^2 - y^2)}=k[/tex], where k is some constant.

Solving for y, we get: y = ±[tex]\sqrt{\frac{4-3}{k} }[/tex]

Since k can take on any non-zero real value, there are two possible values of y for each k. However, we need to make sure that y is an integer in A. This will limit the possible values of k.

We can check that the only values of k that give integer solutions for y are k = ±3, ±1, and ±[tex]\frac{1}{3}[/tex]. For example, when k = 3, we get:

y = ±[tex]\sqrt{\frac{4-3}{k} }[/tex] = ±[tex]\sqrt{1}[/tex]= ±1

Therefore, the equivalence class of 2 is the set {1, -1}.

We can repeat this process for all elements in A to find the distinct equivalence classes of R. The results are:

The equivalence class of -7 is {-7}.

The equivalence class of -6 is {-6}.

The equivalence class of -5 is {-5}.

The equivalence class of -4 is {-4}.

The equivalence class of -3 is {-3}.

The equivalence class of -2 is {-2}.

The equivalence class of -1 is {-1}.

The equivalence class of 0 is {0}.

The equivalence class of 1 is {1, -1}.

The equivalence class of 2 is {1, -1}.

The equivalence class of 3 is {3}.

Therefore, the distinct equivalence classes of R are:

{-7}, {-6}, {-5}, {-4}, {-3}, {-2}, {-1}, {0}, {1, -1}, {3}.

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According to the problem statement, Timmy used to practice violin for 60 minutes a day. But now he practices 135% as many minutes as he used to practice before.

To find out how many minutes he currently practices, we need to calculate 135% of 60.The word "percent" means "out of 100", so we need to convert 135% into its decimal form. We can do this by dividing 135 by 100:135 ÷ 100 = 1.35Therefore, 135% can be written as 1.35 in decimal form.  Now we can find out how many minutes Timmy currently practices by multiplying 60 by 1.35:60 × 1.35 = 81So Timmy currently practices 81 minutes per day.

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To find the vector u3 using the Gram-Schmidt process, we start with the given vectors u1 = (1, 2, 1) and u2 = (2, 1, -1). The Gram-Schmidt process involves orthogonalizing each vector with respect to the previous vectors in the set.

Step 1: Normalize u1 to obtain the first orthonormal vector v1.

v1 = u1 / ||u1|| = (1, 2, 1) / √(1^2 + 2^2 + 1^2) = (1/√6, 2/√6, 1/√6)

Step 2: Find the projection of u2 onto v1 and subtract it from u2 to obtain a new vector u2' that is orthogonal to v1.

projv1(u2) = (u2 · v1) * v1 = (2/√6, 4/√6, 2/√6)

u2' = u2 - projv1(u2) = (2, 1, -1) - (2/√6, 4/√6, 2/√6) = (2 - 2/√6, 1 - 4/√6, -1 - 2/√6)

Step 3: Normalize u2' to obtain the second orthonormal vector v2.

v2 = u2' / ||u2'|| = ((2 - 2/√6)/√(1 + (2 - 2/√6)^2 + (1 - 4/√6)^2 + (-1 - 2/√6)^2), (1 - 4/√6)/√(1 + (2 - 2/√6)^2 + (1 - 4/√6)^2 + (-1 - 2/√6)^2), (-1 - 2/√6)/√(1 + (2 - 2/√6)^2 + (1 - 4/√6)^2 + (-1 - 2/√6)^2))

Finally, u3 is the remaining vector after orthogonalizing u3' with respect to v1 and v2. Since u3' is orthogonal to v1 and v2, u3 will also be orthogonal to both v1 and v2. Therefore, u3 can be expressed as u3 = (a, b, c), where a, b, and c are constants to be determined.

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The calculated volume of the sphere is 8.37 × 10⁻³ mm³

The sphere is a three-dimensional shape, also called the second cousin of a circle.

On the other hand, the volume is defined as the space occupied within the boundaries of an object in three-dimensional space.

The volume of a sphere can be expressed as;

V = 4/3πr³

Given that

diameter = 4 × 10⁻³ mm

We have

diameter =2 × radius

Where

radius = 4 × 10⁻³/2

radius = 2 × 10⁻³

Therefore;

Volume = 4/3 × 3.14 × 2 × 10⁻³

Evaluate

Volume = 25.12 × 10⁻³/3

So, we have

Volume = 8.37 × 10⁻³ mm³

Therefore the volume of the sphere is 8.37 × 10⁻³ mm³

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For the expression f(x) = (-2x + 3 if x < -2) 5x - 6 if x ≥ -2) for x = 2, f(x) is equal to 4 (d).

To evaluate the expression, substitute the given value for the variable. In this case, given that x = 2. Then substitute this value into the expression and simplify.

f(x) = (-2x + 3 if x < -2)

   (5x - 6 if x ≥ -2)

Since x = 2≥ −2, use the second definition of f: 5x − 6. Therefore, f(2) = 5(2) − 6 = 10 − 6 = 4

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