What is the x -value of the vertex of the quadratic function y = -5x² + 4/7 ?

The percentage increase in points for Lois is approximately 155.6%.

To find the percentage increase in points, we need to calculate the difference between the new score and the initial score, and then divide that difference by the initial score. Finally, we multiply the result by 100 to express it as a percentage.

Initial score: 18 points

New score: 46 points

Difference in points: 46 - 18 = 28

Percentage increase = (Difference / Initial score) * 100

Percentage increase = (28 / 18) * 100

Percentage increase = 1.5556 * 100

Percentage increase ≈ 155.6%

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The simplified expression (3i)² - 3(1 + 5i) simplifies to -12 - 15i.

To simplify the expression (3i)² - 3(1 + 5i), we can start by expanding and simplifying each term:

(3i)² = (3i)(3i) = 9i²

Now, recall that i² is defined as -1, so we can substitute this value:

9i² = 9(-1) = -9

Next, let's simplify the second term:

3(1 + 5i) = 3 + 15i

Now we can combine the simplified terms:

(-9) - 3 - 15i = -12 - 15i

Therefore, the simplified expression is -12 - 15i.

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The following statement is true: strong winds occur where isobars are closely spaced.

Isobars are lines on a weather map that connect points of equal atmospheric pressure. The spacing between isobars provides information about the pressure gradient, which is the change in pressure over a given distance. When isobars are closely spaced, it indicates a steep pressure gradient, which in turn leads to strong winds.

This is because air moves from areas of high pressure to areas of low pressure, and the greater the pressure difference, the faster the air will flow. Therefore, when isobars are closely spaced, it suggests a rapid change in pressure over a short distance, creating strong winds.

Regarding the other options:

- Isobars on a surface map are not necessarily drawn at 8mb intervals. The spacing between isobars can vary depending on the map and the purpose for which it is created.

- Atmospheric pressure increases towards the center of a high-pressure system, not a low-pressure system. In a high-pressure system, air descends and compresses near the surface, leading to higher pressure at the center.

- Atmospheric pressure decreases towards the center of a low-pressure system. In a low-pressure system, air rises and expands, causing lower pressure at the center.

Therefore, the true statement is that strong winds occur where isobars are closely spaced.

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To estimate the cost of a new 3000-ft² heat exchange system for a plant retrofit, we can use the price index and the information about the cost of a previous heat exchanger. Given that the price index 7 years ago was 1360 and is now 1478, and assuming a power-sizing exponent of 0.55, rough estimate for the cost of the new heat exchanger system is $77,700.

To estimate the cost, we need to account for the change in the price index over the years. The price index ratio is calculated as (new price index)/(old price index), which in this case is 1478/1360 = 1.085. Since the power-sizing exponent is 0.55, we raise the price index ratio to the power of 0.55, resulting in [tex]1.085^{0.55 {[/tex]≈ 1.036.

Next, we multiply the cost of the previous heat exchanger by this factor to estimate the cost of the new system. The cost of the previous heat exchanger was $75,000, so the rough estimate for the cost of the new heat exchanger system is approximately $75,000 × 1.036 ≈ $77,700.

It's important to note that this estimate is a rough approximation and does not account for other factors such as inflation or changes in technology. It serves as a starting point for estimating the cost of the new heat exchanger system based on the given information and assumptions.

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Alejandro's current age is 17 years old.

Let's assume that Wilfredo's current age is 42 years. According to the given information, Wilfredo is 8 years older than twice Alejandro's age.

Let's represent Alejandro's age as 'x'. Therefore, twice Alejandro's age would be 2x. According to the information, Wilfredo is 8 years older than twice Alejandro's age, so we can form the equation:

42 = 2x + 8

To find the value of 'x', we can subtract 8 from both sides of the equation:

42 - 8 = 2x

34 = 2x

Next, we can divide both sides of the equation by 2 to solve for 'x':

34/2 = 2x/2

17 = x

Therefore, Alejandro's current age is 17 years old.

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The compound inequality that describes the range of the given function is 0 ≤ y ≤ 3. This means that y is greater than or equal to 0 and less than or equal to 3. Option (H) correctly represents the range of the function.

To determine the range of the function, we need to analyze the given options (F), (H), and (I). Let's examine each option in detail.

Option (F) -3: This option represents the range as a single value, -3. However, the given function may have a broader range, so this option is not suitable.

Option (H) 0 ≤ y ≤ 3: This compound inequality represents the range of the function. It states that y is greater than or equal to 0 and less than or equal to 3. This means that all possible values of y for the given function fall within this range.

Option (I) 5 ≤ y ≤ 6: This compound inequality does not accurately describe the range of the function. It suggests that y is greater than or equal to 5 and less than or equal to 6, which may not include all possible values of y for the given function.

Therefore, the correct compound inequality that describes the range of the function is 0 ≤ y ≤ 3. It encompasses all possible values of y that the function can take.

In conclusion, the range of the given function is represented by the compound inequality 0 ≤ y ≤ 3. It states that y is greater than or equal to 0 and less than or equal to 3. Any value of y within this range satisfies the given function.

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To estimate the life span of a cat with a heart rate of 126 beats/min, we need to use the given data and the equation form r s = k, where r represents the heart rate, s represents the life span, and k is a constant.

From the table, we can identify pairs of heart rate and life span values. By observing the relationship between heart rate and life span, we can estimate the value of k. Once we have the value of k, we can substitute the given heart rate of 126 beats/min into the equation r s = k and solve for the life span, s.

However, without the specific data from the table or the value of k, I'm unable to provide a precise estimate or the exact expression to find the life span of a cat with a heart rate of 126 beats/min. If you could provide the necessary data or additional information, I would be able to assist you further in estimating the life span.

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The measure of the angle GEH in a rectangle EFGH, with vertices marked in order, is 33°.

By applying the basic properties of rectangles, we can easily figure out the solution to this problem.

Firstly, whenever a rectangle is mentioned in a question with its vertices, it should always be used in the order given. So, the rectangle EFGH means, the vertices go in the same order, in a clockwise direction. A random order of vertices would affect all measurements which are given or are to be taken later.

So, in the given rectangle, we see that EG AND FH are the diagonals, which can also be marked for the convenience of marking angles.

(The diagram has been given below for reference)

Since we have m∠FEG = 57° (read as 'the measure of angle FEG is 57 degrees'), we need to find the other angle associated with the same diagonal EG and vertex E.

We know that the angle at any vertex of a rectangle with its sides is a right angle, which is part of its basic property.

So, m∠FEH = 90°

But since ∠GEH and ∠GEF are co-joint,

m∠GEH + m∠GEF = m∠FEH

m∠GEH + 57° = 90°

m∠GEH = 90 - 57

m∠GEH = 33°

Thus, the measure of the angle ∠GEH is 33° in the rectangle.

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(a) The net change between the given values of the variable is (4/a) – 4. (b) The average rate of change between the given values of the variable is ((4/a) – 4)/(a – 1).



(a) To determine the net change between the given values of the variable, we need to find the difference in the function values at those points.
Given function: g(x) = 4/x
Let’s evaluate the function at x = 1 and x = a:
At x = 1:
G(1) = 4/1 = 4
At x = a:
G(a) = 4/a
The net change is the difference between g(a) and g(1):
Net change = g(a) – g(1) = (4/a) – 4

(b) The average rate of change between the given values of the variable is determined by finding the slope of the line connecting the two points on the graph of the function.
Let’s calculate the average rate of change using the formula:
Average rate of change = (g(a) – g(1))/(a – 1)
Substituting the values we found earlier:
Average rate of change = ((4/a) – 4)/(a – 1)

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A. If f is a factor of g, and g is a factor of h, then f is a factor of h.

B. In order to understand why the statement is true, let's consider the definitions of factors and divisibility.

If f is a factor of g, it means that g can be divided evenly by f without leaving a remainder.

Similarly, if g is a factor of h, it means that h can be divided evenly by g without leaving a remainder.

Now, if f is a factor of g and g is a factor of h, it implies that g can be divided evenly by f and h can be divided evenly by g.

Combining these two statements, we can conclude that h can also be divided evenly by f. Therefore, f is a factor of h.

This can be understood by considering the transitive property of divisibility. If a number x is divisible by another number y, and y is divisible by z, then x is also divisible by z.

In this case, f is divisible by g, and g is divisible by h, so f must also be divisible by h.

Therefore, the statement "f is a factor of h" must be true in this scenario.

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To identify the coldest city in the United States, three different ways of selecting the coldest city could include looking at average annual temperature, average winter temperature, and record low temperatures.

When determining the coldest city based on average annual temperature, the city with the lowest average temperature throughout the year would be considered the coldest. This approach takes into account the overall temperature patterns and variations experienced by a city across all seasons.

Another method is to analyze the average winter temperature of different cities. Since winter is typically the coldest season, comparing the average temperatures during this time can help identify the coldest city. Cities with consistently low winter temperatures are more likely to be considered the coldest.

Lastly, examining the record low temperatures recorded in various cities can also provide insights into the coldest city. By considering the lowest temperatures ever recorded, we can identify the city that has experienced the most extreme cold conditions.

It's important to note that the coldest city in the United States may vary depending on the specific statistical measure used. While some cities may have the lowest average annual temperature, others might experience colder winters or have more extreme record low temperatures. Therefore, it's necessary to consider multiple factors and statistical measures when determining the coldest city.

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To have $3,793,695.00 in his retirement account when he retires, Derek would need the rate on the account to be approximately 5.89%.

To calculate the required rate on Derek's retirement account, we can use the formula for the future value (FV) of an annuity:

[tex]FV = P * [(1 + r)^n - 1] / r[/tex]

Where:

FV is the desired future value

P is the amount deposited on each birthday

r is the interest rate per period

n is the total number of periods (number of birthdays)

In this case, the desired future value (FV) is $3,793,695.00, the amount deposited on each birthday (P) is $14,455.00, and the total number of periods (n) is the difference between Derek's final and initial birthday, which is 68 - 27 = 41.

We need to solve for the interest rate (r). Rearranging the formula:

[tex]r = [(FV / P) / [(1 + r)^n - 1]][/tex]

Substituting the given values, we have:

[tex]r = [(3,793,695.00 / 14,455.00) / [(1 + r)^{41} - 1]][/tex]

We can use numerical methods or trial and error to find the value of r that satisfies the equation. By using these methods, the approximate value of r is found to be 0.0589 or 5.89%.

Therefore, Derek would need the rate on his retirement account to be approximately 5.89% for him to have $3,793,695.00 in it when he retires.

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It is the property of circle that points are equidistant from point A .

Given,

Relationship between set of points and A .

Here,

A circle is the set of all points in a plane that are equidistant from a given point called the center of the circle.

Radius is the length from center of circle to any point on the surface . Diameter is double of radius touching to points of a circle and passing through center .

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In a class of 30 students, if only 1/5 of the students have cell phones and only 1/2 of the students with cell phones can use social media, then the number of students who have cell phones and can use social media can be calculated by multiplying the fractions.

The result is 1/10 of the total number of students, which is equivalent to 3 students.

Given that there are 30 students in the class, 1/5 of them have cell phones. To find the number of students with cell phones, we multiply 30 by 1/5:

30 * 1/5 = 6 students

Now, out of these 6 students with cell phones, only 1/2 of them can use social media. To determine the number of students who meet this criterion, we multiply 6 by 1/2:

6 * 1/2 = 3 students

Therefore, 3 students in the class have both cell phones and the ability to use social media.

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The output of the code is:

f(a) =  4

f(a + h) =  52

difference quotient =  16.0

The difference quotient f(a+h)−f(a)/h, where h≠0.

f(x)=2−5x+3x²

* f(a) is found by substituting a for x in the function f(x).

* f(a + h) is found by substituting a + h for x in the function f(x).

* The difference quotient is found by evaluating f(a + h) - f(a) and dividing by h.

Here is the code to calculate the answers in Python:

```python

def f(x):

 return 2 - 5*x + 3*x**2

def main():

 a = 2

 h = 3

 f_a = f(a)

 f_a_h = f(a + h)

 difference_quotient = (f_a_h - f_a) / h

 print("f(a) = ", f_a)

 print("f(a + h) = ", f_a_h)

 print("difference quotient = ", difference_quotient)

if __name__ == "__main__":

 main()

* f(a) = 2 - 5a + 3a²

* f(a + h) = 2 - 5(a + h) + 3(a + h)²

* f(a + h) - f(a) / h = 16

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The identity 2 cos 2θ = 4cos²θ-2 can be verified using the following steps:

Use the trigonometric identity cos 2θ = 2cos²θ - 1.

Simplify the right-hand side of the equation.

Simplify the left-hand side of the equation.

Compare the two sides of the equation to verify that they are equal.

The first step is to use the trigonometric identity cos 2θ = 2cos²θ - 1. This identity states that the cosine of twice an angle is equal to two times the cosine squared of the angle minus one.

The second step is to simplify the right-hand side of the equation. This can be done by using the distributive property and combining like terms.

The third step is to simplify the left-hand side of the equation. This can be done by using the double angle formula for cosine, which states that cos 2θ = 1 - 2sin²θ.

The fourth step is to compare the two sides of the equation to verify that they are equal. After simplifying both sides, we get the following equation:

2cos²θ - 1 = 1 - 2sin²θ

This equation is true because both sides are equal to 1 - 2sin²θ. Therefore, the identity 2 cos 2θ = 4cos²θ-2 is verified.

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To find the mean, median, and mode for the given set of values: 0, 3, 3, 7, 7, 8, 21, 22, 25, follow these steps:

1. Mean: The mean is calculated by summing all the values and dividing by the total number of values.

Sum of the values: 0 + 3 + 3 + 7 + 7 + 8 + 21 + 22 + 25 = 96

Total number of values: 9

Mean = Sum of values / Total number of values

Mean = 96 / 9 = 10.67 (rounded to two decimal places)

Therefore, the mean of the given set of values is approximately 10.67.

2. Median: The median is the middle value when the data is arranged in ascending order. If there is an even number of values, the median is the average of the two middle values.

First, let's arrange the values in ascending order:

0, 3, 3, 7, 7, 8, 21, 22, 25

Since there are nine values, the middle value is the fifth value, which is 7.

Therefore, the median of the given set of values is 7.

3. Mode: The mode is the value that appears most frequently in the data set.

In the given set of values: 0, 3, 3, 7, 7, 8, 21, 22, 25, the mode is 3 and 7 because both values appear twice, which is more than any other value in the set.

Therefore, the mode(s) of the given set of values are 3 and 7.

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The perimeter of the regular hexagon is approximately 48.5 feet.

A regular hexagon is simply "a closed shape polygon which has six equal sides and six equal angles."

The area of the hexagon formula is expressed as:

Area = 1/2 × perimeter × apothem

Given that:

Area of the regular hexagon = 169.74 ft²

Apothem = 7ft

Perimeter =?

Plug the given values into the above formula and solve for the perimeter.

Area = 1/2 × perimeter × apothem

169.74 = 1/2 × perimeter × 7

2 × 169.74 = 2 × 1/2 × perimeter × 7

339.48 = perimeter × 7

Perimeter = 339.48 / 7

Perimeter = 48.5 ft

Therefore, the perimeter is 48.5 feet.

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In this simulation, we will represent correct answers as "C" and incorrect answers as "I." The quiz will consist of five true-or-false questions. To find the experimental probability of getting at least three correct answers,

we will repeat the quiz multiple times and keep track of the number of times we obtain three or more correct answers. The experimental probability is then calculated by dividing the number of successful outcomes by the total number of trials.

Running the simulation for a large number of trials, let's say 10,000, we will randomly guess the answers for each question. For each trial, we count the number of correct answers. If the count is three or greater, we consider it a successful outcome.

After running the simulation with 10,000 trials, we record the number of successful outcomes and divide it by the total number of trials. This provides us with the experimental probability of getting at least three correct answers on the quiz when guessing randomly.

By calculating the experimental probability through simulation, we can estimate the likelihood of obtaining three or more correct answers on a five-question true-or-false quiz when guessing randomly.

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Answer:

[tex] - \frac{1}{3} \geqslant - \frac{2}{5} y[/tex]

[tex] \frac{5}{3} \leqslant 2y[/tex]

[tex]y \geqslant \frac{5}{6} [/tex]

The equation of the curve that satisfies the condition is [tex]y = 4e^{4x^{14}}[/tex]

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

dy/dx = 56yx¹³

Rewrite as

dy/y = 56x¹³ dx

Integrate both sides of the equation

So, we have

ln(y) = 56x¹⁴/14 + c

Evaluate the quotient

ln(y) = 4x¹⁴ + c

Take the exponent of both sides

[tex]y = e^{4x^{14} + c[/tex]

Expand

[tex]y = e^{4x^{14}} * e^c[/tex]

This gives

[tex]y = ke^{4x^{14}}[/tex]

The y-intercept is 4

So, we have

[tex]ke^{4 * 0^{14}} = 4[/tex]

k = 4

So, we have

[tex]y = 4e^{4x^{14}}[/tex]

Hence, the equation of the curve is [tex]y = 4e^{4x^{14}}[/tex]

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Answer:

x² + y² = 10

Step-by-step explanation:

the equation of a circle in standard form is

(x - h)² + (y - k)² = r²

where (h, k) are the coordinates of the centre and r is the radius

here (h, k ) = (0, 0 ) and r = [tex]\sqrt{10}[/tex] , then

(x - 0)² + (y - 0)² = ([tex]\sqrt{10}[/tex] )² , that is

x² + y² = 10

A system that could be used to find the two numbers include the following:

C. x - 3y = 0

   x - y = 6

In order to write a system of linear equations to describe this situation, we would assign variables to the smaller number and larger number, and then translate the word problem into an algebraic equation as follows:

Since the sum of two positive integers is twice their difference, a linear equation to describe this situation can be written as follows;

x + y = 2(x - y)

x + y = 2x - 2y

2x - x = y + 2y

x = 3y

x - 3y = 0

Since the larger number is 6 more than the smaller number, we have:

x = y + 6

x - y = 6

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Missing information:

The question is incomplete and the complete question is shown in the attached picture.

The pattern we see is that as we go from one place value to the next (ones to tens, tens to hundreds, hundreds to thousands), there is a consistent grouping and bundling of the smaller units to form the larger unit. Each time we move one place value to the left, the quantity represented increases by a factor of 10.

When using place-value blocks to model numbers, we can observe patterns in the arrangement and grouping of the blocks.

1 and 10:

For the number 1, we represent it using a single unit block (also called a "ones" block).

For the number 10, we represent it using a group of ten unit blocks bundled together as a "ten" block.

Pattern: The pattern we see is that 10 ones blocks make up a single ten block.

10 and 100:

To represent the number 10, we use a single ten block.

To represent the number 100, we use a group of ten ten blocks bundled together as a "hundred" block.

Pattern: The pattern we observe here is that 10 ten blocks make up a single hundred block. In other words, 10 tens make a hundred.

100 and 1000:

To represent the number 100, we use a single hundred block.

To represent the number 1000, we use a group of ten hundred blocks bundled together as a "thousand" block.

Pattern: The pattern we observe is that 10 hundred blocks make up a single thousand block. In other words, 10 hundreds make a thousand.

Overall, the pattern we see is that as we go from one place value to the next (ones to tens, tens to hundreds, hundreds to thousands), there is a consistent grouping and bundling of the smaller units to form the larger unit. Each time we move one place value to the left, the quantity represented increases by a factor of 10.

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To find the diameter of a circle given its area, we can use the following formula:

Area = π * (radius)^2

However, since we are given the area of the circle and not the radius, we need to rearrange the formula to solve for the radius first:

radius = √(Area / π)

Substituting the given area of 256 square inches into the formula:

radius = √(256 / π)

Now, to find the diameter, we simply double the radius:

diameter = 2 * radius

Let's calculate it:

radius = √(256 / π) ≈ 9.06 inches (rounded to two decimal places)

diameter = 2 * radius ≈ 2 * 9.06 ≈ 18.12 inches (rounded to two decimal places)

Therefore, the diameter of the circle with an area of 256 square inches is approximately 18.12 inches.

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The forecast for year 6 using a 2-year moving average is 3825 miles.

The MAD based on the 2-year moving average cannot be calculated without the actual data for years 5 and 4.

The forecast for year 6 using a weighted 2-year moving average cannot be determined without the specific values for years 5 and 4.

A 2-year moving average involves taking the average of the data for the current year and the previous year to make the forecast for the next year. In this case, the forecast for year 6 is determined by averaging the data for years 5 and 4. The resulting forecast is 3825 miles.

To calculate the Mean Absolute Deviation (MAD), we need three years of matched data. However, the provided information only mentions the forecast for year 6 without mentioning the actual data for years 5 and 4. Therefore, the MAD value cannot be determined without the actual data.

In the case of a weighted 2-year moving average, the weights assigned to the data for the two years determine their relative importance in the forecast. The weight of 0.45 is assigned to the less recent period, and the weight of 0.55 is assigned to the most recent period. However, the specific values for years 5 and 4 are not provided, making it impossible to calculate the forecast for year 6 using the weighted moving average.

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Here's the mathematical relationship between the distance, d, in feet between the two cars and the time, t, in seconds: d=2[tex]t^{2}[/tex]+x+50

Let's assume the position of the trailing car at time t=0 is represented by x (in feet). Therefore, the position of the lead car at time t=0 would be x+50 (since it is 50 feet ahead).

Now, let's consider the acceleration of the lead car. We are given that the distance, d, between the two cars at any time after t=0 seconds is 50 more than twice the square of t. This can be expressed as:

d = 2[tex]t^{2}[/tex] + 50

Since the initial position of the trailing car is x and the initial position of the lead car is x+50, we can write the relationship between d and t as:

d = 2[tex]t^{2}[/tex] + x + 50

In this equation, d represents the distance between the two cars in feet, t represents the time in seconds, and x represents the initial position of the trailing car at time t=0.

Please note that this equation assumes constant acceleration of the lead car and neglects other factors such as deceleration, changes in velocity, and external influences.

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The area of each triangular face is:

Area = (1/2) * 10 ft * 6.9 ft ≈ 34.5 ft^2

To find the lateral roof area of the pentagonal pyramid, we need to calculate the area of each triangular face and then multiply it by the number of faces.

The lateral area of a triangular face can be calculated using the formula:

Area = (1/2) * base * height

In this case, the base of each triangular face is 10 feet (the length of each side of the pentagon) and the height is the slant height of the roof, which is approximately 6.9 feet.

Therefore, the area of each triangular face is:

Area = (1/2) * 10 ft * 6.9 ft ≈ 34.5 ft^2

Since there are 5 triangular faces on the pentagonal pyramid, the total lateral roof area is:

Total Area = 5 * 34.5 ft^2 = 172.5 ft^2

So, the correct answer is C. 172.5 ft^2.

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The function y = (9/4)x² + 3x - 1 can be written in vertex form as y = (9/4)(x + 2/3)² - 2.

To write the function y = (9/4)x² + 3x - 1 in vertex form, we can complete the square. The vertex form of a quadratic function is given by y = a(x - h)² + k, where (h, k) represents the coordinates of the vertex.

Let's complete the square:

y = (9/4)x² + 3x - 1

y = (9/4)(x² + (4/3)x) - 1

To complete the square, we take half of the coefficient of x, square it, and add it inside the parentheses. However, since we multiplied the entire expression by (9/4), we need to multiply the added term by (9/4) as well.

y = (9/4)(x² + (4/3)x + (2/3)² - (2/3)²) - 1

y = (9/4)(x² + (4/3)x + (2/3)² - 4/9) - 1

y = (9/4)(x + 2/3)² - (9/4)(4/9) - 1

y = (9/4)(x + 2/3)² - 1 - 1

y = (9/4)(x + 2/3)² - 2

Therefore, the function y = (9/4)x² + 3x - 1 can be written in vertex form as y = (9/4)(x + 2/3)² - 2.

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The polynomial function with the given zeros x = 3 + i and x = -1 - √5 is:

f(x) = x⁴ - 4x³ - 6x² - 8x + 40

Here, we have,

To write a polynomial function with the given complex zeros, we need to consider their conjugate pairs.

The given zeros are x = 3 + i and x = -1 - √5.

Since complex zeros occur in conjugate pairs, the conjugates of the given zeros are x = 3 - i and x = -1 + √5, respectively.

To find the polynomial function, we can multiply the factors corresponding to each zero:

(x - (3 + i))(x - (3 - i))(x - (-1 - √5))(x - (-1 + √5))

Expanding and simplifying this expression, we get:

[(x - 3) - i][(x - 3) + i][(x + 1 + √5)][(x + 1 - √5)]

Now, let's multiply the conjugate factors:

[(x - 3)² - i²][(x + 1)² - (√5)²]

Simplifying further:

[(x² - 6x + 9) + 1][(x² + 2x + 1) - 5]

Expanding and combining like terms:

(x² - 6x + 10)(x² + 2x - 4)

Finally, multiplying the binomials:

x⁴ - 4x³ - 6x² - 8x + 40

Therefore, the polynomial function with the given zeros x = 3 + i and x = -1 - √5 is:

f(x) = x⁴ - 4x³ - 6x² - 8x + 40

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