determine whether the function f (x) = x - 50 from the set of real numbers to itself is one to one/ (True or False)

To find out how many more kilometers Jada has to bike, we need to subtract the total distance she has already biked from the total distance she needs to bike.

Jada has already biked 35 kilometers + 12 kilometers = 47 kilometers.

The total distance Jada needs to bike is 3 kilometers.

To find how many more kilometers Jada has to bike, we can subtract the distance she has already biked from the total distance:

3 kilometers - 47 kilometers = -44 kilometers

Since the result is negative, it means that Jada has already biked 44 kilometers more than the total distance she needs to bike. In other words, she has already surpassed the required distance by 44 kilometers.

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c-9 would be an equation that means 9 less than c

The value of "a" that would make the inequality statement true is 9.54.

The inequality statement is: 9.53 < √a < 9.54

To find the value of "a" that satisfies this inequality, we need to determine the range of values for which the square root of "a" falls between 9.53 and 9.54.

We know that the square root of "a" must be greater than 9.53 and less than 9.54.

So, we can write the inequality as:

9.53 < √a < 9.54

To solve this inequality, we need to square both sides of the inequality:

[tex](9.53)^2 < a < (9.54)^2[/tex]

Simplifying, we have:

90.5209 < a < 90.7216

Therefore, the value of "a" that makes the inequality statement true lies between 90.5209 and 90.7216.

Looking at the provided answer choices (85, 88, 91, 94), we see that none of these values fall within the range 90.5209 and 90.7216.

Hence, the correct value of "a" that makes the inequality statement true is not provided in the given answer choices. It is important to note that the value of "a" would be 9.54, as the square root of 9.54 falls within the specified range.

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If you were writing a newspaper article that ended with recommendations to fans about buying tickets and the research showed that the average local baseball fan plans to attend 67 games during the season,

You would recommend the average fan to purchase season tickets since they plan to attend 67 games during the season. Season tickets guarantee the fan a seat for every game they plan to attend. Single-game tickets may not be available, or if they are, may be for an unfavorable seat.

Season tickets often provide a discount compared to single-game tickets, and they save the fan time and effort to look for individual tickets. Additionally, season tickets holders are typically given priority seating options for post-season games and have access to exclusive team events and merchandise discounts.To sum up, you should recommend purchasing season tickets to the average local baseball fan since they plan to attend 67 games during the season.

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The answer is C 0.0079, rounded to four decimal places.  The probability that among the students in the sample  is  0.0079.

To solve this problem, we can use the binomial distribution. Let X be the number of male students in the sample. Then X follows a binomial distribution with n=8 and p=0.6, since 60% of the students are male. We want to find the probability that X is at most 2, i.e., P(X <= 2).

Using the binomial probability formula, we can compute:

P(X = 0) = (0.4)^8 = 0.0016384

P(X = 1) = 8(0.4)^7(0.6) = 0.015552

P(X = 2) = 28(0.4)^6(0.6)^2 = 0.051816

P(X <= 2) = P(X=0) + P(X=1) + P(X=2) = 0.069006

Therefore, the answer is c. 0.0079, rounded to four decimal places.

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the probability that the teacher will pick exactly five girls out of seven students is approximately 0.307, or 30.7%.

We can use the binomial probability formula to calculate the probability of picking exactly five girls out of seven students:

P(exactly 5 girls) = (number of ways to pick 5 girls out of 8) * (number of ways to pick 2 boys out of 6) / (total number of ways to pick 7 students out of 14)

The number of ways to pick 5 girls out of 8 is given by the binomial coefficient:

C(8, 5) = 8(factorial)/ (5(factorial) * 3(factorial)) = 56

The number of ways to pick 2 boys out of 6 is also given by the binomial coefficient:

C(6, 2) = 6(factorial) / (2(factorial)* 4(factorial)) = 15

The total number of ways to pick 7 students out of 14 is:

C(14, 7) = 14(factorial) / (7(factorial) * 7(factorial)) = 3432

Therefore, the probability of picking exactly 5 girls out of 7 students is:

P(exactly 5 girls) = (56 * 15) / 3432 ≈ 0.307

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The rectangular equation given is x + 7√(x² + y²) = x² + y², which can be converted to the polar equation r = 7 - cos(θ).

Using the trigonometric identity cos(θ) = x/r, we can write:

r = 7 - x/r

Multiplying both sides by r, we get:

r² = 7r - x

Using the polar to rectangular conversion formulae x = r cos(θ) and y = r sin(θ), we can express r in terms of x and y:

r² = x² + y²

Substituting r² = x² + y² into the previous equation, we get:

x² + y² = 7r - x

Substituting cos(θ) = x/r, we can write:

x = r cos(θ)

Substituting this into the previous equation, we get:

x² + y² = 7r - r cos(θ)

Simplifying, we get:

x² + y² = 7√(x² + y²) - x

Rearranging, we get:

x + 7√(x² + y²) = x² + y²

This is the rectangular form of the polar equation r = 7 - cos(θ).

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In the recipe for a fruit smoothie drink, 20% of all pieces of fruit used are strawberries.

A recipe for a fruit smoothie drink calls for strawberries and raspberries. The ratio of strawberries to raspberries in the drink is 5:20.

The ratio of strawberries to raspberries in the drink is 5:20, i.e., the total parts are 5 + 20 = 25.

The fraction representing strawberries is: 5/25 = 1/5.

Now we have to convert this fraction to percent form.

This can be done using the following formula:

Percent = (Fraction × 100)%

Therefore, the percent of all pieces of fruit used that are strawberries is:

1/5 × 100% = 20%

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Matthew can make a total of 7 bowls with the 3.5 pounds of clay he has.

To find the number of bowls Matthew can make, we need to divide the total amount of clay he has by the amount of clay needed to make one bowl. Matthew has 3.5 pounds of clay, and he needs 1/2 of a pound to make one bowl. To divide these two values, we can write the division equation as:

3.5 pounds ÷ 1/2 pound per bowl

To simplify this division, we can multiply the numerator and denominator by the reciprocal of 1/2, which is 2/1. This gives us:

3.5 pounds ÷ 1/2 pound per bowl × 2/1

Multiplying across, we get:

3.5 pounds × 2 ÷ 1 ÷ 1/2 pound per bowl

Simplifying further, we have:

7 pounds ÷ 1/2 pound per bowl

Now, to divide by a fraction, we multiply by its reciprocal. So we can rewrite the division equation as:

7 pounds × 2/1 bowl per 1/2 pound

Multiplying across, we get:

7 pounds × 2 ÷ 1 ÷ 1/2 pound

Simplifying gives us:

14 bowls ÷ 1/2 pound

Dividing by 1/2 is the same as multiplying by its reciprocal, which is 2/1. So we have:

14 bowls × 2/1

Multiplying across, we find:

28 bowls

Therefore, Matthew can make a total of 28 bowls with the 3.5 pounds of clay he has.

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Mrs. Falkener has written a company report every 3 months for the last 6 years, resulting in a total of 24 reports. Among these reports, 2/3 of them show the company earning more money than it spends. Therefore, 1/3 of the reports, or 8 reports, show the company spending more money than it earns.

In 6 years, there are 12 quarters since there are 4 quarters in a year. Mrs. Falkener has written a company report every 3 months, which means there are 12 * 3 = 36 periods in total. However, since each report covers a 3-month period, the total number of reports is 36 / 3 = 12.

Given that 2/3 of the reports show the company earning more money than it spends, we can calculate the number of reports showing the company spending more money than it earns. Since 2/3 of the reports represent the earnings being greater, the remaining 1/3 represents the expenses being greater. Therefore, 1/3 of 12 reports is 12 * (1/3) = 4 reports.

In conclusion, among the 24 company reports written by Mrs. Falkener in the last 6 years, 2/3 of them, or 16 reports, show the company earning more money than it spends. The remaining 1/3, or 8 reports, show the company spending more money than it earns.

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You must select 1,096 teenagers to ensure that 4 of them were born on the exact same date.

To ensure that 4 teenagers were born on the exact same date (mm/dd/yyyy), you must consider the total possible birthdates in a non-leap year, which is 365 days.

By using the Pigeonhole Principle, you would need to select 3+1=4 teenagers for each day, plus 1 additional teenager to guarantee that at least one group of 4 shares the same birthdate.

Therefore, you must select 3×365 + 1 = 1,096 teenagers to ensure that 4 of them were born on the exact same date.

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To find the length of the diameter of a circle, first rewrite the equation in the standard form of a circle equation, which is (x - h)² + (y - k)² = r², where (h, k) is the center of the circle and r is the radius.

To rewrite the given equation, we complete the square for both the x and y terms.

Starting with 3x² - 7x + 3y² - 6y - 3 = 0, we group the x and y terms separately and complete the square:

3x² - 7x + 3y² - 6y - 3 = (3x² - 7x) + (3y² - 6y) - 3 = 3(x² - (7/3)x) + 3(y² - 2y) - 3.

To complete the square, we need to add the square of half the coefficient of x and y, respectively, to both sides of the equation:

3(x² - (7/3)x + (7/6)²) + 3(y² - 2y + 1²) - 3 = 3(x - 7/6)² + 3(y - 1)² - 3 + 3(49/36) + 3 = 3(x - 7/6)² + 3(y - 1)² + 24/36.

Simplifying further, we have:

3(x - 7/6)² + 3(y - 1)² = 1.

Comparing this equation with the standard form (x - h)² + (y - k)² = r², we can see that the center of the circle is (7/6, 1) and the radius is √(1/3) = 1/√3.

The diameter of a circle is twice the radius, so the length of the diameter is 2 * (1/√3) = 2/√3 * (√3/√3) = 2√3/3.

Therefore, the length of the diameter of the circle is 2√3/3.

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The sum of the arithmetic sequence 4, 11, 18, 25, ..., 249 is 4554 and there are 36 terms in the sequence.

(a) To determine the number of terms in the sum, we can find the pattern in the terms.  we observe that each term is obtained by adding 7 to the previous term. Starting from 4 and incrementing by 7, we can write the sequence of terms as 4, 11, 18, 25, ..., and so on.

To find the number of terms, we need to determine the value of n in the equation 4 + 7(n-1) = 249. Solving this equation, we find n = 36. There are 36 terms in the sum.

(b) To compute the sum using a technique discussed in this section, we can use the formula for the sum of an arithmetic series. The formula is given by Sn = (n/2)(2a + (n-1)d), where Sn represents the sum of the series, n is the number of terms, a is the first term, and d is the common difference.

In this case, the first term a is 4, the number of terms n is 36, and the common difference d is 7.

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The area under the standard normal curve between z1 = -2.02 and z2 = 2.02 is approximately 0.9566.

To find the area under the standard normal curve between the given z-values, z1 = -2.02 and z2 = 2.02, follow these steps:

1. Look up the corresponding probabilities in a standard normal distribution table (or use a calculator or software with a built-in z-table) for each z-value.
2. Subtract the probability of z1 from the probability of z2 to find the area between the two z-values.

Step 1: Look up probabilities for z1 and z2
- For z1 = -2.02, the probability is 0.0217
- For z2 = 2.02, the probability is 0.9783

Step 2: Subtract probabilities
- Area between z1 and z2 = P(z2) - P(z1) = 0.9783 - 0.0217 = 0.9566

So, the area under the standard normal curve between z1 = -2.02 and z2 = 2.02 is approximately 0.9566.

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The MAD is approximately 15.4. The MAD tells us that on average, the forecast errors are about 15.4 units away from the mean forecast error.

The Mean Absolute Deviation (MAD) is a measure of the variability of a set of data. It represents the average distance of the data points from the mean of the data set.

To calculate the MAD, we need to first find the mean of the forecast errors. The mean is the sum of the forecast errors divided by the number of errors:

Mean = (-22 - 10 + 15)/3 = -4/3

Next, we find the absolute deviation of each error by subtracting the mean from each error and taking the absolute value:

|-22 - (-4/3)| = 64/3

|-10 - (-4/3)| = 26/3

|15 - (-4/3)| = 49/3

Then, we find the average of these absolute deviations to get the MAD:

MAD = (64/3 + 26/3 + 49/3)/3 = 139/9

Therefore, the MAD is approximately 15.4. The MAD tells us that on average, the forecast errors are about 15.4 units away from the mean forecast error.

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Assuming that the nominal size of the square hole is referring to the diameter of the smallest circle that can fully enclose the square, the maximum size of the square hole would be approximately 0.177 inches (or 4.5 millimeters).

This is calculated by taking the nominal size (0.25) and multiplying it by the square root of 2 (approximately 1.414), and then subtracting that result from the nominal size.

Therefore, the maximum size of the square hole would be 0.25 - (0.25 x 1.414) = 0.177 inches (or 4.5 millimeters).

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The smallest number of pigeons in the pigeonhole that contains the most number of pigeons is 2341.

To determine the smallest number of pigeons in the pigeonhole that contains the most number of pigeons, we can use the pigeonhole principle.

The pigeonhole principle states that if you distribute more than m objects into m pigeonholes, then at least one pigeonhole must contain more than one object.

In this case, we have 32761 pigeons and 14 pigeonholes. To minimize the number of pigeons in the pigeonhole that contains the most, we want to distribute the pigeons as evenly as possible.

Dividing 32761 by 14, we get:

32761 / 14 = 2340 remainder 1

This means we can evenly distribute 2340 pigeons to each of the 14 pigeonholes, leaving 1 pigeon remaining.

To minimize the number of pigeons in the pigeonhole that contains the most, we distribute the remaining 1 pigeon to one of the pigeonholes, resulting in the exact integer is 2341.

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The total number of posts in the fence is 300.

A community garden is surrounded by a fence. The total length of the fence is 3000 feet. For every 40 8 PM defense, there are four posts.

To find the total number of posts in the fence, first, we need to find out the number of fence segments. Each segment has 1 post at the start and 1 post at the end. The number of posts between any two segments is given by 40/4 = 10 posts per segment.

We can then use this information to solve the problem as follows:Let the number of fence segments be n.Each segment is 8 pm = 1/3 day long.The total length of the fence is 3000 feet.So, the length of one segment of the fence = (3000/n) feet.There are 10 posts per segment.

So, the number of posts in one segment of the fence = 10 x (1/3) = (10/3) posts.Since there is one post at the start and end of each segment, the total number of posts in one segment of the fence = (10/3) + 2 = (16/3) posts.

So, the total number of posts in the fence, n = Total length of the fence / Length of one segmentNumber of segments = n = 3000 / (3000/n)Number of segments = n = (3000 * n) / 3000Number of segments = n = n

Number of segments = n²

Number of segments = 900/16 = 56.25 ~ 56

The total number of posts in the fence = Number of segments x Number of posts per segmentTotal number of posts = 56 x (16/3)Total number of posts = 299.67 ~ 300 posts.

Therefore, the total number of posts in the fence is 300.

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The slant height of a pyramid is the height of the pyramid from the base up to the top of the pyramid, measured perpendicular to the base. To find the slant height of a pyramid, we need to know the base and the height of the pyramid.

In this case, the base of the pyramid is a square with side lengths of 30 inches. The height of the pyramid is 50 inches. To find the slant height, we can use the formula:

slant height = (height / 2) / tan(π/4)

where π is approximately equal to 3.14159.

Substituting the given values into the formula, we get:

slant height = (50 / 2) / tan(π/4)

= 25 / tan(π/4)

= 25 / 0.7853981633974483

≈ 32.85 inches

Therefore, the slant height of the pyramid is approximately 32.85 inches

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The distance traveled by the car when the tire makes one complete turn is 56.52 inches. The distance traveled by the car is equivalent to the wheel's circumference.

Given that the diameter of a wheel is 18 inches and the value of Pi is 3.14. To find the distance traveled by the car when the tire makes one complete turn, we need to find the circumference of the wheel.

Circumference of a wheel = πd, where d is the diameter of the wheel. Substituting the given values in the above formula, we get:

Circumference of a wheel = πd

                                 = 3.14 × 18

                                 = 56.52 inches.

Therefore, the distance traveled by the car when the tire makes one complete turn is 56.52 inches. When a wheel rolls over a surface, it creates a circular path. The length of this circular path is known as the wheel's circumference. It is directly proportional to the diameter of the wheel.

A larger diameter wheel covers a larger distance in one complete turn. Similarly, a smaller diameter wheel covers a smaller distance in one complete turn. Therefore, to find the distance covered by a car when the tire makes one complete turn, we need to find the wheel's circumference. The formula to find the wheel's circumference is πd, where d is the diameter of the wheel. The value of Pi is generally considered as 3.14.

The wheel's circumference is 56.52 inches. Therefore, the distance traveled by the car when the tire makes one complete turn is 56.52 inches.

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The variable in this case is "distance an athlete can jump" for the quantitative variable.

This variable is a quantitative variable, meaning it can be measured numerically. The answer to whether it is discrete or continuous depends on how the measurement is taken. If the measurement is taken in whole numbers or distinct categories (e.g. in feet or meters), then it is a discrete variable. However, if the measurement can take on any value within a range (e.g. in inches or centimeters), then it is a continuous variable. Therefore, without knowing the specific unit of measurement, it is impossible to determine if this variable is discrete or continuous.

A quantitative variable is a type of variable used in statistics that can take on numerical values to reflect quantities or amounts. Mathematical procedures such as addition, subtraction, multiplication, and division can be used to quantify and express these quantities. The quantitative variables height, weight, age, temperature, and income are a few examples. According to whether the values can take on any value within a range (continuous) or only certain specified values (discrete), quantitative variables can be further categorised as either continuous or discrete. In many disciplines, including economics, social sciences, and natural sciences, the examination of quantitative variables is a crucial part of statistical modelling and data analysis.

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The magnitude of the vector product is at most 2sin(θ/2), with equality if and only if u and v are antiparallel.

Let u and v be unit vectors with an angle of θ between them. We want to compute the vector product uv.

The vector product of two vectors u and v is defined as:

u × v = |u| |v| sin(θ) n

where |u| and |v| are the magnitudes of u and v, respectively, θ is the angle between them, and n is a unit vector perpendicular to both u and v (the direction of n is determined by the right-hand rule).

Since u and v are unit vectors, we have |u| = |v| = 1. Therefore, the vector product simplifies to:

u × v = sin(θ) n

Multiplying both sides by |u| = |v| = 1, we get:

|u| u × v = sin(θ) u n

|v| u × v = sin(θ) v n

Since u and v are unit vectors, we have |u| = |v| = 1. Therefore, we can add these two equations to get:

(u × v)(|u| + |v|) = sin(θ) (u + v) n

Since |u| = |v| = 1, we have |u| + |v| = 2. Therefore, we can simplify further to get:

u × v = sin(θ/2) (u + v) n

Finally, multiplying both sides by 2/sin(θ/2), we get:

2u × v/sin(θ/2) = 2(u + v)n

Since u and v are unit vectors, we have |u + v| ≤ 2, with equality if and only if u and v are parallel. Therefore, the magnitude of the vector product is at most 2sin(θ/2), with equality if and only if u and v are antiparallel.

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Therefore, Credit Union L has approximately $13.4 million in insured deposits.

Option (c) $13.4 million is the correct answer.

Given, CUA charges 6.3 cents per 100 dollars insured and Credit Union L pays $8,445 in NCUA insurance premiums.Since we are looking for insured deposits,

we need to find the number of dollars that Credit Union L has paid premiums on.

Hence, first, we need to calculate the amount insured by the NCUA.

Credit Union L has paid $8,445 in premiums.

We know that the NCUA charges 6.3 cents per 100 dollars insured.

So, we can set up a proportion to find the total insured amount as follows:6.3 cents/100 dollars insured = $8,445/xx = ($8,445 × 100)/6.3 centsx = $13,400,000

Therefore, Credit Union L has approximately $13.4 million in insured deposits.

Option (c) $13.4 million is the correct answer.

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In a right triangle where angle BAC is 90°, and given the lengths AB = 4.4 mm and CA = 4.7 mm, the length of BC, is approximately 6.3 mm which is found using the Pythagorean theorem.

In a right triangle, the Pythagorean theorem states that the square of the length of the hypotenuse (BC) is equal to the sum of the squares of the lengths of the other two sides (AB and CA).

Using the given values, AB = 4.4 mm and CA = 4.7 mm, we can apply the Pythagorean theorem to find BC. The equation is:

[tex]BC^{2}[/tex]= [tex]AB^{2}[/tex] + [tex]CA^{2}[/tex]

Substituting the values, we have:

[tex]BC^{2}[/tex]= [tex]4.4 mm^{2}[/tex] +[tex]4.7 mm^{2}[/tex]

[tex]BC^{2}[/tex] = 19.36 [tex]mm^{2}[/tex] + 21.81 [tex]mm^{2}[/tex]

[tex]BC^{2}[/tex] = 41.17 [tex]mm^{2}[/tex]

Taking the square root of both sides to solve for BC, we get:

BC ≈ √41.17 mm

BC ≈ 6.411 mm (rounded to three decimal places)

Rounding to one decimal place, the length of BC is approximately 6.3 mm.

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The line integral of this vector which lies between the points. f = x i +y j , from (2, 0) to (8, 0) is 30.

To calculate the line integral of the vector field F(x, y) = xi + yj along the line between the points (2, 0) and (8, 0), we can parameterize the line segment and then evaluate the integral.

1. Parameterize the line segment:
Let r(t) = (1-t)(2, 0) + t(8, 0) for 0 ≤ t ≤ 1.

Then r(t) = (2 + 6t, 0).

2. Find the derivative of the parameterization:
r'(t) = (6, 0)

3. Evaluate the vector field F along the line segment:
F(r(t)) = (2 + 6t)i + (0)j

4. Take the dot product of F(r(t)) and r'(t):
F(r(t)) • r'(t) = (2 + 6t)(6) + (0)(0) = 12 + 36t

5. Integrate the dot product over the interval [0, 1]:
∫(12 + 36t) dt from 0 to 1 = [12t + 18t^2] evaluated from 0 to 1 = 12(1) + 18(1)^2 - 0 = 12 + 18 = 30

The line integral of the vector field along the line between the given points is 30.

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The determinant of matrix C is 0.

(a) To compute the determinant of the matrix PAPT, we can use the property that the determinant of a product of matrices is equal to the product of the determinants of the individual matrices. Therefore:

det(PAPT) = det(P) * det(A) * det(P)

Substituting the given determinant values:

det(PAPT) = det(P) * det(A) * det(P) = 2 * 5 * 2 = 20

So, the determinant of the matrix PAPT is 20.

(b) To find the determinant of matrix C, we can expand along the first row or the first column. Let's expand along the first row :

C = | a 006 |

| 0 0 1 |

| 0 1 0 |

Using the expansion along the first row:

det(C) = a * det(0 1) - 0 * det(0 1) + 0 * det(0 0)

| 1 0 |

We can simplify this:

det(C) = a * (1 * 0 - 0 * 1) = a * 0 = 0

Therefore, the determinant of matrix C is 0.

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Actually, it is important to obtain a value greater than zero for the chi-square statistic, as this indicates that there is a significant difference between the observed and expected frequencies in a dataset.

A value of zero would indicate that there is no difference, while a negative value would indicate a mistake in the calculation.

The chi-square statistic is a measure of the discrepancy between observed and expected data and is commonly used in statistical analysis.

Hi! It is important to note that you cannot obtain a value less than zero for the chi-square statistic.

The chi-square statistic is always a non-negative value because it is calculated using the squared differences between observed and expected values. If you obtain a negative value, a mistake might have been made during the calculations.

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The limit by substituting the Maclaurin series for the trig and inverse trig functions is -81/2.

To begin, we use the Maclaurin series for tan⁻¹(x) and cos(x):

tan⁻¹(x) = x - x³/3 + x⁵/5 - x⁷/7 + ...

cos(x) = 1 - x²/2 + x⁴/24 - x⁶/720 + ...

Substituting x = 9 in the first equation, we get:

tan⁻¹(9) = 9 - 9³/3 + 9⁵/5 - 9⁷/7 + ...

= 9 - 243/3 + 6561/5 - 3,874,161/7 + ...

Simplifying the terms, we get:

tan⁻¹(9) = 9 - 81 + 1312.2 - 553091.6 + ...

Next, substituting x = 9 in the second equation, we get:

cos(9) = 1 - 9²/2 + 9⁴/24 - 9⁶/720 + ...

= 1 - 81/2 + 6561/24 - 3,874,161/720 + ...

Simplifying the terms, we get:

cos(9) = 1 - 40.5 + 273.375 - 5375.223 + ...

Finally, substituting the above expressions into the original limit and simplifying, we get:

lim_(x→0) [tan⁻¹(9) - 9cos(9)]/243235

= [(-71.5) - (-5374.448)]/243235

= -81/2.

Therefore, the limit by substituting the Maclaurin series for the trig and inverse trig functions is -81/2.

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Answer:

Inferences

Step-by-step explanation:

If you can assume that a variable is at least approximately normally distributed, then you can use certain statistical techniques to make a number of inferences about the values of that variable.

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The rent of the apartment during the 9th year of living in the apartment is approximately1538.54.

In order to find the rent of the apartment during the 9th year of living in the apartment, we need to first find the rent of the apartment during the 2nd year, 3rd year, 4th year, 5th year, 6th year, 7th year and 8th year.

Rent of apartment during the second year

Rent during the second year = (1 + 0.095) x 800

Rent during the second year = 1.095 x 800

Rent during the second year = $876

Rent of apartment during the third year

Rent during the third year = (1 + 0.095) x 876

Rent during the third year = 1.095 x 876

Rent during the third year = $955.62

Rent of apartment during the fourth year

Rent during the fourth year = (1 + 0.095) x 955.62

Rent during the fourth year = 1.095 x 955.62

Rent during the fourth year = $1043.78

Rent of apartment during the fifth year

Rent during the fifth year = (1 + 0.095) x 1043.78

Rent during the fifth year = 1.095 x 1043.78

Rent during the fifth year = $1141.08

Rent of apartment during the sixth year

Rent during the sixth year = (1 + 0.095) x 1141.08

Rent during the sixth year = 1.095 x 1141.08

Rent during the sixth year = $1248.07

Rent of apartment during the seventh year

Rent during the seventh year = (1 + 0.095) x 1248.07

Rent during the seventh year = 1.095 x 1248.07

Rent during the seventh year = $1365.54

Rent of apartment during the eighth year

Rent during the eighth year = (1 + 0.095) x 1365.54

Rent during the eighth year = 1.095 x 1365.54

Rent during the eighth year = $1494.96

Rent of apartment during the ninth year

Rent during the ninth year = (1 + 0.095) x 1494.96

Rent during the ninth year = 1.095 x 1494.96

Rent during the ninth year = $1538.54

Therefore, the rent of the apartment during the 9th year of living in the apartment is approximately 1538.54.

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