the lifespan, in years, of a certain computer is exponentially distributed. the probability that its lifespan exceeds 3 years is 0.0027. find the probability that the lifetime exceeds 10 years.

The amount of the fruit punch in gallons after serving 3/8 gallons of the fruit punch at dinner is 15/8.

Since,

Subtraction is simply means to deduct something from the object or number of group, place, etc. Subtraction means to take away from the group or a number of objects.

Given that;

Ms. Fitzgerald had 2 and 1/4 gallons of fruit punch. She served 3/8 gallons of the fruit punch to her family at lunch.

Hence, The amount of the punch she has;

⇒ 2 1/4

⇒ 9/4

Then, the 3/8 gallons of fruit punch to her family at lunch. Then we have

⇒ 9/4 - 3/8

⇒ 18/8 - 3/8

⇒ 15/8

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Complete question is,

Ms. Fitzgerald had 2 1 /4 gallons of fruit punch. She served 3 /8 gallon of the fruit punch

to her family at lunch.

How many gallons of fruit punch did Ms. Fitzgerald have left after lunch?

f(x) = 4 * 3^x

To find the formula for the exponential function that passes through the points (0, 4) and (3, 108), we need to follow these steps:

Step 1: Write the general exponential function
The general exponential function is of the form f(x) = ab^x, where a and b are constants.

Step 2: Plug in the first point (0, 4)
Using the point (0, 4), substitute x=0 and y=4 into the equation and solve for a:
4 = a * b^0
Since any number raised to the power of 0 is 1, we have:
4 = a * 1
So, a = 4.

Step 3: Plug in the second point (3, 108) and solve for b
Now we have the function f(x) = 4 * b^x. Using the point (3, 108), substitute x=3 and y=108 into the equation and solve for b:
108 = 4 * b^3

Divide by 4:
27 = b^3

Now take the cube root of both sides:
b = 3

Step 4: Write the final formula
Now that we have found a and b, we can write the final formula for the exponential function that passes through the two points (0, 4) and (3, 108):
Therefore, f(x) = 4 * 3^x

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Yes, it is possible.

To determine if there is a way to choose some of the n items to make the total weight exactly equal to w, you can use the following step-by-step approach:

1. List the weights of each of the n items.
2. Create a table with columns representing the weights from 0 to w, and rows representing the items from 0 to n.
3. Initialize the first row (representing item 0) with "True" for weight 0 and "False" for all other weights.
4. Loop through each item (i) from 1 to n:
  a. Loop through each possible weight (j) from 0 to w:
     i. If the item's weight is less than or equal to the current weight (j), check if the remaining weight (j minus the item's weight) can be obtained using the previous items (row i-1). If yes, mark the current cell as "True".
     ii. If the current item's weight is greater than the current weight (j) or the remaining weight can't be obtained using the previous items, copy the value from the cell above (row i-1) in the table.
5. Check the last cell in the table (cell [n][w]). If it is marked "True", it is possible to choose some of the n items to make the total weight exactly equal to w. If it's "False", it's not possible.

This approach uses dynamic programming to efficiently solve the problem. If the last cell in the table is "True", you can backtrack through the table to find the exact items that contribute to the total weight of w.

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The system of inequalities are

a) 2000x + 3000y ≤ 120000

b) x + y ≤ 50

c) y ≤ 2x

d) x ≥ 0, y ≥ 0

Given data ,

A transporter has two types of trucks to transport maize. Type A carries 2000bags whole type B carries 3000 bags per trip.

The transporter has to transport 120,000 bags. He has to make not more than 50 trips.

Type B trucks are to make atmost twice the number of trips made by type A.
x = number of trips made by type A

y = number of trips made by type B

Now , the inequalities are

a) 2000x + 3000y ≤ 120000

b) x + y ≤ 50

c) y ≤ 2x

d) x ≥ 0, y ≥ 0

Hence , the inequality is solved

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The total amount required to pay off the loan at the end of 8 years would be $37,784.09.

To calculate the total amount required to pay off a loan of $16,000 with an interest rate of 14% per annum compounded half-yearly over 8 years, we can use the formula for compound interest:

A = P(1 + r/n)^(nt)

where A is the total amount, P is the principal (or loan amount), r is the interest rate per annum, n is the number of times the interest is compounded per year, and t is the time period in years.

In this case, P = $16,000, r = 14%, n = 2 (since the interest is compounded half-yearly), and t = 8 years.

Plugging in the values, we get:

A = $16,000(1 + 0.14/2)^(2*8)

= $37,784.09

Therefore, the total amount required to pay off the loan at the end of 8 years would be $37,784.09, including the principal amount of $16,000 and the accumulated interest.

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Lexie scored 32 points during the game

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

These statements mean that

E = 24

L = 1/2E

M = L + 4

Lx = 2M

So, we have

Lx = 2(L + 4)

Lx = 2(1/2E + 4)

Substitute the known values in the above equation, so, we have the following representation

Lx = 2(1/2 * 24 + 4)

Evaluate

Lx = 32

Hence, Lexie scored 32 points

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The distance between given points (-3, 7) and (4, 7) is approximately equal to 7 units.

To find the distance between two points, we can use the distance formula, which is derived from the Pythagorean theorem. The distance formula is:

d = √[(x₂ - x₁)² + (y₂ - y₁)²]

where (x₁, y₁) and (x₂, y₂) are the coordinates of the two points, and d is the distance between them.

In this case, the two points are (-3, 7) and (4, 7), so we can plug in the values into the distance formula:

d = √[(4 - (-3))² + (7 - 7)²]

= √[7² + 0²]

= √49

= 7

To visualize this, imagine a number line extending from -3 to 4, with the two points located at 7 on the y-axis. The distance between the two points is the length of the line segment connecting them, which is a horizontal line of length 7 units.

This is because the two points have the same y-coordinate, so the only difference between them is their x-coordinates.

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The number of chicken sandwiches is 10 and the number of hamburgers is 30 if the total number of eatables sold is 40 at the rate that each chicken sandwich sells for $4 and each hamburger sells for $2 and Chris has to make $100.

Let the number of the chicken sandwich be x

the number of hamburgers be y

Total number of eatables sold = 40

x + y = 40 ---- (i)

Money earned after selling one chicken sandwich = $4

Money earned after selling x chicken sandwich = 4x

Money earned after selling one chicken sandwich = $2

Money earned after selling y chicken sandwich = 2y

Total money earned = $100

4x + 2y = 100 -----(ii)

Divide equation (ii) by 2

2x + y = 50 ------ (iii)

Subtract equations (i) and (iii)

2x + y - x - y = 50 - 40

x = 10

Put x in equation (i)

10 + y = 40

y = 40 - 10

y = 30

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The complete question might be:

Chris is selling chicken sandwiches and hamburgers at the fair in his hometown. He has a total of 40 buns so he can sell no more than 40 chicken sandwiches and hamburgers. Each chicken sandwich sells for $4 and each hamburger sells for $2. In order to reach his goal, Chris must make at least $100. So what is the number of chicken sandwiches and hamburgers that he must sell to achieve his goal?

All three coordinate systems - Cartesian, polar, and complex - are based on the same underlying principles of geometry and trigonometry. They all rely on the use of angles and distances to locate points in space. The main advantage of this system is that it is very intuitive and easy to understand, but it can be less convenient for calculations involving angles. The Cartesian system is intuitive and easy to understand, the polar system simplifies calculations involving angles, and the complex system unifies the representation of real and imaginary numbers.

The Cartesian (rectangular) coordinate system is perhaps the most familiar of the three. It uses a pair of perpendicular number lines - the x-axis and y-axis - to represent points in two-dimensional space. The x-axis represents horizontal distance, while the y-axis represents vertical distance. Together, they form a grid of squares that can be used to plot points and graph functions. The Cartesian coordinate system is unique in that it is simple and intuitive, making it easy to use and understand.

The polar coordinate system, on the other hand, uses angles and distances to locate points in two-dimensional space. It is based on the concept of a polar coordinate, which consists of a distance from the origin (the center point) and an angle measured from a reference line (usually the positive x-axis). The polar coordinate system is unique in that it is particularly useful for describing circular or rotational motion, and is often used in fields such as physics and engineering.

The complex coordinate system is a natural extension of the Cartesian coordinate system, which incorporates a third dimension - the imaginary axis. It is based on the idea of complex numbers, which consist of a real part and an imaginary part. The real part is plotted along the x-axis, while the imaginary part is plotted along the y-axis. The complex coordinate system is unique in that it allows for the representation of complex numbers, which are essential in many areas of mathematics and science.

The absolute value of an imaginary number, the magnitude of a force, and the distance between two points are all related to one another in that they are all measures of size or distance. In the case of an imaginary number, the absolute value represents the distance between the number and the origin in the complex plane. In the case of a force, the magnitude represents the size or strength of the force. And in the case of two points, the distance between them represents the length of the line segment connecting them.

Each coordinate system has its own advantages and disadvantages. The Cartesian coordinate system is easy to use and intuitive, but it can be limited in its ability to describe certain types of motion, such as circular or rotational motion. The polar coordinate system is particularly useful for describing circular or rotational motion, but it can be more difficult to use and understand. The complex coordinate system is essential for working with complex numbers, but it can be challenging to visualize and work with in three-dimensional space. Ultimately, the choice of which coordinate system to use depends on the specific problem being solved and the tools and techniques available to the person solving it.

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To calculate g(7), we need to find the value of x such that f(x) = 7. Since g(x) is the inverse of f(x), g(7) will be equal to that value of x.

So, we start by setting f(x) = 7: x^3 + 2x + 4 = 7
Simplifying this equation, we get: x^3 + 2x - 3 = 0

Now, we can use the fact that g(x) is the inverse of f(x) to find g(7) without actually finding a formula for g(x).

g(7) is equal to the value of x that satisfies f(x) = 7. But we just found that value of x - it's the solution to the equation x^3 + 2x - 3 = 0. So, g(7) = that solution.

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However, I can tell you that the correlation can be described as strong, weak, or nonexistent depending on the strength of the relationship between the two variables.

Correlation is a statistical technique used to measure the relationship between two variables. It tells us whether there is a positive or negative association between the two variables and the strength of that association.

Pearson's correlation coefficient is used when the variables are continuous and normally distributed. It measures the linear relationship between two variables on a scale of -1 to 1, where -1 indicates a perfect negative correlation, 1 indicates a perfect positive correlation, and 0 indicates no correlation.

Spearman's rank correlation coefficient is used when the variables are ordinal or not normally distributed. It measures the strength and direction of the association between two variables based on their ranks, rather than their actual values.

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The statement "For linear functions, the slope of any secant line always equals the slope of any tangent line" is true.

Linear functions are represented by the equation y = mx + b, where m represents the slope and b is the y-intercept. Since linear functions have a constant rate of change, their graph forms a straight line.

A secant line is a line that intersects the graph at two distinct points. A tangent line, on the other hand, is a line that touches the graph at only one point without crossing it. For linear functions, the slope of the secant line connecting any two points on the graph will always be the same because the rate of change is constant throughout the function.

Similarly, the slope of the tangent line at any point on the graph of a linear function will also be the same as the function's slope. This is because, in a linear function, the tangent line coincides with the function's graph itself. Hence, the slopes of both secant and tangent lines are equal to the slope of the linear function.

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The value of (AB) C is,

⇒ (AB) C = [tex]\left[\begin{array}{ccc}10\\45\\\end{array}\right][/tex]

We have to given that;

A = [tex]\left[\begin{array}{ccc}4&3\\1&5\\\end{array}\right][/tex]

B = [tex]\left[\begin{array}{ccc}1&-1&3\\4&6&2\\\end{array}\right][/tex]

C = [tex]\left[\begin{array}{ccc}0\\2\\1\end{array}\right][/tex]

Hence, We get;

⇒ (AB) = [tex]\left[\begin{array}{ccc}16&14&18\\21&29&13\\\end{array}\right][/tex]

Hence,

⇒ (AB) C = [tex]\left[\begin{array}{ccc}10\\45\\\end{array}\right][/tex]

Thus, The value of (AB) C is,

⇒ (AB) C = [tex]\left[\begin{array}{ccc}10\\45\\\end{array}\right][/tex]

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When testing the ball bearings of a certain type, if the average diameter is found to be significantly different from 0.5 inch,

it would indicate that there may be issues with the manufacturing process or the quality of the materials used.

A lower average diameter may suggest that the bearings are being manufactured with insufficient materials or using inaccurate machinery, leading to inconsistencies in the size and shape of the bearings.

Conversely, a higher average diameter may suggest that the manufacturing process is producing bearings that are too large and may not fit properly in the intended machinery.

In either case, it would be important to investigate the cause of the discrepancy and take corrective measures to ensure that the bearings meet the required specifications.

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Recursive definition:

a) a1 = 2, an+1 = an + 4

b) a1 = 0, an+1 = 2 if n is odd, 0 if n is even

c) a1 = 0, an+1 = an + (2n+1)

d) a1 = 1, an+1 = an + 2n + 1

Sequence defined by an = 4n - 2:

Basis step:

a1 = 4(1) - 2 = 2

Inductive step:

an+1 = 4(n+1) - 2 = 4n + 2 = (4n - 2) + 4 = an + 4

Recursive definition:

a1 = 2, an+1 = an + 4

Sequence defined by an = [tex]1 + (-1)^n[/tex]:

Basis step:

a1 = [tex]1 + (-1)^1[/tex] = 0

Inductive step:

If n is odd, an+1 = [tex]1 + (-1)^{(n+1)[/tex]= 2;

If n is even, an+1 = [tex]1 + (-1)^{(n+1)[/tex] = 0

Recursive definition:

a1 = 0, an+1 = 2 if n is odd, 0 if n is even

Sequence defined by an = n(n-1):

Basis step:

a1 = 0

Inductive step:

an+1 = (n+1)n = [tex]n^2 + n[/tex] = an + (2n+1)

Recursive definition:

a1 = 0, an+1 = an + (2n+1)

Sequence defined by an = [tex]n^2[/tex]:

Basis step:

a1 = [tex]1^2[/tex] = 1

Inductive step:

[tex]an+1 = (n+1)^2 = n^2 + 2n + 1 = an + 2n + 1[/tex]

Recursive definition:

a1 = 1, an+1 = an + 2n + 1

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The equilibrium quantity is q = 24 at price p = $7,200

To find the equilibrium quantity and price, we need to set the supply equal to demand:

q^2 + 30q = -4q^2 + 10q + 19,200

Simplifying and rearranging, we get:

5q^2 - 20q + 19,200 = 0

Using the quadratic formula, we can solve for q:

q = [20 ± sqrt(20^2 - 4(5)(19,200))]/(2(5))

q = [20 ± 220]/10

Since a negative quantity of the commodity doesn't make sense in this context, we can reject the negative solution, leaving us with:

q = (20 + 220)/10 = 24

Now, we can use either the supply or demand function to find the equilibrium price. We'll use the demand function:

p = -4(24)^2 + 10(24) + 19,200

p = $7,200

Therefore, the equilibrium quantity is 24 units and the equilibrium price is $7,200 per unit.

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In order to improve my grades, i am going to prioritize consistent studying next year to improve my grades.

The consistent studying is the main key to academic success. By dedicating regular time to review and learn material, students are better able to retain information and recall it during exams.

When we create a study schedule and sticking to it, this can help us students stay on track and avoid cramming before exams which often leads to stress and poor performance. This type of studying also allows for a deeper understanding of complex concepts and improves critical thinking skills.

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[tex]\begin{array}{|c|ll} \cline{1-1} \textit{\textit{\LARGE a}\% of \textit{\LARGE b}}\\ \cline{1-1} \\ \left( \cfrac{\textit{\LARGE a}}{100} \right)\cdot \textit{\LARGE b} \\\\ \cline{1-1} \end{array}~\hspace{5em}\stackrel{\textit{16\% of 5000}}{\left( \cfrac{16}{100} \right)5000}\implies 800[/tex]

The confidence level for the interval x ± 2.88σ/√n is 99% and 1.490/√n is 95%. The value of zα/2 for confidence level of 99.7% is approximately 2.97 and for confidence level of 78% it's approximately 1.44.

The confidence interval formula is given as: x ± zα/2(σ/√n)

(a) The confidence level for the interval x ± 2.88σ/√n is 99%. This can be found by referring to a standard normal distribution table and finding the area between -2.88 and 2.88, which is approximately 0.99.

(b) The confidence level for the interval 1.490/√n can be found by using the formula: x ± zα/2(σ/√n)

1.490/√n = zα/2(σ/√n)

zα/2 = 1.490/σ

zα/2 = 1.490/σ ≈ 1.96

The confidence level for this interval is approximately 95%.

(c) For a confidence level of 99.7%, we need to find the value of zα/2 such that the area between -zα/2 and zα/2 under the standard normal distribution curve is 0.997. Using a standard normal distribution table, we find that the value of zα/2 is approximately 2.97.

(d) To find the value of zα/2 for a confidence level of 78%, we need to find the value such that the area between -zα/2 and zα/2 is 0.78. Referring to a standard normal distribution table, we find that the value of zα/2 is approximately 1.44.

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For each of the following functions, this function f:Z → Z defined by f(x) = 3x + 1 is injective but not surjective.

For each of the following functions, determine if the function is an injection and determine if the function is a surjection:

(a) The function f:Z → Z defined by f(x) = 3x + 1 is injective but not surjective.

To show that f is injective, we assume that f(a) = f(b), where a, b are integers, and then we need to show that a = b. If f(a) = f(b), then 3a + 1 = 3b + 1, which implies that a = b. Therefore, f is injective. However, f is not surjective because there is no integer x such that f(x) = 2, for example.

(b) The function F:Q → Q defined by F(x) = 3x + 1 is both injective and surjective.

To show that F is injective, we assume that F(a) = F(b), where a, b are rational numbers, and then we need to show that a = b. If F(a) = F(b), then 3a + 1 = 3b + 1, which implies that a = b. Therefore, F is injective. Moreover, F is surjective because for any rational number y, we can find a rational number x such that F(x) = y. Specifically, x = (y - 1)/3.

(c) The function g : R → R defined by g(x) is neither injective nor surjective.

The function g(x) is not injective because there can be multiple values of x that give the same output of g(x). For example, g(0) = g(1) = 1. Moreover, g(x) is not surjective because there are real numbers that are not in the range of g(x), for example, the negative real numbers.

(d) The function G : Q → Q defined by G(x) = x^3 is injective but not surjective.

To show that G is injective, we assume that G(a) = G(b), where a, b are rational numbers, and then we need to show that a = b. If G(a) = G(b), then a^3 = b^3, which implies that a = b. Therefore, G is injective. However, G is not surjective because there are rational numbers that are not in the range of G(x), for example, the negative rational numbers.

(e) The function k : R → R defined by k(x) = e^(-r) is neither injective nor surjective.

The function k(x) is not injective because there can be multiple values of x that give the same output of k(x). For example, k(0) = k(1) = e^(-1). Moreover, k(x) is not surjective because there are positive real numbers that are not in the range of k(x), for example, the number 2.

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Complete question:

For each of the following functions, determine if the function is an injection and determine if the function is a surjection. Justify all conclusions. *

(a) f:Z → Z defined by f(x) = 3x + 1, for all x e Z. "

(b) F:Q → Q defined by F(x) = 3x + 1, for all x e Q.

(c) g : R → R defined by g (x) for all x e R.

(d) G : Q → Q defined by G (x) x3, for all x e G

(e) k : R → R defined by k (x)-e-r, for all x E R.

The volume of the triangular prism that h = 8m, b = 10m, l = 22m is 880 cubic meters.

To find the volume of a triangular prism, we first need to find the area of the base triangle, which is given by the formula:

A = (1/2) × b × h

where b is the base and h is the height of the triangle.

In this case, the base of the triangular prism is a triangle with base b = 10m and height h = 8m, so its area is:

A = (1/2) × 10m × 8m = 40m²

The volume of the triangular prism is then given by multiplying the area of the base by the length of the prism:

V = A × l

where l is the length of the prism.

In this case, the length of the triangular prism is l = 22m, so its volume is:

V = 40m² × 22m = 880m³

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The equation rewritten in terms of I, E and Y, making X as a subject is X=(E-IY)/Y.

The given equation is I=E/(X+Y).

Cross multiply (X+Y) to I, we get

I(X+Y)=E

IX+IY=E

IX=E-IY

X=(E-IY)/Y

Therefore, the equation rewritten in terms of I, E and Y, making X as a subject is X=(E-IY)/Y.

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Selecting a random sample from each sub group is not a step involved in taking a cluster sample.

The steps involved in taking a cluster sample include randomly selecting a subset of clusters, eliminating any clusters that are too difficult to sample, dividing the population into groups using naturally occurring boundaries, and arranging the clusters into logical order, reflecting the desired characteristic.
To identify the steps involved in taking a cluster sample, the correct options are:
1. Divide the population into groups using naturally occurring boundaries (clusters).
2. Randomly select a subset of clusters.
3. Select a random sample from each subgroup (within the chosen clusters).

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The perimeter of the third square is 20 units while the perimeter of 2 squares in the model is 12 units and 16 units. ​

To find the perimeter  of the given third square we need to find the length of the square side, to find

To find the perimeter of the square we use the following formula:

P = 4 × side

Where:

P = perimeter of the square

side = length of the side

1 . the length of the side of the first square can be determined by.

P = 4 × side

side = P / 4

Given :

Perimeter (P) = 12

side = P / 4 = 12 / 4 = 3 units

Therefore, the length of the side of the first square is 3 units.

2. The length of the side of the second square can be determined by.

Given:

Perimeter (P) = 16

side = P / 4 = 16 / 4 = 4 units

Therefore, the length of the side of the second square is 4 units.

3) There is a right-angle triangle in between the squares we have determined the opposite and adjacent. By using the Pythagorean theorem we can find the hypotenuse of the right triangle. we can write the equation as:

[tex]√3²+ 4²[/tex] = [tex]√ 9 + 16[/tex] = [tex]√25[/tex] = 5 units

Therefore, the length of the side of the triangle is 5 units.

4. Now we can find the perimeter of the third square by using the side length.

P = 4 × side

P = side × 4 = 5 × 4 = 20 units

Therefore, The perimeter of the third square is 20 units.

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The complete question is,

The perimeters of two squares in the model are given. Find the perimeter of the third square. P=12 units p=16 units ​

The function f(x) = x⁴ - 3x² over [-1, 1] satisfies the criteria stated in Rolle's Theorem, and there are two values in the interval where f'(c) = 0, namely, c = -1 and c = 1.

To verify that f(x) satisfies the criteria stated in Rolle's Theorem, we need to check that f(x) is continuous over [-1, 1] and differentiable over (-1, 1), and that f(-1) = f(1).

It is clear that f(x) is a polynomial, and therefore, it is continuous and differentiable over its domain. Also, f(-1) = (-1)⁴ - 3(-1)² = 2 and f(1) = 1⁴ - 3(1)² = -2, so f(-1) ≠ f(1). Hence, there exists at least one value c in (-1, 1) such that f'(c) = 0.

To find all values of c where f'(c) = 0, we need to calculate the derivative of f(x) and solve for f'(x) = 0 over the interval (-1, 1). We have:

f'(x) = 4x³ - 6x

Setting f'(x) = 0 and solving for x, we get:

4x³ - 6x = 0

=> 2x(2x² - 3) = 0

Therefore, f'(x) = 0 when x = 0, x = √(3/2), and x = -√(3/2). Only x = ±1 are excluded from the solutions as they lie outside the interval (-1, 1). Thus, the only values of c in the interval (-1, 1) where f'(c) = 0 are c = -√(3/2) and c = √(3/2).

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The number of dimes that Andrew had in the Pennies, dimes, and quarters worth $5.34 are 18.

Let the number of dimes be x. The amount of pennies would consequently double because there are twice as many pennies as there are dime. Let the number of quarters be y. We can set up two equations based on the given information,

0.10x + 0.01(2x) + 0.25y = 5.34

x + 2x + y = 39 (the total number of coins is 39)

Simplifying the first equation, we get,

0.10x + 0.02x + 0.25y = 5.34

0.12x + 0.25y = 5.34

Substituting x + 2x + y = 39, we get,

3x + y = 39

We can solve these two equations simultaneously to find the values of x and y,

0.12x + 0.25y = 5.34

3x + y = 39

Multiplying the second equation by 0.25, we get,

0.75x + 0.25y = 9.75

Subtracting this equation from the first equation, we get,

0.12x - 0.75x = 5.34 - 9.75

-0.63x = -4.41

x = 7

Substituting x = 7 in the equation 3x + y = 39, we get,

3(7) + y = 39

y = 18

Therefore, Andrew has 18 quarters.

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The radius of the cylinder is 10cm

A cylinder is a three-dimensional solid that holds two parallel bases joined by a curved surface, at a fixed distance.

A cylinder is a prism and the general formula for the volume of prism is ;

base area × height

A cylinder has a circular base and it's volume bis expressed as;

V = πr²h

volume = 2512

height = 8

Therefore;

2512 = 3.14 × 8 ×r²

2512 = 25.12r²

divide both sides by 25.12

r² = 2512/25.12

r² = 100

r = √100

r = 10 cm

therefore the radius of the cylinder is 10cm

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The greatest common factor (GCF) is the largest positive integer that divides evenly into two or more numbers. It represents the highest common divisor of the given numbers.

To find the GCF, you need to determine the factors of each number and identify the largest factor that they have in common. The GCF is considered to be the greatest because it represents the largest number that can divide all the given numbers without leaving a remainder.

When finding the GCF, you start by listing the factors of each number. Factors are the numbers that divide evenly into a given number without leaving a remainder.

Once you have listed the factors of each number, you compare them to identify the largest common factor. This is done by finding the factors that appear in the factor lists of all the given numbers and selecting the highest one. The GCF represents the largest number that can divide all the given numbers without leaving a remainder, making it the greatest common factor.

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