-4>n or 3n+1>-2 solve equation or inequality

graph it too

The probability of getting a green marble is approximately 0.41

The probability of getting a green marble from a bag of 50 marbles can be estimated by combining Andre, Jada, and Noah's trials.

Andre took out a marble once and got a green marble one time. Jada took out a marble 12 times and got a green marble 5 times.

Noah took out a marble 9 times and got a green marble 3 times. The total number of times they took a marble out of the bag is 1 + 12 + 9 = 22 times.

The total number of times they got a green marble is 1 + 5 + 3 = 9 times. The probability of getting a green marble is calculated as the number of green marbles divided by the total number of marbles.

Therefore, the probability of getting a green marble from this bag is 9/22 or approximately 0.41.

Since there are 50 marbles in the bag, it is a reasonable estimate that 0.41 x 50 = 20.5 of the 50 marbles are green, although this is not guaranteed.

Hence, the probability of getting a green marble is approximately 0.41.

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The probability that the selected marble will be blue is 5//12

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

Marbles = 600

Red to blue marbles = 7 to 5

This means that

Red : blue = 7 : 5

The probability that the marble will be blue is calculated as

P = Blue/Blue + Red

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

P = 5/(5 + 7)

Evaluate the sum

P = 5/12

Hence, the probability that the marble will be blue is 5//12

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(1) The volume of closet space = 161,280

(2) The volume of one roll of toilet paper =  265 cubic inches

(3) The number of rolls of toilet paper can fit into the closet space = 608 rolls.

Given that,

The  length of rectangular section = 48 inches

The  width of rectangular section   = 84 inches

The diameter of toilet paper           = 5 inches

Height of toilet paper = 4 inches

The volume of the wardrobe space can be calculated by multiplying the rectangular section's length, breadth, and height.

As a result,

The closet's volume is roughly 161,280 cubic inches (48 x 84 x height).

The volume of one roll of toilet paper can be calculated using the volume of a cylinder formula (V = πr²h) with a diameter of 5 inches and a height of 4 inches.

Therefore,

One roll of toilet paper has a volume of around 265 cubic inches, rounded to 3.4.

To get the maximum number of rolls that can fit in the closet, divide the closet volume by the volume of one roll of toilet paper.

As a result, approximately 608 rolls of toilet paper can fit in the closet's rectangular part.

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The probability that it is not raining and the flight leaves on time at LaGuardia Airport is 0.82.

Let's denote the event that it rains as R

The event that the flight is delayed as D

The event that it is not raining as ¬R (complement of R).

We are given these probabilities:

P(R) = 0.08 (probability of rain)

P(D) = 0.14 (probability of flight delay)

P(R ∩ D) = 0.04 (probability of rain and flight delay)

The probability rules that will be used calculate the probability that it is not raining (¬R) and the flight leaves on time (¬D) is:

P(¬R ∩ ¬D) = 1 - P(R ∪ D)

= 1 - [P(R) + P(D) - P(R ∩ D)]

= 1 - [0.08 + 0.14 - 0.04]

= 1 - 0.18

= 0.82.

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The equation of the line of best fit is y = 0.2365x + 66.134, and the absolute value of the correlation coefficient is 0.197.

Given, the relationship between number of pitches and the average speed of the pitches can be shown through a scatter plot as follows. Using the given data, the scatter plot is shown below: From the graph, we observe that the points form a somewhat linear pattern.

Thus, we can add a line of best fit to the graph to understand the relationship between the two variables better. To determine the line of best fit, we will use the linear regression tool on the graphing calculator. For that, we need to select the “Relationship” tab and then select “Linear Regression” from the drop-down menu.

The equation of the line of best fit and the absolute value of the correlation coefficient are given as follows. Line of best fit: y = 0.2365x + 66.134|Correlation Coefficient| = 0.197. Therefore, the equation of the line of best fit is y = 0.2365x + 66.134, and the absolute value of the correlation coefficient is 0.197.

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The Taylor polynomials T2 and T3 centered at x = 5 for the function f(x) = x^4 - 2x are T2(x) = 545 + 190(x - 5) + 150(x - 5)^2 and T3(x) = 545 + 190(x - 5) + 150(x - 5)^2 + 120(x - 5)^3.

a) For the function f(x) = sin(x), the Taylor polynomials T2 and T3 centered at a = 0 can be calculated as follows:

The Taylor polynomial of degree 2 for f(x) = sin(x) centered at x = 0 is:

T2(x) = f(0) + f'(0)x + (f''(0)/2!)x^2

= sin(0) + cos(0)x + (-sin(0)/2!)x^2

= x

The Taylor polynomial of degree 3 for f(x) = sin(x) centered at x = 0 is:

T3(x) = f(0) + f'(0)x + (f''(0)/2!)x^2 + (f'''(0)/3!)x^3

= sin(0) + cos(0)x + (-sin(0)/2!)x^2 + (-cos(0)/3!)x^3

= x - (1/6)x^3

Therefore, the Taylor polynomials T2 and T3 centered at x = 0 for the function f(x) = sin(x) are T2(x) = x and T3(x) = x - (1/6)x^3.

b) For the function f(x) = x^4 - 2x, the Taylor polynomials T2 and T3 centered at a = 5 can be calculated as follows:

The Taylor polynomial of degree 2 for f(x) = x^4 - 2x centered at x = 5 is:

T2(x) = f(5) + f'(5)(x - 5) + (f''(5)/2!)(x - 5)^2

= (5^4 - 2(5)) + (4(5^3) - 2)(x - 5) + (12(5^2))(x - 5)^2

= 545 + 190(x - 5) + 150(x - 5)^2

The Taylor polynomial of degree 3 for f(x) = x^4 - 2x centered at x = 5 is:

T3(x) = f(5) + f'(5)(x - 5) + (f''(5)/2!)(x - 5)^2 + (f'''(5)/3!)(x - 5)^3

= (5^4 - 2(5)) + (4(5^3) - 2)(x - 5) + (12(5^2))(x - 5)^2 + (24(5))(x - 5)^3

= 545 + 190(x - 5) + 150(x - 5)^2 + 120(x - 5)^3

Therefore, the Taylor polynomials T2 and T3 centered at x = 5 for the function f(x) = x^4 - 2x are T2(x) = 545 + 190(x - 5) + 150(x - 5)^2 and T3(x) = 545 + 190(x - 5) + 150(x - 5)^2 + 120(x - 5)^3.

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The area of the rectangle is 17 square units.

The area of a rectangle is the product between the two dimensions (length and width) of the rectangle.

Here we know that the vertices are:

A(-1, 9), B(0, 9), C(0, -8), D(-1, -8)

We can define the length as the side AB, which has a lenght:

L = (-1, 9) - (0, 9) = (-1 - 0, 9 - 9) = (-1, 0) ----> 1 unit.

And the width as BC, which has a length:

L = (0, 9) - (0, -8) = (0 - 0, 9 + 8) = (0, 17) ---> 17 units.

Then the area is:

A = (1 unit)*(17 units) = 17 square units.

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The derivative of h(x) with respect to x, evaluated at x = 5, is h'(5) = 13.

To find h'(5) if h(x) = r(x) s(x), we need to differentiate the function h(x) with respect to x and evaluate it at x = 5.

Using the product rule, we differentiate h(x) as follows:

h'(x) = r'(x) s(x) + r(x) s'(x)

Now, let's substitute the given values into the equation:

r(5) = 4, s(5) = 3, r'(5) = -1, and s'(5) = 4.

h'(x) = r'(x) s(x) + r(x) s'(x)

h'(5) = r'(5) s(5) + r(5) s'(5)

Plugging in the values, we get:

h'(5) = (-1)(3) + (4)(4)

h'(5) = -3 + 16

h'(5) = 13

Therefore, the derivative of h(x) with respect to x, evaluated at x = 5, is h'(5) = 13.

In simpler terms, h'(5) represents the rate of change of the function h(x) at x = 5. In this case, h(x) is the product of two functions, r(x) and s(x). By applying the product rule, we differentiate each function and multiply them together. Substituting the given values, we find that h'(5) equals 13. This means that at x = 5, the function h(x) is changing at a rate of 13 units per unit change in x.

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The radius of the frisbee is approximately 1.273 inches when the circumference is 8 inches, and we use the value of pi as 3.14.

To calculate the radius, we can use the formula that relates the circumference and radius of a circle. The formula is:

Circumference = 2 * π * radius

Where "Circumference" represents the total distance around the circle, "pi" is a mathematical constant approximately equal to 3.14, and "radius" is the distance from the center of the circle to any point on its boundary.

Now, let's solve the equation for the radius:

Circumference = 2 * π * radius

Substituting the given value of the circumference (8 inches) and the value of π (3.14) into the equation, we get:

8 = 2 * 3.14 * radius

To isolate the radius, we need to divide both sides of the equation by 2 * 3.14:

8 / (2 * 3.14) = radius

Simplifying the right side of the equation, we have:

8 / 6.28 = radius

Calculating the value on the right side, we find:

radius ≈ 1.273

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The inverse of the given matrix A does not exist, denoted as [tex]A^{-1}[/tex] does not exist.

To determine if the inverse matrix A exists, we can use the determinant of A. If the determinant is non-zero, then A^-1 exists. However, if the determinant is zero, [tex]A^{-1}[/tex] does not exist.

Calculating the determinant of matrix A, we have:

|A| = |1 0 0|

|3 4 0|

|0 0 4|

Expanding the determinant along the first row, we have:

|A| = 1 × (4 × 4 - 0 ×0) - 0 × (3 × 4 - 0 × 0) + 0 ×(3 × 0 - 4 × 0)

= 16

Since the determinant is non-zero (16 ≠ 0), the inverse of matrix A exists.

However, to find the inverse of matrix A, we need to calculate the adjugate of A and multiply it by the reciprocal of the determinant. This process involves finding the cofactor matrix, which requires calculating the minors and the cofactors of A.

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To find the surface area of a pyramid using nets with base side length of 5 units and height of 5 units, calculate the area of the base and the area of the triangular faces, then sum them up. Therefore, the surface area of the pyramid, using the given net, is approximately 68.32 square units.

To determine the surface area of a pyramid, we can use the concept of nets. A net is a two-dimensional representation of a three-dimensional shape that can be unfolded to reveal its faces. In the case of a pyramid, the net consists of a base shape and triangular faces that connect to the apex.

Given that the base side length is 5 units and the height is also 5 units, we first calculate the area of the base. Since the base is a square, the area is given by multiplying the length of one side by itself: 5 * 5 = 25 square units.

Next, we calculate the area of each triangular face. The formula for the area of a triangle is 1/2 * base * height. The base of each triangular face is the side length of the base, which is 5 units. The height can be found using the Pythagorean theorem, where one leg is half the base length and the other leg is the height of the pyramid. So the height is √(5^2 - [tex](5/2)^2) = √(25 - 6.25) = √18.75[/tex] ≈ 4.33 units. Thus, the area of each triangular face is 1/2 * 5 * 4.33 = 10.83 square units.

Finally, we sum up the area of the base and the area of the triangular faces: 25 + (4 * 10.83) = 68.32 square units. Therefore, the surface area of the pyramid, using the given net, is approximately 68.32 square units.

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To find the surface area of a pyramid using nets with base side length of 5 units and height of 5 units, you can calculate the area of the base and the area of the triangular faces. Then, sum up these areas to determine the total surface area of the pyramid.

A constant variable definition for pi is "a mathematical constant representing the ratio of a circle's circumference to its diameter" and to assign it a value of 3.14 the syntax is : const pi = 3.14; will assign pi a value of 3.14.

To write a constant variable definition for pi and assign it a value of 3.14,

On defined pi as a constant variable using the keyword "const," its value cannot be changed.

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Therefore, None of the given options correspond to a row of zeros in the augmented matrix, so the value of k for infinitely many solutions cannot be determined

The augmented matrix for a system of linear equations can be used to determine the value of k for which the system has infinitely many solutions. To do this, we need to perform row operations on the matrix until we get it into row echelon form or reduced row echelon form. If we end up with a row of zeros, then the system has infinitely many solutions. Looking at the options given, it appears that none of them correspond to a row of zeros in the augmented matrix. Therefore, we cannot determine the value of k for which the system has infinitely many solutions based on the given options.

Therefore, None of the given options correspond to a row of zeros in the augmented matrix, so the value of k for infinitely many solutions cannot be determined.

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The height of the cylinder is approximately 2.93 cm.

We can use the formula for the volume of a cylinder which is given as:

V = π[tex]r^2h[/tex]

where V is the volume, r is the radius of the circular base, h is the height of the cylinder and π is the mathematical constant pi.

We are given that the area of each base is 124 cm^2, which means that πr^2 = 124. Therefore, the radius of the circular base can be found as:

r^2 = 124/π

r ≈ 6.28 cm (rounded to 2 decimal places)

The volume of the cylinder is given as 116π [tex]cm^3[/tex]. Substituting the values of r and V in the formula, we get:

116π = π[tex](6.28)^2h[/tex]

Simplifying the equation:

116 = [tex](6.28)^2h[/tex]

h =[tex]116/(6.28)^2[/tex]

h ≈ 2.93 cm (rounded to 2 decimal places)

Therefore, the height of the cylinder is approximately 2.93 cm.

In conclusion, we can find the height of a cylinder by using its volume and the area of its base by plugging the values in the formula for the volume of a cylinder. In this problem, the height of the cylinder is approximately 2.93 cm.

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The sampling distribution is the distribution of a statistic that is calculated from repeated samples of a population. The correct option (c) the sampling distribution.

In other words, it represents the distribution of sample means, sample variances, or other sample statistics that are calculated from multiple samples drawn from the same population.

It helps in making inferences about the population parameter based on the observed statistics from different samples.

The distributional distribution and the error distribution are not standard statistical terms. The test outcome is the result of a statistical test, which is not necessarily related to the distribution of a statistic.

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Total sales during the last 6 months ≈ $330,250. It appears that more sales were made during the last half of the year. Estimated total sales during the last 6 months = $330,250

As per the given graph, we can estimate the total sales during the first 6 months and the last 6 months by calculating the area under the curve for the respective time intervals.

Using the trapezoidal rule, we can approximate the area under the curve for each time interval by summing the areas of trapezoids formed by adjacent data points.

(a) Using the given data points, we can calculate:

Total sales during the first 6 months ≈ $315,750

Total sales during the last 6 months ≈ $330,250

(b) Based on the above estimates, it appears that more sales were made during the last half of the year.

(c) Estimated total sales during the first 6 months = $315,750

Estimated total sales during the last 6 months = $330,250

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The table provides the portion of total guests that attend an amusement park in each of the months, from May through September. Therefore, to determine how many times more guests visit the amusement park in the busiest month than in the least busy month,

we need to identify which month has the highest portion of guests, and which month has the lowest portion of guests. Then we can divide the portion of guests in the busiest month by the portion of guests in the least busy month.

Let’s first convert the portions to decimals: Month May June July August  September Portion of Guests0.060.30.290.210.16From the table, the busiest month is June with a portion of guests of 0.3, and the least busy month is May with a portion of guests of 0.06. Thus, we can divide the portion of guests in the busiest month (0.3) by the portion of guests in the least busy month (0.06):0.3/0.06 = 5Therefore, the busiest month has 5 times more guests visit the amusement park than the least busy month.

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Electricity is an essential commodity in today's world. However, it comes at a cost, and the cost varies depending on the providers. In this scenario, Mr. Rokum is comparing the costs of two different electrical providers for his home. Provider A charges $0.15 per kilowatt-hour, while Provider B charges a flat rate of $20 per month plus $0.10 per kilowatt-hour.

If Mr. Rokum uses the electricity for 1000 hours in Provider A, he would pay:

Total cost = 1000 * 0.15
Total cost = $150

If Mr. Rokum uses the electricity for 1000 hours in Provider B, he would pay:

Total cost = $20 + 1000 * 0.10
Total cost = $20 + $100
Total cost = $120

As seen, Provider B is cheaper for Mr. Rokum than Provider A. Suppose Mr. Rokum uses more than 133.3 hours per month on Provider B. In that case, it is economical to use Provider B over Provider A.

Electricity bills are a significant expense for most households. However, understanding the charges and the best electricity provider for your needs can significantly reduce your energy costs. Additionally, households can also adopt energy-saving measures such as replacing bulbs with LEDs and turning off electrical appliances when not in use. In this way, households can lower their monthly bills while conserving energy and reducing their carbon footprint.

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(a) V is a subspace of R3 since it satisfies the three conditions of subspace, namely, V contains the zero vector, V is closed under vector addition, and V is closed under scalar multiplication. (b) An equation that also defines V is 2x + y - 3z = 0. (c) Geometrically, V is a plane in R3 passing through the origin. (d) A basis for V is {(-3, 6, 2), (1, 0, 2)}.

(a) To show that V is a subspace of R3, we need to verify that it satisfies three conditions:

The zero vector is in V: T(0) = 0, so 0 is in V.

V is closed under vector addition: If v1, v2 are in V, then T(v1+v2) = T(v1) + T(v2) = v1 + v2, which means that v1+v2 is in V.

V is closed under scalar multiplication: If v is in V and a is a scalar, then T(av) = aT(v) = av, which means that av is in V.

Therefore, V is a subspace of R3.

(b) To find an equation that defines V, we can solve for the values of x, y, and z that satisfy T(x, y, z) = (x, y, z). This gives us the system of equations:

x + 2z = x

y - 6x - 2z = y

2x - 2z = z

Simplifying, we get:

2z = 0

y - 6x = 0

So the equation that defines V is y - 6x = 0, or equivalently, 6x - y = 0.

(c) Geometrically, V is a plane in R3 that passes through the origin. This is because it is defined by a linear equation with two variables, which corresponds to a two-dimensional subspace of R3 that contains the origin.

(d) To find a basis for V, we can solve the equation 6x - y = 0 for y, which gives us y = 6x. This means that any vector in V can be written as (x, 6x, z), where z is any real number. Therefore, a basis for V is {(1, 6, 0), (0, 0, 1)}.

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Option b is true: "One would first need to compute the 4-month moving average forecast for month 13" for the calculation of the 4-month moving average forecast in month 14.

The 4-month moving average forecast for a particular month is calculated by taking the average of the previous four months' actual data values, including the current month's actual value if it is available. Therefore, to calculate the 4-month moving average forecast for month 14, one would need to compute the actual data values for months 11, 12, and 13, and the forecasted value for month 14 (if it is not yet available).

So, option b is correct, while options a, c, d, and e are not true of the calculation for the 4-month moving average forecast in month 14.

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Full Question: What is true of the calculation for the 4-month moving average forecast in month 14?

The probability that less than 15% of the individuals in a sample of size 1000 hold multiple jobs is approximately 0.0418 or 4.18%.

To solve this problem, we need to use the binomial distribution formula:

P(X = k) = (n choose k) * p^k * (1-p)^(n-k)

where X is the number of individuals who hold multiple jobs in a sample of size n, p is the probability that an individual in the population holds multiple jobs (0.12), and (n choose k) is the binomial coefficient.

The probability that less than 15% of the individuals hold multiple jobs is equivalent to the probability that X is less than 0.15n:

P(X < 0.15n) = P(X ≤ ⌊0.15n⌋)

where ⌊0.15n⌋ is the greatest integer less than or equal to 0.15n.

Substituting the values we have:

P(X ≤ ⌊0.15n⌋) = ∑(k=0 to ⌊0.15n⌋) (n choose k) * p^k * (1-p)^(n-k)

We can use a calculator or software to compute this sum. Alternatively, we can use the normal approximation to the binomial distribution if n is large and p is not too close to 0 or 1.

Assuming n is sufficiently large and using the normal approximation, we can approximate the binomial distribution with a normal distribution with mean μ = np and standard deviation σ = sqrt(np(1-p)). Then we can use the standard normal distribution to calculate the probability:

P(X ≤ ⌊0.15n⌋) ≈ Φ((⌊0.15n⌋+0.5 - μ)/σ)

where Φ is the cumulative distribution function of the standard normal distribution.

For example, if n = 1000, then μ = 120, σ = 10.9545, and

P(X ≤ ⌊0.15n⌋) ≈ Φ((⌊0.15*1000⌋+0.5 - 120)/10.9545) = Φ(-1.732) = 0.0418

Therefore, the probability that less than 15% of the individuals in a sample of size 1000 hold multiple jobs is approximately 0.0418 or 4.18%.

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The lifter would need to perform approximately 27 reps of lifting a 16-lb barbell through a distance of 1.1 ft to work off 150 C.

To answer this question, we need to know the amount of work done in each rep of the lift. Work is defined as force multiplied by distance, so the work done in lifting the 16-lb barbell through a distance of 1.1 ft is:

Work = Force x Distance
Work = 16 lb x 1.1 ft
Work = 17.6 ft-lb

Now we can calculate the number of reps required to work off 150 C. One calorie is equivalent to 4.184 joules of energy, so 150 C is equal to:

150 C x 4.184 J/C = 627.6 J

We can convert this to foot-pounds of work by dividing by the conversion factor of 1.3558:

627.6 J / 1.3558 ft-lb/J = 463.3 ft-lb

To work off 463.3 ft-lb of energy, the lifter would need to perform:

463.3 ft-lb / 17.6 ft-lb/rep = 26.3 reps (rounded up to the nearest whole number)

Therefore, the lifter would need to perform approximately 27 reps of lifting a 16-lb barbell through a distance of 1.1 ft to work off 150 C.

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The properties used to simplify the problem are:

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

step 1: 2/7 • 53 • 7/2

Step 2: 53 • 2/7 • 7/2

Step 3: 53 • 1

Step 4: 53

In the above steps, we have the following properties used in problem.

Step 1: 2/7 * 53 * 7/2

Question

Step 2: 53 * 2/7 * 7/2

Commutative property of multiplication

Step 3: 53 * 1

Multiplicative identity

Step 4: 53

Multiplicative inverse

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Question

Choose all properties that were used to simplify the following problem:

step 1: 2/7 • 53 • 7/2

Step 2: 53 • 2/7 • 7/2

Step 3: 53 • 1

Step 4: 53

If the number of years that a computer lasts has density f(x) = { s 8x if x > 2 otherwise. 0, then (a) the probability that the computer lasts between 3 and 5 years is 64, (b) the probability that the computer lasts at least 4 years is 1 (or 100%), (c) the probability that the computer lasts less than 1 year is 4, (d) the probability that the computer lasts exactly 2.48 years is 0., and (e) the number of years that the computer lasts is undefined.

To find the probabilities and expected value, we need to integrate the given density function over the respective intervals. Let's calculate each part step by step:

a) Probability that the computer lasts between 3 and 5 years:

To find this probability, we need to integrate the density function f(x) over the interval [3, 5]:

P(3 ≤ x ≤ 5) = ∫[3,5] f(x) dx

Since the density function f(x) is defined piecewise, we need to split the integral into two parts:

P(3 ≤ x ≤ 5) = ∫[3,5] f(x) dx

= ∫[3,5] 8x dx (for x > 2)

= ∫[3,5] 8x dx

= [4x^2]3^5

= 4(5^2) - 4(3^2)

= 4(25) - 4(9)

= 100 - 36

= 64

Therefore, the probability that the computer lasts between 3 and 5 years is 64.

b) Probability that the computer lasts at least 4 years:

To find this probability, we need to integrate the density function f(x) over the interval [4, ∞):

P(x ≥ 4) = ∫[4,∞) f(x) dx

Since the density function f(x) is defined piecewise, we need to split the integral into two parts:

P(x ≥ 4) = ∫[4,∞) f(x) dx

= ∫[4,∞) 8x dx (for x > 2)

= ∫[4,∞) 8x dx

= [4x^2]4^∞

= ∞ - 4(4^2)

= ∞ - 4(16)

= ∞ - 64

= ∞

Therefore, the probability that the computer lasts at least 4 years is 1 (or 100%).

c) Probability that the computer lasts less than 1 year:

To find this probability, we need to integrate the density function f(x) over the interval [0, 1]:

P(x < 1) = ∫[0,1] f(x) dx

Since the density function f(x) is defined piecewise, we need to split the integral into two parts:

P(x < 1) = ∫[0,1] f(x) dx

= ∫[0,1] 8x dx (for x > 2)

= ∫[0,1] 8x dx

= [4x^2]0^1

= 4(1^2) - 4(0^2)

= 4(1) - 4(0)

= 4 - 0

= 4

Therefore, the probability that the computer lasts less than 1 year is 4.

d) Probability that the computer lasts exactly 2.48 years:

Since the density function f(x) is defined piecewise, we need to check whether 2.48 falls into the range where f(x) is nonzero. In this case, it does not since 2.48 ≤ 2. Therefore, the probability that the computer lasts exactly 2.48 years is 0.

e) Expected value of the number of years that the computer lasts:

The expected value, E(X), can be calculated using the formula:

E(X) = ∫(-∞,∞) x * f(x) dx

For the given density function f(x), we can split the integral into two parts:

E(X) = ∫[2,∞) x * f(x) dx + ∫(-∞,2] x * f(x) dx

First, let's calculate ∫[2,∞) x * f(x) dx:

∫[2,∞) x * f(x) dx = ∫[2,∞) x * (8x) dx (for x > 2)

= ∫[2,∞) 8x^2 dx

= [8(1/3)x^3]2^∞

= lim(x→∞) [8(1/3)x^3] - (8(1/3)(2^3))

= lim(x→∞) (8/3)x^3 - 64/3

= ∞ - 64/3

= ∞

Next, let's calculate ∫(-∞,2] x * f(x) dx:

∫(-∞,2] x * f(x) dx = ∫(-∞,2] x * (s) dx (for x ≤ 2)

= 0 (since f(x) = 0 for x ≤ 2)

Therefore, the expected value of the number of years that the computer lasts is undefined (or infinite) in this case.

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Thus, the value of t0 such that the probability of 't' falling between -t0 and t0 is equal to 0.90 for a t-distribution with 14 degrees of freedom is approximately 2.145.

The problem here is asking us to find the value of t0, such that the probability of t falling between -t0 and t0 is equal to 0.90. In other words, we are looking for the two-tailed critical value for a t-distribution with 14 degrees of freedom.

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The maximum value of f(x,y)=x^3y^5 subject to the constraint x+y=8 is 0, which occurs when x=0 or y=0.

To use the method of Lagrange multipliers, we first define the Lagrange function:

L(x, y, λ) = x^3y^5 + λ(x + y - 8)

Now, we find the partial derivatives of L with respect to x, y, and λ:

∂L/∂x = 3x^2y^5 + λ

∂L/∂y = 5x^3y^4 + λ

∂L/∂λ = x + y - 8

We set the partial derivatives equal to zero to find the critical points:

3x^2y^5 + λ = 0

5x^3y^4 + λ = 0

x + y = 8

Solving the first two equations for x and y gives:

x = √(3/5)

y = 8 - √(3/5)

Substituting these values into the third equation gives:

√(3/5) + 8 - √(3/5) = 8

So, the critical point is:

(x, y) = (√(3/5), 8 - √(3/5))

Now, we need to check if this point corresponds to a maximum, minimum, or saddle point. To do this, we find the second partial derivatives of L with respect to x and y:

∂^2L/∂x^2 = 6xy^5

∂^2L/∂y^2 = 20x^3y^3

∂^2L/∂x∂y = 15x^2y^4

Evaluating these at the critical point, we get:

∂^2L/∂x^2 = 6(√(3/5))(8 - √(3/5))^5 > 0

∂^2L/∂y^2 = 20(√(3/5))^3(8 - √(3/5))^3 > 0

∂^2L/∂x∂y = 15(√(3/5))^2(8 - √(3/5))^4 > 0

Since the second partial derivatives are all positive, the critical point corresponds to a minimum of f(x,y)=x^3y^5 subject to the constraint x+y=8. Therefore, the maximum value of f occurs at the boundary of the constraint, which is when x or y is zero. Evaluating f at these points, we get:

f(0,8) = 0

f(8,0) = 0

So, the maximum value of f(x,y)=x^3y^5 subject to the constraint x+y=8 is 0, which occurs when x=0 or y=0.

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Main answer: The car's value after one year was $15,000.

Supporting explanation:

The cost of Mr. Deaver's new car was $20,000. After one year, the car's value decreased by 25%. Therefore, the car's value after one year can be found by subtracting the 25% decrease from the original cost of the car:

25% of $20,000 = 0.25 × $20,000 = $5,000

Subtracting $5,000 from $20,000 gives us the car's value after one year:

$20,000 - $5,000 = $15,000

Therefore, the car's value after one year was $15,000.

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The original price was $125, the discount was $43.75, and the sale price was $81.25.

We can find the discount as follows: To find the discount: Discount = Original Price - Sale Price Discount = $125 - $81.25

Discount = $43.75Therefore, the discount is $43.75

We can now find the selling price as follows: Selling Price = Original Price - Discount Selling Price = $125 - $43.75Selling Price = $81.25Therefore, the selling price is $81.25. To summarize: Original Price: $125Discount: $43.75Sale Price: $81.25The original price was $125, the discount was $43.75, and the sale price was $81.25.

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To prove that r is an equivalence relation, we need to show that it satisfies the following three properties: Reflexivity, symmetry and transitivity.

a) Proving reflexivity: For all m ε ℤ, we need to show that m r m, i.e., 3 | (m2 – m2) = 0.

Since 0 is divisible by 3, reflexivity holds.

b) Proving symmetry: For all m, n ε ℤ, we need to show that if m r n, then n r m. Suppose m r n, i.e., 3 | (m2 – n2).

This means that there exists an integer k such that m2 – n2 = 3k. Rearranging this equation, we get n2 – m2 = –3k.

Since –3k is also an integer, we have 3 | (n2 – m2), which implies that n r m. Therefore, symmetry holds.

c) Proving transitivity: For all m, n, and p ε ℤ, we need to show that if m r n and n r p, then m r p.

Suppose m r n and n r p, i.e., 3 | (m2 – n2) and 3 | (n2 – p2). This means that there exist integers k and l such that m2 – n2 = 3k and n2 – p2 = 3l. Adding these two equations, we get m2 – p2 = 3k + 3l = 3(k + l). Since k + l is also an integer, we have 3 | (m2 – p2), which implies that m r p.

Therefore, transitivity holds.Since r satisfies all three properties of an equivalence relation, we can conclude that r is indeed an equivalence relation.

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The expression ∫[tex]e^{3\theta}[/tex] sin(4θ) dθ when integrated is 1/25(3[tex]e^{3\theta}[/tex]sin(4θ) - 4cos(4θ)) + C

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

∫[tex]e^{3\theta}[/tex] sin(4θ) dθ

Express properly

∫ dy =  ∫[tex]e^{3\theta}[/tex] sin(4θ) dθ

So, we have the following representation

y =  ∫[tex]e^{3\theta}[/tex] sin(4θ) dθ

When each term of the expression are integrated using the first principle and the product rule, we have

[tex]e^{3\theta}[/tex] = [tex]e^{3\theta}[/tex]/25(3sin(4θ))

sin(4θ) = -4cos(4θ)/25 + C

Where C is a constant

This implies that

y = 1/25(3[tex]e^{3\theta}[/tex]sin(4θ) - 4cos(4θ)) + C

So, the solution is 1/25(3[tex]e^{3\theta}[/tex]sin(4θ) - 4cos(4θ)) + C

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