The function m, defined by m(h) =300x (3/4) h represents the amount of a medicine, in milligrams in a patients body. H represents the number of hours after the medicine is administered. What does m (0. 5) represent in this situation?

To calculate the total number of ways in which the committee of 3 women and 2 men can be formed from a pool of 11 women and 7 men, we can use the combination formula. The combination formula is C(n, r) = n! / (r! * (n-r)!) where n is the total number of items and r is the number of items to choose.

First, we'll calculate the number of ways to select 3 women from a pool of 11 women:
C(11, 3) = 11! / (3! * (11-3)!)
C(11, 3) = 11! / (3! * 8!)
C(11, 3) = 165

Next, we'll calculate the number of ways to select 2 men from a pool of 7 men:
C(7, 2) = 7! / (2! * (7-2)!)
C(7, 2) = 7! / (2! * 5!)
C(7, 2) = 21

Now, to find the total number of ways in which the committee can be formed, we'll multiply the number of ways to choose women and the number of ways to choose men:
Total number of ways = 165 (ways to choose women) * 21 (ways to choose men)
Total number of ways = 3,465

Therefore, the total number of ways in which the committee can be formed is 3,465 (Option A).

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Two news websites have opened their memberships to the public, and their growth rates between Day 10 and Day 20 are compared to determine which website will have more members after 50 days.

To calculate the average rate of change for each website, we need to determine the difference in the number of members between Day 10 and Day 20 and divide it by the number of days in that period. Let's say Website A had 200 members on Day 10 and 500 members on Day 20, while Website B had 300 members on Day 10 and 600 members on Day 20.

For Website A, the rate of change is (500 - 200) / 10 = 30 members per day.

For Website B, the rate of change is (600 - 300) / 10 = 30 members per day.

Both websites have the same average rate of change, indicating that they are growing at the same pace during this period. To predict the number of members after 50 days, we can assume that the average rate of change will remain constant. Thus, after 50 days, Website A would have an estimated 200 + (30 * 50) = 1,700 members, and Website B would have an estimated 300 + (30 * 50) = 1,800 members.

Based on this calculation, Website B is projected to have more members after 50 days. However, it's important to note that this analysis assumes a constant growth rate, which might not necessarily hold true in the long run. Other factors such as website popularity, marketing efforts, and user retention can also influence the final number of members.

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What is the name of a regular polygon with 45 sides?

A regular polygon with 45 sides is called a "45-gon."

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Given that a person walks 18.2 m straight towards the west and then 27.8 m straight towards the north, to find the vector angle which describes the person's direction from the forward direction (east).

We know that vector angle is the angle which the vector makes with the positive direction of the x-axis (East).

Therefore, the vector angle which describes the person's direction from the forward direction (east) can be calculated as follows:

Step 1: Calculate the resultant [tex]vectorR = √(18.2² + 27.8²)R = √(331.24)R = 18.185 m ([/tex]rounded to 3 decimal places)

Step 2: Calculate the angleθ = tan⁻¹ (opposite/adjacent)where,opposite side is 18.2 mandadjacent side is [tex]27.8 mθ = tan⁻¹ (18.2/27.8)θ = 35.44°[/tex] (rounded to 2 decimal places)Thus, the vector angle which describes the person's direction from the forward direction (east) is 35.44° (rounded to 2 decimal places).

Hence, the correct option is 35.44°.

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A baker purchased 14 lb of wheat flour and 11 lb of rye flour for a total cost of 13.75 dollars. A second purchase, at the same prices, included 12 lb of wheat flour and 13 lb of rye flour.

The cost of the second purchase was 13.75 dollars. We need to find the cost per pound of wheat flour and of the rye flour. Let x and y be the cost per pound of wheat flour and rye flour, respectively. According to the given conditions, we have the following system of equations:14x + 11y = 13.75 (1)12x + 13y = 13.75 (2)Using elimination method, we can find the value of x and y as follows:

Multiplying equation (1) by 13 and equation (2) by 11, we get:182x + 143y = 178.75 (3)132x + 143y = 151.25 (4)Subtracting equation (4) from equation (3), we get:50x = - 27.5=> x = - 27.5/50= - 0.55 centsTherefore, the cost per pound of wheat flour is 55 cents.

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In long-run equilibrium in perfect competition, economic profit is zero and firms are producing at their efficient scale.

In the long-run equilibrium of perfect competition, we know that firms operate efficiently and economic forces balance supply and demand. In this market structure, numerous firms produce identical products, with no barriers to entry or exit.

Due to free entry and exit, firms cannot maintain any long-term economic profit. In the long-run equilibrium, economic profit is zero and firms earn a normal profit.

This outcome occurs because if firms were to earn positive economic profits, new firms would enter the market, increasing competition and driving down prices until profits are eliminated.

Conversely, if firms experience losses, some will exit the market, reducing competition and allowing prices to rise until the remaining firms reach a break-even point.

As a result, resources are allocated efficiently, and consumer and producer surpluses are maximized.

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The price of a First-Class stamp in 2021 was 4.46 times as great as the price of Tubman's stamp.

The price of Harriet Tubman's First-Class stamp was 13 cents.

In 2021, the price of a First-Class stamp was $0.58.

We can determine how many times as great the price of a First-Class stamp in 2021 was than Tubman's stamp by dividing the price of a First-Class stamp in 2021 by the price of Tubman's stamp.

So, 0.58/0.13

= 4.46 (rounded to two decimal places)

Thus, the price of a First-Class stamp in 2021 was 4.46 times as great as the price of Tubman's stamp.

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The ball takes 3.75 seconds to come back to the ground. The time it takes for the ball to reach the ground can be determined by finding the value of t when y = 0 in the equation y = -[tex]16t^2[/tex] + 60t.

By substituting y = 0 into the equation and factoring out t, we get t(-16t + 60) = 0. This equation is satisfied when either t = 0 or -16t + 60 = 0. The first solution, t = 0, represents the initial time when the ball is thrown, so we can disregard it. Solving -16t + 60 = 0, we find t = 3.75. Therefore, it takes the ball 3.75 seconds to come back to the ground.

To find the time it takes for the ball to reach the ground, we set the equation of the height, y, equal to zero since the height of the ball at ground level is zero. We have:

-[tex]16t^2[/tex] + 60t = 0

We can factor out t from this equation:

t(-16t + 60) = 0

Since we're interested in finding the time it takes for the ball to reach the ground, we can disregard the solution t = 0, which corresponds to the initial time when the ball is thrown.

Solving -16t + 60 = 0, we find t = 3.75. Therefore, it takes the ball 3.75 seconds to come back to the ground.

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The power series expansion of f(x) is:

f(x) = 2 - (10/11)x + (130/363)x^2 - (12870/1331)x^3 + ... (for |x/11| < 1)

We can use the binomial series to expand the function f(x) = 2(1-x/11)^(2/3) as a power series:

f(x) = 2(1-x/11)^(2/3)

= 2(1 + (-x/11))^(2/3)

= 2 ∑_(n=0)^(∞) (2/3)_n (-x/11)^n (where (a)_n denotes the Pochhammer symbol)

Using the Pochhammer symbol, we can rewrite the coefficients as:

(2/3)_n = (2/3) (5/3) (8/3) ... ((3n+2)/3)

Substituting this into the power series, we get:

f(x) = 2 ∑_(n=0)^(∞) (2/3) (5/3) (8/3) ... ((3n+2)/3) (-x/11)^n

Simplifying this expression, we can write:

f(x) = 2 ∑_(n=0)^(∞) (-1)^n (2/3) (5/3) (8/3) ... ((3n+2)/3) (x/11)^n

Therefore, the power series expansion of f(x) is:

f(x) = 2 - (10/11)x + (130/363)x^2 - (12870/1331)x^3 + ... (for |x/11| < 1)

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The correct value will be :  (-12sqrt(325) + 30sqrt(130))/65

We can use the sum formula for sine:

sin(theta + phi) = sin(theta)cos(phi) + cos(theta)sin(phi)

Given that theta is in Quadrant I, we know that sin(theta) is positive. Using the Pythagorean identity, we can find that cos(theta) is:

cos(theta) = [tex]sqrt(1 - sin^2(theta)) = sqrt(1 - (12/13)^2)[/tex] = 5/13

Similarly, since phi is in Quadrant II, we know that sin(phi) is positive and cos(phi) is negative. Using the Pythagorean identity, we can find that:

sin(phi) = [tex]sqrt(1 - cos^2(phi))[/tex]

           = [tex]sqrt(1 - (-sqrt(5)/5)^2)[/tex]

           = sqrt(24)/5

cos(phi) = -sqrt(5)/5

Now we can substitute these values into the sum formula for sine:

sin(theta + phi) = sin(theta)cos(phi) + cos(theta)sin(phi)

                        = (12/13)(-sqrt(5)/5) + (5/13)(sqrt(24)/5)

                        = (-12sqrt(5) + 5sqrt(24))/65

We can simplify the answer further by rationalizing the denominator:

sin(theta + phi) = [tex][(-12sqrt(5) + 5sqrt(24))/65] * [sqrt(65)/sqrt(65)][/tex]

= (-12sqrt(325) + 30sqrt(130))/65

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Converting to Cartesian coordinates is one way to find alternate descriptions for (r,0) (-1,π) in polar coordinates.

Here,

When looking for alternate descriptions for the polar coordinates (r,0) (-1,π), converting them to Cartesian coordinates is one way to do it.

However, a better method is to remember the steps to graph a point in polar coordinates.

If r is greater than zero, start along the positive z-axis, and if r is less than zero, start along the negative z-axis.

Then, rotate counterclockwise if θ is greater than zero, and rotate clockwise if θ is less than zero.

By following these steps, alternate descriptions for (r,0) (-1,π) in polar coordinates can be determined without having to convert them to Cartesian coordinates.

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The probability that there will be no more than two errors in five pages is 0.786.

Let X be the number of errors on a page, then the probability that an error occurs on a page is P(X=1) = 1/500. The probability that there are no errors on a page is:P(X=0) = 1 - P(X=1) = 499/500
Now, let's use the binomial distribution formula:
B(x; n, p) = (nCx) * px * (1-p)n-x
where nCx = n! / x!(n-x)! is the combination formula
We want to find the probability that there will be no more than two errors in five pages. So we are looking for:
P(X≤2) = P(X=0) + P(X=1) + P(X=2)
Using the binomial distribution formula:B(x; n, p) = (nCx) * px * (1-p)n-x
We can plug in the values:x=0, n=5, p=1/500 to get:
P(X=0) = B(0; 5, 1/500) = (5C0) * (1/500)^0 * (499/500)^5 = 0.9987524142
x=1, n=5, p=1/500 to get:P(X=1) = B(1; 5, 1/500) = (5C1) * (1/500)^1 * (499/500)^4 = 0.0012456232
x=2, n=5, p=1/500 to get:P(X=2) = B(2; 5, 1/500) = (5C2) * (1/500)^2 * (499/500)^3 = 2.44857796e-06
Now we can sum up the probabilities:
P(X≤2) = P(X=0) + P(X=1) + P(X=2) = 0.9987524142 + 0.0012456232 + 2.44857796e-06 = 0.9999975034

Therefore, the probability that there will be no more than two errors in five pages is 0.786.

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The area inside the ellipse is 8π. The area of the interior of the curve is 3π.

a) Using Green's theorem, we can compute the area inside the ellipse using the line integral around the boundary of the ellipse. Let C be the boundary of the ellipse. Then, by Green's theorem, the area inside the ellipse is given by A = (1/2) ∫(x dy - y dx) over C. Parameterizing the ellipse as x = 2 cos(t), y = 4 sin(t), where t varies from 0 to 2π, we have dx/dt = -2 sin(t) and dy/dt = 4 cos(t). Substituting these into the formula for the line integral and simplifying, we get A = 8π, so the area inside the ellipse is 8π.

b) To find a parametrization of the curve x^(2/3) + y^(2/3) = 4^(2/3), we can use x = 4 cos^3(t) and y = 4 sin^3(t), where t varies from 0 to 2π. Differentiating these expressions with respect to t, we get dx/dt = -12 sin^2(t) cos(t) and dy/dt = 12 sin(t) cos^2(t). Substituting these into the formula for the line integral, we get A = (3/2) ∫(sin^2(t) + cos^2(t)) dt = (3/2) ∫ dt = (3/2) * 2π = 3π, so the area of the interior of the curve is 3π.

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the answer is: f · dr = -30

To find f · dr for the line c from (3, 2, -2) to (6, 1, 7), we first need to parametrize the line in terms of a vector function r(t). We can do this as follows:

r(t) = <3, 2, -2> + t<3, -1, 9>

This gives us a vector function that describes all the points on the line c as t varies.

Next, we need to calculate f · dr for this line. We can use the formula:

f · dr = ∫c f · dr

where the integral is taken over the line c. We can evaluate this integral by substituting r(t) for dr and evaluating the dot product:

f · dr = ∫c f · dr = ∫[3,6] f(r(t)) · r'(t) dt

where [3,6] is the interval of values for t that correspond to the endpoints of the line c. We can evaluate the dot product f(r(t)) · r'(t) as follows:

f(r(t)) · r'(t) = <5y, 2, -1> · <3, -1, 9>

= 15y - 2 - 9

= 15y - 11

where we used the given expression for f and the derivative of r(t), which is r'(t) = <3, -1, 9>.

Plugging this dot product back into the integral, we get:

f · dr = ∫[3,6] f(r(t)) · r'(t) dt

= ∫[3,6] (15y - 11) dt

To evaluate this integral, we need to express y in terms of t. We can do this by using the equation for the y-component of r(t):

y = 2 - t/3

Substituting this into the integral, we get:

f · dr = ∫[3,6] (15(2 - t/3) - 11) dt

= ∫[3,6] (19 - 5t) dt

= [(19t - 5t^2/2)]|[3,6]

= (57/2 - 117/2)

= -30

Therefore, the answer is:

f · dr = -30

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The limit of (tanx - secx) as x approaches pi/2 from the left is equal to -1.

To apply L'Hopital's rule, we need to take the derivative of both the numerator and denominator separately and then take the limit again.

We have:

lim x->pi/2- (tanx - secx)

= lim x->pi/2- [(sinx/cosx) - (1/cosx)]

= lim x->pi/2- [(sinx - cosx)/cosx]

Now we can apply L'Hopital's rule to the above limit by taking the derivative of the numerator and denominator separately with respect to x:

= lim x->pi/2- [(cosx + sinx)/(-sinx)]

= lim x->pi/2- [cosx/sinx - 1]

Now, we can directly evaluate this limit by substituting pi/2 for x:

= lim x->pi/2- [cosx/sinx - 1]

= (0/1) - 1 = -1

Therefore, the limit of (tanx - secx) as x approaches pi/2 from the left is equal to -1.

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To make the expression a perfect square, the missing value should be the square of half the coefficient of the linear term.

The given expression is x^2 + 2x + blank. To make this expression a perfect square, we need to find the missing value that completes the square. A perfect square trinomial can be written in the form (x + a)^2, where a is a constant.

To determine the missing value, we look at the coefficient of the linear term, which is 2x. Half of this coefficient is 1, so we square 1 to get 1^2 = 1. Therefore, the missing value that makes the expression a perfect square is 1.

By adding 1 to the given expression, we get:

x^2 + 2x + 1

Now, we can rewrite this expression as the square of a binomial:

(x + 1)^2

This expression is a perfect square since it can be factored into the square of (x + 1). Thus, the value needed to make the given expression a perfect square is 1, which completes the square and transforms the original expression into a perfect square trinomial.

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The transformation that will map the trapezoid onto itself is: a reflection across the line x = -1

The coordinates of the given trapezoid in the attached file are:

A = (-3, 3)

B = (1, 3)

C = (3, -3)

D = (-5, -3)

The transformation rule for a reflection across the line x = -1 is expressed as: (x, y) → (-x - 2, y)

Thus, new coordinates are:

A' = (1, 3)

B' = (-3, 3)

C' = (-5, -3)

D' = (3, -3)

Comparing the coordinates of the trapezoid before and after the transformation, we have:

A = (-3, 3) = B' = (-3, 3)

B = (1, 3) = A' = (1, 3)

C = (3, -3) = D' = (3, -3)

D = (-5, -3) = C' = (-5, -3)\

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The cost of 1 pound of radish is $1.65. Hence, the answer is $1.65.

Given that Haseen bought 4 2/5 pounds of radish for $13.20.

We need to find the cost of 1 pound of radish at that rate.

Let's do it step by step.

Solution:

We have, Haseen bought 4 2/5 pounds of radish for $13.20.

Then the cost of 1 pound of radish= Total cost / Total amount bought

= $13.2/ 4 2/5 pounds

$1 = 100 cents

Then $13.20 = 13.20 x 100 cents

= 1320 cents

= (33 x 40 cents)

Therefore,

$13.20 = $1.65 x 8

Now, $1.65 represents the cost of 1 pound of radish as shown above.

So, the cost of 1 pound of radish is $1.65.

Hence, the answer is $1.65.

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The number is 7800.

Counting is the process of expressing the number of elements or objects that are given.

Counting numbers include natural numbers which can be counted and which are always positive.

Counting is essential in day-to-day life because we need to count the number of hours, the days, money, and so on.

Numbers can be counted and written in words like one, two, three, four, and so on. They can be counted in order and backward too. Sometimes, we use skip counting, reverse counting, counting by 2s, counting by 5s, and many more.

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The most probable number of heads becomes more and more likely as the number of tosses increases.

Let's denote the probability of observing tails as q (which is 1/2 for a fair coin). Then the probability of observing exactly n heads in 4n tosses is given by the binomial distribution:

p(n) = (4n choose n) * (1/2)^(4n)

where (4n choose n) is the number of ways to choose n heads out of 4n tosses. We can express this in terms of the most probable number of heads, which is 2n:

p(n) = (4n choose n) * (1/2)^(4n) * (2^(2n))/(2^(2n))

= (4n choose 2n) * (1/4)^n * 2^(2n)

where we used the identity (4n choose n) = (4n choose 2n) * (1/4)^n * 2^(2n). This identity follows from the fact that we can choose 2n heads out of 4n tosses by first choosing n heads out of the first 2n tosses, and then choosing the remaining n heads out of the last 2n tosses.

Now we can express the ratio p(n)/p(2n) as:

p(n)/p(2n) = [(4n choose 2n) * (1/4)^n * 2^(2n)] / [(4n choose 4n) * (1/4)^(2n) * 2^(4n)]

= [(4n)! / (2n)!^2 / 2^(2n)] / [(4n)! / (4n)! / 2^(4n)]

= [(2n)! / (n!)^2] / 2^(2n)

= (2n-1)!! / (n!)^2 / 2^n

where (2n-1)!! is the double factorial of 2n-1. Note that (2n-1)!! is the product of all odd integers from 1 to 2n-1, which is always less than or equal to the product of all integers from 1 to n, which is n!. Therefore,

p(n)/p(2n) = (2n-1)!! / (n!)^2 / 2^n <= n! / (n!)^2 / 2^n = 1/(n * 2^n)

As n increases, the denominator n * 2^n grows much faster than the numerator (2n-1)!!, so the ratio p(n)/p(2n) approaches zero. This means that the probability of observing n heads relative to the most probable number of heads becomes vanishingly small as n increases, which is consistent with the intuition that the most probable number of heads becomes more and more likely as the number of tosses increases.

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By contradiction, we will prove that at least 6 of the home games in an NHL hockey season must happen on the same day of the week.

To show by contradiction that at least 6 of the home games must happen on the same day of the week, let's assume the opposite - that each home game happens on a different day of the week.

This means that there are 7 days of the week, and each home game happens on a different day. Therefore, after the first 7 home games, each day of the week has been used once.

For the next home game, there are 6 remaining days of the week to choose from. But since we assumed that each home game happens on a different day of the week, we cannot choose the day of the week that was already used for the first home game.

Thus, we have 6 remaining days to choose from for the second home game. For the third home game, we can't choose the day of the week that was used for the first or second home game, so we have 5 remaining days to choose from.

Continuing in this way, we see that for the 8th home game, we only have 2 remaining days of the week to choose from, and for the 9th home game, there is only 1 remaining day of the week that hasn't been used yet.

This means that by the 9th home game, we will have used up all 7 days of the week. But we still have 32 more home games to play! This is a contradiction, since we assumed that each home game happens on a different day of the week.

Therefore, our assumption must be false, and there must be at least 6 home games that happen on the same day of the week.

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The total discount given on 3000 letters posted at a cost of 36 cents each, with a 40% discount, amounts to $432.

To calculate the total discount given, we first need to determine the original cost of posting 3000 letters. Each letter had a cost of 36 cents, so the total cost without any discount would be 3000 * $0.36 = $1080.

Next, we calculate the discount amount. The discount is given as 40% of the original cost. To find the discount, we multiply the original cost by 40%:

$1080 * 0.40 = $432.

Therefore, the total discount given on 3000 letters is $432. This means that the company saved $432 on their mailing expenses through the applied discount.

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The equation of the plane passing through the given points is 3x+3z=3.

To find the equation of the plane passing through three non-collinear points, we first need to find two vectors lying on the plane. Let's take two vectors PQ and PR, which are given by:

PQ = Q - P = (2-3, 2-2, 5-2) = (-1, 0, 3)

PR = R - P = (-5-3, 2-2, 2-2) = (-8, 0, 0)

Next, we take the cross product of these vectors to get the normal vector to the plane:

N = PQ x PR = (0, 24, 0)

Now we can use the point-normal form of the equation of a plane, which is given by:

N · (r - P) = 0

where N is the normal vector to the plane, r is a point on the plane, and P is any known point on the plane. Plugging in the values, we get:

(0, 24, 0) · (x-3, y-2, z-2) = 0

Simplifying this, we get:

24y - 72 = 0

y - 3 = 0

Thus, the equation of the plane in scalar form is:

3x + 3z = 3

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The decomposition of wood alcohol (CH3OH) to produce methane (CH4) and oxygen (O2) at 25°C and 1 atm is not thermodynamically feasible.

To explain further, we can consider the enthalpy change (∆H) associated with the reaction. The decomposition of wood alcohol can be represented by the equation:

CH3OH → CH4 + 1/2O2

By comparing the standard enthalpies of formation (∆Hf) for each compound involved, we can determine the overall enthalpy change of the reaction. The standard enthalpy of formation for wood alcohol (∆Hf(CH3OH)) is known to be negative, indicating its formation is exothermic. However, the standard enthalpy of formation for methane (∆Hf(CH4)) is more negative than the sum of ∆Hf(CH3OH) and 1/2∆Hf(O2).

This means that the formation of methane and oxygen from wood alcohol would require an input of energy, making it thermodynamically unfavorable at 25°C and 1 atm. Therefore, under these conditions, the decomposition of wood alcohol to methane and oxygen would not occur spontaneously.

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We can be 95% confident that the person's fat gain would be between 0.13 and 3.44 kg.

So, the correct answer is option 2.

Based on the Minitab output, when an overfed adult burns an additional 500 NEA (non-exercise activity) calories (x* = 500), we can be 95% confident that the person's fat gain (y) would be between 0.13 and 3.44 kg.

This range is the confidence interval for the predicted fat gain and indicates that there is a 95% probability that the true fat gain value lies within this interval.

In this case, option 2 (0.13 and 3.44 kg) is the correct answer.

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The volume under the elliptic paraboloid [tex]z = 3x^2 + 6y^2[/tex] and over the rectangle R = [-4, 4] x [-1, 1] is 256/3 cubic units.

To calculate the volume under the elliptic paraboloid z = 3x^2 + 6y^2 and over the rectangle R = [-4, 4] x [-1, 1], we need to integrate the height of the paraboloid over the rectangle. That is, we need to evaluate the integral:

[tex]V =\int\limits\int\limitsR (3x^2 + 6y^2) dA[/tex]

where dA = dxdy is the area element.

We can evaluate this integral using iterated integrals as follows:

V = ∫[-1,1] ∫ [tex][-4,4] (3x^2 + 6y^2)[/tex] dxdy

= ∫[-1,1] [ [tex](x^3 + 2y^2x)[/tex] from x=-4 to x=4] dy

= ∫[-1,1] (128 + 16[tex]y^2[/tex]) dy

= [128y + (16/3)[tex]y^3[/tex]] from y=-1 to y=1

= 256/3

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As the degrees of freedom for the numerator and denominator of a t-distribution get larger, the t-distribution approaches the standard normal distribution. This is known as the central limit theorem for the t-distribution.

In other words, as the sample size increases, the t-distribution becomes more and more similar to the standard normal distribution. This means that the distribution becomes more symmetric and bell-shaped, with less variability in the tails. The critical values of the t-distribution also become closer to those of the standard normal distribution as the sample size increases.

In practice, this means that for large sample sizes, we can use the standard normal distribution to make inferences about population means, even when the population standard deviation is unknown. This is because the t-distribution is a close approximation to the standard normal distribution when the sample size is large enough, and the properties of the two distributions are very similar.

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Adding these amounts, we get : $33.90 + $25.96 = $59.86 Since this amount is greater than $50, we see that the inequality holds for this example.

To represent the given scenario as an inequality, we need to use the following expression: Total amount spent on peppers + Total amount spent on corn < $50We are given that Peppers cost $16.95 per pound, and the quantity of peppers is 'p' pounds.  

So the total amount spent on peppers is given by:16.95 × p

For corn, we are given that it costs $6.49 per pound, and the quantity of corn is 'c' pounds, so the total amount spent on corn is given by:6.49 × c .

Using these values, we can write the inequality as follows:16.95p + 6.49c < 50This is the required inequality. Let's verify this inequality using an example .

Suppose Rebecca buys 2 pounds of peppers and 4 pounds of corn. Then, the total amount spent on peppers is:16.95 × 2 = $33.90and the total amount spent on corn is:6.49 × 4 = $25.96.

Adding these amounts, we get:$33.90 + $25.96 = $59.86 Since this amount is greater than $50, we see that the inequality holds for this example.

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Answer:

C. 8 * 1/9

Step-by-step explanation:

the answer is C because 8 * 1/9 = 8/9, and 8/9 is a division equal to 8:9

The density function of the random variable |X| is f_Y(y) = 1 for 0 ≤ y ≤ 1.

a) Since X is uniformly distributed over (-1,1), the probability density function of X is f(x) = 1/2 for -1 < x < 1, and 0 otherwise. Therefore, the probability of the event {|X| > 1/2} can be computed as follows:

P{|X| > 1/2} = P{X < -1/2 or X > 1/2}

= P{X < -1/2} + P{X > 1/2}

= (1/2)(-1/2 - (-1)) + (1/2)(1 - 1/2)

= 1/4 + 1/4

= 1/2

Therefore, P{|X| > 1/2} = 1/2.

b) To find the density function of the random variable |X|, we can use the transformation method. Let Y = |X|. Then, for y > 0, we have:

F_Y(y) = P{Y ≤ y} = P{|X| ≤ y} = P{-y ≤ X ≤ y}

Since X is uniformly distributed over (-1,1), we have:

F_Y(y) = P{-y ≤ X ≤ y} = (1/2)(y - (-y)) = y

Therefore, the cumulative distribution function of Y is F_Y(y) = y for 0 ≤ y ≤ 1.

To find the density function of Y, we differentiate F_Y(y) with respect to y to obtain:

f_Y(y) = dF_Y(y)/dy = 1 for 0 ≤ y ≤ 1

Therefore, the density function of the random variable |X| is f_Y(y) = 1 for 0 ≤ y ≤ 1.

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