suppose that at ccny, 35% of students are international students. what is the probability that 40 students out of a randomly sampled group of 100 are international students? a. 0.1473 b. 0.1041 c. none of these d. 0.8528 e. 0.0483

Answers

Answer 1

Probability that 40 students out of a randomly sampled group of 100 are international students is 0.0483

Given,

35% of students are international students.

40 students out of a randomly sampled group of 100 are international students .

Now,

According to the relation,

n = 100

P(X = x) = [tex]n{C}_x P^{x} (1-P)^{n-x}[/tex]

Substituting the values,

P = 35% = 0.35

P(X = 40) = [tex]100C_{40}(0.35)^{40} (1-0.35)^{100-40}[/tex]

P(X = 40) = 0.0483

Thus option E is correct.

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Related Questions

Data was taken on the time (in minutes ) between eruptions (eruption intervals ) of the Old Faithful geyser in Yellowstone National Park. They counted the time between eruptions 50 times. The mean was 91.3 minutes. (a) The median was 93.5 minutes. Interpret this value in the context of the situatio

Answers

The median was 93.5 minutes.

The given problem is based on the "Data was taken on the time (in minutes ) between eruptions (eruption intervals ) of the Old Faithful geyser in Yellowstone National Park. They counted the time between eruptions 50 times. The mean was 91.3 minutes."

The median is defined as the middle score in a distribution of data, that is, half of the observations are higher and half are lower than the median. The median is an important measure of central tendency that describes the value in the center of the distribution. We know that there are a total of 50 observations taken, with a mean of 91.3 minutes.

The median is given as 93.5 minutes. This indicates that exactly half of the values lie above 93.5 minutes, and half of the values lie below 93.5 minutes. Therefore, we can infer that there are an equal number of eruptions that occurred before and after 93.5 minutes, and so, the eruption time is almost evenly distributed.This means that the Old Faithful geyser in Yellowstone National Park had an almost equal distribution of eruption intervals, with half of the eruptions lasting less than 93.5 minutes and half lasting more than 93.5 minutes. Thus, the median value of 93.5 minutes in the given context can be interpreted as the middle score in the distribution of the eruption intervals.

Therefore, the median eruption interval of the Old Faithful geyser in Yellowstone National Park is 93.5 minutes. It indicates that half of the eruptions had intervals of less than 93.5 minutes and half had intervals of more than 93.5 minutes. This suggests that the geyser has an almost equal distribution of eruption intervals.

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Compute the product AB by the definition of the product of matrices, where A b1​ and Ab2​ are computed separately, and by the row-column rule for computing AB A=⎣⎡​−126​24−3​⎦⎤​,B=[5−2​−24​]

Answers

In order to calculate the product AB by the definition of the product of matrices, where A b1​ and A b2​ are computed separately, and by the row-column rule for computing AB. Here are the steps:

Step 1: Let's calculate A*b1 and A*b2 separately. b1=[5−2​], and b2=[−24​]. A*b1=⎣⎡​−126​24−3​⎦⎤​*[5−2​]=⎣⎡​−126∗5+24∗(−2)24∗5+(−3)∗(−2)​⎦⎤​=⎣⎡​−18−34​⎦⎤​A*b2=⎣⎡​−126​24−3​⎦⎤​*[−24​]=⎣⎡​−126∗(−24)+24∗0−3∗(−24)24∗(−24)+0∗(−3)​⎦⎤​=⎣⎡​66−12​⎦⎤​Therefore, A*b1=[−18−34​] and A*b2=[66−12​]

Step 2: Use the row-column rule to calculate AB.AB=A*b1+[0−24​]*b2=⎣⎡​−18−34​⎦⎤​+[0−24​]⎡⎣​5−6​⎤⎦=⎣⎡​−18−34​⎦⎤​+⎣⎡​0−48​⎦⎤​=⎣⎡​−18−82​⎦⎤​Therefore, the product of AB is given by ⎣⎡​−18−82​⎦⎤​.

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Ali ran 48 kilometers in a week. That was 11 kilometers more than his teammate. Which equations can be used to determine, k, the number of kilometers Ali's teammate ran in the week?

Answers

Ali's teammate ran 37 kilometers in the week. The equation k + 11 = 48 can be used to determine the number of kilometers Ali's teammate ran.

Let's represent the number of kilometers Ali's teammate ran in the week as "k." We know that Ali ran 11 kilometers more than his teammate, so Ali's total distance can be represented as k + 11. Since Ali ran 48 kilometers in total, we can set up the equation k + 11 = 48 to determine the value of k. By subtracting 11 from both sides of the equation, we get k = 48 - 11, which simplifies to k = 37. Therefore, Ali's teammate ran 37 kilometers in the week. The equation k + 11 = 48 can be used to determine the number of kilometers Ali's teammate ran. Let x be the number of kilometers Ali's teammate ran in the week.Therefore, we can form the equation:x + 11 = 48Solving for x, we subtract 11 from both sides to get:x = 37Therefore, Ali's teammate ran 37 kilometers in the week.

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Q3.Q4 thanks~
Which of the following is a direction vector for the line x=2 t-1, y=-3 t+2, t \in{R} ? a. \vec{m}=(4,-6) c. \vec{m}=(-2,3) b. \vec{m}=(\frac{2}{3},-1) d. al

Answers

The direction vector of the line r(t) = <2t - 1, -3t + 2> is given by dr/dt = <2, -3>. Option (a) \vec{m}=(4,-6) is a direction vector for the given line.

In this question, we need to find a direction vector for the line x=2t-1, y=-3t+2, t ∈R. It is given that the line is represented in vector form as r(t) = <2t - 1, -3t + 2>.Direction vector of a line is a vector that tells the direction of the line. If a line passes through two points A and B then the direction vector of the line is given by vector AB or vector BA which is represented as /overrightarrow {AB}or /overrightarrow {BA}.If a line is represented in vector form as r(t), then its direction vector is given by the derivative of r(t) with respect to t.

Therefore, the direction vector of the line r(t) = <2t - 1, -3t + 2> is given by dr/dt = <2, -3>. Hence, option (a) \vec{m}=(4,-6) is a direction vector for the given line.Note: The direction vector of the line does not depend on the point through which the line passes. So, we can take any two points on the line and the direction vector will be the same.

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highly selective quiz show wants their participants to have an average score greater than 90. They want to be able to assert with 95% confidence that this is true in their advertising, and they routinely test to see if the score has dropped below 90. Select the correct symbols to use in the alternate hypothesis for this hypothesis test. Ha:

Answers

The correct symbols to use in the alternate hypothesis for this hypothesis test are as follows:Ha: µ > 90 where µ is the population mean of the quiz show participants' scores.

Hypothesis testing is a statistical process that involves comparing two hypotheses, the null hypothesis, and the alternative hypothesis. The null hypothesis is a statement about a population parameter that assumes that there is no relationship or no significant difference between variables. The alternate hypothesis, on the other hand, is a statement that contradicts the null hypothesis and states that there is a relationship or a significant difference between variables.

In this question, the null hypothesis states that the average score of the quiz show participants is less than or equal to 90, while the alternative hypothesis states that the average score is greater than 90.

The correct symbols to use in the alternate hypothesis for this hypothesis test are as follows:

Ha: µ > 90 where µ is the population mean of the quiz show participants' scores.

To be able to assert with 95% confidence that the average score is greater than 90, the quiz show needs to conduct a one-tailed test with a critical value of 1.645.

If the calculated test statistic is greater than the critical value, the null hypothesis is rejected, and the alternative hypothesis is accepted.

On the other hand, if the calculated test statistic is less than the critical value, the null hypothesis is not rejected.

The one-tailed test should be used because the quiz show wants to determine if the average score is greater than 90 and not if it is different from 90.

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Suppose that it will rain today with probability 0.7, and that it will rain tomorrow with probability 0.8. Find a lower bound on the probability that it will rain both today and tomorrow

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The probability of raining both today and tomorrow is 0.56.

The probability that it will rain today is 0.7, and the probability that it will rain tomorrow is 0.8, we need to find the lower bound on the probability that it will rain both today and tomorrow. To find the lower bound on the probability that it will rain both today and tomorrow, we need to calculate by multiplying the probability of raining today and tomorrow using the formula; P (rain both today and tomorrow) = P (rain today) × P (rain tomorrow)

We have: P (rain today) = 0.7P (rain tomorrow) = 0.8 Substituting the given values in the above formula, we have: P (rain both today and tomorrow) = 0.7 × 0.8= 0.56 Therefore, the probability that it will rain both today and tomorrow is 0.56 or 56%. Hence, the main answer to the question is 0.56.

The lower bound on the probability that it will rain both today and tomorrow is 0.56 or 56%. To answer this question, we multiplied the probability of raining today and tomorrow and found that the main answer to the question is 0.56. Therefore, the conclusion of the answer is that the probability of raining both today and tomorrow is 0.56.

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Find the sum of the first 37 terms in the sequence 14,23,32,41

Answers

Answer:

6512

Step-by-step explanation:

This is an arithmetic sequence. Each term is obtained by adding 9 to the previous term.

   First term = a = 14

Common difference = d = second term - first term

                                       = 23 - 14

                                    d = 9

number of terms = n = 37

 [tex]\boxed{\bf S_n = \dfrac{n}{2}(2a + (n-1)d}\\\\\text{\bf $ \bf S_n$ is the sum of first n terms.} \\\\[/tex]

         [tex]\sf S_{37}= \dfrac{37}{2}(2*14 + (37-1)*9)\\\\\\~~~~~ = \dfrac{37}{2}(28+36*9)\\\\~~~~~=\dfrac{37}{2}*(28+324)\\\\\\~~~~~= \dfrac{37}{2}*352\\\\~~~~~= 37 * 176\\\\S_{37}=6512[/tex]

For a consumer with demand function q=100−5p 1/2
, find: a) consumer surplus(CS), at price p 0

=9 b) CS, at price p
^

=4 c) ΔCS, resulting from the price change p 0

=9 to p
^

=4 Illustrate your results on a single graph.

Answers

a)An consumer  demand function surplus(CS), at price p 0CS = [8500 - (10/3)(85)²(3/2)]

b) CS, at price p CS = [9000 - (10/3)(90)²(3/2)]

c)ΔCS, resulting from the price change p₀ = 9 and P= 4.

To calculate consumer surplus (CS) using the demand function q = 100 - 5p²(1/2),  to find the inverse demand function. The inverse demand function expresses price as a function of quantity.

Let's solve for the inverse demand function:

q = 100 - 5p²(1/2)

Rearranging the equation,

p²(1/2) = (100 - q) / 5

Squaring both sides of the equation:

p = [(100 - q) / 5]²

a) To calculate consumer surplus at price p₀ = 9:

substitute p = 9 into the inverse demand function:

q = 100 - 5(9)²(1/2)

q = 100 - 5(3)

q = 100 - 15

q = 85

Now, let's calculate the CS:

CS = ∫[0, q](100 - 5p^(1/2)) dp

CS = ∫[0, 85](100 - 5p^(1/2)) dp

To find the integral, first integrate the function 100 with respect to p and then integrate -5p²(1/2) with respect to p:

CS = [100p - (10/3)p²(3/2)]|[0, 85]

Substituting the limits of integration:

CS = [100(85) - (10/3)(85)²(3/2)] - [100(0) - (10/3)(0)²(3/2)]

Simplifying:

b) To calculate consumer surplus at price P = 4:

We substitute p = 4 into the inverse demand function:

q = 100 - 5(4)²(1/2)

q = 100 - 5(2)

q = 100 - 10

q = 90

Now, let's calculate the CS:

CS = ∫[0, q](100 - 5p²(1/2)) dp

CS = ∫[0, 90](100 - 5p²(1/2)) dp

Using the same process as before,

CS = [100p - (10/3)p²(3/2)]|[0, 90]

Substituting the limits of integration:

CS = [100(90) - (10/3)(90)²(3/2)] - [100(0) - (10/3)(0)²(3/2)]

Simplifying:

c) To find ΔCS resulting from the price change from p₀ = 9 to P = 4:

ΔCS = CS(P) - CS(p₀)

Substituting the calculated CS values,

ΔCS = [9000 - (10/3)(90)^(3/2)] - [8500 - (10/3)(85)²(3/2)]

The x-axis represents quantity (q), and the y-axis represents price (p).  the demand curve and shade the areas representing consumer surplus at p₀ = 9 and P = 4.

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(20 pts) Using the definition of the asymptotic notations, show that a) 6n 2
+n=Θ(n 2
) b) 6n 2

=O(2n)

Answers

a) The function 6n² + n is proven to be in the Θ(n²) notation by establishing both upper and lower bounds of n² for the function.

b) The function 6n² is shown to not be in the O(2ⁿ) notation through a proof by contradiction.

a) To show that 6n² + n = Θ(n²), we need to prove that n² is an asymptotic upper and lower bound of the function 6n² + n. For the lower bound, we can say that:

6n² ≤ 6n² + n ≤ 6n² + n² (since n is positive)

n² ≤ 6n² + n² ≤ 7n²

Thus, we can say that there exist constants c₁ and c₂ such that c₁n² ≤ 6n² + n ≤ c₂n² for all n ≥ 1. Hence, we can conclude that 6n² + n = Θ(n²).

b) To show that 6n² ≠ O(2ⁿ), we can use a proof by contradiction. Assume that there exist constants c and n0 such that 6n² ≤ c₂ⁿ for all n ≥ n0. Then, taking the logarithm of both sides gives:

2log 6n² ≤ log c + n log 2log 6 + 2 log n ≤ log c + n log 2

This implies that 2 log n ≤ log c + n log 2 for all n ≥ n0, which is a contradiction. Therefore, 6n² ≠ O(2ⁿ).

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Complete Question:








Determine whether the following statement is true or false: b_{1} represents the y - intercept True False

Answers

The given statement is true.

The statement "b1 represents the y-intercept" is true. The y-intercept is the point where the line crosses the y-axis on the coordinate plane.

The equation of a line is often written in slope-intercept form: y = mx + b, where m is the slope of the line and b is the y-intercept. In this equation, b represents the y-intercept, which is the value of y when x is equal to zero. Therefore, b1 can represent the y-intercept value of 150 if it is given in a specific context.

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the free hiring a tour guide to explore a cave is Php 700. QA guide can accomodate maximum of 4 persons, and additional guides can be hired as needed. Represent the cost of hiring guides as a function

Answers

The cost of hiring guides as a function of the number of people who will go on the cave tour is:

Cost(n) =

Php 700, if n ≤ 4

Php 500 x ⌈n/4⌉ - Php 200, if n > 4

where ⌈n/4⌉ denotes the ceiling function, which rounds up n/4 to the nearest integer.

Let's represent the cost of hiring guides as a function of the number of people who will go on the cave tour, denoted by n.

First, we need to determine the number of guides required based on the number of people. Since each guide can accommodate a maximum of 4 persons, we can use integer division to determine the number of guides required:

If n is less than or equal to 4, then only 1 guide is needed.

If n is between 5 and 8, then 2 guides are needed.

If n is between 9 and 12, then 3 guides are needed.

And so on.

Let's denote the number of guides required by g(n). Then we can express the cost of hiring guides as a function of n as:

If n is less than or equal to 4, then the cost is Php 700.

If n is greater than 4, then the cost is (g(n) - 1) times the cost of hiring a single guide, which is Php 500.

Combining these cases, we get:

Cost(n) =

Php 700, if n ≤ 4

Php 500 x (g(n) - 1) + Php 700, if n > 4

Therefore, the cost of hiring guides as a function of the number of people who will go on the cave tour is:

Cost(n) =

Php 700, if n ≤ 4

Php 500 x ⌈n/4⌉ - Php 200, if n > 4

where ⌈n/4⌉ denotes the ceiling function, which rounds up n/4 to the nearest integer.

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"find the solution of the initial value problems by using laplace
y′′−5y′ +4y=0,y(0)=1,y′ (0)=0

Answers

The solution to the initial value problem y'' - 5y' + 4y = 0, y(0) = 1, y'(0) = 0 is: y(t) = (1/3)e^(4t) - (1/3)e^t

To solve this initial value problem using Laplace transforms, we first take the Laplace transform of both sides of the differential equation:

L{y''} - 5L{y'} + 4L{y} = 0

Using the properties of Laplace transforms, we can simplify this to:

s^2 Y(s) - s y(0) - y'(0) - 5 (s Y(s) - y(0)) + 4 Y(s) = 0

Substituting the initial conditions, we get:

s^2 Y(s) - s - 5sY(s) + 5 + 4Y(s) = 0

Simplifying and solving for Y(s), we get:

Y(s) = 1 / (s^2 - 5s + 4)

We can factor the denominator as (s-4)(s-1), so we can rewrite Y(s) as:

Y(s) = 1 / ((s-4)(s-1))

Using partial fraction decomposition, we can write this as:

Y(s) = A/(s-4) + B/(s-1)

Multiplying both sides by the denominator, we get:

1 = A(s-1) + B(s-4)

Setting s=1, we get:

1 = A(1-1) + B(1-4)

1 = -3B

B = -1/3

Setting s=4, we get:

1 = A(4-1) + B(4-4)

1 = 3A

A = 1/3

Therefore, we have:

Y(s) = 1/(3(s-4)) - 1/(3(s-1))

Taking the inverse Laplace transform of each term using a Laplace transform table, we get:

y(t) = (1/3)e^(4t) - (1/3)e^t

Therefore, the solution to the initial value problem y'' - 5y' + 4y = 0, y(0) = 1, y'(0) = 0 is:

y(t) = (1/3)e^(4t) - (1/3)e^t

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Customers arrive at a cafe according to a Poisson process with a rate of 2 customers per hour. What is the probability that exactly 2 customers will arrive within the next one hour? Please select the closest answer value.
a. 0.18
b. 0.09
c. 0.22
d. 0.27

Answers

Therefore, the probability that exactly 2 customers will arrive within the next one hour is approximately 0.27.

The probability of exactly 2 customers arriving within the next one hour can be calculated using the Poisson distribution.

In this case, the rate parameter (λ) is given as 2 customers per hour. We can use the formula for the Poisson distribution:

P(X = k) = (e^(-λ) * λ^k) / k!

where X is the random variable representing the number of customers arriving, and k is the desired number of customers (in this case, 2).

Let's calculate the probability:

P(X = 2) = (e^(-2) * 2^2) / 2! ≈ 0.2707

The closest answer value from the given options is d. 0.27.

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Identify verbal interpretation of the statement
2 ( x + 1 ) = 8

Answers

The verbal interpretation of the statement "2(x + 1) = 8" is "Twice the quantity of x plus one is equal to eight."

The statement "2(x + 1) = 8" is an algebraic equation that involves the variable x, as well as constants and operations. In order to interpret this equation verbally, we need to understand what each part of the equation represents.

Starting with the left-hand side of the equation, the expression "2(x + 1)" can be broken down into two parts: the quantity inside the parentheses (x+1), and the coefficient outside the parentheses (2).

The quantity (x+1) can be interpreted as "the sum of x and one", or "one more than x". The parentheses are used to group these two terms together so that they are treated as a single unit in the equation.

The coefficient 2 is a constant multiplier that tells us to take twice the value of the quantity inside the parentheses. So, "2(x+1)" can be interpreted as "twice the sum of x and one", or "two times one more than x".

Moving on to the right-hand side of the equation, the number 8 is simply a constant value that we are comparing to the expression on the left-hand side. In other words, the equation is saying that the value of "2(x+1)" is equal to 8.

Putting it all together, the verbal interpretation of the statement "2(x + 1) = 8" is "Twice the quantity of x plus one is equal to eight."

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In a study of the relation between students' grades in mathematics and science, the following results were found for six students. Find the Spearman's correlation coefficient. Round your answer to three decimal places

Answers

The study examines the correlation between students' grades in mathematics and science. To calculate the Spearman's correlation coefficient, arrange data in ascending order, assign rank to each value, find the difference between ranks, calculate [tex]d^2[/tex], and sum the values. Apply the formula to find the Spearman's correlation coefficient, which is 0.514 (rounded to three decimal places).

Spearman's correlation coefficient is used to determine the correlation between the rank of two variables. In this study of the relation between students' grades in mathematics and science, the following results were found for six students: Mathematics Grades (X): 80, 90, 70, 60, 85, 75 and Science Grades (Y): 70, 90, 60, 80, 85, 75. We need to calculate the Spearman's correlation coefficient.

Step 1: Arrange the data in ascending order and assign rank to each value.

Step 2: Find the difference (d) between the ranks of each value.

Step 3: Calculate [tex]d^2[/tex] and sum the values of[tex]d^2[/tex].

Step 4: Apply the formula to find the Spearman's correlation coefficient.

X Y Rank of X Rank of Y d d^280 70 3 4 -1 190 90 6 1 5 2570 60 1 6 -5 2590 80 7 3 4 1675 85 4.5 2.5 2 470 75 2 5 -3 9Sum of d^2 = 17

Spearman's correlation coefficient, r = 1 - (6 x 17)/(6(6^2-1))= 1 - (102/210) = 1 - 0.486 = 0.514

The Spearman's correlation coefficient is 0.514 (rounded to three decimal places). Therefore, the correct option is: 0.514.

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Use the limit definition to compute the derivative of the function f(t)=\frac{5}{5-t} at t=-3 . (Use symbolic notation and fractions where needed.)
Find an equation of the tangent line to

Answers

The given function is f(t)=5/(5-t).To compute the derivative of the given function using the limit definition at t=-3, we need to evaluate the following expression

lim_(h->0) [f(-3+h)-f(-3)]/h

We havef(-3+h) = 5/(5-(-3+h)) = 5/(8-h)f(-3) = 5/(5-(-3)) = 5/8

Substituting the above values, we get

lim_(h->0) [f(-3+h)-f(-3)]/h= lim_(h->0) [(5/(8-h)) - (5/8)]/h= lim_(h->0) [(5h)/(8(8-h))] / h= lim_(h->0) (5/(8-h)) / 8= 5/64

Therefore, the derivative of f(t) at t=-3 is 5/64.

Now, to find the equation of the tangent line to f(t) at t=-3, we can use the point-slope form of the equation of a line which is given byy - y1 = m(x - x1)

where m is the slope of the line and (x1, y1) is the point on the line. We already know the value of m which is 5/64. To find the point on the line, we substitute the value of t which is -3 in f(t) which gives usf(-3) = 5/8.

Therefore, the point on the line is (-3, 5/8).

Substituting the values of m, x1 and y1, we gety - 5/8 = (5/64)(t - (-3))

Simplifying the above equation, we get

y - 5/8 = (5/64)(t + 3)64y - 40 = 5(t + 3)64y - 40 = 5t + 1564y = 5t + 196y = (5/64)t + 49/8

Hence, the equation of the tangent line to f(t) at t=-3 is y = (5/64)t + 49/8.

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Every four years in march, the population of a certain town is recorded. In 1995, the town had a population of 4700 people. From 1995 to 1999, the population increased by 20%. What was the towns population in 2005?

Answers

Answer:

7414 people

Step-by-step explanation:

Assuming that the population does increase by 20% for every four years since the last data collection of the population, the population can be modeled by using [tex]T = P(1+R)^t[/tex]

T = Total Population (Unknown)

P = Initial Population

R = Rate of Increase (20% every four years)

t = Time interval (every four year)

Thus, T = 4700(1 + 0.2)^2.5 = 7413.9725 =~ 7414 people.

Note: The 2.5 is the number of four years that occur since 1995. 2005-1995 = 10 years apart.

Since you have 10 years apart and know that the population increases by 20% every four years, 10/4 = 2.5 times.

Hope this helps!

Find the center of mass of a thin plate covering the region 20/x² between the x-axis and the curve y = 4≤x≤8, if the X plate's density at a point (x,y) is 8(x)=2x².

Answers

The center of mass of the thin plate covering the given region is located at (6, 48/5).

To find the center of mass, we need to calculate the moments about the x-axis and y-axis and divide them by the total mass. In this case, the total mass is given by the integral of the density function over the given region.

The moment about the x-axis (Mx) can be calculated as the integral of y multiplied by the density function, 8(x), over the region. Similarly, the moment about the y-axis (My) is the integral of x multiplied by the density function, 8(x), over the region. The total mass (M) is the integral of the density function, 8(x), over the region.

Using these formulas and evaluating the integrals, we find that Mx = 960/5, My = 768/5, and M = 160. The x-coordinate of the center of mass (Cx) is Mx/M, which simplifies to 6, and the y-coordinate of the center of mass (Cy) is My/M, which simplifies to 48/5. Therefore, the center of mass of the thin plate is located at (6, 48/5).

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Find the equation that results from completing the square in the following equation. x^(2)-12x-28=0

Answers

The equation resulting from completing the square is (x - 6)² = 64.

To find the equation that results from completing the square in the equation x² - 12x - 28 = 0, we can follow these steps:

1. Move the constant term to the other side of the equation:

x² - 12x = 28

2. Take half of the coefficient of x, square it, and add it to both sides of the equation:

x² - 12x + (-12/2)²

= 28 + (-12/2)²

x² - 12x + 36

= 28 + 36

3. Simplify the equation:

x² - 12x + 36 = 64

4. Rewrite the left side as a perfect square:

(x - 6)² = 64

Now, the equation resulting from completing the square is (x - 6)² = 64.

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Find the equation of the line that passes through the points (2,12) and (−1,−3). y=−2x+3 y=2x+3 y=5x+2 y=−5x+2

Answers

To find the equation of the line that passes through the points (2, 12) and (-1, -3), we can use the point-slope form of a linear equation:

y - y₁ = m(x - x₁)

where (x₁, y₁) represents one of the given points and m is the slope of the line. First, let's calculate the slope (m) using the two points:

m = (y₂ - y₁) / (x₂ - x₁)

m = (-3 - 12) / (-1 - 2)

= -15 / -3 = 5

Now, we can choose either of the given points and substitute its coordinates into the point-slope form. Let's use the point (2, 12):

y - 12 = 5(x - 2)

Expanding the equation:

y - 12 = 5x - 10

Now, let's simplify and rewrite the equation in slope-intercept form (y = mx + b), where b is the y-intercept:

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Compute the following residues without using a calculator: (a) 868mod14 (b) (−86)10mod8 (c) −2137mod8 (d) 8!mod6

Answers

(a) 868 is congruent to 14 modulo 14, or equivalently, 868 mod 14 = 0.

To compute 868 mod 14, we can repeatedly subtract 14 from 868 until the result is less than 14:

868 - 14*61 = 14

Therefore, 868 is congruent to 14 modulo 14, or equivalently, 868 mod 14 = 0.

(b) To compute (-86)^10 mod 8, we can first simplify the base by reducing it modulo 8:

(-86) mod 8 = 2

Now we can use the fact that for any integer a, a^2 is congruent to either 0 or 1 modulo 8. Therefore, we can compute:

2^2 = 4

2^4 = 16 ≡ 0 (mod 8)

2^8 ≡ 0^2 ≡ 0 (mod 8)

Since 10 is even, we can write 10 as 2*5, and we have:

2^10 = (2^8)(2^2) ≡ 04 ≡ 0 (mod 8)

Therefore, (-86)^10 mod 8 is equal to 0.

(c) To compute -2137 mod 8, we can first note that -2137 is congruent to 7 modulo 8, since -2137 = -268*8 + 7. Therefore, -2137 mod 8 = 7.

(d) To compute 8! mod 6, we can first compute 8!:

8! = 8765432*1 = 40,320

Next, we can reduce 40,320 modulo 6 by adding and subtracting multiples of 6 until we get a result between 0 and 5:

40,320 = 6*6,720 + 0

Therefore, 8! mod 6 is equal to 0.

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Suppose we have a raster image of size 480×600 as I answer the following questions: (a) (2 points) What are the number of rows in this image. (b) (2 points) What are the number of columns in this image. (c) (3 points) If the image is a gray-scale image (i.e., each pixel is represented by 1 value), what is the index in memory of the data for pixel at the i th row and i th column. (d) (3 points) If the image is an RGBA image (i.e., each pixel is represented by 4 values), what is the index in memory of the data for pixel at the i th row and i th
column.

Answers

(a) The number of rows in the image is 480.

(b) The number of columns in the image is 600.

(c) If the image is a gray-scale image, where each pixel is represented by 1 value, the index in memory of the data for the pixel at the i-th row and i-th column can be calculated as follows:

```

index = (i-1) * number_of_columns + (i-1)

```

In this case, the index would be:

```

index = (i-1) * 600 + (i-1)

```

(d) If the image is an RGBA image, where each pixel is represented by 4 values (red, green, blue, and alpha), the index in memory of the data for the pixel at the i-th row and i-th column can be calculated as follows:

```

index = ((i-1) * number_of_columns + (i-1)) * 4

```

In this case, the index would be:

```

index = ((i-1) * 600 + (i-1)) * 4

```

Please note that in both cases, the index is zero-based (i.e., the first row and column have an index of 0).

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a) Assume that nothing is known about the percentage of adults who have heard of the brand.

confidence interval is​ requested,

​b) Assume that a recent survey suggests that about 78​% of adults have heard of the brand.

​c) Given that the required sample size is relatively​ small, could he simply survey the adults at the nearest​college?

Answers

In order to find the confidence interval, we must first find the sample size, the sample proportion and the margin of error. Since nothing is known about the percentage of adults who have heard of the brand, we assume a worst-case scenario, where the sample proportion is 0.5 or 50%. The margin of error, E can be set at 5% or 0.05.  The formula for the sample size is:

n= z2 * p * q / E2

Where:
z = the z-score
p = the sample proportion
q = 1-p
E = the margin of error
n = the sample size


z is the z-score associated with the desired confidence level. For a 95% confidence level, the z-score is 1.96. Hence:

n = (1.96)2 * 0.5 * 0.5 / (0.05)2

n = 384.16 ≈ 385

The sample size required to achieve a 95% confidence interval with a 5% margin of error is 385.

b) Since a recent survey suggests that about 78% of adults have heard of the brand, we can use this value for p instead of 0.5. The formula for the sample size becomes:

n= z2 * p * q / E2



Where:
z = the z-score
p = the sample proportion
q = 1-p
E = the margin of error
n = the sample size

z is the z-score associated with the desired confidence level. For a 95% confidence level, the z-score is 1.96. Hence:

n = (1.96)2 * 0.78 * 0.22 / (0.05)2

n = 371.41 ≈ 372

The sample size required to achieve a 95% confidence interval with a 5% margin of error is 372.

To achieve a representative sample, the survey should be conducted on adults from diverse backgrounds and regions to ensure a range of opinions are captured.

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Which equation represents a line through points (–8, 3) and (–2, –3)?

Answers

Answer:

y = -x - 5

Step-by-step explanation:

To find the equation of the line passing through two given points, we can use the point-slope form of a linear equation:

y - y1 = m(x - x1)

Where m is the slope of the line, and (x1, y1) are the coordinates of one of the points on the line.

We first need to find the slope of the line passing through the two given points. We can use the formula:

m = (y2 - y1)/(x2 - x1)

where (x1, y1) = (-8, 3) and (x2, y2) = (-2, -3)

m = (-3 - 3) / (-2 - (-8)) = -6 / 6 = -1

Now, we can use the point-slope form of the equation with one of the given points, say (-8, 3):

y - 3 = -1(x - (-8))

Simplifying:

y - 3 = -x - 8

y = -x - 5

Answer:

(-8, 3) and (-2, -3) is y = -x - 5

Step-by-step explanation:

To find the equation of a line passing through two given points, we can use the point-slope form of a linear equation:

y - y1 = m(x - x1)

Where (x1, y1) are the coordinates of one of the points on the line, and m is the slope of the line.

Given the points (-8, 3) and (-2, -3), we can calculate the slope (m) using the formula:

m = (y2 - y1) / (x2 - x1)

Substituting the coordinates into the formula:

m = (-3 - 3) / (-2 - (-8))

m = (-3 - 3) / (-2 + 8)

m = (-6) / (6)

m = -1

Now that we have the slope (m = -1) and one of the points (x1, y1) = (-8, 3), we can use the point-slope form to write the equation:

y - 3 = -1(x - (-8))

y - 3 = -1(x + 8)

y - 3 = -x - 8

y = -x - 8 + 3

y = -x - 5

Therefore, the equation that represents a line passing through the points (-8, 3) and (-2, -3) is y = -x - 5.

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An item is purchased in 2004 for $525,000, and in 2019 it is worth $145,500.
Assuming the item is depreciating linearly with time, find the value of the item (in dollars) as a function of time (in years since 2004). Enter your answer in slope-intercept form, using exact numbers.

Answers

To find the value of the item as a function of time, we can use the slope-intercept form of a linear equation: y = mx + b, where y represents the value of the item and x represents the time in years since 2004.

We are given two points on the line: (0, $525,000) and (15, $145,500). These points correspond to the initial value of the item in 2004 and its value in 2019, respectively.

Using the two points, we can calculate the slope (m) of the line:

m = (change in y) / (change in x)

m = ($145,500 - $525,000) / (15 - 0)

m = (-$379,500) / 15

m = -$25,300

Now, we can substitute one of the points (0, $525,000) into the equation to find the y-intercept (b):

$525,000 = (-$25,300) * 0 + b

$525,000 = b

So the equation for the value of the item as a function of time is:

y = -$25,300x + $525,000

Therefore, the value of the item (in dollars) as a function of time (in years since 2004) is given by the equation y = -$25,300x + $525,000.

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Balance the chemical equations using techniques from linear algebra. ( 9 pts.) C 2 H6 +O2 →H 2 O+CO 2 C 8 H18 +O2 →CO2 +H2 O Al2 O3 +C→Al+CO 2

Answers

The balanced chemical equation is: 4Al2O3 + 13C → 8Al + 9CO2 To balance a chemical equation using techniques from linear algebra, we can represent the coefficients of the reactants and products as a system of linear equations.

We then solve this system using matrix algebra to obtain the coefficients that balance the equation.

C2H6 + O2 → H2O + CO2

We represent the coefficients as follows:

C2H6: 2C + 6H

O2: 2O

H2O: 2H + O

CO2: C + 2O

This gives us the following system of linear equations:

2C + 6H + 2O = C + 2O + 2H + O

2C + 6H + 2O = 2H + 2C + 4O

Rearranging this system into matrix form, we get:

[2 -1 -2 0] [C]   [0]

[2  4 -2 -6] [H] = [0]

[O]   [0]

Using row reduction operations, we can solve this system to obtain:

C2H6 + 7/2O2 → 2H2O + CO2

Therefore, the balanced chemical equation is:

2C2H6 + 7O2 → 4H2O + 2CO2

C8H18 + O2 → CO2 + H2O

We represent the coefficients as follows:

C8H18: 8C + 18H

O2: 2O

CO2: C + 2O

H2O: 2H + O

This gives us the following system of linear equations:

8C + 18H + 2O = C + 2O + H + 2O

8C + 18H + 2O = C + 2H + 4O

Rearranging this system into matrix form, we get:

[7 -1 -4 0] [C]   [0]

[8  2 -2 -18] [H] = [0]

[O]   [0]

Using row reduction operations, we can solve this system to obtain:

C8H18 + 25O2 → 16CO2 + 18H2O

Therefore, the balanced chemical equation is:

2C8H18 + 25O2 → 16CO2 + 18H2O

Al2O3 + C → Al + CO2

We represent the coefficients as follows:

Al2O3: 2Al + 3O

C: C

Al: Al

CO2: C + 2O

This gives us the following system of linear equations:

2Al + 3O + C = Al + 2O + C + 2O

2Al + 3O + C = Al + C + 4O

Rearranging this system into matrix form, we get:

[1 -2 -2 0] [Al]   [0]

[1  1 -3 -1] [O] = [0]

[C]   [0]

Using row reduction operations, we can solve this system to obtain:

Al2O3 + 3C → 2Al + 3CO2

Therefore, the balanced chemical equation is:

4Al2O3 + 13C → 8Al + 9CO2

To balance a chemical equation using techniques from linear algebra, we can represent the coefficients of the reactants and products as a system of linear equations. We then solve this system using matrix algebra to obtain the coefficients that balance the equation.

C2H6 + O2 → H2O + CO2

We represent the coefficients as follows:

C2H6: 2C + 6H

O2: 2O

H2O: 2H + O

CO2: C + 2O

This gives us the following system of linear equations:

2C + 6H + 2O = C + 2O + 2H + O

2C + 6H + 2O = 2H + 2C + 4O

Rearranging this system into matrix form, we get:

[2 -1 -2 0] [C]   [0]

[2  4 -2 -6] [H] = [0]

[O]   [0]

Using row reduction operations, we can solve this system to obtain:

C2H6 + 7/2O2 → 2H2O + CO2

Therefore, the balanced chemical equation is:

2C2H6 + 7O2 → 4H2O + 2CO2

C8H18 + O2 → CO2 + H2O

We represent the coefficients as follows:

C8H18: 8C + 18H

O2: 2O

CO2: C + 2O

H2O: 2H + O

This gives us the following system of linear equations:

8C + 18H + 2O = C + 2O + H + 2O

8C + 18H + 2O = C + 2H + 4O

Rearranging this system into matrix form, we get:

[7 -1 -4 0] [C]   [0]

[8  2 -2 -18] [H] = [0]

[O]   [0]

Using row reduction operations, we can solve this system to obtain:

C8H18 + 25O2 → 16CO2 + 18H2O

Therefore, the balanced chemical equation is:

2C8H18 + 25O2 → 16CO2 + 18H2O

Al2O3 + C → Al + CO2

We represent the coefficients as follows:

Al2O3: 2Al + 3O

C: C

Al: Al

CO2: C + 2O

This gives us the following system of linear equations:

2Al + 3O + C = Al + 2O + C + 2O

2Al + 3O + C = Al + C + 4O

Rearranging this system into matrix form, we get:

[1 -2 -2 0] [Al]   [0]

[1  1 -3 -1] [O] = [0]

[C]   [0]

Using row reduction operations, we can solve this system to obtain:

Al2O3 + 3C → 2Al + 3CO2

Therefore, the balanced chemical equation is:

4Al2O3 + 13C → 8Al + 9CO2

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Finally, construct a DFA, A, that recognizes the following language over the alphabet Σ={a,b}. L(A)={w∈Σ ∗
∣w has an even number of a 's, an odd number of b 's, and does not contain substrings aa or bb \} Your solution should have at most 10 states (Hint. The exclusion conditions impose very special structure on L(A)).

Answers

We will define the transition function, δ(q, a) and δ(q, b), for each state q.

To construct a DFA, A, that recognizes the language L(A) = {w ∈ Σ* | w has an even number of a's, an odd number of b's, and does not contain substrings aa or bb}, we can follow these steps:

Identify the states:

We need to keep track of the parity (even/odd) of the number of a's and b's seen so far, as well as the last symbol encountered to check for substrings aa and bb. This leads to a total of 8 possible combinations (states).

Define the alphabet:

Σ = {a, b}

Determine the start state and accept states:

Start state: q0 (initially even a's, odd b's, and no last symbol)

Accept states: q0 (since the number of a's should be even) and q3 (odd number of b's, and no last symbol)

Define the transition function:

We will define the transition function, δ(q, a) and δ(q, b), for each state q.

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(a) 29x^(4)+30y^(4)=46 (b) y=-5x^(3) Symmetry: Symmetry: x-axis y-axis x-axis origin y-axis none of the above origin none of the above

Answers

The symmetry is with respect to the origin. The option D. none of the above is the correct answer.

Given, the following equations;

(a) [tex]29x^{(4)} + 30y^{(4)} = 46 ...(1)[/tex]

(b) [tex]y = -5x^{(3)} ...(2)[/tex]

Symmetry is the feature of having an equivalent or identical arrangement on both sides of a plane or axis. It's a characteristic of all objects with a certain degree of regularity or pattern in shape. Symmetry can occur across the x-axis, y-axis, or origin.

(1) For Equation (1) 29x^(4) + 30y^(4) = 46

Consider, y-axis symmetry that is when (x, y) → (-x, y)29x^(4) + 30y^(4) = 46

==> [tex]29(-x)^(4) + 30y^(4) = 46[/tex]

==> [tex]29x^(4) + 30y^(4) = 46[/tex]

We get the same equation, which is symmetric about the y-axis.

Therefore, the symmetry is with respect to the y-axis.

(2) For Equation (2) y = [tex]-5x^(3)[/tex]

Now, consider origin symmetry that is when (x, y) → (-x, -y) or (x, y) → (y, x) or (x, y) → (-y, -x) [tex]y = -5x^(3)[/tex]

==> [tex]-y = -5(-x)^(3)[/tex]

==> [tex]y = -5x^(3)[/tex]

We get the same equation, which is symmetric about the origin.

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Solve the given initial value problem. y ′′−4y ′ +4y=0;y(0)=−5,y ′(0)=− 439The solution is y(t)=

Answers

the particular solution is:

y(t) = (-5 - 439t)e^(2t)

To solve the given initial value problem, we can assume the solution has the form y(t) = e^(rt), where r is a constant to be determined.

First, we find the derivatives of y(t):

y'(t) = re^(rt)

y''(t) = r^2e^(rt)

Now we substitute these derivatives into the differential equation:

r^2e^(rt) - 4re^(rt) + 4e^(rt) = 0

Next, we factor out the common term e^(rt):

e^(rt)(r^2 - 4r + 4) = 0

For this equation to hold, either e^(rt) = 0 (which is not possible) or (r^2 - 4r + 4) = 0.

Solving the quadratic equation (r^2 - 4r + 4) = 0, we find that it has a repeated root of r = 2.

Since we have a repeated root, the general solution is given by:

y(t) = (C1 + C2t)e^(2t)

To find the particular solution that satisfies the initial conditions, we substitute the values into the general solution:

y(0) = (C1 + C2(0))e^(2(0)) = C1 = -5

y'(0) = C2e^(2(0)) = C2 = -439

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Tiangle D has been dilated to create triangle D′. Use the image to answer the question. image of a triangle labeled D with side lengths of 24, 32, and 40 and a second triangle labeled D prime with side lengths of 6, 8, and 10 Determine the scale factor used.

Answers

To find the scale factor, we can compare the corresponding side lengths of the two triangles.

The length of the corresponding sides in the two triangles are:

D: 24, 32, 40
D': 6, 8, 10

We can see that each side in D' is 1/4 the length of the corresponding side in D. Therefore, the scale factor used to dilate triangle D to create triangle D' is 1/4
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