places.) (a) Compute a 95% CI for μ when n=25 and x
ˉ
=53.6. (, ) watts (b) Compute a 95% CI for μ when n=100 and x
ˉ
=53.6 ( , ) watts (c) Compute a 99%CI for μ when n=100 and x
ˉ
=53.6. ( , ) watts (d) Compute an 82% CI for μ when n=100 and x
ˉ
=53.6. ( , ) watts (e) How large must n be if the width of the 99% interval for μ is to be 1.0 ? (Round your answer up to the nearest whole number.) n=

Answers

Answer 1

(a)  95% CI for μ when n=25 and x will be (51.68, 55.52) watts .

We use the formula for a confidence interval for the mean with known standard deviation:

CI = (x - z*σ/√n, x+ z*σ/√n)

where x is the sample mean, σ is the population standard deviation, n is the sample size, and z is the z-score corresponding to the desired confidence level (95% in this case).

Since the standard deviation is unknown, we use the sample standard deviation s as an estimate for σ.

Plugging in the values, we have:

CI = (53.6 - 1.96*(s/√25), 53.6 + 1.96*(s/√25))

  = (51.68, 55.52) watts

(b) 95% CI for μ when n=100 and x will be (52.42, 54.78) watts.

Using the same formula as in part (a), we have:

CI = (53.6 - 1.96*(s/√100), 53.6 + 1.96*(s/√100))

  = (52.42, 54.78) watts

(c) 99%CI for μ when n=100 and x will be (51.96, 55.24) watts

Using the same formula as in part (a) with a z-score of 2.58 (corresponding to a 99% confidence level), we have:

CI = (53.6 - 2.58*(s/√100), 53.6 + 2.58*(s/√100))

  = (51.96, 55.24) watts

(d) 82% CI for μ when n=100 and x will be (52.95, 54.25) watts

Using the same formula as in part (a) with a z-score of 1.305 (found using a standard normal table or calculator), we have:

CI = (53.6 - 1.305*(s/√100), 53.6 + 1.305*(s/√100))

  = (52.95, 54.25) watts

(e) The value of n will be 267.

We use the formula for the width of a confidence interval:

width = 2*z*(s/√n)

where z is the z-score corresponding to the desired confidence level (99% in this case) and s is the sample standard deviation.

Solving for n, we have:

n = (2*z*s/width)^2

Plugging in the values, we get:

n = (2*2.58*s/1.0)^2

 = 266.49

Rounding up to the nearest whole number, we get n = 267.

To know more about statistics refer here:

https://brainly.com/question/31538429?#

#SPJ11


Related Questions

Anton needs 2 boards to make one shelf one board is 890 cm long and the other is 28. 91 meters long what is the total length of the shelf

Answers

The total length of the shelf is 37.81 meters.

Anton needs 2 boards to make one shelf. One board is 890 cm long and the other is 28.91 meters long. We need to find the total length of the shelf. To solve this problem, we need to convert the length of one board into the same unit as the other board.890 cm is equal to 8.90 meters (1 meter = 100 cm). Therefore, the total length of both boards is:8.90 meters + 28.91 meters = 37.81 metersThus, the total length of the shelf is 37.81 meters. This means that Anton needs 37.81 meters of material to make one shelf that is composed of two boards (one 8.90 meters long and one 28.91 meters long).The answer is 37.81 meters.

Learn more about the word convert here,

https://brainly.com/question/31528648

#SPJ11

the naïve bayes method is a powerful tool for representing dependency structure in a graphical, explicit, and intuitive way.
True or false

Answers

False. The statement is false. The Naive Bayes method is not typically used to represent dependency structure in a graphical, explicit, and intuitive way.

Naive Bayes is a probabilistic machine learning algorithm that is commonly used for classification tasks. It assumes that the features are conditionally independent given the class label. This assumption simplifies the modeling process by assuming that the features contribute independently to the probability of the class. However, Naive Bayes does not explicitly represent or capture the dependency structure between features.

Graphical models, such as Bayesian networks, are specifically designed to represent and visualize dependency structures among variables. Bayesian networks use graphical representations with nodes and edges to represent variables and their conditional dependencies. Each node in the graph represents a random variable, and the edges indicate the probabilistic dependencies between variables.

While Naive Bayes can be viewed as a special case of a Bayesian network with strong independence assumptions, it does not provide a graphical representation of the dependency structure. Naive Bayes assumes independence among features, which may not reflect the true dependencies present in the data.

Therefore, the statement that the Naive Bayes method is a powerful tool for representing dependency structure in a graphical, explicit, and intuitive way is false. It is more appropriate to use graphical models like Bayesian networks when the explicit representation of dependency structure is desired.

To learn more about probability click here:

brainly.com/question/30892850

#SPJ11

(1 point)
7. a marble is rolled down a ramp. the distance it travels is described by the formula d = 490t^2 where d is the distance in centimeters that the marble rolls in t seconds. if the marble is released at the top of a ramp that is 3,920 cm long, for what time period will the marble be more than halfway down the ramp?

t> 2
t> 4
t>8
t> 16

Answers

Here we need to determine the time period for which the marble will be more than halfway down the ramp. The marble will be more than halfway down the ramp for a time period greater than 2.

To determine the time period for which the marble will be more than halfway down the ramp, we need to compare the distance traveled by the marble to half of the length of the ramp.

Given that the distance traveled by the marble is described by the formula d = 490[tex]t^{2}[/tex], and the length of the ramp is 3,920 cm, we can set up the following inequality:490[tex]t^{2}[/tex] > (1/2) * 3,920

Simplifying the equation: 245[tex]t^{2}[/tex] > 1,960

Dividing both sides of the inequality by 245:[tex]t^{2}[/tex] > 8

Taking the square root of both sides: t > √8 , Simplifying further:t > 2√2

Therefore, the marble will be more than halfway down the ramp for a time period greater than 2√2 seconds. This is approximately equal to 2(1.41) = 2.82 seconds.

Therefore, the correct answer is t > 2.82 seconds.

Learn more about time period here:

https://brainly.com/question/32509379

#SPJ11

Use the information given about the angle theta, 0 le theta le 2pi, to find the exact value of the indicated trigonometric function. sin theta = 1/4, tan theta > o find cos theta/2. squareroot 10/4 squareroot 6/4 squareroot 8 + 2 squareroot 15/4 squareroot 8 1 2 squareroot 15/4 Find the exact value of the expression.

Answers

The exact value of the given expression is:(sqrt(15) + 2)/8.We are given that sin(theta) = 1/4 and tan(theta) > 0, where 0 ≤ theta ≤ 2pi. We need to find the exact value of cos(theta/2).

From the given information, we can find the value of cos(theta) using the Pythagorean identity:

cos(theta) = sqrt(1 - sin^2(theta)) = sqrt(15)/4.

Now, we can use the half-angle formula for cosine:

cos(theta/2) = sqrt((1 + cos(theta))/2) = sqrt((1 + sqrt(15)/4)/2) = sqrt((2 + sqrt(15))/8).

Therefore, the exact value of cos(theta/2) is:

cos(theta/2) = sqrt((2 + sqrt(15))/8).

Alternatively, if we rationalize the denominator, we get:

cos(theta/2) = (1/2)*sqrt(2 + sqrt(15)).

Thus, the exact value of cos(theta/2) can be expressed in either form.In the second part of the problem, we are given an expression:

sqrt(10)/4 * sqrt(6)/4 + sqrt(8 + 2sqrt(15))/4 * sqrt(8 - 2sqrt(15))/4.

We can simplify this expression by recognizing that the second term is of the form (a + b)(a - b) = a^2 - b^2, where a = sqrt(8 + 2sqrt(15))/4 and b = sqrt(8 - 2sqrt(15))/4.

Using this identity, we get:

sqrt(10)/4 * sqrt(6)/4 + sqrt(8^2 - (2sqrt(15))^2)/16

= sqrt(10*6)/16 + sqrt(64 - 60)/16

= sqrt(15)/8 + sqrt(4)/8

= (sqrt(15) + 2)/8.

For such more questions on Expression:

https://brainly.com/question/1859113

#SPJ11

Define and distinguish among positive correlation, negative correlation, and no correlation. How do we determine the strength of a correlation?

Define positive correlation. Choose the correct answer below.
A. Positive correlation means that both variables tend to increase (or decrease) together.
B. Positive correlation means that there is a good relationship between the two variables.
C. Positive correlation means that two variables tend to change in opposite directions, with one increasing while the other decreases.
D. Positive correlation means that there is no apparent relationship between the two variables.

Define negative correlation. Choose the correct answer below.
A. Negative correlation means that there is no apparent relationship between the two variables.
B. Negative correlation means that two variables tend to change in opposite directions, with one increasing while the other decreases.
C. Negative correlation means that there is a bad relationship between the two variables.
D. Negative correlation means that both variables tend to increase (or decrease) together.

Define no correlation. Choose the correct answer below.
A. No correlation means that there is no apparent relationship between the two variables.
B. No correlation means that the two variables are always zero.
C. No correlation means that both variables tend to increase (or decrease) together.
D. No correlation means that two variables tend to change in opposite directions, with one increasing while the other decreases.

Answers

To determine the strength of a correlation, we can use a statistical measure called the correlation coefficient. This value ranges from -1 to 1, where -1 indicates a perfect negative correlation, 1 indicates a perfect positive correlation, and 0 indicates no correlation.

The closer the coefficient is to -1 or 1, the stronger the correlation, while values near 0 indicate a weak or no correlation. Positive correlation, negative correlation, and no correlation are types of relationships between two variables.

Positive correlation (A) means that both variables tend to increase (or decrease) together. When one variable increases, the other also increases, and when one decreases, the other also decreases.

Negative correlation (B) means that two variables tend to change in opposite directions, with one increasing while the other decreases. When one variable increases, the other tends to decrease, and vice versa.

No correlation (A) means that there is no apparent relationship between the two variables. The changes in one variable do not seem to consistently affect the changes in the other variable.

To know more about strength of a correlation visit:
https://brainly.com/question/30777155

#SPJ11

use the second fundamental theorem of calculus to find f(x) = integral x-7^x sqrt(t^4 7 dt

Answers

We only need the function f(x), the constants C will cancel each other out:
[tex]f(x) = (1/3)x^3 - (1/3)(x-7)^3[/tex]
This is the function f(x) after applying the Second Fundamental Theorem of Calculus.

To find the function f(x) using the Second Fundamental Theorem of Calculus, we need to evaluate the definite integral from x-7 to x of the given function. \

The integral is:
[tex]f(x) =  \int (x-7)^x \sqrt{(t^4)}  dt[/tex]
First, let's simplify the integrand:
[tex]\sqrt{(t^4) }  = t^2[/tex]
Now the integral becomes:
[tex]f(x) = \int (x-7)^x t^2 dt[/tex]
According to the Second Fundamental Theorem of Calculus, if F(t) is the antiderivative of the integrand t^2, then:
f(x) = F(x) - F(x-7)
To find the antiderivative F(t), we integrate [tex]t^2[/tex]  with respect to t:
[tex]F(t) = \int t^2 dt = (1/3)t^3 + C[/tex]
Now, apply the theorem:
[tex]f(x) = F(x) - F(x-7) = (1/3)x^3 + C - [(1/3)(x-7)^3 + C][/tex]
Since we only need the function f(x), the constants C will cancel each other out:
[tex]f(x) = (1/3)x^3 - (1/3)(x-7)^3[/tex]
This is the function f(x) after applying the Second Fundamental Theorem of Calculus.

For similar question on Calculus.

https://brainly.com/question/29499469

#SPJ11

To use the second fundamental theorem of calculus to find f(x) = integral x-7^x sqrt(t^4 7 dt, we first need to find the antiderivative of the integrand. Using the power rule of integration, we can simplify the integrand to t^2*sqrt(7)*sqrt(t^2)^2, which becomes (1/3)t^3*sqrt(7).

Now, we can apply the second fundamental theorem of calculus, which states that if F(x) is the antiderivative of f(x), then integral from a to b of f(x) dx = F(b) - F(a).

Thus, f(x) = (1/3)t^3*sqrt(7), F(x) = (1/3)x^3*sqrt(7), and the integral from x-7 to x of f(x) dx becomes F(x) - F(x-7) = (1/3)x^3*sqrt(7) - (1/3)(x-7)^3*sqrt(7).

Therefore, the value of f(x) = integral x-7^x sqrt(t^4 7 dt is (1/3)x^3*sqrt(7) - (1/3)(x-7)^3*sqrt(7).

To learn more about second fundamental theorem of calculus click here, brainly.com/question/30763304

#SPJ11


Before your trip to the mountains, your gas tank was full. when you returned home, the gas gauge registered
of a tank. if your gas tank holds 18 gallons, how many gallons did you use to drive to the mountains and back
home?
please help

Answers

The gas gauge will show a lower reading if the gas tank is less than full when you return home after your trip to the mountains.

The gas gauge will show a lower reading if the gas tank is less than full when you return home after your trip to the mountains. This is due to the increased effort required to drive in mountainous terrain, which necessitates more fuel consumption.The amount of fuel used by the car will be determined by a variety of factors, including the engine, the type of vehicle, and the driving conditions. Since the car was driven in the mountains, it is likely that more fuel was used than usual, causing the gauge to show a lower reading.

Know more about  gas gauge here:

https://brainly.com/question/19298882

#SPJ11

Let P(t) be the population (in millions) of a certain city t years after 2015 , and suppose that P(t) satisfies the differential equation P ′(t)=0.06P(t),P(0)=3. (a) Use the differential equation to determine how fast the population is growing when it reaches 5 million people. (b) Use the differential equation to determine the population size when it is growing at a rate of 700,000 people per year. (c) Find a formula for P(t).

Answers

(a) To determine how fast the population is growing when it reaches 5 million people, we can substitute P(t) = 5 into the differential equation P'(t) = 0.06P(t). This gives us P'(t) = 0.06(5) = 0.3 million people per year. Therefore, the population is growing at a rate of 0.3 million people per year when it reaches 5 million people.

(b) To determine the population size when it is growing at a rate of 700,000 people per year, we can set P'(t) = 700,000 and solve for P(t). From the given differential equation, we have 0.06P(t) = 700,000, which implies P(t) = 700,000/0.06 = 11,666,666.67 million people. Therefore, the population size is approximately 11.67 million people when it is growing at a rate of 700,000 people per year.

(c) To find a formula for P(t), we can solve the differential equation P'(t) = 0.06P(t). This is a separable differential equation, and integrating both sides gives us ln(P(t)) = 0.06t + C, where C is the constant of integration. By exponentiating both sides, we get P(t) = e^(0.06t+C). Using the initial condition P(0) = 3, we can find the value of C. Substituting t = 0 and P(0) = 3 into the equation, we have 3 = e^C. Therefore, the formula for P(t) is P(t) = 3e^(0.06t).

Learn more about integration here: brainly.com/question/32386391

#SPJ11

f The table above gives selected values for _ differentiable and increasing funclion f and its derivative Let g be the Increasing function given by g(1) (#)f (8)6 ajaym '("3)f f(3) (9)f 9. Which of the following describes correct process for finding (9 7(9) (9-1) (9) 9'(9 "(08) and 9' (3) = f' (3) + 2f' (6) (6),(1-6) ((o)u-61,6 3() and 9'(3) = f' (3) + f' (6) (8) / pue (8),6 = ((6),-6),6 = (6),(1-6) (9) ,f + (8) ,f (g ') (9) 9(g '(9)) = 9'(3) &nd 9'(3) = f' (3) + 2f" (6)

Answers

The correct process for finding 9'(9) involves using the chain rule of differentiation. Thus  the closest is probably (9) ,f + (8) ,f (g ') (9) 9(g '(9)) = 9'(3) &nd 9'(3) = f' (3) + 2f" (6).

We know that g(9) = f(8), and therefore we can write 9'(9) = f'(8) * g'(9). To find g'(9), we can use the values given in the table and the definition of an increasing function. Since g is increasing, we know that g(1) = f(3) and g(3) = f(9). Therefore, we can write:

g'(9) = (g(3) - g(1))/(3-1) = (f(9) - f(3))/2

To find f'(8), we can use the value given in the table. We know that f'(6) = 4, and therefore we can use the mean value theorem to find f'(8). Specifically, since f is differentiable and increasing, there exists some c between 6 and 8 such that:

f'(c) = (f(8) - f(6))/(8-6) = (g(1) - g(8))/2

Now we can use the given equation to find 9'(3):

9'(3) = f'(3) + f'(6) = 2f'(6)

And we can use the values we just found to find 9'(9):

9'(9) = f'(8) * g'(9) = (g(1) - g(8))/2 * (f(9) - f(3))/2

Note that none of the answer choices given match this process exactly, but the closest is probably (9) ,f + (8) ,f (g ') (9) 9(g '(9)) = 9'(3) &nd 9'(3) = f' (3) + 2f" (6).

More on chain rule: https://brainly.com/question/30478987

#SPJ11

let f(t) be a piecewise continuous on [0,[infinity]) and of exponential order, prove that lim s→[infinity] l(s) = 0 .

Answers

M and α are constants, we have lim s→∞ L(s) = 0, which completes the proof.

Let f(t) be a piecewise continuous function on [0,∞) and of exponential order. This means that there exist constants M and α such that |f(t)| ≤ Me^(αt) for all t ≥ 0.

We want to prove that lim s→∞ L(s) = 0, where L(s) is the Laplace transform of f(t).

We start by using the definition of the Laplace transform:

L(s) = ∫₀^∞ e^(-st) f(t) dt

We can split this integral into two parts: one from 0 to T and another from T to ∞, where T is a positive constant. Then,

L(s) = ∫₀^T e^(-st) f(t) dt + ∫T^∞ e^(-st) f(t) dt

For the first integral, we can use the exponential order of f(t) to get:

|∫₀^T e^(-st) f(t) dt| ≤ ∫₀^T e^(-st) |f(t)| dt ≤ M/α (1 - e^(-sT))

For the second integral, we can use the fact that f(t) is piecewise continuous to get:

|∫T^∞ e^(-st) f(t) dt| ≤ ∫T^∞ e^(-st) |f(t)| dt ≤ M e^(-sT)

Adding these two inequalities, we get:

|L(s)| ≤ M/α (1 - e^(-sT)) + M e^(-sT)

Taking the limit as s → ∞ and using the squeeze theorem, we get:

lim s→∞ |L(s)| ≤ M/α

Since M and α are constants, we have lim s→∞ L(s) = 0, which completes the proof.

Learn more about constants here:

https://brainly.com/question/24166920

#SPJ11

Let X be normal with mean 3.6 and variance 0.01. Find C such that P(X<=c)=5%, P(X>c)=10%, P(-c

Answers

Answer: We can solve this problem using the standard normal distribution and standardizing the variable X.

Let Z be a standard normal variable, which is obtained by standardizing X as:

Z = (X - μ) / σ

where μ is the mean of X and σ is the standard deviation of X.

In this case, X is normal with mean μ = 3.6 and variance σ^2 = 0.01, so its standard deviation is σ = 0.1.

Then, we have:

Z = (X - 3.6) / 0.1

To find C such that P(X <= c) = 5%, we need to find the value of Z for which the cumulative distribution function (CDF) of the standard normal distribution equals 0.05. Using a standard normal table or calculator, we find that:

P(Z <= -1.645) = 0.05

Therefore:

(X - 3.6) / 0.1 = -1.645

X = -0.1645 * 0.1 + 3.6 = 3.58355

So C is approximately 3.5836.

To find C such that P(X > c) = 10%, we need to find the value of Z for which the CDF of the standard normal distribution equals 0.9. Using the same table or calculator, we find that:

P(Z > 1.28) = 0.1

Therefore:

(X - 3.6) / 0.1 = 1.28

X = 1.28 * 0.1 + 3.6 = 3.728

So C is approximately 3.728.

To find C such that P(-c < X < c) = 95%, we need to find the values of Z for which the CDF of the standard normal distribution equals 0.025 and 0.975, respectively. Using the same table or calculator, we find that:

P(Z < -1.96) = 0.025 and P(Z < 1.96) = 0.975

Therefore:

(X - 3.6) / 0.1 = -1.96 and (X - 3.6) / 0.1 = 1.96

Solving for X in each equation, we get:

X = -0.196 * 0.1 + 3.6 = 3.5804 and X = 1.96 * 0.1 + 3.6 = 3.836

So the interval (-c, c) is approximately (-0.216, 3.836).

Answer:

This is not possible, since probabilities cannot be negative. Therefore, there is no value of e that satisfies the given condition

Step-by-step explanation:

We can use the standard normal distribution to solve this problem by standardizing X to Z as follows:

Z = (X - μ) / σ = (X - 3.6) / 0.1

Then, we can use the standard normal distribution table or calculator to find the values of Z that correspond to the given probabilities.

P(X <= c) = P(Z <= (c - 3.6) / 0.1) = 0.05

Using a standard normal distribution table or calculator, we can find that the Z-score corresponding to the 5th percentile is -1.645. Therefore, we have:

(c - 3.6) / 0.1 = -1.645

Solving for c, we get:

c = 3.6 - 1.645 * 0.1 = 3.4355

So, the value of c such that P(X <= c) = 5% is approximately 3.4355.

Similarly, we can find the value of d such that P(X > d) = 10%. This is equivalent to finding the value of c such that P(X <= c) = 90%. Using the same approach as above, we have:

(d - 3.6) / 0.1 = 1.28 (the Z-score corresponding to the 90th percentile)

Solving for d, we get:

d = 3.6 + 1.28 * 0.1 = 3.728

So, the value of d such that P(X > d) = 10% is approximately 3.728.

Finally, we can find the value of e such that P(-e < X < e) = 90%. This is equivalent to finding the values of c and d such that P(X <= c) - P(X <= d) = 0.9. Using the values we found above, we have:

P(X <= c) - P(X <= d) = 0.05 - 0.1 = -0.05

This is not possible, since probabilities cannot be negative. Therefore, there is no value of e that satisfies the given condition

To Know more about standard normal distribution refer here

https://brainly.com/question/29509087#

#SPJ11

A game of "Doubles-Doubles" is played with two dice. Whenever a player rolls two dice and both die show the same number, the roll counts as a double. If a player rolls doubles, the player earns 3 points and gets another roll. If the player rolls doubles again, the player earns 9 more points. Whenever the player rolls the dice and does not roll a double, they lose points. How many points should the player lose for not rolling doubles in order to make this a fair game? Three-fifths StartFraction 27 Over 35 EndFraction Nine-tenths 1.

Answers

The player should lose 1 point for not rolling doubles in order to make this a fair game. Answer: 1.

A game of "Doubles-Doubles" is played with two dice. Whenever a player rolls two dice and both die show the same number, the roll counts as a double. If a player rolls doubles, the player earns 3 points and gets another roll. If the player rolls doubles again, the player earns 9 more points.

Whenever the player rolls the dice and does not roll a double, they lose points.

Three-fifths Start Fraction 27 Over 35

End Fraction Nine-tenths 1.

We can calculate the probability of rolling doubles as:

There are 6 possible outcomes for the first dice. For each of the first 6 outcomes, there is one outcome on the second dice that will make doubles.

So, the probability of rolling doubles is 6/36, which reduces to 1/6.The player earns 3 points for the first roll of doubles and 9 more points for the second roll of doubles.

Thus, the player earns 12 points total if they roll doubles twice in a row.

The probability of not rolling doubles is 5/6. We need to find the value of p that makes the game fair, which means that the expected value is zero.

Therefore, we can write the following equation:

0 = 12p + (-p) p = 0/11 = 0

The player should lose 1 point for not rolling doubles in order to make this a fair game. Answer: 1.

To know more about rolling doubles visit:

https://brainly.com/question/29736587

#SPJ11

find a polar equation for the curve represented by the given cartesian equation. xy = 9

Answers

The polar equation for the curve represented by the cartesian equation xy = 9 is r = 9/(cos(θ)sin(θ)).

To convert the cartesian equation xy = 9 into a polar equation, we can use the following substitutions:

x = r cos(θ)

y = r sin(θ)

Substituting these values into the equation xy = 9:

(r cos(θ))(r sin(θ)) = 9

Simplifying the equation:

r^2 cos(θ)sin(θ) = 9

Dividing both sides by cos(θ)sin(θ):

r^2 = 9/(cos(θ)sin(θ))

Taking the square root of both sides:

r = √(9/(cos(θ)sin(θ)))

Thus, the polar equation for the given cartesian equation is r = 9/(cos(θ)sin(θ)).

For more questions like Equation click the link below:

https://brainly.com/question/29657983

#SPJ11

For the function given​ below, find a formula for the Riemann sum obtained by dividing the interval​ [a,b] into n equal subintervals and using the​ right-hand endpoint for each . Then take a limit of this sum as to calculate the area under the curve over​ [a,b]. ​f(x)4x over the interval ​[1​,5​].

Answers

Using the formula for the sum of an arithmetic series, we can simplify this expression as:
[tex]A = \int_1^5 4x dx = [2x^2]_1^5 = 2(5^2 - 1^2) = 48[/tex]

To find the formula for the Riemann sum for ​f(x) = 4x over the interval ​[1​,5​] using the right-hand endpoint for each subinterval, we need to first determine the width of each subinterval. Since the interval is divided into n equal subintervals, the width of each subinterval is (5-1)/n = 4/n.

Now, we can write the formula for the Riemann sum as:

R_n = f(x_1)Δx + f(x_2)Δx + ... + f(x_n)Δx[tex]R_n = f(x_1) \Delta x + f(x_2)\Delta x + ... + f(x_n)\Delta x[/tex]

where x_i is the right-hand endpoint of the i-th subinterval, and Δx is the width of each subinterval.

Substituting f(x) = 4x and Δx = 4/n, we get:

R_n = 4(1 + 4/n) + 4(1 + 8/n) + ... + 4(1 + 4(n-1)/n)

Simplifying this expression, we get:

R_n = 4/n [n(1 + 4/n) + (n-1)(1 + 8/n) + ... + 2(1 + 4(n-2)/n) + 1 + 4(n-1)/n]

Taking the limit of this sum as n approaches infinity, we get the area under the curve over the interval ​[1​,5​]:

[tex]A = lim_{n->oo} R_n[/tex]

Using the formula for the sum of an arithmetic series, we can simplify this expression as:

[tex]A = \int_1^5 4x dx = [2x^2]_1^5 = 2(5^2 - 1^2) = 48[/tex]

learn more about Riemann sum

https://brainly.com/question/30404402

#SPJ11

Use the Comparison Test or the Limit Comparison Test to determine whether the following series converge.∑ (3k^3+ 4)/(2k^3+1)

Answers

Answer:

The series ∑ ([tex]\frac{(3k^3+ 4)}{2k^3+1}[/tex]) diverges.

Step-by-step explanation:

To determine whether the series ∑ ([tex]\frac{(3k^3+ 4)}{2k^3+1}[/tex]) converges, we will use the Limit Comparison Test with the series ∑ ([tex]\frac{(3k^3+ 4)}{2k^3+1}[/tex])  = ∑(3/2) = infinity.

Let a_k = ∑ ([tex]\frac{(3k^3+ 4)}{2k^3+1}[/tex])  and b_k = [tex]\frac{(3k^3)}{(2k^3)}[/tex]. Then:

lim (a_k / b_k) = lim  ([tex]\frac{(3k^3+ 4)}{2k^3+1}[/tex])  *  [tex]\frac{(2k^3)}{(3k^3)}[/tex].

= lim [[tex]\frac{(6k^6 + 8k^3)}{(6k^6 + 3k^3)}[/tex]]

= lim [[tex]\frac{(6k^6(1 + 8/k^3))}{(6k^6(1 + 1/3k^3))}[/tex]]

= lim [[tex]\frac{(1 + 8/k^3)}{(1 + 1/3k^3)}[/tex]]

= 1

Since lim (a_k / b_k) = 1 and ∑b_k diverges, by the Limit Comparison Test, ∑a_k also diverges.

Therefore, the series ∑ ([tex]\frac{(3k^3+ 4)}{2k^3+1}[/tex]) diverges.

To know more about series refer here

https://brainly.com/question/9673752#

#SPJ11

Choose the best answer. Let X represent the outcome when a fair six-sided die is rolled. For this random variable,
μX=3.5 and σX =1.71.
If this die is rolled 100 times, what is the approximate probability that the total score is at least 375? (a) 0.0000 (b) 0.0017 (c) 0.0721 (d) 0.4420 (e) 0.9279

Answers

The approximate probability that the total score is at least 375 when a fair six-sided die is rolled 100 times is (d) 0.4420.

When a fair six-sided die is rolled, the random variable X represents the outcome. The mean (μX) of X is 3.5, and the standard deviation (σX) is 1.71.

To find the probability that the total score is at least 375 when the die is rolled 100 times, we can use the Central Limit Theorem. According to the theorem, the sum of a large number of independent and identically distributed random variables approximates a normal distribution.

In this case, the sum of the outcomes of 100 rolls of the die follows a normal distribution with a mean of μX multiplied by the number of rolls (100) and a standard deviation of σX multiplied by the square root of the number of rolls (10). Therefore, the approximate probability can be calculated by finding the probability that the sum is greater than or equal to 375.

Using a normal distribution table or a calculator, we can find that the approximate probability is 0.4420, which corresponds to answer (d). This means that there is a 44.20% chance that the total score will be at least 375 when the die is rolled 100 times.

Learn more about probability here:

https://brainly.com/question/31828911

#SPJ11

help please i’m struggling

Answers

Answer:

  12 inches

Step-by-step explanation:

You want the width of an open-top box that is folded from a piece of cardboard with an area of 460 square inches. The box is 3 inches longer than wide, and squares of 4 inches are cut from the corners of the cardboard before it is folded to make the box.

Cardboard dimensions

The flap on either side of the bottom of width x is 4 inches, so the width of the cardboard is 4 + x + 4 =  (x+8). The length is 3 inches more, so is (x+11).

The product of length and width is the area:

  (x +8)(x +11) = 460 . . . . . . . . square inches

Solution

  x² +19x +88 = 460

  x² +19x -372 = 0

  (x +31)(x -12) = 0 . . . . . . . factor

  x = 12 . . . . . . . . . . . the positive value of x that makes a factor zero

The width of the box is 12 inches.

__

Αdditional comment

The attached graph shows the solutions to (x+8)(x+11)-460 = 0. We prefer this form because finding the x-intercepts is usually done easily by a graphing calculator.

Another way to work this problem is to let z represent the average of the cardboard dimensions. Then the width is (z -1.5) and the length is (z+1.5) The product of these is the area: (z -1.5)(z +1.5) = 460. Using the "difference of squares" relation, we find this to be z² -2.25 = 460, the solution being z = √(462.25) = 21.5. Now, you know the cardboard width is 21.5 -1.5 = 20, and the box width is x = 20 -8 = 12.

<95141404393>

Let Y1,Y2, . . . , Yn denote a random sample from a population with pdf f(y|θ)=(θ+1)yθ, 0−1.a. Find an estimator for θ by the method of moments. b. Find the maximum likelihood estimator for θ.

Answers

a. Method of Moments:

To find an estimator for θ using the method of moments, we equate the sample moments with the population moments.

The population moment is given by E(Y) = ∫yf(y|θ)dy. We need to find the first population moment.

E(Y) = ∫y(θ+1)y^θ dy

= (θ+1) ∫y^(θ+1) dy

= (θ+1) * (1/(θ+2)) * y^(θ+2) | from 0 to 1

= (θ+1) / (θ+2)

The sample moment is given by the sample mean: sample_mean = (1/n) * ∑Yi

Setting the population moment equal to the sample moment, we have:

(θ+1) / (θ+2) = (1/n) * ∑Yi

Solving for θ, we get:

θ = [(1/n) * ∑Yi * (θ+2)] - 1

θ = [(1/n) * ∑Yi * θ] + [(2/n) * ∑Yi] - 1

θ - [(1/n) * ∑Yi * θ] = [(2/n) * ∑Yi] - 1

θ(1 - (1/n) * ∑Yi) = [(2/n) * ∑Yi] - 1

θ = ([(2/n) * ∑Yi] - 1) / (1 - (1/n) * ∑Yi)

Therefore, the estimator for θ by the method of moments is:

θ_hat = ([(2/n) * ∑Yi] - 1) / (1 - (1/n) * ∑Yi)

b. Maximum Likelihood Estimator (MLE):

To find the maximum likelihood estimator (MLE) for θ, we need to maximize the likelihood function.

The likelihood function is given by L(θ) = ∏(θ+1)y_i^θ, where y_i represents the individual observations.

To simplify the calculation, we can take the logarithm of the likelihood function and maximize the log-likelihood instead. The log-likelihood function is given by:

ln(L(θ)) = ∑ln((θ+1)y_i^θ)

= ∑(ln(θ+1) + θln(y_i))

= nln(θ+1) + θ∑ln(y_i)

To find the maximum likelihood estimator, we take the derivative of the log-likelihood function with respect to θ and set it equal to zero:

d/dθ [ln(L(θ))] = n/(θ+1) + ∑ln(y_i) = 0

Solving for θ, we get:

n/(θ+1) + ∑ln(y_i) = 0

n/(θ+1) = -∑ln(y_i)

θ + 1 = -n/∑ln(y_i)

θ = -1 - n/∑ln(y_i)

Therefore, the maximum likelihood estimator for θ is:

θ_hat = -1 - n/∑ln(y_i)

Learn more about function here: brainly.com/question/32386236

#SPJ11

evaluate the definite integral. 2 e 1/x3 x4 dx

Answers

The definite integral 2e⁽¹/ˣ³⁾ x⁴ dx, we first need to find the antiderivative of the integrand. We can do this by using substitution. Let u = 1/x³,

then du/dx = -3/x⁴ , or dx = -du/(3x⁴ .) Substituting this expression for dx and simplifying, we get:

∫ 2e⁽¹/ˣ³⁾ x⁴  dx = ∫ -2e^u du = -2e^u + C

Substituting back in for u, we get:

-2e⁽¹/ˣ³⁾ + C

To evaluate the definite integral, we need to plug in the limits of integration, which are not given in the question. Without knowing the limits of integration, we cannot provide a specific numerical answer.

The definite integral is represented as ∫[a, b] f(x) dx, where a and b are the lower and upper limits of integration, respectively. Can you please provide the limits of integration for the given function: 2 * 2e⁽¹/ˣ³⁾ * x⁴ dx.

To know more about probability visit:-

https://brainly.com/question/13604758

#SPJ11

In a survey of 150 students, 30 like baseball. In a population of 1000 students, how many would you expect to like baseball?

Answers

We can expect approximately 200 students to like baseball in a population of 1000 students.

To estimate the number of students who would likely like baseball in a population of 1000 students, we can use the concept of proportion.

Let's first calculate the proportion of students who like baseball in the survey of 150 students:

Proportion = Number of students who like baseball / Total number of students in the survey

Proportion = 30 / 150 = 0.2

Now, we can use this proportion to estimate the number of students who would likely like baseball in the population of 1000 students:

Number of students who like baseball = Proportion * Total number of students in the population

Number of students who like baseball = 0.2 * 1000 = 200

Therefore, based on the survey results, we can expect approximately 200 students to like baseball in a population of 1000 students.

For more such questions on population , Visit:

https://brainly.com/question/30396931

#SPJ11

evaluate the limit. lim→(sin(13) cos(12) tan(14)) (use symbolic notation and fractions where needed. give your answer in vector form.)

Answers

The limit of the given expression is undefined.

The given expression contains the product of three trigonometric functions: sin(13), cos(12), and tan(14). As we approach the limit, the value of the product oscillates wildly between positive and negative infinity, since the value of the tangent function becomes extremely large and positive or negative as its argument approaches odd multiples of pi/2.

Therefore, the limit does not exist. Mathematically, we can express this as:

lim (sin(13) cos(12) tan(14)) = undefined

Alternatively, we can write this limit in vector form as:

lim (sin(13) cos(12) tan(14)) = lim [(sin(13) cos(12)) / cos(14)] = lim [(1/2)(sin(25) - sin(1))] / [(1/2)(cos(27) + cos(11))] = undefined

where we have used the trigonometric identities sin(A+B) = sin(A)cos(B) + cos(A)sin(B), cos(A+B) = cos(A)cos(B) - sin(A)sin(B), and the fact that tan(x) = sin(x) / cos(x).

For more questions like Limit click the link below:

https://brainly.com/question/12207539

#SPJ11

All other things equal, the margin of error in one-sample z confidence intervals to estimate the population proportion gets larger as: On gets larger. O p approaches 0.50. O C-1-a gets smaller. p approaches

Answers

The margin of error is a measure of the degree of uncertainty associated with the point estimate of a population parameter. Confidence intervals are constructed to estimate the true value of a population parameter with a certain level of confidence.

The margin of error and the width of the confidence interval are related, in that a larger margin of error implies a wider confidence interval.

When constructing a one-sample z-confidence interval to estimate the population proportion, the margin of error increases as the sample size increases. This is because larger sample sizes provide more information about the population and, as a result, the estimate becomes more precise. Conversely, as the sample size decreases, the margin of error increases, making the estimate less precise.

The margin of error also increases as the population proportion approaches 0.50. This is because when p=0.50, the population is evenly split between the two possible outcomes. As a result, more variability is expected in the sample proportions, leading to a larger margin of error.

Finally, the margin of error decreases as the confidence level (1-a) increases. This is because a higher confidence level requires a wider interval to account for the additional uncertainty associated with a higher level of confidence. In conclusion, the margin of error in one-sample z confidence intervals is affected by sample size, population proportion, and confidence level.

Learn more about margin of error here:

https://brainly.com/question/29101642

#SPJ11

WHICH GRAPH SHOWS THE SOLUTIONS?

Answers

The graph of the inequality is the third one, counting from the top.

Which graph shows the solution set of the inequality?

Here we have the following inequality:

(1/2)n + 3 < 5

First we need to isolate the variable, we will get:

(1/2)n + 3 < 5

(1/2)n < 5 - 3

(1/2)n < 2

n < 2*2

n < 4

So we will have an open circle at n = 4, and an arrow that goes to the left (because n is smaller than 4).

Then the correct number line is the third one, counting from the top.

Learn more about inequalities:

https://brainly.com/question/24372553

#SPJ1

The stock of Company A lost $3. 63 throughout the day and ended at a value of $56. 87. By what percentage did the stock decline?

Answers

To calculate the percentage decline of the stock, we need to find the percentage decrease in value compared to its initial value.

The initial value of the stock is $56.87 + $3.63 = $60.50 (before the decline).

The decline in value is $3.63.

To find the percentage decline, we can use the formula:

Percentage Decline = (Decline / Initial Value) * 100

Percentage Decline = ($3.63 / $60.50) * 100 ≈ 5.9975%

Therefore, the stock of Company A declined by approximately 5.9975%.

#SPJ11

Is it correct yes or no

Answers

Answer: Yes?

Step-by-step explanation:

Given the following empty-stack PDA with start state 0 and starting stack symbol X. (0, a, X, push(X), 0) (0, b, X, nop, 1) (1, b, X, pop, 1).

Answers

The PDA you provided has three transition rules.  The first rule says that if the current state is 0, the input symbol is 'a', and the top symbol on the stack is 'X', then push a new 'X' onto the stack and stay in state 0.

The second rule says that if the current state is 0, the input symbol is 'b', and the top symbol on the stack is 'X', then do nothing (i.e., don't push or pop any symbols), and transition to state 1.

The third rule says that if the current state is 1, the input symbol is 'b', and the top symbol on the stack is 'X', then pop the 'X' from the stack and stay in state 1.

Note that if the PDA reads any other input symbol than 'a' or 'b', it will get stuck in state 0 with 'X' on the top of the stack, since there are no rules for transitioning on any other input symbol.

In terms of the language recognized by this PDA, it appears that it can recognize strings of the form a^n b^n, where n is a non-negative integer.

To see why, suppose we have a string of the form a^n b^n. We can push n 'X' symbols onto the stack, and then for each 'a' we read, we push another 'X' onto the stack.

Once we have read all the 'a's, the stack will contain 2n 'X' symbols. Then, for each 'b' we read, we pop an 'X' from the stack.

If the input is indeed of the form a^n b^n, then we will end up with an empty stack at the end of the input, and we will be in state 1.

On the other hand, if the input is not of this form, then we will either get stuck in state 0, or we will end up in state 1 with some symbols left on the stack, indicating that the input is not in the language.

Know more about the PDA here:

https://brainly.com/question/27961177

#SPJ11

Derivative e-1/x and 0 show that f0 =0

Answers

The derivative f'(x) = [tex]e^{(-1/x)[/tex] * (1/x²)

f(0) =0

The function f(x) = [tex]e^{(-1/x)[/tex] is defined as:

f(x) = [tex]e^{(-1/x)[/tex] if x > 0

f(x) = 0 if x = 0

To find the derivative of f(x), we can use the chain rule and the power rule:

f'(x) = [tex]e^{(-1/x)[/tex] * (1/x²)

Note that the derivative exists for all x > 0, but not at x = 0. We need to show that f'(0) exists and is equal to 0 to demonstrate that f(x) is differentiable at x = 0.

To do this, we can use the definition of the derivative:

f'(0) = lim(h -> 0) [f(0 + h) - f(0)] / h

For h > 0, we have:

f(0 + h) = [tex]e^{(-1/(0+h))} = e^{(-1/h)[/tex]

For h < 0, we have:

f(0 + h) = [tex]e^{(-1/(0+h)}) = e^{(1/|h|)[/tex]

Note that both of these functions approach 0 as h approaches 0. Therefore, we can write:

f'(0) = lim(h -> 0) [f(0 + h) - f(0)] / h

= lim(h -> 0) f(h) / h

Using L'Hopital's rule, we can take the derivative of the numerator and denominator separately:

f'(0) = lim(h -> 0) f'(h) / 1

Substituting the expression for f'(x), we get:

f'(0) = lim(h -> 0) [tex]e^{(-1/h)[/tex] * (1/h²) / 1

= lim(h -> 0) (1/h²) * [tex]e^{(-1/h)[/tex]

Note that as h approaches 0, [tex]e^{(-1/h)[/tex] approaches 0 faster than 1/h² approaches infinity. Therefore, the limit of f'(0) is equal to 0.

This shows that f(x) is differentiable at x = 0 and that its derivative at x = 0 is equal to 0. Intuitively, we can think of f(x) as a smooth curve that flattens out to 0 as x approaches 0. Therefore, the slope of the curve at x = 0 is 0, which is consistent with the fact that f'(0) = 0.

To know more about derivative, refer to the link below:

https://brainly.com/question/29005833#

#SPJ11

(b) proposition. suppose a, b, c ∈ z. if b does not divided ac, then b does not divide c.

Answers

A proposition is a statement that is either true or false. In this case, the proposition states that if b does not divide ac, then b does not divide c.

To prove this proposition, we will assume that b does not divide ac and try to show that b does not divide c.
Let us begin by using the definition of divisibility.

If b divides ac, then there exists an integer k such that b = akc. We can rewrite this equation as b = (ak)c. Since a, b, and c are all integers, then (ak) is also an integer.

This means that if b divides ac, then b also divides c.
Now, let us assume that b does not divide ac.

This means that there does not exist an integer k such that b = akc.

We want to show that b does not divide c, so we will assume the opposite and show that it leads to a contradiction.
Suppose that b divides c.

Then there exists an integer m such that c = bm.

We can substitute this expression for c into the original equation and get b = a(bm). Since a, b, and c are all integers, then (bm) is also an integer.

This means that b divides ac, which contradicts our initial assumption.
Therefore, we have shown that if b does not divide ac, then b does not divide c.

This proposition is important in number theory and has applications in various fields of mathematics.

It is a useful tool for proving other propositions and theorems related to divisibility and prime numbers.

For similar question on proposition:

https://brainly.com/question/18545645

#SPJ11

The proposition you've provided is a statement about divisibility in the integers. Specifically, it states that if we have three integers a, b, and c, and b does not divide the product ac, then b also does not divide c.

This statement can be proven using a proof by contradiction. Suppose that b divides ac but does not divide c. Then we can write ac = bk and c = dj, where k and j are integers and d is the greatest common divisor of b and c (which we know exists by the Euclidean algorithm). Substituting the second equation into the first, we get ajd = bkd, which implies that b divides aj.

Now we can write aj = bl for some integer l, which implies that c = dj = (aj)/d = (bl)/d = (b/d)l. But this contradicts the assumption that b does not divide c, since b/d is a divisor of b. Therefore, we must conclude that if b does not divide ac, then b does not divide c.

Proposition: Suppose a, b, c ∈ Z (meaning a, b, and c are integers). If b does not divide ac, then b does not divide c.

Proof:

Step 1: Suppose b does not divide ac. This means that there is no integer k such that ac = bk.

Step 2: We want to prove that b does not divide c. To prove this, we will use a proof by contradiction. Let's assume the opposite, that b does divide c.

Step 3: If b does divide c, there exists an integer m such that c = bm.

Step 4: Since a, b, and m are all integers, we can multiply both sides of c = bm by a to get ac = abm.

Step 5: Now, we have ac = abm, which implies that b divides ac, as abm is a multiple of b.

Step 6: This contradicts our initial assumption that b does not divide ac. Therefore, our assumption that b divides c must be false.

Conclusion: If b does not divide ac, then b does not divide c.

Learn more about integers at: brainly.com/question/15276410

#SPJ11

The upper bound and lower bound of a random walk are a=8 and b=-4. What is the probability of escape on top at a?a) 0%. b) 66.667%. c) 50%. d) 33.333%

Answers

In a random walk, the probability of escape on top at a is the probability that the walk will reach the upper bound of a=8 before hitting the lower bound of b=-4, starting from a initial position between a and b.The answer is (a) 0%.

The probability of escape on top at a can be calculated using the reflection principle, which states that the probability of hitting the upper bound before hitting the lower bound is equal to the probability of hitting the upper bound and then hitting the lower bound immediately after.

Using this principle, we can calculate the probability of hitting the upper bound of a=8 starting from any position between a and b, and then calculate the probability of hitting the lower bound of b=-4 immediately after hitting the upper bound.

The probability of hitting the upper bound starting from any position between a and b can be calculated using the formula:

P(a) = (b-a)/(b-a+2)

where P(a) is the probability of hitting the upper bound of a=8 starting from any position between a and b.

Substituting the values a=8 and b=-4, we get:

P(a) = (-4-8)/(-4-8+2) = 12/-2 = -6

However, since probability cannot be negative, we set the probability to zero, meaning that there is no probability of hitting the upper bound of a=8 starting from any position between a=8 and b=-4.

Therefore, the correct answer is (a) 0%.

Read more about probability of escape.

https://brainly.com/question/31952455

#SPJ11

2. let x and z be two discrete-valued random variables. suppose e(z|x = x) is a known function of the specific form e(z|x = x) = ax − bx2 with a and b being constants. find e(xz).

Answers

To find the expected value of the product xz, we can use the law of total expectation (also known as the law of iterated expectations):

E(xz) = E[E(xz|X)]

where E(xz|X) is the conditional expectation of xz given X = x, which we can find using the formula:

E(xz|X = x) = x * E(z|X = x)

where E(z|X = x) is the conditional expectation of z given X = x, which we can find using the given function:

E(z|X = x) = ax - bx^2

Substituting this into the formula for the conditional expectation of xz, we get:

E(xz|X = x) = x * (ax - bx^2) = ax^2 - bx^3

Now, we can substitute this back into the law of total expectation to get:

E(xz) = E[E(xz|X)] = E[ax^2 - bx^3]

where the inner expectation is taken over the distribution of X, and the outer expectation is taken over the resulting values of the inner expectation.

Since X is a discrete-valued random variable, we can find E(xz) by summing the values of ax^2 - bx^3 weighted by their probabilities:

E(xz) = Σx (ax^2 - bx^3) P(X = x)

where the sum is taken over all possible values of X.

This gives us the expected value of the product xz in terms of the constants a and b and the probability distribution of X.

To know more about probability , refer here :

https://brainly.com/question/30034780#

#SPJ11

Other Questions
Which of the following signs and symptoms most clearly suggests the need for endoscopy to rule out esophageal cancer?Dysphagia in an individual with no history of neurologic disease someone who is being unjustly enriched because of property he is holding may be required to transfer the property to another because of the enforcement of a(n) trust. ty for the help have a good day everyone Prove that n^2+9n+27 is odd for all natural numbers n. You can use any proof technique. briefly, but clearly, explain the concept of production function and cost function of a typ-ical firm in both lr and sr. what might happen to industrialized food production if prices rose sharply? how might this affect your life? how might it affect the next generation?list two ways you deal with these changes Given that ABC is a dilation of ABC, how are the angles and side lengths of the preimage and image related? A. The angles are congruent and the side lengths are congruent. B. The angles are congruent and the side lengths are proportional. C. The angles are proportional and the side lengths are congruent. D. The angles are proportional, and the side lengths are proportional. Which line of code constructs Guam as an instance of AirportCode?class AirportCode {constructor (location, code) {this. location = location;this.code = code; T/F: a turnkey system is a package that includes hardware, software, network connectivity, and support services from a single vendor. Kevin Davis dishonored a 90-day, 8% note for $2,000. What is the journal entry to record the dishonored note receivable? T/F : a successful hijacking takes place when a hacker intervenes in a tcp conversation and then takes the role of either host or recipient. pulsars are thought to be group of answer choices rapidly rotating neutron stars. accreting white dwarfs. accreting black holes. unstable high mass stars. an ideal gas at 300 k is compressed isothermally to one-fifth its original volume. determine the entropy change per mole of the gas. During a recent lab a chemist titrates a 35.0 gram sample of sulfuric acid cleaner (used to clean metals) using a 0.25 M solution of potassium hydroxide. She uses a total of 142.5 mL of base to reach the endpoint for the bromthymol blue indicator.a.How many grams of sulfuric acid are in the sample?b. The label on the cleaner says it is a 3.00% by mass solution. What is the % error for this experiment? 2. what practice, in your opinion, should the general hospital borrow from peacehealths ehr implementation to help the emar implementation (a) Find the momentum of a 1.00109 kg asteroid heading towards the Earth at 30.0 km/s . (b) Find the ratio of this momentum to the classical momentum. (Hint: Use the approximation that = 1 + (1 / 2)v 2 / c 2 at low velocities.) Communication activities include number of dimensions. Which of the following options are dimensions of communicating? Each correct answer represents a complete solution. Choose all that apply 11. Descartes is thinking of a number that when he multiplies it by 9, he gets the number he is thinking of. What number is Descartes thinking of? brainly usually the scotus will hear a case only if that case is a. moot b. manufactured c. an issue that can be resolved without the court d. political e. an ongoing controversy Saint Patricks accomplishments in Ireland are known because __________.A.eyewitnesses kept recordsB.he kept a written accountC.he paid a writer to travel with himD.they are mentioned in Irish folk songs