Answer:
28.5
20.25 - (-5) = 25.25
25.25 - 11.75 = 13.5
13.5 + 15 = 28.5
Step-by-step explanation:
Sorry it took so long. Hope it helps! =D
Which situation could the probability distribution table represent?
There are 30 cards. Each card is labeled A, B, or C. Six of the cards are labeled A, 20 of the cards are labeled B and 4 of the cards are labeled C.
======================================================
Explanation:
Let's rewrite each fraction in terms of the LCD 30
A: 1/5 = (1/5)*(6/6) = 6/30B: 2/3 = (2/3)*(10/10) = 20/30C: 2/15 = (2/15)*(2/2) = 4/30Event A has probability 6/30, meaning there are 6 cards labeled "A" out of 30 cards total. Furthermore, we can see there are 20 labeled "B" and 4 labeled "C".
What is the value of new_list?
my_list = [1, 2, 3, 4]
new_list = [i**2 for i in my_list]
a.
[1, 2, 3, 4, 1, 2, 3, 4]
b.
[2, 4, 6, 8]
c.
[1, 2, 3, 4]
d.
[1, 4, 9, 16]
The value of `new_list` will be [1, 4, 9, 16]. In the given code, a new list `new_list` is created using a list comprehension.
The list comprehension iterates over each element `i` in the original list `my_list` and computes the square of each element using the expression `i**2`. The resulting squared values are then added to the new list.
Therefore, for each element in `my_list`, the corresponding squared value is appended to `new_list`. Since `my_list` contains the elements [1, 2, 3, 4], the squared values would be [1**2, 2**2, 3**2, 4**2], which simplifies to [1, 4, 9, 16]. Hence, the value of `new_list` is [1, 4, 9, 16].
The correct option is d. [1, 4, 9, 16].
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use a familiar formula from geometry to find the length of the curve described and then confirm using the definite integral. r = 6 sin θ 9 cos θ ,
This result is negative, which does not make sense for a length, so we conclude that there must be an error in our calculations. We should go back and check our work to find where we made a mistake.
The curve described by r = 6 sin θ 9 cos θ is a limaçon, a type of polar curve. To find its length, we can use the formula for arc length in polar coordinates:
L = ∫[a,b] √(r^2 + (dr/dθ)^2) dθ
where r is the polar equation of the curve, and a and b are the limits of integration.
In this case, we have:
r = 6 sin θ + 9 cos θ
dr/dθ = 6 cos θ - 9 sin θ
Substituting these expressions into the arc length formula and simplifying, we get:
L = ∫[0,2π] √(36 + 81 - 90 sin 2θ) dθ
= ∫[0,2π] √(117 - 90 sin 2θ) dθ
This integral cannot be evaluated in closed form using elementary functions, so we must resort to numerical methods. One way to approximate it is to use numerical integration, such as the midpoint rule, the trapezoidal rule, or Simpson's rule. Alternatively, we can use software or calculators that have built-in functions for numerical integration.
To confirm our result, we can also use the definite integral to find the length:
L = ∫[0,2π] |r(θ)| dθ
= ∫[0,2π] |6 sin θ + 9 cos θ| dθ
This integral can be split into two parts, depending on the sign of the expression inside the absolute value:
L = ∫[0,π/2] (6 sin θ + 9 cos θ) dθ - ∫[π/2,2π] (6 sin θ + 9 cos θ) dθ
= 9∫[0,π/2] (2 sin θ + 3 cos θ) dθ - 9∫[π/2,2π] (2 sin θ + 3 cos θ) dθ
= 9[6 - 3] - 9[6 + 3]
= -54
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if the members of a duopoly face a prisoner’s dilemma, which of the following is not true?
The statement that "both firms always choose to compete, resulting in the highest combined profit" is not true.
A prisoner's dilemma is a situation in game theory where two individuals or firms face a conflict between individual and collective rationality. In the case of a duopoly, where there are only two competing firms in a market, they must make strategic decisions on pricing and production levels. The goal for each firm is to maximize its own profit.
In a prisoner's dilemma, the Nash equilibrium occurs when both firms choose to compete, as they believe it will maximize their individual profits. However, this leads to a suboptimal outcome for both firms as the fierce competition drives down prices and reduces overall profits. Both firms would be better off if they colluded and cooperated to set higher prices and restrict production, resulting in a higher combined profit.
Therefore, the statement that "both firms always choose to compete, resulting in the highest combined profit" is not true. In a prisoner's dilemma, the rational choice for both firms is to collude and cooperate, even though they may be tempted to compete individually. By doing so, they can achieve a more favorable outcome and increase their combined profit.
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An ant travels north 6 yards, 1 foot, and 9 inches. Then it turns around to travel South 2 yards, 2 feet and 10 inches. The ant is now "a" yards, "b" feet, and "c" inches North of the starting point. What is the value of a, b, and c? Give your answer in the form of an ordered triple (a, b, c) in which 0 ≤ c < 12 and 0 ≤ b < 3. (a, b, and c are whole numbers. )
The ant is located (4, 11, 3) yards, feet, and inches north of the starting point. To determine the final position of the ant, we need to add the distances traveled north and south separately.
First, let's calculate the distance traveled north. The ant traveled 6 yards, 1 foot, and 9 inches north, which can be represented as (6, 1, 9) yards, feet, and inches.
Next, we calculate the distance traveled south. The ant traveled 2 yards, 2 feet, and 10 inches south, which can be represented as (-2, -2, -10) yards, feet, and inches (since it's traveling in the opposite direction).
To find the final position, we add the distances traveled north and south:
(6, 1, 9) + (-2, -2, -10) = (4, -1, -1)
Since the ant is traveling north, we discard the negative sign and adjust the negative values:
(4, -1, -1) = (4, -1 + 3, -1 + 12) = (4, 2, 11)
Therefore, the ant is located (4, 2, 11) yards, feet, and inches north of the starting point.
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let z denote the standard normal random variable with a mean μ = 0 and standard deviation σ=1. find the probability of observing a value less than 0.83. i.e. find p(z < 0.83)
The probability of observing a value less than 0.83, denoted as P(z < 0.83), can be found using the standard normal distribution table. The value obtained from the table represents the area under the standard normal curve to the left of the given value. For P(z < 0.83), the probability is approximately 0.7967 or 79.67%. (X.XX) (rounded to two decimal places).
The probability of observing a value less than 0.83, we need to compute the area under the standard normal distribution curve to the left of 0.83. This can be done using a standard normal distribution table or a calculator.
Using a standard normal distribution table, we can look up the probability associated with a z-score of 0.83. The table will give us the area to the left of 0.83, which is the probability of observing a value less than 0.83.
Looking up the value in the table, we find that the probability of observing a value less than 0.83 is 0.7967.
Using a calculator, we can use the cumulative distribution function (CDF) of the standard normal distribution to compute the probability of observing a value less than 0.83. The CDF of the standard normal distribution gives us the probability that a standard normal random variable is less than or equal to a given value.
Using a calculator, we find that the probability of observing a value less than 0.83 is approximately 0.7967.
Therefore, the probability of observing a value less than 0.83 is approximately 0.7967 or 79.67%.
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a) Eq.(2) and its solution Eq.(3) describe the motion of a harmonic oscillator. In terms of the parameters given in Eq.(2), what is the angular frequency Omega?b) In terms of the parameters given in Eq.(2), what is the period T?c) In terms of the parameters given in Eq.(2) and Eq.(3) what is the maximum value of the angular velocity?
Angular frequency is given by the square root of the spring constant/mass. The period is the inverse of the angular frequency. The maximum value of the angular velocity is the angular frequency.
How to describe harmonic oscillator motion?(a) The angular frequency Omega in Eq.(2) is given by the square root of the ratio of the spring constant k to the mass m, or Omega = sqrt(k/m). This value represents the rate at which the oscillator oscillates back and forth, and is measured in radians per second.
(b) The period T, which is the time it takes for the oscillator to complete one full cycle, is given by T = 2*pi/Omega. In other words, the period is the reciprocal of the angular frequency, and is measured in seconds.
(c) The maximum value of the angular velocity is given by the amplitude A multiplied by the angular frequency Omega, or Omega_max = A*Omega. This value represents the maximum speed at which the oscillator moves during its oscillations, and is measured in radians per second.
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Use trig ratios to find both missing sides. Show your work.
solve for a and b
Applying the trigonometric ratios, the values of the sides of the triangle are: a ≈ 22.7; b ≈ 10.6.
How to Use Trigonometric Ratios to Find the Missing Sides of a Right Triangle?To find the missing side a, in the right triangle shown above, the trigonometric ratio we would apply is he cosine ratio, which is:
cos ∅ = adjacent length / hypotenuse length.
∅ = 25 degrees
Adjacent length = a
Hypotenuse length = 25
Substitute:
cos 25 = a / 25
a = 25 * cos 25
a ≈ 22.7
To find the missing side b, the trigonometric ratio we would apply is he sine ratio, which is:
sin ∅ = opposite length / hypotenuse length.
∅ = 25 degrees
Opposite length = b
Hypotenuse length = 25
Substitute:
sin 25 = b / 25
b = 25 * sin 25
b ≈ 10.6
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a machine that fills beverage cans is supposed to put 10 ounces of beverage in each can. following are the amounts measured in a simple random sample of eight cans. assume that the sample is approximately normal. can you conclude that the sample differs from 10 ounces? compute the value of the test statistic
For a random sample of beverage cans, the test statistic or t-test value is equals to 8.1308 and null hypothesis should be rejected. So, the samples mean volume differs by 10.
We have a machine fills beverage cans. The amount of beverage in each can = 10 ounces. Consider a simple random sample of cans with Sample size, n = 8
Sample is approximately normal. We have to check the sample differ from 10 ounces and determine the test statistic value. Let the null and alternative hypothesis are defined, [tex]H_0 : \mu = 10 \\ H_a: \mu ≠ 10[/tex]
Using the table data, determine the mean and standard deviations. So, Sample mean, [tex]\bar X = \frac{ 10.11 + 10.11 + 10.12 + 10.14 + 10.05 + 10.16 + 10.06 + 10.14}{8} \\ [/tex]
[tex] = \frac{80.89}{8} [/tex]
= 10.11125
Now, standard deviations, [tex]s = \sqrt {\frac{\sum_{i}(X_i -\bar X)²}{n-1}}[/tex]
= 0.03870
degree of freedom, df = n - 1 = 7
Level of significance= 0.10
Test statistic for mean : [tex]t = \frac{\bar X - \mu}{\frac{s}{\sqrt{n}}}[/tex]
[tex] = \frac{10.11 - 10}{\frac{0.03871} {\sqrt{8}}}[/tex]
= [tex] \frac{0.11 }{\frac{0.03871}{\sqrt{8}}}[/tex]
= 8.1308
The p-value for t = 8.1308 and degree of freedom 7 is equals 0.0001. As we see, p-value = 0.0001 < 0.1, so null hypothesis should be rejected. So, the sample mean volume differs from 10 ounces.
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Complete question:
a machine that fills beverage cans is supposed to put 10 ounces of beverage in each can. The below table contains are the amounts measured in a simple random sample of eight cans. assume that the sample is approximately normal. can you conclude that sample mean volume differs from 10 ounces? compute the value of the test statistic at 0.05 level of significance.
marcus earns $15.00 per hour, has 80 regular hours in the pay period. what would be the total earnings for the pay period?
The given regression equation is y = 55.8 + 2.79x, which means that the intercept is 55.8 and the slope is 2.79.
To predict y for x = 3.1, we simply substitute x = 3.1 into the equation and solve for y:
y = 55.8 + 2.79(3.1)
y = 55.8 + 8.649
y ≈ 64.4 (rounded to the nearest tenth)
Therefore, the predicted value of y for x = 3.1 is approximately 64.4. Answer E is correct.
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The number of CDs per hour that Snappy Hardware can manufacture at its plant is given by P=x^0.6 y^0.4, where z is the number of workers at the plant and is the monthly budget in dollars. Assuming at s constant, compute dy/dx when x=100 and y=120.000
The rate of change of y with respect to x is approximately 0.475
To compute dy/dx, we need to take the partial derivative of P with respect to x and y and then evaluate it at the given values of x and y.
Taking the partial derivative of P with respect to x:
∂P/∂x = [tex]0.6x^{-0.4} y^{0.4[/tex]
The partial derivative of P with respect to y:
∂P/∂y = [tex]0.4x^{0.6} y^{-0.6[/tex]
Now, substituting x=100 and y=120,000, we get:
∂P/∂x = [tex]0.6(100)^{(-0.4)} (120,000)^{0.4[/tex]
≈ 82.41
∂P/∂y = [tex]0.4(100)^{0.6} (120,000)^{(-0.6)[/tex]
≈ 39.22
dy/dx when x=100 and y=120,000 is approximately:
dy/dx = (∂P/∂y)/(∂P/∂x)
≈ 39.22/82.41
≈ 0.475
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the starting salaries of individuals graduating 5 years ago with a b.s. degree in business information technology are normally distributed with a mean of $52,500 and a standard deviation of $2,500. What percentage of students with a BIT degree will have starting salaries of $47,000 to $53,0007 (Round your answer to 2 decimal places.)
We can standardize the values and use the standard normal distribution to find the required probability:
z1 = (47000 - 52500) / 2500 = -2.2
z2 = (53000 - 52500) / 2500 = 0.2
Using a standard normal table or calculator, we can find that the area under the curve between z=-2.2 and z=0.2 is approximately 0.5578.
Therefore, the percentage of students with a BIT degree who will have starting salaries between $47,000 and $53,000 is 55.78%.
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given ∫16f(x)dx=13and∫65f(x)dx=−2, compute the following integral. ∫512f(x)dx
The value of the integral ∫₅¹² f(x)dx is 15.
To compute the integral ∫₅¹² f(x)dx, we can use the properties of definite integrals, specifically the linearity property and the change of limits.
Since the integral is from 5 to 12, and we are given information about the integral from 1 to 6 and from 6 to 5, we can break down the integral into two parts and combine them using the properties of integrals.
First, we can rewrite the given integral ∫₅¹² f(x)dx as the sum of two integrals:
∫₅¹² f(x)dx = ∫₅⁶ f(x)dx + ∫₆¹² f(x)dx
Now, we can use the given information:
∫₁⁶ f(x)dx = 13
∫₆⁵ f(x)dx = -2
Applying the change of limits to the second integral:
∫₆¹² f(x)dx = -∫₁₂⁶ f(x)dx
We can now express the integral ∫₅¹² f(x)dx as:
∫₅¹² f(x)dx = ∫₅⁶ f(x)dx + ∫₆¹² f(x)dx
= ∫₅⁶ f(x)dx - ∫₁₂⁶ f(x)dx
Since the limits of integration in the second integral are reversed, we can change the sign of the integral and adjust the limits:
∫₅¹² f(x)dx = ∫₅⁶ f(x)dx - ∫₆¹² f(x)dx
= ∫₁⁶ f(x)dx - ∫₆⁵ f(x)dx
= 13 - (-2)
= 13 + 2
= 15
Therefore, the value of the integral ∫₅¹² f(x)dx is 15.
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Ms. Bell's mathematics class consists of 6 sophomores, 11 juniors, and 13 seniors. How many different ways can Ms. Bell create a 5-member committee of seniors if each senior has an equal chance of being selected?
There are 1287 different ways Ms. Bell can create a 5-Member committee of seniors from her class.
Ms. Bell's mathematics class consists of 6 sophomores, 11 juniors, and 13 seniors. The task is to determine the number of different ways Ms. Bell can create a 5-member committee of seniors, with each senior having an equal chance of being selected.
To solve this problem, we can use combinations. The number of ways to select a committee of 5 seniors from a group of 13 can be calculated using the combination formula:
C(n, k) = n! / (k!(n - k)!)
Where n represents the total number of elements (seniors in this case), and k represents the number of elements to be selected (5 in this case). The exclamation mark denotes the factorial of a number.
Using the combination formula, the number of ways to select a 5-member committee from 13 seniors is:
C(13, 5) = 13! / (5!(13 - 5)!) = 13! / (5! * 8!) = (13 * 12 * 11 * 10 * 9) / (5 * 4 * 3 * 2 * 1) = 1287
Therefore, there are 1287 different ways Ms. Bell can create a 5-member committee of seniors from her class.
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Accumulation Functions and FTC 1: Problem 6 (8 points) The curve C is the graph of y = Som t2 -3t+6 dt. Determine x-interval(s) on which the curve is concave downward. C is concave downward on: ___
The curve C is concave downward on the x-interval (-∞, 3/2).
To determine the x-intervals on which the curve C is concave downward, we first need to find the second derivative of the function y = ∫t^2-3t+6 dt with respect to x.
Using the First Fundamental Theorem of Calculus (FTC 1), we know that the derivative of the integral function is the original function.
Therefore, we have:
dy/dx = d/dx [∫t^2-3t+6 dt]
dy/dx = t^2-3t+6
Now, to find the second derivative, we differentiate again with respect to x:
d^2y/dx^2 = d/dx [t^2-3t+6]
d^2y/dx^2 = 2t-3
To determine the concavity of curve C, we need to find where the second derivative is negative (i.e., concave downward).
Setting d^2y/dx^2 < 0, we have:
2t-3 < 0
2t < 3
t < 3/2
Therefore, the curve C is concave downward on the x-interval (-∞, 3/2).
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determine whether the statement is true or false. −c f(x, y) ds = − c f(x, y) ds
The expression as given above: "−c f(x, y) ds = − c f(x, y) ds" seems to be true.
Both expressions, the left-hand side, −c f(x, y) ds and the right-hand side, − c f(x, y) ds:
represent the same mathematical operation. The mathematical equation represented here is obtained by multiplying the function f(x, y) by a constant -c and integrating it with respect to the variable ds. The placement of the constant -c does not affect the result, so the two expressions are equivalent.
Thus, both expressions (right-hand and left-hand sides) are the same. Hence, the statement is true.
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The angle theta is in quadrant two and cos theta equals -2/11, what is the value of sin theta
To find the value of sin(theta) given that cos(theta) equals -2/11 and theta is in quadrant two, we can use the Pythagorean identity: sin^2(theta) + cos^2(theta) = 1.
Since theta is in quadrant two, sin(theta) will be positive. We can find sin(theta) using the given value of cos(theta):
cos^2(theta) + sin^2(theta) = 1
(-2/11)^2 + sin^2(theta) = 1
4/121 + sin^2(theta) = 1
sin^2(theta) = 1 - 4/121
sin^2(theta) = (121 - 4)/121
sin^2(theta) = 117/121
Taking the square root of both sides, we get:
sin(theta) = sqrt(117/121)
sin(theta) = sqrt(117)/sqrt(121)
sin(theta) = sqrt(117)/11
Therefore, the value of sin(theta) is sqrt(117)/11.
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find the work done by the force field f in moving an object from p(0,1) to q(1,2) along the path y = 1 sin x 2 from x=0 to x=1 . (no response)
the work done by the force field in moving an object from (0,1) to (1,2) along the given path is 1/5 - sin(1).
To find the work done by the force field, we need to evaluate the line integral:
∫C f · dr
where C is the path given by y = sin(x^2), 0 ≤ x ≤ 1, and dr is the differential displacement vector along the path. We can parameterize the path as r(t) = <t, sin(t^2)> for 0 ≤ t ≤ 1, so that dr = r'(t) dt = <1, 2t cos(t^2)> dt.
Then, the line integral becomes:
∫C f · dr = ∫0^1 f(r(t)) · r'(t) dt
Substituting the values of the given force field f(x,y) = <2xy, x^2>, we have:
∫C f · dr = ∫0^1 <2t sin(t^2), t^2> · <1, 2t cos(t^2)> dt
= ∫0^1 (2t^3 cos(t^2) + t^4) dt
= [sin(t^2)]0^1 + 1/5
= 1/5 - sin(1)
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on a circle of radious 9 feet, what angle would subtend an arc of length 4 feet
An angle of approximately 25.69 degrees would subtend an arc of length 4 feet on a circle of radius 9 feet.
The formula to calculate the length of an arc is given by L = rθ, where L is the length of the arc, r is the radius of the circle, and θ is the angle subtended by the arc in radians.
In this case, we know that the radius is 9 feet and the length of the arc is 4 feet. Therefore, we can rearrange the formula to solve for θ:
θ = L / r = 4 / 9
This gives us the angle subtended by the arc in radians. To convert this to degrees, we can multiply by 180/π:
θ = (4/9) * (180/π) ≈ 25.69 degrees
Therefore, an angle of approximately 25.69 degrees would subtend an arc of length 4 feet on a circle of radius 9 feet.
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There are 20 counters in a box 6 are red and 5 are green and the rest are blue
find the probability that she takes a blue counter
The probability of drawing a blue counter from the box is 9/20.
To find the probability of drawing a blue counter, we need to determine the number of blue counters in the box and divide it by the total number of counters.
Given that there are 20 counters in total, 6 of them are red, and 5 of them are green. To find the number of blue counters, we can subtract the sum of red and green counters from the total number of counters:
20 - 6 (red) - 5 (green) = 9 (blue)
So, there are 9 blue counters in the box.
The probability of drawing a blue counter is the number of favorable outcomes (blue counters) divided by the total number of possible outcomes (all counters):
Probability = Number of blue counters / Total number of counters
Probability = 9 / 20
Therefore, the probability of drawing a blue counter from the box is 9/20.
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A door is 4/1/2 feet wide. How many inches wide is the door
Answer:
54 inches
Step-by-step explanation:
1 foot = 12 inches
1/2 = 6 inches
4 • 12= 48+6=54
Write an equation of the form x^2 +bx+c=0 that has the solutions x=-4 and x=6
An equation of the form [tex]x^2 + bx + c = 0[/tex] that has the solutions x = -4 and x = 6 can be obtained by expanding the equation (x - (-4))(x - 6) = 0. This simplifies to [tex]x^2 - 2x - 24 = 0.[/tex]
To find an equation of the form [tex]x^2 + bx + c = 0[/tex] with the given solutions x = -4 and x = 6, we can start by using the fact that the product of the roots of a quadratic equation is equal to the constant term divided by the coefficient of [tex]x^2[/tex]. In this case, the product of the roots is (-4) * 6 = -24.
We can then write the equation as (x - r1)(x - r2) = 0, where r1 and r2 are the roots. Substituting the given values, we have (x - (-4))(x - 6) = 0. Expanding this equation gives [tex]x^2 - 2x - 24 = 0.[/tex]
Therefore, the equation[tex]x^2 - 2x - 24 = 0[/tex] has the solutions x = -4 and x = 6. This equation satisfies the form [tex]x^2 + bx + c = 0[/tex], where b = -2 and c = -24. By rearranging the terms, we can easily identify the coefficients b and c in the equation.
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What is the total number of green pens produced during a week when
39,000 red pens are produced?
The total number of green pens produced in this week is 13000
Calculating the total number of green pens producedFrom the question, we have the following parameters that can be used in our computation:
Red pens = 3/4 of total
This means that
Green pens = 1/4 of total
Recall that, we have
The factory manager uses the equation 3/4y = 39,000.
So, we have
3/4y = 39,000.
Evaluate
y = 39000 * 4/3
This gives
y = 52000
So, we have
Green pens = 1/4 of total
Green pens = 1/4 of 52000
Evaluate
Green pens = 13000
Hence, the number of green pens is 13000
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Complete question
A different factory produces red pens and green pens, of the pens produced at the factory each week, 3/4 are red. In a week when 39,000 red pens are produced, the factory manager uses this equation 3/4y = 39,000.
What is the total number of green pens produced during a week when
39,000 red pens are produced?
Find all the values of x such that the given series would converge. sigma^infinity _n = 1 (8x)^n/n^7 Find all the values of x such that the given series would converge. sigma^infinity _n = 1 x^n/ln (n + 2) Find all the values of x such that the given series would converge. sigma^infinity _n = 1 (x - 6)^n/6^n Find all the values of x such that the given series would converge. sigma^infinity _n = 1 n! (x - 5)^n The radius of convergence for this series is:
The limit is less than 1 for all values of x, the series converges for all x.
The series converges for x <= 1/e.
The limit is less than 1 for |x-6| < 6, the series converges for x between 0 and 12.
The first series is [tex]\sigma^\infty[/tex] = 1 (8x)ⁿ/n⁷. To determine the values of x for which this series converges, we can use the ratio test. The ratio test states that if the limit of the absolute value of the ratio of successive terms of a series is less than 1, then the series converges. Applying the ratio test to this series, we have:
|((8x)ⁿ⁺¹/(n+1)⁷)/((8x)ⁿ/n⁷)| = |8x/(n+1)| * (n/8)⁷
Taking the limit as n approaches infinity, we have:
lim n->∞|8x/(n+1)| * (n/8)⁷ = lim n->∞|8x/(n+1)| * lim n->∞(n/8)⁷ = 0
The second series is [tex]\sigma^\infty[/tex] = 1 xⁿ/ln (n + 2). To determine the values of x for which this series converges, we can use the integral test. The integral test states that if the integral of the function of the series is finite, then the series converges. Applying the integral test to this series, we have:
[tex]\int_0^{\infty}[/tex] xⁿ/ln(n+2) dn
Using u-substitution with u = ln(n+2), we have:
∫(from 1 to infinity) (x(eˣ))/u du
Since eˣ > u for all u > 0, we have:
(x(eˣ))/u < (xˣ)/u
Therefore, we can bound the integral as follows:
[tex]\int_0^{\infty}[/tex] (xˣ)/u du < [tex]\int_0^{\infty}[/tex] (x(eˣ))/u du < [tex]\int_0^{\infty}[/tex] (xˣ)/ln(u+2) du
The integral on the left-hand side diverges for x >= 1, and the integral on the right-hand side converges for x <= 1/e.
The third series is [tex]\sigma^\infty[/tex] = 1 (x - 6)ⁿ/6ⁿ. To determine the values of x for which this series converges, we can again use the ratio test. Applying the ratio test to this series, we have:
|((x-6)ⁿ⁺¹/6ⁿ⁺¹)/((x-6)ⁿ/6ⁿ)| = |(x-6)/6|
Taking the limit as n approaches infinity, we have:
lim n->∞ |(x-6)/6| = |x-6|/6
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If cot ( x ) = 4/19 (in quadrant-i), find tan ( 2 x ) =
according to question the answer is tan (2 x ) = -sqrt(345)/353.
Since cot (x) = 4/19 is given, we can use the identity:
tan²(x) + 1 = cot²(x)
to find tan (x):
tan²(x) = cot²(x) - 1 = (4/19)² - 1 = 16/361 - 361/361 = -345/361
Since x is in the first quadrant, tan(x) is positive, so we can take the positive square root:
tan(x) = sqrt(-345/361)
Now we can use the double angle formula for tangent:
tan(2x) = (2tan(x))/(1 - tan²(x))
Substituting in the value we found for tan(x), we get:
tan(2x) = (2(sqrt(-345/361)))/(1 - (-345/361))
= (2sqrt(-345/361))/706
= -sqrt(345)/353
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how many integers from 1 through 999 do not have any repeated digits?
There are 648 integers from 1 through 999 that do not have any repeated digits.
To solve this problem, we can break it down into three cases:
Case 1: Single-digit numbers
There are 9 single-digit numbers (1, 2, 3, 4, 5, 6, 7, 8, 9), and all of them have no repeated digits.
Case 2: Two-digit numbers
To count the number of two-digit numbers without repeated digits, we can consider the first digit and second digit separately. For the first digit, we have 9 choices (excluding 0 and the digit chosen for the second digit). For the second digit, we have 9 choices (excluding the digit chosen for the first digit). Therefore, there are 9 x 9 = 81 two-digit numbers without repeated digits.
Case 3: Three-digit numbers
To count the number of three-digit numbers without repeated digits, we can again consider each digit separately. For the first digit, we have 9 choices (excluding 0). For the second digit, we have 9 choices (excluding the digit chosen for the first digit), and for the third digit, we have 8 choices (excluding the two digits already chosen). Therefore, there are 9 x 9 x 8 = 648 three-digit numbers without repeated digits.
Adding up the numbers from each case, we get a total of 9 + 81 + 648 = 738 numbers from 1 through 999 without repeated digits. However, we need to exclude the numbers from 100 to 199, 200 to 299, ..., 800 to 899, which each have a repeated digit (namely, the digit 1, 2, ..., or 8). There are 8 such blocks of 100 numbers, so we need to subtract 8 x 9 = 72 from our total count.
Therefore, the final answer is 738 - 72 = 666 integers from 1 through 999 that do not have any repeated digits.
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A 6 ounce contaier of greek yogurt contains 150 calories . Find rate of calories per ounce
Answer:
the answer is B 25 calories/1 ounce
explanation:
6 ounce/150 calories = X/ 1 calories
= 25/1
evaluate the integral using integration by parts as a first step. ∫sin^−1(x)/4x^2 dx(Express numbers in exact form. Use symbolic notation and fractions where needed. Use C for the arbitrary constant. Absorb into C as much as possible.)
∫sin^−1(x)/4x^2 dx = -(sin^−1(x)/4x) + (1/4) arcsin(x) + C.
et u = sin^−1(x)/4 and dv = 1/x^2 dx. Then, du/dx = 1/(4√(1-x^2)) and v = -1/x.
Using integration by parts formula, we have:
∫sin^−1(x)/4x^2 dx = uv - ∫v du/dx dx
= -(sin^−1(x)/4x) + ∫1/(4x√(1-x^2)) dx
= -(sin^−1(x)/4x) + (1/4)∫(1-x^2)^(-1/2) d(1-x^2)
= -(sin^−1(x)/4x) + (1/4) arcsin(x) + C
Therefore, ∫sin^−1(x)/4x^2 dx = -(sin^−1(x)/4x) + (1/4) arcsin(x) + C.
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Mrs. Roberts is getting ready to plant her vegetable garden. She needs to know how much topsoil she will need to fill the planter she has below.
1. The two shapes that make the figure are Rectangular prism and Trapezoidal prism
2. The volume of shape 1 is 200 cubic centimeters
3. The volume of shape 2 is 360 cubic centimeters
4. The total volume of the shape is 560 cubic centimeters
1. What two shapes make the figureFrom the question, we have the following parameters that can be used in our computation:
The figure
The two shapes that make the figure are
Rectangular prismTrapezoidal prism2. The volume of shape 1This is calculated as
Volume = Length * Width * Height
So, we have
Volume = 5 * 5 * 8
Volume = 200
3. The volume of shape 2This is calculated as
Volume = 1/2 * (Sum of parallel sides) * Height * Length
So, we have
Volume = 1/2 * (5 + 10) * 6 * 8
Volume = 360
4. The total volume of the shapeThis is calculated as
Volume = Sum of the volumes of both shapes
So, we have
Volume = 200 + 360
Evaluate
Volume = 560
Hence, the total volume of the shape is 560 cubic centimeter
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Let Xk be independent and normally distributed with common mean 2 and standard deviation 1 (so their common variance is 1.)
Compute (to at least four decimal places)
16
P (-[infinity] Σ Xk ≤ 37.4)
k=1
Thus, the probability P(-∞ ≤ Σ Xk ≤ 37.4) for k=1 to 16, is approximately 0.9115 using the sum of the random variables.
To compute the probability P(-∞ ≤ Σ Xk ≤ 37.4) for k=1 to 16, we need to standardize the sum of the random variables.
First, let Yk = Xk - 2 (shifting the mean to 0). Now, the Yk variables are independent and normally distributed with mean 0 and variance 1.
Next, compute the sum of Yk variables (k=1 to 16): Σ Yk = Σ (Xk - 2).
This sum has a mean of 0 (since each Yk has mean 0) and variance of 16 (since the variances of independent random variables add, and each Yk has variance 1). Therefore, the standard deviation of the sum is √16 = 4.
Now, we need to standardize the threshold value (37.4). Since the mean of Xk is 2, we subtract the sum of the means (16 * 2 = 32) from 37.4 to obtain 5.4. Then, we divide 5.4 by the standard deviation (4) to get 1.35.
Finally, we can compute the probability P(-∞ ≤ Σ Xk ≤ 37.4) by finding the cumulative probability of a standard normal variable (Z) up to 1.35: P(Z ≤ 1.35). Using a standard normal table or calculator, we find that P(Z ≤ 1.35) ≈ 0.9115.
So, the probability P(-∞ ≤ Σ Xk ≤ 37.4) for k=1 to 16, is approximately 0.9115.
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