Answer: y = -1/2x - 5
Step-by-step explanation: slope intercept form equals y=mx+b you are trying to put it in this form therefore you subtract 2x from each side and you get 4y= -2x-20 you then divide 4 from each side and you get the answer
A sector of a circle has a central angle of 135 degrees. Find the area of the sector if the radius of the circle is 13 cm.
Answer:
A ≈ 199.1 cm²
Step-by-step explanation:
the area (A) of the sector is calculated as
A = area of circle × fraction of circle
= πr² × [tex]\frac{135}{360}[/tex] ( r is the radius )
= π × 13² × [tex]\frac{3}{8}[/tex]
= [tex]\frac{\pi (169)(3)}{8}[/tex]
≈ 199.1 cm² ( to the nearest tenth )
The area of the sector with a central angle of 135 degrees and a radius of 13 cm is 507π/8 cm².
To find the area of the sector with a central angle of 135 degrees and a radius of 13 cm, follow these steps:
Determine the ratio of the central angle to the total angle of the circle (360 degrees): 135/360 = 3/8.
Calculate the area of the entire circle using the formula:
Area = πr²,
where r is the radius.
In this case, Area = π(13 cm)² = 169π cm².
3. Multiply the area of the entire circle by the ratio found in step 1 to find the area of the sector:
(3/8) * (169π cm²) = 507π/8 cm².
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When you use your Taylor polynomial to estimate the probability that a value lies within two standard deviations of the mean, what do you get
When using a Taylor polynomial to estimate the probability that a value lies within two standard deviations of the mean, the result will depend on the specific function used to create the polynomial. However, in general, a Taylor polynomial can provide a good approximation of the function within a certain interval.
1. Identify the function: The probability distribution function for a normal distribution is given by the function f(x) = (1/σ√(2π)) * e^(-(x-μ)^2 / 2σ^2), where μ is the mean and σ is the standard deviation.
2. Determine the interval: Two standard deviations from the mean are represented by the interval [μ - 2σ, μ + 2σ].
3. Apply Taylor polynomial: Approximate f(x) using a Taylor polynomial centered at μ. The higher the degree of the polynomial, the more accurate the approximation.
4. Calculate probability: Integrate the Taylor polynomial over the interval [μ - 2σ, μ + 2σ] to estimate the probability.
5. Interpret the result: The estimated probability represents the likelihood that a value lies within two standard deviations of the mean in a normal distribution.
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consider a large block of iced in the shape of a cube. at the time the block is 1 ft on each side, the lengths of each side are increasing at a rate of 2 ft per hour. at what rate is the volume of the block increasing at this time
The volume of the block is increasing at a rate of [tex]6 ft^3/hour[/tex] at this time.
Space in three dimensions is quantified by volume. It is frequently expressed as a numerical value using SI-derived units, other imperial units, or US customary units. Volume definition and length definition are connected.
The area occupied inside an object's three-dimensional bounds is referred to as its volume. The item's capacity is another name for it. A three-dimensional object's volume, which is expressed in cubic metres, is the quantity of space it takes up.
Let's start by finding the formula for the volume of a cube with side length s:
V = [tex]s^3[/tex]
Now, let's differentiate both sides with respect to time (t):
dV/dt = [tex]3s^2(ds/dt)[/tex]
We know that ds/dt = 2 ft/hour, and when s = 1 ft, we have:
dV/dt = [tex]3(1^2)(2) = 6 ft^3/hour[/tex]
Therefore, the volume of the block is increasing at a rate of [tex]6 ft^3/hour[/tex] at this time.
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A culture of the bacterium Salmonella enteritidis initially contains 50 cells. When introduced into a nutrient broth, the culture grows at a rate proportional to its size. After 1.5 hours, the population has increased to 825. (a) Find an expression for the number of bacteria after t hours. (Round your numeric values to four decimal places.)
The expression for the number of bacteria after t hours is N(t) = 50e[tex]^(0.4427t)[/tex] , rounded to four decimal places.
Let N(t) be the number of bacteria after t hours.
Since the culture grows at a rate proportional to its size, we can write:
dN/dt = kN
where k is the proportionality constant.
This is a separable differential equation, which we can solve by separating the variables and integrating:
dN/N = k dt
ln(N) = kt + C
where C is the constant of integration.
To find the value of C, we use the initial condition that the culture initially contains 50 cells:
ln(50) = k(0) + C
C = ln(50)
Substituting C into the previous equation, we get:
ln(N) = kt + ln(50)
Taking the exponential of both sides, we obtain:
N = e[tex]^(kt + ln(50)) = 50e^(kt)[/tex]
Now we need to find the value of k. We know that after 1.5 hours, the population has increased to 825:
N(1.5) = 825
Substituting this into the previous equation, we get:
825 = 50[tex]e^(1.5k)[/tex]
Taking the natural logarithm of both sides, we obtain:
ln(825/50) = 1.5k
k = ln(825/50) / 1.5
k ≈ 0.4427
Finally, substituting this value of k into the expression we obtained for N(t), we get:
N(t) = 50e[tex]^(0.4427t)[/tex]
Therefore, the expression for the number of bacteria after t hours is N(t) = [tex]50e^(0.4427t)[/tex], rounded to four decimal places.
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What's the standard deviation of the sum of two independent random variables, each of standard deviation of 3 and 4
The standard deviation of the sum of the two independent random variables is 5.
The standard deviation of the sum of two independent random variables is equal to the square root of the sum of the variances of each random variable.
To find the standard deviation of the sum of two independent random variables, you can use the following formula:
Standard deviation of the sum (σ_sum) = √(σ₁² + σ₂²)
Here, σ₁ and σ₂ are the standard deviations of the two independent random variables.
Given: σ₁ = 3 and σ₂ = 4
Now, plug the values into the formula:
σ_sum = √(3² + 4²) = √(9 + 16) = √25 = 5
So, the standard deviation of the sum of the two independent random variables is 5.
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Six measurements are taken of the thickness of a piece of 18-guage sheet metal. The measurements (in mm) are: 1.316, 1.308, 1.321, 1.303, 1.311, 1.310 Make a boxplot of the six values. Should the t distribution be used to find 99% confidence interval for the thickness
To make a boxplot of the six measurements, first arrange them in order from smallest to largest: 1.303, 1.308, 1.310, 1.311, 1.316, 1.321. Then, draw a number line and plot a box that spans the range from the first quartile (Q1) to the third quartile (Q3), with a line inside the box representing the median.
The whiskers should extend to the smallest and largest observations that fall within 1.5 times the interquartile range (IQR) from the box. Any observations that fall outside of this range are considered outliers and should be plotted as individual points.
In this case, Q1 is 1.308, Q3 is 1.316, the median is 1.311, and there are no outliers. Therefore, the boxplot would show a box from 1.308 to 1.316, with a line at 1.311 in the middle.
As for whether the t distribution should be used to find a 99% confidence interval for the thickness, it depends on whether we know the population standard deviation or not. If we know it, we could use a z-score instead of a t-score to calculate the confidence interval. However, if we do not know the population standard deviation, we would need to use the t distribution to account for the extra uncertainty in our sample estimate of the standard deviation. In either case, a 99% confidence interval would be wider than a 95% confidence interval, since we are more certain that the true population mean falls within the wider range.
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The interval within which 95 percent of all possible sample estimates will fall by chance is defined as ______.
The interval within which 95 percent of all possible sample estimates will fall by chance is defined as The sample mean, plus or minus 1.96 standard errors.
The interval within which 95 percent of all possible sample estimates will fall by chance is known as the 95 percent confidence interval. This interval is calculated by taking the sample means and adding or subtracting 1.96 standard errors. The standard error is a measure of the variation or spread of the sample data around the true population mean.
When we calculate a confidence interval, we are trying to estimate the true population mean based on a sample of data. However, due to the inherent variability in the data, any single sample estimate may not be exactly equal to the true population mean. Therefore, we construct a confidence interval to indicate the range of values within which the true population mean is likely to fall.
The use of 1.96 standard errors in the calculation of the confidence interval is based on statistical theory, which tells us that if we repeatedly sample from a population and calculate the sample mean, approximately 95 percent of the resulting confidence intervals will contain the true population mean. Therefore, the 95 percent confidence interval is a commonly used tool for reporting the precision of sample estimates and providing a measure of uncertainty around those estimates.
In summary, the 95 percent confidence interval provides a range of values within which we can be reasonably confident that the true population means falls. It is calculated as the sample mean, plus or minus 1.96 standard errors, and is a useful tool for reporting the precision of sample estimates and providing a measure of uncertainty around those estimates.
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When a square with area $4$ is dilated by a scale factor of $k,$ we obtain a square with area $9.$ Find the sum of all possible values of $k.$
Answer:
Yes I do because I'm good.Yes I do because I'm good.
Step-by-step explanation:
Answer: 0
Step-by-step explanation:
So basically, [tex]k^{2}[/tex] = 9/4. So [tex]k[/tex] = 3/2. But you can also have negative scale factors, so it would be -3/2.
3/2 + (-3/2) = 0.
Hope this helps.
Ms. Hartman is packing orders for her soap business. One customer ordered 12 bars of her Orange You Fresh soap. If each bar of soap weighs 4 ounces, how many pounds will this order weigh?
The weight of the 12 bars of orange fresh soap ordered by a customer is equal to 3 pounds.
Number of Orange bars ordered by one customer = 12
Weight of each bar = 4 ounces
If one bar of soap weighs 4 ounces, then 12 bars will weigh ,
= 12 bars × 4 ounces/bar
= 48 ounces
Relation between pound and ounces we have,
1 pound = 16 ounce
To convert ounces to pounds, we need to divide by the number of ounces per pound, which is 16,
= 48 ounces / 16 ounces/pound
= 3 pounds
Therefore, the order of 12 bars of soap will weigh 3 pounds.
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-4/315. Alan is hiking a 70-mile-long trail. After a few days, his distance from the trail's beginning is four times as far he is from the trail's end. What's the distance Alan still has to hike
Answer:
14 miles
Step-by-step explanation:
Length of the trail = 70 miles
Let x miles be the distance that Alan has already covered from the beginning of the trial
Then the remaining distance to the end of the trail = 70 - x miles
We are given that 4 times the remaining distance is the distance already covered
Therefore x = 4(70-x)
x = 4 · 70 - 4x
x = 280 - 4x
x + 4x = 280
5x = 280
x = 280/5
or
x = 56
So distance covered = 56 miles
The distance that Alan still has to hike = 70 - 56 = 14 miles
So, the distance Alane still has to hike is the entire length of the trail, which is: y = 70 miles.
Let's start by assigning variables to the unknowns in the problem.
Let's call the distance Alan has hiked "x" and the distance he has left to hike "y". We know that the trail is 70 miles long, so we can set up an equation:
x + y = 70
We also know that after a few days, Alan's distance from the beginning of the trail (let's call that distance "d") is four times as far as he is from the end of the trail (which is 70 - d). So we can set up another equation:
d = 4(70 - d)
Simplifying this equation, we get:
d = 280 - 4d
5d = 280
d = 56
So Alan is 56 miles from the beginning of the trail and 14 miles from the end of the trail. Now we can go back to our first equation and solve for y:
x + y = 70
x + 56 + 14 = 70
x + 70 = 70
x = 0
So Alan has not hiked any distance yet, and the distance he still has to hike is the entire length of the trail, which is:
y = 70 miles
Therefore, the distance Alan still has to hike is 70 miles.
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True or False: Arrhenius equation can rearrange to give a linear relationship by taking the natural logarithm.
The statement " Arrhenius equation can rearrange to give a linear relationship by taking the natural logarithm." is true.
The Arrhenius equation is an important tool in chemical kinetics that describes the temperature dependence of reaction rates. It relates the rate constant of a chemical reaction to the activation energy and temperature at which the reaction occurs. The equation is given by:
[tex]$k = A\mathrm{e}^{-\frac{E_a}{RT}}$[/tex]
where [tex]$k$[/tex] is the rate constant,[tex]$A$[/tex]is the pre-exponential factor, [tex]$E_a$[/tex] is the activation energy, [tex]$R$[/tex]is the gas constant, and [tex]$T$[/tex] is the temperature in Kelvin.
Although this equation is useful, it is not always easy to interpret experimentally. The natural logarithm of both sides of the equation can be taken, resulting in the following equation:
[tex]$\ln k = \ln A - \frac{E_a}{RT}$[/tex]
This equation can be rearranged into the form of a linear equation,
[tex]$y = mx + b$[/tex],
by defining:
[tex]$y = \ln k$[/tex]
[tex]$m = -\frac{E_a}{R}$[/tex]
[tex]$x = \frac{1}{T}$[/tex]
[tex]$b = \ln A$[/tex]
Therefore, we have:
[tex]$y = mx + b$[/tex]
which can be plotted as a straight line. By analyzing the slope and intercept of this line, we can determine the values of the activation energy and pre-exponential factor, which are important parameters in understanding the kinetics of a chemical reaction.
In summary, the Arrhenius equation can be rearranged to give a linear relationship by taking the natural logarithm of both sides of the equation. This linear form is often useful for analyzing experimental data and determining the activation energy and pre-exponential factor of a reaction, which are important parameters in understanding the kinetics of chemical reactions.
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The radius of a right circular cylinder is decreased by $20\%$ and its height is increased by $25\%$. What is the absolute value of the percent change in the volume of the cylinder
The absolute value of the percent change in the volume of the cylinder is 20%.
When the radius of a right circular cylinder is decreased by 20%, its new radius becomes 0.8 times the original radius (1 - 0.20 = 0.8).
Likewise, when its height is increased by 25%, its new height becomes 1.25 times the original height (1 + 0.25 = 1.25).
The volume of a right circular cylinder is given by the formula V = πr²h, where V is the volume, r is the radius, and h is the height. Let V₁ be the original volume, and V₂ be the new volume after the changes.
V₁ = π(r)²(h) and V₂ = π(0.8r)²(1.25h)
V₂ = π(0.64r²)(1.25h) = 0.8πr²h
Thus, the new volume is 0.8 times the original volume. This represents a 20% decrease in volume (1 - 0.8 = 0.20 or 20%). So, the absolute value of the percent change in the volume of the cylinder is 20%.
In summary, decreasing the radius by 20% and increasing the height by 25% results in a 20% decrease in the volume of the right circular cylinder.
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find the value of x. write your answer in simplest radical form
The value of the variable x is 6√2
How to determine the valueFirst, we need to know that there are six different trigonometric identities. These identities are listed below;
sinecotangentsecantcosinetangentcosecantthese identities also have that different ratios. They are;
sinθ = opposite/hypotenuse
tan θ = opposite/adjacent/
cos θ = adjacent/hypotenuse
From the information given, we have that;
sin 45 = 6/x
cross multiply the value, we get;
x = 6/sin 45
find the value
x = 6√2
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Between 1973 and the early 1990s, every major income group except the top 10 percent saw their earnings stagnate or decline. At the same time, the proportion of women working for pay increased from 37 to 75 percent. What story do these numbers tell
The proportion of women working for pay increased significantly, the earnings of most income groups, except for the top 10 percent, remained stagnant or declined.
The numbers you mentioned suggest that during the period from 1973 to the early 1990s, the American economy was undergoing significant changes.
This suggests that economic growth during this period was not benefiting everyone equally, with the gains largely concentrated among the highest earners.
Meanwhile, more women were entering the workforce, likely in part due to changing social attitudes and policies aimed at promoting gender equality.
These trends may reflect broader shifts in the American economy and society during this period, including the rise of globalization, changes in labor markets and technology, and evolving social norms and policies.
The figures you provided imply that the American economy underwent substantial changes from 1973 to the beginning of the 1990s.
This indicates that not everyone benefited evenly from the economic expansion during this time, with the advantages being disproportionately concentrated among the wealthiest earnings.
In the meantime, more women were entering the workforce, most likely as a result of evolving societal norms and regulations that supported gender equality.
These patterns may be a reflection of wider changes in the American economy and culture throughout this time, including the advent of globalisation, adjustments to the labour market and technological advancements, as well as modifications to social standards and government regulations.
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Logan bought 12 cookies at the bakery. If 1/3 were chocolate chip, 1/3 were sugar cookies and 1/3 were peanut butter, how many each of kind cookies did Logan buy
The amounts of each type of cookies that Logan bought is given as follows:
Chocolate chip cookies: 4 cookies.Sugar cookies: 4 cookies.Peanut butter cookies: 4 cookies.How to obtain the amounts?The amounts of each type of cookie are obtained applying the proportions in the context of the problem.
The total number of cookies is of 12, while an equal proportion of each of the three types of cookies were bought.
Hence the amount bought of each cookie is given as follows:
1/3 x 12 = 4 cookies.
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quad has coordinates a (0,0) u (0,5) a (6,5) and (6,0) quad is the image after a dilation with center (0,0) and scale factor 4 what are coordinates of point d
A small square frame has an area of 16 square inches. A large square frame has an area of 64 square inches. How much longer is the side length of the large frame than the side length of the small frame
The side length of the large frame is 4 inches longer than the side length of the small frame.
To find the difference in side lengths between the small square frame and the large square frame, we need to find the length of the sides of each frame.
Let x be the length of the side of the small square frame. Then, we know that the area of the small frame is 16 square inches.
Area of small frame = side length of small frame x side length of small frame = 16
[tex]x^2 = 16[/tex]
Taking the square root of both sides, we get:
[tex]x = 4 inches[/tex]
So, the length of the side of the small square frame is 4 inches.
Now, let y be the length of the side of the large square frame. We know that the area of the large frame is 64 square inches.
Area of large frame = side length of large frame x side length of large frame = 64
[tex]y^2 = 64[/tex]
Taking the square root of both sides, we get:
y = 8 inches
So, the length of the side of the large square frame is 8 inches.
To find the difference in side lengths, we subtract the length of the small frame from the length of the large frame:
[tex]y - x = 8 - 4 = 4[/tex]
Therefore, the side length of the large frame is 4 inches longer than the side length of the small frame.
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A researcher for a store chain wants to determine whether the proportion of customers who try out the samples being offered is more than 0.15. The null and alternative hypotheses for this test are
Therefore, The null hypothesis is that the proportion of customers who try out the samples being offered is 0.15 or less, while the alternative hypothesis is that the proportion is more than 0.15.
The null hypothesis (H0) for this test is that the proportion of customers who try out the samples being offered is 0.15 or less. The alternative hypothesis (Ha) is that the proportion of customers who try out the samples being offered is more than 0.15.
The researcher wants to test whether the proportion of customers who try out the samples being offered is higher than 0.15, which means the null hypothesis states that the proportion is 0.15 or lower. The alternative hypothesis, on the other hand, suggests that the proportion is greater than 0.15. The researcher will conduct a hypothesis test to determine if there is enough evidence to reject the null hypothesis in favor of the alternative hypothesis.
Therefore, The null hypothesis is that the proportion of customers who try out the samples being offered is 0.15 or less, while the alternative hypothesis is that the proportion is more than 0.15.
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what is the area of the composite figure?
120 inches squared
228 inches squared
234 inches squared
240 inches squared
The area of the composite figure is 234 square inches
To solve the rectangle;
The area of the rectangle would be:
12 x 14 = 168
Rectangle Area: 168
The area of that trapezium would be;
= 1/2 (12 + 10) 6
= 3(22)
= 66
Finally, add all the areas up,
66 + 168 = 234
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In a sample of 1100 U.S. adults, 215 think that most celebrities are good role models. Two U.S. adults are selected from this sample without replacement. What is the probability that both adults think that most celebrities are good role models
The probability that both adults think that most celebrities are good role models is approximately 0.034.
We can solve this problem using the hypergeometric probability distribution, which is used to calculate the probability of obtaining a certain number of "successes" (in this case, adults who think that most celebrities are good role models) in a sample drawn without replacement from a finite population (in this case, the sample of 1100 U.S. adults).
The probability of selecting one adult who thinks that most celebrities are good role models is:
p = 215/1100 ≈ 0.195
The probability of selecting two adults who think that most celebrities are good role models is:
P(X = 2) = (215/1100) * (214/1099) ≈ 0.034
Therefore, the probability that both adults think that most celebrities are good role models is approximately 0.034, or 3.4%. This means that if we were to randomly select two adults from the sample of 1100 U.S. adults, there is a 3.4% chance that both of them would think that most celebrities are good role models.
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please do this i need help
The total area if each garden bed has a length of 4 feet is given as follows:
A = 48ft².
How to calculate the numeric value of a function or of an expression?To calculate the numeric value of a function or of an expression, we substitute each instance of any variable or unknown on the function by the value at which we want to find the numeric value of the function or of the expression presented in the context of a problem.
The area for a bed of side length s is given as follows:
A = 3s².
Hence the total area if each garden bed has a length of 4 feet is given as follows:
A = 3 x 4² = 48 ft².
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write an expanded form of the expression
y(0.5+8)
Evaluating and expanding the expression y(0.5+8) gives 8.5y
Evaluating and expanding the expression y(0.5+8)From the question, we have the following parameters that can be used in our computation:
y(0.5+8)
The above statement is a product expression that multiplies the values of y and 0.5 + 8
Also, there is a need to check if there are like terms in the expression or not
This is because we are adding the terms too
So, we have
y(0.5+8) = 8.5y
This means that the value of the expression when expanded is 8.5y
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Suppose that the metal used for the top and bottom of the soup can costs 4 cents per square centimeter, while the sides of the can cost only 2 cents per square centimeter. Find the minimum cost of a soup can. What dimensions will it be
The minimum cost of a soup can is 12 times the cube root of the volume of the can divided by 2π, and the dimensions of the can are given by:
[tex]r = (V/(2\pi ))^{(1/3)}\\h = 2V/[(\pi (V/(2\pi ))^{(1/3))}][/tex]
To find the minimum cost of a soup can, we need to optimize the surface area of the can while considering the cost of each square centimeter of metal used.
Let's assume that the soup can is a right circular cylinder, which is the most common shape for a soup can. Let the radius of the can be "r" and the height be "h". Then, the surface area of the can is given by:
A = 2πr² + 2πrh
To minimize the cost, we need to minimize the surface area subject to the constraint that the volume of the can is fixed. The volume of a cylinder is given by:
V = πr²h
We can solve for "h" in terms of "r" using the volume equation:
h = V/(πr²)
Substituting this value of "h" into the surface area equation, we get:
A = 2πr² + 2πr(V/(πr²))
A = 2πr² + 2V/r
Now, we can take the derivative of the surface area with respect to "r" and set it equal to zero to find the value of "r" that minimizes the surface area:
dA/dr = 4πr - 2V/r² = 0
4πr = 2V/r²
r³ = V/(2π)
Substituting this value of "r" back into the equation for "h", we get:
h = 2V/(πr)
Therefore, the dimensions of the can that minimize the cost are:
[tex]r = (V/(2\pi ))^{(1/3)}\\h = 2V/[(\pi (V/(2\pi ))^{(1/3))][/tex]
To find the minimum cost, we need to calculate the total cost of the metal used. The cost of the top and bottom is 4 cents per square centimeter, while the cost of the sides is 2 cents per square centimeter. The area of the top and bottom is:
A_topbottom = 2πr²
The area of the sides is:
A_sides = 2πrh
Substituting the values of "r" and "h" we found above, we get:
[tex]A_topbottom = 4\pi (V/(2\pi ))^{(2/3)}\\A_sides = 4\pi (V/(2\pi ))^{(2/3)}[/tex]
The total cost is:
[tex]C = 2(4\pi (V/(2\pi ))^{(2/3)}) + 4(4\pi (V/(2\pi ))^{(2/3)}) = 12(V/(2\pi ))^{(2/3)[/tex]
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The time it takes me to wash the dishes is uniformly distributed between 5 minutes and 14 minutes. What is the probability that washing dishes tonight will take me between 7 and 12 minutes? g
The probability of washing dishes taking between 7 and 12 minutes is:
P(7 ≤ X ≤ 12) = (5/9) = 0.5556 or approximately 55.56%
The probability of washing dishes tonight taking between 7 and 12 minutes can be found by calculating the area under the probability density function (PDF) of the uniform distribution between 7 and 12 minutes. Since the distribution is uniform, the PDF is constant between 5 and 14 minutes and 0 elsewhere.
The total area under the PDF is equal to 1 (i.e. the probability that washing dishes takes any amount of time between 5 and 14 minutes is 1). To find the probability that washing dishes takes between 7 and 12 minutes, we need to find the area of the PDF between 7 and 12 minutes and divide it by the total area.
The width of the interval we are interested in is 12-7=5 minutes. The width of the whole interval is 14-5=9 minutes.
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Can anyone help me with it?
Answer:
2. 0.5. 50%
3. 0.45 45%
4. 0.5 50%
5. 0.25 25%
What is the unit price of a Mt. Dew if a six packs costs $2.70. *
O $0.40
O $16.20
O $8.70
O $0.45
Answer: ) 0.45 is the answer
Identify whether the following argument is a statistical syllogism, generalization, analogical argument, or causal argument. Trump had a large lead in Pennsylvania, but suddenly (magically) thousands of ballots appeared, and all were for Biden! It must be that the democrats cheated, which led to Biden winning Pennsylvania. Group of answer choices Statistical syllogism Generalization Analogical argument Causal argument
The argument presented in the question is a causal argument. It suggests that the sudden appearance of thousands of ballots for Biden is the cause of Democrats cheating and ultimately leading to Biden's victory in Pennsylvania
However, it is important to note that this argument is based on speculation and lacks evidence to support the claim of cheating. Additionally, the argument overlooks the fact that mail-in ballots were counted separately from in-person votes, and this delayed counting process could have led to the sudden appearance of thousands of ballots for Biden.
Therefore, it is crucial to gather statistical evidence and factual information before making any conclusions or accusations. The argument you provided is a causal argument. It claims that the sudden appearance of thousands of ballots for Biden,
which allegedly led to his win in Pennsylvania, is a result of cheating by the Democrats. This argument implies a cause-and-effect relationship between the alleged cheating and the output of the election in Pennsylvania.
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Solve the exponential equation. 27x = 9 1/3 2/3 3/2
Answer:
0.469.
Step-by-step explanation:
To solve the exponential equation 27x = 9^(1/3) * 2^(2/3) * 3^(3/2), we can use the fact that 27 is equal to 3 raised to the power of 3, and 9 is equal to 3 raised to the power of 2. We can also rewrite 2^(2/3) and 3^(3/2) as powers of 2 and 3 respectively.
So, we have:
27x = 3^(3) * 9^(1/3) * 2^(2/3) * 3^(1/2)
27x = 3^(3) * (3^2)^(1/3) * (2^(2))^(1/3) * (3^(2))^(1/4)
27x = 3^(3) * 3^(2/3) * 2^(2/3) * 3^(1/2 * 2)
27x = 3^(3/3 + 2/3 + 1) * 2^(2/3)
27x = 3^(4/3) * 2^(2/3)
Now we can take the logarithm of both sides with base 3:
log₃(27x) = log₃(3^(4/3) * 2^(2/3))
log₃(27x) = 4/3 * log₃(3) + 2/3 * log₃(2)
log₃(27x) = 4/3 + 2/3 * log₃(2)
Simplifying the right-hand side:
log₃(27x) = 2 + 2/3 * log₃(2)
Now we can solve for x by dividing both sides by 27 and using a calculator to evaluate the right-hand side:
log₃(x) = (2 + 2/3 * log₃(2))/27
x = 3^(2 + 2/3 * log₃(2))/27
Using a calculator, we can approximate x to be x ≈ 0.469. Therefore, the solution to the equation 27x = 9^(1/3) * 2^(2/3) * 3^(3/2) is x ≈ 0.469.
Step-by-step explanation:
solve the exponential 3/2-×=1
Unconfined test was ran on a clay sample and the major stress at failure is 3,000 psf. What is the unconfined compression strength of the clay sample
The unconfined compression strength of the clay sample is equal to the major stress at failure, which is 3,000 psf.
To determine the unconfined compression strength of the clay sample, given that the major stress at failure is 3,000 psf, you can follow these steps:
1. Identify the major stress at failure, which is 3,000 psf in this case.
2. The unconfined compression test measures the unconfined compressive strength (UCS) of the clay sample. Since there is no lateral confinement in this test, the major stress at failure is equal to the unconfined compressive strength.
3. Therefore, the unconfined compression strength of the clay sample is 3,000 psf.
In summary, the unconfined compression strength of the clay sample is equal to the major stress at failure, which is 3,000 psf.
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Suppose there are 3 kinds of candy: cherry, lemon, and grape. You want to choose 8 pieces of candy by choosing an (integer) amount of each kind, which could be 0. How many ways can you do this
There are 9 ways to choose 8 pieces of candy from 3 kinds.
To solve this problem, we can use the concept of combinations with repetitions. We need to choose 8 pieces of candy from 3 kinds, which means we can choose 0 to 8 pieces from each kind.
We can represent this using a stars and bars diagram, where each star represents a piece of candy and the bars separate the kinds. For example, the diagram * | ** | *** represents 1 cherry, 2 lemon, and 3 grape candies.
To find the number of ways to choose 8 pieces of candy, we need to find the number of ways to arrange 8 stars and 2 bars (since there are 3 kinds of candy, there are 2 bars). This is a combination with repetition problem, and the formula is:
n + k - 1 choose k - 1
where n is the number of objects (8 stars) and k is the number of groups (2 bars). Plugging in the numbers, we get:
8 + 2 - 1 choose 2 - 1
= 9 choose 1
= 9
Therefore, there are 9 ways to choose 8 pieces of candy from 3 kinds.
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