Answer:
161.67 square feet
Step-by-step explanation:
The explanation is attached below.
Area of rectangle = length * width
=> Area of ABIJ = (7 * 6)ft^2 = 42 ft^2
=> Area of IJHG = (5 * 7)ft^2 = 35 ft^2
=> Area of HGCD = (7.81 * 7)ft^2 = 54.67 ft^2
=> Area of triangle = (EIH) = JFG = 1/2 * Base * height
EIH = 1/2 * 6 * 5 = 15 ft^2
JFG = 1/2 * 6 * 5 = 15 ft^2
Total area = (42 + 35 + 54.67 + 15 + 15)ft^2 = 161.67 ft^2
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Show your work please please please help me
The value of the given expression is [tex]6\frac{11}{24}[/tex].
The given fractional expression is [tex]4\frac{1}{8}+2\frac{1}{3}[/tex].
Here, [tex]4\frac{1}{8}[/tex] can be written as 33/8 and [tex]2\frac{1}{3}[/tex] can be written as 7/3
Now, 33/8 + 7/3
= 99/24 + 56/24
= (99+56)/24
= 155/24
= [tex]6\frac{11}{24}[/tex]
Therefore, the value of the given expression is [tex]6\frac{11}{24}[/tex].
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1) Graph the parametric path using Slope-Direction diagram.
The curve is x = t^2,y = (t - 1)(t^2 - 4), for t, in [-3,3]
2) Find the length of the pay over the given interval.
(2cost - cost2t, 2sint - sin2t), 0 ≤ t ≤ π/2
Please give step-by-step.
To graph the parametric path x = t^2, y = (t - 1)(t^2 - 4) on a Slope-Direction diagram, we need to plot points by evaluating the expressions for different values of t within the given interval [-3, 3].
First, let's calculate the coordinates for several values of t:
For [tex]t = -3: x = 9, y = 0[/tex]
For[tex]t = -2: x = 4, y = 6[/tex]
For [tex]t = -1: x = 1, y = 0[/tex]
For [tex]t = 0: x = 0, y = -4[/tex]
For[tex]t = 1: x = 1, y = 0[/tex]
For[tex]t = 2: x = 4, y = 6[/tex]
For [tex]t = 3: x = 9, y = 0[/tex]
Plotting these points on the Slope-Direction diagram, we can observe the shape of the curve. The path starts at (9, 0), moves downward to (4, 6), reaches the lowest point at (0, -4), and then goes back up to (4, 6) and (9, 0).
To find the length of the curve given by (2cost - cost2t, 2sint - sin2t) over the interval 0 ≤ t ≤ π/2, we can use the arc length formula:
L = ∫√(dx/dt)² + (dy/dt)² dt
First, calculate the derivatives of x and y with respect to t:
dx/dt = -2cost - 2costsin2t
dy/dt = 2cost - 2sintcos2t
Next, square and add these derivatives:
(dx/dt)² + (dy/dt)² = 4cost² + 4costsin2t + 4cost² + 4sint²cos²2t
Simplify the expression:
(dx/dt)² + (dy/dt)² = 8cost² + 4costsin2t + 4sint²cos²2t
Now, integrate the square root of this expression over the given interval 0 ≤ t ≤ π/2 to find the length of the curve:
L = ∫√(8cost² + 4costsin2t + 4sint²cos²2t) dt, from 0 to π/2
Evaluating this integral will provide the final answer for the length of the curve.
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A polynomial f(x) has a lead coefficient of one and exactly three distinct zeros. Find the polynomial that uld go with this (multiply it all out) x = -2 is a zero with a multiplicity of one is a zero with a multiplicity of two x = 3 X = 1 is a zero with a multiplicity of one 0
If x = -2 is a zero with a multiplicity of one, x = 3 is a zero with a multiplicity of two, and x = 1 is a zero with a multiplicity of one, then the polynomial can be written in factored form as:
[tex]f(x) = (x + 2)(x - 3)^2(x - 1)[/tex]
To find the polynomial in expanded form, we can use the distributive property and the rules of exponents:
[tex]f(x) = (x + 2)(x - 3)(x - 3)(x - 1)\\= (x^2 - x - 6)(x - 3)(x - 1)\\= (x^3 - 4x^2 + 3x + 18)(x - 1)\\= x^4 - 5x^3 + 6x^2 + 4x + 18[/tex]
Therefore, the polynomial that has a lead coefficient of one and exactly three distinct zeros, with x = -2 as a zero with multiplicity of one, x = 3 as a zero with multiplicity of two, and x = 1 as a zero with multiplicity of one, is:
[tex]f(x) = x^4 - 5x^3 + 6x^2 + 4x + 18[/tex]
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Housing prices in a small town are normally distributed with a mean of
131,000 and a standard deviation of 8,000
. Use the empirical rule to complete the following statement.
About 95% of the housing Prices are between (µ - 2σ) and (µ + 2σ).About 99.7% of the housing prices are between (µ - 3σ) and (µ + 3σ)
Given that housing prices in a small town are normally distributed with a mean of µ. We are to use the empirical rule to complete the following statement.
The empirical rule states that in a normal distribution, approximately 68% of the data falls within one standard deviation of the mean, approximately 95% of the data falls within two standard deviations of the mean,
and approximately 99.7% of the data falls within three standard deviations of the mean.Since we do not have information about the standard deviation of the housing prices,
we cannot provide exact values for the empirical rule. However, we can make some general statements:
About 68% of the housing prices are between (µ - σ) and (µ + σ).
About 95% of the housing prices are between (µ - 2σ) and (µ + 2σ).About 99.7% of the housing prices are between (µ - 3σ) and (µ + 3σ)
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Use the standard normal table to find the specified area.
To the right of z= 1.16
The area to the right of z = 1.16 in the standard normal distribution is approximately 0.1357, or 13.57% as per the given details.
To discover the location to the right of z = 1.16 in the general everyday distribution, we are able to use the same old regular table or a statistical software.
Using the usual normal desk, the values provided are typically for the place to the left of a given z-rating.
However, seeing that the entire region below the same old normal distribution curve is 1, we can discover the place to the right of z = 1.16 by way of subtracting the region to the left of z = 1.Sixteen from 1.
Area to the right = 1 - Area to the left
= 1 - 0.8643
= 0.1357
Thus, the answer is 0.1357.
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A gazebo in the shape of a regular hexagon (six sides) has side length s and apothem a. If the cost per square unit of flooring is c, express the total cost T of the floor algebraically.
The total cost T of the floor algebraically is T = c x (3√3/2) x s²
We have,
To express the total cost T of the floor of the hexagonal gazebo algebraically, we need to consider the area of the hexagonal floor and the cost per square unit of flooring.
The area of a regular hexagon can be calculated using the formula:
Area = (3√3/2) x s²
Where s is the side length of the hexagon.
To find the total cost, we multiply the area by the cost per square unit of flooring (c):
T = c x Area
Substituting the area formula into the equation:
T = c x (3√3/2) x s²
Now, we have expressed the total cost T algebraically in terms of the side length s and the cost per square unit of flooring c.
Thus,
The total cost T of the floor algebraically is T = c x (3√3/2) x s²
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A bakery offers a sale price of $3.00 for 6 muffins. What is the price per dozen?
Answer:
$6.00
Step-by-step explanation:
In order y find the cost of one muffin, we divide the price of 6 muffins by 6.
$3.00 / 6 = $0.50
Therefore, the cost of one muffin is $0.50.
To find the price per dozen, we multiply the cost of one muffin by 12.
$0.50 * 12 = $6.00
Therefore, the price per dozen muffins is $6.00.
Arrange the following temperatures in ascending order and descending order.
a) 37°C, -15°C, 16°C, -12°C, 0°C, 96°C, -73°C
b) 20°C, -1°C -15°C 0°C, -7°C, 23°C, -36°C.
Answer:
a) -73°C, -15°C, -12°C, 0°C, 16°C, 37°C, 96°C
a) 96°C, 37°C, 16°C, 0°C, -12°C, -15°C, -73°C
b) -36°C, -15°C, -7°C, -1°C, 0°C, 20°C, 23°C
b) 23°C, 20°C, 0°C, -1°C, -7°C, -15°C, -36°C
if the AREA of a rectangular garden is x^2-36 and the length is x^2-2x-24, find an expression to represent the width of the garden.
To find an expression representing the width of the rectangular garden, we need to use the given information about the area and length of the garden.
The formula for the area of a rectangle is:
Area = Length × Width
We are given that the area of the garden is x^2 - 36, and the length is x^2 - 2x - 24.
Let's substitute these values into the formula:
x^2 - 36 = (x^2 - 2x - 24) × Width
To isolate the width, we divide both sides of the equation by (x^2 - 2x - 24):
Width = (x^2 - 36) / (x^2 - 2x - 24)
Therefore, an expression representing the width of the garden is:
Width = (x^2 - 36) / (x^2 - 2x - 24)
Captain’s Autos sells 22 used cars on Monday, and 18 cars on Tuesday. This was 25% of the number of sales for the week. How many cars did they sell altogether of the week?
The number of cars Captain's Autos sold in total that week is 160.
What is the unitary method?The unitary method is a method for solving a problem by the first value of a single unit and then finding the value by multiplying the single value. Unitary method is a technique by which we find the value of a single unit from the value of multiple devices and the value of more than one unit from the value of a single unit. It is a method that we use for most of the calculations in math.
We are given that:
Number of used cars on Monday = 22Number of cars on Tuesday = 18Now,
Let's call the total number of cars sold during the week "x".
We know that the number of cars sold on Monday and Tuesday is 25% of the total number of cars sold during the week. So we can write:
[tex]\sf 22 + 18 = 0.25x[/tex]
Simplifying, we get:
[tex]\sf 40 = 0.25x[/tex]
Dividing both sides by 0.25, we get:
[tex]\bold{x = 160}[/tex]
Hence, by the unitary method the answer will be 160.
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How many inches are in 5 1/4 feet enter only a number
Answer:
64 inches.
Step-by-step explanation:
To find the amount of inches in 5 1/4 feet, you must first multiply 12 by 5 because there are 12 inches in one foot.
12x5=60.
The next step in order to complete the equation would be to find how many inches are in 1/4 of a foot.
To find how many inches are in 1/4 of a foot you must divide 12 by 4.
12 divided by 4= 4.
Now, you must as the two numbers together to get the total number of inches.
60+4=64.
This, 64 is your final answer.
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Water makes about 3/4 of a persons weight If a student weighs 45 lbs. How much does the sudent weigh?
Your question isn’t worded correctly. I will answer it two ways because I’m not sure which is right -
If a student weights 45 lbs how much does the water weigh? 33.75 lbs
And if a student has 45 lbs of water, how much does the student way? 60 lbs
5x = 50. Find x. PLS HELP PLS
Answer:
[tex]\Huge \boxed{\boxed{x = 10}}[/tex]
Step-by-step explanation:
To solve the equation [tex]5x = 50[/tex] and find the value of [tex]x[/tex], we need to isolate [tex]x[/tex] on one side of the equation.
Step 1: Divide both sides of the equation by 5.
[tex]\frac{5x}{5} = \frac{50}{5}[/tex]
Step 2: Simplify this expression
[tex]x = 10[/tex]
Therefore, the solution to the equation [tex]\boldsf{5x = 50}[/tex] is [tex]x = 10[/tex].
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Please help please I’m failing every thing I’m trying to pass
Answer:
[tex]11\frac{7}{10}[/tex]
Step-by-step explanation:
[tex]\displaystyle 3\frac{1}{4}+\biggr(3\frac{1}{4}+5\frac{1}{5}\biggr)\\\\3\frac{5}{20}+3\frac{5}{20}+5\frac{4}{20}\\\\(3+3+5)+\biggr(\frac{5}{20}+\frac{5}{20}+\frac{4}{20}\biggr)\\\\11+\frac{14}{20}\\\\11\frac{7}{10}[/tex]
Again, make sure all denominators are the same by using the least common denominator (in this case it's 20 since 5*4=20).
A data set is normally distributed with a mean of 27 and a standard deviation of 3.5. About what percent of the data is greater than 34?
Answer:
Approximately 2.5% of the data is greater than 34.
Step-by-step explanation:
To solve this problem, we need to use the empirical rule (also known as the 68-95-99.7 rule) for a normal distribution. This rule states that about 68% of values lie within 1 standard deviation of the mean, about 95% of the values lie within 2 standard deviations of the mean, and about 99.7% of the values lie within 3 standard deviations of the mean.
The mean of the dataset is 27, and the standard deviation is 3.5.
34 is exactly 2 standard deviations away from the mean (since 27 + 2*3.5 = 34). According to the empirical rule, about 95% of the data falls within this range. This means that about 5% of the data is outside of this range.
Since the normal distribution is symmetrical, the data outside of 2 standard deviations is equally split between values that are too large and too small. Hence, about half of this 5%, or 2.5%, is greater than 34.
Therefore, approximately 2.5% of the data is greater than 34.
Megan has to spinners. It’s been one is divided into six equal parts. Spenard two is divided into four equal parts. If she spends both spinners what is the probability that’s been a one will land on for an spinner to land on Blue?
The probability that spinner one will land on four, and spinner two will land on blue is (1/24) x (2/24) = 1/288, or approximately 0.3%.
Megan has two spinners with one spinner divided into six equal parts, while the second spinner is divided into four equal parts. The probability that spinner one will land on four, and spinner two will land on blue is required.
The fundamental principle of probability states that the probability of an event happening is the number of favorable outcomes to the total number of outcomes.
To find the probability, it is essential to determine the total number of outcomes by multiplying the number of sections on each spinner.
The total number of outcomes = (Number of sections in spinner one) x (Number of sections in spinner two)
Number of sections in spinner one = 6Number of sections in spinner two = 4Total number of outcomes
= 6 x 4 = 24
The number of outcomes that will result in spinner one landing on four is one, and the number of outcomes that will result in spinner two landing on blue is two.
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8:2(2+2)how would solve this problem
Answer:
16
Step-by-step explanation:
To solve this problem, you need to follow the order of operations (PEMDAS):
First, you need to solve the parentheses: 2+2 = 4
Next, you need to solve the multiplication: 2 x 4 = 8
Finally, you need to solve the division: 8 ÷ 2 = 16
Linear Programming Project
You are the new owner of a music shop in Greenwood. The previous owner
fled the city to join the circus as a magician. Your first duty as new owner
and store manager is to create an advertising plan based on the budget
available. You must figure out how many magazines and TV ads to
purchase.
TV ads cost $600 per airing.
Magazine ads cost $1200 per issue.
Your total advertising budget is $9,000.
1. If we let x = TV ads and y = magazine ads, write an inequality for our
advertising budget.
500 x + 1200y <= 9000
2. Due to space limitations, the magazine publishers tell us that we are only
allowed to purchase up to 6 magazine ads. Write an inequality for this
constraint. y<= 6
3. The television station called to say that we are only allowed to purchase
up to 7 TV ads. Write an inequality for this constraint.
X<=7
4. It is impossible to buy a negative number of TV ads. Write an inequality
for this constraint.
-1
-5. It is impossible to buy a negative number of magazine ads. Write an
inequality for this constraint.
-1
Use the points (1, 150) and (6, 900) to estimate the line of best fit.
1. Find the slope of the line.
2. Write the equation of the line
3. What does the slope tell you about how each TV ad affects sale
For every TV ad, CD sales increased by about
Use the points (1, 100) and (8, 800) to estimate the line of best fit.
1. Find the slope of the line.
2. Write the equation of the line.
3. What does the slope tell you about how each magazine ad affer
sales?
CD sales increased by about...?
1)
When the points (1, 150) and (6, 900) are used:
a)
Slope of line is 150.
Given points,
(1, 150) and (6, 900)
Slope of a line passing from two points:
Slope = y2 - y1 / x2 - x1
Slope = 900 - 150 / 6 - 1
Slope = 150
b)
Equation of line :
Y = mx + c
m = slope of line
c = y intercept
Here,
Slope =150
Hence the equation of line is:
y = 150x
c)
For every TV ad, CD sales increased by about 150 as the slope of line is + 150 which indicates the increase in sales of CD .
2)
When the points (1, 100) and (8, 800) ae used:
a)
Slope of line is 100.
Given points,
(1, 100) and (8, 800)
Slope of a line passing from two points:
Slope = y2 - y1 / x2 - x1
Slope = 800 - 100 / 8 - 1
Slope = 100
b)
Equation of line :
Y = mx + c
m = slope of line
c = y intercept
Here,
Slope =100
Hence the equation of line is:
y = 100x
c)
For every magazine ad, CD sales increased by about 100, as the slope of line is + 100 which indicates the increase in sales of CD .
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abc by cd
Help!!!!!!!
Hello!
abc * cd
= a * b * c * c * d
= abc²d
[tex] \bold{abc \: \: by \: \: cd}[/tex]
Step-by-step explanation :[tex] \bold{(abc) \cdot(cd)}[/tex]
[tex] \sf{abc {}^{1 + 1} d}[/tex]
[tex] \sf{abc {}^{2} d}[/tex]
The general rule for multiplication of monomials says that: multiply the coefficients and then write the letters of the factors in alphabetical order. Each letter is given an exponent equal to the sum of the exponents it has in the factors. The sign of the product result will be given by the Law of Signs.
14. A nutritionist collected information about different
brands of beef hot dogs. She made a table showing
the number of Calories and the amount of sodium in
each hot dog.
a. Write an equation for the line of best fit.
Round all values to the nearest tenth if
needed.
Calories per
Beef Hot Dog
186
181
176
149
184
190
158
139
b. Write the correlation coefficient for the line of best fit.
Round to the nearest hundredth.
Milligrams of Sodium
per Beef Hot Dog
495
477
425
322
482
587
370
322
c. What does the correlation coefficient tell you about your line of best fit?
a. The equation of the line of best fit is y = 1.2x + 375.
b. The correlation coefficient for the line of best fit is 0.97.
c. The correlation coefficient of 0.97 is very close to 1, which indicates that there is a strong positive correlation between the number of calories and the amount of sodium in beef hot dogs.
How to explain the informationMean of x-values: (186 + 181 + 176 + 149 + 184 + 190 + 158 + 139) / 8 = 169
Mean of y-values: (495 + 477 + 425 + 322 + 482 + 587 + 370 + 322) / 8 = 437.5
Calculate the slope of the line of best fit.
Slope = (y2 - y1)/(x2 - x1) = (587 - 495)/(190 - 186) = 1.2
Calculate the y-intercept of the line of best fit.
y-intercept = mean of y-values - slope * mean of x-values
= 437.5 - 1.2 * 169
= 375
The equation of the line of best fit is y = 1.2x + 375.
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One of your customers is delinquent on his accounts payable balance. You’ve mutually agreed to a repayment schedule of $570 per month. You will charge .97 percent per month interest on the overdue balance. If the current balance is $14,790, how long will it take for the account to be paid off?
Note: Do not round intermediate calculations and round your answer to 2 decimal places, e.g., 32.16.
Answer:
To calculate the time it will take to pay off the account, we can use the formula for the future value of an annuity:
PV = PMT * ((1 - (1 + r)^(-n)) / r)
Where:
PV = Present value (current balance)
PMT = Payment amount per period
r = Interest rate per period
n = Number of periods
In this case:
PV = $14,790
PMT = $570
r = 0.0097 (0.97% expressed as a decimal)
n = ?
Plugging in the values, we can solve for n:
14,790 = 570 * ((1 - (1 + 0.0097)^(-n)) / 0.0097)
Let's solve this equation to find the value of n:
((1 + 0.0097)^(-n)) = 1 - (14,790 * 0.0097) / 570
((1 + 0.0097)^(-n)) = 0.9742105
Taking the logarithm of both sides:
-n * log(1.0097) = log(0.9742105)
n = log(0.9742105) / log(1.0097)
Using a calculator, we find that n is approximately 28.56.
Therefore, it will take approximately 28.56 months (or 28 months and 17 days) to pay off the account.
Step-by-step explanation:
Find the perimeter of the figure. All angles in the figure are right angles.
A. 82 cm
B. 59 cm
C. 77 cm
D. 356.25 cm
Answer:
A. 82 cm
Step-by-step explanation:
You want the perimeter of the L-shaped figure that is 12.5 cm high and 28.5 cm wide.
Side lengthsThe top two horizontal line segments have the same total length as the bottom horizontal line segment. We don't need to figure what the missing length is, because we only need their total for the perimeter.
The right side two vertical line segments have the same total length as the left vertical line segment. As with the horizontal segments, we don't need to figure out the missing length, because we only need their total for the perimeter.
PerimeterThe perimeter is the sum of horizontal line segments plus the sum of vertical line segments:
2(28.5 cm) + 2(12.5 cm) = 57 cm + 25 cm = 82 cm
The perimeter of the figure is 82 cm.
<95141404393>
Find the 39th term.
-15, -10, -5, 0, 5, ...
39th term = [?]
Answer:
The explicit arithmetic formula can be used to find the 39th term of this sequence.
[tex]a_{n} = a_{1} + d(n-1)[/tex]
In order to use this formula, we must know a_1, the first term, and , the common difference.
In this case, the first term is given as -15.
The difference can be found by looking at the difference between each following term. In this case, d = +5.
(Notice to get from -15 to -10, we add 5, to get from -10 to -5, we add 5, etc.)
Now that we have everything we need, we can plug everything in to find the 39th term:
[tex]a_{39} = -15 + 5(39-1)\\a_{39} = -15 + 190\\a_{39} = 175[/tex]
The 39th term of this sequence is 175.
*Note n represents the term number we are trying to find. That's why we substituted 39 for n when plugging everything into the formula. [tex]a_{39}[/tex] denotes the 39th term
which image is the translation of triangle ABC given by the translation rule (x,y) (x-2,y+3)
The coordinates of the image of triangle ABC would be A (-1, -1), B (3, 2), and C (4, -6) after translation, and if the original coordinates are A(-3,2) B(1,5) C(2,-3).
We know that,
A point is transformed when it is moved from where it was originally to a new location. Translation, rotation, reflection, and dilation are examples of different transformations.
Let assume A(-3,2) B(1,5) and C (2,-3) are original coordinates
The following translation is being used: (x, y) ⇒ (x + 2, y - 3)
First, take your x-coordinates and add them by two because it is the translation utilized to solve for your x-coordinate.
You would receive the following for yours x's: A (-1, y ) B (3, y) C (4, y)
Next, remove three from each of your y-coordinates because it is the translation being utilized to solve for your y-coordinate.
You would receive the following for your y's: A (x, -1) B (x, 2) C (x, -6)
Finally, you would take each one and put it together, or piece it together.
Hence, the coordinates of the image of triangle ABC after translation would be A (-1, -1), B (3, 2), and C (4, -6).
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Which statement is correct when solving the expression 5y2 – 3y2?
A. Add the coefficients (5 + 3).
B. Add the exponents (2 + 2).
C. Subtract the coefficients (5 – 3).
D. Subtract the exponents (2 – 2).
Answer:
C. Subtract the coefficients (5 – 3)
Step-by-step explanation:
[tex]5y^2-3y^2=(5-3)y^2=2y^2[/tex]
What is the vertically opposite angle y in the drawing below? Type in numerical answer only
Answer:
∠x
Step-by-step explanation:
Vertical angles are defined as angles opposite each other where two lines cross. In this case, it is given that you are trying to find the opposite angle of y. By the definition of vertical angles, it will mean that it is ∠x.
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How can you simplify the exponential expression
Answer:
[tex]( { \frac{ {r}^{2} }{s} })^{3} = \frac{ {r}^{2 \times 3} }{ {s}^{1 \times 3} } = \frac{ {r}^{6} }{ {s}^{3} } [/tex]
For a population, a deviation score is computed as n - μ
True or False?
The given statement is false because A deviation score is computed as the difference between an individual data point and the mean of a distribution, not the population size (n) minus the population mean (μ).
The correct formula for computing a deviation score is:
Deviation Score = Data Point - Mean
In this formula, the data point represents an individual observation from the population or sample, and the mean represents the average value of the data set.
The deviation score measures how far each data point is from the mean. A positive deviation score indicates that the data point is above the mean, while a negative deviation score indicates that the data point is below the mean. The magnitude of the deviation score represents the distance between the data point and the mean.
The formula n - μ is used to calculate the sum of deviations from the population mean, which is used in certain statistical calculations such as the sum of squares. However, it does not represent a deviation score for an individual data point.
Therefore, the statement "A deviation score is computed as n - μ" is false. The correct formula for a deviation score is Data Point - Mean.
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Numbers and operations
show work on paper if possible :)
Answer:
B. $5.99
Step-by-step explanation:
Let's start by finding the total cost of the sodas. We know that there were 5 sodas and each cost $0.75, so the total cost of the sodas is:
5 * $0.75 = $3.75
Next, we need to subtract the cost of the sodas from the total cost before tax to find the cost of the pizzas:
$33.70 - $3.75 = $29.95
Finally, we can divide the cost of the pizzas by the number of pizzas to find the cost of each pizza:
$29.95 ÷ 5 = $5.99
Therefore, the cost of each pizza pie was $5.99. Answer choice B is correct.
Air Yukon received a shipment of plastic trays on September 2. The invoice amounting to was dated August 15, terms 2/10, n/30 R.O.G. What is the last day for taking the cash discount, and how much is to be paid if the discount is taken?
Question content area bottom
What is the last day for taking the cash discount?
Answer:
The terms of "2/10, n/30 R.O.G." mean that the buyer (Air Yukon) can take a cash discount of 2% if they pay the invoice within 10 days. Otherwise, the full amount is due within 30 days of the invoice date. "R.O.G." means "receipt of goods," indicating that the 30-day period begins on September 2, the date Air Yukon received the shipment.
To determine the last day for taking the cash discount, we start with the date of the invoice, August 15, and add 10 days for the discount period. This gives us August 25, which is the last day Air Yukon can pay the invoice and still receive the 2% discount.
If Air Yukon takes the cash discount, they will pay 98% of the invoice amount. We don't know the exact amount of the invoice from the information given, but if we assume it was $1,000, Air Yukon would pay $980 if they take the cash discount ($1,000 x 0.98).