a. The median of Otter 2 's data is greater than the median of Otter 1's data. b. The variability in the data for Otter 1 is greater than the variability in the data for Otter 2.
c. Liz can conclude that Otter 2 generaily eats more food.
How to convey the informationIn statistics and probability theory, the median is the value separating the higher half from the lower half of a data sample, a population, or a probability distribution.
The median is the value in the middle of a data set, meaning that 50% of data points have a value smaller or equal to the median and 50% of data points have a value higher or equal to the median.
The median for A is 25.5 and 26 for B. This implies that B has higher median than A.
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2 years ago father was three times old as his son and two years hence twice his age will be equal to 5 times that of his son find their present age
Answer:
Step-by-step explanation:
What is a simplified value of the expression
The expression [tex]\frac{(\sqrt[3]{3})^{3/5} }{(\sqrt[3]{3})^{6/5}}[/tex] is equivalent to the expression [tex]\frac{1}{\sqrt[5]{3} }[/tex]. Then the correct option is B.
What is an equivalent?The equivalent is the expression that is in different forms but is equal to the same value.
The definition of simplicity is making something simpler to achieve or grasp while also making it a little less difficult.
The expression is given below.
[tex]\rightarrow \dfrac{(\sqrt[3]{3})^{3/5} }{(\sqrt[3]{3})^{6/5}}[/tex]
Simplify the expression, then we have
[tex]\rightarrow \dfrac{(\sqrt[3]{3})^{3/5} }{(\sqrt[3]{3})^{6/5}}\\\\\rightarrow \dfrac{(3)^{1/5 }}{(3)^{2/5}}\\\\\rightarrow \dfrac{(3)^{1/5 }}{(9)^{1/5}}\\\\\rightarrow \dfrac{1}{\sqrt[5]{3} }\\[/tex]
The expression [tex]\frac{(\sqrt[3]{3})^{3/5} }{(\sqrt[3]{3})^{6/5}}[/tex] is equivalent to the expression [tex]\frac{1}{\sqrt[5]{3} }[/tex]. Then the correct option is B.
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what is 2 quarts to liters?
There are 1.057 quarts in a liter, and there are 0.946 liters in a quart.
Therefore, 2 Quarts is 1.8927059 liters, which is equal to almost 2 liters.
Quart:
A quart is an English unit of volume equal to one quarter of a gallon. Currently, there are three types of quarts: Liquid Quart and Dry Quart of the US Conventional System, and Imperial Quart of the UK Imperial System. All of them are approximately equal to 1 liter. It is subdivided into 2 pints or (in the US) 4 cups. Historically, the exact size of a quart has varied over time and with the value of a gallon across different commodities.
Liter:
A liter or liter is a metric unit of volume. A liter is defined as the volume of a cube with sides measuring 10 centimeters. In the US, it is approximately 3.785 liters gallon.
According to the Question:
The conversion factor from quarts to liters is 0.94635295. To find how many liters are in quarts, multiply the conversion factor or use the volume converter above 2 quarts equals 1.8/10 of 93 liters.
To convert 2 quarts to equivalent liter values, multiply the amount in quarts by 0.94635295 (conversion factor). In this case, you should multiply 2 quarts by 0.94635295 to get the equivalent result in liters:
2 quarts x 0.94635295 = 1. 8927059 liters
Therefore,
2 quarts equals 1.8927059 liters.
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7. Katarina plans to borrow $600 at 3% over 5 years. What amount of simple interest should
she expect to pay?
A. $15
B. $18
C. $90
D. $180
The amount of simple interest is (c) $90
How to determine the amount of simple interestFrom the question, we have the following parameters that can be used in our computation:
Principal = $600
Rate = 3%
TIme = 5 years
The simple interest is calclated as
Simple interest = PRT
Substitute the known values in the above equation, so, we have the following representation
Simple interest = 600 * 3% * 5
Evaluate
Simple interest = 90
Hence, the amount is $90
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2(5x + 2) = 10x - 4
what is the x
Answer:umm
There are no values of
x
that make the equation true.
No solution
Step-by-step explanation:
Kevin is 3 times as old as Daniel. 4 years ago, Kevin was 5 times as old as Daniel.
How old is Daniel now?
Answer:
Daniel is 8 years old now
Step-by-step explanation:
Let Kevin's age now be K and let Daniel's age now be D
"Kevin is 3 times as old as Daniel"
Translation: K = 3D
"4 years ago, Kevin was 5 times as old as Daniel"
4 years ago Kevin's age = K - 4
4 years ago Daniel's age = D - 4
4 years ago, Kevin was 5 times as old as Daniel.
Translation: K - 4 = 5(D - 4)
K - 4 = 5D - 20
Simplify this equation:
Add 4 to both sides:
K - 4 + 4 = 5D - 20 + 4
K = 5D - 16
Substitute K = #D:
3D = 5D - 16
Subtract 5D from both sides:
3D - 5D = - 16
-2D = -16
or
2D = 16 (multiply by - 1)
D = 16/2 = 8
and
K = 3D = 3 x 8 = 24
Now, Kevin is 24 years old and Daniel is 8 years old
Verify
If Kevin is 3x older than Daniel who is 8 now,
Kevin's age now = 3 x 8 = 24 Check
4 years ago, Daniel was 8 - 4 = 4 years
4 years ago, Kevin was 24 - 4 = 20
Kevin's age 4 years ago = 5 x 4 = 20 Check
Woof Chow Dog Food Company believes that it has a market share of 25 percent. It surveys n = 100 dog owners and ask whether or not Woof Chow is their regular brand of dog food, and 23 people say yes. Based upon this information, what is the critical value if the hypothesis is to be tested at the 0.05 level of significance?
The critical value for the 0.05 level of significance is k = 21.
To find the critical value, we can use the binomial distribution. The binomial distribution models the number of successes in n independent Bernoulli trials, each with probability p of success. In this case, the number of successes is the number of dog owners who say Woof Chow is their regular brand, and the number of trials is n = 100. The null hypothesis is that the true market share of Woof Chow is 25%, and the alternative hypothesis is that it is not 25%.
We can use the binomial cumulative distribution function (CDF) to find the critical value. The CDF gives the probability of getting k or fewer successes in n trials, given a probability of success p. The critical value is the smallest value of k such that the CDF at k is greater than or equal to 1 - alpha, where alpha is the level of significance. In this case, alpha = 0.05.
So, we want to find the smallest k such that:
P(X <= k) >= 1 - 0.05
where X is a random variable representing the number of dog owners who say Woof Chow is their regular brand. We can use a binomial calculator or a software package to calculate the binomial CDF, or we can use a table of critical values for the binomial distribution.
The critical value for the 0.05 level of significance is k = 21. This means that if the true market share of Woof Chow is 25%, then the probability of getting 23 or more dog owners who say Woof Chow is their regular brand is less than 0.05. Since the observed number of dog owners who say Woof Chow is their regular brand is 23, which is greater than 21, we can reject the null hypothesis that the true market share is 25%.
This means that based on the survey results, we cannot conclude that Woof Chow has a market share of 25%. The survey results suggest that Woof Chow may have a market share that is greater than 25%.
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Mr. Adams divides 223 markers equally among the 26 students in his
class. He puts the
extra markers in a box. What is the least number of
markers he puts in the box?
Answer: 15
Step-by-step explanation:
223 / 26
8 reminder 15
he has to put the remainder in the box
Edward serves 4 cups of coffee every nine minutes how many cups of coffee does he serve every minute write an equation where y is the subject that represents this proportional relationship
The solution is, an equation where y is the subject that represents this proportional relationship is, y = 4x/9.
What is equation?An equation is a mathematical statement that is made up of two expressions connected by an equal sign. In its simplest form in algebra, the definition of an equation is a mathematical statement that shows that two mathematical expressions are equal. For instance, 3x + 5 = 14 is an equation, in which 3x + 5 and 14 are two expressions separated by an 'equal' sign.
here, we have,
given that,
Edward serves 4 cups of coffee every nine minutes
now, we have to find that,
how many cups of coffee does he serve every minute ,
i.e. we get,
in 9mint. cup = 4
so, in 1 mint cup = 4/9
now, an equation where y is the subject that represents this proportional relationship is,
y = 4x/9
where, x for the amount of minutes .
Hence, The solution is, an equation where y is the subject that represents this proportional relationship is, y = 4x/9.
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Suppose that nâ¡0 and n â¡ 1. Show that the substitution v = y^1-n transforms the Bernoulli equation dy/dx + P(x)y = Q(x)y^n into the linear equationdv/dx+(1-n)P(x)v(x) = (1 â n)Q(x).
The substitution v = y^1-n transforms the Bernoulli equation dy/dx + P(x)y = Q(x)y^n into the linear equation dv/dx+(1-n)P(x)v(x) = (1 - n)Q(x) is shown below.
An equation is in the form
dy/dx +P(x)y=Q(x)yⁿ, where P and Q are functions of x alone or constants, is called Bernoulli's equation.
The substitution using [tex]v = y^{1-n}[/tex]
Differentiate both side with respect to 'x'
[tex]v^{'} = (1-n)y^{-n}y^{'}[/tex]
[tex]\frac{dy}{dx} = \frac{1}{1-n} y^{n}v^{'}[/tex]
we get, [tex]\frac{1}{1-n} y^{n}v^{'}[/tex] + P(x)y = Q(x)yⁿ
= [tex]v^{'} + (1-n)P(x)y^{1-n} = (1-n)Q(x)[/tex]
using [tex]v = y^{1-n}[/tex]
The given equation is well expressed as:
[tex]v^{'} + (1-n)P(x)v = (1-n)Q(x)[/tex]
or dv/dx + (1-n)P(x)v(x) = (1 - n)Q(x)
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A factory manufactures a metal piece in 32 minutes. New technology allowed the
factory to cut that time by 8%. Then another improvement cut the time by 5%.
How long does it take to manufacture the piece now? Round your answer to
the nearest minute.
Answer: The first improvement cut the time by 32 * 0.08 = 2.56 minutes.
So, the new time after the first improvement is 32 - 2.56 = 29.44 minutes.
The second improvement cut the time by 29.44 * 0.05 = 1.472 minutes.
So, the final time is 29.44 - 1.472 = 27.968 minutes.
Rounding to the nearest minute, it now takes 28 minutes to manufacture the piece.
Step-by-step explanation:
help!!!!!!!!!!!!!!!!
Answer:
2 3/7
Step-by-step explanation:
Answer:
2^[tex]\frac{3}{2}[/tex]
Step-by-step explanation:
2^3·1/2 = 2^[tex]\frac{3}{2}[/tex]
the image you posted is very blurry, but it looks like the answer is the last choice
Henry deposits $6000 into an account that pays simple Interest at an annual rate of 6%. He does not make any more deposits. He makes no withdrawals until
the end of 5 years when he withdraws all the money.
Answer the following questions. If necessary, refer to the list of financial formulas.
(a) How much total interest will Henry earn?
$
(b) What will the total amount in the account be (including interest)?
$
Answer:
1800
7800
Step-by-step explanation:
6000x0.06 = 360 x 5 for years since its annual then you get 1800 add that to the additional 6000 add those together and you get 7800.
Solve the problem pls
The original number in the word problem is 77.
How to find the numberLet's call the original two-digit number "x".
Information from the problem
the sum of the digits in x is 14.
So, we can write the number as x = 10a + b,
where a and b are the tens and ones digit, respectively, and a + b = 14.
Reversing and doubling the original number gives us 2(10b + a)
= 20b + 2a.
Adding the original number, x, and the doubled, reversed number, 2(10b + a),
we have 3x = 222.
Substituting x = 10a + b
3(10a + b) = 222
30a + 3b = 222
30a = 222 - 3b
Since the sum of the digits is 14, a + b = 14, so we can substitute for a in the equation:
30(14 - b) = 222 - 3b
420 - 30b = 222 - 3b
198 = 27b
Dividing both sides by 27, we find:
b = 7
So, the original number is x = 10a + b = 10(14 - 7) + 7 = 77.
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Which are the remote interior angles of ∠4?.
The remote interior angles of ∠4 are ∠1 and ∠2.
In a triangle, the remote interior angles are the two angles that are not adjacent to the exterior angle. In this case, ∠4 is the exterior angle, so the two angles that are not adjacent to it are ∠1 and ∠2. These are the remote interior angles of ∠4.
Here is a step-by-step explanation:
1. Identify the exterior angle. In this case, it is ∠4.
2. Find the two angles that are not adjacent to the exterior angle. These are ∠1 and ∠2.
3. These two angles are the remote interior angles of ∠4.
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-6=4+n i need help ASAP
A guy wire runs from the top of a cell tower to a metal stake in the ground. Grace places a 6-foot tall pole to support the guy wire. After placing the pole, Grace measures the distance from the stake to the pole to be 7 ft. She then measures the distance from the pole to the tower to be 19 ft. Find the length of the guy wire, to the nearest foot.
The length of the guy wire is 20 feet
What is Trigonometry?Trigonometry is a branch of mathematics that studies relationships between side lengths and angles of triangles.
We can use the Pythagorean theorem to find the length of the guy wire.
Let's call the length of the guy wire "g".
Then we have a right triangle with hypotenuse g, one leg of length 7 ft, and the other leg of length 19 ft.
Using the Pythagorean theorem, we have:
g² = 7² + 19²
g² = 49 + 361
g² = 410
Take square root on both sides
g = 20.24
Therefore, the length of the guy wire is 20 feet
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PLease answer will give alot of points
Answer:
Step-by-step explanation:
1. Imagine a triangle with base side 36 feet and Kate at the right with the angle of elevation, 24 degrees. We can use tangent:
tan 24 = o/a ; tan(24) = o/36 ; 36(tan(24)) = o ; o = 16 feet
This is how tall the screen is.
2. We do a similar operation:
tan(74) = o/a ; tan(74) = 555/a ; a = 555/tan(74) ; a = 159.1 feet
Hope this helps!
What is the No information rate in statistics?
The No Information Rate (NIR) is a measure of the accuracy of a classification model that predicts the most frequent class as the outcome for all cases.
In statistics, the No Information Rate (NIR) is a measure of the accuracy of a classification model that predicts the most frequent class as the outcome for all cases. It represents the accuracy rate that can be achieved by simply guessing the most frequent outcome without using any predictive model or variable.
The NIR is commonly used as a benchmark for evaluating the performance of classification models, as any model that performs worse than the NIR is considered to be poorly performing. Conversely, a model that performs better than the NIR is considered to have some predictive power beyond simply guessing the most frequent outcome.
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A campus contains buildings numbered 1 through 70. What is the probability that a student will enter a building that is not a multiple of 12?.
The probability that a student will enter a building that is not a multiple of 12 is 0.914
We can find the probability by finding the number of buildings that are not a multiple of 12 and dividing it by the total number of buildings (70).
The buildings that are multiples of 12 are:
12, 24, 36, 48, 60, and 70
So there are 6 buildings thar are multiple of 12.
So, the number of buildings that are not a multiple of 12 is
70 - 6 = 64
Therefore, the probability that a student will enter a building that is not a multiple of 12 is
= 64/70
= 0.914
= 91.4 %
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Let [tex]f(x)=-5x+3[/tex] and [tex]g(x)=6x-2[/tex]. Find f times g and its domain.
The result of f times g is; -30x² + 28x - 6 while it's domain as required is the set of all real numbers.
What is the domain of f times g?As evident in the task content;
f(x) = -5x + 3 while g(x) = 6x - 2.
Hence, the result of f times g is; (-5x + 3) (6x - 2).
open parenthesis
f × g = -5x(6x) - 5x(-2) + 3(6x) + 3(-2)
= -30x² + 10x + 18x - 6
f × g = -30x² + 28x -6.
By observation, the function above is a quadratic function and hence, it's domain is the set of all real numbers.
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A is the point (-1, 5). Let (x, y) be any point on the line y = 3x.
(3 marks)
a Write an equation in terms of x for the distance between (x, y) and A(-1, 5).
b Find the coordinates of the two points, B and C, on the line y = 3x which are a distance
of √74 from (-1, 5).
(3 marks)
e Find the equation of the line that is perpendicular to y = 3x and goes through the
point (-1, 5).
Find the coordinates of the point of intersection between ₁ and y = 3.x.
e Find the area of triangle ABC.
(2 marks)
The distance is√(x+1)²+(3x-5)², coordinates are B: (-4/3, -4) and C: (2/3, 2), y = (-1/3)x + (14/3) is equation of the line that is perpendicular to y = 3x, point of intersection is (7/5, 21/5).
What is Distance?The length along a line or line segment between two points on the line or line segment.
The distance formula is Distance=√(x₂-x₁)²+(y₂-y₁)²
Equation in terms of x for the distance between (x, y) and A(-1, 5) and y = 3x. be any point on the line
Distance=√(x+1)²+(3x-5)²
b. We need to find coordinates of the two points, B and C, on the line y = 3x which are a distance of √74 from (-1, 5).
√(x₁+1)²+(3x₁-5)² =√74
√(x₂+1)²+(3x₂-5)² =√74
Simplifying each equation and solving for x, we get:
x₁ = -4/3 or x₁ = -2
x₂ = 2/3 or x₂ = -4
Simplifying each equation and solving for x, we get:
x₁ = -4/3 or x₁ = -2
x₂ = 2/3 or x₂ = -4
Substituting each value of x into y = 3x, we get the coordinates of B and C:
B: (-4/3, -4)
C: (2/3, 2)
The slope of y = 3x is 3,
Slope of any line perpendicular to it is -1/3.
Using the point-slope form of a line, we get the equation of the line passing through (-1, 5) with slope -1/3:
y-5=-1/3(x+1)
The point of intersection between y = 3x and the line y = (-1/3)x + (14/3), we can set the two equations equal to each other and solve for x:
3x = (-1/3)x + (14/3)
x = 14/10 = 7/5
y = 3(7/5) = 21/5
So the point of intersection is (7/5, 21/5).
To find the area of triangle ABC, we can use the distance formula between the points B and C:
d = √2/3 - (-4/3))² + (2 - (-4))²)
d=2√10
The base of the triangle is the distance between the x-coordinates of B and C, which is 2.
The area of the triangle is:1/2×b×h
=2√10
Hence, the distance is√(x+1)²+(3x-5)², coordinates are B: (-4/3, -4) and C: (2/3, 2), y = (-1/3)x + (14/3) is equation of the line that is perpendicular to y = 3x, point of intersection is (7/5, 21/5).
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the most important part of the design cycle is.....
The most important part of the design cycle is the "Iteration" phase.
In this phase, the designer goes back and forth between testing and evaluating the design, making changes, and testing again until the desired outcome is achieved.
In mathematical terms, the iteration phase can be seen as an optimization process, where the designer seeks to minimize the difference between the desired and actual outcomes.
This phase is crucial because it allows the designer to identify and resolve any issues with the design, ensuring that the final product is functional and meets the desired specifications.
In conclusion, the iteration phase of the design cycle is essential for ensuring that the final design is effective, efficient, and meets all the requirements. The designer must repeat this phase multiple times to achieve the desired outcome and ultimately improve the overall design.
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How do you calculate orthogonal projection?
The vector "p" that represents "a's closest point" on the line "b" spans is the orthogonal projection of vector "a" onto vector "b."
So the vector "p" that represents "a's closest point" on the line "b" spans is the orthogonal projection of vector "a" onto vector "b." The following is the formula for projecting "a" orthogonally onto "b": CSS Copy: p = (dot(a, b) / dot(b, b)) * b, where "dot" stands for the dot product of the two vectors.
The procedures to determine the orthogonal projection of a vector "a" onto a vector "b" are as follows:
Identify the "a" and "b" dot product.
Add "b" to itself and calculate the dot product.
Divide the intersection of "a" and "b" by the intersection of "b" and itself.
Multiply the vector "b" by the step 3 result.
Here is a MATLAB sample that shows the orthogonal projection.
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Mr. Rideout is in charge of washing the windows on a bus. He washes 25 of the 30 windows before lunch. After lunch he washes 7 of the remaining windows. How many windows does Mr. Rideout still need to wash?
The remaining number of windows is given by the equation A = 11 windows
What is an Equation?Equations are mathematical statements with two algebraic expressions flanking the equals (=) sign on either side.
It demonstrates the equality of the relationship between the expressions printed on the left and right sides.
Coefficients, variables, operators, constants, terms, expressions, and the equal to sign are some of the components of an equation. The "=" sign and terms on both sides must always be present when writing an equation.
Given data ,
Let the equation be represented as A
Now , the value of A is
The total number of windows that needs to be washed = 30 windows
The number of windows that was washed before lunch = ( 2/5 ) of the total
Substituting the values in the equation , we get
The number of windows that was washed before lunch = ( 2/5 ) x 30
The number of windows that was washed before lunch = 2 x 6
The number of windows that was washed before lunch = 12 windows
So , the remaining number of windows = 30 - 12 = 18 windows
And ,
The number of windows that was washed after lunch = 7 windows
So , the remaining number of windows that needs to be washed A = remaining number of windows - number of windows that was washed after lunch
On simplifying the equation , we get
The remaining number of windows that needs to be washed A = 18 - 7
The remaining number of windows that needs to be washed A = 11 windows
Hence , the equation is A = 11 windows
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Let A be an m×n matrix.
Suppose that the nullspace of A is a plane in R^3 and the range is spanned by a nonzero vector v in R^5. Determine m and n. Also, find the rank and nullity of A.
The rank (m) and the nullity (n) is the Matrix A is 5 and 3 respectively according to the planes given.
The maximum number of its linearly independent columns (or rows ) of a matrix is called the rank of a matrix. And the dimension of the null space of A, also called the kernel of A.
Given null space of [tex]L_{A}[/tex] is a plane in [tex]lR^{3}[/tex] .
So nullity of matrix A is A = 2
Since the dimensions of a plane in [tex]lR^{3}[/tex] is 2.
Also the range is spanned by non-vector V in [tex]R^{5}[/tex].
So rank of matrix A is A = 1
Clearly the linear transformation is from [tex]lR^{5}[/tex] to [tex]lR^{3}[/tex],
Then the Matrix A is a = 5x3 matrix.
Therefore, Rank of the matrix A (m)= 5 and Nullity of the matrix A (n) = 3.
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Compute the linear correlation coefficient between the length of the right humerus in the length of the right tibia
The linear correlation coefficient between the length of the right humerus and the length of the right tibia is 0.517.
To compute the linear correlation coefficient between the length of the right humerus and the length of the right tibia, we will use the formula: r = (n∑xy - (∑x)(∑y)) / sqrt([(n∑x^2 - (∑x)^2)(n∑y^2 - (∑y)^2)])
Where r is the correlation coefficient, n is the number of observations, x is the length of the right humerus, and y is the length of the right tibia.
First, we will calculate the sum of x, y, xy, x^2, and y^2:
∑x = 24.8 + 24.59 + 24.59 + 24.29 + 23.81 + 24.87 + 25.90 + 26.11 + 26.63 + 26.31 + 26.84 = 278.74
∑y = 65.05 + 35.57 + 35.57 + 34.58 + 34.20 + 34.73 + 37.38 + 37.96 + 37.46 + 37.75 + 38.50 = 428.75
∑xy = (24.8)(65.05) + (24.59)(35.57) + (24.59)(35.57) + (24.29)(34.58) + (23.81)(34.20) + (24.87)(34.73) + (25.90)(37.38) + (26.11)(37.96) + (26.63)(37.46) + (26.31)(37.75) + (26.84)(38.50) = 10659.01
∑x^2 = (24.8)^2 + (24.59)^2 + (24.59)^2 + (24.29)^2 + (23.81)^2 + (24.87)^2 + (25.90)^2 + (26.11)^2 + (26.63)^2 + (26.31)^2 + (26.84)^2 = 7221.47
∑y^2 = (65.05)^2 + (35.57)^2 + (35.57)^2 + (34.58)^2 + (34.20)^2 + (34.73)^2 + (37.38)^2 + (37.96)^2 + (37.46)^2 + (37.75)^2 + (38.50)^2 = 15738.39
Now we can plug these values into the formula and calculate the correlation coefficient:
r = (11)(10659.01) - (278.74)(428.75) / sqrt([(11)(7221.47) - (278.74)^2][(11)(15738.39) - (428.75)^2])r = 117249.11 - 119475.235 / sqrt([79436.17 - 77691.79][173122.29 - 183744.56])r = -2226.125 / sqrt([1744.38][-10622.27])r = -2226.125 / sqrt(-18525838.35)r = -2226.125 / (-4304.18)r = 0.517
Therefore, the linear correlation coefficient between the length of the right humerus and the length of the right tibia is 0.517.
Note: The question is incomplete. The complete question probably is: Research performed at NASA and led by Emily Horton measured the lengths of the right humerus and right tibia in 11 rats that were sent to space on Spacelab Life Sciences 2.
Right Humerus (mm) Right Tibia (mm)
24.8 65.05
24.59 35.57
24.59 35.57
24.29 34.58
23.81 34.20
24.87 34.73
25.90 37.38
26.11 37.96
26.63 37.46
26.31 37.75
26.84 38.50
Compute the linear correlation coefficient between the length of the right humerus and the length of the right tibia.
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Please help me with this.
Which question are you seeking the answer to?
how much is 55000 a year per hour
Assuming a 40-hour workweek, 55000 per year would be approximately 26.44per hour.
Subtract 55000 from 52, the number of weeks in a year, and you get 1057.69. Subtract 1057.69 from 40, the number of hours in a workweek, to get 26.44.To the nearest dollar, round up: 26.44 = 27 Calculating how much an individual would make per hour with a yearly salary of $55,000 is a fairly straightforward process. Divide the annual income of $55,000 by the 52 weeks that make up a year. As a result, we get a score of 1057.69. After that, divide this number by the 40 hours that make up a workweek. As a result, we get a score of 26.44. The final step is to round this result up to the nearest dollar, which gives us an hourly wage of $27. 55,000 dollars a year is therefore equal to about 27 dollars per hour.
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How do you find p-value from Z?
The p-value can be calculated from the Z-score of the observed result using the Z-table, which is a table of values for the standard normal distribution.
The p-value is the probability of getting a result at least as extreme as the one observed, given that the null hypothesis is true. It is calculated from the Z-score of the observed result, which is a measure of how many standard deviations away from the mean the observed result is. To calculate the p-value from a Z-score, you need to use the Z-table, which is a table of values for the standard normal distribution. The Z-table shows the probability of a given Z-score, or the area under the normal distribution curve to the left of the Z-score. To find the p-value associated with a given Z-score, you simply look up the probability in the Z-table, and subtract this probability from 1. This gives you the p-value, which is the probability of getting a result at least as extreme as the one observed, given that the null hypothesis is true.
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