Prove that the sum of the deviations of a set of measurements about their mean is equal to zero; that is,

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Answer 1

Textbook Question

Chapter 1, Problem 22SE

Prove that the sum of the deviations of a set of measurements about their mean is equal to zero; that is,

Chapter 1, Problem 22SE, Prove that the sum of the deviations of a set of measurements about their mean is equal to zero;

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Expert Solution & Answer

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

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Answer 2

Textbook Question

Chapter 1, Problem 22SE

Prove that the sum of the deviations of a set of measurements about their mean is equal to zero; that is,

Chapter 1, Problem 22SE, Prove that the sum of the deviations of a set of measurements about their mean is equal to zero;

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Expert Solution & Answer

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

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Answer 3

Textbook Question

Chapter 1, Problem 22SE

Prove that the sum of the deviations of a set of measurements about their mean is equal to zero; that is,

Chapter 1, Problem 22SE, Prove that the sum of the deviations of a set of measurements about their mean is equal to zero;

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Expert Solution & Answer

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

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Answer 4

Textbook Question

Chapter 1, Problem 22SE

Prove that the sum of the deviations of a set of measurements about their mean is equal to zero; that is,

Chapter 1, Problem 22SE, Prove that the sum of the deviations of a set of measurements about their mean is equal to zero;

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Expert Solution & Answer

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

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Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

Answer 8

Expert Solution & Answer

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

Prove that the sum of deviations about the mean of a set of observations is zero, that is, ∑i=1n(yi−y¯)=0.

Answer 12

Explanation of Solution

The formula for the mean of a set of n observations is, y¯=1n∑i=1nyi.

Now, consider the following calculation, starting from the left-hand-side of the given expression:

∑i=1n(yi−y¯)=∑i=1nyi−∑i=1ny¯=n(1n∑i=1nyi)−ny¯=ny¯−ny¯=0.

Thus, the left-hand-side is 0, which is the right-hand-side of the given expression.

Hence, it is proved that ∑i=1n(yi−y¯)=0.

Answer 13

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Prove that the sum of the deviations of a set of measurements about their mean is equal to zero; that is,

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