Examples of Square Deal in the following topics:
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- Roosevelt's Square Deal focused on conservation of natural resources, control of corporations, and consumer protection.
- The Square Deal was President Theodore Roosevelt's domestic program.
- These three demands often are referred to as the "three Cs" of Roosevelt's Square Deal.
- Trusts and monopolies became the primary target of Square Deal legislation.
- Photograph of Senator Hepburn, who sponsored the Hepburn Act, which regulated railroad fares, one of the goals of Roosevelt's Square Deal.
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- The difference between weighted and unweighted means is a difference critical for understanding how to deal with the confounding resulting from unequal n.
- When confounded sums of squares are not apportioned to any source of variation, the sums of squares are called Type III sums of squares.
- When all confounded sums of squares are apportioned to sources of variation, the sums of squares are called Type I sums of squares.
- As you can see, with Type I sums of squares, the sum of all sums of squares is the total sum of squares.
- None of the methods for dealing with unequal sample sizes are valid if the experimental treatment is the source of the unequal sample sizes.
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- Variance is the sum of the probabilities that various outcomes will occur multiplied by the squared deviations from the average of the random variable.
- The variance of a data set measures the average square of these deviations.
- A clear distinction should be made between dealing with the population or with a sample from it.
- When dealing with the complete population the (population) variance is a constant, a parameter which helps to describe the population.
- When dealing with a sample from the population the (sample) variance is actually a random variable, whose value differs from sample to sample.
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- For now, deal with roots by turning them back into exponents.
- If the square root of a number is taken, the result is a number which when squared gives the first number.
- Roots do not have to be square.
- However, using a calculator can approximate the square root of a non-square number:$\sqrt {3} = 1.73205080757$
- Writing the square root of 3 or any other non-square number as $\sqrt {3}$ is the simplest way to represent the exact value.
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- Areas in the chi-square table always refer to the right tail.
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- Define the Chi Square distribution in terms of squared normal deviates
- The Chi Square distribution is the distribution of the sum of squared standard normal deviates.
- Therefore, Chi Square with one degree of freedom, written as χ2(1), is simply the distribution of a single normal deviate squared.
- A Chi Square calculator can be used to find that the probability of a Chi Square (with 2 df) being six or higher is 0.050.
- The Chi Square distribution is very important because many test statistics are approximately distributed as Chi Square.
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- When a trinomial is a perfect square, it can be factored into two equal binomials.
- Note that if a binomial of the form $a+b$ is squared, the result has the following form: $(a+b)^2=(a+b)(a+b)=a^2+2ab+b^2.$ So both the first and last term are squares, and the middle term has factors of $2, $ $a$, and $b,$ where the latter are the square roots of the first and last term respectively.
- For example, if the expression $2x+3$ were squared, we would obtain $(2x+3)(2x+3)=4x^2+12x+9.$ Note that the first term $4x^2$ is the square of $2x$ while the last term $9$ is the square of $3$, while the middle term is twice $2x\cdot3$.
- Suppose you were trying to factor $x^2+8x+16.$ One can see that the first term is the square of $x$ while the last term is the square of $4$.
- Since the first term is $3x$ squared, the last term is one squared, and the middle term is twice $3x\cdot 1$, this is a perfect square, and we can write:
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- On the right are people who play a great deal (tournament players).
- It is based on the concept of the sum of squared deviations (differences).
- The first row in the table shows that the squared value of the difference between 2 and 10 is 64; the second row shows that the squared difference between 3 and 10 is 49, and so forth.
- When we add up all these squared deviations, we get 186.
- So, the sum of the squared deviations from 5 is smaller than the sum of the squared deviations from 10.
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- The method of completing the square allows for the conversion to the form:
- Once completing the square has been performed, the quadratic is easy to solve; because there is only one place where the variable $x$ is squared, the $(x-h)^2$ term can be isolated on one side of the equation, and then the square root of both sides can be taken.
- This quadratic is not a perfect square.
- The closest perfect square is the square of $5$, which was determined by dividing the $b$ term (in this case $10$) by two and producing the square of the result.
- Solve for the zeros of a quadratic function by completing the square