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# GRE Introduction to the QUantitative Reasoning Measure

By Lynn Willis,2014-08-09 04:42
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GRE Introduction to the QUantitative Reasoning Measure

Introduction to the Quantitative Reasoning

Measure

Educational Testing Service (ETS) in the United States and other countries.

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Introduction to the Quantitative Reasoning Measure

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Measure. A downloadable large print version of this document is available from the GRE?

website, as are other downloadable practice and test familiarization materials in large print and screen reader friendly formats. Tactile figure supplements for this document, along with additional accessible practice and test familiarization materials in other formats, are available from E T S Disability Services Monday to Friday 8:30 a m to 5 p m New York time, at 1-6 0 9-7 7 1-7 7 8 0, or 1-8 6 6-3 8 7-8 6 0 2 (toll free for test takers in the United States, U S Territories and Canada), or via email at stassd@ets.org.

The Quantitative Reasoning measure of the GRE revised General Test assesses your:

; basic mathematical skills

; understanding of elementary mathematical concepts

; ability to reason quantitatively and to model and solve problems with quantitative

methods

Some of the questions in the measure are posed in real life settings, while others are posed in purely mathematical settings. The skills, concepts, and abilities are tested in the four content areas below.

Arithmetic topics include properties and types of integers, such as divisibility, factorization, prime numbers, remainders, and odd and even integers; arithmetic operations, exponents, and radicals; and concepts such as estimation, percent, ratio, rate, absolute value, the number line, decimal representation, and sequences of numbers.

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Algebra topics include operations with exponents; factoring and simplifying algebraic expressions; relations, functions, equations, and inequalities; solving linear and quadratic equations and inequalities; solving simultaneous equations and inequalities; setting up equations to solve word problems; and coordinate geometry, including graphs of functions, equations, and inequalities, intercepts, and slopes of lines.

Geometry topics include parallel and perpendicular lines, circles, triangles, including isosceles, equilateral, and 30? - 60? - 90? triangles, quadrilaterals, other polygons, congruent and similar figures, three dimensional figures, area, perimeter, volume, the Pythagorean theorem, and angle measurement in degrees. The ability to construct proofs is not tested. Data analysis topics include basic descriptive statistics, such as mean, median, mode, range, standard deviation, interquartile range, quartiles, and percentiles; interpretation of data in tables and graphs, such as line graphs, bar graphs, circle graphs, boxplots, scatterplots, and frequency distributions; elementary probability, such as probabilities of compound events and independent events; random variables and probability distributions, including normal distributions; and counting methods, such as combinations, permutations, and Venn diagrams. These topics are typically taught in high school algebra courses or introductory statistics courses. Inferential statistics is not tested.

The content in these areas includes high school mathematics and statistics at a level that is generally no higher than a second course in algebra; it does not include trigonometry, calculus, or other higher level mathematics. The publication Math Review for the GRE revised General Test, provides detailed information about the content of the Quantitative Reasoning measure.

The mathematical symbols, terminology, and conventions used in the Quantitative Reasoning section are those that are standard at the high school level. For example, the positive direction of a number line is to the right, distances are nonnegative, and prime numbers are greater than 1. Whenever nonstandard notation is used in a question, it is explicitly introduced in the question.

In addition to conventions, there are some assumptions about numbers and geometric figures that are used in the Quantitative Reasoning measure. Two of these assumptions are: 1. all numbers used are real numbers, and

2. geometric figures are not necessarily drawn to scale.

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More about conventions and assumptions appears in the publication Mathematical Conventions for the Quantitative Reasoning Measure GRE revised General Test.

Quantitative Reasoning Question Types

The Quantitative Reasoning section has four types of questions:

1 Quantitative Comparison

2 Multiple choiceSelect One

3 Multiple choiceSelect One or More

4 Numeric Entry

Each question appears either independently as a discrete question or as part of a set of questions called a Data Interpretation set. All of the questions in a Data Interpretation set are based on the same data presented in tables, graphs, or other displays of data. You are allowed to use a basic calculator on the Quantitative Reasoning measure of the test. In the standard computer based version of the test, a basic calculator is provided on-screen. In other editions of the test, a handheld basic calculator is provided. No other calculator may be used except as an approved accommodation. General information about using a calculator and specific information on using the handheld basic calculator are in the Using the

Calculator section of this document. Information about using the on screen calculator in the standard computer based version of the test appears in Appendix B of this document.

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Quantitative Comparison Questions

Description

Questions of this type ask you to compare two quantities, Quantity A and Quantity B, and then determine which of the following statements describes the comparison. A. Quantity A is greater.

B. Quantity B is greater.

C. The two quantities are equal.

D. The relationship cannot be determined from the information given.

1. Become familiar with the answer choices. Quantitative Comparison questions

always have the same answer choices, so get to know them, especially the last answer choice, “The relationship cannot be determined from the information given”. Never select this last

choice if it is clear that the values of the two quantities can be determined by computation. Also, if you determine that one quantity is greater than the other, make sure you carefully select the corresponding answer choice so as not to reverse the first two answer choices. 2. Avoid unnecessary computations. Don’t waste time performing needless

computations in order to compare the two quantities. Simplify, transform, or estimate one or both of the given quantities only as much as is necessary to compare them. 3. Remember that geometric figures are not necessarily drawn to scale. If any aspect

of a given geometric figure is not fully determined, try to redraw the figure, keeping those aspects that are completely determined by the given information fixed, but changing the aspects of the figure that are not determined. Examine the results. What variations are possible in the relative lengths of line segments or measures of angles?

4. Plug in numbers. If one or both of the quantities are algebraic expressions, you can substitute easy numbers for the variables and compare the resulting quantities in your analysis. Consider all kinds of appropriate numbers before you give an answer: for example, zero, positive and negative numbers, small and large numbers, fractions and decimals. If you see 69722438.doc Page 5 of 50

that Quantity A is greater than Quantity B in one case and Quantity B is greater than Quantity A in another case, choose “The relationship cannot be determined from the information given”.

5. Simplify the comparison. If both quantities are algebraic or arithmetic expressions

and you cannot easily see a relationship between them, you can try to simplify the comparison. Try a step by step simplification that is similar to the steps involved when you solve the equation 5 = 4x + 3 for x, or that is similar to the steps involved when you determine that the inequality

the fraction with numerator 3y +2 and denominator 5 is less than y

is equivalent to the simpler inequality 1 is less than y. Begin by setting up a

comparison involving the two quantities, as follows:

Quantity A, followed by a question mark symbol, followed by Quantity B

where the question mark symbol is a “placeholder” that could represent the relationship

greater than, the relationship less than, or the relationship equal to, or could

represent the fact that the relationship cannot be determined from the information given. Then try to simplify the comparison, step by step, until you can determine a relationship between simplified quantities. For example, you may conclude after the last step that the question

mark symbol represents equal to. Based on this conclusion, you may be able to compare

Quantities A and B. To understand this strategy more fully, see sample questions 6 to 9. Sample Questions

Directions:

Compare Quantity A and Quantity B, using the additional information given, if any. Select one of the following four answer choices.

A. Quantity A is greater.

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B. Quantity B is greater.

C. The two quantities are equal.

D. The relationship cannot be determined from the information given.

A symbol that appears more than once in a question has the same meaning throughout the

question.

Sample Question 1.

Quantity A: 2 times 6

Quantity B: 2 + 6

A. Quantity A is greater.

B. Quantity B is greater.

C. The two quantities are equal.

D. The relationship cannot be determined from the information given.

Explanation

Since 2 times 6, or 12, is greater than 2 + 6, or 8, Quantity A is greater than Quantity

B. Thus, the correct answer is choice A, Quantity A is greater.

Sample Question 2.

Lionel is younger than Maria.

Quantity A: Twice Lionel’s age

Quantity B: Maria’s age

A. Quantity A is greater.

B. Quantity B is greater.

C. The two quantities are equal.

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D. The relationship cannot be determined from the information given. Explanation

If Lionel’s age is 6 years and Maria’s age is 10 years, then Quantity A is greater, but if

Lionel’s age is 4 years and Maria’s age is 10 years, then Quantity B is greater. Thus, the

relationship cannot be determined. The correct answer is choice D, the relationship cannot be determined from the information given.

Sample Question 3.

Quantity A: 54% of 360

Quantity B: 150

A. Quantity A is greater.

B. Quantity B is greater.

C. The two quantities are equal.

D. The relationship cannot be determined from the information given. Explanation

This question asks you to compare Quantity A: 54% of 360, and Quantity B: 150. Without doing the exact computation, you can see that 54 percent of 360 is greater than

one half of 360, which is 180, and 180 is greater than Quantity B, 150. Thus, the

correct answer is choice A, Quantity A is greater.

Sample Question 4.

Refer to figure 1.

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.

Figure 1

Begin skippable figure description. The figure shows triangle PQR, where P is the leftmost vertex of the horizontal side PR and vertex Q is above PR. Point S lies on horizontal side PR. Point S appears to be the midpoint of PR. Line segment QS is drawn from vertex Q to point S. The lengths of PS and SR appear to be equal.

It is given that the length of PQ is equal to the length of PR.

End skippable figure description.

Quantity A: The length of PS

Quantity B: The length of SR

A. Quantity A is greater.

B. Quantity B is greater.

C. The two quantities are equal.

D. The relationship cannot be determined from the information given.

Explanation

This question asks you to compare Quantity A: the length of PS, and Quantity B: the length of SR.

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From Figure 1, you know that PQR is a triangle and that point S is between points P and R, so

the length of PS is less than the length of PR and the length of SR is less than the length of PR.

You are also given that the length of PQ is equal to the length of PR. However, this information is not sufficient to compare the length of PS and the length of SR. Furthermore, because the figure is not necessarily drawn to scale, you cannot determine the relative lengths

of PS and SR from the figure, though the lengths may appear to be equal. The position of S

can vary along side PR anywhere between P and R. Below are two possible variations of Figure 1, each of which is drawn to be consistent with the information that the length of PQ is

equal to the length of PR.

Refer to figure 2 and figure 3.

Figure 2

Figure 3

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