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CLEP General Math: Number Sense - Patterns - Algebraic Thinking

Instructions:

Answer 50 questions in 15 minutes.
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Match each statement with the correct term.
Don't refresh. All questions and answers are randomly picked and ordered every time you load a test.

This is a study tool. The 3 wrong answers for each question are randomly chosen from answers to other questions. So, you might find at times the answers obvious, but you will see it re-enforces your understanding as you take the test each time.

1. Assuming that the air is of uniform density and pressure to begin with - a region of high pressure will be balanced by a region of low pressure - called rarefaction - immediately following the compression
Multiplicative Identity:
Group
per line
Rarefactior

2. (a
Box Diagram
Division is not Associative
Aleph-Null
Cayley's Theorem

3. Topological objects are categorized by their _______ (number of holes). The genus of a surface is a feature of its global topology.
Wave Equation
The Additive Identity Property
Continuous Symmetry
Genus

4. At each level of the tree - break the current number into a product of two factors. The process is complete when all of the 'circled leaves' at the bottom of the tree are prime numbers. Arranging the factors in the 'circled leaves' in order. The fina
Factor Trees
Flat Land
Look Back
Stereographic Projection

5. We can think of the space between primes as 'prime deserts -' strings of consecutive numbers - none of which are prime.
Modular Arithmetic
Hypercube
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Prime Deserts

6. Rules for Rounding - To round a number to a particular place - follow these steps:
1. Mark the place you wish to round to. This is called the rounding digit . 2. Check the next digit to the right of your digit marked in step 1. This is called the test digit . If the test digit is greater than or equal to 5 - add 1 to the rounding d
Factor Trees
1. The unit 2. Prime numbers 3. Composite numbers
Axiomatic Systems

7. GThe mathematical study of space. The geometry of a space goes hand in hand with how one defines the shortest distance between two points in that space.
Genus
Intrinsic View
Geometry
Solution

8. Add and subtract
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A number is divisible by 9
Fourier Analysis
Tone

9. 1. Any two points can be joined by a straight line. 2. Any straight line segment can be extended indefinitely in a straight line. 3. Given any straight line segment - a circle can be drawn having the segment as radius and one endpoint as center. 4. A

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10. Arise from the attempt to measure all quantities with a common unit of measure.
Sign Rules for Division
Division by Zero
Rational
Greatest Common Factor (GCF)

11. If a = b then
The inverse of subtraction is addition
Continuous
a + c = b + c
Law of Large Numbers

12. Has no factors other than 1 and itself
A prime number
The Kissing Circle
Distributive Property:
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13. In the expression 3
Dividing both Sides of an Equation by the Same Quantity
The Additive Identity Property
Products and Factors
The Prime Number Theorem

14. Perform all additions and subtractions in the order presented
Polynomial
Euler Characteristic
left to right
Additive Identity:

15. Is a symbol (usually a letter) that stands for a value that may vary.
prime factors
Variable
Factor Tree Alternate Approach
a · c = b · c for c does not equal 0

16. An equation is a numerical value that satisfies the equation. That is - when the variable in the equation is replaced by the solution - a true statement results.
Sign Rules for Division
Solution
Fundamental Theorem of Arithmetic
Euler Characteristic

17. Multiplication is equivalent to
Denominator
repeated addition
Conditional Probability
Equation

18. Our standard notions of Pythagorean distance and angle via the inner product extend quite nicely from three-space.
each whole number can be uniquely decomposed into products of primes.
Variable
Products and Factors
In Euclidean four-space

19. A point in three-dimensional space requires three numbers to fix its location.
A number is divisible by 3
1. The unit 2. Prime numbers 3. Composite numbers
Spaceland
The Distributive Property (Subtraction)

20. If a - b - and c are any whole numbers - then a
a
Irrational
The Associative Property of Multiplication
Primes

21. Trigonometric functions - such as sine and cosine - are useful for modeling sound waves - because they oscillate between values
Geometry
A number is divisible by 9
Periodic Function
Set up an Equation

22. This famous - as yet unproven - result relates to the distribution of prime numbers on the number line.
The Riemann Hypothesis
Hyperbolic Geometry
Pigeonhole Principle
Commutative Property of Multiplication:

23. Cannot be written as a ratio of natural numbers.
Hamilton Cycle
Irrational
A number is divisible by 5
Prime Deserts

24. Breaks a complicated signal into a combination of simple sine waves. Fourier synthesis does the opposite - constructing a complicated signal from simple sine waves.
The Associative Property of Multiplication
Fourier Analysis and Synthesis
Irrational
Associate Property of Addition

25. You must let your readers know what each variable in your problem represents. This can be accomplished in a number of ways: Statements such as 'Let P represent the perimeter of the rectangle.' - Labeling unknown values with variables in a table - Lab
Irrational
Stereographic Projection
Set up a Variable Dictionary.
Cardinality

26. The four-dimensional analog of the cube - square - and line segment. A hypercube is formed by taking a 3-D cube - pushing a copy of it into the fourth dimension - and connecting it with cubes. Envisioning this object in lower dimensions requires that
Hypercube
Commutative Property of Addition:
The Multiplicative Identity Property
Permutation

27. In a mathematical sense - it is a transformation that leaves an object invariant. Symmetry is perhaps most familiar as an artistic or aesthetic concept. Designs are said to be symmetric if they exhibit specific kinds of balance - repetition - and/or
Irrational
The inverse of subtraction is addition
Axiomatic Systems
Symmetry

28. The multitude concept presented numbers as collections of discrete units - rather like indivisible atoms.
Discrete
1. Find a relationship between the first and second numbers. 2. Then we see if the relationship is true for the second and third numbers - the third and fourth - and so on.
Polynomial
Commutative Property of Multiplication

29. An object possessing continuous symmetries can remain invariant while one symmetry is turned into another. A circle is an example of an object with continuous symmetries.
Associative Property of Multiplication:
Continuous Symmetry
A number is divisible by 9
The Additive Identity Property

30. Non-Euclidean geometries abide by some - but not all of Euclid's five postulates.
Law of Large Numbers
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)
Non-Euclidian Geometry
perimeter

31. The expression a/b means
The Additive Identity Property
a divided by b
Division by Zero
Permutation

32. The answer to the question of why the primes occur where they do on the number line has eluded mathematicians for centuries. Gauss's Prime Number Theorem is perhaps one of the most famous attempts to find the 'pattern behind the primes.'
The Prime Number Theorem
The Associative Property of Multiplication
The Set of Whole Numbers
Additive Identity:

33. A flat map of hyperbolic space.
left to right
Wave Equation
Poincare Disk
Configuration Space

34. Cantor called the cardinality of all the sets that can be put into one-to-one correspondence with the counting numbers - or 'Aleph Null.'
Public Key Encryption
Aleph-Null
Line Land
Expected Value

35. Writing Mathematical equations - arrange your work one equation
per line
Commensurability
Grouping Symbols
The Multiplicative Identity Property

36. If a = b then
Symmetry
Answer the Question
a · c = b · c for c does not equal 0
Permutation

37. Codifies the 'average behavior' of a random event and is a key concept in the application of probability.
Expected Value
The inverse of multiplication is division
Euler Characteristic
Commutative Property of Multiplication

38. 1. Parentheses (or any grouping symbol {braces} - [square brackets] - |absolute value|)

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39. If a and b are any whole numbers - then a
Modular Arithmetic
Least Common Multiple (LCM)
Standard Deviation
Commutative Property of Multiplication

40. When comparing two whole numbers a and b - only one of three possibilities is true: a < b or a = b or a > b.
Geometry
Hyperland
The Commutative Property of Addition
Comparison Property

41. If its final digit is a 0.
A number is divisible by 10
Grouping Symbols
Box Diagram
division

42. Public key encryption allows two parties to communicate securely over an un-secured computer network using the properties of prime numbers and modular arithmetic. RSA is the modern standard for public key encryption.
Configuration Space
Public Key Encryption
Hamilton Cycle
a divided by b

43. Is a path that visits every node in a graph and ends where it began.
repeated addition
De Bruijn Sequence
Hamilton Cycle
Ramsey Theory

44. Objects are topologically equivalent if they can be continuously deformed into one another. Properties that are preserved during this process are called topological invariants.
A number is divisible by 9
Irrational
variable
division

45. Let a and b represent two whole numbers. Then - a + b = b + a.
Divisible
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)
set
The Commutative Property of Addition

46. This result says that the symmetries of geometric objects can be expressed as groups of permutations.

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47. A + b = b + a
Commutative Property of Addition:
Associative Property of Multiplication:
Divisible
Public Key Encryption

48. A · 1 = 1 · a = a
the set of natural numbers
Prime Deserts
Multiplicative Identity:
Additive Inverse:

49. A · 1/a = 1/a · a = 1
Variable
Multiplicative Inverse:
Flat Land
Stereographic Projection

50. Also known as 'clock math -' incorporates 'wrap around' effects by having some number other than zero play the role of zero in addition - subtraction - multiplication - and division.
Periodic Function
Answer the Question
Variable
Modular Arithmetic