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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. Whether or not we hear waves as sound has everything to do with their _____________ - or how many times every second the molecules switch from compression to rarefaction and back to compression again - and their intensity - or how much the air is com
The Prime Number Theorem
Multiplying both Sides of an Equation by the Same Quantity
Frequency
Prime Deserts

2. To describe and extend a numerical pattern
Countable
Topology
counting numbers
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.

3. Negative
Primes
Sign Rules for Division
B - 125 = 1200
Spherical Geometry

4. A
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)
a + c = b + c
Division is not Commutative
Tone

5. In the expression 3
Products and Factors
General Relativity
The Associative Property of Multiplication
Markov Chains

6. W = {0 - 1 - 2 - 3 - 4 - 5 - . . .} is called
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
Exponents
The Set of Whole Numbers
Division by Zero

7. Mathematical statement that equates two mathematical expressions.
Associate Property of Addition
The Same
Equation
a - c = b - c

8. Does not change the solution set. That is - if a = b - then dividing both sides of the equation by c produces the equivalent equation a/c = b/c - provided c = 0.
The Distributive Property (Subtraction)
Dividing both Sides of an Equation by the Same Quantity
a - c = b - c
Cayley's Theorem

9. The identification of a 'one-to-one' correspondence--enables us to enumerate a set that may be difficult to count in terms of another set that is more easily counted.
The inverse of subtraction is addition
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.
The Associative Property of Multiplication
Bijection

10. A topological object that can be used to study the allowable states of a given system.
the set of natural numbers
each whole number can be uniquely decomposed into products of primes.
Spherical Geometry
Configuration Space

11. A group is just a collection of objects (i.e. - elements in a set) that obey a few rules when combined or composed by an operation. In order for a set to be considered a group under a certain operation - each element must have an inverse - the set mu
Normal Distribution
The Commutative Property of Addition
Group
a divided by b

12. A number is divisible by 2
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)
Wave Equation
The Distributive Property (Subtraction)
Modular Arithmetic

13. 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.
Multiplicative Identity:
Spaceland
Modular Arithmetic
Multiplying both Sides of an Equation by the Same Quantity

14. The multitude concept presented numbers as collections of discrete units - rather like indivisible atoms.
a divided by b
Division by Zero
Discrete
variable

15. Collection of objects. list all the objects in the set and enclosing the list in curly braces.
Irrational
A number is divisible by 9
set
Aleph-Null

16. Every whole number can be uniquely factored as a product of primes. This result guarantees that if the prime factors are ordered from smallest to largest - everyone will get the same result when breaking a number into a product of prime factors.
Line Land
Unique Factorization Theorem
Configuration Space
Spherical Geometry

17. A way to measure how far away a given individual result is from the average result.
Standard Deviation
Multiplication
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Hamilton Cycle

18. 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.
Hyperbolic Geometry
Continuous Symmetry
Denominator
Dimension

19. In this type of geometry the angles of a triangle add up to more than 180 degrees. In such a system - one has to replace the parallel postulate with a version that admits no parallel lines as well as modify Euclid's first two postulates.
Euclid's Postulates
Commensurability
Spherical Geometry
The Multiplicative Identity Property

20. 1. Find the prime factorizations of each number.
Unique Factorization Theorem
Greatest Common Factor (GCF)
Torus
Cardinality

21. Instruments produce notes that have a fundamental frequency in combination with multiples of that frequency known as partials or overtones
does not change the solution set.
Overtone
counting numbers
Additive Identity:

22. A + 0 = 0 + a = a
Fundamental Theorem of Arithmetic
division
Additive Identity:
does not change the solution set.

23. We can think of the space between primes as 'prime deserts -' strings of consecutive numbers - none of which are prime.
Answer the Question
Spherical Geometry
Frequency
Prime Deserts

24. This model is at the forefront of probability research. Mathematicians use it to model traffic patterns in an attempt to understand flow rates and gridlock - among other things.
Rational
1. The unit 2. Prime numbers 3. Composite numbers
The BML Traffic Model
left to right

25. Rules for Rounding - To round a number to a particular place - follow these steps:
Intrinsic View
One equal sign per line
4 + x = 12
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

26. Points in two-dimensional space require two numbers to specify them completely. The Cartesian plane is a good way to envision two-dimensional space.
Flat Land
Periodic Function
The Kissing Circle
Divisible

27. If we start with a number x and subtract a number a - then adding a to the result will return us to the original number x. In symbols - x - a + a = x. So -
Rational
Poincare Disk
4 + x = 12
The inverse of subtraction is addition

28. The expression a/b means
a divided by b
Denominator
prime factors
Modular Arithmetic

29. 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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30. A '___________' infinite set is one that can be put into one-to-one correspondence with the set of natural numbers.
Hyperbolic Geometry
Hypersphere
Countable
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)

31. Is a symbol (usually a letter) that stands for a value that may vary.
Additive Identity:
Frequency
Variable
The index (which becomes the exponent when translating) is the number of times you multiply the number by itself to get radicand.

32. 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
Set up a Variable Dictionary.
Non-Orientability
Set up an Equation
Products and Factors

33. The cardinality of sets that cannot be put into one-to-one correspondence with the counting numbers - such as the set of real numbers - is referred to as c. The designations A_0 and c are known as 'transfinite' cardinalities.
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.
Fundamental Theorem of Arithmetic
Transfinite
Non-Euclidian Geometry

34. If a = b then
Solve the Equation
Continuous
a + c = b + c
Divisible

35. 4 more than a certain number is 12
Extrinsic View
4 + x = 12
bar graph
prime factors

36. Says that when a random process - such as dropping marbles through a Galton board - is repeated many times - the frequencies of the observed outcomes get increasingly closer to the theoretical probabilities.
Commensurability
set
Law of Large Numbers
the set of natural numbers

37. An arrangement where order matters.
Permutation
Factor Tree Alternate Approach
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)
bar graph

38. This important result says that every natural number greater than one can be expressed as a product of primes in exactly one way.
Fundamental Theorem of Arithmetic
Multiplication
4 + x = 12
set

39. If a = b then
does not change the solution set.
Transfinite
a
Intrinsic View

40. Multiplication is equivalent to
repeated addition
Invarient
Least Common Multiple (LCM)
Fourier Analysis

41. The process of taking a complicated signal and breaking it into sine and cosine components.
Commutative Property of Multiplication
Hyperbolic Geometry
The Riemann Hypothesis
Fourier Analysis

42. When comparing two whole numbers a and b - only one of three possibilities is true: a < b or a = b or a > b.
˜
Answer the Question
Bijection
Comparison Property

43. Codifies the 'average behavior' of a random event and is a key concept in the application of probability.
B - 125 = 1200
Expected Value
repeated addition
Division is not Associative

44. A · 1/a = 1/a · a = 1
4 + x = 12
Multiplicative Inverse:
Ramsey Theory
perimeter

45. Index p radicand
Intrinsic View
Comparison Property
General Relativity
The index (which becomes the exponent when translating) is the number of times you multiply the number by itself to get radicand.

46. If a - b - and c are any whole numbers - then a
The Associative Property of Multiplication
1. Simplify the expression on either side of the equation. 2. Gather the variable term on the left-hand side (LHS) by adding to both sides. the opposite of the variable term on the right-hand side (RHS). Note: either side is fine but we will consiste
Properties of Equality
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47. Let a and b be whole numbers. Then a is _______________ by b if and only if the remainder is zero when a is divided by b. In this case - we say that 'b is a divisor of a.'
Divisible
Additive Identity:
Transfinite
The Commutative Property of Addition

48. This result relates conserved physical quantities - like conservation of energy - to continuous symmetries of spacetime.

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49. Our standard notions of Pythagorean distance and angle via the inner product extend quite nicely from three-space.
repeated addition
Pigeonhole Principle
In Euclidean four-space
Multiplying both Sides of an Equation by the Same Quantity

50. It is important to note that this step does not imply that you should simply check your solution in your equation. After all - it's possible that your equation incorrectly models the problem's situation - so you could have a valid solution to an inco
Look Back
does not change the solution set.
Products and Factors
Countable