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CLEP General Math: Number Sense - Patterns - Algebraic Thinking

Instructions:

Answer 50 questions in 15 minutes.
If you are not ready to take this test, you can study here.
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. An algebraic 'sentence' containing an unknown quantity.
Pigeonhole Principle
Look Back
Polynomial
Greatest Common Factor (GCF)

2. Non-Euclidean geometries abide by some - but not all of Euclid's five postulates.
Distributive Property:
Non-Euclidian Geometry
˜
Polynomial

3. If a = b then
Non-Euclidian Geometry
a · c = b · c for c does not equal 0
evaluate the expression in the innermost pair of grouping symbols first.
Public Key Encryption

4. This means that for any two magnitudes - one should always be able to find a fundamental unit that fits some whole number of times into each of them (i.e. - a unit whose magnitude is a whole number factor of each of the original magnitudes)
The inverse of subtraction is addition
Irrational
Commensurability
Continuous Symmetry

5. 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.
4 + x = 12
Law of Large Numbers
Aleph-Null
Spherical Geometry

6. 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.'
Additive Identity:
variable
Countable
The Prime Number Theorem

7. A way to extrinsically measure the curvature of a surface by looking at a given point and finding the contour line with the greatest curvature and the contour line with the least curvature.
Comparison Property
The inverse of multiplication is division
Equation
Principal Curvatures

8. A(b + c) = a · b + a · c a(b - c) = a · b - a · c
Figurate Numbers
Distributive Property:
a
The Associative Property of Multiplication

9. The multitude concept presented numbers as collections of discrete units - rather like indivisible atoms.
Unique Factorization Theorem
Discrete
Multiplicative Identity:
1. The unit 2. Prime numbers 3. Composite numbers

10. If a whole number is not a prime number - then it is called a...
Variable
Composite Numbers
Modular Arithmetic
Euler Characteristic

11. If a and b are any whole numbers - then a
Commutative Property of Multiplication
evaluate the expression in the innermost pair of grouping symbols first.
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
Irrational

12. This important result says that every natural number greater than one can be expressed as a product of primes in exactly one way.
Commutative Property of Multiplication:
A number is divisible by 10
Fourier Analysis and Synthesis
Fundamental Theorem of Arithmetic

13. A point in three-dimensional space requires three numbers to fix its location.
a + c = b + c
Spaceland
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)
The Riemann Hypothesis

14. 1. Find the prime factorizations of each number.
Flat Land
Fourier Analysis and Synthesis
Standard Deviation
Greatest Common Factor (GCF)

15. This method can create a flat map from a curved surface while preserving all angles in any features present.
Stereographic Projection
Prime Deserts
Multiplying both Sides of an Equation by the Same Quantity
Least Common Multiple (LCM)

16. Determines the likelihood of events that are not independent of one another.
Conditional Probability
Order of Operations - PEMDAS 'Please Excuse My Dear Aunt Sally'
Hypersphere
a divided by b

17. The surface of a standard 'donut shape'.
Look Back
Flat Land
Torus
A prime number

18. A topological object that can be used to study the allowable states of a given system.
Configuration Space
The Multiplicative Identity Property
Rarefactior
Look Back

19. Of central importance in Ramsey Theory - and in combinatorics in general - is the 'pigeonhole principle -' also known as Dirichlet's box. This principle simply states that we cannot fit n+1 pigeons into n pigeonholes in such a way that only one pigeo
Pigeonhole Principle
Irrational
One equal sign per line
Principal Curvatures

20. The system that Euclid used in The Elements
Products and Factors
Axiomatic Systems
Set up a Variable Dictionary.
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

21. 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
Prime Number
Central Limit Theorem
Set up a Variable Dictionary.
Hamilton Cycle

22. The study of shape from an external perspective.
Group
repeated addition
Extrinsic View
Countable

23. A · b = b · a
The Same
Commutative Property of Multiplication:
Variable
Non-Orientability

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

25. 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.
Continuous Symmetry
Solution
Associate Property of Addition
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. In any ratio of two whole numbers - expressed as a fraction - we can interpret the first (top) number to be the 'counter -' or numerator
The inverse of subtraction is addition
Non-Euclidian Geometry
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
Denominator

27. A way to measure how far away a given individual result is from the average result.
Prime Deserts
Standard Deviation
Equivalent Equations
Look Back

28. Some favor repeatedly dividing by 2 until the result is no longer divisible by 2. Then try repeatedly dividing by the next prime until the result is no longer divisible by that prime. The process terminates when the last resulting quotient is equal t
Factor Tree Alternate Approach
Primes
The Multiplicative Identity Property
counting numbers

29. Perform all additions and subtractions in the order presented
left to right
division
Noether's Theorem
Public Key Encryption

30. 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
Rarefactior
The inverse of subtraction is addition
˜
B - 125 = 1200

31. 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.
Flat Land
Bijection
Hypercube
counting numbers

32. 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.
The inverse of addition is subtraction
set
Commutative Property of Addition:
Law of Large Numbers

33. 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
Galton Board
The Multiplicative Identity Property
Rarefactior

34. Einstein's famous theory - relates gravity to the curvature of spacetime.
General Relativity
Denominator
Bijection
a divided by b

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

36. The expression a/b means
Spaceland
a divided by b
Properties of Equality
Order of Operations - PEMDAS 'Please Excuse My Dear Aunt Sally'

37. The distribution of averages of many trials is always normal - even if the distribution of each trial is not.
The Additive Identity Property
Intrinsic View
Central Limit Theorem
Pigeonhole Principle

38. 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.
Public Key Encryption
Problem of the Points
Additive Inverse:
Division is not Associative

39. Also known as gluing diagrams - are a convenient way to examine intrinsic topology.
Box Diagram
Euclid's Postulates
Solution
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.

40. W = {0 - 1 - 2 - 3 - 4 - 5 - . . .} is called
The Set of Whole Numbers
Fourier Analysis
A number is divisible by 3
Variable

41. The process of taking a complicated signal and breaking it into sine and cosine components.
Multiplicative Identity:
Multiplying both Sides of an Equation by the Same Quantity
Fourier Analysis
Continuous

42. All integers are thus divided into three classes:
Standard Deviation
Noether's Theorem
1. The unit 2. Prime numbers 3. Composite numbers
Unique Factorization Theorem

43. 4 more than a certain number is 12
4 + x = 12
Division is not Commutative
Commutative Property of Multiplication
Irrational

44. Because of the associate property of addition - when presented with a sum of three numbers - whether you start by adding the first two numbers or the last two numbers - the resulting sum is
The Same
Problem of the Points
Bijection
Ramsey Theory

45. A factor tree is a way to visualize a number's
Normal Distribution
Associative Property of Addition:
prime factors
A number is divisible by 5

46. In this type of geometry the angles of a triangle add up to less than 180 degrees. In such a system - one has to replace the parallel postulate with a version that admits many parallel lines.
Hyperbolic Geometry
Associate Property of Addition
Commutative Property of Addition:
each whole number can be uniquely decomposed into products of primes.

47. Originally known as analysis situs
Topology
Ramsey Theory
a
Fundamental Theorem of Arithmetic

48. 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.
Irrational
Central Limit Theorem
Unique Factorization Theorem
Distributive Property:

49. If the sum of its digits is divisible by 9 (ex: 3591 is divisible by 9 since 3 + 5 + 9 + 1 = 18 is divisible by 9).
Stereographic Projection
Irrational
Countable
A number is divisible by 9

50. Our standard notions of Pythagorean distance and angle via the inner product extend quite nicely from three-space.
Dividing both Sides of an Equation by the Same Quantity
In Euclidean four-space
set
Factor Tree Alternate Approach