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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. A · 1 = 1 · a = a
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.
Ramsey Theory
Multiplicative Identity:
Overtone

2. 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.
Overtone
Bijection
Dividing both Sides of an Equation by the Same Quantity
Variable

3. A '___________' infinite set is one that can be put into one-to-one correspondence with the set of natural numbers.
Wave Equation
1. The unit 2. Prime numbers 3. Composite numbers
Countable
Poincare Disk

4. 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
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
Countable
Hyperbolic Geometry
Look Back

5. Rules for Rounding - To round a number to a particular place - follow these steps:
A number is divisible by 3
Fourier Analysis and Synthesis
Factor Tree Alternate Approach
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

6. When comparing two whole numbers a and b - only one of three possibilities is true: a < b or a = b or a > b.
Comparison Property
Greatest Common Factor (GCF)
Noether's Theorem
the set of natural numbers

7. Solving Equations
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
does not change the solution set.
Set up an Equation
Irrational

8. 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
Line Land
Cayley's Theorem
Aleph-Null

9. Mathematical statement that equates two mathematical expressions.
Periodic Function
Fourier Analysis and Synthesis
Equation
Complete Graph

10. A sphere can be thought of as a stack of circular discs of increasing - then decreasing - radii. The process of slicing is one way to visualize higher-dimensional objects via level curves and surfaces. A hypersphere can be thought of as a 'stack' of
Hypersphere
Complete Graph
Continuous Symmetry
Extrinsic View

11. An important part of problem solving is identifying
Irrational
The Multiplicative Identity Property
Commutative Property of Addition:
variable

12. Let a - b - and c be any whole numbers. Then - a
Cayley's Theorem
Unique Factorization Theorem
Division is not Commutative
The Distributive Property (Subtraction)

13. Aka The Osculating Circle - a way to measure the curvature of a line.
Unique Factorization Theorem
Answer the Question
Flat Land
The Kissing Circle

14. If a whole number is not a prime number - then it is called a...
Composite Numbers
Hypersphere
division
Line Land

15. Reveals why we tend to find structure in seemingly random sets. Ramsey numbers indicate how big a set must be to guarantee the existence of certain minimal structures.
B - 125 = 1200
Set up an Equation
Sign Rules for Division
Ramsey Theory

16. N = {1 - 2 - 3 - 4 - 5 - . . .}.
Irrational
counting numbers
Prime Deserts
the set of natural numbers

17. 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.
The BML Traffic Model
Topology
Unique Factorization Theorem
Commutative Property of Multiplication:

18. 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
Normal Distribution
prime factors
Symmetry
Markov Chains

19. We can think of the space between primes as 'prime deserts -' strings of consecutive numbers - none of which are prime.
Prime Deserts
each whole number can be uniquely decomposed into products of primes.
Hyperland
Set up an Equation

20. The multitude concept presented numbers as collections of discrete units - rather like indivisible atoms.
Permutation
Equivalent Equations
Discrete
Additive Inverse:

21. If a and b are any whole numbers - then a
Intrinsic View
Commutative Property of Multiplication
Principal Curvatures
Prime Deserts

22. A topological object that can be used to study the allowable states of a given system.
Configuration Space
Prime Deserts
Divisible
Topology

23. A · b = b · a
Permutation
Variable
Euclid's Postulates
Commutative Property of Multiplication:

24. Collection of objects. list all the objects in the set and enclosing the list in curly braces.
Order of Operations - PEMDAS 'Please Excuse My Dear Aunt Sally'
Group
set
Spherical Geometry

25. 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.'
Prime Number
inline
The Prime Number Theorem
Standard Deviation

26. Is a path that visits every node in a graph and ends where it began.
Hamilton Cycle
The inverse of subtraction is addition
Fundamental Theorem of Arithmetic
The Multiplicative Identity Property

27. 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
Prime Deserts
Cayley's Theorem
Complete Graph

28. Some numbers make geometric shapes when arranged as a collection of dots - for example - 16 makes a square - and 10 makes a triangle.
Sign Rules for Division
Bijection
Look Back
Figurate Numbers

29. 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.
Composite Numbers
Expected Value
One equal sign per line
Unique Factorization Theorem

30. 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
Flat Land
Equivalent Equations
Poincare Disk

31. A number is divisible by 2
Unique Factorization Theorem
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
Central Limit Theorem
if it is an even number (the last digit is 0 - 2 - 4 - 6 or 8)

32. A way to analyze sequences of events where the outcomes of prior events affect the probability of outcomes of subsequent events.
Markov Chains
The Kissing Circle
Multiplicative Identity:
The inverse of multiplication is division

33. An algebraic 'sentence' containing an unknown quantity.
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
Polynomial
Poincare Disk
Multiplicative Identity:

34. (a · b) · c = a · (b · c)
Non-Euclidian Geometry
Primes
Associative Property of Multiplication:
Grouping Symbols

35. If on a surface there is no meaningful way to tell an object's orientation (left or right handedness) - the surface is said to be non-orientable.
Ramsey Theory
De Bruijn Sequence
Least Common Multiple (LCM)
Non-Orientability

36. If a represents any whole number - then a
Standard Deviation
Multiplication by Zero
Equation
Expected Value

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

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38. Is the length around an object. Used to calculate such things as fencing around a yard - trimming a piece of material - and the amount of baseboard needed for a room.It is not necessary to have a formula since it is always just calculated by adding t
perimeter
Hypersphere
variable
each whole number can be uniquely decomposed into products of primes.

39. A whole number (other than 1) is a _____________ if its only factors (divisors) are 1 and itself. Equivalently - a number is prime if and only if it has exactly two factors (divisors).
Prime Number
Euler Characteristic
The Same
a - c = b - c

40. Our standard notions of Pythagorean distance and angle via the inner product extend quite nicely from three-space.
In Euclidean four-space
Grouping Symbols
Topology
Exponents

41. In any ratio of two whole numbers - expressed as a fraction - we can interpret the first (top) number to be the 'counter -' or numerator
Rational
Denominator
Comparison Property
Division by Zero

42. 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
Sign Rules for Division
Continuous Symmetry
Prime Number

43. Perform all additions and subtractions in the order presented
left to right
Variable
Unique Factorization Theorem
Division by Zero

44. Arise from the attempt to measure all quantities with a common unit of measure.
Rational
The Same
Set up an Equation
Standard Deviation

45. In some ways - the opposite of a multitude is a magnitude - which is ___________. In other words - there are no well defined partitions.
The Associative Property of Multiplication
Topology
Continuous
Axiomatic Systems

46. Is a symbol (usually a letter) that stands for a value that may vary.
Rarefactior
a divided by b
Variable
Noether's Theorem

47. A(b + c) = a · b + a · c a(b - c) = a · b - a · c
De Bruijn Sequence
The Additive Identity Property
˜
Distributive Property:

48. 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.
Dividing both Sides of an Equation by the Same Quantity
Line Land
Fundamental Theorem of Arithmetic
Probability

49. Topological objects are categorized by their _______ (number of holes). The genus of a surface is a feature of its global topology.
Unique Factorization Theorem
evaluate the expression in the innermost pair of grouping symbols first.
Genus
Exponents

50. 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 Set of Whole Numbers
The Associative Property of Multiplication
1. Set up a Variable Dictionary. 3. Solve the Equation. 4. Answer the Question. 5. Look Back.
Fourier Analysis and Synthesis