Set Cartesian_Product 0.7 Is an operand of Cartesian_Product Product 0.9 Is a type of Product Operation 1.0 Is an Set Ordered 1.0 Can be Ordered Unordered 1.0 Is opposite to Unordered Ordered 1.0 Is opposite to Set Unordered 1.0 Can be Set Element 1.0 Contain many Element Set 1.0 Is the smallest unit of Sets Relation 0.6 Can describe Relation Function 1.0 Is another word for Function Mapping 1.0 Is another word for Mapping Relation 1.0 Is another word for Relation Function 1.0 Is another word for Function Onto 0.7 Can be Onto Function 0.7 Describes a property of Function One_To_One 0.7 Can be One_To_One Function 0.7 Describes a property of Injective One_To_One 1.0 Is another word for One_To_One Injective 1.0 Is another word for Onto Bijective 0.5 Is half of requirements for Onto Surjective 1.0 Is another word for Surjective Onto 1.0 Is another word for One_To_One Bijective 0.5 Is half of requirements for Bijective Function 1.0 Is a type of Bijective Onto 0.5 Requires Bijective One_To_One 0.5 Requires Function Quantifier 0.6 Can be bounded by Quantifier Predicates 0.9 Can describe Quantifier For_All 1.0 Includes For_All Quantifier 1.0 Is a For_All all() 1.0 Is the same as Python Quantifier For_Each 1.0 Includes For_Each Quantifier 1.0 Is a For_Each any() 1.0 Is the same as Python Quantifier DeMorgan_Laws 0.6 Is negated by DeMorgan DeMorgan_Laws 1.0 Created DeMorgan_Laws Logic_Gate 1.0 Describe negation of DeMorgan_Laws Quantifier 1.0 Describe negation of Relation Binary 0.4 Can be Binary Function 0.8 Has 2 inputs for Binary Number_System 0.9 Is a base 2 Binary Tree 0.9 Can be a Relation And 1.0 Can be And Logic_Gate 1.0 Is a Logic_Gate Truth_Table 1.0 Determines output in Truth_Table Boolean 1.0 Is represented in computer by a Boolean Binary 1.0 Is represented by Relation Or 0.7 Can be Relation Xor 0.7 Can be Relation Not 0.7 Can be Relation Symmetric 1.0 Can be Symmetric Undirected 1.0 Describes graph type Relation Transitive 1.0 Can be Relation Reflexive 1.0 Can be Relation Equivalence 1.0 Can be type Equivalence Binary 0.6 Requires type Equivalence Modular_Arithmetic 0.8 Describes Modular_Arithmetic Chinese_Remainder_Theorem 1.0 Soves linear systems by Modular_Arithmetic Modulus 1.0 Is described by Equivalence Congruence 0.8 Congruence Equivalence 0.8 Modulus Modular_Arithmetic 1.0 Describes Sets Element 0.8 Is a combination of Element Combination 0.6 Can be rearranged by Combination Element 0.6 Rearrange Combination Combinatorics_Probability 1.0 Is studied in Element Permutation 0.6 Are rearranged by Permutation Element 0.6 Rearrange Permutation Combinatorics_Probability 1.0 Is Studied in Permutation Factorial 0.8 Is calculated by Combination Factorial 0.8 Is calculated by Factorial Product 1.0 Is a Permutation Seating 1.0 Can be represented by Combination N_Choose_K 1.0 Is represented by Set Subsets 1.0 Contain Set Intersection 1.0 Is an operand for Set Union 1.0 Is an operand for Intersection Operation 1.0 Is an Union Operation 1.0 Is an Complex_Numbers Real_Numbers 1.0 Has subset of Real_Numbers Complex_Numbers 1.0 Is a subset of Real_Numbers Countable 0.6 Are not Countable Cardinality 1.0 Has the same _ as N Natural_Numbers Real_Numbers 1.0 Is a subset of Real_Numbers Natural_Numbers 1.0 Contains Natural_Numbers Integers 1.0 Is a subset of Integers Real_Numbers 1.0 Is a subset of Integers Number_Theory 1.0 Studies Real_Numbers Real_Analysis 1.0 Is the study of Supremum Real_Analysis 1.0 Is the greatest upper bound Infimum Real_Analysis 1.0 Is the lowest lower bound Complex_Numbers e^(i*pi) 0.7 Describe the relation e^(i*pi) Eulers_Formula 1.0 Can be proved by Eulers_Formula Euler 1.0 Was created by Complex_Numbers Eigenvalues 1.0 Can be Number_Theory Primes 1.0 Conjectures about Primes log(n) 0.6 Below n is a ratio of Number_Theory Alternate_Base_Repr 0.8 Deals with Alternate_Base_Repr Binary 1.0 Can be Binary Alternate_Base_Repr 1.0 Is a Number_Theory Coprime 1.0 Two number can be Coprime GCD 1.0 The GCD is 1 GCD Euclidean_GCD 1.0 Can be calculated by Euclidean_GCD GCD 1.0 Calculates Euclidean_GCD Modulus 1.0 Is calculated by Number_Theory RSA 1.0 Describes RSA Public_Key_Encryption 1.0 Is a type of RSA Primes 1.0 Is a product of Number_Theory Residue_Number_Systems 1.0 Studies Residue_Number_Systems Modulus 1.0 Determined by Modulus MMI 1.0 Is inverted by Modulus Congruence_Relation 1.0 Is an example of a Real_Analysis Real_Numbers 1.0 Is the study of Real_Analysis Irrationality 1.0 Describes Real_Analysis Cardinaility 1.0 Defines Real_Analysis Set 1.0 Defines cardinality of Set Bijective_Function 1.0 Has same cardinality when _ exists Bijective_Function Bijective 1.0 Is Cardinality Countable 1.0 Defines Tree Graph 1.0 Is a more constrained version of Graph Complete 1.0 Can be Graph Wheel 1.0 Can be Graph Bipartite 1.0 Can be Bipartite Complete 1.0 Can be Graph Cube 1.0 Can be a Cube 2^n 1.0 Contains nodes Graph Nodes 1.0 Contain Nodes Vertices 1.0 Another word for Vertices Nodes 1.0 Another word for Nodes Degree 1.0 Has property Degree Out_Degree 1.0 Can be type Degree In_Degree 1.0 Can be type Graph Undirected 1.0 Can be Undirected Symmetric 1.0 Describes relation that is Graph Directed 1.0 Can be Graph Paths 1.0 Are explored by Paths DFS 1.0 Can be generated by Paths BFS 1.0 Can be generated by BFS Stack 1.0 Uses Stack Push 1.0 Has operation Stack Pop 1.0 Has operation Graph Cycles 1.0 Can contain Graph Psuedo 1.0 Can be type Psuedo Loops 1.0 Can contain Graph Planar 1.0 Can be Planar Intersection 1.0 Can be rewritten with no Graph Non-Planar 1.0 Can be Non-Planar Intersection 1.0 Cannot be rewritten without Graph Multigraph 1.0 Can be type Multigraph Edge 1.0 Has multiple Graph Digraph 1.0 Can be type Digraph Binary 1.0 Can be represented with relation of type Graph Adjacency_Matrix 1.0 Can be represented by Graph Incidence_Matrix 1.0 Can be represented by Graph Subgraphs 1.0 Can have Subgraph Subset 1.0 Is a _ of the original graph Graph Intersection 1.0 Can be operand of Graph Union 1.0 Can be operand Graph Complement 1.0 Has property Complement Complete 1.0 Contains non-present nodes in Tree Rooted 1.0 Can be Tree Branches 1.0 Contain Branches Paths 1.0 Are explored by Branches Leaves 1.0 Can extend to Branches Arc 1.0 Is also known as Branches Edge 1.0 Is also known as Tree Perfect 1.0 Can be Perfect 2^n 1.0 Has _ leaves Tree Balanced 1.0 Can be Tree Recursion 1.0 Can be explored by Recursion log(n) 1.0 Generally bounded by Tree AVL 1.0 Can be Tree Parsing 1.0 Can describe Parsing Language 1.0 Is a problem of Parsing Finite_Automata 1.0 Determined by Finite_Automata Nondeterministic_FA 1.0 Are constrained types of Finite_Automata State_Machine 1.0 Is a type of State_Machine Accepting 1.0 Has state Accepting Boolean 1.0 Is a State_Machine Rejecting 1.0 Has state Rejectinve Boolean 1.0 Is a Parsing Grammar 1.0 string is accepted by Grammar Production 1.0 Is defined by many Production Nonterminal 1.0 Contains Production Terminal 1.0 Contains Production Regular_Expression 1.0 Can be identified with Regular_Expression Union 1.0 Is operand of Regular_Expression Concatenation 1.0 Is operand of Regular_Expression Star 1.0 Is operand of Tree Permutation_Tree 1.0 Produces Permuation_Tree Permutations 1.0 Explores all Tree Binary 1.0 Can be Tree Huffman_Tree 1.0 Can be a Huffman_Tree Compression 1.0 Explores Huffman_Tree Compression_Ratio 1.0 Has Compression_Ratio Encoding 1.0 Determined by a fixed length Huffman_Tree Balanced 1.0 Is better when not Huffman_Tree Bottom_Up 1.0 Is built with Tree Full 1.0 Can be Tree Complete 1.0 Can be Set Graph 1.0 Can describe the edges in a Chinese_Remainder_Theorem Modular_Arithmetic 1.0 Uses Incidence_Matrix Matrix 1.0 Is a Bottom_Up Parsing 1.0 Is algorithm for Full Tree 1.0 Describes a Matrix Eigenvalues 1.0 If square contains Combinatorics_Probability Combination 1.0 Studies Combinatorics_Probability Permutation 1.0 Studies Primes Coprime 1.0 Are always Sets Set 1.0 Is the plural form all() Function 1.0 Is a any() Function 1.0 Is a Seating Permutation 1.0 Is a problem good for Permutations Permutation 1.0 Is the plural form of Permutation Permutations 1.0 Is singular Permutations Permuation_Tree 1.0 Are explored by Permuation_Tree Tree 1.0 Is a type of Permutation_Tree Permuation_Tree 1.0 Is a duplicate of Nonterminal Production 1.0 Is part of a Language Alphabet 1.0 Contains a Alphabet Element 1.0 Is made up of Production Grammar 1.0 Defines a Arc Edge 1.0 Is synonymous to Edge Arc 1.0 Is synonymous to Edge Paths 1.0 Describes Paths Edge 1.0 Follow Directed Graph 1.0 Is a type of Eigenvalues Matrix 1.0 Are properties of a square log(n) Function 1.0 Is a Subset Subsets 1.0 Is singular of Subsets Subset 1.0 Is plural of Subsets Set 1.0 Are contained in Subset Set 1.0 Is a smaller part of Adjacency_Matrix Matrix 1.0 Is a Adjacency_Matrix Graph 1.0 Represents AVL Tree 1.0 Is a type of Subgraphs Graph 1.0 Are smaller parts of a Xor Logic_Gate 1.0 Is a Or Logic_Gate 1.0 Is a Pop Stack 1.0 Is an operation of Push Stack 1.0 Is an operation of Push Operation 1.0 Is an Pop Operation 1.0 Is an Nondeterministic_FA Finite_Automata 1.0 Is an ambiguous form of Balanced Tree 1.0 Describes Transitive Relation 1.0 Describes a Stars_And_Bars N_Multichoose_K 1.0 Are described by Stars_And_Bars Combinatorics_Probability 1.0 Are studied in N_Multichoose_K Stars_And_Bars 1.0 Describe Combinatorics_Probability N_Multichoose_K 1.0 Studies N_Choose_K Combination 1.0 Describe Alphabet Language 1.0 Describe elements in a Alphabet Terminal 1.0 Can be made of many Alphabet Nonterminal 1.0 Can be made of many Irrationality Real_Analysis 1.0 Is explored in Not Logic_Gate 1.0 Is a Alternate_Base_Repr Primes 1.0 Can be made of Natural_Numbers Primes 1.0 Are products of 2^n Function 1.0 Is an exponential Loops Python 1.0 Are in Python Language 1.0 Is a all() Python 1.0 Is in any() Python 1.0 Is in Complete Graph 1.0 Describes Node Subgraphs 1.0 Is the smallest Node Nodes 1.0 Is singular version of Nodes Node 1.0 Is plural of Out_Degree Nodes 1.0 Is property of In_Degree Nodes 1.0 Is property of Out_Degree Directed 1.0 Is not equal to in degree when In_Degree Directed 1.0 Is not equal to out degree when graph is Directed Edge 1.0 Describes property of Edge Directed 1.0 Can be Cardinaility Cardinality 1.0 Is a duplicate of Wheel Graph 1.0 Descibes Bipartite Graph 1.0 Describes Bipartite Onto 1.0 Describes a graph that is Cube Graph 1.0 Describes Cycles Graph 1.0 Can be found in Cycles DFS 1.0 Are found via DFS Paths 1.0 Explores Cycles Paths 1.0 Are types of Rooted Tree 1.0 Describes a type of Star Regular_Expression 1.0 Is an operation that forms Concatenation Regular_Expression 1.0 Is an operation that forms Concatenation Alphabet 1.0 Requires None Python 1.0 Is in Modulus Congruence 1.0 Is a type of And Python 1.0 Is in Function Python 1.0 Can be defined in Terminal Alphabet 1.0 Can be part of Function Codomain 1.0 Contain Range Python 1.0 Is in Function Range 1.0 Contain Domain Function 1.0 Describes a Codomain Function 1.0 Describes a Range Codomain 1.0 Is a subset of Codomain Range 1.0 Is a superset of Real_Numbers Codomain 1.0 Is the _ for real-valued functions Leaves Tree 1.0 Are the bottom of a Psuedo Graph 1.0 Is a type of Relation Graph 1.0 Describe the relations in MMI Modulus 1.0 Finds the identity of a _ operation Compression Encoding 1.0 Studies the best type of Compression Huffman_Tree 1.0 Is explored by Recursion Binary 1.0 Is used in binary search Recursion Tree 1.0 Is the best way to explore a