A predicate is a term that describes a property or characteristic of a subject. In the sentence "Socrates is a philosopher", the predicate is "philosopher", which describes the property of being a philosopher that is attributed to the subject "Socrates".

The subject of a sentence is the term that is being described or discussed. In the sentence "All dogs are mammals", the subject is "dogs", which is the term that is being described as having the property of being mammals.

A propositional function is a statement that contains one or more variables, such that when the variables are replaced with specific values, the statement becomes a proposition. In the sentence "x is a philosopher", the propositional function is "x is a philosopher", which becomes a proposition when the variable "x" is replaced with a specific value, such as "Socrates".

The truth value of a sentence is determined by the truth values of its component parts. In the sentence "All dogs are cats", the subject "dogs" and the predicate "cats" are both terms that refer to different sets of animals. Therefore, the sentence is false.

Predicate logic is a formal language that can be used to represent and reason about the world. Natural language sentences can be expressed in predicate logic by translating them into a series of statements that use logical connectives and quantifiers. For example, the sentence "The sky is blue." can be expressed in predicate logic as "(\forall x) (Sky(x) (\rightarrow) Blue(x))", where "Sky(x)" means "x is a sky" and "Blue(x)" means "x is blue".

A proposition is a statement that is either true or false. A propositional function is a statement that contains one or more variables, such that when the variables are replaced with specific values, the statement becomes a proposition. For example, the statement "x is a philosopher" is a propositional function, because it contains the variable "x". When the variable "x" is replaced with a specific value, such as "Socrates", the statement becomes a proposition, such as "Socrates is a philosopher".

A quantifier is a term that indicates the quantity or scope of the variables in a statement. Common quantifiers include "all", "some", and "no". For example, the statement "All dogs are mammals" uses the quantifier "all" to indicate that the statement applies to all members of the set of dogs.

A singular proposition is a statement that is about a specific individual. For example, the statement "Socrates is a philosopher" is a singular proposition, because it is about the specific individual Socrates. A general proposition is a statement that is about a class of individuals. For example, the statement "All dogs are mammals" is a general proposition, because it is about the class of all dogs.

A deductively valid argument is an argument in which the conclusion follows logically from the premises. In the argument "All dogs are mammals. All mammals are animals. Therefore, all dogs are animals", the conclusion follows logically from the premises, because if all dogs are mammals and all mammals are animals, then it must be the case that all dogs are animals.

A necessary condition is a condition that must be met in order for something to happen. For example, being a mammal is a necessary condition for being a dog. A sufficient condition is a condition that is enough to make something happen. For example, being a mammal and having fur are sufficient conditions for being a dog.

A modal proposition is a proposition that is about the possibility, necessity, or contingency of something. In the proposition "It is possible that it will rain tomorrow", the modal operator "possible" is used to indicate that it is possible that it will rain tomorrow.

A categorical proposition is a statement that is about a class of individuals. For example, the statement "All dogs are mammals" is a categorical proposition, because it is about the class of all dogs. A hypothetical proposition is a statement that is about a relationship between two or more propositions. For example, the statement "If it is raining, then the ground is wet" is a hypothetical proposition, because it is about the relationship between the proposition "it is raining" and the proposition "the ground is wet".

A disjunctive proposition is a proposition that is formed by combining two or more propositions with the logical connective "or". In the proposition "Either it will rain tomorrow or it will snow tomorrow", the logical connective "or" is used to combine the two propositions "it will rain tomorrow" and "it will snow tomorrow".

A conjunctive proposition is a statement that is formed by combining two or more propositions with the logical connective "and". For example, the statement "It is raining and it is cold" is a conjunctive proposition, because it is formed by combining the two propositions "it is raining" and "it is cold" with the logical connective "and". A disjunctive proposition is a statement that is formed by combining two or more propositions with the logical connective "or". For example, the statement "Either it will rain tomorrow or it will snow tomorrow" is a disjunctive proposition, because it is formed by combining the two propositions "it will rain tomorrow" and "it will snow tomorrow" with the logical connective "or".