For the following compound statement, first identify the connective word and then break it into component statements.
Square of an integer is positive or negative.

To solve the problem, we need to identify the connective word in the compound statement and then break it down into its component statements. ### Step-by-Step Solution: 1. **Identify the Compound Statement:** The given compound statement is: "Square of an integer is positive or negative." 2. **Identify the Connective Word:** In the statement, the word "or" serves as the connective word that links the two component statements. 3. **Break Down into Component Statements:** We can denote the component statements as follows: - Let statement \( p \): "Square of an integer is positive." - Let statement \( q \): "Square of an integer is negative." 4. **Summarize the Findings:** - The connective word is "or." - The component statements are: - \( p \): "Square of an integer is positive." - \( q \): "Square of an integer is negative." ### Final Answer: - Connective word: **or** - Component statements: - \( p \): "Square of an integer is positive." - \( q \): "Square of an integer is negative."