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Use a Short Form Truth Table to Answer the Following

question 113

Multiple Choice

Use a short form truth table to answer the following question.Which, if any, set of truth values assigned to the atomic sentences shows that the following argument is invalid? ABBC[(AB) C][(AB) C]\begin{array} { l } \mathrm { A } \equiv \mathrm { B } \\\mathrm { B } \equiv \mathrm { C } \\{ [ ( \mathrm { A } \cdot \mathrm { B } ) \cdot \mathrm { C } ] \cup [ ( \sim \mathrm { A } \cdot \sim \mathrm { B } ) \cdot \sim \mathrm { C } ] }\end{array}

Definitions:

Solve

The process of finding the value(s) of variable(s) that satisfy an equation, inequality, or system of equations.

Inequality

A mathematical relation that shows how two values are not equal, using symbols such as <, >, ≤, or ≥.

Graph

A chart that displays the network of links or associations between two or more items through various unique symbols like dots, lines, and bars.

Ticket Sales

The process or activity of selling admission tickets to events or functions.

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