Tautologies are always true.
Without seeing the following two statements, one could not say if the two statements mean the same thing. Quantifier sequences are used to specify repetitions of characters in patterns.
A tautology is a needless repetition, such as widow woman, useless politician, or venomous viper.
Statements in which the two sides are not equal are called inequalities.
It consists of two false statements.
No.
protists all share a common set of synapomorphies
Tautologies, such as tiny little
would need to see the two statements; not shown in question.
The two subfields of economics are positive statements and normative statements.
Tautologies are always true.
Consistent equations are two or more equations that have the same solution.
A two-column geometric proof consists of a list of statements, and the reasons that we know those statements are true. The statements are listed in a column on the left, and the reasons for which the statements can be made are listed in the right column.
No. Not if it is a true statement. Identities and tautologies cannot have a counterexample.
You have to include the two statements ...
A false statement. or A statement not consistent with arithmetic. or A statement written by someone with no idea about basic mathematics. How's that for starters?
I see that you have not provided specific statements for me to evaluate. Please share the statements you are referring to so I can determine which one aligns with the information from the Bureau of Justice Statistics.