Definition
yes
No, because the reverse statement may not result in a true statement.(A) If x is an integer then x*x is rational.(B) if x*x is rational then x is an integer.(B) is utter nonsense. x can be any rational number of even a square root of a rational number, for example, sqrt(2/3), and x*x will be rational.
Deductive reasoning In mathematics, a proof is a deductive argument for a mathematical statement. Deductive reasoning, unlike inductive reasoning, is a valid form of proof. It is, in fact, the way in which geometric proofs are written.
Conditional
exponent
yes
a statement that clearly describes the problem to be solved
They had no written laws.
No, because the reverse statement may not result in a true statement.(A) If x is an integer then x*x is rational.(B) if x*x is rational then x is an integer.(B) is utter nonsense. x can be any rational number of even a square root of a rational number, for example, sqrt(2/3), and x*x will be rational.
How can the following definition be written correctly as a biconditional statement? An odd integer is an integer that is not divisible by two. (A+ answer) An integer is odd if and only if it is not divisible by two
Sonnet 29 was written about a young man. A statement that best describes it is depression caused by social ostracism and personal misfortune.
A. Kooros has written: 'Elements of mathematical economics' -- subject(s): Economics, Mathematical, Mathematical Economics
Deductive reasoning In mathematics, a proof is a deductive argument for a mathematical statement. Deductive reasoning, unlike inductive reasoning, is a valid form of proof. It is, in fact, the way in which geometric proofs are written.
An integer is odd if and only if it is not divisible by two.
It establishes the idea that a countrys law should be written down (apex)
R. Maude has written: 'Mathematical analysis' -- subject(s): Mathematical analysis
Angela Dunn has written: 'Mathematical bafflers' -- subject(s): Mathematical recreations