A false statement, also known as a falsehood, falsity, misstatement or untruth, is a statement that is false or does not align with reality. This concept spans various fields, including communication, law, linguistics, and philosophy. It is considered a fundamental issue in human discourse. The intentional dissemination of misstatements (disinformation) is commonly termed as deception or lying, while unintentional inaccuracies may arise from misconceptions, misinformation, or mistakes.
Although the word fallacy is sometimes used as a synonym for false statement, that is not how the word is used in most formal contexts.
Understanding the motivations behind misstatements is complex. Individuals may lie to protect themselves, gain an advantage, manipulate perceptions, or evade accountability. Psychological factors, societal pressures, and cognitive biases can contribute to the inclination to make misstatements. Cognitive dissonance may also play a role when individuals resist acknowledging the falsity of their statements.
The ethics surrounding misstatements are multifaceted. Honest communication is often considered a fundamental value, but ethical dilemmas may arise in situations where the truth conflicts with other moral principles or when individuals face personal or professional consequences for honesty.
This is a mathematical falsehood. A lot of people have tried to prove it, like this here:
1 ÷ 2 = 0.5
1 ÷ 35 = 0.02857142857
You can see that the answer gets smaller and smaller as the dividend gets bigger and bigger so if 1 ÷ n = x then as n approaches infinity x approaches zero, so 1 ÷ ∞ = 0.000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000...1
Where ... is replaced with infinite zeroes.
This value is basically 0. You could say 1 ÷ ∞ ≈ 0 (with the approximately equal sign)
This means that 1 ÷ 0 ≈ ∞ which means 0 × ∞ ≈ 1 (because of fact families)
If 0 × ∞ ≈ 1 then that means that (0 × ∞) + (0 × ∞) ≈ 2.
We can simplify to (0 + 0) × ∞ ≈ 2
Then to 0 × ∞ ≈ 2
But we already said 0 × ∞ ≈ 1
So 1 ≈ 2 (approximately)
We can also say that (0 × ∞) + (0 × ∞) + (0 × ∞) + (0 × ∞) ≈ 4
Which means (0 + 0 + 0 + 0) × ∞ ≈ 4
Which again means 0 × ∞ ≈ 4
We can also do (0 × ∞) + (0 × ∞) + (0 × ∞) + (0 × ∞) + (0 × ∞) ≈ 5
Which means (0 + 0 + 0 + 0 + 0) × ∞ ≈ 5
Which means 0 × ∞ ≈ 5
Which means 4 ≈ 5
We know that 2 + 2 = 4
And since 4 ≈ 5 we can say 2 + 2 ≈ 5 (approximately)
This is incorrect because infinity is not a number.
In some jurisdictions, false statement is a crime similar to perjury.
In U.S. law, a "false statement" generally refers to United States federal false statements statute, contained in 18 U.S.C. § 1001. Most commonly, prosecutors use this statute to reach cover-up crimes such as perjury, false declarations, and obstruction of justice and government fraud cases.[2] Its earliest progenitor was the False Claims Act of 1863,[3] and in 1934 the requirement of an intent to defraud was eliminated to enforce the National Industrial Recovery Act of 1933 (NIRA) against producers of "hot oil", oil produced in violation of production restrictions established pursuant to the NIRA.[4]
The statute criminalizes a government official who "knowingly and willfully":[5]
(1) falsifies, conceals, or covers up by any trick, scheme, or device a material fact;
(2) makes any materially false, fictitious, or fraudulent statement or representation; or
(3) makes or uses any false writing or document knowing the same to contain any materially false, fictitious, or fraudulent statement or entry.