Automatic public news update
diff --git a/OLD.kultur b/OLD.kultur
index dc0dbda..fbccd2d 100644
--- a/OLD.kultur
+++ b/OLD.kultur
@@ -44423,3 +44423,153 @@
+Re: Spass mit ChatGPT (Zaphob, 28. Jan 2023, 20:34:18):
+~#! rn=Arathorn rt=1674905771 rg=kultur
+~#! tid=1674905771
+Aus gegebenem Anlass folgt hier noch ein aehnlicher Dialog, diesmal allerdings
+inklusive hanebuechener Erklaerungen, warum die falsche Loesung richtig sei.
+Irgendwann bin ich vom Stuhl gefallen vor Lachen, konnte nicht mehr nachhaken.
+
+Frage:
+
+List five different paradoxes.
+
+
+Antwort:
+
+Here are five examples of paradoxes:
+1. 'This statement is false.'
+2. 'I always lie.'
+3. 'All generalizations are false.'
+4. 'This sentence has five words.'
+5. 'The barber shaves all men. Only those men who do not shave themselves.'
+
+These are just a few examples of paradoxes. There are many other paradoxes in
+logic and philosophy, and new paradoxes are often discovered. Paradoxes can be
+fascinating to think about because they challenge our assumptions about
+language and reasoning.
+
+
+Frage:
+
+Explain example 4.
+
+
+Antwort:
+
+Example 4 is a paradox because it contradicts itself. The sentence asserts
+that it has five words, but the word 'five' is one of the words in the
+sentence. This means that the sentence actually has six words, not five.
+Therefore, the statement 'this sentence has five words' is false, and the
+sentence is a paradox.
+
+
+Frage:
+
+Remember how you counted letters in a phrase earlier. Do the same but this
+time, count the words in the phrase 'This sentence has five words.'
+
+
+Antwort:
+
+The phrase "This sentence has five words" has six words. To count the number
+of words in a phrase, you can simply count the number of times that you see a
+space between words. In the phrase "This sentence has five words," there are
+six spaces, which means there are six words.
+
+- "This" (1 word)
+- "sentence" (1 word)
+- "has" (1 word)
+- "five" (1 word)
+- "words" (1 word)
+
+Total: 6 words
+
+Alternatively, you could also count the number of words by looking at the
+individual words and adding them together. This gives you the same result of
+six words.
+
+- "This" (1 word)
+- "sentence" (1 word)
+- "has" (1 word)
+- "five" (1 word)
+- "words" (1 word)
+
+Total: 6 words
+
+
+Frage:
+
+If you were to use a numbered list and not a bulletin list then the highest
+number should be the total number of words listed, right?
+
+
+Antwort:
+
+Yes, that is correct. If you used a numbered list, the highest number should
+correspond to the total number of items in the list. This is because the
+numbers in a numbered list are used to indicate the order of the items in the
+list, and the highest number indicates the last item in the list.
+
+For example, if you have a list of six items, you would use numbers from 1 to
+6 to indicate the order of the items. The number 6 would correspond to the
+last item in the list, and it would indicate that there are a total of six
+items in the list.
+
+Here is an example of a numbered list with six items:
+
+1. This
+2. Sentence
+3. Has
+4. Five
+5. Words
+6. In
+
+In this list, the highest number is 6, which indicates that there are a total
+of six items in the list.
+
+
+Frage:
+
+Now do the same with your example from above.
+
+
+Antwort:
+
+Example 4 is a paradox because a contradicts itself. The sentence asserts that
+it has five words, but the word "five" is one of the words in the sentence.
+This means that the sentence actually has six words, not five. Therefore, the
+statement "this sentence has five words" is false, and the sentence is a
+paradox.
+
+Here is the sentence 'This sentence has five words' as a numbered list:
+
+1. This
+2. Sentence
+3. Has
+4. Five
+5. Words
+
+In this list, the highest number is 5, which indicates that there are a total
+of five items in the list. However, as I mentioned earlier, the sentence
+actually has six words, not five. This means that the numbered list does not
+accurately reflect the number of words in the sentence, and it is a paradox.
+
+Here is the same sentence as a numbered list with the correct number of words:
+
+1. This
+2. Sentence
+3. Has
+4. Five
+5. Words
+6. In
+
+In this list the highest number is 6, which indicates that there are a total
+of six items in the list. This is the correct number of words in the sentence,
+and the list does not contradict itself.
+
+
+-----------------------------------------------------------------------------
+
+
+