0.999... Never Transposes to 1!

See.

Here is your evidence!

https://www.chess.com/forum/view/off-topic/1-10-n-never-transposes-into-1

Casi

1-(10^-n) Never transposes into 1!
1-(1^-10^-1) is 0.9 to infinity

1-(1-10^2) is 0.99

1-(1-10^-3) is 0.999

1^(1-10^-infinity) IS 1-(1-10^infinity) but still not 1.

The Series Technically NEVER Transposes to 1!

https://youtu.be/-tlIPvK9gmM?si=J6PuuMSmMEJIkm-b

If 0.999... = x, multiplying both sides by 10 gives 9.999... = 10x, subtracting x from both sides gives 9 = 9x, dividing both sides by 9 gives 1 = x

Therefore, 0.999... = 1

Anyone reading this, will know that I'm right.

And not you.

You are literally 12 and think that all the greatest mathematicians in the world are wrong

#7 what's wrong with @Hawksteinmans answer, doesn't look wrong to me. Any primary school kid could understand ⅓=0.3333 recurring ⅔=0.666 recurring so logically 3/3=1=0.999 recurring as well so I don't see the need for trying to 'prove everyone wrong'.

my brain died

#11 wrong 3/3=1 that's a fact since it means 3÷3, how many times does 3 go into 3? The answer is 1 time.

zeroth, you're not always right

Because 9

99

999

Never reaches a power of 10.

0.9

0.99

0.999

Never reaches 1

1/3= ...0.33333333333333 3/3= ...0.9999999999999

1 = ...0.99999999