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As 20569.8 is not palindromic, any number that is like it must contain that property and similarly be non-palindromic, so no.

Q: Can decimal numbers like 20569.8 be palindromic?

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505,515,...595 -- 10 p. numbers 606,616,...696 -- 10 p. numbers notice the pattern --- looks like there are 50

You multiply the numbers like you multiply integers. Count how many numbers are after the decimal points in both numbers combined and move the decimal point in front of the answer.

just like regular numbers it can go on and on and on FOREVER

0.95

Decimal numbers are always "like", because they all have the same type of denominator: a power of 10. Just add 0s so that both numbers have the same number of digits after the decimal point. Or, just write the two numbers so that the decimal points line up, one below the other.

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I guess that the smallest would be zero, if you don't consider negative numbers. There is no largest palindromic number - you can make them as large as you like.

A palindromic number or numeral palindrome is a 'symmetrical' number like 16461, that remains the same when its digits are reversed. The term palindromic is derived from palindrome, which refers to a word like rotor that remains unchanged under reversal of its letters. The first palindromic numbers (in decimal) are: 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 11, 22, 33, 44, 55, 66, 77, 88, 99, 101, 111, 121, 131, 141, 151, 161, 171, 181, 191, … (sequence A002113 in OEIS). Palindromic numbers receive most attention in the realm of recreational mathematics. A typical problem asks for numbers that possess a certain property and are palindromic. For instance, * the palindromic primes are 2, 3, 5, 7, 11, 101, 131, 151, … (A002385) * the palindromic square numbers are 0, 1, 4, 9, 121, 484, 676, 10201, 12321, … (A002779).

There are decimal points in decimal numbers. They look just like periods.

The difference is that rational numbers stay with the same numbers. Like the decimal 1.247247247247... While an irrational number is continuous but does not keep the same numbers. Like the decimal 1.123456789...

505,515,...595 -- 10 p. numbers 606,616,...696 -- 10 p. numbers notice the pattern --- looks like there are 50

Line up the decimal numbers like this, 100.5 + 9.0 then add normally and put in the decimal right below the decimal obove.^

You multiply the numbers like you multiply integers. Count how many numbers are after the decimal points in both numbers combined and move the decimal point in front of the answer.

just like regular numbers it can go on and on and on FOREVER

Like you would regular numbers. 12.43 - 5.31 ---------- 7.12

0.95

A decimal tab stop is wonderful for numbers that are followed by decimal points. For example, when working with a number like 1,345.280, it uses the decimal point for the tab position. The numbers 1,345 space to the right of the tab, the decimal is exactly on the tab mark, and the numbers 280 fall to the right of the tab. Your numbers will look like this: 1,345.280 2,911.75 4,464.2257 8,721.2557 See how the decimal always stays in the center? That's how a decimal tab works.

Two decimal places means two numbers after the decimal point. (which looks like a period)