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23 Mar 2018, 09:37
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Bookmarks
Hello,
I found the following question in a different thread and felt it would be nice to start a new thread on this as 'infinite' and 'non-defined' are often considered the same while Mathematically, they are different.
Here we go...
First thing first: This will not show up on GMAT.
However, for the numbers lovers here...
0^0 is 'not defined'.
Please understand the following:
1). 0^0 is not 1.
2). 0^0 is not 0.
3). 0^0 is not 'infinite'.
While we use the terms 'infinite' and 'not defined' interchangeably, there is a significant difference.
Let me try to explain:
'Infinite' is a number larger than all finite (or countable) numbers.
Examples:
1/0, 2/0 etc.
'Non defined' suggests that a unique, defined answer is not possible.
Examples:
0/0 (0 divided by anything is 0 but anything divided by 0 is infinite; hence, 'non-defined').
0^0 (0 raised to power anything is 0 but anything raised to power 0 is 1; hence, 'non-defined').
All the best!
Maxximus
I found the following question in a different thread and felt it would be nice to start a new thread on this as 'infinite' and 'non-defined' are often considered the same while Mathematically, they are different.
Here we go...
ichadaram
First thing first: This will not show up on GMAT.
However, for the numbers lovers here...
0^0 is 'not defined'.
Please understand the following:
1). 0^0 is not 1.
2). 0^0 is not 0.
3). 0^0 is not 'infinite'.
While we use the terms 'infinite' and 'not defined' interchangeably, there is a significant difference.
Let me try to explain:
'Infinite' is a number larger than all finite (or countable) numbers.
Examples:
1/0, 2/0 etc.
'Non defined' suggests that a unique, defined answer is not possible.
Examples:
0/0 (0 divided by anything is 0 but anything divided by 0 is infinite; hence, 'non-defined').
0^0 (0 raised to power anything is 0 but anything raised to power 0 is 1; hence, 'non-defined').
All the best!
Maxximus
Archived Topic
Hi there,
This topic has been closed and archived due to inactivity or violation of community quality standards. No more replies are possible here.
Where to now? Join ongoing discussions on thousands of quality questions in our Quantitative Questions Forum
Still interested in this question? Check out the "Best Topics" block below for a better discussion on this exact question, as well as several more related questions.
Thank you for understanding, and happy exploring!
21 May 2019, 05:58
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Maxximus
can you please throw some light on the following questions?
1.Is 0 a multiple of all numbers? (My answer: Yes)
2. Are all numbers multiple of 0? (my answer: No)
3. Is 0 a factor of all numbers? (my answer: No)
4. Are all numbers factors of 0? (my answer: Yes)
21 May 2019, 06:13
Kudos
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NA_JS
1. Yes.
2. No. 0 is not a divisor of any number.
3. 0 is not a factor of any number.
4. Yes. 0 is divisible by every number, except 0 itself.
ZERO.
1. 0 is an integer.
2. 0 is an even integer. An even number is an integer that is "evenly divisible" by 2, i.e., divisible by 2 without a remainder and as zero is evenly divisible by 2 then it must be even.
3. 0 is neither positive nor negative integer (the only one of this kind).
4. 0 is divisible by EVERY integer except 0 itself.
5. \(0^0\), in some sources equals to 1, some mathematicians say it's undefined. Anyway you won't need this for GMAT.
"During the past decade, mathematicians argued extensively about the value of 0^0. Some answer that 0^0 = 1, while others answer that 0^0 is undefined. In the unlikely event that this question appears in some format or is a required intermediary calculation, the correct answer is more likely that 0^0 = 1."
https://www.platinumgmat.com/gmat_study_ ... ial_powers
and:
"Note: the case of 0^0 is not tested on the GMAT."
https://www.manhattangmat.com/np-exponents.cfm
Check for more below threads:
ALL YOU NEED FOR QUANT ! ! !
Ultimate GMAT Quantitative Megathread
Hope it helps.
