Sagot :
Answer:
To say the answer is 1, is akin to saying 0
which is incorrect. Zero divided by zero is. - = 1 indeterminate. The answer is not infinity, 0
but there are an infinite number of answers.
How so? Powers are multiples of oneself.
Let’s take a look at some examples:
Given that 24 literally means 2x2x2x2 , it follows that if we divide this by 2, we will get 23 , such that 242=23=8
Given that 23 literally means 2x2x2 , it follows that if we divide this by 2, we will get 22 , such that 232=22=4
Given that 22 literally means 2x2 , it follows that if we divide this by 2, we will get 21 , such that 222=21=2
Therefore It would also follow, that 212=20=1
Notice the halving pattern from 24 down to 20 , it would also follow that 2−1=0.5 , 2−2=0.25 , and 2−3=0.125 , etc.
Now let’s take a look at 1:
Given that 14 literally means 1x1x1x1 , it follows that if we divide this by 1, we will get 13 , such that 141=13=1
Given that 13 literally means 1x1x1 , it follows that if we divide this by 1, we will get 12 , such that 131=12=1
Given that 12 literally means 1x1 , it follows that if we divide this by 1, we will get 11 , such that 121=11=1
Therefore It would also follow, that 111=10=1
Notice the pattern from 14 down to 10 , it would also follow that 1−1=1 , 1−2=1 , and 1−3=1 , etc.
Now let’s consider 0:
Given that 04 literally means 0x0x0x0 , it follows that if we divide this by 0, we will get 03 , such that 040=03=0
Given that 03 literally means 0x0x0 , it follows that if we divide this by 0, we will get 02 , such that 030=02=0
Given that 02 literally means 0x0 , it follows that if we divide this by 0, we will get 01 , such that 020=01=0
However, the next step is where it get’s complicated (or rather, perfectly clear). Where all the previous steps allowed for a division by zero, because it merely cancelled out one of the multiplied zeros in the numerator of the operation, this cannot be done now, as there is only one zero in the numerator and only one in the denominator.
Logic would say that nn=1 , however this is only true for values of n≠0 . For proof that dividing anything by zero is indeterminate, please refer to the various Quora articles that specifically deal with this.
Notice the pattern from 04 down to 01 , it would also follow that 0−1=0 , 0−2=0 , and 0−3=0 , etc. However, we also now know this not to be true, because any number n raised to a negative power is the reciprocal of 1 divided by n raised to the same positive power. For example:
n−2=1n2 In the case where n is 2, then n−2=2−2=122=14 which was already established in the earlier paragraphs. However, we also know that zero raised to any positive power is zero as also established, and so, zero raised to a negative power, will result in 1 divided by the positive power, or 0−n=10n and this is therefore indeterminate.
❈✿✹Answer✹✿❈
The answer is NOT 1.
To say the answer is 1,Is asking to say
[tex] \frac{0}{0} = 1[/tex]
➩Zero divided by zero is indeterminate.
[tex].[/tex]
#KeepItGood