Sal Khan considers two different ways to think about why a number raised to the zero power equals one: 1) if 2^3 = 1x2x2x2, then 2^0 = 1 times zero twos, which equals 1. 2) By following a pattern of decreasing an exponent by one by dividing by the base, we find that when we get to the 0 power, we end up dividing the base by itself, resulting in 1.
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- I watched this video and it explained a lot because I didn't understand this before, but at the end of the video I realized that if you used the first method, that 0 to the power of 0 = 1. But 0 to the power of 1 = 0! Can someone please explain why that is?(28 votes)
- 0 to the 0th power is debated within the mathematical community. Some may say that it is 1, some may say that it is 0. Most people would just agree that it is indeterminate.(21 votes)
- I know that n/0 is undefined , because you can add 0 as many as times you want but you can not get n . This means that division by zero is not defined as written in my textbook . But what if we have 0 / 0 . Isn't it possible. Because you can add zero as many as times and you will always get zero . So here(in 0 /0) we are getting an answer which can be any number. So in this division by zero is defined and it is correct . And answer to this division problem is possible.
Am I right?
Please tell(16 votes)
- Good question! The fact that 0/0 can be any number does not make 0/0 defined, because it is not a definite number. The best thing to call 0/0 is indeterminate (which means inconclusive).
If you study calculus later, you will frequently encounter indeterminate situations in limit problems.(8 votes)
- I know he said at4:23to "ponder Zero to the Zeroth power", but I am curious. What other science is behind it? I have been out of 6th grade for 4 years now, but I never really got an answer when I asked around. Not even Google is really helpful. Which theory is more supported? Personal opinions? Any answer is appreciated.(8 votes)
- Most people say that it is indeterminate. You can get 0 or 1 if you use different solutions, but 0 is not equal to 1, so that is why it is indeterminate.(5 votes)
- how do you times decimals with exponets(7 votes)
- What is zero to the zeroth power?(5 votes)
- This is a very good question! Consider the following two rules:
1) Zero to any positive power is 0.
2) Any nonzero number to the zero power is 1.
If we try to extend both rules to define 0^0, we get different answers. It is unclear if 0^0 should be 0, 1, or something else. Because of this, it is best to call 0^0 indeterminate (though 0^0 is often interpreted as 1).(5 votes)
- i watched the video and i used the both ways but why when i searched on google i got 1 and why do we add 1 in the first way?(4 votes)
- Good question. Here's what I found on Google: "In short, the multiplicative identity is the number 1, because for any other number x, 1*x = x. So, the reason that any number to the zero power is one is because any number to the zero power is just the product of no numbers at all, which is the multiplicative identity, 1." Hope this helped! -Johnny Unidas(3 votes)
- Wait the only question I ever had in exponents is what is squaring(3 votes)
- Since 10^0, is 1. Does this mean it is 10^1? If I am multiplying 10^0 x 10^5, we add the exponents but am I adding zero, or one? If 10^0 is equal to 10^1, then the product should be 10^6. Is this right?(3 votes)
- Yes, 10^0 = 1, but this is not the same as 10^1, which would equal 10.
So 10^0 x 10^5 = 10^5, not 10^6.(4 votes)
- are there exponents like -1(2 votes)
- Yes, there are negative exponents, since it is hard to explain in words (for me) I'm just going to show an example,
5^-1= 1/5 = 0.2
5^-2= .2/5 = 0.04(6 votes)
- If we think about something like two to the third power, we could view this as taking three twos and multiplying them together, so two times two times two, or equivalently, we could say this is the same thing as taking a one and then multiplying it by two three times, so actually, let's just go with this definition right over here, and this, of course, is going to be equal to eight. Now what would, based on this definition I just did, what would two to the second power be? Well, this would be one times two twice, so one times two times two, which, of course, would be equal to four. What would two to the first power be? Well, that would be one, and we would multiply it by one two, one times two, which, of course, is equal to two. Now let's ask ourself an interesting question. Based on this definition of what an exponent is, what would two to the zeroth power be? I encourage you to just think about that a little bit. If you were the mathematics community, how would you define two to the zero power so it is consistent with everything that we just saw. Well, the way we just talked about it, we just said exponentiation is you start with a one and you multiply it by the base zero times, so we're not gonna multiply it by any two, so we're just gonna be left with a one. So does this make sense that two to the zero power is equal to one? Well, let's think about it another way, and let's do a different base. That was with two, but let's say we have three and I could say three to the fourth power, that's three times three times three times three which is going to be equal to 81, and let me just write down that this is going to be equal to 81. If I said three to the third power, that's three times three times three which is 27. Three to the second power is equal to nine. Three to the first power is equal to three. Do you notice a pattern every time we decrease the exponent here by one? We want three to the fourth, and now we go three to the third. What happened to the value? Well, going from 81 to 27, we divided by three, and that makes sense, because we're multiplying by one less three, so we divide by three to go from 81 to 27, we divide by three again if our exponent goes down by one, and we divide by three again when we go from nine to three, divide by three, so based on this, what do you think three to the zero power should be? Well, the pattern is every time we decrease our exponent by one, we divide by the base, and so we should divide by three again would be the logic if we follow that pattern, and so three divided by three would get us one again. So I know it might seem a little bit counter intuitive that something to the zeroth power is going to be equal to one, but this is how the mathematics community has defined it because it actually makes a lot of sense. Either if you view an exponent as taking a one and multiplying it by the base the exponent number of times, so I'm gonna multiply one by two three times, or if you just follow this pattern, every time you decrease the exponent by one, you're going to be dividing by the base. Either of those would get you to the conclusion that two to the zero power is one, or three to the zero power is one, or frankly, any number to the zero power is one. So if I have any number, let's say I have some number a to the zero power, this is going to be equal to one. Now I have an interesting question for you, and let's just say this is the case when a does not equal zero. I'll leave you a little bit of a puzzle for you to think about. What do you think is zero to the zeroth power? What should zero to the zero power be? And what's interesting about zero to the zero power is you'll get a different answer if you use this technique versus if you use this technique right over here. This technique would actually get you to being one, while this technique would have you divide by zero, which we don't know how to do. Anyway, I'll leave you there to ponder the mysteries of zero to the zeroth power.