8:35 underlining inequality signs is usually not the best way to emphasize them ;)

I have noticed that if there is an easy way to prove something, then Michael will point it out and then prove it a harder, but more entertaining and often a more general way :-).

He explained so many stuffs in a single video. This shows how different math problems are related to each other!!

Can't believe I'm watching this for entertainment

What I've learnt from this channel is to start every math problem by considering case n=1.

I like the method that was chosen to prove the inequality - it proves it not only for natural numbers, but for all real numbers as well.

Fun fact, we know that 0

Without induction, in my opinion the easiest way is to use binomial coefficients. n < 2^(n-7) for n >=11 is equivalent to n+7 < 2^n for n>=4. We check n=4 and n=5 by hand and for n>5 we have 2^n = (1+1)^n > (n choose 0) + (n choose 1) + (n choose n-1) + (n choose n) = 1 + n + n + 1 = 2 + 2n > n + 7.

great as always. love when you just underline something and mark it as "clear." that's how you know you're watching a real mathematician

This channel is such a gem, more people should be watching this stuff.

N^(1/n-7)>1 The proof of this is obvious and left as an exercise to the reader

I love this channel, awesome the way you spent a several seconds and a couple of sentences in proving that 10 is not a perfect cube.

7:10 is not equivalent, but you only need the reverse implication here. f(x) >0 everywhere => f(n) > 0 for natural numbers

Showing the "obvious" parts and "the long way" is so so good. It's how we all learn. Very good job!

Although it was excluded right at the beginning, n=1 would be a solution as 1^x=1\in N for any x.

set f(x) =x^(1/x-7) arguing the monotony of the function on [8,+∞) let a,b≥8 be real numbers s.t a1/b-7 ⇒ f(a)>f(b) ⇒the function is strictly decreasing on [8,+∞). therefore max(f(x))=f(8)=8. We have 0

when i first looked at the problem, i found it pretty clear that either the exponents needs to be 1 (which gives 8 as a solution) or n needs to be a perfect power (because otherwise we would never get an integer by taking an (n-7)th root). the rest would be quite similar to what you did, just showing that f(x)=x^(1/(x-7)) is decreasing for x>=8.

Love your videos, participating in my first olympiad in a month or two

the equivalence at 7:30 is false. But the implication b=>a is enough to prove the result (b result with x in R).

This was a really lovely problem. Well presented Michael, loving your stuff

Man who I wish I would have had such videos in high-school almost 20 years ago.

Observe that for n^(1÷m) to be a natural number all of n's prime factors must have multiplicity that's divisible by m. The smallest such number (other than 1) has prime factorization 2^m (because 2 is the smallest prime) which obviously grows faster than m+7 once you get past about m=4

An arguably quicker way of proving 2^n>128n could have been by plugging n=11 and checking that 2^n is indeed larger and then seeing that the slope of 2^n at n=11 is 1024*11 (chain rule) and that the slope of 128n is 128. Plus the slope of 2^n only keeps on growing whereas 128n has a constant (and lower) slope. Combining f(11)>g(11) and f'(x)>g'(x) for x in [11,∞), you know that f(x)>g(x) ,if f(x)=2^x and g(x)=128x

In order for it to be an element of N then n should be written as n=m^(n-7), with m>=3>e cuz n>8>e (the case of n=8) is trivial) also m=n^m when we play around with the inequality and by replacing values we get n

I felt this much easier than any other question

8:20 Another nice way to see 2^11 - 128(11) > 0 is to factor a 2^7 out of each term and observe it's true iff (2^4 - 11) > 0. (Even if it's not memorized, 128=2^7 was used earlier in the problem.)

A backflip would have been great. I love these videos. It makes me kinda sad I didn’t go for pure instead of applied math.

I probably would have turned back after taking the derivative. Thanks for an unusually clear and direct work-through!

From e < 4, we get 1 < 2 ln 2 by taking the natural log on both sides, and then dividing both sides by 2 yields the inequality.

The sequence decreases on its domain and is asymptotic to 1. We know a_8 = 8, a_9 = 3, so you need to consider whether there's an n such that n^(1/(n-7)) =2; it is relatively easy to show that there are no natural number solutions to this equation.

Me: Sees 1/n-7 *Ezee* Me: Sees n just below it *crap*

Excellent! You did your number eight like me until I were 8 years old. I remember my teacher scolded me for it. So far, I do my eights "normally". It was just to annoy you but you're doing a great job!

I did another induction: n < 2^(n-7) is true for n=11, then we can say: 2^(n+1-7) = 2*2^(n-7) > 2n = n+n > n+1 (for n>=11) So therefore: n+1

Me after seeing thumbnail: "Oh that's easy, it's 8" Me after clicking on video: "Ah, the old bait and switch"

My solution substitute x = n - 7 and n = a^x for some integer a to obtain a^x = x + 7. Then obviously for x >= 4 we need a < 2 and we only need to evaluate x = 1,2,3. The only satisfactory pairs (a,x) are (8,1) and (3,2)

The work is pleasingly clear and labeled

I tried to solve this from the thumbnail, so I missed that we were solving over the natural numbers. I got n = - W(-1, -ln(z) / z^7 ) / ln(z) where z is an integer and W is the Lambert W function aka the ProductLog. Apparently, we need the -1 branch. n. n^(1/n-7) 10.375 2 9 3 8.54777 4 8.31611 5 8.17246 6 8.07331 7 8 8 7.94315 9 7.89749 10 7.85982 11 7.82809 12 7.80089 13 7.77725 14 7.75646 15 7.73799 16...

The function f(x)=x^{1/(x-7)}=e^{ln x/(x-7)} is greater than 1 for x>7 and monotone decreasing, since f'(x)=f(x)/[x(x-7)^2]*[-7-x(ln x -1)]10 we have 1

I just directly differentiated the original function extended to the reals, showed that was negative for n>=8 and then by exploration found that 8&9 were the only solutions.

6:55 I don't think it is equivalent because you could take such a function that it would be positive on integers but not always positive for real numbers but anyway that doesn't change the solution

IMO is happening now, it would be fun to feature some of the questions from this year

Let n=b^x. Then we need to observe when b^[x/(b^x-7)] is an integer. That means b^x-7 divides x. For that to be possible, b^x-7 =< x. If x=1, b^x=8. If x>1, then 2^x-7 =< x so x

I think it's easier how I solved it. So if n ^ (n-7) is natural, it means that n = k ^ (n-7), with k a natural number. It is immediately verified that n = 8 and n = 9 are solutions and k = 8 and k = 9. For n = 10, the only close k could be 2 becouse 2 ^ 3 = 8 and 3 ^ 3 is 27, much greater than 10. Therefore we observe that for n> = 11, n = 11, n = 2. By induction, P (m) => P (m + 1) So we have m

Please correctly state the question by adding: n ∈ N (natural number). Otherwise, there are more real number solutions for n, since the real function f(x) = x ^ (1/x-7) is a continuous function, and we have f(8)=8 and f(11)

If n^(1/(n-7)) is an integer, then n = m^(n-7) for some integer m greater than or equal to 2. Take a prime divisor p of n and let e be its exponent in the factorization of n. Since n = m^(n-7), the exponent of p in the factorization of m^(n-7) is greater than or equal to n-7 and hence so is a. It thus follows that 2^a - 7 ≦ n - 7 ≦ a. Therefore 2^a - a ≦ 7．Because 2^x - x is increasing on x ≧ 1 and 2^4 - 4 > 7, we have the inequality a ≦ 3; Hence n ≦ 10.

Set k = n-7 (k+7)^(1/k) in N, k > 0 (k+7) = m^k, m,k in N k = 1 and 2 are trivial solutions, with m = 8 and 3. Notice that (k+7)^(1/k) = m is strictly decreasing with k, so any other solution would have m = 2. 2^k = k+7 has a solution between 3 and 4, so not in integers. Hence, n in {8,9} are the only solutions.

First impression: Holy moly, that's gonna be hard Second impression: But wait, that's gonna be impossible very soon Solution: It's actually just the first 2 allowed numbers I'd say the perceived difficulty of this exercise is a strictly decreasing function of time.

The problem with underlining an inequality to emphasize its strictness is then you make it nonstrict 🤣

Unless n is in natural, there has to be a solution for f(n) = n^(1/(n-7)) = 2. Note that f is monotonic, continous in (7,+inf> and has an asymptote at f = 1.

0:50 "Similar things happen with n=5, 4, 3, 2, and 1..." A very minor correction, but actually 1⁻¹/⁶ = 1 so n=1 works. 🙂

n = 1 is a soln

By thinking of it as an n-7th root you can also show that n>=2^(n-7) as n!=1 and hence 8

I believe you could also use binomial expansion for 2^m to show the inequality as well. Use 2^m = SUM( m choose k) from k=0 to m and use however many terms you want to show that 2^m > 128m

I think it is easier to grasp by using Taylor series to show that ln(2)

0:47 Actually, n = 1 will work (if not for the restriction on n)

you need not use derivative of f(x). it's enough that just prove f(n+1) > f(n) for all n > 7，which is much easier: 2^(n+1)-128(n+1)-(2^n-128n)=2^n-128 > 0

Love the channel, interesting problems and crystal clear explanations! for proving ln 2 > 1/2, maybe it is a bit more straightforward to do: ln 2 = 1/2 * 2 * ln 2 = 1/2 * ln (2^2) = 1/2 * (lg 4 / lg e) > 1/2 ?

I really like the ending you make in each video. That's a good place to stop. It feels like maths has an infinite domain one can explore. It's like the opposite of claustrophobia.

That thinking of searching for n>11 is really brilliant.

11:19 : After reading Richard Feynman's brilliant "Surely You're Joking, Mr. Feynman!" I can't forget that ln 2 = 0.69... which is clearly bigger than 0.5

A suggestion for a quick and easy proof (it feels almost too easy - are there any flaws in my reasoning?) : f(n)=n^(1/(n-7) >= 8^(1/(n-7)) = 2^(3/(n-7) > 1. When does f(n) get >=2? 2^(3/(n-7))>=2 3/(n-7) >=1 n

isn't it easier to take both sides to the power n-7 so we're looking for x^(n-7)=n . x positive integer. since x=1^(n-7) is always 1 and the smallest x is then 2 and 2^(n-7)>n for all n>11 is pretty obvious with no heavy duty math. The induction is just that for n+1, 2*(previous>n)>n+1 .

Finally, something I managed to solve before watching the video. Beautiful solution.

Wonderful video, always a pleasure to watch. I was wondering if you Could make a video on the “points in the space” type of problem (I believe it’s called misc but I’m not sure). An example to this type of problem is “There are a 1000 points in the space, prove you could always pass a line such that half the points would be on one side and the other half on the other side”.

I used a slightly different approach. I took the derivative of x^(1/(x-7)), and showed it was decreasing for all x greater than or equal to 8. Since we know 1 is our lower bound, and the n=11 case is less than 2, then we know we only need to check 8, 9, and 10

I think we can also say that n is between 8 and 10 because the first integer to accept a 4th root is 16 and n=11 gives us 4th root of 11 which is impossible.

What about n=1? It's also a solution since 1^(-1/6)=1...

0:24 0:48 For n=1, n^(1/(n-7))=1^(-1/6)=1

Thanks for the great videos! Simpler final proof (edit: oops, it's the same): ln(2)>1/2 2>e^(1/2) 4>e

it's viable also for n=1 as 1^any number=1 which is an integer.

Could you please do IMO 2003 P2 its a cool question

Also the fact that the minimum prime factorization can be log2(n) indicates that the forth root is only available at the integer 16 at minimum is sort of a proof.

I feel like the claim at 13:25 needs more justification since we cant put brackets or anything as the series is not absolutely convergent

Wouldn't it be enough to see that the real function f=x^(1/(x-7)) is continuous for x>7 and approaches 1 from above as x goes to infinity? This proves that when x is large enough the inequality 1

Not clear whether the n >= 8 requirement was added or part of the original problem. It sounded like Michael said all n < 8 didn't work. Actually n = 1 also works.

Hey, Michael. Can you please make a video on problem #6 from the 2009 IMO.

You forgot about solution n=1 while discussing n

take x= n*power(1/n-7) take log both side logx= 1/n-7 * log n , t= logx n-7* t = logn

after watching Numberphile: *I NOW KNOW AND UNDERSTAND MATH! I CAN SOLVE ANY MATH PROBLEMS NOW, I CAN DO IT!* after watching serious Math like this channel: 😭😭😭😭😭😭😭

I proved the inequality by swapping n-7=k and proving that 2^k>k+7 for k>=4 - which is easy by expanding (1+1)^k using the binomial theorem and keeping only the kC0, kC1, kC2, kC(n-1)and kCn terms , giving the inequality 2^k>=2+2k+(k)(k-1)/2 > 8+2k for k>=4 >k+7

check small values, you gen n = -+1,8,9. prove by induction, if for some n >9 n^(n-7) > n, look at n+1: (n+1)^(n-6)= (n+1)^(n-7) * (n+1) us n+1 what is compare (n+1)^(n-7) v 1, what is obviously bigger then one.

You can also take the derivative of the function itself. It takes a bit of implicit differentiation but it's not too complex and you get y((x-7)/x-ln(x))/(x-7)^2=y'. Then since you know y is always positive and so is (x-7)^2 (at least whenever x>8, which is the relevant range anyways) you can show (x-7)/x-ln(x) is always negative since (x-7)/x approaches 1 and ln(x) approaches infinity (a bit trickier than just that but that's the idea). Positive * positive * negative = negative. Since the derivative is always negative, and you know for x=10, y8 or whatever the function is always greater than 1, you know the value will always be between 1 and 2 and therefore can't be an integer.

For ln(2)>1/2 can't we just operate on both sides with e. Get 2>√e then square both for 4>e. That's true, so the starting inequality was true.

The original problem qualified that n is an integer. Otherwise you have 7 distinct real solutions that make n^(1/(n-7)) a natural number, corresponding to values from 8 down to 2, inclusive. For example, n = 8.316108164429... evaluates to 5.

Why doesn't 1 work? Edit : I know the question says "n more than 8", but he explains at 0:48 that all integers between 1 and 7 are not solutions anyway

The title card asks when the expression is an INTEGER rather than a NATURAL, and doesn't bound it to n >= 8. Solving that, we can include both 1 and -1.

Just a thought… Proving the result by proving that f(11) > 0 and f'(x) > 0 could be regarded as some form of "continuous induction".

Define f(x)=x^(1/(x-7)). Another way to prove it is to notice that f(11)1 when x>7. Then we are done if we can show that f is strictly decreasing when x>7 which by differentation amounts to showing that x-7-ln(x)x7. But this is clearly true since ln(x)>ln(7)>1.

So this all makes sense but there's one thing that's messed up and it's that the length of the drawstrings on your sweatshirt are of significantly unequal lengths and I think that really needs to be addressed

0:52 A wonderful example of why you have to be careful making generalizations in mathematics, as this is a false statement. n=1 could be a potential solution (if it were not excluded by the n greater than or equal to 7 condition), as 1^(1/(1-7))=1^(-1/6)=1/(1^6)=1 is in fact an positive integer.

0:51 Wouldn't n=1 work as 1^(-1/6)=1 ?

I really don't know why he did the ln2 > 1/2 thing. "It's well known that e is 2.718..)" but wouldn't that also require a proof? I could just say "well my calculator says ln2 is 0.693..". Other than that, showing the gradient is always positive was good. edit: now I see it, he wanted to make it easy to understand

The problem doesn't state that n must be a natural number, so isn't n=8.0733093... (numerical solution to n^(1/(n-7))=7) also a solution? And likewise for other solutions to n^(1/(n-7))=6 , n^(1/(n-7))=5 ,etc up to n^(1/(n-7))=1 ?

"similar things happen if n is equal to 5, 4, 3, 2, or 1. True for 5, 4, 3, and 2, but 1? 1^(1/1-7) = 1^(-1/6) which is 1. So I don't see the issue here. Did I miss something?

Yeah Sir please do IMO questions also like IMO 2003 P2 number theory and algebra questions

Can't we just say for the last part: ln(2) > 1/2 e ^ (ln(2)) > e^(1/2) [e to the power of both sides] 2 > e^(1/2) [by definition/properties of logarithm] 4 > e [squaring both sides of the logarithm] Or should x^(log_x(y)) = y (where log_x is log base x) be proven in olympiad setting as well?

14:14

Want r = n-7 ≥ 1 with (r+7)^(1/r) an integer, that is, r+7 is an r'th power. Clearly (r+7)^r > 1, and for r ≥ 4, r+7 is less than 2^r, so cannot be an r'th power. So r ≤ 3. n=10 doesn't work (10 is not a cube), so the answers are 8 and 9.

One of the best: creative and not too hard!

I don't want to split hairs, but it seems to me that the last equivalence at 6:49 is not true, or at least not that evident.. And in any case, a simple