Years ago I wrote a post Golden powers are nearly integers. The post was picked up by Hacker News and got a lot of traffic. The post was commenting on a line from Terry Tao:

The powers φ, φ², φ³, … of the golden ratio lie unexpectedly close to integers: for instance, φ¹¹ = 199.005… is unusually close to 199.

In the process of writing my recent post on base-φ numbers I came across some equations that explain exactly why golden powers are nearly integers.

Let φ be the golden ratio and ψ = −1/φ. That is, φ and ψ are the larger and smaller roots of

x² − x − 1 = 0.

Then powers of φ reduce to an integer and an integer multiple of φ. This is true for negative powers of φ as well, and so powers of ψ also reduce to an integer and an integer multiple of ψ. And in fact, the integers alluded to are Fibonacci numbers.

φⁿ = F_n φ + F_{n − 1}
ψⁿ = F_n ψ + F_{n − 1}

These equations can be found in TAOCP 1.2.8 exercise 11.

Adding the two equations leads to [1]

φⁿ = F_{n + 1} + F_{n − 1} − ψⁿ

So yes, φⁿ is nearly an integer. In fact, it’s nearly the sum of the (n + 1)st and (n − 1)st Fibonacci numbers. The error in this approximation is −ψⁿ, and so the error decreases exponentially with alternating signs.

Related posts

• Plastic powers
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[1] φⁿ + ψⁿ = F_n (φ + ψ) + 2 F_{n − 1} = F_n + 2 F_{n − 1} = F_n + F_{n − 1} + F_{n − 1} = F_{n + 1} + F_{n − 1}

Casting out nines is a well-known way of finding the remainder when a number is divided by 9. You add all the digits of a number n. And if that number is bigger than 9, add all the digits of that number. You keep this up until you get a number less than 9.

This is an example of persistence. The persistence of a number, relative to some operation, is the number of times you have to apply that operation before you reach a fixed point, a point where applying the operation further makes no change.

The additive persistence of a number is the number of times you have to take the digit sum before getting a fixed point (i.e. a number less than 9). For example, the additive persistence of 8675309 is 3 because the digits in 8675309 sum to 38, the digits in 38 sum to 11, and the digits in 11 sum to 2.

The additive persistence of a number in base b is bounded above by its iterated logarithm in base b.

The smallest number with additive persistence n is sequence A006050 in OEIS.

Multiplicative persistence is analogous, except you multiply digits together. Curiously, it seems that multiplicative persistence is bounded. This is true for numbers with less than 30,000 digits, and it is conjectured to be true for all integers.

The smallest number with multiplicative persistence n is sequence A003001 in OEIS.

Here’s Python code to compute multiplicative persistence.

def digit_prod(n):
    s = str(n)
    prod = 1
    for d in s:
        prod *= int(d)
    return prod

def persistence(n):
    c = 0
    while n > 9:
        n = digit_prod(n)
        print(n)
        c += 1
    return c   

You could use this to verify that 277777788888899 has persistence 11. It is conjectured that no number has larger persistence larger than 11.

The persistence of a large number is very likely 1. If you pick a number with 1000 digits at random, for example, it’s very likely that at least of these digits will be 0. So it would seem that the probability of a large number having persistence larger than 11 would be incredibly small, but I would not have expected it to be zero.

Here are plots to visualize the fixed points of the numbers less than N for increasing values of N.

It’s not surprising that zeros become more common as N increases. And a moments thought will explain why even numbers are more common than odd numbers. But it’s a little surprising that 4 is much less common than 2, 6, or 8.

Incidentally, we have worked in base 10 so far. In base 2, the maximum persistence is 1: when you multiply a bunch of 0s and 1s together, you either get 0 or 1. It is conjectured that the maximum persistence in base 3 is 3.

Fermat’s primality test

Fermat’s little theorem says that if p is a prime and a is not a multiple of p, then

a^p−1 = 1 (mod p).

The contrapositive of Fermat’s little theorem says if

a^p−1 ≠ 1 (mod p)

then either p is not prime or a is a multiple of p. The contrapositive is used to test whether a number is prime. Pick a number a less than p (and so a is clearly not a multiple of p) and compute a^p−1 mod p.  If the result is not congruent to 1 mod p, then p is not a prime.

So Fermat’s little theorem gives us a way to prove that a number is composite: if a^p−1 mod p equals anything other than 1, p is definitely composite. But if a^p−1 mod p does equal 1, the test is inconclusive. Such a result suggests that p is prime, but it might not be.

Examples

For example, suppose we want to test whether 57 is prime. If we apply Fermat’s primality test with a = 2 we find that 57 is not prime, as the following bit of Python shows.

    >>> pow(2, 56, 57)
    4

Now let’s test whether 91 is prime using a = 64. Then Fermat’s test is inconclusive.

    >>> pow(64, 90, 91)
    1

In fact 91 is not prime because it factors into 7 × 13.

If we had used a = 2 as our base we would have had proof that 91 is composite. In practice, Fermat’s test is applied with multiple values of a (if necessary).

Witnesses

If a^p−1 = 1 (mod p), then a is a witness to the primality of p. It’s not proof, but it’s evidence. It’s still possible p is not prime, in which case a is a false witness to the primality of p, or p is a pseudoprime to the base a. In the examples above, 64 is a false witness to the primality of 91.

Until I stumbled on a paper [1] recently, I didn’t realize that on average composite numbers have a lot of false witnesses. For large N, the average number of false witnesses for composite numbers less than N is greater than N^15/23. Although N^15/23 is big, it’s small relative to N when N is huge. And in applications, N is huge, e.g. N = 2²⁰⁴⁸ for RSA encryption.

However, your chances of picking one of these false witnesses, if you were to choose a base a at random, is small, and so probabilistic primality testing based on Fermat’s little theorem is practical, and in fact common.

Note that the result quoted above is a lower bound on the average number of false witnesses. You really want an upper bound if you want to say that you’re unlikely to run into a false witness by accident. The authors in [1] do give upper bounds, but they’re much more complicated expressions than the lower bound.

Related posts

• Fast exponentiation
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[1] Paul Erdős and Carl Pomerance. On the Number of False Witnesses for a Composite Number. Mathematics of Computation. Volume 46, Number 173 (January 1986), pp. 259–279.

Eight years ago I wrote a blog post on the Leading digits of powers of 2. In that post I said that Benford’s law gives remarkably good predictions for the distribution of leading digits of 2ⁿ. In this post I’ll make that statement stronger.

A sequence obeys Benford’s law, in base 10, if the proportion of the first N elements of the sequence that begin with the digit d is asymptotically

N log₁₀(1 + 1/d).

Benford’s law applies to powers of 2, but also to factorials, for example. In general it applies only in the limit as N goes to infinity. For a large but finite value of N it gives a good approximation, but there’s no guarantee on how good the approximation is.  Except sometimes there is.

You could use Benford’s law to estimate how many times n! begins with a 1, but it can tell you exactly how many times 2ⁿ begins with a 1. The exact number is the estimate given by Benford’s law with d = 1, rounded down to the nearest integers, i.e. the floor of the expression above.

⌊N log₁₀(2)⌋

See [1] for a proof. The following Python code demonstrates this.

    import decimal
    from math import log10, floor

    def exact(N):
        c = 0
        a = decimal.Decimal(1)
        for i in range(1, N+1):
            a = a*2
            if int(str(a)[0]) == 1:
                c += 1
        return c

    def estimated(N):
        return N*log10(2)

    for i in range(1, 10000):
        assert(exact(i) == int(floor(estimated(i))))

The code uses the decimal class for efficiency. See Andrew Dalke’s comment on the original post. [2]

Benford’s law predicts exactly how often the sequence 2ⁿ begins with a 1. It also predicts exactly how often it begins with 4, but it is not exact for other digits.

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• Benford and the chi-squared test
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[1] Zhaodong Cai, Matthew Faust, A. J. Hildebrand, Junxian Li, Yuan Zhang. The Surprising Accuracy of Benford’s Law in Mathematics. The American Mathematical Monthly, Vol. 127, No. 3 (MARCH 2020), pp. 217–237

[2] The function exact is efficient for individual values of N, but there is a lot of redundant calculation when you use it to test a range of N‘s as we do in the loop with the assert statement. It wouldn’t be hard to rewrite the code to have it more efficiently check a range.

The Buenos Aires constant is 2.92005097731613…

What’s so special about this number? Let’s see when we use it to initialize the following Python script.

s = 2.920050977316134

for _ in range(10):
    i = int(s)
    print(i)
    s = i*(1 + s - i)

What does this print?

    2, 3, 5, 7, 11, 13, 17, 19, 23, 29

If we started with the exact Buenos Aires constant and carried out our operations exactly, the procedure above would generate all prime numbers. In actual IEEE 754 arithmetic, it breaks down around Douglas Adams’ favorite number.

The Buenos Aires constant is defined by the infinite sum

As you can tell, the primes are baked into the definition of λ, so the series can’t generate new primes.

I used mpmath to calculate λ to 100 decimal places:

2.920050977316134712092562917112019468002727899321426719772682533107733772127766124190178112317583742

This required carrying out the series defining λ for the first 56 primes. When I carried out the iteration above also to 100 decimal places, it failed on the 55th prime. So I got about as many primes out of the computation as I put into it.

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Reference: Beyond Pi and e: a Collection of Constants. James Grime, Kevin Knudson, Pamela Pierce, Ellen Veomett, Glen Whitney. Math Horizons, Vol. 29, No. 1 (September 2021), pp. 8–12