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I have done a lot of work on this but couldnt find the answer for larger test cases

Problem statement

In mathematics, binomial coefficients are a family of positive integers that occur as coefficients in the binomial theorem. C(n,k) denotes the number of ways of choosing k objects from n different objects.

However when n and k are too large, we often save them after modulo operation by a prime number P. Please calculate how many binomial coefficients of n become to 0 after modulo by P.


The first of input is an integer T , the number of test cases.

Each of the following T lines contains 2 integers, n and prime P.


For each test case, output a line contains the number of \tbinom nks (0<=k<=n) each of which after modulo operation by P is 0.

Sample Input

2 2
3 2
4 3

Sample Output



  • T is less than 100
  • n is less than 10^500.
  • P is less than 10^9.

Attemted solution

i have completed this by using remainder theorem in binomial coeffecients

         #C(n,m) mod p
         #then C(n,r) mod p=0 when (t<s or t=0)

         inp1 = raw_input()
         for i in range(N):
            inp = raw_input()
            a, b = [long(x) for x in inp.split(' ')]
        for i in range(N):
           print result[i]

above condition is satisfied for small numbers

sample test case


p= 177080341

my output is


expected output is


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After a first computation of my own, I tend to agree with your result. –  MvG Aug 8 '12 at 15:44

3 Answers 3

up vote 0 down vote accepted

Your formula's off.

You're calculating l * (p - t - 1).

This formula doesn't work if there are factors of p^2, p^3, etc. This would occur when l > p (and possibly if m > p too).

For small numbers, try n = 10, p = 3 to see what I'm talking about. Your calculation would return 3 values of r where 10 C r mod 3 = 0, but in fact, there are 7.

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buddy thanks i got it –  black star Aug 9 '12 at 13:14
I'm curious as to what the actual formula is. I tried to figure that out before posting, but didn't. –  Michael Aug 10 '12 at 4:34
Just call the function again <pre> def fun1(a,b): if a>=b: j=0 t=a%b l=a/b j=l*(b-t-1) return j+((t+1)*fun1(l,b)) else: return 0 inp1 = raw_input() N=int(inp1) result=[] for i in range(N): inp = raw_input() a, b = [long(x) for x in inp.split(' ')] j=fun1(a,b) #n=lp+t result.append(j) for i in range(N): print result[i] –  black star Aug 11 '12 at 13:57

You can look at it from the other end: How many nCr are not divisible by p? There's a rather simple formula for that.


The binomial coefficient nCr is given by

nCr = n! / (r! * (n-r)!)

so the multiplicity v_p(nCr) of p in nCr - the exponent of p in the prime factorisation of nCr - is

v_p(nCr) = v_p(n!) - v_p(r!) - v_p((n-r)!)

The multiplicity of p in n! can be easily determined, a well known way to calculate it is

v_p(n!) =  ∑ floor(n/p^k)
         k > 0

If you look at this formula considering the base-p expansion of n, you can see that

v_p(n!) = (n - σ_p(n)) / (p - 1)

where σ_p(k) is the sum of the digits of the base-p representation of k. Thus

v_p(nCr) = (n - σ_p(n) - r + σ_p(r) - (n-r) + σ_p(n-r)) / (p - 1)
         = (σ_p(r) + σ_p(n-r) - σ_p(n)) / (p - 1)


nCr is not divisible by the prime p if and only if the addition of r and n-r has no carry in base p.

Because that is exactly when σ_p(a + b) = σ_p(a) + σ_p(b). A carry in the addition occurs when the sum of corresponding digits of a and b (plus possibly the carry-in if there was already a carry produced for less significant digits) is >= p, then the corresponding digit in the sum is reduced by p and the next more significant digit increased by 1, reducing the digital sum by p - 1.

We have a carry-free addition n = r + (n-r) in base p if for each digit d_k in n's base-p expansion, the corresponding digit of r is less than or equal to d_k. The admissible choices of the digits of r are independent, hence the total number is the product of the count of choices for the individual digits.

The number of nCr not divisible by the prime p is

ND(n,p) = ∏(d_k + 1)

where the d_k are the digits in n's base p expansion,

n = ∑ d_k * p^k

Since there are n+1 (nonzero) binomial coefficients nCr for a given n, the number of (nonzero) binomial coefficients nCr divisible by p is

n + 1 - ∏ (d_k + 1)

with the above base p expansion of n.

Using Michael's example n = 10, p = 3,

10 = 1*3^0 + 0*3^1 + 1*3^2

so there are (1+1)*(0+1)*(1+1) = 4 coefficients 10Cr not divisible by 3 and 10 + 1 - 4 = 7 divisible by 3.

def divisibleCoefficients(n,p):
    m, nondiv = n, 1
    while m > 0:
        nondiv = nondiv * ((m % p) + 1)
        m = m // p
    return (n + 1 - nondiv)
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brilliant explanation....could u give some pointers to materials discussing divisibility,primes,pollards rho etc...btw the result u just derived is a corollary of lucas' theorem –  enjay Aug 11 '12 at 6:16
thank you for your answer! I found this paper, might be useful to someone math.ucsd.edu/~lni/math140/Suppl0.pdf –  Ivor Prebeg Dec 8 '12 at 15:42

what about creating a table[n+1][n+1] and storing all binomial coefficients using DP approach and then finding how many values in table[n][i] , where 0 I tried it , but it failed for the larger test cases . Anything i am missing here ?

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or maybe it is running out of memory since n<=10^500 , maybe , just a guess –  saurav Aug 26 '12 at 22:30

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