# How does the computer calculate or store diffie hellman values?

So usually the Diffie-Helmann key is 2048 bits as I understand but my computer can barely calculate a 10 digit number. What are some common numbers in Diffie-Hellmann?

Here is my code that's suuuper slow:

\$gen = 77;
\$mod = 517165;

\$saltA = 1233217;
\$saltB = 5173123;

\$calculatedSecretKeyA = gmp_mod(gmp_pow(\$gen, \$saltA), \$mod);

\$calculatedSecretKeyB = gmp_mod(gmp_pow(\$gen, \$saltB), \$mod);

\$calcKeyA = gmp_mod(gmp_pow(\$calculatedSecretKeyB, \$saltA), \$mod);
echo \$calculatedSecretKeyB . "^" . \$saltA . "" . " mod " . \$mod . " = " . \$calcKeyA;

\$calcKeyB = gmp_mod(gmp_pow(\$calculatedSecretKeyA, \$saltB), \$mod);
echo \$calculatedSecretKeyA . "^" . \$saltB . "" . " mod " . \$mod . " = " . \$calcKeyB;
• It looks like you are trying to implement Diffie Helmann in PHP, and I see you are using GMP to handle the large integers. A few years ago, I had a need to do the same thing. See github.com/meixler/ecdh-php. – mti2935 Feb 5 at 19:03
• @mti2935: Your code seems to do ECDH, Lukas' seems to be trying to do mod p DH. – President James K. Polk Feb 5 at 21:35

Use gmp_powm

gmp_powm ( GMP|int|string \$num , GMP|int|string \$exponent , GMP|int|string \$modulus ) : GMP

for the below lines.

\$calculatedSecretKeyA = gmp_powm(\$gen, \$saltA, \$mod);

\$calculatedSecretKeyB = gmp_powm(\$gen, \$saltB, \$mod);

\$calcKeyA = gmp_powm(\$calculatedSecretKeyB, \$saltA, \$mod);

\$calcKeyB = gmp_powm(\$calculatedSecretKeyA, \$saltB, \$mod);

It uses the modular form of square-and-multiply technique. The intermediate values will never exceed mod^2. Also, it has O(log n) complexity.