($ i*j + (i-1)*(j-1) + (i-2)*(j-2) + ... + (i-i)*(j-i)))

= i*j + i*j-i-j+1 + i*j-2*i-2*j+4 + ... + i*j-i*i-i*j+i*i

= i*j*(i+1) + (1+2+...+i)*(i+j) + 1^2+2^2+...+i^2

= i*j*(i+1) + i*(i+1)*(i+j)/2 + i*(i+1)*(2*i+1)/6

PS: Why TEX markup didn't work?

may be this i*(i+1)*(2i+1)/6 + (i*(i+1ll)/2ll) * (j-i)

Yes, there is. I take it you're trying to solve problem D from last contest, because this is exactly the formula for that one. Consider i ≤ j (the other case is analogous), then you can transform the expression into...

(i² + i * (j - i)) + ((i - 1)² + (i - 1) * (j - i)) + ... + (2² + 2 * (j - i)) + (1² + 1 * (j - i))

That's the sum of squares plus the sum of numbers multiplied by j - i, so we can express it as...

why is votes down :/ ?