# Extrapolate userbase growth rate linear + viral

Assume you have n users and know that n grows by a fixed number of users c per day and viral growth rate of k per day, where k is expressed as a percentage of n.

How can you tell how many days it will take for the userbase to grow to size x, where x > n?

This is a compound interest problem, but I don't know how to do it with the addition of the constant factor c.

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Assuming you don't mind fractional users... If k is expressed as a decimal (so a growth rate of 5% is k=1.05), then the formula is:

days=logk(((1-k) x - c) / ((1-k) n - c))

For instance, suppose your initial userbase is 5; you grow constantly by 3 users per day, and virally by 5% per day; and your target is 35 users. Then

days=log1.05(((-0.05)*35 - 3) / ((-0.05)*5 - 3)) = 7.78.

Running the process in Excel, you can see that, indeed, day 7 gives you 31.5 users, and day 8 36 users.

Derivation:

Denote the number of users after d days as n_d. Then:

n1 = kn + c

n2 = kn1 + c = k( kn + c) + c = k2n + (k + 1)c

n3 = kn2 + c = k( k2n + (k + 1)c) + c = k3n + (k2 + k + 1)c

...

nd = kdn + SUMi=0,d-1(kic)

Now, the SUM is a geometric series. The sum of that geometric series is easily derivable (or found on Wikipedia!) to be c(1 - kd)/(1 - k).

So:

nd = kdn + c(1 - kd)/(1 - k)

= kdn + c/(1 - k) - ckd/(1 - k)

= kd( n - c/(1 - k)) + c/(1 - k)

So

kd = (nd - c/(1 - k)) / (n - c/(1 - k))

= ((1 - k) nd - c) / ((1 - k) n - c)

So

d = logk(((1 - k) nd - c) / ((1 - k) n - c))

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wait, in the example you put 1-k as equal to both -0.05 and -0.95 –  ʞɔıu Mar 22 '11 at 16:48
Frankly, if that's the only typo I've made, I'll be astonished. SO is not built for writing maths. –  Chowlett Mar 22 '11 at 16:56