if the real sequence (|d(xn, )| converges to 0 in R.
Given
> 0 there exists N 
N such that if n > N then we have d(xn, ) < .
- For R with its usual metric this is the same as before.
- In C with the metric d(z, w) = |z - w|, consider the sequence (z, z2, z3, ...) with |z| < 1.
Then this sequence converges to 0 C.
e.g. Take z = (1+i)/2 so that |z| = 1/
2
The points lie on a spiral.
Proof that the sequence converges
Look at the real sequence (d(xn, 0)) = (|zn- 0|) = (|z|n)
0 since |z| < 1.
- Look at the sequence in R2 given in the following way.
x1= 23, y1= 3 and then define the later terms by 2/xn+1= 1/xn+ 1/yn and yn+1= (xn+1yn).
This gives a sequence which evaluates numerically to:
( (3.4642, 3.0000), (3.2154, 3.1057), (3.1596, 3.1325), (3.1460, 3.1392), (3.1426, 3.1408), 3.1418, 3.1414), ...)
This sequence is based on the method used by Archimedes to calculate p.
Start with x1= the semiperimeter of the "outside hexagon"
Start with y1= the semiperimeter of the "inside hexagon"
and then double the number of sides to get a 12-gon , a 24-gon, etc.
Archimedes took the calculation up to n = 5 (corresponding to a 96-gon).In fact the sequence in R2 converges to the point (p, p).
Theorem
That is ((x1 , y1), (x2 , y2), ... ) ( , 
) if and only if
(x1 , x2 , ... ) and (y1 , y2 , ... ) .
) Given > 0 we know that we have N so that if n > N then (|xn- |2+ |yn- |2) < . But then we must have |xn- | < and so (xn) . Similarly for the other component.
Conversely: Given > 0 choose N so that if n > N then |xn- | < and |yn- | < . But then (|xn- |2+ |yn- |2) < (2+ 2) = 2 and so we may make this as small as we like.