It is clear that each maximal ideal in ring of continuous functions over $[0,1]\subset \mathbb R$ corresponds to a point and vice-versa.
So, for each ideal $I$ define $Z(I) =\{x\in [0,1]\,|\,f(x)=0, \forall f \in I\}$. But map $I\mapsto Z(I)$ from ideals to closed sets is not an injection! (Consider the ideal $J(x_0)=\{f\,|\,f(x)=0, \forall x\in\hbox{ some closed interval which contains }x_0\}$)
How can we describe ideals in $C([0,1])$ ? Is it true that prime ideals are maximal for this ring?
Here is a way to construct a non-maximal prime ideal: consider the multiplicative set $S$ of all non-zero polynomials in $C[0,1]$. Use Zorn lemma to get an ideal $P$ that is disjoint from $S$ and is maximal with this property. $P$ is clearly prime (for this you only need $S$ to be multiplicative.) On the other hand $P$ cannot be any one of the maximal ideals, since it does not contain $x-c$ for every $c \in [0,1]$.
There are many prime ideals that are not maximal. You can find some things by Googling "prime ideals in $C(X)$" (e.g. that every maximal ideal is the sum of two proper prime ideals).
The problem is that prime ideals are not closed unless they are maximal. The closed ideals in $C(X)$ for $X$ compact Hausdorff are in 1-1 correspondence with the closed subsets of $X$. This fact is in many books; e.g., it is an exercise in chapter 11 of Rudin's Functional Analysis.
EDIT 8/17: There is a lot of information about prime ideals in $C(X)$ in Chapters 7 and 14 of the book Rings of Continuous Functions by Gillman and Jerison, mentioned already by Yemon.
In answer to your first question, you probably want to think about closed ideals (i.e. closed in the sup norm). (Bars and overlines seem to render poorly, so I'll use a prime to denote closure.) For $A \subset [0,1]$ we let $I(A) = \lbrace f : f = 0 \text{ on } A \rbrace$, which is clearly an ideal.
The following are all true and mostly easy to show:
I found this paper on Project Euclid, Have a look.
PRIME IDEALS IN RINGS OF CONTINUOUS FUNCTIONS by CARL W.KOHLS
http://projecteuclid.org/download/pdf_1/euclid.ijm/1255454113
Let $ \mathbf U\ $ be a non-trivial ultrafilter of sets in an infinite Hausdorff compact space $\ X\ $ (e.g. $\ X:=[0;1]).\ $ Then
$$ J_\mathbf U:=\{f\in C(X): f^{-1}(0)\in\mathbf U\} $$
is a prime ideal; this ideal is contained in exactly one maximal ideal, namely $\ J_\mathbf U\subseteq J_{(x)},\ $ where $\ x\ $ is the (unique) limit point of $\ \mathbf U,\ $ and $\ (x)\ $ is a filter (maximal) with the base $\ \{\{x\}\}$. When $\ \{x\}\ $ is a $\ G_\delta$-set (as for instance for $\ X:=[0;1])\ $ then the inclusion for the said ideals is sharp, $\ J_\mathbf U\subset J_{(x)}$.
I think this paper may be of some help. Although this may not be the earliest source, it has a proposition there which says that given a point $p\in [0,1]$, one can find non-maximal prime ideals $\mathfrak{p}_1,\mathfrak{p}_2$ such that $\mathfrak{m}_p$, the maximal ideal at $p$, is the sum of $\mathfrak{p}_1$ and $\mathfrak{p}_2$. They take a sequence of points $x_n$ converging to $p$ and then use two different ultrafilters on $D= \{ x_n \}_{n\geq 1}$ to define the two prime ideals.
