In my book is stated (in Dutch, but I tried to translate it to English):
Let $V$ be a $K$-vectorspace and $q_1, \dots, q_r$ a set of projection-operators on $V : \sum^r_{i=1}{q_i} = 1_V$ and $\forall i \neq j, q_i q_j = 0$. Let $V_i =$ im $q_i$. Then $V = V_1 \oplus \dots \oplus V_r$
I am confused by the notation $1_V$, what does it mean?