What is the function $E(x)$?

Question

When reading Problems in Calculus of One Variable (a translated Russian book), I came across unfamiliar notation "$E(x)$". It is neither expected value nor $exp(x)$. Here is a picture of the function used in context, which I hope someone can deduce what it means from
$$intlimits_0^x E(x)mathrm d x=frac{E(x)(E(x)-1)}{2}+E(x)[x-E(x)]$$
It is not defined in the book, nor specific to context, and also used in multiple instances.

LL 3.14 · Answer

I think it is the floor, $E(x) = lfloor xrfloor$. If $x$ is an integer, then you find the expression for the sum of integers, and if $x$ is not an integer, you add the missing part of the rectangle.
In French, the notation $E(x)$ is used for the floor since it is called "partie entière".

Z Ahmed · Answer

$E(x)$ the floor or the greatest integer function : $E(x)=[x]$, $x=[x]+q$, where $[x]$ is integer $n$ and $q=x-[x]$ is the fractional part.
$$S=int_{0}^{x} [t] dt=int_{0}^{1} 0 dt+ int_{1}^{2} 1 dt+int_{2}^{3} 2 dt+.......+int_{n-1}^{n} (n-1) dt+int_{n}^{n+q} n dx$$
$$S=1+2+3+4+...+(n-1)+nq=n(n-1)+nq=n(n-1)/2+nq$$ $$ implies S=[x]([x]-1)/2+[x](x-[x]).$$

What is the function $E(x)$?

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