Each of the sets $\(\mathrm{F}_0, \mathrm{~F}_1, \mathrm{~F}_2, \mathrm{~F}_3, \ldots \ldots \ldots . . . . . . . . . \mathrm{F}_9\)$ satisfy the condition that each of them contain all the integers that are ending with the digit of their set number. For example $\(\mathrm{F}_5\)$ has integers $\(5,15,25,35\)$, ....... etc. The cubes of all the numbers of set $\(\mathrm{F}_7\)$ are present in which of the following set?

(A) None

(B) $\(\mathrm{F}_2\)$

(C) $\(\mathrm{F}_3\)$

(D) $\(\mathrm{F}_7\)$

(E) $\(\mathrm{F}_9\)$