Group of Order 15 is Cyclic Group/Proof 2

Proof
From Number of Sylow p-Subgroups in Group of Order 15:
 * the number of Sylow $3$-subgroups is in the set $\set {1, 4, 7, \ldots}$
 * the number of Sylow $5$-subgroups is in the set $\set {1, 6, 11, \ldots}$.

From the Fifth Sylow Theorem
 * the number of Sylow $3$-subgroups is a divisor of $15$
 * the number of Sylow $5$-subgroups is a divisor of $15$.

Combining the above:
 * there is a unique Sylow $3$-subgroup in $G$, which we will denote $P$
 * there is a unique Sylow $5$-subgroup in $G$, which we will denote $Q$.

Let $x \in G$ be of order $3$.

Then by Non-Trivial Group has Non-Trivial Cyclic Subgroup, $\gen x$ has $3$ elements.

Thus $\gen x$ is a Sylow $3$-subgroup and so:
 * $\gen x = P$

and so $x$ is one of the $2$ non-identity elements of $P$.

Similarly, let $y \in G$ be of order $5$.

Then by a similar argument:
 * $\gen y = Q$

and so $y$ is one of the $4$ non-identity elements of $Q$.

So $G$ has:
 * $1$ element of order $1$ (that is, the identity)
 * $2$ elements of order $3$
 * $4$ elements of order $5$

which leaves $8$ elements whose order is still to be determined.

From Order of Element Divides Order of Finite Group, they are all of order $1$, $3$, $5$ or $15$.

As the elements of order $1$, $3$ and $5$ have been accounted for, they must all be of order $15$.

So $G$ has $8$ distinct elements of order $15$.

Hence $G$ must be cyclic.