Fundamental Group of $mathbb{RP}^n$

Your result for $n=2$ is correct, but the process seems to be unclear to me. In general, we can proceed inductively to find the fundamental group.

The real projective space $Bbb{RP}^n$ is homeomorphic to $D^n/{(xsim-x)}$ where $xinpartial D^napprox S^{n-1}$. Now, let $U$ be a smaller open $n$-ball $subset D^n$, then $pi_1(U)=1$. Let $V$ be an enlargement of $D^nsetminus A$ (open), then $Vsimeq S^{n-1}/(xsim-x)$ by deformation retraction. You may find that $Vapprox Bbb{RP}^{n-1}$ because the most typical definition for real projective spaces is $S^n/(xsim-x)$.

By Seifert Van-Kampen's Theorem, we conclude that $pi_1(Bbb{RP}^n,x_0)cong pi_1(U)*pi_1(V)/N$, but $pi_1(Ucap V)=1implies N=e$ (for the reason that $Ucap Vapprox S^n, nge 2$ is simply connected), so this reduces to $pi_1(Bbb{RP}^n)congpi_1(V)$. Because $VsimeqBbb{RP}^{n-1}$, $pi_1(Bbb{RP}^{n})congpi_1(Bbb{RP}^{n-1})$. Inductively, it should be $Bbb{Z}/2$.

However, the case is different when $n=1,2$ because $Bbb{RP}^1approx S^1$ and hence has a fundamental group isomorphic to $Bbb{Z}$ and $Bbb{RP}^2$ doesn't follow the induction due to the reason that $pi_1(Ucap V)cong Bbb{Z}$.

In sum, $$pi_1(Bbb{RP}^n)cong begin{cases} Bbb{Z} & n=1\ Bbb{Z}/2 & nge2 end{cases}$$

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Remark: I explored the last statement made by Ted Shifrin in details.

Your writing is way too sloppy, confusing spaces and their fundamental groups. And you really need to consider the image of $Bbb Zcongpi_1(Acap B)topi_1(A)congBbb Z$. Van Kampen says you mod out by that image. That gives you $pi_1(Bbb RP^2)congBbb Z/2Bbb Z$.

In general, you proceed by induction. You get that $pi_1(Bbb RP^n) congpi_1(Bbb RP^{n-1})$ for $nge 3$, because $pi_1(Acap B) ={1}$.