I have the following question to problem 2.1.17 in Allen Hatcher's "Algebraic Topology".
Compute the groups $H_n(X,A)$ and $H_n(X,B)$ where $X$ is a closed orientable surface of genus two and $A$ and $B$ are the circles shown in the picture on page 132 of Hatcher (page 141 of the pdf).
So far I came up with the following exact sequences (for A and B):
$ \begin{aligned} 0&\rightarrow H_{2}(A) \rightarrow H_{2}(X) \rightarrow H_{2}(X,A)\rightarrow\\ &\rightarrow H_{1}(A) \rightarrow H_{1}(X) \rightarrow H_{1}(X,A)\rightarrow\\ &\rightarrow H_{0}(A) \rightarrow H_{0}(X) \rightarrow H_{0}(X,A) \rightarrow 0 \end{aligned} $ and $ \begin{aligned} 0&\rightarrow H_{2}(B) \rightarrow H_{2}(X) \rightarrow H_{2}(X,B)\rightarrow\\ &\rightarrow H_{1}(B) \rightarrow H_{1}(X) \rightarrow H_{1}(X,B)\rightarrow\\ &\rightarrow H_{0}(B) \rightarrow H_{0}(X) \rightarrow H_{0}(X,B) \rightarrow 0, \end{aligned} $ where $H_{2}(A) = H_{2}(B) = 0$, $H_{1}(A) = H_{1}(B) = \mathbb{Z} = H_{0}(A) = H_{0}(B)$ and for $X$ there is $H_{2}(X) = H_{0}(X) = \mathbb{Z}$ and $H_{1}(X) = \mathbb{Z}^{4}$. Furthermore I know that the mappings $H_{1}(A) \rightarrow H_{1}(X)$ is zero and that $H_{1}(B) \rightarrow H_{1}(X)$ is injective. By these I could deduce that $H_{0}(X,A) = 0$ and $H_{1}(X,A) = \mathbb{Z}^{4}$ and $H_{0}(X,B) = 0$. But I can't go on further. What about the other relative homology groups? What do I need more? Hope this question is not too trivial and apologize. Hope someone to help.
mika