Let S~p U S~q be a topological space consisting of two spheres S~p and S~q with a single common point. Denote the product of S~q and [S~q, S~p] ,by [S~q, [S~q, S~p]] and define [(s~q)~t,[S~q,s~p]]= [S~q, [(S~q)~(t-1),[S~q,s~p]]], t>1. By i: π_r(S~p)→π_r, (S~p U S~q)and j: π_r, (S~q)→π_r, (S~p U S~q), we mean injection isomorphisms (into). In [1], the author has determined the algebraic structure of the group π_r(S~p U S~q), if r≦2(p+q)-4. The purpose of this note is to find the geometrical representatives of the elements of π_r,(S~p U S~q). The author has proved the followingTheorem. If r≦2(p+q)-4, p≧q≧2, then π_r,(S~p U S~q) is the direct sum of the following groups: i π_r(S~p), j π_r(S~q), [S~p, [S~p,S~q]] o π_r(S~(2p+q-2) and[(S~q)~(t-1), [S~q, S~p]] o π_r,(S~(p+tq-t), t=1,2,…,to, where to is the maximal integer such that p+tq-t≦r.