Point Group D13

**Characters of symmetric powers**
Power To	E	2C₁₃	2(C₁₃)²	2(C₁₃)³	2(C₁₃)⁴	2(C₁₃)⁵	2(C₁₃)⁶	13C'₂
1	2	-1.497	0.241	1.136	-1.942	1.771	-0.709	0
2	3	1.241	-0.942	0.291	2.771	2.136	-0.497	1
3	4	-0.361	-0.468	-0.806	-3.439	2.012	1.062	0
4	5	-0.701	0.829	-1.206	3.907	1.427	-0.256	1
5	6	1.410	0.668	-0.565	-4.148	0.515	-0.880	0
6	7	-1.410	-0.668	0.565	4.148	-0.515	0.880	1
7	8	0.701	-0.829	1.206	-3.907	-1.427	0.256	0
8	9	0.361	0.468	0.806	3.439	-2.012	-1.062	1
9	10	-1.241	0.942	-0.291	-2.771	-2.136	0.497	0
10	11	1.497	-0.241	-1.136	1.942	-1.771	0.709	1
11	12	-1.000	-1.000	-1.000	-1.000	-1.000	-1.000	0
12	13	-0.000	0.000	-0.000	-0.000	-0.000	-0.000	1
13	14	1.000	1.000	1.000	1.000	1.000	1.000	0
14	15	-1.497	0.241	1.136	-1.942	1.771	-0.709	1
15	16	1.241	-0.942	0.291	2.771	2.136	-0.497	0
16	17	-0.361	-0.468	-0.806	-3.439	2.012	1.062	1
17	18	-0.701	0.829	-1.206	3.907	1.427	-0.256	0
18	19	1.410	0.668	-0.565	-4.148	0.515	-0.880	1
19	20	-1.410	-0.668	0.565	4.148	-0.515	0.880	0
20	21	0.701	-0.829	1.206	-3.907	-1.427	0.256	1

**Decomposition to irreducible representations**
Power To	A₁	A₂	E₁	E₂	E₃	E₄	E₅	E₆
1	0	0	0	0	0	0	1	0	E₅
2	1	0	0	0	1	0	0	0	A₁⊕E₃
3	0	0	0	1	0	0	1	0	E₂⊕E₅
4	1	0	0	0	1	0	0	1	A₁⊕E₃⊕E₆
5	0	0	1	1	0	0	1	0	E₁⊕E₂⊕E₅
6	1	0	0	0	1	1	0	1	A₁⊕E₃⊕E₄⊕E₆
7	0	0	1	1	0	1	1	0	E₁⊕E₂⊕E₄⊕E₅
8	1	0	1	0	1	1	0	1	A₁⊕E₁⊕E₃⊕E₄⊕E₆
9	0	0	1	1	0	1	1	1	E₁⊕E₂⊕E₄⊕E₅⊕E₆
10	1	0	1	1	1	1	0	1	A₁⊕E₁⊕E₂⊕E₃⊕E₄⊕E₆
11	0	0	1	1	1	1	1	1	E₁⊕E₂⊕E₃⊕E₄⊕E₅⊕E₆
12	1	0	1	1	1	1	1	1	A₁⊕E₁⊕E₂⊕E₃⊕E₄⊕E₅⊕E₆
13	1	1	1	1	1	1	1	1	A₁⊕A₂⊕E₁⊕E₂⊕E₃⊕E₄⊕E₅⊕E₆
14	1	0	1	1	1	1	2	1	A₁⊕E₁⊕E₂⊕E₃⊕E₄⊕2E₅⊕E₆
15	1	1	1	1	2	1	1	1	A₁⊕A₂⊕E₁⊕E₂⊕2E₃⊕E₄⊕E₅⊕E₆
16	1	0	1	2	1	1	2	1	A₁⊕E₁⊕2E₂⊕E₃⊕E₄⊕2E₅⊕E₆
17	1	1	1	1	2	1	1	2	A₁⊕A₂⊕E₁⊕E₂⊕2E₃⊕E₄⊕E₅⊕2E₆
18	1	0	2	2	1	1	2	1	A₁⊕2E₁⊕2E₂⊕E₃⊕E₄⊕2E₅⊕E₆
19	1	1	1	1	2	2	1	2	A₁⊕A₂⊕E₁⊕E₂⊕2E₃⊕2E₄⊕E₅⊕2E₆
20	1	0	2	2	1	2	2	1	A₁⊕2E₁⊕2E₂⊕E₃⊕2E₄⊕2E₅⊕E₆

Results for Point Group D₁₃