Details Page for 0.7157

Complete Solution is Known:

Period:   5
Preperiod:   740
Quotient Size:   162
P-Portion Size:   19
Tame?   No

MSV File: q-0.7157.msv

Growth Pattern:

Heap   Q-Size   P-Size
121
262
7102
9265
15426
20568
22609
256410
266610
297210
329611
3310012
4510413
5210614
5312217
5412418
5612819
5713019
11816219

(Click on a heap to see details)

Details for Q118(0.7157):

Q = <a,b,c,d,e,f,g,h,i,j,k,l,m,n,o,p,q,r,s,t,u,v | a2=1, b3=b, c3=c, bd=abc, c2d=d, d2=b2c2, be=ab, e2=b2, bf=ab2c, cf=abc2, df=bc2, f2=b2c2, c2g=g, dg=ab2cg, fg=abcg, g2=b2c2, b2h=h, ch=ab2c, dh=b2c, eh=ah, fh=bc, gh=ab2g, h2=b2c2, bi=b2c, ci=bc2, di=abc2, gi=bcg, hi=abc, i2=b2c2, bj=ab2g, c2j=j, dj=bcg, ej=bg, fj=b2cg, gj=abc2, hj=bg, ij=ab2cg, j2=b2c2, bk=bg, ck=b2cg, dk=ab2cg, ek=ab2g, fk=abcg, gk=b2c2, hk=ab2g, jk=abc2, k2=b2c2, bl=abg, cl=ab2cg, dl=b2cg, el=b2g, gl=ab2c2, hl=b2g, il=abcg, jl=bc2, kl=aefi, l2=b2c2, bm=ab2cg, cm=abg, dm=bg, em=bcg, gm=abc, hm=bcg, im=ab2g, jm=b2c, km=abc, lm=aei, m2=b2c2, b2cn=cn, c2n=b2n, dn=acn, en=ab2n, b2gn=gn, hn=ab2n, in=bcn, jn=abgn, ln=agn, fmn=kn, n2=b2c2, bo=abn, c2o=o, do=cn, eo=b2n, fo=bcn, go=agn, ho=b2n, io=abcn, jo=bgn, ko=agn, lo=gn, mo=bcgn, no=ab2c2, o2=b2c2, bp=b2n, cp=bcn, dp=abcn, ep=abn, fp=acn, gp=bgn, hp=abn, ip=cn, jp=agn, kp=bgn, mp=acgn, np=bc2, op=abc2, p2=b2c2, bq=bcn, cq=b2n, dq=ab2n, eq=acn, fq=abn, gq=cgn, hq=acn, iq=bn, jq=abcgn, kq=cgn, lq=acgn, mq=abgn, nq=b2c, oq=ab2c, pq=bc, q2=b2c2, b2r=r, cr=ab2c, dr=b2c, er=ar, fr=bc, gr=ab2g, ir=abc, jr=bg, kr=ab2g, lr=b2g, mr=bcg, nr=ab2n, or=b2n, pr=abn, qr=acn, r2=b2c2, bs=bcg, cs=b2g, ds=ab2g, es=ab2cg, fs=abg, gs=b2c, hs=ab2cg, is=bg, js=abc, ks=b2c, ls=ab2c, ms=abc2, ns=cgn, os=acgn, ps=bcgn, qs=gn, rs=ab2cg, s2=b2c2, bt=b2n, ct=bcn, dt=abcn, et=abn, gt=bgn, ht=abn, it=cn, jt=agn, kt=bgn, lt=abgn, mt=acgn, nt=bc2, ot=abc2, pt=b2c2, qt=bc, rt=abn, st=bcgn, t2=b2c2, bu=b2c, cu=bc2, du=abc2, eu=abc, fu=aefi, gu=bcg, hu=abc, iu=b2c2, ju=ab2cg, ku=bcg, lu=abcg, mu=ab2g, nu=bcn, ou=abcn, pu=cn, qu=bn, ru=abc, su=bg, tu=cn, u2=b2c2, b2v=v, c2v=v, dv=acv, ev=av, fv=abcv, hv=av, iv=bcv, jv=abgv, kv=gv, lv=agv, mv=abcgv, ov=anv, pv=bnv, qv=cnv, rv=av, sv=cgv, tv=bnv, uv=bcv, v2=b2c2>

P = {a, b2, c2, b2c2, acd, ce, aceg, ah, ei, afi, cj, ik, kn, co, alp, aq, br, as, aft}

Phi = 1 a b a b ab a c d e d bc f b ab2 g bc2 h b2g aef i d j h b2c k l bc2 ab2c2 m ab2c2 b2cg n o aef bc2 bg b2g cn ab2c2 bc2 b2cg bc2 bcg abcg p b2c bg b2g cn bc2 abcg q r s b2n t u abg abn agn cn ab2g ab2c2 cn ab2c2 b2cg cn b2c b2cg b2g abc agn abcg aefi abg cn b2cg cn bc2 abcg bcg abcg b2cg cn b2cg bc2 cn abcn bn cn agn b2cg b2n bc2 abcg ab2c2 bc2 cn b2g cn ab2c2 b2cg bg ab2c2 abcn abcg b2g bc2 cn ab2c2 bc2 abcn agn b2g cn b2cg bc2 v agn bn ab2c2 b2n cn v cn abcg agn b2cg b2n agn b2cg abcg bc2 v bc2 b2cg agn ab2c2 abcn ab2c2 ab2c agn abc ab2c ab2c2 cn ab2c2 abcn v abcn b2cg cn b2cg bn abcg v agn v b2cg ab2c2 cn b2cg abcg agn b2cg abcg b2cg v agn cn agn abcn bc2 ab2c2 v agn abcg agn bn abcn bgn cn v ab2c2 cn ab2c2 b2cg bgn ab2c2 abcg bc2 ab2c2 agn b2cg ab2c2 bc2 b2cg ab2c2 abcg b2cg abcg bc2 b2cg cn abcn ab2c2 cn agn cn abcg b2cg bgn b2cg agn abcg b2n cn ab2c2 cn ab2c2 bgn cn bc2 bgn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg bc2 ab2c2 b2cg ab2c2 b2cg agn cn b2cg bgn b2cg agn abcn ab2c2 cn v b2cg cn ab2c2 b2cg v b2cg cn bc2 ab2c2 bc2 abcg ab2c2 b2cg cn b2cg cn abcg b2cg cgn ab2c2 agn ab2c2 cn agn ab2c2 abcn ab2c2 b2cg abcg ab2c2 b2cg ab2c2 cn abcn v b2cg agn abcg b2cg agn ab2c2 b2cg ab2c2 cn b2cg bc2 agn b2cg cn ab2c2 b2cg abcg b2cg bc2 cn ab2c2 agn cn ab2c2 abcn cn abcn b2cg cn ab2c2 b2cg ab2c2 agn b2cg ab2c2 agn ab2c2 cn b2cg cn b2cg ab2c2 bgn ab2c2 cn b2cg cn b2cg bc2 cn ab2c2 cn ab2c2 b2cg agn ab2c2 abcn agn ab2c2 cn b2cg ab2c2 agn b2cg ab2c2 bc2 b2cg ab2c2 bc2 ab2c2 cn b2cg ab2c2 b2cg abcn cn b2cg cn b2cg ab2c2 bgn ab2c2 v bc2 b2cg agn b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 abcn ab2c2 b2cg cn b2cg cn bgn b2cg ab2c2 abcg ab2c2 bc2 cn ab2c2 cn ab2c2 b2cg cn ab2c2 cn agn ab2c2 cn ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg agn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 abcg b2cg ab2c2 b2cg ab2c2 abcg cn ab2c2 cn ab2c2 b2cg agn ab2c2 agn abcg ab2c2 cn v ab2c2 bc2 ab2c2 b2cg cn ab2c2 b2cg cn ab2c2 b2cg cn ab2c2 b2cg ab2c2 abcn b2cg ab2c2 cn ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg cn b2cg bc2 cn ab2c2 abcn ab2c2 bc2 b2cg ab2c2 cn b2cg ab2c2 abcg b2cg cn bc2 b2cg ab2c2 bc2 ab2c2 cn bc2 ab2c2 b2cg abcn ab2c2 b2cg cn ab2c2 b2cg agn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 cn ab2c2 b2cg cn b2cg cn agn b2cg ab2c2 abcg ab2c2 cn agn ab2c2 cn ab2c2 b2cg cn ab2c2 b2cg ab2c2 abcn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 bn b2cg ab2c2 abcg ab2c2 cn b2cg ab2c2 abcg ab2c2 cn agn ab2c2 b2cg agn ab2c2 cn abcg ab2c2 bc2 agn ab2c2 cn ab2c2 b2cg cn ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn agn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg agn ab2c2 b2cg bgn b2cg bc2 cn ab2c2 bc2 ab2c2 b2cg bc2 ab2c2 b2cg cn ab2c2 b2cg cn ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn ab2c2 b2cg ab2c2 b2cg cn agn b2cg cn b2cg ab2c2 cn ab2c2 cn agn ab2c2 cn ab2c2 b2cg cn ab2c2 b2cg ab2c2 abcn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 bn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 agn cn ab2c2 b2cg ab2c2 agn b2cg ab2c2 v ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 agn b2cg cn b2cg ab2c2 cn ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg ab2c2 cn b2cg ab2c2 b2cg

Monoid Structure

Idempotent  |G|  |Arch|
122
b246
c244
b2c2 *64150