71:@0.911172:0.510692:0.930079:0.510692:0.930079:0.494068:0.911172:0.494068:0.000000:0.000000
Actividad resuelta :@0.120102:0.196634:0.272921:0.196634:0.272921:0.179499:0.120102:0.179499:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Factorizamos::@0.120102:0.220353:0.225508:0.220353:0.225508:0.203729:0.120102:0.203729:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
   – 12  + 16.:@0.225508:0.220353:0.325229:0.220358:0.325229:0.203969:0.225508:0.203964:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.229544:0.220353:0.237007:0.220353:0.237007:0.203992:0.229544:0.203992:0.000000
3:@0.237007:0.214311:0.242250:0.214311:0.242250:0.204756:0.237007:0.204756:0.000000
x:@0.277519:0.220358:0.284983:0.220358:0.284983:0.203997:0.277519:0.203997:0.000000
Factorización por evaluación:@0.121225:0.103970:0.411481:0.103970:0.411481:0.082460:0.121225:0.082460:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Esta técnica de factorización es factible para polinomios de una sola variable de la forma :@0.121225:0.123188:0.889858:0.123188:0.889858:0.106799:0.121225:0.106799:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 :@0.885769:0.123188:0.889804:0.123188:0.889804:0.106799:0.885769:0.106799:0.000000
kx:@0.121225:0.139784:0.136261:0.139784:0.136261:0.123423:0.121225:0.123423:0.000000:0.000000
n:@0.136261:0.133737:0.141805:0.133737:0.141805:0.124198:0.136261:0.124198:0.000000
 + :@0.141805:0.139784:0.160859:0.139784:0.160859:0.123395:0.141805:0.123395:0.000000:0.000000:0.000000
mx:@0.160859:0.139784:0.182954:0.139784:0.182954:0.123423:0.160859:0.123423:0.000000:0.000000
n – 1:@0.182952:0.133737:0.202698:0.133737:0.202698:0.124198:0.182952:0.124198:0.000000:0.000000:0.000000:0.000000:0.000000
 + ... +  , que son divisibles para un binomio   ±    donde   es un divisor de  .:@0.202698:0.139784:0.768629:0.139784:0.768629:0.123395:0.202698:0.123395:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
p:@0.250426:0.139784:0.259695:0.139784:0.259695:0.123423:0.250426:0.123423:0.000000
x:@0.527541:0.139784:0.535004:0.139784:0.535004:0.123423:0.527541:0.123423:0.000000
a:@0.554058:0.139784:0.563327:0.139784:0.563327:0.123423:0.554058:0.123423:0.000000
a:@0.624101:0.139784:0.633370:0.139784:0.633370:0.123423:0.624101:0.123423:0.000000
p:@0.756154:0.139784:0.765423:0.139784:0.765423:0.123423:0.756154:0.123423:0.000000
Para determinar los factores del polinomio, se utiliza la división sintética.:@0.121230:0.159949:0.646539:0.159949:0.646539:0.143560:0.121230:0.143560:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a):@0.130020:0.275375:0.144927:0.275375:0.144927:0.258475:0.130020:0.258475:0.000000:0.000000
  :@0.144927:0.275375:0.152999:0.275375:0.152999:0.258986:0.144927:0.258986:0.000000:0.000000
Escribimos:@0.155155:0.275375:0.237766:0.275375:0.237766:0.258751:0.155155:0.258751:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 los coeficientes del polinomio :@0.237766:0.275375:0.499621:0.275375:0.499621:0.258986:0.237766:0.258986:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
y :@0.155155:0.291972:0.167299:0.291972:0.167299:0.275583:0.155155:0.275583:0.000000:0.000000
ensayamos:@0.173877:0.291972:0.259640:0.291972:0.259640:0.275348:0.173877:0.275348:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 la división sintética para los :@0.259640:0.291972:0.499660:0.291972:0.499660:0.275583:0.259640:0.275583:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
divisores del término independiente, hasta :@0.155155:0.308568:0.499639:0.308568:0.499639:0.292179:0.155155:0.292179:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
obtener un residuo cero.:@0.155155:0.325164:0.335246:0.325164:0.335246:0.308776:0.155155:0.308776:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
1:@0.525989:0.286558:0.534982:0.286558:0.534982:0.270169:0.525989:0.270169:0.000000
0 – 12     16:@0.563987:0.286558:0.659516:0.286558:0.659516:0.270169:0.563987:0.270169:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
2:@0.677962:0.286558:0.686955:0.286558:0.686955:0.270169:0.677962:0.270169:0.000000
2:@0.563987:0.308659:0.572980:0.308659:0.572980:0.292270:0.563987:0.292270:0.000000
4 – 16:@0.601985:0.308659:0.660087:0.308659:0.660087:0.292270:0.601985:0.292270:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
1:@0.526008:0.330759:0.535000:0.330759:0.535000:0.314371:0.526008:0.314371:0.000000
2:@0.564005:0.330759:0.572998:0.330759:0.572998:0.314371:0.564005:0.314371:0.000000
– 8     0:@0.595369:0.330759:0.657047:0.330759:0.657047:0.314371:0.595369:0.314371:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
± 1, ± 2, ± 4, ± 8, ± 16:@0.713527:0.266448:0.871544:0.266448:0.871544:0.250060:0.713527:0.250060:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
b):@0.130053:0.370964:0.146269:0.370964:0.146269:0.354064:0.130053:0.354064:0.000000:0.000000
  El divisor es un factor del polinomio de la forma :@0.146269:0.370964:0.499739:0.370964:0.499739:0.354575:0.146269:0.354575:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x a:@0.155188:0.387561:0.189943:0.387561:0.189943:0.371199:0.155188:0.371199:0.000000:0.000000:0.000000
 ±  , en   este caso   – 2 (ya que resultó   = 2 ).:@0.162652:0.387561:0.495731:0.387561:0.495731:0.371172:0.162652:0.371172:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
n:@0.219003:0.387561:0.228512:0.387561:0.228512:0.371199:0.219003:0.371199:0.000000
x:@0.302665:0.387561:0.310128:0.387561:0.310128:0.371199:0.302665:0.371199:0.000000
x:@0.449644:0.387561:0.457107:0.387561:0.457107:0.371199:0.449644:0.371199:0.000000
 :@0.130053:0.407725:0.134089:0.407725:0.134089:0.391336:0.130053:0.391336:0.000000
El otro factor es un polinomio de un grado  :@0.155188:0.407725:0.499675:0.407725:0.499675:0.391336:0.155188:0.391336:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
n:@0.155188:0.424321:0.164697:0.424321:0.164697:0.407960:0.155188:0.407960:0.000000
 – 1 del polinomio inicial, cuyos coeficientes :@0.164697:0.424321:0.499638:0.424321:0.499638:0.407933:0.164697:0.407933:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
son los números que preceden al residuo de la :@0.155188:0.440918:0.499693:0.440918:0.499693:0.424529:0.155188:0.424529:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
división sintética. :@0.155188:0.457514:0.284180:0.457514:0.284180:0.441125:0.155188:0.441125:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.514214:0.414239:0.521677:0.414239:0.521677:0.397878:0.514214:0.397878:0.000000
3:@0.521637:0.408186:0.526880:0.408186:0.526880:0.398631:0.521637:0.398631:0.000000
 – 12  + 16 = (  – 2)(  + 2  – 8):@0.526879:0.414233:0.753472:0.414233:0.753472:0.397844:0.526879:0.397844:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.562149:0.414233:0.569612:0.414233:0.569612:0.397872:0.562149:0.397872:0.000000
x:@0.630590:0.414233:0.638053:0.414233:0.638053:0.397872:0.630590:0.397872:0.000000
x:@0.674097:0.414233:0.681560:0.414233:0.681560:0.397872:0.674097:0.397872:0.000000
2:@0.681559:0.408186:0.686801:0.408186:0.686801:0.398631:0.681559:0.398631:0.000000
x:@0.714847:0.414233:0.722311:0.414233:0.722311:0.397872:0.714847:0.397872:0.000000
c):@0.130009:0.484325:0.143830:0.484325:0.143830:0.467424:0.130009:0.467424:0.000000:0.000000
   Si el segundo factor es factorizable, se puede :@0.143830:0.484325:0.499649:0.484325:0.499649:0.467936:0.143830:0.467936:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
aplicar cualquiera de los métodos anteriores, :@0.155145:0.500921:0.499648:0.500921:0.499648:0.484532:0.155145:0.484532:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
incluso el de evaluación para factorarlo.:@0.155145:0.517518:0.444269:0.517518:0.444269:0.501129:0.155145:0.501129:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.514170:0.490839:0.521634:0.490839:0.521634:0.474478:0.514170:0.474478:0.000000
3:@0.521637:0.484795:0.526880:0.484795:0.526880:0.475241:0.521637:0.475241:0.000000
 – 12  + 16 = (  – 2)(  + 4)(  – 2):@0.526879:0.490843:0.757998:0.490843:0.757998:0.474454:0.526879:0.474454:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.562149:0.490843:0.569612:0.490843:0.569612:0.474482:0.562149:0.474482:0.000000
x:@0.630590:0.490843:0.638053:0.490843:0.638053:0.474482:0.630590:0.474482:0.000000
x:@0.674097:0.490843:0.681560:0.490843:0.681560:0.474482:0.674097:0.474482:0.000000
x:@0.719374:0.490843:0.726837:0.490843:0.726837:0.474482:0.719374:0.474482:0.000000
x:@0.514182:0.511007:0.521645:0.511007:0.521645:0.494646:0.514182:0.494646:0.000000
3:@0.521637:0.504956:0.526880:0.504956:0.526880:0.495401:0.521637:0.495401:0.000000
 – 12  + 16 = (  – 2) (  + 4):@0.526879:0.511004:0.722084:0.511004:0.722084:0.494615:0.526879:0.494615:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.562149:0.511004:0.569612:0.511004:0.569612:0.494642:0.562149:0.494642:0.000000
x:@0.630590:0.511004:0.638053:0.511004:0.638053:0.494642:0.630590:0.494642:0.000000
2 :@0.669212:0.504956:0.676808:0.504956:0.676808:0.495401:0.669212:0.495401:0.000000:0.000000
x:@0.681691:0.511004:0.689154:0.511004:0.689154:0.494642:0.681691:0.494642:0.000000
1. :@0.119961:0.646140:0.138702:0.646140:0.138702:0.629004:0.119961:0.629004:0.000000:0.000000:0.000000
Factoriza:@0.153205:0.646140:0.222014:0.646140:0.222014:0.629516:0.153205:0.629516:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 los siguientes polinomios.:@0.222014:0.646140:0.415336:0.646140:0.415336:0.629751:0.222014:0.629751:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Taller:@0.180593:0.604901:0.241488:0.604901:0.241488:0.570954:0.180593:0.570954:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Aplica las propiedades algebraicas de los números reales en productos notables y factorización. (Ref. I.M.5.1.1.):@0.261615:0.592928:0.772925:0.592928:0.772925:0.582499:0.261615:0.582499:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a):@0.152143:0.679136:0.167051:0.679136:0.167051:0.662236:0.152143:0.662236:0.000000:0.000000
x:@0.183967:0.679136:0.191430:0.679136:0.191430:0.662775:0.183967:0.662775:0.000000
3:@0.191422:0.673089:0.196665:0.673089:0.196665:0.663534:0.191422:0.663534:0.000000
 – 2  –   + 2 =:@0.196666:0.679136:0.303462:0.679136:0.303462:0.662747:0.196666:0.662747:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.222943:0.679136:0.230407:0.679136:0.230407:0.662775:0.222943:0.662775:0.000000
2:@0.230407:0.673089:0.235649:0.673089:0.235649:0.663534:0.230407:0.663534:0.000000
x:@0.252934:0.679136:0.260397:0.679136:0.260397:0.662775:0.252934:0.662775:0.000000
b):@0.152143:0.818080:0.168359:0.818080:0.168359:0.801180:0.152143:0.801180:0.000000:0.000000
m:@0.183967:0.818080:0.198599:0.818080:0.198599:0.801719:0.183967:0.801719:0.000000
3:@0.198590:0.812032:0.203833:0.812032:0.203833:0.802477:0.198590:0.802477:0.000000
 – 4:@0.203834:0.818080:0.230112:0.818080:0.230112:0.801692:0.203834:0.801692:0.000000:0.000000:0.000000:0.000000
m:@0.230112:0.818080:0.244743:0.818080:0.244743:0.801719:0.230112:0.801719:0.000000
2:@0.244742:0.812032:0.249984:0.812032:0.249984:0.802477:0.244742:0.802477:0.000000
 +   + 6 =:@0.249985:0.818080:0.326736:0.818080:0.326736:0.801692:0.249985:0.801692:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.269039:0.818080:0.283671:0.818080:0.283671:0.801719:0.269039:0.801719:0.000000
d):@0.546484:0.818080:0.562737:0.818080:0.562737:0.801180:0.546484:0.801180:0.000000:0.000000
x:@0.578309:0.818080:0.585772:0.818080:0.585772:0.801719:0.578309:0.801719:0.000000
3:@0.585763:0.812032:0.591006:0.812032:0.591006:0.802477:0.585763:0.802477:0.000000
 – 4  – 3  – 10 =:@0.591007:0.818080:0.714020:0.818080:0.714020:0.801692:0.591007:0.801692:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.617285:0.818080:0.624748:0.818080:0.624748:0.801719:0.617285:0.801719:0.000000
2:@0.624746:0.812032:0.629989:0.812032:0.629989:0.802477:0.624746:0.802477:0.000000
x:@0.656268:0.818080:0.663731:0.818080:0.663731:0.801719:0.656268:0.801719:0.000000
c):@0.546484:0.679136:0.560305:0.679136:0.560305:0.662236:0.546484:0.662236:0.000000:0.000000
x:@0.578309:0.679136:0.585772:0.679136:0.585772:0.662775:0.578309:0.662775:0.000000
3:@0.585763:0.673089:0.591006:0.673089:0.591006:0.663534:0.585763:0.663534:0.000000
 – 3  – 6  + 8 =:@0.591007:0.679136:0.706796:0.679136:0.706796:0.662747:0.591007:0.662747:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.617285:0.679136:0.624748:0.679136:0.624748:0.662775:0.617285:0.662775:0.000000
2:@0.624746:0.673089:0.629989:0.673089:0.629989:0.663534:0.624746:0.663534:0.000000
x:@0.656268:0.679136:0.663731:0.679136:0.663731:0.662775:0.656268:0.662775:0.000000
(  – 1)(  + 1)(  – 2):@0.191487:0.710884:0.323779:0.710884:0.323779:0.694495:0.191487:0.694495:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.196371:0.710884:0.203834:0.710884:0.203834:0.694523:0.196371:0.694523:0.000000
x:@0.239878:0.710884:0.247342:0.710884:0.247342:0.694523:0.239878:0.694523:0.000000
x:@0.285155:0.710884:0.292618:0.710884:0.292618:0.694523:0.285155:0.694523:0.000000
(  + 1)(  – 2)(  – 3):@0.189811:0.848385:0.343608:0.848385:0.343608:0.831996:0.189811:0.831996:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.194694:0.848385:0.209325:0.848385:0.209325:0.832024:0.194694:0.832024:0.000000
m:@0.247139:0.848385:0.261770:0.848385:0.261770:0.832024:0.247139:0.832024:0.000000
m:@0.297815:0.848385:0.312446:0.848385:0.312446:0.832024:0.297815:0.832024:0.000000
(  + 2)(  – 4)(  – 1):@0.590225:0.710317:0.722517:0.710317:0.722517:0.693928:0.590225:0.693928:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.595108:0.710317:0.602571:0.710317:0.602571:0.693956:0.595108:0.693956:0.000000
x:@0.640385:0.710317:0.647848:0.710317:0.647848:0.693956:0.640385:0.693956:0.000000
x:@0.683892:0.710317:0.691356:0.710317:0.691356:0.693956:0.683892:0.693956:0.000000
(  – 5)(  +   + 2):@0.588548:0.849644:0.709093:0.849648:0.709093:0.833259:0.588548:0.833255:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.593431:0.849644:0.600894:0.849644:0.600894:0.833283:0.593431:0.833283:0.000000
x:@0.636939:0.849644:0.644402:0.849644:0.644402:0.833283:0.636939:0.833283:0.000000
2:@0.644404:0.843600:0.649646:0.843600:0.649646:0.834045:0.644404:0.834045:0.000000
x:@0.668700:0.849648:0.676163:0.849648:0.676163:0.833286:0.668700:0.833286:0.000000
 ©:@0.079553:0.731952:0.079553:0.720342:0.061505:0.720342:0.061505:0.731952:0.000000:0.000000
maya:@0.080774:0.720340:0.080774:0.684191:0.055786:0.684191:0.055786:0.720340:0.000000:0.000000:0.000000:0.000000
®EDUCACIÓN – Libro resuelto solo para fines didácticos – Prohibida su reproducción :@0.079553:0.684192:0.079553:0.268045:0.061505:0.268045:0.061505:0.684192:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000