80:@0.058783:0.510692:0.077690:0.510692:0.077690:0.494068:0.058783:0.494068:0.000000:0.000000
Tema:@0.047190:0.135475:0.083321:0.135475:0.083321:0.113749:0.047190:0.113749:0.000000:0.000000:0.000000:0.000000
Actividad resuelta:@0.115209:0.602960:0.272331:0.602960:0.272331:0.584523:0.115209:0.584523:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Se tiene la función  ( ) = :@0.115209:0.622807:0.297431:0.622807:0.297431:0.606418:0.115209:0.606418:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
f x:@0.256107:0.622807:0.273152:0.622807:0.273152:0.606445:0.256107:0.606445:0.000000:0.000000:0.000000
csc x:@0.297781:0.622807:0.340828:0.622807:0.340828:0.606445:0.297781:0.606445:0.000000:0.000000:0.000000:0.000000:0.000000
(4 ). :@0.319488:0.622807:0.352953:0.622807:0.352953:0.606418:0.319488:0.606418:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Hallamos:@0.353294:0.622807:0.424554:0.622807:0.424554:0.606183:0.353294:0.606183:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 el dominio, el periodo, la frecuencia, el recorrido e :@0.424554:0.622807:0.800422:0.622807:0.800422:0.606418:0.424554:0.606418:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
indicamos:@0.800735:0.622807:0.879901:0.622807:0.879901:0.606183:0.800735:0.606183:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 :@0.879901:0.622807:0.883936:0.622807:0.883936:0.606418:0.879901:0.606418:0.000000
si es función par o impar.:@0.115209:0.639403:0.297233:0.639403:0.297233:0.623014:0.115209:0.623014:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Sabemos:@0.115209:0.671641:0.185731:0.671641:0.185731:0.655017:0.115209:0.655017:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 que :@0.185731:0.671641:0.222513:0.671641:0.222513:0.655252:0.185731:0.655252:0.000000:0.000000:0.000000:0.000000:0.000000
π:@0.354795:0.672318:0.364912:0.672318:0.369477:0.656745:0.359360:0.656745:0.000000
{:@0.339987:0.675295:0.348833:0.675295:0.348833:0.654428:0.339987:0.654428:0.000000
}:@0.412869:0.675295:0.421714:0.675295:0.421714:0.654428:0.412869:0.654428:0.000000
(:@0.261566:0.674772:0.267702:0.674772:0.267702:0.654839:0.261566:0.654839:0.000000
):@0.292451:0.674772:0.298587:0.674772:0.298587:0.654839:0.292451:0.654839:0.000000
=:@0.301247:0.672318:0.311364:0.672318:0.311364:0.656745:0.301247:0.656745:0.000000
∈:@0.384540:0.672318:0.397679:0.672318:0.397679:0.656745:0.384540:0.656745:0.000000
DomCsc:@0.225128:0.671640:0.291375:0.671640:0.291375:0.655279:0.225128:0.655279:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
kk:@0.348741:0.671640:0.380233:0.671640:0.380233:0.655279:0.348741:0.655279:0.000000:0.000000
:@0.314283:0.672511:0.327587:0.672511:0.327587:0.655763:0.314283:0.655763:0.000000
:@0.401021:0.672511:0.413313:0.672511:0.413313:0.655763:0.401021:0.655763:0.000000
\:@0.331346:0.671640:0.337759:0.671640:0.337759:0.655251:0.331346:0.655251:0.000000
, entonces :@0.422748:0.671640:0.503049:0.671640:0.503049:0.655251:0.422748:0.655251:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
π:@0.547642:0.672276:0.557759:0.672276:0.562324:0.656703:0.552207:0.656703:0.000000
π:@0.621510:0.663757:0.631627:0.663757:0.636192:0.648184:0.626075:0.648184:0.000000
=:@0.528909:0.672276:0.539026:0.672276:0.539026:0.656703:0.528909:0.656703:0.000000
⇒ =:@0.564198:0.672276:0.608388:0.672276:0.608388:0.656703:0.564198:0.656703:0.000000:0.000000:0.000000
x k:@0.517392:0.671599:0.549152:0.671599:0.549152:0.656206:0.517392:0.656206:0.000000:0.000000:0.000000
x k:@0.586757:0.671599:0.618517:0.671599:0.618517:0.656206:0.586757:0.656206:0.000000:0.000000:0.000000
4:@0.506391:0.671599:0.515383:0.671599:0.515383:0.655929:0.506391:0.655929:0.000000
4:@0.624450:0.682522:0.633442:0.682522:0.633442:0.666852:0.624450:0.666852:0.000000
,:@0.638321:0.671599:0.641527:0.671599:0.641527:0.655929:0.638321:0.655929:0.000000
 por lo tanto, :@0.644390:0.671640:0.741854:0.671640:0.741854:0.655251:0.644390:0.655251:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
π:@0.216657:0.701111:0.226774:0.701111:0.231339:0.685538:0.221222:0.685538:0.000000
=:@0.155833:0.709637:0.165950:0.709637:0.165950:0.694064:0.155833:0.694064:0.000000
∈ ⎬:@0.249906:0.709637:0.288125:0.709914:0.288125:0.694341:0.249906:0.694064:0.000000:0.000000:0.000000
⎧:@0.196927:0.700011:0.206030:0.700011:0.206030:0.684438:0.196927:0.684438:0.000000
⎨:@0.196927:0.709914:0.206030:0.709914:0.206030:0.694341:0.196927:0.694341:0.000000
⎩:@0.196927:0.720162:0.206030:0.720162:0.206030:0.704589:0.196927:0.704589:0.000000
⎫:@0.279022:0.700011:0.288125:0.700011:0.288125:0.684438:0.279022:0.684438:0.000000
⎭:@0.279022:0.720162:0.288125:0.720162:0.288125:0.704589:0.279022:0.704589:0.000000
Dom:@0.117836:0.708959:0.153198:0.708959:0.153198:0.693566:0.117836:0.693566:0.000000:0.000000:0.000000
k:@0.206100:0.708959:0.213674:0.708959:0.213674:0.693566:0.206100:0.693566:0.000000
k:@0.238035:0.708959:0.245609:0.708959:0.245609:0.693566:0.238035:0.693566:0.000000
:@0.168867:0.709831:0.084634:0.709831:0.084634:0.693082:0.168867:0.693082:0.000000
:@0.266404:0.709831:0.182171:0.709831:0.182171:0.693082:0.266404:0.693082:0.000000
–:@0.185202:0.708959:0.194416:0.708959:0.194416:0.693290:0.185202:0.693290:0.000000
4:@0.219588:0.719885:0.228581:0.719885:0.228581:0.704216:0.219588:0.704216:0.000000
,:@0.233469:0.708959:0.236675:0.708959:0.236675:0.693290:0.233469:0.693290:0.000000
.:@0.288549:0.708959:0.291756:0.708959:0.291756:0.693290:0.288549:0.693290:0.000000
Funciones secante y cosecante:@0.115891:0.141978:0.581322:0.141978:0.581322:0.101242:0.115891:0.101242:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
M.5.1.72. Reconocer las funciones trigonométricas secante y cosecante, sus propiedades y las relaciones existentes entre estas funciones, y representarlas de :@0.125388:0.065572:0.877687:0.065572:0.877687:0.055143:0.125388:0.055143:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
manera gráfica con apoyo de las TIC. :@0.125388:0.076133:0.297803:0.076133:0.297803:0.065704:0.125388:0.065704:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
M.5.1.73. Reconocer y resolver (con apoyo de las TIC) aplicaciones, problemas o situaciones reales o hipotéticas que pueden ser modelizados con funciones :@0.125388:0.086695:0.877722:0.086695:0.877722:0.076265:0.125388:0.076265:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
trigonométricas, identificando las variables significativas presentes y las relaciones entre ellas, y juzgar la validez y pertinencia de los resultados obtenidos.:@0.125388:0.097256:0.839496:0.097256:0.839496:0.086827:0.125388:0.086827:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
18:@0.048334:0.122645:0.082177:0.122645:0.082177:0.065614:0.048334:0.065614:0.000000:0.000000
Funciones trigonométricas:@0.391920:0.167709:0.604519:0.167709:0.604519:0.150808:0.391920:0.150808:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Función secante:@0.122471:0.247358:0.251186:0.247358:0.251186:0.230457:0.122471:0.230457:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
El periodo de la función  :@0.122471:0.271077:0.304755:0.271077:0.304755:0.254688:0.122471:0.254688:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
secante es 2π.:@0.122471:0.287673:0.224761:0.287673:0.224761:0.271284:0.122471:0.271284:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Definición: :@0.363044:0.229268:0.442712:0.229268:0.442712:0.212879:0.363044:0.212879:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
π:@0.735361:0.200561:0.745341:0.200561:0.749844:0.184988:0.739864:0.184988:0.000000
π:@0.770162:0.209080:0.780141:0.209080:0.784644:0.193507:0.774665:0.193507:0.000000
():@0.467093:0.232287:0.489979:0.232287:0.489979:0.212354:0.467093:0.212354:0.000000:0.000000
():@0.531860:0.243210:0.554746:0.243210:0.554746:0.223277:0.531860:0.223277:0.000000:0.000000
():@0.597500:0.232287:0.620385:0.232287:0.620385:0.212354:0.597500:0.212354:0.000000:0.000000
():@0.755773:0.250752:0.778658:0.250752:0.778658:0.230818:0.755773:0.230818:0.000000:0.000000
():@0.820540:0.261674:0.843426:0.261674:0.843426:0.241741:0.820540:0.241741:0.000000:0.000000
=:@0.492603:0.229832:0.502583:0.229832:0.502583:0.214259:0.492603:0.214259:0.000000
≠:@0.622992:0.229832:0.632972:0.229832:0.632972:0.214259:0.622992:0.214259:0.000000
+:@0.752199:0.209087:0.762179:0.209087:0.762179:0.193514:0.752199:0.193514:0.000000
∈ ⎬→:@0.799497:0.209087:0.857084:0.209087:0.857084:0.193514:0.799497:0.193514:0.000000:0.000000:0.000000:0.000000
⎧:@0.725696:0.199461:0.734676:0.199461:0.734676:0.183888:0.725696:0.183888:0.000000
⎨:@0.725696:0.209363:0.734676:0.209363:0.734676:0.193790:0.725696:0.193790:0.000000
⎩:@0.725696:0.219612:0.734676:0.219612:0.734676:0.204039:0.725696:0.204039:0.000000
⎫:@0.828200:0.199461:0.837180:0.199461:0.837180:0.183888:0.828200:0.183888:0.000000
⎭:@0.828200:0.219612:0.837180:0.219612:0.837180:0.204039:0.828200:0.204039:0.000000
→:@0.710045:0.248296:0.727986:0.248296:0.727986:0.232723:0.710045:0.232723:0.000000
=:@0.781265:0.248296:0.791245:0.248296:0.791245:0.232723:0.781265:0.232723:0.000000
⎧:@0.688613:0.198354:0.697593:0.198354:0.697593:0.182781:0.688613:0.182781:0.000000
⎨:@0.688613:0.230109:0.697593:0.230109:0.697593:0.214536:0.688613:0.214536:0.000000
⎪:@0.688613:0.211839:0.697593:0.211839:0.697593:0.196266:0.688613:0.196266:0.000000
⎪:@0.688613:0.219612:0.697593:0.219612:0.697593:0.204039:0.688613:0.204039:0.000000
⎩:@0.688613:0.262209:0.697593:0.262209:0.697593:0.246636:0.688613:0.246636:0.000000
⎪:@0.688613:0.243579:0.697593:0.243579:0.697593:0.228007:0.688613:0.228007:0.000000
⎪:@0.688613:0.257050:0.697593:0.257050:0.697593:0.241477:0.688613:0.241477:0.000000
x:@0.474862:0.229141:0.482224:0.229141:0.482224:0.213747:0.474862:0.213747:0.000000
x:@0.539629:0.240067:0.546991:0.240067:0.546991:0.224673:0.539629:0.224673:0.000000
x:@0.605269:0.229141:0.612631:0.229141:0.612631:0.213747:0.605269:0.213747:0.000000
kk:@0.764178:0.208395:0.795244:0.208395:0.795244:0.193002:0.764178:0.193002:0.000000:0.000000
x:@0.699102:0.247604:0.706464:0.247604:0.706464:0.232211:0.699102:0.232211:0.000000
x:@0.763551:0.247604:0.770913:0.247604:0.770913:0.232211:0.763551:0.232211:0.000000
x:@0.828309:0.258530:0.835671:0.258530:0.835671:0.243137:0.828309:0.243137:0.000000
:@0.698011:0.209266:0.665928:0.209266:0.665928:0.192518:0.698011:0.192518:0.000000
:@0.815754:0.209266:0.783670:0.209266:0.783670:0.192518:0.815754:0.192518:0.000000
:@0.859962:0.209266:0.827878:0.209266:0.827878:0.192518:0.859962:0.192518:0.000000
sec:@0.442179:0.229141:0.465360:0.229141:0.465360:0.213471:0.442179:0.213471:0.000000:0.000000:0.000000
1:@0.527032:0.220621:0.535903:0.220621:0.535903:0.204951:0.527032:0.204951:0.000000
cos:@0.506527:0.240067:0.530722:0.240067:0.530722:0.224397:0.506527:0.224397:0.000000:0.000000:0.000000
, cos:@0.557607:0.229141:0.596362:0.229141:0.596362:0.213471:0.557607:0.213471:0.000000:0.000000:0.000000:0.000000:0.000000
...:@0.561679:0.229141:0.570840:0.229141:0.570840:0.213471:0.561679:0.213471:0.000000:0.000000:0.000000
0 Sec ::@0.635491:0.229141:0.685747:0.229141:0.685747:0.213471:0.635491:0.213471:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
...:@0.644151:0.229141:0.653312:0.229141:0.653312:0.213471:0.644151:0.213471:0.000000:0.000000:0.000000
–:@0.714135:0.208395:0.723224:0.208395:0.723224:0.192725:0.714135:0.192725:0.000000
2:@0.738257:0.219321:0.747127:0.219321:0.747127:0.203651:0.738257:0.203651:0.000000
sec:@0.730877:0.247618:0.754059:0.247618:0.754059:0.231948:0.730877:0.231948:0.000000:0.000000:0.000000
1:@0.815730:0.239098:0.824601:0.239098:0.824601:0.223429:0.815730:0.223429:0.000000
cos:@0.795226:0.258544:0.819420:0.258544:0.819420:0.242874:0.795226:0.242874:0.000000:0.000000:0.000000
Recorrido: Rec:@0.363052:0.278076:0.469517:0.277982:0.469517:0.261593:0.363052:0.261687:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
(:@0.471247:0.281114:0.477384:0.281114:0.477384:0.261180:0.471247:0.261180:0.000000
):@0.502501:0.281114:0.508637:0.281114:0.508637:0.261180:0.502501:0.261180:0.000000
]:@0.520039:0.281031:0.526175:0.281031:0.526175:0.261409:0.520039:0.261409:0.000000
] [ [:@0.574216:0.281031:0.632653:0.281031:0.632653:0.261409:0.574216:0.261409:0.000000:0.000000:0.000000:0.000000:0.000000
=:@0.509726:0.278659:0.519843:0.278659:0.519843:0.263086:0.509726:0.263086:0.000000
∞:@0.539984:0.278659:0.553123:0.278659:0.553123:0.263086:0.539984:0.263086:0.000000
∞:@0.613179:0.278659:0.626318:0.278659:0.626318:0.263086:0.613179:0.263086:0.000000
Sec:@0.478067:0.277982:0.501434:0.277982:0.501434:0.261620:0.478067:0.261620:0.000000:0.000000:0.000000
:@0.582865:0.278853:0.595028:0.278853:0.595028:0.262105:0.582865:0.262105:0.000000
– ,–1:@0.528670:0.277982:0.576776:0.277982:0.576776:0.261593:0.528670:0.261593:0.000000:0.000000:0.000000:0.000000:0.000000
1,:@0.602593:0.277982:0.612242:0.277982:0.612242:0.261593:0.602593:0.261593:0.000000:0.000000
La gráfica de la función secante tiene asíntotas donde el valor de la :@0.363045:0.301798:0.877985:0.301798:0.877985:0.285409:0.363045:0.285409:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
función coseno es cero.:@0.363045:0.318394:0.535784:0.318394:0.535784:0.302005:0.363045:0.302005:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Función par:  sec–:@0.363045:0.344630:0.502092:0.343379:0.502092:0.326990:0.363045:0.328241:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
( ):@0.486060:0.346511:0.519156:0.346511:0.519156:0.326577:0.486060:0.326577:0.000000:0.000000:0.000000
():@0.560084:0.346511:0.583284:0.346511:0.583284:0.326577:0.560084:0.326577:0.000000:0.000000
=:@0.521816:0.344057:0.531933:0.344057:0.531933:0.328484:0.521816:0.328484:0.000000
∀ ∈:@0.598346:0.344057:0.636411:0.344057:0.636411:0.328484:0.598346:0.328484:0.000000:0.000000:0.000000
x:@0.503861:0.343379:0.511324:0.343379:0.511324:0.327018:0.503861:0.327018:0.000000
x:@0.567989:0.343379:0.575452:0.343379:0.575452:0.327018:0.567989:0.327018:0.000000
x:@0.611386:0.343379:0.618849:0.343379:0.618849:0.327018:0.611386:0.327018:0.000000
:@0.639765:0.344250:0.653070:0.344250:0.653070:0.327502:0.639765:0.327502:0.000000
sec:@0.534875:0.343379:0.558388:0.343379:0.558388:0.326990:0.534875:0.326990:0.000000:0.000000:0.000000
,:@0.584777:0.343379:0.587983:0.343379:0.587983:0.326990:0.584777:0.326990:0.000000
...:@0.588905:0.343379:0.598192:0.343379:0.598192:0.326990:0.588905:0.326990:0.000000:0.000000:0.000000
Función cosecante:@0.122501:0.418021:0.269718:0.418021:0.269718:0.401121:0.122501:0.401121:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
El periodo de la función  :@0.122501:0.441740:0.304787:0.441740:0.304787:0.425351:0.122501:0.425351:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
cosecante es 2π.:@0.122501:0.458337:0.242813:0.458337:0.242813:0.441948:0.122501:0.441948:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Definición: :@0.363074:0.394759:0.445685:0.394759:0.445685:0.378370:0.363074:0.378370:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
:@0.703335:0.375423:0.679969:0.375423:0.679969:0.358674:0.703335:0.358674:0.000000
:@0.782124:0.375423:0.758758:0.375423:0.758758:0.358674:0.782124:0.358674:0.000000
:@0.817782:0.375423:0.794416:0.375423:0.794416:0.358674:0.817782:0.358674:0.000000
x:@0.480692:0.395297:0.488156:0.395297:0.488156:0.379904:0.480692:0.379904:0.000000
sen x:@0.513144:0.406223:0.552586:0.406223:0.552586:0.390829:0.513144:0.390829:0.000000:0.000000:0.000000:0.000000:0.000000
sen x:@0.577327:0.395297:0.616769:0.395297:0.616769:0.379904:0.577327:0.379904:0.000000:0.000000:0.000000:0.000000:0.000000
kk:@0.729834:0.374551:0.761327:0.374551:0.761327:0.359158:0.729834:0.359158:0.000000:0.000000
x:@0.704441:0.405241:0.711904:0.405241:0.711904:0.389848:0.704441:0.389848:0.000000
x:@0.768680:0.405241:0.776143:0.405241:0.776143:0.389848:0.768680:0.389848:0.000000
sen x:@0.801131:0.416167:0.840573:0.416167:0.840573:0.400773:0.801131:0.400773:0.000000:0.000000:0.000000:0.000000:0.000000
csc:@0.448278:0.395311:0.471046:0.395311:0.471046:0.379641:0.448278:0.379641:0.000000:0.000000:0.000000
1:@0.532935:0.386791:0.541927:0.386791:0.541927:0.371121:0.532935:0.371121:0.000000
,:@0.563359:0.395311:0.566565:0.395311:0.566565:0.379641:0.563359:0.379641:0.000000
...:@0.567487:0.395311:0.576774:0.395311:0.576774:0.379641:0.567487:0.379641:0.000000:0.000000:0.000000
0 Csc ::@0.639944:0.395311:0.690893:0.395311:0.690893:0.379641:0.639944:0.379641:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
...:@0.648734:0.395311:0.658022:0.395311:0.658022:0.379641:0.648734:0.379641:0.000000:0.000000:0.000000
\:@0.720418:0.374565:0.726830:0.374565:0.726830:0.358895:0.720418:0.358895:0.000000
csc:@0.736284:0.405255:0.759051:0.405255:0.759051:0.389585:0.736284:0.389585:0.000000:0.000000:0.000000
1:@0.820940:0.396735:0.829933:0.396735:0.829933:0.381065:0.820940:0.381065:0.000000
π:@0.735889:0.375229:0.746006:0.375229:0.750571:0.359656:0.740454:0.359656:0.000000
():@0.472780:0.398428:0.495981:0.398428:0.495981:0.378495:0.472780:0.378495:0.000000:0.000000
():@0.537222:0.409351:0.560422:0.409351:0.560422:0.389418:0.537222:0.389418:0.000000:0.000000
():@0.601405:0.398428:0.624606:0.398428:0.624606:0.378495:0.601405:0.378495:0.000000:0.000000
():@0.760767:0.408360:0.783968:0.408360:0.783968:0.388426:0.760767:0.388426:0.000000:0.000000
():@0.825211:0.419291:0.848411:0.419291:0.848411:0.399358:0.825211:0.399358:0.000000:0.000000
=:@0.498641:0.395974:0.508758:0.395974:0.508758:0.380401:0.498641:0.380401:0.000000
≠:@0.627266:0.395974:0.637383:0.395974:0.637383:0.380401:0.627266:0.380401:0.000000
∈→:@0.765621:0.375229:0.814859:0.375229:0.814859:0.359656:0.765621:0.359656:0.000000:0.000000
→:@0.715516:0.405918:0.733704:0.405918:0.733704:0.390345:0.715516:0.390345:0.000000
=:@0.786610:0.405918:0.796726:0.405918:0.796726:0.390345:0.786610:0.390345:0.000000
⎧:@0.693790:0.373030:0.702893:0.373030:0.702893:0.357457:0.693790:0.357457:0.000000
⎨:@0.693790:0.396251:0.702893:0.396251:0.702893:0.380678:0.693790:0.380678:0.000000
⎪:@0.693790:0.385768:0.702893:0.385768:0.702893:0.370195:0.693790:0.370195:0.000000
⎩:@0.693808:0.419824:0.702911:0.419824:0.702911:0.404251:0.693808:0.404251:0.000000
⎪:@0.693808:0.409727:0.702911:0.409727:0.702911:0.394154:0.693808:0.394154:0.000000
Recorrido: RecCsc:@0.363052:0.444729:0.503137:0.443471:0.503137:0.427083:0.363052:0.428340:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
(:@0.471247:0.446603:0.477384:0.446603:0.477384:0.426670:0.471247:0.426670:0.000000
):@0.504067:0.446603:0.510203:0.446603:0.510203:0.426670:0.504067:0.426670:0.000000
]:@0.525535:0.446521:0.531672:0.446521:0.531672:0.426899:0.525535:0.426899:0.000000
] [ [:@0.575382:0.446521:0.633806:0.446521:0.633806:0.426899:0.575382:0.426899:0.000000:0.000000:0.000000:0.000000:0.000000
=:@0.512867:0.444149:0.522984:0.444149:0.522984:0.428576:0.512867:0.428576:0.000000
∞:@0.541448:0.444149:0.554587:0.444149:0.554587:0.428576:0.541448:0.428576:0.000000
∞:@0.614330:0.444149:0.627469:0.444149:0.627469:0.428576:0.614330:0.428576:0.000000
:@0.584016:0.444343:0.596178:0.444343:0.596178:0.427594:0.584016:0.427594:0.000000
–,–1:@0.532364:0.443471:0.577954:0.443471:0.577954:0.427083:0.532364:0.427083:0.000000:0.000000:0.000000:0.000000
1,:@0.603771:0.443471:0.613408:0.443471:0.613408:0.427083:0.603771:0.427083:0.000000:0.000000
La gráfica de la función cosecante tiene asíntotas donde el valor de la :@0.363069:0.468449:0.878053:0.468449:0.878053:0.452060:0.363069:0.452060:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
función seno es cero.:@0.363069:0.485045:0.517785:0.485045:0.517785:0.468656:0.363069:0.468656:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Función impar:  csc–:@0.363069:0.511281:0.519927:0.510032:0.519927:0.493643:0.363069:0.494893:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
π:@0.708065:0.510709:0.718182:0.510709:0.722747:0.495136:0.712630:0.495136:0.000000
{:@0.693259:0.513687:0.702104:0.513687:0.702104:0.492819:0.693259:0.492819:0.000000
}:@0.766140:0.513687:0.774985:0.513687:0.774985:0.492819:0.766140:0.492819:0.000000
( ):@0.503905:0.513164:0.537001:0.513164:0.537001:0.493230:0.503905:0.493230:0.000000:0.000000:0.000000
():@0.587879:0.513164:0.611080:0.513164:0.611080:0.493230:0.587879:0.493230:0.000000:0.000000
=:@0.539659:0.510709:0.549776:0.510709:0.549776:0.495136:0.539659:0.495136:0.000000
∀ ∈:@0.626140:0.510709:0.664202:0.510709:0.664202:0.495136:0.626140:0.495136:0.000000:0.000000:0.000000
∈:@0.737802:0.510709:0.750940:0.510709:0.750940:0.495136:0.737802:0.495136:0.000000
x:@0.521704:0.510032:0.529167:0.510032:0.529167:0.493670:0.521704:0.493670:0.000000
x:@0.595783:0.510032:0.603246:0.510032:0.603246:0.493670:0.595783:0.493670:0.000000
x:@0.639180:0.510032:0.646643:0.510032:0.646643:0.493670:0.639180:0.493670:0.000000
k k:@0.702000:0.510032:0.733493:0.510032:0.733493:0.493670:0.702000:0.493670:0.000000:0.000000:0.000000
:@0.667554:0.510903:0.680858:0.510903:0.680858:0.494154:0.667554:0.494154:0.000000
:@0.754293:0.510903:0.766584:0.510903:0.766584:0.494154:0.754293:0.494154:0.000000
–csc:@0.552709:0.510032:0.586155:0.510032:0.586155:0.493643:0.552709:0.493643:0.000000:0.000000:0.000000:0.000000
,:@0.612544:0.510032:0.615750:0.510032:0.615750:0.493643:0.612544:0.493643:0.000000
...:@0.616672:0.510032:0.625959:0.510032:0.625959:0.493643:0.616672:0.493643:0.000000:0.000000:0.000000
\:@0.684633:0.510032:0.691046:0.510032:0.691046:0.493643:0.684633:0.493643:0.000000
Aplicaciones de las funciones :@0.122479:0.542270:0.353486:0.542270:0.353486:0.525370:0.122479:0.525370:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
trigonométricas:@0.122479:0.558867:0.250312:0.558867:0.250312:0.541966:0.122479:0.541966:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Las funciones trigonométricas tienen una gran variedad de aplicacio-:@0.363052:0.533820:0.873958:0.533820:0.873958:0.517431:0.363052:0.517431:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
nes en la vida cotidiana y de igual manera su uso dentro de la física :@0.363052:0.550416:0.878095:0.550416:0.878095:0.534027:0.363052:0.534027:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 :@0.873958:0.550416:0.877994:0.550416:0.877994:0.534027:0.873958:0.534027:0.000000
y la matemática son múltiples.:@0.363052:0.567013:0.584917:0.567013:0.584917:0.550624:0.363052:0.550624:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
El periodo :@0.115200:0.757290:0.193866:0.757290:0.193866:0.740901:0.115200:0.740901:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
T:@0.196074:0.757699:0.204201:0.757699:0.204201:0.741337:0.196074:0.741337:0.000000
B:@0.229742:0.768625:0.238587:0.768625:0.238587:0.752263:0.229742:0.752263:0.000000
2:@0.223624:0.749179:0.232616:0.749179:0.232616:0.732790:0.223624:0.732790:0.000000
,  por lo tanto, :@0.248372:0.757699:0.352659:0.757298:0.352659:0.740909:0.248372:0.741310:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
π:@0.231560:0.749851:0.241677:0.749851:0.246241:0.734278:0.236125:0.734278:0.000000
=:@0.209476:0.758376:0.219593:0.758376:0.219593:0.742803:0.209476:0.742803:0.000000
T:@0.354864:0.756749:0.362990:0.756749:0.362990:0.740388:0.354864:0.740388:0.000000
2:@0.384495:0.767673:0.393488:0.767673:0.393488:0.751284:0.384495:0.751284:0.000000
.  :@0.397582:0.756749:0.408640:0.757289:0.408640:0.740900:0.397582:0.740360:0.000000:0.000000:0.000000
π:@0.381554:0.748901:0.391671:0.748901:0.396236:0.733328:0.386119:0.733328:0.000000
=:@0.368265:0.757427:0.378382:0.757427:0.378382:0.741854:0.368265:0.741854:0.000000
La frecuencia   = 4. El recorrido es:@0.115217:0.804741:0.363620:0.804741:0.363620:0.788352:0.115217:0.788352:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
B:@0.216164:0.804741:0.225009:0.804741:0.225009:0.788379:0.216164:0.788379:0.000000
]:@0.159236:0.832771:0.165372:0.832771:0.165372:0.813149:0.159236:0.813149:0.000000
] [ [:@0.209082:0.832771:0.267506:0.832771:0.267506:0.813149:0.209082:0.813149:0.000000:0.000000:0.000000:0.000000:0.000000
=:@0.146568:0.830400:0.156684:0.830400:0.156684:0.814827:0.146568:0.814827:0.000000
∞:@0.175149:0.830400:0.188288:0.830400:0.188288:0.814827:0.175149:0.814827:0.000000
∞:@0.248030:0.830400:0.261169:0.830400:0.261169:0.814827:0.248030:0.814827:0.000000
:@0.217717:0.830593:0.229879:0.830593:0.229879:0.813845:0.217717:0.813845:0.000000
Rec:@0.117046:0.829722:0.143269:0.829722:0.143269:0.813333:0.117046:0.813333:0.000000:0.000000:0.000000
– ,–1:@0.166046:0.829722:0.211636:0.829722:0.211636:0.813333:0.166046:0.813333:0.000000:0.000000:0.000000:0.000000:0.000000
1,:@0.237453:0.829722:0.247095:0.829722:0.247095:0.813333:0.237453:0.813333:0.000000:0.000000
.  :@0.268177:0.829722:0.278392:0.830979:0.278392:0.814590:0.268177:0.813333:0.000000:0.000000:0.000000
Finalmente, :@0.115215:0.863093:0.204661:0.863093:0.204661:0.846704:0.115215:0.846704:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Csc:@0.206543:0.863093:0.230499:0.863093:0.230499:0.846732:0.206543:0.846732:0.000000:0.000000:0.000000
(–4 ) = –csc(4 ), por lo tanto, :@0.230499:0.863093:0.454173:0.863093:0.454173:0.846704:0.230499:0.846704:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
x:@0.253589:0.863093:0.261052:0.863093:0.261052:0.846732:0.253589:0.846732:0.000000
x:@0.335518:0.863093:0.342981:0.863093:0.342981:0.846732:0.335518:0.846732:0.000000
es una función impar.:@0.115215:0.879689:0.272696:0.879689:0.272696:0.863301:0.115215:0.863301:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
0:@0.646183:0.813483:0.651905:0.813483:0.651905:0.803053:0.646183:0.803053:0.000000
y:@0.662858:0.697598:0.668018:0.697598:0.668018:0.687169:0.662858:0.687169:0.000000
x:@0.869787:0.799225:0.874818:0.799225:0.874818:0.788795:0.869787:0.788795:0.000000
1:@0.647742:0.760570:0.653465:0.760570:0.653465:0.750141:0.647742:0.750141:0.000000
2:@0.647742:0.717903:0.653465:0.717903:0.653465:0.707473:0.647742:0.707473:0.000000
–π/2:@0.589379:0.813483:0.611261:0.813483:0.611261:0.803053:0.589379:0.803053:0.000000:0.000000:0.000000:0.000000
3π/2:@0.814976:0.813483:0.836718:0.813483:0.836718:0.803053:0.814976:0.803053:0.000000:0.000000:0.000000:0.000000
π/2:@0.705238:0.813483:0.721257:0.813483:0.721257:0.803053:0.705238:0.803053:0.000000:0.000000:0.000000
–π:@0.538801:0.813483:0.550845:0.813483:0.550845:0.803053:0.538801:0.803053:0.000000:0.000000
–1:@0.641832:0.851451:0.653418:0.851451:0.653418:0.841021:0.641832:0.841021:0.000000:0.000000
–2:@0.641832:0.896028:0.653418:0.896028:0.653418:0.885599:0.641832:0.885599:0.000000:0.000000
π:@0.766451:0.813483:0.772631:0.813483:0.772631:0.803053:0.766451:0.803053:0.000000