160:@0.067867:0.963104:0.109245:0.963104:0.109245:0.941283:0.067867:0.941283:0.000000:0.000000:0.000000
Matemática:@0.120102:0.956142:0.204868:0.956142:0.204868:0.943479:0.120102:0.943479:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
9.º EGB:@0.120102:0.967458:0.170641:0.967458:0.170641:0.954794:0.120102:0.954794:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
DUA:@0.070720:0.123711:0.114363:0.123711:0.114363:0.103460:0.070720:0.103460:0.000000:0.000000:0.000000
. Representación:@0.114363:0.123082:0.246653:0.123082:0.246653:0.106182:0.114363:0.106182:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Teorema de Pitágoras:@0.286308:0.079033:0.665689:0.079033:0.665689:0.042159:0.286308:0.042159:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
:@0.094760:0.108604:0.183816:0.108604:0.183816:0.011516:0.094760:0.011516:0.000000:0.000000
El teorema de Pitágoras es una relación entre los lados de un triángulo rectángulo. :@0.296992:0.468777:0.847736:0.468777:0.847736:0.453878:0.296992:0.453878:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
En un triángulo rectángulo se pueden identificar diferentes elementos::@0.296992:0.490994:0.767693:0.490994:0.767693:0.476095:0.296992:0.476095:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Catetos::@0.296992:0.513210:0.355693:0.513210:0.355693:0.497846:0.296992:0.497846:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 lados que forman el ángulo recto.:@0.355693:0.513210:0.583522:0.513210:0.583522:0.498311:0.355693:0.498311:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Hipotenusa::@0.296992:0.535427:0.384875:0.535427:0.384875:0.520062:0.296992:0.520062:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 lado mayor del triángulo opuesto al ángulo recto.:@0.384875:0.535427:0.718092:0.535427:0.718092:0.520528:0.384875:0.520528:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Ángulo recto::@0.296992:0.557643:0.394908:0.557643:0.394908:0.542279:0.296992:0.542279:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 ángulo de 90° que forman los dos catetos.:@0.394908:0.557643:0.678572:0.557643:0.678572:0.542744:0.394908:0.542744:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
El teorema de Pitágoras enuncia que: el cuadrado de la hipotenusa es igual a la suma de :@0.296992:0.579860:0.896963:0.579860:0.896963:0.564961:0.296992:0.564961:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
los cuadrados de los catetos.:@0.296992:0.594947:0.487481:0.594947:0.487481:0.580048:0.296992:0.580048:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Un edificio tiene una ventana, a 4   de altura, que requiere ser limpiada. Para ello, se :@0.287495:0.154473:0.907661:0.154473:0.907661:0.138084:0.287495:0.138084:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.535478:0.154473:0.550110:0.154473:0.550110:0.138112:0.535478:0.138112:0.000000
debe colocar una escalera asentada a 3   de la pared. ¿Cuántos metros deberá :@0.287495:0.171070:0.907643:0.171070:0.907643:0.154681:0.287495:0.154681:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.599015:0.171070:0.613646:0.171070:0.613646:0.154708:0.599015:0.154708:0.000000
medir la escalera?:@0.287495:0.187666:0.417244:0.187666:0.417244:0.171277:0.287495:0.171277:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Para resolver esta situación, primero analicemos el gráfico. Como este esquema for-:@0.287495:0.211385:0.903564:0.211385:0.903564:0.194996:0.287495:0.194996:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
ma un triángulo rectángulo, podemos demostrar lo siguiente::@0.287495:0.227981:0.739669:0.227981:0.739669:0.211592:0.287495:0.211592:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Partimos de la fórmula:   +   = :@0.287495:0.626087:0.544613:0.626097:0.544613:0.609708:0.287495:0.609698:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a:@0.469763:0.626087:0.479032:0.626087:0.479032:0.609726:0.469763:0.609726:0.000000
2:@0.479017:0.620050:0.484260:0.620050:0.484260:0.610495:0.479017:0.610495:0.000000
b:@0.508473:0.626097:0.517742:0.626097:0.517742:0.609736:0.508473:0.609736:0.000000
2:@0.517735:0.620050:0.522978:0.620050:0.522978:0.610495:0.517735:0.610495:0.000000
c:@0.547193:0.626097:0.554859:0.626097:0.554859:0.609736:0.547193:0.609736:0.000000
2 :@0.554852:0.620050:0.562447:0.620050:0.562447:0.610495:0.554852:0.610495:0.000000:0.000000
 para determinar una expresión que permita :@0.563950:0.626097:0.907699:0.626097:0.907699:0.609708:0.563950:0.609708:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
calcular los catetos y la hipotenusa:   :@0.287499:0.642693:0.556649:0.642693:0.556649:0.626304:0.287499:0.626304:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a:@0.347812:0.673549:0.357082:0.673549:0.357082:0.657187:0.347812:0.657187:0.000000
 : cateto 1 :@0.357082:0.673549:0.431914:0.673549:0.431914:0.657160:0.357082:0.657160:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 :@0.468429:0.673549:0.472464:0.673549:0.472464:0.657160:0.468429:0.657160:0.000000
b:@0.528735:0.673549:0.538004:0.673549:0.538004:0.657187:0.528735:0.657187:0.000000
 : cateto 2 :@0.538004:0.673549:0.612837:0.673549:0.612837:0.657160:0.538004:0.657160:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
 :@0.649353:0.673549:0.653389:0.673549:0.653389:0.657160:0.649353:0.657160:0.000000
c:@0.709658:0.673549:0.717323:0.673549:0.717323:0.657187:0.709658:0.657187:0.000000
 : hipotenusa:@0.717323:0.673549:0.811728:0.673549:0.811728:0.657160:0.717323:0.657160:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a:@0.350788:0.703557:0.360057:0.703557:0.360057:0.687195:0.350788:0.687195:0.000000
c:@0.391826:0.703557:0.399492:0.703557:0.399492:0.687195:0.391826:0.687195:0.000000
b:@0.422766:0.703557:0.432035:0.703557:0.432035:0.687195:0.422766:0.687195:0.000000
2:@0.400678:0.695207:0.405532:0.695207:0.405532:0.686361:0.400678:0.686361:0.000000
2:@0.432766:0.695207:0.437620:0.695207:0.437620:0.686361:0.432766:0.686361:0.000000
=:@0.363928:0.704234:0.374045:0.704234:0.374045:0.688661:0.363928:0.688661:0.000000
−:@0.409887:0.704234:0.420004:0.704234:0.420004:0.688661:0.409887:0.688661:0.000000
b:@0.531347:0.703557:0.540616:0.703557:0.540616:0.687195:0.531347:0.687195:0.000000
c:@0.572385:0.703557:0.580051:0.703557:0.580051:0.687195:0.572385:0.687195:0.000000
a:@0.603694:0.703557:0.612963:0.703557:0.612963:0.687195:0.603694:0.687195:0.000000
2:@0.581237:0.695207:0.586091:0.695207:0.586091:0.686361:0.581237:0.686361:0.000000
2:@0.613693:0.695207:0.618547:0.695207:0.618547:0.686361:0.613693:0.686361:0.000000
=:@0.544487:0.704234:0.554604:0.704234:0.554604:0.688661:0.544487:0.688661:0.000000
−:@0.590446:0.704234:0.600563:0.704234:0.600563:0.688661:0.590446:0.688661:0.000000
c:@0.712639:0.703557:0.720305:0.703557:0.720305:0.687195:0.712639:0.687195:0.000000
a:@0.752535:0.703557:0.761804:0.703557:0.761804:0.687195:0.752535:0.687195:0.000000
b:@0.784618:0.703557:0.793887:0.703557:0.793887:0.687195:0.784618:0.687195:0.000000
2:@0.762530:0.695207:0.767384:0.695207:0.767384:0.686361:0.762530:0.686361:0.000000
2:@0.794618:0.695207:0.799472:0.695207:0.799472:0.686361:0.794618:0.686361:0.000000
=:@0.724627:0.704234:0.734744:0.704234:0.734744:0.688661:0.724627:0.688661:0.000000
+:@0.771747:0.704234:0.781864:0.704234:0.781864:0.688661:0.771747:0.688661:0.000000
Para el caso de problema inicial, como queremos :@0.287495:0.754777:0.649890:0.754777:0.649890:0.738388:0.287495:0.738388:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
encontrar la hipotenusa, aplicamos la fórmula::@0.287495:0.771373:0.625123:0.771373:0.625123:0.754984:0.287495:0.754984:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
c:@0.290479:0.818571:0.298145:0.818571:0.298145:0.802210:0.290479:0.802210:0.000000
a:@0.330375:0.818571:0.339644:0.818571:0.339644:0.802210:0.330375:0.802210:0.000000
b:@0.362457:0.818571:0.371726:0.818571:0.371726:0.802210:0.362457:0.802210:0.000000
2:@0.340369:0.810222:0.345223:0.810222:0.345223:0.801375:0.340369:0.801375:0.000000
2:@0.372458:0.810222:0.377312:0.810222:0.377312:0.801375:0.372458:0.801375:0.000000
=:@0.302467:0.819249:0.312584:0.819249:0.312584:0.803676:0.302467:0.803676:0.000000
+:@0.349587:0.819249:0.359703:0.819249:0.359703:0.803676:0.349587:0.803676:0.000000
c:@0.290479:0.852353:0.298145:0.852353:0.298145:0.835992:0.290479:0.835992:0.000000
3:@0.330006:0.852353:0.338999:0.852353:0.338999:0.835964:0.330006:0.835964:0.000000
4:@0.361683:0.852353:0.370676:0.852353:0.370676:0.835964:0.361683:0.835964:0.000000
916:@0.411051:0.852353:0.452292:0.852353:0.452292:0.835964:0.411051:0.835964:0.000000:0.000000:0.000000
25:@0.485185:0.852353:0.502968:0.852353:0.502968:0.835964:0.485185:0.835964:0.000000:0.000000
5:@0.521469:0.852353:0.530462:0.852353:0.530462:0.835964:0.521469:0.835964:0.000000
2:@0.338852:0.844004:0.343706:0.844004:0.343706:0.835158:0.338852:0.835158:0.000000
2:@0.371676:0.844004:0.376530:0.844004:0.376530:0.835158:0.371676:0.835158:0.000000
=:@0.302467:0.853031:0.312584:0.853031:0.312584:0.837458:0.302467:0.837458:0.000000
+:@0.348057:0.853031:0.358174:0.853031:0.358174:0.837458:0.348057:0.837458:0.000000
=:@0.383512:0.853031:0.393629:0.853031:0.393629:0.837458:0.383512:0.837458:0.000000
+:@0.422781:0.853031:0.432898:0.853031:0.432898:0.837458:0.422781:0.837458:0.000000
=:@0.457646:0.853031:0.467763:0.853031:0.467763:0.837458:0.457646:0.837458:0.000000
=:@0.507530:0.853031:0.517647:0.853031:0.517647:0.837458:0.507530:0.837458:0.000000
La escalera deberá medir 5  .:@0.287495:0.890541:0.505384:0.890541:0.505384:0.874152:0.287495:0.874152:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.487546:0.890541:0.502177:0.890541:0.502177:0.874180:0.487546:0.874180:0.000000
4 :@0.149335:0.220884:0.158279:0.220884:0.158279:0.210412:0.149335:0.210412:0.000000:0.000000
m:@0.158279:0.220884:0.168246:0.220884:0.168246:0.210487:0.158279:0.210487:0.000000
3 :@0.184123:0.281453:0.193067:0.281453:0.193067:0.270982:0.184123:0.270982:0.000000:0.000000
m:@0.193067:0.281453:0.203034:0.281453:0.203034:0.271056:0.193067:0.271056:0.000000
Pared:@0.170316:0.245855:0.170316:0.225125:0.155697:0.225125:0.155697:0.245855:0.000000:0.000000:0.000000:0.000000:0.000000
Vereda:@0.181459:0.292895:0.215199:0.292895:0.215199:0.281923:0.181459:0.281923:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Ventana que:@0.212130:0.185120:0.274230:0.185120:0.274230:0.174149:0.212130:0.174149:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
deseamos:@0.212130:0.194378:0.262276:0.194378:0.262276:0.183407:0.212130:0.183407:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
limpiar:@0.212130:0.203637:0.246054:0.203637:0.246054:0.192666:0.212130:0.192666:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Escalera:@0.186032:0.228708:0.202490:0.255485:0.215764:0.250889:0.199306:0.224113:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a = 3:@0.444194:0.410265:0.464880:0.410265:0.464880:0.401551:0.444194:0.401551:0.000000:0.000000:0.000000:0.000000:0.000000
4:@0.418529:0.325960:0.423796:0.325960:0.423796:0.317246:0.418529:0.317246:0.000000
b = 4:@0.369530:0.286519:0.391109:0.286519:0.391109:0.277805:0.369530:0.277805:0.000000:0.000000:0.000000:0.000000:0.000000
5:@0.437223:0.329743:0.442490:0.329743:0.442490:0.321029:0.437223:0.321029:0.000000
c = 5:@0.531577:0.271102:0.551914:0.271102:0.551914:0.262388:0.531577:0.262388:0.000000:0.000000:0.000000:0.000000:0.000000
3:@0.444615:0.353296:0.449881:0.353296:0.449881:0.344582:0.444615:0.344582:0.000000
a:@0.444399:0.381364:0.449758:0.381364:0.449758:0.372712:0.444399:0.372712:0.000000
2:@0.449355:0.377998:0.452426:0.377998:0.452426:0.372917:0.449355:0.372917:0.000000
b:@0.357827:0.318279:0.363217:0.318279:0.363217:0.309627:0.357827:0.309627:0.000000
2:@0.363669:0.314910:0.366739:0.314910:0.366739:0.309830:0.363669:0.309830:0.000000
c:@0.485723:0.301425:0.490066:0.301425:0.490066:0.292773:0.485723:0.292773:0.000000
2:@0.490322:0.298056:0.493392:0.298056:0.493392:0.292976:0.490322:0.292976:0.000000
C:@0.406163:0.361964:0.412117:0.361964:0.412117:0.353250:0.406163:0.353250:0.000000
B:@0.481422:0.361964:0.486986:0.361964:0.486986:0.353250:0.481422:0.353250:0.000000
A:@0.407846:0.286520:0.414129:0.286520:0.414129:0.277806:0.407846:0.277806:0.000000
b:@0.672489:0.805565:0.680615:0.805565:0.680615:0.791590:0.672489:0.791590:0.000000
 = 4 :@0.680615:0.805565:0.707624:0.805565:0.707624:0.791602:0.680615:0.791602:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.707624:0.805565:0.720130:0.805565:0.720130:0.791590:0.707624:0.791590:0.000000
a:@0.759337:0.902370:0.767416:0.902370:0.767416:0.888395:0.759337:0.888395:0.000000
 = 3 :@0.767416:0.902370:0.794425:0.902370:0.794425:0.888407:0.767416:0.888407:0.000000:0.000000:0.000000:0.000000:0.000000
m:@0.794425:0.902370:0.806931:0.902370:0.806931:0.888395:0.794425:0.888395:0.000000
c:@0.804696:0.805566:0.811243:0.805566:0.811243:0.791592:0.804696:0.791592:0.000000
 = ?:@0.811243:0.805566:0.833314:0.805566:0.833314:0.791603:0.811243:0.791603:0.000000:0.000000:0.000000:0.000000
A:@0.725802:0.723605:0.734593:0.723605:0.734593:0.709631:0.725802:0.709631:0.000000
B:@0.854779:0.892044:0.862812:0.892044:0.862812:0.878069:0.854779:0.878069:0.000000
C:@0.712893:0.892044:0.721484:0.892044:0.721484:0.878069:0.712893:0.878069:0.000000
Entonces, el cuadrado de   ( ) más el cua-:@0.589394:0.301009:0.900921:0.301009:0.900921:0.284620:0.589394:0.284620:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a a:@0.777169:0.301009:0.804387:0.301009:0.804387:0.284648:0.777169:0.284648:0.000000:0.000000:0.000000
2:@0.804369:0.294962:0.809612:0.294962:0.809612:0.285407:0.804369:0.285407:0.000000
drado de   ( ) es igual al cuadrado  ( ).:@0.589402:0.317606:0.888746:0.317606:0.888746:0.301217:0.589402:0.301217:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
b b:@0.660091:0.317606:0.687548:0.317606:0.687548:0.301244:0.660091:0.301244:0.000000:0.000000:0.000000
2:@0.687538:0.311558:0.692780:0.311558:0.692780:0.302003:0.687538:0.302003:0.000000
 c c:@0.847850:0.317606:0.875417:0.317606:0.875417:0.301244:0.847850:0.301244:0.000000:0.000000:0.000000:0.000000
2:@0.875414:0.311558:0.880657:0.311558:0.880657:0.302003:0.875414:0.302003:0.000000
Al comprobar, tenemos que::@0.589389:0.341325:0.797877:0.341325:0.797877:0.324936:0.589389:0.324936:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
a:@0.707141:0.365044:0.716410:0.365044:0.716410:0.348682:0.707141:0.348682:0.000000
2:@0.716419:0.359008:0.721661:0.359008:0.721661:0.349453:0.716419:0.349453:0.000000
 +   = :@0.721662:0.365055:0.774282:0.365055:0.774282:0.348666:0.721662:0.348666:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
b:@0.740716:0.365055:0.749986:0.365055:0.749986:0.348694:0.740716:0.348694:0.000000
2:@0.749984:0.359008:0.755227:0.359008:0.755227:0.349453:0.749984:0.349453:0.000000
c:@0.774282:0.365055:0.781947:0.365055:0.781947:0.348694:0.774282:0.348694:0.000000
2:@0.781946:0.359008:0.787188:0.359008:0.787188:0.349453:0.781946:0.349453:0.000000
3  + 4  = 5:@0.704746:0.381651:0.780316:0.381651:0.780316:0.365262:0.704746:0.365262:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
2:@0.713738:0.375604:0.718981:0.375604:0.718981:0.366049:0.713738:0.366049:0.000000
2:@0.747027:0.375604:0.752270:0.375604:0.752270:0.366049:0.747027:0.366049:0.000000
2:@0.780316:0.375604:0.785558:0.375604:0.785558:0.366049:0.780316:0.366049:0.000000
9 + 16 = 25:@0.703617:0.398248:0.786688:0.398248:0.786688:0.381859:0.703617:0.381859:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Observa otra :@0.158584:0.407581:0.248040:0.407581:0.248040:0.392682:0.158584:0.392682:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
demostración del :@0.127207:0.422668:0.248042:0.422668:0.248042:0.407769:0.127207:0.407769:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
teorema de Pitágoras :@0.102313:0.437756:0.248040:0.437756:0.248040:0.422857:0.102313:0.422857:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
en el enlace web: :@0.128463:0.452843:0.248040:0.452843:0.248040:0.437944:0.128463:0.437944:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
lynk.ec/9mt24:@0.149219:0.471489:0.244373:0.471489:0.244373:0.456364:0.149219:0.456364:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Digital:@0.146325:0.374857:0.196795:0.374857:0.196795:0.357956:0.146325:0.357956:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
En la mayoría de casos, :@0.091743:0.680339:0.248042:0.680339:0.248042:0.665440:0.091743:0.665440:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
aunque los catetos sean :@0.083602:0.695427:0.248042:0.695427:0.248042:0.680528:0.083602:0.680528:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
números naturales, :@0.117207:0.710515:0.248042:0.710515:0.248042:0.695616:0.117207:0.695616:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
1, 2, ..., la hipotenusa es :@0.091090:0.725602:0.248042:0.725602:0.248042:0.710703:0.091090:0.710703:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
un número con infinitas :@0.084858:0.740690:0.248042:0.740690:0.248042:0.725791:0.084858:0.725791:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
cifras decimales. :@0.136355:0.755777:0.248042:0.755777:0.248042:0.740878:0.136355:0.740878:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Prueba esta aseveración, :@0.081055:0.774423:0.248042:0.774423:0.248042:0.759524:0.081055:0.759524:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
cuando los catetos son :@0.091023:0.789511:0.248042:0.789511:0.248042:0.774612:0.091023:0.774612:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
1 y 2 unidades, ¿cuánto :@0.088343:0.804598:0.248042:0.804598:0.248042:0.789699:0.088343:0.789699:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
vale la hipotenusa?:@0.117073:0.819686:0.244373:0.819686:0.244373:0.804787:0.117073:0.804787:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
     Matemática:@0.115415:0.647899:0.222956:0.647899:0.222956:0.630998:0.115415:0.630998:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
M.4.2.15. :@0.290067:0.965521:0.338404:0.965521:0.338404:0.954766:0.290067:0.954766:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000
Aplicar el teorema de Pitágoras en la resolución de triángulos rectángulos.  :@0.338404:0.965521:0.688534:0.965521:0.688534:0.955091:0.338404:0.955091:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000:0.000000