[size=200][color=#980000]Seguimos con nuestro enfoque histórico[br][/color][/size][br][size=150]Algo en lo que debemos tener certeza: El cálculo de la integral como el área debajo de una curva mediante la aproximación de rectángulos, como sea que los dispongamos en el área a medir, es una solución interesante, pero muy engorrosa en su proceso; no es fácil calcularla; y si hasta allí hubiesen llegado los esfuerzos, entonces ninguna utilidad practica hubiera sido posible obtener de ella. Es por eso que debemos detenernos y observar bien de cerca el cambio de época, como un cambio radical de paradigma. Los antiguos que exploraron diversas técnicas y posibles soluciones, quedaron a un lado del camino, cuando se hizo el revolucionario planteamiento del área bajo una curva bajo el equivalente problema de la antiderivada (como fue planteado por Newton) (Squire, 1970, p. 1).[br][/size][br][size=150]Sin embargo, no queremos decir que el asunto del área como la convergencia de sumas de áreas más fáciles de calcular fue abandonado, de ninguna manera. De hecho, hasta la fecha, se han creado más de 100 tipos de integrales (¡Ah! ¿Creías que Riemann fue el único?). De hecho, hay una solución, presentada por el gran matemático francés Henri Lebesgue, que es incluso, más eficiente que la solución de Riemann. De hecho, Lebesgue presentó a finales del siglo XIX, una formulación de las condiciones que toda integral de una función acotada debe cumplir:[br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAtIAAABDCAYAAACxz+JlAAAVIElEQVR4Ae2dbZKsKgyGe129oF5Pr2Z+3Z30YryF8CpqQECc0dPPqTo1tkJIngSI+PUY+AcBCEAAAhCAAAQgAAEIVBN4VNegAgQgAAEIQAACEIAABCAwkEgTBBCAAAQgAAEIQAACEGggQCLdAI0qEIAABCAAAQhAAAIQIJEmBiAAAQhAAAIQgAAEINBAgES6ARpVIAABCEAAAhCAAAQgQCJNDEAAAhCAAAQgAAEIQKCBAIl0AzSqQAACEIAABCAAAQhAgESaGIAABCAAAQhAAAIQgEADARLpBmhUgQAEIAABCEAAAhCAAIk0MQABCEAAAhCAAAQgAIEGAiTSDdCoAgEIQAACEIAABCAAARJpYgACEIAABCAAAQhAAAINBEikG6BRBQIQgAAEIAABCEAAAiTSxAAEIAABCEAAAhCAAAQaCJBIN0CjCgQgAAEIQAACEIAABEikiQEIQAACEIAABCAAAQg0ECCRboBGFQhAAAIQgAAEIAABCJBIEwMQgAAEIAABCEAAAhBoIEAi3QDtrCqfn/fwej6G5/vT3MTn/Rwez9fw/mmX0dz4F1XEV1/kbEz9cwL0tz93AQpAAAIJAlWJ9OfnNTyfj+HxCP+f7+G/yyVuP8Mr6Pf6SVjdabfFoy19/QzvkeuzSwKsSefxfA9t+nQCVCmmH8/KhquK46tdXD+veYx4PIaz++GuPgcL9I5L9c/WE+a7nyzX8aS/HQzfW1b/eUV5xuM1nDyV35IRSl+HQHEi7QP7NfjF0s8w/g4zpCaGsxK3zcDrEuXnc3i+3sN64VUd8Pn6OTWJzPGoc29I/LsnvZqA7jEI9eNZR7+uNL4q55U/oVU/vXqS3Tcu1SePnzCfPeaW+7muZB1P+lsd3X+r9OcdTsi7z43/Fies+XsCRYn0uALy2LvlQJNEz8RNMp/D6/2ZEmM3iTzHVednSOw9yDI9j0Pv147s68kstu+siShu4/h2P57HdUlLwFdpNtYR8bJXpO+QSPeNyzP6ohifNX5Yfm3fV8fzbNvO8Ec7G2oaBMKVrdYrN4ZEdkHgFAIFiXQYcIour/QdnHIDr1Y25ks+P8Pr+Rxe6yXq7thqeOw0/gsDhRieufLnV8eWJzU7lkeHO/KMpHbf/Ed81Z1LUqASITuRTla7zIGecSkWZyS8fcfc8/BX8qS/neeKBsl+vm0d4xsaHIbhN+auNs3uW+sv/HhfWuWa7yfSYUArvW2jX/DnJ5+xnb+45FPJI+2KvH3perVHzploP5+f4f16jvfCWrfYFGvZjWdxiw0F7+2rBoM7VBGzmybSPeMyyDprZa3fmNvB7SkRVTwVO2eceMQKnjM2xi38G9t/w4mkr3f0/I0fe1txRXk7ifRneOum/+IlzV7OCnKKVsJ/C20Lj4Run3B7SjHXhJyC3d0GpJA8u9tqnl3eDNKRZwGH5iJ39FWzsb0qKhm6YyLdMy7F4cyksNeY28v3azmVPOlva4B/+Ns9D+UXTB6/MFfNhoZ+8xeLZbMS/9DWX/nxH0KYMSWZSPvkK35ydt7e6099Ejcl0iUT8VzWvVHkjJWfIzws/lpF2tX141+JN74p5flePr38cbezeL/kfFLclqnoZ/h5v/w96SF57vEmkN48LdV77Svm99e+cgZHMfF4GJditTI4PmNwZnKnBHLdf3N91TgWXfnwfeA1PWA8PXAX3tLT4wHj7nFZmhQejJ0+Y26vHjPLaeF5p/62eBA+SvrG/SEu3etIk3ccjv01JKrhuZ/X+2f4eT+HZ1Je9DamOG6sRadC+bPH5i35YXpLl+wZ/ybGjmixRfV2r1iaOoY5Jzux+aui/nkpPw/utjWbt92KWTbOtVuhpXvCPLt4K9oybopjbdXkWX5s1Weh3scn+LEP3by1zYv2+UxyN/HkYsP1pyXPqXyHjWQi7WVrMjQm5EzjctwWRqaScWgehN29z0aB1S6VP9ruSmz0s41HJGDalK5Zu9wkHAbTLdM46UgMampNyVO2MRV2fz/D3Encg55nvQGlH89Y+97b1/ZVbK07sQqDhXweTcYqqVg6d4VJvl0n0l4LMbX66nTs9RrfzKMTt0lvd0L3ip6HcJN3mIAsebK7/K90rxv3LPnSOatXh35e1E6soOJjkRzNiyVKgrZ/W5jU8ZT/s8NVB2YjDnHINhaDm7fdWyV08ib+7hkdt4KrZ3XcODoytPphdGxKtHXiFS0I2e0Mw+BeRxv7b2VD3HZO/myRtVXuu3HOcPq4JHTutEFHe45q1bGlLcu6aV+veJoEVmzI5xq7x/WQEDfBp6kYWMSaexWx47+KA69JXz8e1yeK3yhe5n4U8SvgM5WeysYxqPkhHrvEo8/C604iHZI1YxCYFLc2NECYDrUqpPbNxroA0aCVLB0CKTtppSoX7W/ksZEtu2LHbgotdyhARqahfqlfVLekvHzX5daNpQnbX714biX323NhX2WN1InWdgIzB6usrJaD4mYn0tLB6qs6tn0uQzYZg5/i9vCY42ztF5dFSWGMV321tp93tT9WqMd2DU/FzQXHxgwK72e36rVe9FHMrvqh/LwZk2W/3W/Uztu9ueopRr6NRV9qlL81MaH/uqDib2OPy/cTV013dZR9q8Za2lqJyP6UXrV9MCs0cVBtrbml9o/5p1ZYV7EmLuYYeJ4fFZOb2M/pk7Jv3B/5PVvOn7TpnM0R1tyxQeB0WTCe+9mi3yTctLc7n0jnQOQkp4zP1Ukei+7tCWe7Mbi4miD2ABPLnbZbeUwCtCEnRgGjQ8m/oc7zPbzHj+BEl/eSdcKBan/El1FOXJHuxnMPwJHjV/dV2rbUBDbuXwwqaRntR8TNTghyfTV9TDKNflMd4xnLusVlRt9k86FObT/vaX9St8YDVTx/kZkzpws36Wyc4OmkbHGb1Vx+M+EPOmbE+HTMf0ch/QFcybD6no5Z8g3/is9W0aiwZFrtzcnNcl5WHUsPHVudfIwt6lhNW5GqRZuhjdo+WCQ7LiRbtgz2x0Bj5TnXz073Y40+stv24UxI5cr5iJu9Kj9Ldlfde17FzCbSUmrZAWJlEttyWsfJerqUk7x0keqwCR0bdjfz2LQlJ24DZFM02qHEaLznLtq/u3nEH+4ephPukXY69+O5S+BAgRv5amWlyTfEQnZeXMlp+ylu9mBp6hYaSh+TTKPfHInxlYHp9lcFd39m9M3UbernHe3PqNZ0qI7nLzJz1nThllvt07EoZpXwmPNjKJ87tve10Gb5W/cW+W6HoeJ5kUe06tjS1tas3T3SuXqu3ZUcFZAt02D8GdZvw9ouGiqeticZ0nkSt2gqvGErffa12xckf+HH6USxQh/Zbcb4Qml/W9BkUA2f1S1GkdgzNrOJtMBNdpRqUAqqVJ7KqfMtzu518PzErJnHrGLYapssNKj9mT+iB0l6vLWjH88N4OId/gQtmuQ2NW/qK2eH+ksUMGMM7Q1gGwYtO8Ttfol0v7gUg1x8bdk29fOzxtytetV76nj+IjNnSQ9ukhH1swmSjkUPAsq/y4Qk1DD67EbWTv9tlj81NG+U+E7t2auA8udyHFCdHAPrmOrVtDVbU76ldiyXlkvJl1Qb8XMI4+0RxhebJ0mKp41i4myPNWf5ceo/FfrIbsu/k53RQlsVHydgfNhQz3v4j/nFcs/YziTS6TOfXUXk7J0OvytnUyAfLKUO2ogt2nGAhyG/JLAX1cQ0syK/KB//yA3OcbmK7fWZ8/RwSbGMvjzjZsc42Im95RsftmfTsbzb+koxIxbjb3ugje3ts62+upxAJTvXV9PHJNOwYW2rGqr+2zMuM/qm9JIdtf1c9eTrlHzt15jg2qn6b7CXTPNvPc+79bd0vM6LO3Hil7Mvd0ztxLIs5DkZuWNbWWW+k0wzMVJcRicSrh3V2eRfhcdq2tratbNn0tm4XWGnas3hHIOUHMXAxn7pbPb/8/zYok+p3aXlkqyih3E3vFKVGvenE+msY3Za0yBt9ZKdqv4MJ5XYaGKyjyedutdmyfEjPAz5Vbq6M6zxcl7oEGZnMRoJu6raSotJHmn6smFnnrFyo705Rq6DvfybSDwbO54ks4rfpXy17C/jwNTSJwWi6q/avlki3TkuqyaDI7FzZMyt8mtl4Qaed+tvaR+rD8QnH9pn9AuxSlxxTbcT+6Rdfixl3JY+ubF0J/GVL5fJf7uOOQZ2Wxur8juO9MG85NVRMYhjY1XE+Jm0P9f/T/Nj5oQoqU+p3aXlDEjxrkLb4yot28lE+khQqm7LWYCvmwguQUkkA0fa3YMn2csBwa04zO9YHt/Q5zqi3gWZG4B2bBkvyzs7Q8dWu74jJfgkjGipkxDVbXeKp2ugmWnQbpSdYx9Z4fXIJ9Lpy1dBkBs0Luor+f41flRhx86Iy/FNDYRGwhBdtrPGCMXG9phkGvGv/lTo95R9alv9TeVaY1LytrYEyZ1iZ7cdGfLLf6XXmmdWDfkyMc5fa2xMx2TKdjsZ8q+u9HOH1U+1qmjE/gpmm/yVEPdTflj0KfdxneX3DGTnNsal89YeW0fH8hXmz20dr1LqXt90W4Zly12d+uBS6P4vm4Gv58ab1+Z+5rSNOVnn+bFNn7SuLrbmdz2ny/kcYcnH6WL0DTOGHWP1W+sB4X3frUskE+mcEWsh69++rmHUuqDxW+2uX2LvVj3Hd2a6dy0a9dyuqW5qAE7UK9kt2bHoKdiDs17v9/AKK53+/tQcAznStkeD03jZNRrItN8PWk5Gro2RyriavXz1S4nF55axeLoWjzH1Oo+MImY5SzxP2wdzvfv6SvHi4iiO3dm2s7bEzB6o5H8rwUof08Bt2KIVkNUl5Frr1HbM6lBMaiCPBUZKxf6J+6j2l/Zzr/feWBA1/EubFs/9phU7dr8Um0uMjfJv9N5nN0m7D6qs9ZvsVqxqrhifPXEJxNLucc7TOKZ29HsSZmy0yDfETAmY61Puqbfxfe3GxzKkm8o5WdOCUiImW3VsacuyLdrXL54ioSWbsiX2aXgOaZ3/jOKs8qGdRT8LfpqGHNWTf3r5UXJj/Uv0ke/jeiFeFidjlvwUH5VVn/LAppxwYhH0+6VEWh060QkmZayNMNnFkKxiiX3jbQIv9z7O1b174/s5P8P2KVYnSPpGdRrbt9WS/AQPBUbkLd85E+XVSKi3CJ5wTB3DfalpabNeLu6eSn0Nm5NWyQ5/NUhEqq1KrH4qIKvum3Tcd2xdNLPD05WtYCpW48SV1Ds3KdvHFipf0VcLBRM/DI6Jkh13zwmvfDLHuHxv9dXMMSMuJVMxrrbqYjE2W+0nYtlgud/PJdOOMcXusX5+bMyNCfTdlu0JnrnG7tLfpOcr+gKtG4PCfJUycfrs9vh9hHmMnxLw9XcTjNhLyXb7q+UnhLmTyOmjL7n5Zkqc1a+f/va55eS1aKVZx4a2Fg2vfvTpgyuhhT/9bZFiNseNiS0XA/H4aHwD4hQ/HtEnun/Zjduprw4W8wkJ9jpvTL8UQWOTvdBT6L6pmL0iPTnFHvyn2saGJrXixM2QcbldOzysydR3zj1+cuZeuVYiF51gd3g6a9uZhrqFJ1K+nRL+d/RV0LmQRWuU/TP1duKyOSaVbO2d9TaC9HoZq/SN8rpV2+GZb+ce/e2y7PNwOQoBCHQkYCfSuTONbOMXTdyyOhcczPKwkpXAoehs4ixmZ09EBdxSRbI8XaVjTMfJrTB59BNhSSLt9LqXr/zJXMNqYMpv//r+bFweickz++JZMdnB2VmeJfLPsq2XP3rJKWFBGQhA4KoEzES6bQL+dweVPI8w2MdJc1iJ0aXnfeeL3XN4179HbiN+vLduvLxYmiBuRJy6I8/TNX2M6XmJtNPtur5ydvuYi3Q0rxGe6t7bCs/H5bGYnGK68ASvDKL8fNd+XmKlbLzi2HhWol/ChTIQgMBVCGwSafeBivFewzgx3NH26onbjvrZw7s8QtK8wDUy9CuB4wc/Ci/p6n6ghaysdsZB17Zxj5RR8k927fJ0Wh1kWp5Iz5P0q/IE5oq+8omg7rd7/vLDhX8STt0a3Y3LgzHpFZ3j7egJ89XH3F2elZ67Yn+bnuPoenJUCYbiEIDAnxOIEulwdv2o/BLMxRO3dsJlPPytAevL53oFnmPp31fcrse/UrOMp7P2fKbSRUnn/Lf8KsLV/KIkzT+EWnlecDVjflEfxUJ+3OsZk4eTwkuPuWU8f9HBpzXlY8KPHe5h0dTbpE5TAMEQgMAlCESJ9CX0QQkIQAACEIAABCAAAQjcggCJ9C3chJIQgAAEIAABCEAAAlcjQCJ9NY+gDwRuQmB6N6k+khS/37XTfaPu8nn2mYFP/P7euOxn+S7dJ5febxJWqAkBCEDgVgRIpG/lLpSFwDUIHPraX5UJ/t5vO5n29+NOD4qOibxLpl0S7e4Vf/svsum++07JfZX6FIYABCAAgX+aAIn0P+1ejIPAyQTGN9Q8hvhT3/aDeQf0mN6YsXyX39jOJsOeH3Zbviwnl5Af0I2qEIAABCDw1QRIpL/a/RgPgWMErKTZv4Yvfrexktv57Sjz57xr9i3fjuPa3r5lJby9ZJNgk0gf8zS1IQABCEDAIkAibVFhHwQgUEAgJK2LWyZC0rxJZAvEpYrUrEgbK+ReLIl0Ci/7IQABCECgnQCJdDs7akLgywkYSXNIercrxa2oMgnw2Na8Sq2PlLi2f15utXp+h/u4cr5I+Fv1oR4EIAABCEBgJkAiPbNgCwIQqCEwrRRHlcYV4fqvekYSFpsuAc4ubq/f2hHdGD29VeQRPlKzkMwPCEAAAhCAwHECJNLHGSIBAl9JwLo/ehj4qudXBgNGQwACEPhSAiTSX+p4zIYABCAAAQhAAAIQOEaARPoYP2pDAAIQgAAEIAABCHwpARLpL3U8ZkMAAhCAAAQgAAEIHCNAIn2MH7UhAAEIQAACEIAABL6UAIn0lzoesyEAAQhAAAIQgAAEjhEgkT7Gj9oQgAAEIAABCEAAAl9KgET6Sx2P2RCAAAQgAAEIQAACxwiQSB/jR20IQAACEIAABCAAgS8lQCL9pY7HbAhAAAIQgAAEIACBYwRIpI/xozYEIAABCEAAAhCAwJcSIJH+UsdjNgQgAAEIQAACEIDAMQIk0sf4URsCEIAABCAAAQhA4EsJkEh/qeMxGwIQgAAEIAABCEDgGAES6WP8qA0BCEAAAhCAAAQg8KUESKS/1PGYDQEIQAACEIAABCBwjMD/oXIpkixpOtEAAAAASUVORK5CYII=[/img][br][img]data:image/png;base64,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[/img][br]Condiciones que ninguna de las más de 100 integrales ideadas (por ponerles algunos nombres: Newton, Cauchy, Riemann, Darboux, Harnack, Cauchy-Riemann, Lebesgue, Stieltjes, Riemann-Stieltjes, Lebesgue-Stieltjes, Denjoy, Perron, Henstock-Kurzweil, McShane, C-integral, Pfeffer, BV-integral, Haar, Radon, Daniell, Burkill, Itô, Hellinger, Kolmogoroff, Khinchin, Bochner, Dunford, Pettis, Bartle, Gelfand, Wiener, Feynman, y otros) han podido satisfacer juntas. (Squire, 1970, p. 4).[br][br]Nos vamos a ocupar ahora, de la conexión interesante que existe entre, por un lado el problema del área bajo la curva, gráfica de una función, y por otro lado, el de la primitiva o antiderivada de dicha función.[br][br][color=#0000ff][br]- Squire, W. (1970). [i]Integration for Engineers and Scientist.[/i] New York: American Elsevier [br] Publishing Company.[/color][br][br][/size]

[color=#980000][size=200]¿Cómo abordar la relación entre el área bajo la curva y la antiderivada, de forma dinámica?[/size][/color]

[size=150]El applet que les traigo tiene las siguientes características:[br][br]1. Hay una ventana a la izquierda, donde podemos ingresar la función que nos plazca (les recomiendo que no sean funciones de integral muy engorrosa). En dicha ventana tendrán un punto x que pueden mover con el cursor: [/size][br][br] 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[/img] [br][b] Ventana izquierda con el punto móvil [/b][br][br][br][size=150]2. A la derecha, tienen otra ventana. En ella es donde van a aparecer (cuando quieran y den clic a los botones de control que están abajo), tanto la antiderivada de la función que ingresaron, como la antiderivada trasladada - F(0) unidades; además, tendrán una copia del punto x moviéndose de forma sincronizada al primero:[/size][br][br] 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[/img][br][br] 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[/img][br][b] Ventana derecha mostrando 1) copia del punto móvil de la[br][/b][b] ventana izquierda y 2) punto de color negro, que sintetiza [br][/b][b] la posición del punto azul móvil y el valor del área bajo la curva[/b][br][br][size=150]3. Las coordenadas del punto de color negro de la ventana de la derecha son:[/size][br][img]data:image/png;base64,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[/img][br][size=150]4. Puedes visualizar ambas funciones y verificar con cuáles coincide la trayectoria del punto negro de la ventana de la derecha.[/size][br]

[size=200][color=#980000]¡A ver! ¿Qué tal si probamos el funcionamiento y límites del applet?[/color][/size]

[size=200][color=#980000]El desafío que te planteamos en esta oportunidad[/color][/size]