MATEMÁTICAS - SECUNDARIA 2
Suma y resta de enteros
(MAR 08 DICIEMBRE)
ACTIVIDAD:
Consulta tu libro de texto de Matemáticas, de segundo grado, y resuelve las actividades que ahí se encuentren sobre las estructuras aditivas de los números enteros.
RESUMEN:
Para iniciar, analiza el tema a partir de la siguiente situación.
Situación, temperatura México y Rusia
En Rusia, el invierno dura aproximadamente 5 meses, y durante esa estación del año las temperaturas son frías; sin embargo, la temperatura promedio puede variar entre las distintas ciudades de ese país. Por ejemplo, la temperatura promedio en la ciudad de Yakutia en invierno es de 55 grados Celsius bajo cero, es decir, una temperatura negativa, correspondiente a -55°C. Mientras que, en el oeste de Rusia, la temperatura promedio es de menos quince grados Celsius (-15°C). Por otro lado, en Yakutia o República de Sajá, como también se le conoce, en 1926, se registró una temperatura mínima de menos 72 grados (-72°C).
En México, hubo un año en el que la temperatura promedio más alta, en invierno, fue de 20°C; y la más baja, fue de 0°C. Aunque se han registrado temperaturas negativas en zonas del norte y en regiones altas o montañosas de menos diez grados centígrados (-10°C). La temperatura mínima histórica registrada en México fue de menos veinticinco grados (-25°C) en la ciudad de Chihuahua en 1997.
Con la información anterior, responde: ¿cuáles son los valores de las temperaturas en invierno en cada lugar que se mencionó?
El registro de las temperaturas es el siguiente.
Durante el invierno:
- La temperatura promedio en Yakutia fue de -55°C.
- La temperatura promedio en el oeste de Rusia fue de -15°C.
- La temperatura mínima registrada en Yakutia fue de -72°C.
- La temperatura máxima promedio en México fue de 20°C.
- La temperatura mínima promedio en México fue de 0°C.
- La temperatura mínima en el norte o en lugares altos o montañosos fue de -10°C.
- Y la temperatura extrema mínima registrada en México fue de -25°C, en Chihuahua.
Ahora que ya tienes los datos de temperatura bien identificados, ordena las temperaturas de menor a mayor y realiza el registro en una tabla.
El orden de menor a mayor temperatura en la tabla queda de la siguiente manera:
![](data:image/png;base64,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)
Esto quiere decir que, -72 es menor que -55, y éste a su vez es menor que -25, que a su vez es menor que -15, y éste es menor que -10, que también es menor que cero y cero es menor que veinte.
Por lo tanto, la temperatura menor de estos registros es de -72°C y la mayor es de 20°C.
Ya que conoces los valores de temperatura y el orden de éstos, ahora resolverás los siguientes problemas que tienen que ver con la comparación de estas temperaturas.
Los números que representan a estas temperaturas son números enteros. Recuerda que los números enteros son el conjunto de números formados por los naturales, sus simétricos y el cero.
Es decir, los naturales, son los que sirven para contar, como el 1, 2, 3, etc. y sus simétricos, que son los negativos de los naturales, como el -1, -2, -3, etc. y el cero.
Ahora que ya recordaste cuáles son los números enteros, realiza operaciones de adición y sustracción con ellos. Responde las siguientes preguntas relacionadas con la información anterior:
¿Cuál es la diferencia entre la mayor y la menor de las temperaturas que se registró en la tabla?
¿Cuál es la diferencia entre las temperaturas que se tienen registradas en la ciudad de Yakutia?
¿Cuál es la diferencia entre las temperaturas que se tienen en México?
Y ¿qué significan estas diferencias?
Primera pregunta:
¿Cuál es la diferencia entre la mayor y la menor de las temperaturas que se registró en la tabla?
Lo primero que tienes que hacer es identificar cuáles son la mayor y la menor temperatura registradas:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABa4AAAFGCAMAAAC15fjFAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAFEUExURf///6XW493w9cfl7en1+Lzg6rHb5kusxrvg6o/L29Lq8XjB1GK2zer1+N7v9Lje6Nfs8qLU4a7Z5e/3+vT6+/r8/cHi68nm7ZTN3eTy9tDp8NXr8Y+foiVWY0NfZkxbX1JbXjpdZkBrd7Ozs9/f35aWln9/f09PTzAwMCAgIF9fX29vbxQUFNvb25+fn2BgYEBAQL+/vxxBS8/Pz4eHh7e3t/+/v//f3//n5/+fn/9/f+fn5ygoKAAAAO/v76enp9fX1zg4OHh4eJeXlxgYGMfHx/f39/+Xl/+Pj//v7/+vr/8AAP84OP8gIP94eP/390hISGhoaAgICBAQEP/Pz/8oKP8wMP+np/9AQP8QEP9gYP8YGI+Pj/9ISP8ICP9oaK+vr1hYWP+Hh/9wcP/X1/+3t/9QUHBwcFBQUP9YWP/HxwAAACTtFRAAAABsdFJOU///////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////AJZTWVQAAAAJcEhZcwAADsQAAA7EAZUrDhsAAEhoSURBVHhe7Z1dj9xGlqbLqouqmhmkUEpdFITpxcyi0C3fdMsjrb0Xo1SPhEVDMGyNVw27ey+2R75Z9P//AxvvOSe+yCCTZJARjKrzyC4eRjAjg18v3zyMZF4oiqIojfDs2VcP6N+TF+Fc5X8vnoRzzfxrrdtPXoRz7fx7fh3Otf2vvUO9ua3/jOT66kFxfSPBHri5lqAtWuv2rvb5DJ78kwQPgPYO9ea2/j+pXG9Lq3L9TIJGaFWuX/yjBA+A9g715ra+yvXGtKZ7Qmun3jOV6+qoXG+OyvXGtOquG+u2uuv6qFxvjsr1xqhcF6FVudbcdU1UrneAynU+mrsug7rrmqhc7wCV63zUXZdB5bomOjJkB+xLrvVWYwn0VmN91F1vjsr1xqi7LoK66/qoXG+OyvXGqFwXQeW6PirXm6NyvTGtyrXeaiyCjgypicr1DlC5zkfddRnUXddE5XoH7Euu9VZjCfRWY33ak2sdGbID1F3no+66DCrXNVF3vQNUrvNRuS6DynVNVK53gMp1PnqrsQwq1zVRud4BKtf5qLsug44MqYnK9Q7Yl1zrrcYS6K3G+qhcb47K9caouy6CJkPq096hriNDdoDKdT4q12VQua6JuusdoHKdj95qLIPKdU1UrneAynU+6q7LoHJdE5XrHbAvudZbjSVo9Vajjgypicr1DlB3nY+66zKou66JyvUOULnOR+W6DCrXNdGRITtA5TofvdVYBpXrmqi73gEq1/mouy6DynVNVK53wL7kWm81lkC/1VgflevNUbneGHXXRWjVXevIkJqoXO8Alet8VK7LcKnuuiIq1ztA5TofvdVYhoPKdUV0ZMgOULnOR911GdRd16S5ra9yvTF6q7EIequxPuscM0+MHj2ReGvW+WxzLNdjleuNUXddhHP7/NkTnFQXTw53UjCdg0wnMfdsWirXeJ8YqajIpGOGO+vVDepskLmrq6/MzFHiFNHCuUxy13jHvfRY5XpjVK6LML7Pv3pOhzlx/EoKp3F3nHV24B0knMTSj+O0KhFSUZEZcu17253HVVXCJNHCuUy6WOIdwzftzpseP5cwSbRwJirXG9OqXD+kW43XdJA7LqV4CniphJNA+xJO4pG66wt7eD2TeZm9ujXx6AegcOFsZrjrffRY5Xpj1F0XYWyfd9T64mLGumFxCScxd/nV3HWpdO8Ic+TaZpgOMi+zsKoFj7xJuWvp4S56rHK9MXqrsQgjtxrv6BB/gqPi5poy2Be3UnUeLC3hJOYuv8LNLlq/Haj1LLm2yV7eH7UUaI673kWPVa43Rt11EUb2OZ1fbnWuP5m5sTtDMXPPjrnLH/JH/uItp6/QhkyWa+wR3l83MldJgSbnrvfSY5XrjVG5LsLwPifzGawNpUbEXl/jLv/x4M327QGnoivBogTP9hZ33LwwrzteRnI9vHTA0mSIh7TDJU+pIxdPDnZzoNJ0Bb174u6x8kJh376S9Z53G7bDZLl+Yf7nGwiXMpfeZth1ciFC92glg4W7e8vQXf0zTHbXIz1GcmRyj/vbeV6PVa43plW5fjC3GnFuReYTpwcnIhERth7nIvOC5mVGTpDe4g6XHadrA5cNLx2SPe6aUqnuGCMhIeR+KsI72xVJvwa5fCnprvcyJsv1pRFlzt6Y3h/pzWmut81QRV2EivMaoZaCYGmXV+6t/hkmu+sXi3rsDyIKVuixyvXGqLsuwvA+xykSrQzUik4uf/LIyWZv+gN6icR8gvQWd4SvM1DZ8NIRue6alMOd6cGbirrIjEAeMOotrWZvvZcx3V1jF9i5ay9+/W2GEmMcsIiUoJKj/sqGJVYPR5nsri/RAzu3uMfBcNJEj7lkHJXrjdFbjUUYvtWIMyIaaGUdMH3uNnvnFgGd3VjUOKIbTHvnWn9xBxZCldzIRNHI0hGZtxrJKLvmyapd3lzdkJ6QiCPgvlGAInQSe/fWrWZivZcwWa6vsQtw6aBBcNQzVLlthn7wStG+uuO/VOB3CHXWvOMNrTXeOrH6Z5g8MuQaKet+jykRUrLHKtcbo+66CMP7vH98cwlOPNEmnEd4PVeYlT8ebHu2KLW4xZ29V1e4j4lwZOmYPHdNquAEFpIiGkEVdpV4AfSSorvDkTOttDwCOw3WewmT5foWGwXiZFTqSNuqs81OJuSOkEvFAlbLEGMaLA3RM2Fq9c8w2V1/da7Hfi9v2mOV641RuS7CfLmGMzLGCCAZgJMLFZ31RhEFicUtqJKXWeUeWTomT64hC5/cmuNN7SdqxEidmol0xImzx5ZgusL+nizX16x61P9LJ37pbUbK53TO9znY6Hd8lUGJ/aBhV/8Mk+V6ux53d9g4Ktcb06pcy2HYCvPlGmeVFKBEzkUTRGM5UEJBYnELquSDL5kkKeKS3tIx9zlyTf2VdzZg1vbdPsgCS8imQcgRuLm+pJcjpiBe7yXMcNcQPJ65dZe49Da7oQ8sfi0xgymW9qsOwtUPnOwYk5MhcY+fosjMDPQYtQM9jo/SsMfnnjzCqFxvjLrrIozLdXReQ1LNiYHyAJwqsEjEya095lwQEJ5ZmJfQxpgEDJ+HOU9chiELXTFmJYw6wgVBeMdKTWCeBBMgs7qcGXKNyTXe9xNLq+1qgKkhqHM++4+5cOqJSvrVKSaNekdTpsfmsnGmx/YNqcfeKdsaO/VEJf3qBCrXG6O3GoswfKsRohYlI3A2ndLnGp1ojKw/QheEUCETzkqMSQhXJviH5e66o2NxP8KOcIEL6ROAg6rou0PEp4z9PlmuzSlh9sqB/5wTP7qG+pZtjZ16opJ+dYoZuesZPaZqf8jZGjv1RCX96gQq1xuj7roIw/ucbv1ITMBZmpOJDvwArvS+ky+ziFwQQoVMOCsxJiFcmWD5uGtS62jFojeSmaBMQlbrT8dLGu1gPWx3vZcwx10/Rd/JsJ4TP56xOQO3QnbqiUr61SkmpaLQ1FPa3p9w7EztcS8ZYqeeqKRfnUDlemNUroswvM9JngJ7DfnGuQR9kqKYa/rmmSghIgoGF+cqOTlTuetRFt9qpHeKkywYCGdlDYqCWizFJTbEqIsjdzeoNETrvYQ5ck1SzVcLuu6YaXqbobsG1yvMYIqlnYYTYYld/TP8w4xkiPQYb16vxyrXG9OqXD+YW418+ji9JrXGeYEkSXz23BjB4mboAzhFLsDiA9sEVdI+tS5Fk7bgYneNUz3OyV/dm5KTxLZPWIpLbOhL7FgRv972HtoyJsu18aq4tphVwLgI61WT2wwb9BI191IgC4cbXcYfYtFwZEhwiR7iyVR3jQPF9Pg5v0PY4/gQMrge277IwgM9tjsM11odGVIddddFGNnnfAPxhCVurtn6QOZwztlUAIMErqgCFoqDEfdjzZZpHxHCaV7JsNRdk1pD9gJIRVjByXtDSTClEhdiwhsL+oEStCXaIiXLmCzXeHvaaJSTtp9IUtsMdaYMPRQll4XD3Yf1MKFbZ9kSPSHtMzl3ja06q8c4lqQDsvBQj4MdFl99U6hcb4zeaizC2G818nkWwB4HGkBDIe4ObHZoOTxr586bIyx0e4XGKYkQLu6hlsx+JnPKZ9PI0hEL3TUpbYwphUO7uLy7uiOTT74NAaY+RGc/GSWhb+KRftB638frvYTJcu0CH2Ha2yFchY7ZRYLX2y18gw8VpKL8MQqrD7G0tnWMyc8McUHc48ReRpWR3VSP7fr5HtMucDtswvVd5Xpj1F0XYXSfd/RaVk1G9ApQKTp7BPn2CesiKmU4rRCJGp2bBDWJopGlIxa6a2k3BMXhCvDJj4gCF3Y2Bhwd6Zzgv3Uzm3lyTeJFkS3q7xBsfbI7PtGBKgqiLcwN9Vf/DJPdNQWJHiNwnO1xuH7LeqxyvTEq10UY3+dfBYIk38A2uCfVGTgJ4k3rc/lgyuJGZ1K4eCcvemdPRG+qRpYOWfjMEGk4hMr9CnSzOj4kJwcOiGg/+5dN+EA+yDy5xpvzhnFF3W2GjS9XOvSQmkcdlfAjThhZiLL3zMgmD5j8NRkKUj0ODixUeZGmHtPSqKOSVI97O2ycRyDXdAoFKQnKZSaOShRLOIrd0tOWn3IM1+1hkjiHc3ugj30Hvy6ppl1ZqnIKS19nOHeJ/orW4OL0Ispo8mCI4+nSvpqfoPwpWNFnpuAoG/SpXby/b1BzenETrsLI0p513bXZb/ymneddx+Ht0VxdPh34m3rs6W7ph+KP/utBS5gn1zjoecu4IrdDjrRDsISznCjH4sHCV89OtHSwgburf4Z57nqsx3wIdXv8qdfjIy39YmmPH4O7xiUv+K1iPMYwdQ922oYwDkCiactPOobRw+CzEHZgyh5Me8e5PUwSdpuznIxVccQSOlxZqnIKS19n2NUnqhkslOtdMulQ3xXNbf1HkQyBQDv560ijZ9KGwOczCSctP/FWYyTQhXuYJDj14mSnGE2EHHlcWapyCktfZxi71bhn7vN//Gs3qFxvzqOQaxrXI4V0dyA5xgcVEg4zaaGQacdwzR4m8d2O1dreqENEQYrRyhGWvs7QqrvO+BL67mhPrjOfNl6ex3GrEQl98avwsTa3GzNpQ0xaKGTiMVyxh0lctymvfkFPa3vG91Wo2AUpRitHWPo6g8p1fdqTa3XXOyBx6mIlKSvhv6/WY7gmYNJCIVOPYYwtqNPDJC6HQ3lre2eEnHbndneC0coRlr7OoHJdH5XrzXkkcg0NpLuNUB9WopsXZBb9Y34xRwGWwUAuV+BCTIigDNzwE3JSjwyeegyjh2Svgx52W8UcBSjHcx9cQU4Pk9huU2bG38d2HwJQbDpt5o8HW81lLogqXV0YdjvFNfNfZ2hVrpc/4ml/tCfXWU8br8EjkWv6JoCxhbiLx193ClKynbtnkKTumCEJMSGCMkO/Lc/kbzXO7SGkyhb4EBMiKDOM9TCJPfXQneAV7ueh0BL3wyDLIvRBXImIgiDsdQrRktcZWr3VqCNDapLztPEqPBa5Jpd4Q4lYqpXvCzORMpAYkLeTgiDEhAjK2Bg7uofs5GOYfSz3E/PjPeRnqklBEGJCBGVnepjEdhsXkc6jKQg0ZIXV3hhF5IJOJQKq82G/UwiWvM6g7ro+7cl1c1v/scg1aRyNqudjykY0ppjdrAnMhqAxGvxJnAviMFWWaMsz/Rim8XvisQ2IhnvYEcicHiax3cYYSMlLRKDpi5MR8mdIugfm2AadSpRQnQ9NX+hh+L5TqFnyOkOrcq3uuiYq1zsgferi5DbI8Iu73s9BsxyEuVoq6ISpskRbnhnHcKUeJrE5nKHlUc4dxXWQHzTmlk1Uujof9juF6ZLXGdRd12dy3m836K3GHZA+dXlEWt8qotAHkEz7fRVX012ICUJLomiGXE/voW3T1XQXYoLQkihKYrs9tDzKu4oeBZ1KO41DwZZguuR1hqfqrquj7npzHo9cX73AmlopZm74uQ68/giQOXW3r1xNEKbKmJun98gchEVgjuVAOqTXw6BVBOv3MMkUuZbN7BaJgk6lncahwXTK7QJMl7zO0Kq7bu6LGiO0J9fqrnfA0Kkbr+kdD+QjqEBin9vFTDdMlV1d3V522vLMOobj1/dalXjlHiax3UYSObU5g3Zc2A98mCjqd8pOgzBRlFyZVkeGTPot7kZoT671W407YIpcS+JBoCKJ5ydD3OMzCSryLJbrRKsS+ydUIe6GqbLwyZSudhT7oQBPvA9GhsQD+RgX9gMfJor6K2inQZgoSm7uVt21JkNqou56B0yQa1Hr0+Wz+EYefj9u7o08aev4ImjLs1SuudXnUatURD2UNUTIkQ8TZam2zmC7HeVeOF1DNwODdlzYD3zYL0psNjsNwn5RenNr7ro+eqtxcx6pXOPDdPfnoBGcQn1yNd3BGYwNU215Zh3DweuHenhcvYdJrFyTOMrly4A5eo46AioJwn7gQ19ke5rolJ0GoS8aeZ2hVXfd3PfqRlB3vTmPVK59GOuckQFMeKAYIm6KvplBkQt86It8W56l7tqHW/cwies21NHpNc3QGyKgoiDsBz7ENO6pTAyuU75o3usMrbrr5r5XN0J7cq1fQt8BE+Wal4JX5VIJaHgGFUCc+AgkmaLIBT7EtNuWJ0eu1+whK26qh0nch4Kv8IqLezN7c015GDb2iCgIwn7gQ7w07ikmnRW00yD0r6M3N1NM+pu7VXet32qsyT/ol9DrM0Guce7jyxapZ4KiiO42khyYQxC//2RAEb2Qfxk7UhRqK1jMs1SuqVUjkmGrNljcw2Btz+C7TReHAC71kQ/7gQ/RU3wX0ffUdcr33U6D0L6OvsI49DpDqyND9GsyNXmi7ro+E+Qa35oLIOuJAFN8xqZv1NG3vT0oYoFkh2nLUm15luauZ/bQD6ie3cMkwVUm0mv69TkDYo582A982O9polOYYuEg9K+j8SCmJL0yrbprHRlSE81d74ChPGa4pixqBv9z0JijOpSQ3DmhohtuVMcPXooHR9D3b4Bvy7PUXadaxRzVze1hYm3PEHZbnC042k2LmW7YD4Kw39P+CmIGNWE45XWGVnPXmgwJwGHKubZC5G/9wl3Ol+vc16/PBHdtNAiJgecH/jlo94AhqpJ8guH2ZLwgfh7a1z01r+NfxvZl1BaevgxJcd9hYRbLdaJVX42q2T18fniW6mGS+EOB/Nxz8Hxp37QP+0HchW5P6Re50ajdBX7h7uuOl2OvMyxw12jPcgp++3wKeI2Eeazu78a0w2jL8foOm00K1iVXrrE7+ZExCVbb4iHZWz84ApOs3esHKdd7cizZlqMOrXV7gbumI98jgwOngRdImMfK36vzv4KfwH3GGhbFLHJz18YSDHcM3ZZwPbK3PpyRhEnW7vVjctdVaO/+C9GaXGe6azBHw7C8hHms666R15cwgc9pxc+lWYvMYwZOdfiSiW5LuB65W3+8y4a1e/0Q5XpXeUx110VYMDKEjvyQGqu8rlxjLSRMAGmhx61slGzNPGZMx7a5jAyTu/XNBbBsl9Vdb0yrct3Yh4KF7lrCq2uMO9kmRTBOSbnemvYO9XW3fgE0d70xN6mfzto/rZ16C3PXEvLH2hqH8brfq6u0EkJ7eb9H+ES+1OuDMh/eYHjB0chAUJT8NfIXpsQ+c24J13NuGm2NynURMt21nwtKfXhLI2NOfmRMsNQNP801qJxD8L06bhM/8n7CJ+zbg3H8wYAV/vn3w71dUV78Gje75K1RQtBct19cgUY+BV3ttmrXNRwF1P/h+f4yYMIxg3a4Exjrw+24deRKF1xjIIt7i07lQBOJvo5xzl3Le5kNKbuk817RFg4GXaGcRAj1VMLBxJaGKSfX7usNbgBt+I0HSachpJG2WKel7OojTqty3Vi313DXlAwJSl3oxn67wxIxR/1jeBbB9+rQhH047NG9p2201weE7sG4tJTE3LNevxDFyxv6a9Yv6a9hfxliolwPriNCF3S7itAFg03M3BtT5Hr6e6GeIgzB4S2DShes0Otick2fNj0oSvyktcxMGho8yFN119m01u08d31DJwydKkGpDcNDVzYLQgqiw/q8XPUIBEMa6cKGy4oX4FNaZgQsJSH1rN8viYWhVvvr2m8psT2IiXLtEPUycG8QucAzVtlpYu7eOJeKkpa6DL0XNuczVl+5D4I6FyTotzR+3hWTa6zKc6wLHyK2COsZ/KQ11U3YzqOou86ntWTIGiND6NxBQNXxoWvM0g2m3dMwOobPWKMUwffq0ObF4YbfhyN8RKZ3JDt2aUo4cIvjqTJ0m9RLOAX0K0DxuYW6i6M5Gml5Kkq0irp4XU1J54fn+8swE3LX5hXhOp4k4lZQ4gL6RfzUqiEYaqLf13HOPQ+R3iF+L+wStxU670V5gzv+SwWjvR5raYhSck32hQpobSgc+K3vBQd9jLrrfP4Rx09DrDDuuqt4LrRT91M6wVLzf2M+puOu6WQlt0URPn/i4TDUOL8PnT7oBaZ8bvtzywUDPzPvl39upkOtogDryqdRuiUqcMswE901bWdaxyeI8NAEegCO7z0CVvDEqiEYamLu3piSDPHvRZHrUeq9cNmjLDRd+gyuCsGclgYoJddYCdmbdCnn0OJKEGTrm7rrfFpz19nfavwkZxhijlyIaWdz2KqARNEEgrEJaID9aRyZyb2Z0ClusIlRVPFC/ix3QYAtw5TXwi4/1OrQrkednaaWmSjXvFQc9YPBVUMw2ISjX5Li3DND0Mqs9yKtDj5zYMYFK/S6lFzD58uVmK4vHIKbpy/oAwLNIOArTQbqrvN5JLlrB59ABsx0QjoHj3jkt8NWCTdPeUCCzM6g4659xOsjZXiKoT0tcPpADlAlK40wDoTxn5lHVdgqDCot/umydw6GLQ0u4zbiILaJsDuuLAoGV80FwWK+DEzfG1PctY/S70WDZGwJXV6c0gULu2CkpQm9LiXXQUkQJ3+NnIIc1F3n80jctZnc8qM07BkmpWFIn1qBH3mFOQnn/sZ8zKBcR5EvMPTLXBiUXd11+mWnPgxK3Iy7/Y+HcQndlshvgWAZMDF3PRj1g/HKVNTt6zjnxl37VlJRT70MdKzYjyzBwi5ItzS11zXlmrPYlqgqC3XX+TyS3DUFLMcURkegC51e90eG2MFZDBXNYiu57vfLTn0YlPgZurtH0E275Br67SHLMLPddSfqB+OV/SihKKPMc9dxlH4vutz57eCqXJBqafoxVFGuZX1Pl0/Hk2+zUXedz11jcr1wZAhH9IhwsUS+NAz5cyqIcspyDH86hsfwLDq564HIFxj6ZS50gZxb4z8zH5SEM35dke6wLV1GPzwfLyNUl2vX16l7I0OunXpF24Vqg42CmTgYaWlCr7eWa9sDmH0xvdQ9KUr91jcFOai7zucf7b3tRsgbd035ED7HfGnn5OFnfnfGnKWO4VlMc9dPzMRKAFIRGOEhVcCFLkj0y9W5EOsTtupukNl1RTJ7cA2DZYTqcj17b0wZdz0Qpd+LE2syAseAmTiY2lKa7eSazx/7+9U44EQB7MgQmRj8ieHLMlB3nc9dY93O/FYjPo7yOYZSbotStGaKu0lcQi6cIhu4gq64T2WaXEMFwjEceESDVAEX9gPfL19kQxp2xiV2ZMiNEWFeV0p4mKlMDLYls8yneBmheu7aF0zcG1PGXQ9EviB4L2zRy3BnuSoXTGxpgG3kGtddvtTi0oFqv2fZ+5sAE97tdE2iyAU5qLvOp7XcdaZc0+FJaoMDNj50cTDfU4l/iQ0w7R7Dswj8nW+gF9E5w0aYQhzgmFJJEEZBp1926kPXlH8DXLbirBAmcUvYHuK8pESo7q4xmbU3MpIhmHTfC1vRXP+wgeRTi6tywbSWhlhHriNMGb2v2XmdX7nGF5X4pwRRRB8CzCmS+jXyLNRd59Na7jr3mSE4UCkZgEP3k9ln/tAlKT+Y9u9Qx2ImVfwyc2riSUtSNI/A3/kG+hE1f3l3dUcfTckSI8A0DFkoTFcRPDf9Gv+Z+X6rtK543pNbV2ogaom3h5H5YHsQEw51aSId9YPxyl6ELn6aszemjLseiPAW2PNd9cJ2cQX+ZYkiG6HX9O3UCb3eRq7dUB8Gi/ki6pUpod3uocs8AkyzUHedT2u561y5psMT65w4dPk0YiQNgBDT1DE8i2nJEFFNIU6fhyHZJChool+Y0kKjrfbWNdFSYnsQ1d317L2R4a4T74WtT2c7rn7xZX1mS4NsI9ecnwb+SmN7dXIdHvut7xzUXefzyHLXokFoJHHosgqC53IyIabALT35N+ZjOs8MGY7wFURG/CxCjnzIH11hk6f9zHzQqn1icW9dE2dpf3sQ1d317L2RM+463i5m1TGRfYMNRH4H9VTigrMtjfZ6I7lO/UI3f3YKi2ih6Pe5XVUOs9w1OiWhOeAwQCl6Vi4/iTZ+EC2KJj5Qdw9y7bapCyaQ567PbtSoBP0KkNJ5ZMs1iTMdg/S9mfjQ5ec7f0p9Tcb9Xj1sOb1+FlPdtdloBz4S7YoGVT7ER3P+Ffze7+j7heJWsWbH8HnXT1ASfCWIf4o+WsPe9iDqj7tO9XWMDHctW/i5ey+nYeCj2TpQIbewCwZbmtTrfLmez7k+5TLHXWMDudX3F2cp8CW+6BrfCI5KRmlUrrPc9dSNKiUyZ+HCmSyQ613Q3O+ZjNDer8ns6nP4FIrJ9ck9zQwn8zSpW8gcd01OQuIgiST982rtiuRWKZhkQB+jux7fqL0SmbFQ2VxalevmBGOECe56Z6hcD4G3gQTc0dm66Y6dvhPombN29WnUo4VENirhcV5kHC1TJGJHcj2HDHc9Z6NSicTCsuuEynV96h/qc2nus00xuQ6NavD9qS2Y7K7t82x4DilLPAOBcuzUQ+ozriz+MekkRUa4yWTLaNxRGpXr5e763EbtlziwvcWCz0Xluj7tybW660FwdgrbqvXUnUB6QfA8lJizb5ANRPhQz7JFHwnMlKwhKQNKpqzHI3PX5zdqv8Ry9kbLCJq7ro/K9eYUvNV4R7e2L074MfRNmeiuac0JP88RQsj06XgMShBCYcR3XpyeTPm59vQxTM3RAInTCys0VGbe4MTN8m86Hy6j6sHfUr6i5+6GI1i4dbMov9DgAkO39S5Lv9WI92D8PEcI0fF+iQUfYUL5noO66/q0J9fnnhmyOwrKdTEmngJY8aMfXNvRkY7NMyXw0vCOc4YJjsk1vTUQiUWIywEn9iki7OXBYH8euv9D2XQlBLbA3RL1a+iCROtdlrprNDm+UfslAvq0MBWicr0H2pPrc88M2R0PUa6nu+vQe1Lqgz0lpC5OdCAhC2WBKnLJVIbl2sN6jQgGk97Zya+BNUxmuvBrRcYBdzy6JSp9dkGi9S5LTz3T4JmNOrSZKc8k8Xxalevm/N0I7cm1JkN2wMSdQDmFQFko64qyS4hmvE2gb9AYMzHO1swd3dcVzjAi13hQwFOol/9lUREy/qIT/UY1+uI6OvRbyug6WvsKJaS/WIQeyMJLo4jKKEi03mXpqXd+ow5tZpQnuzKJVuW6OX83Qntyfe6ZIbvjEbtrxq++S04wXMiQxCAwkyML4FRtGZZreVIwQhJpBGJ1yWnyWlCvoEWYkjaTcaYF7Q1QlIhNRefM0pQK4RIvijZItd4l79RDqxz1N+rQZjY9D56dPBdNhtSnPblWd70DZu2EYPV9QhdIISC1pptgVGOZpNfDci1G2qVsUSYL4w1tksK6TlTzjThE/GJEZoJFuIqyNmZpuGzpntV0tzSZ627rXdaS68RGTW9mlE65dTtAq3LdnL8boT251nHXO2Chu/ZCcoJHlTIDqTXrGyLPlPcZlmt5NdwmWWOUyV1HqK0d42GtM6q5BBGrk5RhcZo3mNB4cDHZgNwsRTZItd5lNblObNTkZg56vAR11/VpT67VXe+Ape7aHHAYa3i8Ju2QokitaWlyoyQ51qKOMSzXEro4KAtCN+PLehEmAc/DRYLYBq4ARDOe9eSaN+rpMtioic3sLloLaVWuddx1TVSud8Bid+0wZU6K4UXdHGY47YDssNHFs1SQa1PEfxkX28AVgGjGs6JcW0xZMGwPmBK7YYeSMlNRd12f9uRax13vgOXuWoDVszoCB+iFJPCDKJdwDJVrIdyoTFiC62CO4qpc16c9udZx1ztgobu+PJ0kCqweeWu5KWhADkRCVEg4xrBcS/oYokWuM2gQHQizy6j31b0IneQCCy4rQW6ca22Qar3LWnLd36iXJ/tV0WAzY7BKqhuTaVWuddx1TTQZsgMWumtIHKkHCRyf/lCUQK0pBcIKg2iKwAzLtRhLXAEoRBmV8NvaxqHF8S9f9yIsLiNDhEAJKctOkQ1SrXdZS677G9WXYIihqCy2Zmy9Z9KqXOu465rouOsdsNRdIzTSTGOWWc7o6XIiewzEBj8rSgtNEZhhuaafmwielIEyKhFt42oXYkol/ag/vIO6RxG9nkMbpFrvspZc241Kwwlpo6IET+QLNjMXZgzjM601KteaDKmJuusdsNBds7AJnCyQGQElJDuWKRIxLNd8bYD+s9SihAIDufr7gV++7kfwyPTkrLvDkX8GAiX0w/P0LRle3AWJ1rusJdf9jZrYzNxdGy+iVbnWcdc10XHXO2DpyBBSMQbS19HmUOqYyHYPMSzXEGqG+4uIAuAr+2rej+h7ig6Yfi+K/W81plrvspZc9zdqouTq6omZeZRyre66Juqud8BCdx0ISV9YQKdwklqPyDXlbinwZRwB/96SJEA4GN3BngqconF6TQEVuSDRepfV5Nq9FRIgjHtzVxK9YBGtynUxf4eNnnV34Dwq15uj7jpc/ac4qPkpRQB1AVLKv5TtHlN9hmG5NkeLcbnxu0kIbl5QniTxy9ep6Oqafpz6dLx2K4/Xo5tuoWDpXutd1pPr7kY19EuiFyyhvly7VZi1LmsJBt401GNsYYPMDY8AskQLL6SyXLtVmL4uleV6fo8fvbvemjG53jGtOSWVa0Lm+vPm09fol0ajhRfSnlxXzl3P7/Gjd9dbo3JdBJVrwg7nhJkGMkvzo2dFuPBS2pNrddc7QN11PirXc1m2S9fyd3h3g00wSS7Edeg49VZLDnuR6+nsRa4no+56Y1Sui9CqXK/sru0Tw+2dZ5ktQ3tyXfk7pfN7rO56Y1Sui6ByfXEBjebNQN/pRxHNlaI9ua78ndL5PVZ3vTEq10VIyzVt5j3/4Py4v3t6+BS+GTf8FHcNgw4wqMPPTnBP6UuiKKI5NGRi9yIM7ZRRItB0OluChc06o7i3kmY1xk+sxDFDzdKrj/EWNj08cnpmYAfIVu3tABoBFa6/tB6sggsM4zsgcbGkF9Orzh4ydmtQ9dghE+1Fef3ZQya5rdVdb0xruic8HLl2A9DlfEFI3+akE4oigsWDX4ITxrD9D86P+rvumyG0XeuOoUbRpRFllmETPKH3pjnfkIg0quj1UHHuGWopCJZ273F+NYgBuR7cAdRYr22EwzvAJuVdgfsq25IdkPhOKZZd0mP5EsXGh4y6641RuS7CsFx7+ORDhHOLxrV5abKnk8x04ddarTTwsDg7AkOgMhckWu8xYi16byYzgkiJgJJLc6rzI9jNzDUJG831GqKSZyx1UoJKjoKlpdMTVoMYkGtPvAPo2tF/N5npwq8NutLdAaSXVOaCROsxA+7as7dDRt31xqhcF2FErvf8g/MjzwxJvxkVXaO9+GRG1TVS1hAJKMIN2U5UoaGTedWta4i/8nrHf6nAdxoL4fEzN2TzcBRMWQ1iSK5HdgC9yaQdQFqHZxXgSTh+VbDIJ7POyR2QaD0mMS4HLxnr8WqHDLXf7fG5ba3uemNUroswLNcyWAIhnXEIROpSPwmPKZ1o5IJoQSt8KBEzilPNLO0ffLjwB+eHrUX/zXzXXI88KLjFkjjFjUwduf9mJmgIase9gJBBQJwiIMYUS8uPJJHMT1wNYkCu19kBaKW/TWyNwUSzd8CAu17QY6qOe9zZ+KscMuquN0blugjDch34ODqTUCYrB0GS05BiaBeqjfeRiF+MyEywCFet9oPzw+Ou+28WdI1Oa4osKHjKOk3KcMnaYWaChtBH6QVptZMS32ksLVvshh/uiBK+SHCcXA1iQK7P7IBu26ge2QHSmmyToKS/A+7NdLznA3K9oMe+n70ezzhksPjoIaPuemNUroswcquRQ7gVEieUcVqRTh0JnQ9CNZcg4lalDIvTvMGE5qy1vtdAbogiG6Ra7zFoLfpvFnTIvYcDBbf0Njxz62xcoiEDCb7bOL7BYI2ESatBDMj1ejsAnaN5gwllBwTtc60NUDne88S4HLx4v4eMuuuNUbkuwrBcS+jioCwI3Ywv60WYBKzxg/PDxypeEIAEBaZc2W8OBeZEN3+v4drMx3mc7lgGkxBenq2ddXK+QTv1RCX96oABuZYw9RZB6GZ8WS/CJCB/ByTG5YTL2TgoC0I348t6ESYB2T1Wd70xKtdFqCDXpoj/Mi62gSsA0UzA4LhrvCBEiriy3xwKjFybT9AH/nNOrumHkuRTv8HW2KknKulXB5SWa1PEfxkX28AVgGjGMpAMkTDVUBC6GV/WizAJCRcJYhu4AhDNCOquN0blugityvXguGu8IESKuLLfHArMLnuKD9AfKTwj1zxjP3m7Bu3UE5X0qwPak+uBcdcSphoKQjfjy3oRJiHhIkFsA1cAohlB3fXGqFwXYViuRZGQKKS8bXC8425OmCq0CWIu6UVhIpIZTZ2mWu8xKXct2IbjkEEB3uyTscxcl8pde9A5g+sTZjANs6fMpNUgBuRaXpzaAd1c7ewdgJKMHTDgrkd6XPmQUXe9MSrXRRiWa8nPRrf5qYTPDntG4MTCd4x9dS/C4nKbX0CJ3L1H+7y4DVKt9xgcd91/s7DnQcigACe6edlzXlGc7uleG9BbfAnSbp2o07JGwcgQu9TgahADcj2yA8LBM9vsgPGeD4y7Hulxqk1f3YsW9Hj0kFF3vTEq10UYlutd/+D8sLVImCs00g8ZFOAN6A4i5aTpPc2032uuM40HQydkYSfyBmiHeeGk1SAG5HrLHeDHwtHrObTB+Z4PuOsyhwwPzqHQBmd7rO56Y1SuizAs1yRee/3B+ZHnXaPp59gLd4fTgVYPrVBVFDKuAEHcD+p11BBVGSkgScB88Hq79A31HiuLknOrQQzI9dgOSLSNgOoSETUS7QCULN8BA3K9+SHz0VwFFvVY3fXGqFwXYViucdYxfFggogD4yv6p2Y9ksLKAz8QkeASdfFgoeF2/9R7D1qL/ZphyXRgyrgBqwKe5Leo3BFGg/QtR4I/2qKIgWpobmrAaxIBcsywZxLQipADM3AGuLZC/A4bcNb0AbHrIEFgoeN2ZHqu73hiV6yIMy/Wuf3B+7Fh1D98zULYTAdVEIeMKoMCcG3VFYa/RD2QQuPfUQXi/oEF63gUjC01YDWJArt16rLEDgm1yzyUyt2gHDOSuV+1x/5B5LrPJHtNTQ4hUj9Vdb4zKdRGG5doomDn76EnEROd4r/uD8+PW4hm92fF0yS8PGg5CxhVAA7hvwTLX9ATr44l6jSXcx+yPsniwsHlbXOFOL/xpdMMdGV4NYkCuz+2ATtu+OhXxA8exKq4vKBjeAaM9H3DX6/a4f8gcjGAv67G6641RuS7CmFzvmeHcdXsMyvVuGZTrvaLuemNUrovQqlzvylpk0p5cDzwzRMIdou56Y1Sui6ByXZ/25PrMM0P2h7rrjVG5LkKrcl35t7hXpT251mTIDlB3nY/KdRkq/xb3qrQn12eeGbI/1F1vjMp1ETQZUp/25Frd9Q5Qd53Pw5Dr/TP8W43t0d6h3ty4HHXXG6NyXYRW5fqBu+ud09zWV3e9MSrXRWhVrh/4uOudo3K9A9Rd56NyXQZ11zVpblyOuuuNUbkugsp1fdo71Jsbl6PuemNUrovQqlw/8HHXO0eTITtA3XU+KtdleODjrndOc+Ny1F1vjMp1ETQZUp/2DnV11ztA3XU+Ktdl0HHXNdFx1ztA3XU+KtdlUHddE3XXO0DddT4q12XQcdc1UbneAequ81G5LoO665qoXO8Addf5qFyXQeW6Jpq73gHqrvNRuS6DynVN1F3vAHXX+ahcl0Fz1zVRud4B6q7zUbkug7rrmugzQ3aAuut8VK7LoHJdE31myA5Qd52PynUZ9JkhNdFkyA5Qd52PynUZ9JkhNdFnhuwAddf5qFyXQZMhNVF3vQPUXeejcl0GfWZITXTc9Q5Qd52PynUZ1F3XRN31DlB3nY/KdRl03HVNVK53gLrrfFSuy6DuuiaNjrt+YNzLyu0BlesiqFzXp71DvdFx1w+Mf/633+zm37/+Lpxr5l9r3f5v4UxD/778azjX9r/mDvXf/O5fg7l9/8N/v/nNf/8f96JxD4gPv90Pv3spQVv87t8laIM3L//zjYRt8fW/SPAA+M+2jhlDW1v/veHtA5TrPa3Su3+RoC1+/wcJGuHLOwka4z9eS/AAeNfYMdPg1r//Gn8lM/JA+LcPtGr74IPKdQn+8HsJGuPlNxI8ANo71P+jta2vcr0x775I0BYf1F0X4dVDctfNHeqvmpPrz/grOvdA+Lc9Oa0PP0nQFq19sP1pT5foGTwod93cod6cuz6pu96WRuVa3XUZmvN3I7R3qKu73gGaDMmntTuk6q7r096hrrnrHbCvZEhzt8uJ1pzSl0bl+tX/kuAB0N6hru56B+zLXTc6MqQxp9RqMuRBuWsdGbI1mrvemFZz1411+w+tuusHJNeau94cHRmyMa3ZVKG1PGSr466b83cjaO56c3Tc9caouy6Cjgypj+auN0fd9cY0OjLkQ2Pd1pEh9VF3vTmau96YRkeG/L41d91oMuQhfatRc9eboyNDNkbddRHUXdenvds0mrveATruOp/m3LXmrquj7npz1F1vjLrrIrQ6kE9z1zVpzl0fNHe9LY2ODFF3XQb9VmNN1F3vAB0Zko+66zKou66J5q53gI4MyUfddRkeVO5a3fXWqLveGHXXRdCRIfVRd7056q43Rt11EXTcdX3UXW+OjgzZGHXXRVB3XR9115vzIL/VqOOus9HcdRk0d10Tddc7QN11PjoypAzqrmuiuesdoLnrfNRdl0HHXddE3fUO0JEh+ai7LoO665qou94B6q7zUXddBs1d10Td9Q5Qd52Pjgwpg7rrmujIkB2g7jofHXddBs1d10Td9Q7QkSH5qLsug7rrmmjuegfouOt8NHddBs1d10Td9Q5Qd52Pjgwpg7rrmqi73gGau85H3XUZNHddE3XXO0BHhuSj7roM6q5roiNDdoC663zUXZdBc9c1UXe9A9Rd56MjQ8qg7rommrveAequ89Fx12XQ3HVN1F3vAB0Zko+66zKou66JuusdoOOu89HcdRk0d10Tddc7QN11PjoypAzqrmvS9sgQKomQitIcZLoMzV3no+66DJq7rknb7ppKIqSiLHenvPfVkSH5qLsug7rrmrSdu6aSCKkoynXu+6q7zkfddRk0d10Tddf5ZL+vuut8dGRIGdRd1+RBjAzplxQl++3VXeej467LoLnrmjyIkSH9kqJkv72ODMlH3XUZ1F3XpO2RIUKn5Onhk1nucCuzXHt5MmWXZvb2cLy4OFwHdTeXpuT04oaLDJ0GeKlLLIO5GzTl6xETElNhEFIw9GJGx13no7nrMmjuuiYP0F2THgIZXYfwjgouLo4QToIrEdm6i2dU1G+AlqLXQe5xY1GgeompBzIBLkQw+GJG3XU+OjKkDOqua/LwctfGKVuOVCAzXUicJRbY8fYacEudTPxMYuJpUDkm1yD5YkZz1/mouy6D5q5r8uDc9cHERyPFz+CRvf093FzdsA6fTIQ6yCfXnYxwPkMlqXO/AV5K0icoRXiLF1Abwdv7yIcIRl4MdGRIPuquy6DuuiYPzV3fmlA88RMTIh+NWpJd1HGEnMRzBCgJpNZIaaIB34Lh7nBkE36DUopcEEQ+RDDyYvC43PXrl6+G13e0coyK7vr+5as3Ek6nsrv+8HKhUdPcdU0emruGN5YcNDQZ+WLUcuIBEftcRHEJJbWNrCYaCFoIQWkcBFFcO/JikOGuv03yndSCj99++6cfDVHhCKtbjsM3MV+/ffteqs5UzmF9d3365pt37w3fvJYCi6mIeLmkz1u665Pp9b3Ewh+lr8KHz2/f/pdUzaOMu743a4CPoj3usUv+eaU+rH6oP//mjenef0FDtiHXXX/37be/Gi349duPUhDz3S9UKXNrcGZkCPaxhChGwsHXIuLxH7YM0zsqucIdx0/JBmipcCSHccdPMZpElnRBEPkQwciLQYa7/j7Jj1J78d2vP0uR4a+ueIzVLceHtz38+o5WzmFld31680q6Y/j8UyQd30hxwHy53s5dP3+PHnXO6y/UzYhlZ36J3PXpJ/Svc8EBH8zVnPj8U6J2Nisf6n90G3mza1qWu/7z334QJTD88KuUev7ktOLvaTVfwBl3jTAAGQ9MfWUc+RIb42+AS5nQIsTdC3/yUoELwgVdGJQZei8Gq8v1n6juo9/+wv/9M1WMsrrlKCPXq7rrD4FWM6EVTcj1/GTIZu4aH1AMnfP6D1QYsUzwCrjrd8b6p/p3ivbK/E3eY91D/Y10jHgVXeBXY7m7/u7HQKuJH+KP2x//IuVEX8yXcSZ3jTBEinxlHPkSG+NviK9h3LA/gopcEC7owqAs9WKwPBnynWzdDlz5I8/87c8XH3/l8Pvvz182S7hrf9CNVs5hTXctnXr1+uL0jsO3b4OMSEKu51vljdz1vZW0zlZMuOtlcr159vS1ddDd/p1IxV++uxePna/Xqx7q9Jnm7Zv7d7ypSaZWZ/nWF+f260djsjn8/gepIj6Smv/wi/V4kz6Jn2eeu0axTJKRL7Ex/ob4GkIE93T5dM6tRgrSLwbL3XVarv/GlSzX7LS/pfj77/9Cc2Os7q6d4nn8QTdaOYc13TXLNev/ieLo9FtFrrdx16wZoLMVKb0QIzUz2dhdcx6E6Mo1iTTtBhbuhQdKwJqHOh/IdBzwKryi4pVZ7q7ZO3Na2pq30EJT/V/JcP+VKn+h4lzOuOsw9Sz42n6EqSSWoaUnHnXNBR4sJSHaP3K225X6ah+lxDz5YrBcrq0Kx8inHJLrnzmW3WWN9wgl3LW3qqOVc/iwtrv+LB9nrX74biXkev5ZtIW7liwC0elRwl1LzUy2zV3jFqilI9d8JeKtxnmHbAO74qHOV/WXQbzgEn6eTHctPk4E+fu/yqyBFZytHcdBZQbTR4ZYfG0/wlRG2fVHhjiwVC8cctd8L5O+EEORC9IvBsuTIb/Qlu1gHTRtdnub1y559rbv6u769+bQ/fwq5KVP7I1WzmF1p2Q/a99jxuAvqZDrTp/nX2LWd9cuD0J0eoTc9dfSW2bh9trSXb9+yX1n4uNANJBnZJ/kbsIVjxm+qEuH+Nr47zyzKpnu2marJU3qU6MfWcBljuJ10tdnRoZg2LT//gnha/sRpp+83zU6nWggeB2FLMg0WociF5B95nGBdKxR5GuTLwbL3fWfzGb9ORyih7yUVWTaKXaP/BkzhrOfcTZx14OfDEcr57C6u3Z6hxmDH/wBuc7u8+ru+rfo5NfvBzK/UJBlIyQ7bJi7Jsl7+d4abCkV2Fzbzc7LsJldznqHulw/5JiRm47Lbg6MkueuXbIasgGccLChtvWcvY5S20s5961G6ORzjHO+O5wOTyGOvrYfYUoKe43X0ddj+g2E7SNX4r7zKKUou73CkqTC5rX0HUmpdUH6xWC5uzbb3WY7iI9mM7tPMd/++uOv/PHGYLPcZ8eGbJK7HjyxRivnsGbu+v79m/f+RhadeuGdLch1dp9Xd9dGrj+bk/k197arFZDCFcZSbOquzSXlayN4NtckpQJfhuwVR3I7fB4tZr1DXXJ6Mif7YJXLY8xyd/3Lr7/+6D5Z2xyqzFqBtrcXxXxPGEZ2lnPPDKE0gwOJDky5rh9h+gl/CLLZ/QbC9oNnNAF6BYk0LUnfmySe4w8qz70YLHfXZsNGn1lgrp1CR/T20BDqrmNsMsSfKPt01xeff6KDjnu7nbveLnd94h7aDU5llj9ymd1ocks185K33qHOWRx7DZfEzSo2JGalzzZyr9H5Z/FyVkqkeo1syDl3fXXHzpagZ5YioJpEhKl7gchnr4Go/RdUbjgg2U2Zj6c0TxkUevQeoEEgKDn3YpBxq/HXH4NMCJnrgbF6sgsiL55kdXddRq5X77bFjl2RWcMqcr1+7lqsJve2K9fIXe/dXcsaJOVa7KuVa5nNvESvd8xwd9xBwbma/y1zK5L7rUbh7ywG9s6jvbFljZ5YO1edwdkn8l1dPcMTrS+Op0vOE/vafsRTft41VRCdBuL2b0/GxBwPz+xQEgOSG8/5juXtCW0ZIXavOfdiw2qPeIK5HhgwKXsobb1DVnfXuJs4qG6jlXPYzF1LIjKwpjt11wJ3t8XctZCUaxmfY28oSMIkcy+sdqhL9sMdgnIDYf3k9UpbX74x45yeZD9sskTk+ry1O0/KXS9nzbaWs9xdx5C5Hsg48a3fCbcPVrepUOTBz4WjlXPY7Il8fOrRUSdAK/aXu7ZQd5O561XkevtvNSblWka9WLkWfcwcyrfaoS6fwNwGlt6uf0Vex13LsIO/y6wb5Wvl2t7nktkcUiNDlrNmW8tZS65hrge+ByO5kP8psyNo7jpCPnaHp0mr7nqVZMj2zwxJyrUMF7FrJcuEF9EFrHaoSyq9K9frX5HXcdeszsHAanHbVq7J9hlkNocH6a7XSYbQVk4P1JNxledTIRu4a1iP/7h4/eb9m1dfek+KG62cw1a5a9aJyJiyXH/z4f37L6bPbsDfPAq7a+Su359ev3//5uVP799kjKio5K7Tch0vM5vVjhmR69/KrE3drJXj9KziriVTHXwM7yZHeHYVuVZ3PQTM9cB3kfh6OulW7ybuOuDryOSNVs5hI3fNJ2LctiROLZ8X9bmCuw5YLrqVctdStq5cr3aoy9Z1F/Xu/GqssvVZnN2oPoN8y7Er1+EohoWoux6CzHXaP/P1dNqd3k3cdcTLQEpGK+ewTe6ac6SdzIcd2uxY0ucKueuIL8H4pzlUctdSZj8W7Mxd/wv3xl23ZWuvL9druGvOi0ZCQSXbyPWjcdcf8aMCQyRkGeY6PYqPby1MHJczw3LgMfiD+HV69/nzqzfv37x/JZ9ooztEo5UzmOyupXtJuj6ZnyXUy1N/8/ltp8/zswtz3DUe1j9Itx3pUvcK8ubt5y/os/ue98JPI8ty16+ls0k6EtSgu5bH03bd9eKPioOs4K552EesH1TUl+vzj+88y7rueh+k5Xrg4ahMf5ANmeukJPOzEaeOopxhOexJkyQ1dsJ6vKRUjFaeZXK35V2SdG9dkbaN3VW0fZ5v0+a46072Jab71lI8aPhPVrCX2ftl7rqT84rpmNBycr2au+7KsxwWy7bwGPnumlWlc4drIBkiczmsOzJkH6STIaNy3R8AQp9xkqP4KHE9+fm1MyzHqFwnVc6mUJNudLTyHJPdtbxJko6zp7NuvF2r14PqOMQcdz0q193+SfFIh0Svl32MWebvNpLrvY4MkS28/u2JbHfN1q372bwzMmTFgXyPx11//PHX4X/9ZAiukMmB7TQGfvoXSmdYjhOerTH0L3kJsk+PTn5MHK08x+TcddjH7r/4nUljzlwF5NHL89OUc9w1nmHy2yEmJkMCrPovOvWXuWsM/Rn812kxKdedL57IMpmj31dz1wMD+XK1tU+2uybr1hs9Ju66I9drPEJ13dz1PlhjZAiZ6/Bur4VuM874bYjVLEcScdDp82S08gzrjwwhVTvbqtjr2eOwC48MiRDtW3RZrDTuWvyqVSu54mTK7WqHunx4cAeL9DZjvOQAue6arFtfJdJfkzn/UybneZDueoWRIbhA/jVxb4BuM875JZ/VLEcS+Up32haNVp5h9W6Tbz6vwtLn2ZmFwiNDIsT8LbrAVRoZIldFe40TuV50wfGsdsxId9zRInItcyuS6a7JuiVGKciX0G2NfOtxjmoMoe46CZnrRMbjO8j4rGe1bOuuZeBeWt1GK8+wtrs+wYJOuHDImTq7zzXdtXx2XyRWq4z8HSUp13JVtCeK2NnMbbjaod59BB9nyGZ/4jpP3tYnGU6lReX517ZKnhmS0PXZqLtOQtmnhLnGx5wgo/3jz2ef27KtuxZ1S+vgaOUZ1h53DTsX3Ml683JgcPVSua7prkWuW3LXspltdljWIDPbsN6hzvpsjxdR70zvnyLPXXes219+tumOjp0W9V5hHN/DHBmSfeqSufaPbHGg/Ae/2ZGUknCQtd31h/fh2GBxSfY8Ga2cxcruGkb/cyB55ny02vAu6rN8Ith57hrDm/235bvjzuZQKXctq2UPDU7n5NrX9Q51ydXIRpfvUY1dMReS5a7xUM4gH/1LMMf3Gq2Vo29wrPJAvkc0MmQOtLn7o/jonoEv/uWHCbd713bXOLO89xRFtkoxWjmLdbtN/sifGq/RTyvXJHYSL+/z1u46fpQJSvwGktTqoqedlHPXsdqxQFv/ym42tyvrHTMi0HIJ5mNi0YfEM+S4a3hmf/Z//MVohlNkFmhr5fi3ZdbIhTzM3HVuMoTMdf/hqDzIMubsI1TXdtekDe4ok0EJVvpGK2exrrtmcYiRKpZr542X9nkrd21HQ8bnNRXZPsoiQapnBuVy17FciyDyJYZTI7MTUF1WPNT5MJBjkGcWPvtrlIytbwdTh7jMiGRDeIQfL7nKTzWqu05B5rr/LD5S8Q7Fc9ekfPZb2pI6cNI6WjmLVXPXyW91SB1/8LVaJ9oyv89buWtJ8nbsPhXZLSSf3Jed+du7a7vxO9czvoJy/oPXIDvZsOKhLpudjmQ+JlY+jZgMdy2/TxLh06dcy+LAVjv9aM+56MiQPiTL/SxH6np6fjDl2u5aTjM6kN/xh9iX1ueNV85iTXdtv/sS4bwcZ365z3KWLujzRu763nb98x+lhOAy3kQ540LMHts6d/3arsHXsRzLTsFm4+v6opxZxJqHOl9BcDXhjmZb/yTL3bU8NTXGD9WTJyxjbAiPC1ljFJ9BR4b0oU3d376SkIr5P1I5yCbu2sjHy/dfJGcaiNto5SzW7HbSXLvzT8zp27w+r++uv3n//v9JaoZ4+ZO/JSpFn1+9/09ZZPbXMIUt3fW79+9/itYguqkrOv7yPR80+Wq97qHOvfr6py+0Bgse+jWF5e6a89EdAs2gEb/GX//IX5lJDFtYhI4M6cHjbvrDbqi4y9kx2Gu763eiaZYv4RE3WjmLNd11KBkONwzhG7nGWF4tSlKu767FNUfYjfLGWlbhp8WJhC1z1zJiJSJQ1Ptgw39eoxvrHurhNl56MTzH4q2f/KQdJTw+ylcbwV/XyYQY1F33+PYvhoQMo7jH2fu9a7trc4X98NMrkuXPr171fnxltHIGa+auv7xKEFwOXJ/fvnr1ZuEJtL67/iAdDXG/b3Jx/+bLK/Z9r77k/GrPlu76jfQ6JDLRr9/zlXSla93Kh/rpgzjsnO07zmJ3/fFnOf9Dfo6/jv7nH3lowt9XGRPCbJu7xm+an57JDLg9HMzbnQ7XMr8J+QP5VmRtd12Itb/VuDWbjbvemO3HXZejvUN9+3E5K7Opu4Y0Gw4ye3UbZKBCEV+ZXcn1+u66CK11e7Nx1xuz/ciQcrR3qOd9q7ECW7rrZ/QOBpHma5llnIivzhqPeFoNdddFaNZdPyC5Vne9OVu66yNpsrHYJ5qN1friYrOEiLrrfLb5rcbtUHddH3XXm7PlyBBpWCZ3eKOLw60JkdI2oHQLNHedj7rrMmjuuibqrgOkYZmQRN8hMpDTvpSZtdlVMkRz10VQd10fddebs2Xu2gg0J0OOZuYG72PVmu9Cco5kfdRd56Puugyau66JuuuA6FbjpZkGdxdvTofrG4nXRt11Ppq7LoO665qouw4JB/IdTfCUSjdH3XU+6q7LoLnrmqi7jsA9xSMP44Ncb2WnO+jIkHw0d10Gddc10ZEhQxR6G6DjrvNRd10GzV3XRN31EIXeBqi7zkdz12VQd10TzV0PUehtgOau81F3XQbNXddE3fUQn8zblMpd68iQbDR3XQZ11zVRdz0ERokEI0Nujoenmw3kU3edjbrrMmjuuibqroeAXAfjrjEMG9+e2QJ11/lo7roM6q5roiNDhqBHhvhvNWIuUO9VUXedj7rrMmjuuibqrgeJnhlCM48iGaK56yKou66PuuvNKZa7lq+k44l8N9f4zsxm5lrHXa+AuusyaO66Juquh0G6OuCTFK+Puut8NHddBnXXNVF3PUKk1899HnttNHedj7rrMmjuuibqrseQnyUAp+3UWkeGrIDmrsug7romOjJknOsDFPt02PCHddVdr4G66zJo7rom6q53gLrrfDR3XQZ11zXR3PUOUHedj7rrMmjuuibqrneAjgzJR3PXZVB3XRN11ztAx13no+66DJq7rom66x2g7jofzV2XQd11TXRkyA7Q3HU+6q7LoLnrmqi73gE6MiQfzV2XQd11TTR3vQPUXeej7roMmruuibrrHaDuOh/NXZdB3XVN1F3vAHXX+ai7LoPmrmui7noH6MiQfDR3XQZ11zXRkSE7QMdd56Puugyau66JuusdoO46H81dl0HddU00d70DNHedj7rrMmjuuibqrneAjgzJR3PXZVB3XRN11ztA3XU+6q7LoLnrmqi73gHqrvPR3HUZ1F3XREeG7AB11/mouy6D5q5rou56B+jIkHw0d10Gddc10dz1DtBx1/mouy6D5q5rou56B6i7zkdz12VQd10Tddc7QHPX+ai7LoPmrmui7noH6MiQfDR3XQZ11zXRkSE7QN11Puquy6C565qou94B6q7z0dx1GdRd10Rz1ztA3XU+6q7LoLnrmqi73gE6MiQfzV2XQd11TdRd7wAdd52PuusyaO66Juqud4C663w0d10Gddc10ZEhO0Bz1/mouy6D5q5rou56B+jIkHw0d10Gddc10dz1DlB3nY+66zJo7rom6q53gLrrfDR3XQZ11zVRd70D1F3no+66DJq7rom66x2gI0Py0dx1GdRd10RHhuwAHXedj7rrMmjuuibqrneAuut8NHddBnXXNdHc9Q7Q3HU+6q7LoLnrmjTqrh8WH94qiqI8QB7QpzHhm3sJ9sB9m9v3vjG3+u4kQWM0msNJ0t6h3t5R8+Hi/wPui4DCDe8l9QAAAABJRU5ErkJggg==)
La temperatura mayor es 20 grados centígrados y la menor es -72 grados centígrados.
Ahora expresa la diferencia entre éstas:
La diferencia “D” es igual a la temperatura mayor menos la temperatura menor, ya que la pregunta así lo está planteando.
D = Temperatura mayor – temperatura menor
Entonces, sustituyendo en la expresión de la diferencia tienes que:
D = (20°C) – (-72°C)
Antes de resolver la operación, recuerda utilizar los paréntesis para no confundir la operación de sustracción con el carácter positivo o negativo de los números.
Reflexiona:
¿Qué operación estás realizando, una suma o una resta? Como puedes notar, es una resta.
¿Cómo son los números que estás restando? Estás restando un número negativo de un número positivo.
Entonces la estructura es una resta entre un número positivo y uno negativo.
Presta atención, porque utilizarás varias estrategias para resolver la resta.
Utiliza al inverso aditivo para resolver la sustracción.
Recuerden que, el inverso aditivo de un número entero es su simétrico, de tal forma que, al sumar un número entero con su simétrico, la suma que se obtiene es cero.
El simétrico de a, es menos a.
![](data:image/png;base64,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)
Utiliza esta propiedad para convertir una sustracción en adición:
Por ejemplo:
![](data:image/png;base64,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)
Así la operación 20 - 72 negativo, la conviertes en 20 más 72, porque el simétrico de 72 negativo es 72 positivo, y basta sumar 20 más 72.
![](data:image/png;base64,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)
La diferencia entre 20 grados centígrados y menos 72 grados centígrados, es de 92 grados.
Reflexiona nuevamente:
¿Qué significa esa diferencia de 92 grados?
Esa diferencia significa que desde menos 72 grados hasta 20 grados existen 92 grados, esto lo puedes observar en la siguiente representación, utilizando a la recta numérica como si fuera un termómetro.
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Pero ¿qué significado tendría si la diferencia se realiza de forma que, a la temperatura menor, se le reste la temperatura mayor?
En este caso, la diferencia sería a setenta y dos negativo restarle veinte positivo.
![](data:image/png;base64,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)
Recuerda que una diferencia se puede convertir en adición, aplicando el inverso aditivo al sustraendo. Entonces tienes que 72 negativo menos veinte positivo es igual a 72 negativo más 20 negativo.
Resolviendo ahora esta operación, tienes la suma de dos números negativos.
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)
Sumando 72 negativo, más 20 negativo, el resultado es 92 negativo.
Si recuerdas, para sumar dos números negativos, sería como sumar el simétrico de 72 con el simétrico de 20, que es igual al simétrico de 92.
Pero ¿qué significado tiene este resultado?
Esto significa que, de 20 a menos 72 grados centígrados hay menos 92 grados. Esto lo puedes visualizar con la siguiente recta numérica que representa al termómetro.
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Observa que, en los dos casos anteriores, obtuviste como resultado a números simétricos.
Reflexiona:
¿Es lo mismo restar 20 menos 72 negativo que, restar 72 negativo menos 20 positivo?
Como bien puedes observar no lo es, ya que la sustracción no cumple con la propiedad conmutativa. Además, el carácter positivo o negativo del resultado tiene un significado.
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La primera operación, 20 menos 72 negativo cuyo resultado es 92, quiere decir que se está comparando al 72 negativo con el 20 positivo; es decir, cuántos grados hay desde el 72 negativo hasta el 20 positivo. Esto implica que, si a 72 negativo se le suma 92 positivo, se obtiene 20 como resultado, como lo indica la imagen.
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De manera análoga, en la segunda operación, 72 negativo menos 20 positivo, quiere decir que se está comparando al 20 con el 72 negativo; es decir, cuántos grados hay desde el veinte hasta el 72 negativo. Esto implica que, si a 20 se le suma 92 negativo, se obtiene 72 negativo, como lo pueden apreciar en la imagen.
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0baFXE11B7S5YsYS2TrbVr17JqtP6mQ3327NlVq1Zlb9WoUWPmzJm0Ksq6vlRPNOR5eXlRizVp0oQ1UeXKlWfMmGFhYaH4uE0rKytDQ8PatWuzOpUqVZo0aRJNOXhinxzNKF27dmXto0hfX5+vIUNz8969ezt16kQDKb2roaHRu3fvffv2ZbuBBKFQ+Oeff1JD9enTR2nnTP2TlkSjR4/W0tKStTTXuHFjGhlosY5sBUObOlr3bN68uXnz5qyJGjVqtGrVKpqslfI+9vb2S5curV+/PqtWvnz5MWPG0FIJz5KUo8akYfCvv/6iSYS1UoUKFaZOnaq0x46MjPz777+7detWpEgRqkP/pWFhx44dfn5+fA1QQAf4rl27aCHUvn17pYQOzdG0/J04cWK5cuVYg1P/pGmIdubIVjAhISG7d+/u0KGDfDahcXL//v1UzteAL6G+ZGZm1qNHj8KFC9PCmy/9xMfHZ/369S1atGA9sFSpUkOHDj158iSSj4pob0JryAYNGshbycDA4Nq1a3R08zVkR7qpqemQIUPYRpK0bt2aPuXi4sLXUHs0Kbu7uy9fvlw+Ebdq1YrmjuDgYMURj5Y37969mzNnTrVq1Vg1+oEW7TRa/qpsxa9PVdBs8ejRI2ovGgRZo9DxTFtoWsqsXLlSnoagVePWrVtLly7NRkymaNGi9erVu3XrVtZvw9QQNcLLly8HDRpUsmRJWr6whqLGpOO2ZcuWly9fpn9jqka98OnTp7TmptZjzUioMrWtsbEx8uUMrbb5pvlEseNt27aNVaMjfOzYsfKRkaHe279/fycnJ1ZHzdFMPGvWrIoVK1J/k7dhsWLFqN1oXc7q0Kw8e/ZsTU1N9i5DA0Lnzp3fv3+PbSGhRvjw4YM8Uato3LhxfCVZtTNnzlSqVIkOfP5t2WaG9jxHjx5F3kcJNcipU6dod02tREtJxfahlqTdNW0I5RMTQ6MrzdnI+zA0AK5bt452evL+Rj/QyyVLlih+f0hri0WLFlHTsToMDQK0lKQ5Cwc4Q8txWn8rtRLNJt27d3/+/DnLfVNbXblypXr16ooHOP2spaW1Z88enKWiJCkpica9pk2bUivp6Ogofa1FDT5gwAClA5ymIZqbfH19+UpqjDobDY80dyjNJjSbnzhxAuc85gW1obm5+ahRo1gbnj9/nn9DhjZgO3fuLFOmjNK+pk6dOtevX8e+hgkJCZk7d67S7o+mD9rXUCuxQY/a+dWrV9ra2ln3NStWrMD32Yynp6ehoSFtWOQtSd2yRo0aW7ZsUTz9hH6eNGlS1n1Nnz59aFHEV/q5fn2qgtpuwoQJ1BC0Ct+9ezftou/duzd//nyasBs2bEgdkVWztLTs27cvVaNp++TJk1TNyMiI5cLnzZvn7+/PqqkzoVA4Z84cOoDr1atHe+knT55QKx0/fpx9E0ubZw8PD6pGh/3y5cupg9Jyx9jYmOrQrEOzONWhmnS0s9+m5ry8vKhlFFG3pJ5GkwrtXt68eUN1aKq+dOnSb7/9Roc99eF///33/v37rDPTXH748GHFjK96ovGF5mZqDWo32r1QM965c4d9iU127drFqlHbsk348OHDaSFOXff333+nKadUqVI0hmKaISKR6NatWzQkli9ffunSpc8UKF6O5O7uPnHiRGpJmrP37t1LDb5jxw7qolRCqyXFmkAEAkGXLl3Yt9O0aVFMVcTGxlIDUr+ltc6CBQuoT1LP7NevH9Vs3Lgx1pHMgwcP2Allo0ePvn379s2bN8eMGUMvK1WqRN2V1ZFIJNRL27ZtS+WDBw++cOECdUua4mklRLtEmoOyPQFV3dACa/v27VpaWtQss2bNooZ9/Pgx/UALIZqsZ86cGRkZSdW8vb3pZ2rJRo0aUX1qyX379rFc25AhQ6ytrdlvAxIWFkZNRMshahxCR7ridXC03j127BjNTdTgf/zxB62Db9y4MXToUKpJAyZNW4on/aknV1fXcePGUYO0aNGCuhl1NlpYsjMf6TDHlzF5QQcyDXry/TOtGPk3ZGxsbAYOHEjlnTt3prU6tTCNh9QnqYT6JPJlhA7D06dP16xZk9qEZhk6SKmVli1bRlMMlejr69MWkqrR7nr16tXUzjQfrVq1iuqcOnWqffv2VKdjx440AbHfpubOnj3LEhA0s9Bu5eLFi6z7NWnSxMzMjNWhfc21a9fYaRdjx46lOZ3GxsmTJ9NLWnzu37+fRk5W82f69amK58+fV6hQgVph8+bN8nNB/fz82OlSixcvZiVnzpyhrXWNGjVoX81K6DCmRTmtdWiD/eHDB1aozqKjo9u1a0ctOWnSJMVvV3bu3EmFtOB+//49vaTVDC24qb/Onj07ODiYSmgpuWfPnsqVK9M/BE3esg+BMmqrkSNH0vh4+PBhdjVNXFwcjZjUkh06dJCneF6+fEkvixUrRpvt8PBwVqi2PDw8aIwrVKgQDYh2dnas0MfH5+jRo5s2baK2opc0FdHPpUqVat68+b1791gdKyurPn360MRDG+xsL+9UN9TlqNGqVatGs28uGxJaGFEzli1bdsOGDWw4jYmJWbJkCTUv7Wfu3LnDqgGhxc2cOXNobGSUUhXU62h+oQN52LBh8jNIaZtNUzjtHtetW4cvFYmzszPtXnbt2iU/ummNSHMNteehQ4dYCS0yaH6hPtmwYcOrV6+yQkdHR9oWFilShP5LOyJWqM5oPcMuohk0aBD7UoHQDyz1Q0tJb29vKqH1Utu2bamFjYyM2CmQNDLQ9oaat06dOpcvX5Z9Dj7SasfAwIDahFY77KwK2g0qpipoQqf1Oh3g/fv3t7W1ZYW0LqfKNKfTzI77Bdy9e5dag/Yn8sU5LTIXLlxIswl1SNrqsGqQLTo8t27dqq2tTQcsLWbY99hKqYrz58/XqlWLpvUjR46wM/ADAgKmTp1K+xraYL99+5ZVU2dCoZCGRGq6Vq1ayWcZOnjnz59PhdQ5aftKJXQIU7XixYvPmDEjMDCQVTt48GDVqlWpjnwyUnO0U6aVIbUGy++Qf/75h5qR3Lhxg5UkJCSsWrVKU1NTR0eHphtWaGZmRuMnjZbTpk1j28af7NenKmg0ZC315MkTvkiGZXPHjh3LXlL70r6Fjl42YROxWHzmzBk6pKkv0gKdFaozmoZpQKRGmzBhguI3frRMpMLq1avb2NjQy0ePHtWuXZtW24qDJi0c2YkVtOjhi0AB9f7169fTgTp48GD5QU5bnREjRlCj0YZHvqyhgXXBggVU2Lt3b5zsQwdm48aNaWFNax12/VFWNO5Mnz6dWowOdvkJFCkpKWvXrqXC1q1bOzg4sEJ1RmtEOjbLlClDWxeaNl68eEFTCy0W5eMhc/LkSS0tLVqgs/mbSKVSGlppMUTrS3meF+iAPXz4cKVKlerXr89y5UqpCnt7e/adzI4dO+T3nQkJCdHV1aVCWk3iJgvZevnyJfU02uydO3eOlVCrsmXl0KFD5SdQiEQilkOn8cHS0pIVqrOwsLB58+bR0S0/G4VhrURHtJeXF728cOECdVda8yh+T0hbmnr16tFaaN++fXyR2jMxMaFBjxbW5ubmdLRSG3bq1EkxVeHh4dGzZ08qX7NmjfwEiqioKLbyHDVqlGJl9URtSDMOdS3F7wJpw1ClShWa02n5zRdBdmjD3L179zZt2piaml68eDHbVMWWLVvosG3btq27uzsrkUgkVJ82ipUrV8ZXC4TWjbQUHD16NPVGvkjmypUr1J7FixdnpwPQprpu3br0kuYdWvOwOq6urrRnpGrLly9nJaCEeia1Dy0aHz9+zEoiIyNZfnzGjBnyE8NpvbR48WIq7Natm9Ka8+f49akK+uPZRVzUZHyRrLFYIk1PT4+VzJ49m17SVlxxw0NLcHZiFb5MILS72717Nx2unTt3Pn/+vJsM9T+adKtXr07LIHZ9NbUVtRgtJRWv9aBZmUZVKv/999/5IlBAW+4WLVrQApFmGvm3qf7+/iy/s3r1albCbNq0iQobNGgg/3JMbVE/pH0Lra3v3btHR66Pjw/1SWo3xaOY+h67tuuPP/7gi2SOHj1KhfRZnDNFQkNDaQykmZh21H/++WetWrWocWi9SI1mbW0tn5tp6cP6nuKpKC4uLqz+9u3b+SK1R/MOHbw1atSgNmGXdfTv318xVUGTIjvFVOlGaJMmTWKVcXmXEloivH//njokTTcTJkyQZxjpYNfX16dGo0JWwtCKnAppJmJnV0FWYrGYFtnUSj169GDT9/79++kl9VtnZ2dWh9CIyk4cUJqJ1BkdvydPnqQ+ST+z1aNSqsLOzq5OnTpUrvSNK7s+kSqzK27U2YYNG6gpGjdurPilCx3XdIBTOa02+SLITkxMzIkTJ9h3Bi9evKAWI0qpClqWUyEd3bT74otk2V4aFan8n3/+4YvgcxKJhA5baiLqnOyUqJs3b9JGkvaDit95U6uyteXUqVP5IviE+id1yzFjxtBssmDBAvmKMTg4mOV3li1bxkqYHTt2UCGNmYpTz0/z61MVtA9h5z1OmzbN0dGR9oG0KKcFN7s2SVdXl1Vjl8pQt1NcTdIhzS4zvnDhAl+kxmi7EhcXZ2Ji0rlzZ1pkU/+jGaVy5cpNmjRZu3atn58fO9WCnfCjoaEhvzaJJCUlsW8YpkyZwhfBJyKRaMmSJdTTevXqFRAQwJfKTtmlgZIajZqXL5KhzQ8V1q5dW54pV1tsOqFO+PTpU+p4NALSnrl79+5UHvbp4bg0YtK6kKrRGpGVMLTQpELajbMLl9QcLRYNDAwKFSpUsmRJak+WoiX0cty4cewbV8JORWnYsKHi4pLeZRcYb9q0iS9Sb9Q4tHahlQ1tnmmGpqmHGkcpVfH69Wt2n9fzn98IjVWm0VJxcQnkxo0bHTp0oA5J4yRNzbS2YOU0uVDbUqNNmjSJlTDsazH6V5CfZQpKzM3NaRtToUKFzZs3s9QYWy/S5O6m8LiukJAQdq8ffHkoRytJ+WWws2bNosZRSlXY2NiwmwIcOXKEL5IxNDSkQh0dHdxChd1cnBaQincRpo5H3Y/K5TcXh2zRdpqGPvYtAg1x1GJEKVXB7jtDs4niOXq0HysuezYfzlvJiZOTEy2HaHG4cOFC9jAa9hUszSa0/WZ1CE3obOoZP348XwSfnDhxQltbm+brESNG2Nvby8/EDwwMZFvylStXshJm7969VFitWrVfcpOaX5+qCA8PNzY2piOzbNmytMceNGhQnz59qKWoBaldhg4dyqpRV6OXOaUqTE1N+SK1d+3aNfYFixzNx3v27JF3RBr+qLBYsWLs3pBMYmIiUhU5ocOD9tjUP2mnp3g6AG1y2C27lFIVNIVTIe3JFVeT6omNbnR007zChj+mTp06+/btY4/jiomJYfdYUUpV0EhKhaVKlUKqgjg7O7MbHVEz7tq16969ezRwb9iwgbpZmTJldu/ezQbG1atXUx2kKnIhFou3y+5fSLs7dsIODXrUOLSmUbz9BE0uLB+UbapC6XswIKdOnWJfU9OMQ/s9+Q0+aBXeq1cvKldKVbDFZaFChXDPs2zRvnrevHkaGhrDhw/39vZml7Jv3bqVGq169eqKk0twcDBLVSh9DwbM77//To2jlKqwsrKiQYDKDx8+zBfJsOs327Rpg1tNrVixgpqiSZMm8ov/CVIV3+Dp06fUYkQpVcEuTaK1t+KNUZCqyB1N07TyoZUhzcICgYDlxC9cuEAtRrOJYuI7JSWFpSoUn5IGDK2C2HmjtDhct26dfMUYEBDAvoJVSlWwOwlUrVq1YKYqbt26NTs7c+bMYU89oQmYVuHTp08vLbsXF2uL5cuXd+jQgX4eMmQI+z1jx46ll3379lVaTarPWRXu7u60/uOb73Py4e/t27f6+vrU80aMGLF58+YtW7bMmDGjUaNGNBTSPwRL3GabqqC3WKpCHU6Uoi5ERx3fdp9bv369/HYJcjQs0m6wbdu2NjY2ijcB8fHxYc9WyDZVQf8KBT5VYWJiwjfc5+j4DZU9+mjfvn3UFIS22bTHo60y7aXZvoW23DT0UB0aWdh1NNmmKtTkrAozMzO+7bJgU29ERMT+/fvpiL537578ymrqq/LrEVi/Zd+DNWzYUPH0H09PT5aqoDGBLyq4qKGoj/Ft97njx4/TQEcb46ZNm9KRKz+9lp2yJ0+LMzS5sCsTs01VUB9Wh1TFuXPn+Lb73KJFi7Lend7V1ZUmYjrG27dvX6FChVmzZrEzRWm9SGtKajR1PqvC2tqab7sssr09YXR0NC0fad5RvGczoUOYGq169eqKp+yp1VkVcXFxNE3zbfc5ecZWSU6pCrbmzDZVQdM9UhXs4qOcUhW4nDDvckpVsKlHKVVBy3iWqlC69hAIzSZ///13tWrVaJFz8+ZN+aWv2aYq5GdVKF17CEQgEND8TitGmjuoPelgZzehoIOd2pYaLdtURYE9q+LkyZN9stOvXz9zc3O+kuy2jrQKHzVqFK1m6CP+/v6jR4+mdqESVoGlKuhT2X7xpXT8F0h2dna0mOab73MHDx6kCtQytNkrUqRI9+7dFe+UO2PGDGqiQYMGsbPET58+TS+LFSumeHtheapi5syZfFHBRePXkiVL+Lb73PTp05VO+6SFEbvQeuLEiUrLIHmqgtaUfJEMuwCENucF/gKQDRs28A33OTp4WY6WpSo0NDRWrFghz9rS0px9+0ofp5c07rBUxbx581gFhqUqypcvrw73qqA24dsuC/mdmbNlZGRErUSTDVtYs5c00yguLuWpCnX4HoxGPDpU+bb7HPU32tSx5E7r1q0PHDjw77//0nKnq+xxzq1ataLNM71kTUeTC7sRmtIpeyxV0bdvX3W4V8XOnTv5tvvc8OHDc3lsx/Xr16m/0T5wx44d9FIkErFUBa3LWQVGfl80xVN2CyrqTnzbZaGUCyPUh2lOKVeuHPVJpVvrsVQF7RUVb4QkT1XQ4c8XFVxRUVG0pOHb7nMLFy5UPO1RLvdUxdGjR/kiGXYBSIcOHXAByLJly6gpmjZtSh2SL1JIVcifNQ5flHuqolevXor9llbm7F4V8jsTAxMdHX3o0KHq1avT6lopj8PufERTNo20fJFsqc9uRKU09YAczc40AGppaVWuXJmdxUMHO0tVKM0m7BRpmtkL5r0qMjIy6M/IljwfpogV0qaaffU6f/58Vs7Wl1SoONnQ+p52QbTWoRUnX1RwUcvwDZcF+6o/Jiamc+fO1Epz5sxhH2HYNf+05WM3Wmf3qihWrJji7WciIyPZep0me76oQBOLxXzbfY7KFbulRCIxMzOj9SI119atW/nST3x8fNgD7VeuXKn4KVplUmHbtm1/yZ1yf6acjm55Mx47dqxw4cKVKlUSCATsI4TmmzZt2lATLViwgF7Slo/dxYcWlOwkZ+bgwYNUWK9ePcXPFlT0f5xvuyxYm6Slpfn6+lKXU/z6hVDfo1Zq3rw5S1UYGxuzRlM8o8fe3r5WrVpFihRhOc2CjTpeTkc3dVdqQ5a1yQXLTbx584Z9tXVC4bEp9JsnTJhAhQYGBkr/EAXSFw9wWhZQT6P5WvErhKSkJHaTZtpS0kuqzNaLY8eOpc+yOoSd31e1alVaf/BFBdcXD3CGXrq7uy9durRKlSo0KmZ9tBnLg1erVk3+fE3i6enZuHFjGmm3bNnCFxVcuRzgVM5X+ly2qQobG5sKskf/KD42hX75bNk9OAcMGMCuT1RnLPFNixz5U88ITce0V6TZROkeH5CLnFIV7HvEbt26RUVF8UWyxwVoamrSmlP+aGegmSggIIAW4XXq1GnatGnW9C41LLVkoUKFFE9Soz0R20gqfQ2mtmhMo/mFVkGKQ6Wfn5/ileyhoaHa2tr0cvHixWyWZ2hyocKWLVv+kq9gaXj/samKL2JTuGKLEDqwafGtpaW1Z88eVkJbaGom2jTKzwantRHNMSVKlKC2U7xDpNqiwY5d8690WLJURalSpdi307du3aKGpXHw0KFD8vtOvX37lhq8dOnSitM20JqbnWzWpEmTmzdv8qWfBAYGslNRxo8fL/8Sm3aM7HtXKmT3+1Fnd+7coamlcuXKilcbUUdlqQqWF6NOyM5bGTp0qHxJRGvKRYsW0cQzaNAgPEiFUCPQgqZu3bpKC0Q2MPbu3ZutdVjmm5aS1F3ZFoj+Syse+ieoWbPmtWvXZB9SX/7+/nQsFy1alF3ckS12OaGlpSWbv1esWBEXF8c+TtvyPn360DJ92bJl8sFTndFsQn2SmlTxzAhaSVBfpaZj5+hRD5w4cSK9pF4qP3dUKBQaGxvTv0KPHj0cHR1ZIbx69WrYsGG0hTYwMKCljtK6iLDkL1W4ePGifLl579692rVrV6pUCV/DZivbVAV1xRYtWlD5ggUL5BtFWsTr6urSvEOLKOrGrFBt7dq1i9qHJg6ax9lsQjtG2hNST6P+lnVFBDnJKVXBLrGhtbd8CyMSiWjNWbJkyWbNmqnD6WZ5ZGtrO3XqVFrG0Pz74MGDrElJGgPLly9PUzMtgeSnqNCWh/aM1Jg7d+5kJWqOpg/2jEh2+wXG5/Ob7kVGRrKvFuQnR7NCdnPiUaNGKZ6x+9P8+lSFQCCgFqHp4Z9//mH9jzZ7RkZGJUqUoAaVXyRCR2/VqlVpj71y5Uq2cKSlZN++fYsXL05t90sunlE11CwjR46kzjRgwAD52blBQUHsWwJtbW3WO+kfmxqWFuu0CbS2tqaSmJiYJUuWlCpVilac169fl30OMtEK5q+//tLQ0Bg4cKCNjQ1f+gm9++eff9I4SMe5/Gw0WkE2aNCgTJkya9asUVwYqSfqcrTypiai5aD8kR83btyghQ71N5aIpDGIDmpqMdpgHzx4kK3O796927JlS/ZBZHyIt7c3+6Z6yJAh8jMmqHlp+0ctSdtp9iU/Hb/U/WjwnDZtmp+fH5V4eXmNHz+exknaEyomjNRTSkoK7QZpWaOINWybNm1o8U0v2dnOHh4ew4cPL1asWLt27R49ekQlND3R2p2W6dRRjxw5Qv1W9ivV2v3796tUqUKtt2zZMna3FELL8Tp16mhqasrvjbJx48Zy5crRQnP79u3sTivPnj1r3749dVTaRsrXQ+qMxj2atWktRFOzgYFB1luBMNQ/aQ9DU9K4ceNYDpcWjjNnzqTWpvakHRGrBoqyTVVQr6OBkVqyRYsWt2/fZoXsmwk6xmluUjwnXz1duXKF1jZ0kFIHYzc/cnd3Hzt2LM0mNO+ow8lQ/5WcUhUmJiY0m9DiZ+nSpWz8pHUmrTaphWn2kT/vWc3REDdv3jxaDfbs2TPrOpyxsLCgebxIkSK0zaafqYS2rGxh2bBhw8uXL7Nqau706dO0XKR+SCsZ9l0L/ffAgQM0O5cvX/748eNUkpCQYGhoSNVoEj958qTscx+vXr3auHFjakzam/+S081+farC0tKSnW1CDbFo0aJ169ZNnz69Zs2adKzSz/KTbO3s7OgApmrUfHPmzKG39PT0ChcuTF2TJhXsCQktAU1NTanpaGoZMWIEbZWplSZNmkTzLjXm2rVr2VcHkZGR9Ba1JE3S+vr6VGf27Nk0XFLJmDFjCvw1C18lKCiIdobUMjRVZz0+09LSbt26xW5XQfsZGhZXrVrFbgdbv359Oq7Yolyd0ZhCk3HZsmW1tLSmTp1KnY2mZHa5x4ABA9isI5FIaCJng0Dz5s2XLFlCfZVd3F61alVaLWHJSJKSks6dO0ebPZqwR44cSS1JWOek9qRRNEN2FRjtcNhJPTTxTJ48merQcpxdkk0NixvFZYtdMKx0W03quocPH2ZN16dPH2rJhQsXsjtjU+ekrsu+ZlRzYWFhxsbGxYoVq1WrFm0IqZWom7Vq1YpaiQ5wlgonb968oY00FVID/vXXX1Str+xx9zQynDlzRh0upfkioVC4c+dOWjJSs/Tv359+3rRpEzUUs+/T85Jo1f7nn39SHVo1jhs3jt6aMmUKHexUMnfuXMV7CoBctqkKGlGp77FrQO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Una sustracción se puede convertir en adición con ayuda del simétrico, o del inverso aditivo, aplicado al sustraendo.
Ya que realizaste una sustracción de enteros y se le dio significado a la operación. Responde la segunda pregunta.
Segunda pregunta:
¿Cuál es la diferencia entre las temperaturas que se tienen registradas en la Ciudad de Yakutia?
Las temperaturas en Yakutia son:
Menos 72 grados centígrados en 1926, y la temperatura promedio (en inverno), que es de menos 55 grados centígrados.
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)
La diferencia “D” de temperaturas, entre la temperatura promedio y la mínima histórica es:
D = temperatura promedio – temperatura mínima histórica
Al sustituir, tienes que:
D = (-55°C) – (-72°C)
Ahora, resuelve esta operación.
En este caso, tienes la resta de dos números negativos, ¿cómo se hace?
Utilizando la estrategia que ya conoces, aplicarás el inverso aditivo al sustraendo para convertir la resta, en suma. Nos queda que 55 negativo menos 72 negativo es igual a cincuenta y cinco negativo más setenta y dos positivo.
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)
La operación se resolvió por medio de la descomposición-simetrización-anulación. Quedando cero más diecisiete, que a su vez es igual a diecisiete.
Por lo tanto:
![](data:image/png;base64,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)
Reflexiona:
¿Qué ocurre si se resta la temperatura mínima histórica menos la temperatura promedio de Yakutia?
¿Puedes predecir qué tipo de número obtendrías como resultado?
Obtendrías el simétrico del resultado anterior, es decir: ahora en la resta, 72 negativo menos 55 negativo, obtienes 17 negativo como resultado.
![](data:image/png;base64,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)
Ahora en lugar de utilizar al inverso aditivo aplicado al sustraendo, utilizarás otro método, uno directo.
En este caso, puedes recurrir al concepto de cantidad para realizar la sustracción, es decir, a 72 cantidades negativas le quitas 55 cantidades negativas y quedan diecisiete cantidades negativas.
Si esto lo concretas a números, tienes que a 72 negativo le quitas 55 negativo y el resultado es 17 negativo.
Resumiendo, en las dos operaciones que se realizaron, tienes que la temperatura promedio de Yakutia menos la temperatura mínima histórica, es de 17 grados Celsius, mientras que la temperatura mínima histórica menos la temperatura promedio de Yakutia es de menos 17 grados Celsius.
Pero ¿qué significado tienen estos dos resultados?
En el primer caso estás comparando cuántos grados hay desde 72 negativo hasta 55 negativo, es decir hay 17 grados. La interpretación es que la temperatura promedio de Yakutia en invierno es mayor, por 17 grados centígrados, que la temperatura mínima histórica en 1926.
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)
En el segundo caso estás comparando cuántos grados hay desde 55 negativo hasta 72 negativo, es decir hay menos 17 grados. Esto significa que la temperatura mínima histórica de Yakutia, en 1926 fue 17 grados más baja que la temperatura promedio en invierno.
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)
Continúa con la siguiente pregunta.
Tercera pregunta:
¿Cuál es la diferencia de temperaturas que se presentaron en México durante el invierno?
Se pueden realizar al menos tres comparaciones; pero aquí, sólo realizarás dos de ellas.
- La temperatura mínima promedio registrada con la temperatura máxima promedio.
- Y la temperatura mínima promedio con la temperatura de las zonas montañosas.
En el primer caso la diferencia “D” es: la temperatura mínima promedio de cero grados menos la temperatura máxima promedio de 20 grados.
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)
Para resolver esta operación sustituye al cero por su equivalente, veinte más su simétrico menos veinte.
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)
Llevando a cabo las operaciones, queda -20.
¿Qué significa este resultado?
Esto significa que la temperatura mínima promedio en México es 20 grados menor que la temperatura máxima promedio, en invierno.
En el segundo caso la diferencia “D” es: la temperatura mínima promedio de cero grados, menos la temperatura de las zonas montañosas de menos 10 grados centígrados.
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)
Para resolver esta operación sustituye al cero por su equivalente, ahora será diez más su simétrico menos diez.
![](data:image/png;base64,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)
Porque si a un número se le resta el mismo número estos se cancelan y sólo queda diez.
¿Qué significa este resultado?
Esto significa que la temperatura mínima promedio en México es 10 grados mayor que la temperatura en las zonas montañosas, de acuerdo con los datos de la tabla.
A continuación, para fortalecer lo estudiado hasta este momento, reflexiona sobre las estructuras aditivas.
¿Por qué se llaman estructuras aditivas cuando se resuelve una resta?
Se llaman estructuras aditivas a las expresiones en las que se suman o restan números, en este caso enteros, porque en matemáticas puedes convertir una sustracción en una suma aplicando el inverso aditivo al sustraendo.
a – b = a + (-b)
Operatoriamente bastaría con saber sumar enteros, ya que una resta la puedes transformar en una suma. Debes tener cuidado cuando se realicen sustracciones que van acompañadas de significados como los que has visto en esta sesión.
A lo largo de los cuestionamientos que se resolvieron, se aplicaron diferentes métodos o estrategias para resolver las operaciones.
Los casos en la adición, en todas las operaciones se utilizan los paréntesis para no confundir a la operación con el tipo de números, sean negativos o positivos.
Para ello, partirás de diferentes situaciones problemáticas.
Caso 1. Suma de dos números positivos
Se sabe que el átomo de Helio tiene dos protones y cada uno tiene una carga positiva de una unidad.
¿Cuántas cargas positivas tiene este átomo en total?
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)
La representación matemática de esta situación es:
(+1) + (+1) = +2 = 2
Caso 2. Suma de dos números negativos
Se sabe que el átomo de Helio tiene dos electrones y cada uno tiene una carga negativa de una unidad.
¿Cuántas cargas negativas tiene este átomo en total?
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)
La representación matemática de esta situación es:
(-1) + (-1) = -2
Caso 3. Suma de un número positivo con un número negativo
Se sabe que el átomo de Helio tiene dos protones y dos electrones.
¿Cuál es la carga total de ese átomo?
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)
La representación matemática de esta situación es:
(+2) + (-2) = 0
Porque esta representación corresponde a la suma de un número con su simétrico, que tiene como resultado cero. En este caso el significado es que dos cargas positivas se neutralizan con dos cargas negativas, y la carga total resultante del átomo es cero.
En el caso que acabas de analizar, la suma de un número positivo con un número negativo da cero porque los números fueron simétricos, pero no siempre ocurre esto.
Analiza otra situación.
Situación, dados. Primer resultado
Se tienen dos dados, uno rojo con puntos que representan números positivos del 1 al 6 y el otro azul, que representan a los números negativos del uno negativo al seis negativo.
Al tirar ambos, los puntos se sumarán.
El primer resultado es: (+2), (-6)
![](data:image/png;base64,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)
La representación matemática de la suma es:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAkYAAABECAMAAABTVAp8AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAE+UExURf///+vIx9aNi8xxb+Gtq+W4tvnv7q+5zVhtlzBKfoeWtJekvufq8OnDwcZhXsBQTdB8etydm/v09KeyyBg1bwAgYEBYiHCCpu/x9fXk496jof36+ee9vMpsadfc5niJq/f4+p+rwyhDee3OzcRbWNKCf8JWU9qYlrfA0hAuakhfjQgnZWh7offq6u7R0ea6ud6lo9OFg+Kwr/v19fHZ2PDy9sfO3JqnwHyMrZqamgAAAL29ve/T0uOysenCwezKyfPe3diSkL/H14+dudDW4Yybt8/V4WB0nNnZ2dmXlfPf3unr8eHl7E1NTfHY2Pfp6YyMjL3F1t/j69SHhVBmkt+npk1jkH+Pr2hoaHx8fPXl5OHh4dnd57K8z7Kysvnw7/Dw8MfHx+np6chmYyA8dM53dDhRg6enp9DQ0AAAAFz172EAAABqdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wC85NzjAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAHhUlEQVR4Xu2c20/bSBTGI8qGi9T1SsisVEUblbQJlIo+IIIadiWWi2AfInFZqfTNKoTu//8X7PnsQ/FtZjzjS4h7fi85dmKrYb5+55yZcTqCIAiCIAiCIAiCIAiCIAiCIAiCIAiCIAhJBkuvOHLnl/tel8Ma2V7d4sid863DAw6F6ng99DyvtARmdJMRx3Wxsuv7fmkJPNJNPnIsVER35g2Hbyowkt695w17fFAHNzT+O/2Aj0qwseX7u4d8IFTBgKzoPcdlWaZ71WdI22QiHyrKRudiSJXymlKRvYN0B703dOHt8oBPMMekoyWOq2aFRt7ZQQ7Gh31/zAfgjNLjKsfz4PNkMjniePEZkBiWOS5Kt4cy6ImkkOrT0Qmp6JRjW85gPgQfhtzQ8fx0dEkqapGMHLLQ3xDP6JiKqe6nMOTzEcd0po76KNjx/QuOLQkgovNxuqYa09kVjhtn2ioZka0MOcywnHYaBtJ5MrA9HCQ/NaJbmuv1K9s/IqprDi25hojy6vI+vVFBve4CUlp7ZISUlisVoJHRjMPwQ94tx8zQGz6/r8JWRiiMtjm2Y4OujBdFMcjgNjlsljCltUdG6NA5zKKR0TcOoxzmJf9LQ1nHHCuxlRF16G5m9JakojJH2NEZx40yndx9bY+MejTg6spILaPfOCK6kFFSNFBWyqCyWMoIluJUGeHCG44zoMr+wHGTUEoL6A/QFhmh4VL7Bsloj0MNkFFKbeRxxjlxSxlh3lmRmbRAKJpc+EBvN18dUUo76ty1RkZwEnVOU7pREsgopRlkNVOzZiejgIbbKadt6qufL3Tf5iezp5Npp9Oe2gjtuqbbL+RGYVJLyQhZzVRk28kIHbtLTkNhrjMxmFXjRTaltMs2yQg5TeM3hdwIkslMNyKrcajCTkZkKi457cCoEmQ1DpuCUtpnemmPjH7NGkmcQm6EBJYpr27zTiaxkxF15upCWQ0W4TY4zudf+kTDvRqlNJRj7ZERDbbONIq4UUC3yK59jOisoTiyktE+DbaLaVwY1YdP5ArtCMOsoszwU0r7D69l7/NiwNyjpsIu5EYQTNbQYFGGJRYrGWE5zaHCRmEO9V2urFOweZpjO6ix+xwnqEtGlNKuwqDkfV4OqLDvOc6jgBtBiTnZ66+KZfSWBtthzyMWzfqdMRwn4iJjTYd0Nnd9ti4ZTSeTaIah5H1eDpCRrqEyu5FqGdZ0Z8JKRhhsh4YKU4/9PnzoensjEhO1SAkg0CZbNUpp/LVbIyNT6jG6UZdK6dwSqEDHbyUj9PsOezqi3SHnbEHwpoxkcLJBGVFKu+OwzTJCklKS0dRMtVUJMsqmS/c8gbWvVAWDJkwJz1tjmiA2T3CJw2s+YHCu/CMCoNC3+5HSnmV0hUmkRQblcRkZLXtDhZnVIaPUjlfs/lDCWkEYb8NyJjHhRo77T1IU+XaU0r5H0Q8ZBeFc5CIDN/qHY8ZGRqRC1bZJ3Cab1MrJKDX+RdwoFoaEaS25hIYe8JHjchT4dpTSpmEAotPB12d/WlAKlNia2oiuVhZWdZTYDoMN1cSTWDgBkGzWHO/sRrjjMcuCuxEG27nhp4vVm0Hgc4atItYycqhgoJrE8j5OJNdUMKHUWMPPV6dZcDdC6jFMPyplRNfO1F8/p+pKYyUjZDCHCga5MFFSZ2WUU3VF1CGjBFXdZ+5gIcOwGKKaN0INrVmNW6K3P3GswEpGT9PRlpzSVRk3Sia1VTqTu1NEZFSYIY22xlHVbtR9r1961W+HC7GSUc74FwEldVwjWPBPldiOWwcqoD0yeqUfbbUbUdKKTTseD9JavCeBGjK+nYzcNj/CxOINHnYXpRq++Wx/BO2REZ571ZQwSjeiwih+2SwtGWRLXe0O7GSUM/9YBFz2/PRBuPKRnH6EsB44bpj2yAgVzjuOc1C5EVQSEw6JKlUmocI2PYlrJyPHWULMUZ9zHJlTauEDOvvCccO0R0addzTe6qymciM6P9ob7A0ioJnUPbD50VAaWcrIdd8aFmef5rGDnN1HyGnzKY2CFskIWU1tGwo3Chu8JEk3yl8KSWEpI8esFq5/rEM73zZyqunqVtSsCTvBp2XaBSegUlg94Ao3otNp+B0GHwg3+OmwlBESklMRcxKuz0asp4tpiDMxI9AUwXeoaDK5Mv6dFoKcjPSMwo1C4SThdxhKlUYzspVROOJum6bHp8hmF6cnmV9G2qecNh8zom/PLPhKSERXZ0cKNzIBMzJfZyujYNf31ziuCmS8uZhR68CCiGq+WeFGBvADR8ZHr+1lFD5y5vrzRvmg25/nD2W1CaS1PzmuBGrTzCnNhd9p1KvsqoKtuc0ZtRD8wlF187hBtbdL8Oj7uw5Nv4KDam/304NnEw3rqIUJ4EWaNdtyYB21qrx2Q+X1g6ioQsLfAjVNFxYhQIY0bFcrBdq11Sp6mwB32tznI6ESkIl024cKQiX5sNafxSYPwSzQWul/KR5y3NE/lS04MLgdlq+LR96sXhGB69UK6uK+vya/rV4P5bNat7aiKMkf/OpOUFMTIAiCIAiCIAiCIAiCIAiC8NPQ6fwPgBGEVvtYFQAAAAAASUVORK5CYII=)
Aplica el método que se usó anteriormente, de descomposición-simetrización-anulación.
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)
La operación anterior, da como resultado: -4
Continúa con el segundo resultado.
Segundo resultado
El segundo resultado al lanzar los dados es: (5), (-3)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfcAAAC7CAIAAAD3+kDTAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsQAAA7EAZUrDhsAACGCSURBVHhe7Z39kxXFucfzp9yqW/cXXbE0L1VX+cFUymhu7i0LqGs0XqrINctLNATDggKSXZC8uLuKEQwub4LyoqJgQEhgOV6RBYIBWVl2cQE5sgvZ3bgv2V0xbKqs3Afm2fahZ6bP9DmDp6fP91Pfopann+mZ6T7nOz09c2a+9k8AAAD+ApcHAACfgcsDAIDPwOUBAMBn4PIAAOAzcHkAAPAZuDwAAPgMXB4AAHwGLg8AAD4DlwcAAJ+BywMAgM/A5QEAwGfg8gAA4DNweQAA8Bm4PAAA+AxcHgAAfAYuDwAAPgOXBwAAn4HLAwCAz8DlAQDAZ+DyAADgM3B5AADwGbg8AAD4DFweAAB8Bi4PAAA+A5cHwJqv/cs0pZ37T3A0MXJxDlUSuUMd/FeICm+ZG4TrLv/wv/1rcu1Y/uzedWs7Dh8e7u/n5Z1Hbj+HoqCd4r9CJKwBpIg0I1Lnxz1ckAy5LIcqg9aOCzMXbTTsdcW2zA3FK5eXIrvPhNfLbebQ9XSd7nj5F4vjSomCNYDUkWZE+q+Hn+OCZMhlOVQBNK75Q8G9VgmGHGCLty4fiCySK3IVubUcEtCxylAaoBIMOSBdpBkFWr31XS5LgFyQQxVAkr1OkgNs8dzlSf2XLnFdTiI3lUMCc2lAkhyQLtKMlJLP28ilOFQBVOZeu0CWXJ5D8Xw+MkKDdzn+Jb38i8VcnEHkjnAIOIA0LKXk8zZyKQ5VAJW51y7glcsrjr69Sy7Yc/48F2QNuRccAg4gDSu4nBgo4byNyidxqAKozL12AT9dnpAjejJ9jmYNtQskDgEHkIbV9+mw/G+SeRuZz6F4Wjsu0MFDHUvojKFxzR+OfHCOi5Nx4VL/1p1/UpXQH/Tfv418zsU20Krl9qhN2rn/hLlClU/iULkJ2pa2P9iq4trWfbx1eRq/qwULTtp0ne448Nqrz8+oDvLpDzpInDvxARcng/LloUVV8vnICGfYo2ojcajcpNJWWUe5FYn+mzvUof5LTlHQPVUyiUNR0AFDmqkmWlFCPyIj05ZVCm5dl5FgkUjIx2VmpMK/HtASNHHSOHFFTza+qeJkzRyNh3JUPi3LUQE1nTL3sJK3bSbw1uWJJMuSPSnDCouKkviXuRKS7d3uMhgWJ40TV7Rj+bMqnuReI8pR+bQsRwWptJUfSEcIItKGaDwYBONQmSQOhZBHDoNoSM4LxCA3LFJUg/wvLxaiYD1K2iZppZo4aZy4IvJcFU8yLSYPbGG/1nY5TgXbNitUtMtr0/dxMk/4kINr+ZGKq0TmcCgllyfPVXEafXM0HspR+WG/TqWtvEF6QRDR5m3MI0GZyaHrkUPRgjL8+NYwio8TL3k9tvVcuPTlT1W0Ik2cNE5cEZ0exRVFIpO1U6skZyRKhrbNEJXr8q25nEwwi5J5sev5fGREyzQo8p5OmcChlFxe2zaOxiOTtVmmVNrKJ6QRcMhm3kalkTgk0Bxt5qKNdMygo4gqpWOANpMjXVVBQZlDm6TmOqgS2trIKYsgQRJZj9y7zo975C+eSHIULONhcdI4hiLz8Fwij5HawF/bFxJtqmpb+iM8zI9s22zhrcvL+Ye969ZydBwyXFUaiAah6rey9Ed46Brp0TLt+RnVtFLlj+FKIse5MoFDKbk8YR6eS2RzaQP/tNrKJ6QLcOgaCedtVA6JQwJpNJpJSWRa5Lqk85I1Ky9TUCRs9FwmkCuKrCdAujAdhDgqUKUkDoUw5EjvjpxqV8gdVwe2gIJtQpCty2Yx9GNW8Nbl5ax0eHSpXSZVniUhq5LT0OFDBRE8eyBQpLXJUTDVxlGBKiVxSGAuDTDkFJxqV8gGoaU4eo202sonlAWQOHQNcg1ZFDfklDkcGkcO5M1eRkjP0gxLOyGIG5CGx7ZcIJDnDcHV2ki0feeowFwaYM6R5itPJiRyxymfo9fQttBwNxQVyczIg0GG8NPltdGlNv9APiVLDXfTyxt1SGGDk6Ucuh5aNR0JaHvkMF9irsFcGmDOkeYbuQEExVWOdihKsa18QloAh8ZJMm+jEkgcGocODKqo4E2Z0oy0I4qsx3BCQMhDBYmjAtoFGhHTiJ7sPs5bA8z1mEsDzDnyrCLuCCp3nPI5eg3ZNQVH6PK0zHBsywT+uDxZFY0oaewsfY0UnieR10sLjjrlOUH4VhlVRCruDhNZA4cE5tIAc4484MVtobxOqzVXim3lE+r7T+KQQPpmpJuoUhKHxpHzHhwyopK1Fcl6tFkLDWmLJI4Whbkec2mAOUce1SInhQjpztoZjOyXuIOEQjZLwUOC42TJ5YuQNjINkFMQBa1ZOmDY5mRVJLJIw2g3Erk4hwTm0gBzjhxix/1uQLqzNu+UYlv5hPr+kzgkoAGvnFsIjwRVEYlD40iTspI2vSMdzTzhoE3acDQxtLNkvjv3n9C2nIsF5tKAgjly+ii8X7QxqjR8GDAcAMLIZok7omQFn12eLD5y3sBgamEoQSWHXVJOfEuRx2mz23HIpTgkMJcGFMyRFw/CDSKna8I7mGJb+YT6/pM4dD3aAFnzI1nEoXFkka24imvExSNJnkw7QmcGdNyio4g8kITFCwjMpQEFc+R9kOHbHGWzh0tVEYlDRmzzncVblw9P1ChkGoeMmPOlD4Z14LVXzaN7mcwhgbk0oGCOvAIcvhAtB+DhUlVE4pAR2/yMkuT7L01QG2irOIlD48giW3EV14iLR5IkmcxdjqMLihcTmEsDCuaYR+tyC8OXEFQRiUNGbPOdxR+Xp5E7jaDJ3AsOouVSHDJSMF+btwmLBrZxXi/TOCQwlwYUzDGP1uVIP3x5VhWROGTENj+jJPn+G+ZtVJDEoXFkka24imvExSMpmGwetkeKlxSYSwOS5MiJF3mSRH+ruHZYDVClJA4Zsc13Fn+uvibHts4k+f2XLhX0+sh5bZnAIYG5NCBJjjzhkJM28hYayuGoQJWSOGTENj+jJPz+x83byGAQURiKrLCqx5xstngq3brzT7SncpRN4oUF5tKAJDmyVeVdNHIyJ/KCsyolcciIbb6zwOULkzyfxsJk5YY5nPDUtizlkMBcGpAkR07LyLksOZkTeQ6kSkkcMmKbn1GSf/8j521UhBREFHLOQZvNtyL5lUY5BCZxdByyS1lKZydkphSMrFNmckhgLg1IkkOoHHlHvGw6Dl1P8jYh5NXXyDODDFGJLl/0FcXI0W4kgd3Ln54G0n5WSshSDgnMpQFJcgiVI+87ktM1HLqer6Ctsoj6/pM4FEPkvI36LylIU8ijAg1aOWpP8jspNR/n6DiyHvN991/ZWJ6QWxX8qkAeq+K206pt5RkDLcjRbFKJLi+nViJnUSRyFEwLcjQxZPfS68N3dqoiEocE5tKAJDmE3IzgIoGcrgkffgK+yrbKEOr7T+JQPPIub5J57EyHAVVUcAhJ400awG7d+Sdyau1iozQpsztLxyRxdBxZpK1Cw3y0IMylAUlyCLmuYNJGTtcEvh/Gqm3lwF9eU8kilejy8pc+BYeccjCr/dKHHLzrdMfRt3cVvGtQ1UDi0DiGIsJcGpAkh5A3fQaTNnK6Ju7icFpt5Rnq+0/ikBHppHJigcQZ42jHAPOQUzqRZuXayDpu8kdbHYkLxjEUaZj3izCXBiTJCVBnSMGkjVq7nMPR0HY27mBAhA/MXJBNKtHl5RiWZLjTkYpkpnazuZzuMJuaSiNxaBxDEWEuDUiSE0BnEkFacEqhtj98hqFIq608Q1oAhwoh522kuFggJxZIcfMtNIY1p8l6yAQ5KqAjgWbNJC4bR2523CGHTFAebwJxmcBcGpAkJ0Duvjxxkddjw8g2oV2LtG86Q5J7Hdl02aISXZ6QExHkcZGW1H/9E7jCA3YaEavSuEoImVbGeXlCbomcXQmG9nGk0laeoSyAxKFCaMNDJS4WyOt+gci55MCT/taOBJFOpNVDziWPBPR35IGHi8fR5nN27j8hnZG2RDvYKIWnd2Rp3ByIzOFQDOFWCmQed0e2rVqE/gjvjmz5jFKhLi+vEwYip1P+RX9IQwwUHsZqlZDN0YhemiAtImfDSeH7WGQphwSyNO50QeZwKIbwXgeKOz4FpNJWniFdgEMJ0BwzEJddj5xlTqI4a7Oth8RLjhN3cCoo8lOuYpzweD98cJKlHIonfCKSZNxt1SbmM4OsUKEuT8hZ6YKKG+3KcW5BRc5rywQOCeRMd6DwMFmWcigeOcsUKMm4O5W28glpBBxKRnj4zAUh4sbIYcVN6QSEvVWTtiJeTBB5cApLOzkIb1XkHmlpsohD8YT92nwZQ5Gwbf2weKJyXZ4ID0IjZbatsBFHisw0/MtSQuZwSBC5hdoJgSziUDxhvy5450xAKm3lDdILOJSM8NCYC6KIm1RRIgc3T1AEGGy64J2dAWZbpBF0MHKXKyILDpZV/O36m0oD0SJcfA1ZxKF4tCvMpPA0URx0PDC0LRWZj53ZoqJdniCPkxPKmqgo8rdCGtq0TFhx9ykSMo1DAjowhDdPq00WcSgeqlDmkyKPPZGk0lZ+IB2BQ4nRRqAcjYfshqxQzk6QuZPtWs0XkwvTIqoS+oP+qzxR1UwKImGCGuSZQXgz5Kx33OSJ3Awy01JcnpDbU8Rd7eT1tJSy+2B7fPL3gEp3+QDyr73r1ioLoz/ISa08a7i/n4bJshIS/ZeC5llvlUziUAgaIKuZlmDbuOAaanESh4zIkw/aQo4mpvS2Aq5RilEC93Hd5QEANxQ5iQSX9xK4PAB+EkzLtIZ+FqtBOcrls/4jTxAJXB4AP5FXF+Mu0tIxQOWQwrc/Ag+AywPgJ/KOF3L8Ix+ck14fXE1VCaS466Ug68DlAfATecdLEmEg7ytweQC8RRutG+Tf7YNAAZcHwGfMP/8hzRz/TRPwFbg8AP5DXl/6T6tARoHLAwCAz8DlAQDAZ+DyAADgM3B5AADwGbg8AAD4DFweAAB8Bi4PAAA+A5cHAACfgcsDAIDPwOUBAMBn4PIAAOAz/rv8jJtumgm5p+cXLuQeconFi568+abbIAfFPQTs8d/lNXOBHNFjDz7APeQMCx+vmfrQDzVzgRwRdxKwBy4PlUdwechK3EnAHrg8VB7B5SErcScBe+DyUHkEl4dMulkXdxKwBy4PlUdwecgkuHx6wOWh8gguD5kEl08PuDxUHsHlIZPg8ukBl4fKI7g8ZBJcPj3g8lB5BJeHTILLpwdcHiqP4PKQSXD59IDLQ+URXB4yCS6fHnB5XdMnTnymru7YkSNn2tu783lS2/Hja5Yvf+Tuu7XMStP0qqoZE+9sXLTo4P79pTcOXB4yCS6fHnD5LzVv0qTtmzcfbG7+4osvxsbG6F/F0OBg94ULVFo3a5a2VIUoaJwucvYLF0aGh1X7BC1Der+lxapx4PKQSXD59IDLXxWNUlfU1p47e7a3pycwr0io9HRb29bVq6tvuUWrwW/9eMIEahxuhXg+Pnv2nT/+kZK1xSPlpss/s/QJ3W6gsggunx5w+asWv7ah4cqVK+xVRkZHR2k8S+P9CjF6ahxybdpl3v9CBO2TpHHcdPnf/GKebjdQWQSXTw+4/E0NNTU0QmeXSsa5zs6VtbVaPV6qce7cLWvW8G4nJknjwOUhk+Dy6VHpLl83a1Zuzx4agbI/JYMG/i253LxJk7TaPBPt4JYXX+zr7eXdTkySxvHS5SdM+Pp3vnPPihUrz58/z23xxRdr166dPPm/tUyogODy6VHpLt+deC4iTFc+n3AOOqNaX1//4Qcf8N7a0NvTs6WpaXpVlVah1GMPuOfy82vqa+frdpNYtbV1nZ2dtPsXL14Mjxt6e3pra5doi0CxgsunR0W7/Kw77ui+cIG/hfbQsj+97z6tTm9EjbNx1SreVXsOH3jX3DiOunxdkS5/223f6uvr452Pgaz/5MmTlKktC0UILp8eFe3yy2bOHBoc5K+gPSPDw5uamrQ6vRE1znu5HO+qPR2nTpkbx02XX/mbxbrdJNOxY8d4z42Q0VOmtiwUIbh8elS0y6+vr+cvX1GMjY0dO3JEq9MbUeOUcggcHBgwN868Hz3MPeQM5PIvNtTqdlNI1dUz1q9/KeE9WgRlUr5WCaQLLp8ecPmSOH/mjFanNyr9EGhuHDfH8htX/FK3G6Mm3nnX73+/c2BggHc7GZT/q1/9WqsKMos7CdgDly+J7nxeq9Mb3ejGeerxxdxDzrBw/tz1v31KMxezHn98QVdXF++wDW++uV2rCjKLOwnYU9Euv2rpUv7OFYvHLk+Noz3mwZYCLj/fRZff+uLTmrkYRAP5pqYm3ltLmpubb731m1qFkEHcScCeinb5p+fMKcXIhgYHOzs6tDq9ETXOXwvdNGKAGqft+HGtTqnFP32Me8gZbF1+2rSHDx48yDtsyYkTJ3BjpZW4k4A9Fe3y6dxJ+fWva9X6oRt9J+XCWY9yDzkDufyaZy2cd/bsOe3t7bzDlvT19e3du0+rEDKIOwnYU9EuP72qKvkTWsJ05/NkhVqd3ogaZ/3y5byr9hzK5cyN46bLL1+2QDMXg+rrG4eHh3mHLRkaGjp69H2tQsgg7iRgT0W7PGn75s1F/7yTltVq80w1kycX3TgFn0I8b9qPuIecgVz+uV8u1MzFIHJ53uGi6Ojo0CqEDOJOAvZUusvPmzQpt3Pn6MgIf/OSMTo6umPLFu+fY0Na/+yzA/39vNuJocbR6gnLyTsp5/78kemauRhUosvn83mtQsgg7iRgT6W7PGllbW3w5pDknG5rq5wnD6+oq+PdTkySxpk7dSr3kDPYuvzSpcsuX77M+2wPXN5K3EnAHrj8VSNb19BAxp3kyZRXrlw519lJ+eZHcfkksmw6CiZsHDorouQkjePBWL6mZr589qQV3d3d27fv0CqEDOJOAvbA5a+KXKmhpia3Z4/5XVEffvBBSy5HY//KsfhAZPQFG4dK329p2f366wnPctx0+ak/tHgj4JQp9+/atYv335LOzs5Vq1ZpFUIGcScBe+DyumbdccevFyxQj3ChU/JLFy/u3b370fvuqzRzlwqeNX8ol2trbVWNMzY2Njgw0HHqVMs779AQ3u69r9l3+aqq2xsbnwmawpYDB97DQ+etxJ0E7IHLQ+WRBy5PWrJk6dDQEDu3DRs2bNCqgsziTgL2wOWh8sgPl594513NlpfuA+699/taVZBZ3EnAHrg8VB754fKkRx+dffToUTbvZFC+VglUUNxJwB64PFQeeePypOrqGW3J7tGiHMqkfK0GqKC4k4A9cHmoPHLQ5RfMn/s/Rbk8CW8EvNHiTgL2wOWh8sgzlyc9+ujsEydOsKOH6O/vx62TpYg7CdgDl4fKo8ce+AH3kDOU6PKBJt55V13dEvmsym3b3pg18yd4mnyJ4k4C9sDlofJojnsu/9bLL5Tu8tANEncSsAcu77qqb7ll1j33bF637lRbm3rO7Sf5/NoVKx65+24tOUOCy0NW4k4C9sDlnda8SZO2b97cfeHCyPAwSb3ZamhwkILd+fz7LS1Wvzh1R3B5yErcScAeuLyjml5VtaK29tzZs4GtG/j47Nmtq1cnfHqMO3LV5R/UzCVbuvXWb86c+ZMjR47kr9Ha2rp9+w4/HqXAnQTsgcu7KLL4dQ0Nyd9jNTo6erC5OVtGD5dPUVVVt9fUzN+1axc5+8WLF+Wd+8PDw11d9FHKNzWtphzK1JbNiriTgD1weRfVOHfu7jfe4K9pMq5cubKytlarx2XB5dMSGff8+Y+fPHmSPwox9PX17du7L7u3+nAnAXvg8s4pePpjX28vfzsT05LLZej1VXD5tFRbu2RgYIA/BEZoKHDs2DFt8ayIOwnYA5d3TrO//e2i37a6pakpK49HdtDlT7fsyJzLV1fPeO211/kTkAA6Hqxf/5JWSSbEnQTsgcu7pUfuvnvjqlX8jbTn8IF3s3J7pYMuv2/b2my5/L33fr+pqYn7PjFdXV0PPTRVq8p9cScBe+DybumXs2e/l8vx19GejlOnXnnhBa1ON+Wgyx/evSlbLr94ce3x48e57xMzNjZ28uRJrSr3xZ0E7IHLu6W3Nm1Sb2IqgsGBgb07dmh1uikHXb7l7Vey5fK7d+/57LPPuO9tIKPP3GVY7iRgD1zeLbXs28dfxKKgby/VoNXppuDypavod4sTv/tdxh6dxp0E7IHLu6USXZ7IisvP/98fcw85Q+Zcvru7m3vdnsxN2nAnAXvg8m7p/3bvVo8xKI6suPyC6bO4h5whcy7PXV4UAwODWm2OizsJ2AOXd0s7Xn75r4VeRmFgaHDwrU2btDrd1MKZj3IPOUNFuTyh1ea4uJOAPXB5t1Q5d1LC5UsX93qxaLU5Lu4kYA9c3i1V33LL2oYG/hbak5XpGhJcvnRdvnyZO74otNocF3cSsAcu75amV1XVTJ5c9G9fM/QUYrh86Sr4plkD7e3tWm2OizsJ2AOXd1Hrn312dGSEv47JGB0d3bFli1aPy4LLly7Da2YLsnPnTq02x8WdBOyBy7soGtHv37WLv47J6Mrns/XkYSdd/uVsuXxzc3Nxd2R99tlnP/vZHK02x8WdBOyByzuqH0+YcLqtTT4oPI5//OMf5zo7DzY3Z+U5ZYEcdPm9r6/Jlsu/+eb2oaEh/hzY8NFHH2lVuS/uJGAPXN5d0dg8t2dPb08PfzWjoNL3W1peX7cuc++KctDld2TtycNFP61s48aNWlXuizsJ2AOXd1rBs+YP5XJtra3q+TaXL18eHBjoOHWq5Z13aAif0fe+OujyC+b9PFsuT6qunnH06NHgg5GEG/7k4ZtD0hKKFXcSsAcuD5VHcPm05NZbRDSLJ2kJxYo7CdgDl4fKI7h8Wqqqun3Tps0Fn1w2Ojp65MiRurql2uIpS7N4kpZQrLiTgD1weag8mvPAA9xDzpBRlyept3uzo0fxyiubvoq3e2sWT9ISihV3ErAHLg+VRw66/BPk8g9m0uUDTZlyf31948qVL7S2tuav0dbWRuP3tWvXNTQ0ask3SprFk7SEYsWdBOyBy0PlkYPPl8+6yzshzeJJWkKx4k4C9sDlofIILu+nNIsnaQnFijsJ2AOXh8ojuLyf0iyepCUUK+4kYA9cHiqP4PJ+SrN4kpZQrLiTgD1weag8gsv7pKqq27/3vf9csWLlyZMn+Z6ea4+9XLToSS2zaHEnAXvg8lB5BJf3SRs2bMzn8xcvXpRPXhoeHu7q6jp06FBt7RItvwhxJwF74PJQeQSX90O33vrNvXv3Xbhwga09it6eXsqhTG1ZK3EnAXvg8lB5BJd3Ttp8egJVV89oS/bkVMqhTMrXVxqn0Lq4k4A9cPnrNL2qasbEOzc1NR07cuRMe3t3Pk9qO358zfLlWXmf6g1V0D6NixYd3L+/vbW1lPaByzunkLEW1K5db7OLJ4Py9ZXGKbQu7iRgD1z+SwUPgDzY3Nxx6tTgwIB8P8Mn+fzhA+/WzZpFOdpSlSPVPtQUf7l0Sb10dGhwMGgfKk3+gEy4vHMKGatZDz00NfgAWEFLTbzzLn3VYYVWx50E7IHLXxUNUVfW1rbkcuYXrvb29OT27GmoqcnW+zpKV8L2ISghYfvA5Z1TyFjN+uijj7jXbfj000+XLEnwxLTQ6riTgD1w+asv66DxKX8Gk0H5mXtrRym6Ee0Dl3dOIWON0ze+8e/FDeQDGhufKfzQtNBKuZOAPXD5m7auXt3X28sfwGSMjozsfv11rR6PdSPax0GXf/7pJXD5JJo27eHnnvstd7Y9u3btmjLlfn3tmkIr5U4C9lS6y9fNmtVy4F3+9CXmypUrf25pyehLmqw0b9Kkhief5N1OTJL2mfMD51z+pZX1cPkkmj17zokTrX//+9+5vy358MMPa2rm62vXFFopdxKwp9JdnsyIP3qWXH3h6qFD3s/brK+vN794No6C7QOXd04hY41TfX3j8PAw97Q9Q0NDS5cu09euKbRS7iRgT0W7/Kw77ug2/prDDC37k+9+V6vTJ1H7bFixgvfWHnP7OOjyG16AyycSuTz3cbFQDfraNYVWyp0E7Klol182c2YpLj8yPNy4aJFWp0+i9tn5xjbeW3vM7eOgyz9R8xhcPong8tmiol1+fX390OAgf+7sGRsbO7h/v1anT1o8deon+TzvrT3m9nHQ5TsO7oDLJ9HSpcsGBor/4hBw+a+SSnd5/tAVy5n2dq1On0Tt87cSjoKEoX3g8s4pZKxxqqmZL589aUt7e/vs2XP0tWsKrZQ7CdgDly+J7nxeq9Mn3dD2gcs7p5CxxmnKlPufe+457mN7Dh48OG3aw/raNYVWyp0E7Klol1+1dKl8jEER+O3y1D7qMQbFkS2XP7Jn00MPPqDbTeUoZKxxqqq6/f77H+A+tufVV18r/JCD0Eq5k4A9Fe3yT8+ZM1LKDWGDgwf27dPq9EnUPl2ffMJ7a4+5fRx0+X3b1sDlE4qMfmhoiHvahq6ursWLa/VVhxVaI3cSsKeiXb70Oyl/VVOj1emTqH32vPUW76095vaByzunkLGa1dDQODAwwJ2dDMp/6qlleFrZV0xFu/z0qqquEu4h6c7nyQe1On0Stc/65ct5b+0xtw9c3jmFjLWg8OThTFDRLk/avnlz0b/t/HNLi1abf5o7ZUrB51BGUrB94PJ+qDfxM44oU1vWJLh8elS6y8+bNKkll7ty5Qp/EpMxOjqa27OnEp5jQ6LdvBHt46DL/+6ZZXB5W91227dOnjxZ8HVRZ86coUxtWZPg8ulR6S5PWllbe66zkz+MyTjd1tbg9Yy8phvy5GG4vEfaunUr932I/v7+bdu2UU7VzYWeNiwFl08PuPxVkSVtWbMmyfN1R0dG3t62zfuHlGlK3j5EwvZx0OV/+/QSuHzRmnjnXXV1Sw4fPsyfgy++OH/+fH19Q5Ev9YbLpwdc/qqmV1U1zp275cUXzXPQVLpl7dokL0LyTAnbp7enZ8/v30rYPg66/BM1j8HlSxEZ/ezZc+rrGwPV1My/557/KPzCkEjB5dMDLv+l5k2aRHpp+fL3cjn1fJuxsbG/9vUdPXRow4oVNZMna4tUlFT77Hxjm3q+TdA+vX/5C7XPuoYGStCWihNcHjIJLp8ecPkILZs5c319faBVS5eSnp4zx++bJq1ETaGaKGicoH2qJ0zQMg2Cy/upkDunJe4kYA9cHiqP4PJ+KuTOaYk7CdgDl4fKI7i8nwq5c1riTgL2wOWh8ggu76dC7pyWuJOAPXB5qDyCy/upkDunJe4kYA9cHiqPHHT5x+HypSvkzmmJOwnYA5eHyiO4vJ8KuXNa4k4C9sDlofJozg/u5x5yBrh8Cgq5c1riTgL2wOWh8ggu76dC7pyWuJOAPXB5qDyCy/upkDunJe4kYA9cHiqP4PJ+KuTOaYk7CdgDl4fKI7i8nwq5c1riTgL2wOWh8uj5BU9wDzlD894/wuVLVcid0xJ3ErDln//8f6c6NIFl5hOxAAAAAElFTkSuQmCC)
La representación matemática de la suma es:
![](data:image/png;base64,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)
Aplica el método que se usó anteriormente, de descomposición-simetrización-anulación.
![](data:image/png;base64,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)
La operación anterior, da como resultado: +2
Ahora, piensa cómo explicar que el resultado de esta operación es dos y
compara tu procedimiento con el mostrado anteriormente.
¿Qué método se te hace más práctico?
¿Conoces otros métodos o estrategias para resolver estas operaciones?
Con esto has finalizado la sesión, dedicada a la recapitulación de las estructuras aditivas de los números enteros.
Recuerda que éste es un material de apoyo, y para complementar lo estudiado puedes consultar otras fuentes.
Consulta tu libro de texto de Matemáticas, de segundo grado, y resuelve las actividades que ahí se encuentren sobre las estructuras aditivas de los números enteros.
Para iniciar, analiza el tema a partir de la siguiente situación.
Situación, temperatura México y Rusia
En Rusia, el invierno dura aproximadamente 5 meses, y durante esa estación del año las temperaturas son frías; sin embargo, la temperatura promedio puede variar entre las distintas ciudades de ese país. Por ejemplo, la temperatura promedio en la ciudad de Yakutia en invierno es de 55 grados Celsius bajo cero, es decir, una temperatura negativa, correspondiente a -55°C. Mientras que, en el oeste de Rusia, la temperatura promedio es de menos quince grados Celsius (-15°C). Por otro lado, en Yakutia o República de Sajá, como también se le conoce, en 1926, se registró una temperatura mínima de menos 72 grados (-72°C).
En México, hubo un año en el que la temperatura promedio más alta, en invierno, fue de 20°C; y la más baja, fue de 0°C. Aunque se han registrado temperaturas negativas en zonas del norte y en regiones altas o montañosas de menos diez grados centígrados (-10°C). La temperatura mínima histórica registrada en México fue de menos veinticinco grados (-25°C) en la ciudad de Chihuahua en 1997.
Con la información anterior, responde: ¿cuáles son los valores de las temperaturas en invierno en cada lugar que se mencionó?
El registro de las temperaturas es el siguiente.
Durante el invierno:
- La temperatura promedio en Yakutia fue de -55°C.
- La temperatura promedio en el oeste de Rusia fue de -15°C.
- La temperatura mínima registrada en Yakutia fue de -72°C.
- La temperatura máxima promedio en México fue de 20°C.
- La temperatura mínima promedio en México fue de 0°C.
- La temperatura mínima en el norte o en lugares altos o montañosos fue de -10°C.
- Y la temperatura extrema mínima registrada en México fue de -25°C, en Chihuahua.
Ahora que ya tienes los datos de temperatura bien identificados, ordena las temperaturas de menor a mayor y realiza el registro en una tabla.
El orden de menor a mayor temperatura en la tabla queda de la siguiente manera:
Esto quiere decir que, -72 es menor que -55, y éste a su vez es menor que -25, que a su vez es menor que -15, y éste es menor que -10, que también es menor que cero y cero es menor que veinte.
Por lo tanto, la temperatura menor de estos registros es de -72°C y la mayor es de 20°C.
Ya que conoces los valores de temperatura y el orden de éstos, ahora resolverás los siguientes problemas que tienen que ver con la comparación de estas temperaturas.
Los números que representan a estas temperaturas son números enteros. Recuerda que los números enteros son el conjunto de números formados por los naturales, sus simétricos y el cero.
Es decir, los naturales, son los que sirven para contar, como el 1, 2, 3, etc. y sus simétricos, que son los negativos de los naturales, como el -1, -2, -3, etc. y el cero.
Ahora que ya recordaste cuáles son los números enteros, realiza operaciones de adición y sustracción con ellos. Responde las siguientes preguntas relacionadas con la información anterior:
¿Cuál es la diferencia entre la mayor y la menor de las temperaturas que se registró en la tabla?
¿Cuál es la diferencia entre las temperaturas que se tienen registradas en la ciudad de Yakutia?
¿Cuál es la diferencia entre las temperaturas que se tienen en México?
Y ¿qué significan estas diferencias?
Primera pregunta:
¿Cuál es la diferencia entre la mayor y la menor de las temperaturas que se registró en la tabla?
Lo primero que tienes que hacer es identificar cuáles son la mayor y la menor temperatura registradas:
La temperatura mayor es 20 grados centígrados y la menor es -72 grados centígrados.
Ahora expresa la diferencia entre éstas:
La diferencia “D” es igual a la temperatura mayor menos la temperatura menor, ya que la pregunta así lo está planteando.
D = Temperatura mayor – temperatura menor
Entonces, sustituyendo en la expresión de la diferencia tienes que:
D = (20°C) – (-72°C)
Antes de resolver la operación, recuerda utilizar los paréntesis para no confundir la operación de sustracción con el carácter positivo o negativo de los números.
Reflexiona:
¿Qué operación estás realizando, una suma o una resta? Como puedes notar, es una resta.
¿Cómo son los números que estás restando? Estás restando un número negativo de un número positivo.
Entonces la estructura es una resta entre un número positivo y uno negativo.
Presta atención, porque utilizarás varias estrategias para resolver la resta.
Utiliza al inverso aditivo para resolver la sustracción.
Recuerden que, el inverso aditivo de un número entero es su simétrico, de tal forma que, al sumar un número entero con su simétrico, la suma que se obtiene es cero.
El simétrico de a, es menos a.
Utiliza esta propiedad para convertir una sustracción en adición:
Por ejemplo:
Así la operación 20 - 72 negativo, la conviertes en 20 más 72, porque el simétrico de 72 negativo es 72 positivo, y basta sumar 20 más 72.
La diferencia entre 20 grados centígrados y menos 72 grados centígrados, es de 92 grados.
Reflexiona nuevamente:
¿Qué significa esa diferencia de 92 grados?
Esa diferencia significa que desde menos 72 grados hasta 20 grados existen 92 grados, esto lo puedes observar en la siguiente representación, utilizando a la recta numérica como si fuera un termómetro.
Pero ¿qué significado tendría si la diferencia se realiza de forma que, a la temperatura menor, se le reste la temperatura mayor?
En este caso, la diferencia sería a setenta y dos negativo restarle veinte positivo.
Recuerda que una diferencia se puede convertir en adición, aplicando el inverso aditivo al sustraendo. Entonces tienes que 72 negativo menos veinte positivo es igual a 72 negativo más 20 negativo.
Resolviendo ahora esta operación, tienes la suma de dos números negativos.
Sumando 72 negativo, más 20 negativo, el resultado es 92 negativo.
Si recuerdas, para sumar dos números negativos, sería como sumar el simétrico de 72 con el simétrico de 20, que es igual al simétrico de 92.
Pero ¿qué significado tiene este resultado?
Esto significa que, de 20 a menos 72 grados centígrados hay menos 92 grados. Esto lo puedes visualizar con la siguiente recta numérica que representa al termómetro.
Observa que, en los dos casos anteriores, obtuviste como resultado a números simétricos.
Reflexiona:
¿Es lo mismo restar 20 menos 72 negativo que, restar 72 negativo menos 20 positivo?
Como bien puedes observar no lo es, ya que la sustracción no cumple con la propiedad conmutativa. Además, el carácter positivo o negativo del resultado tiene un significado.
La primera operación, 20 menos 72 negativo cuyo resultado es 92, quiere decir que se está comparando al 72 negativo con el 20 positivo; es decir, cuántos grados hay desde el 72 negativo hasta el 20 positivo. Esto implica que, si a 72 negativo se le suma 92 positivo, se obtiene 20 como resultado, como lo indica la imagen.
De manera análoga, en la segunda operación, 72 negativo menos 20 positivo, quiere decir que se está comparando al 20 con el 72 negativo; es decir, cuántos grados hay desde el veinte hasta el 72 negativo. Esto implica que, si a 20 se le suma 92 negativo, se obtiene 72 negativo, como lo pueden apreciar en la imagen.
Una sustracción se puede convertir en adición con ayuda del simétrico, o del inverso aditivo, aplicado al sustraendo.
Ya que realizaste una sustracción de enteros y se le dio significado a la operación. Responde la segunda pregunta.
Segunda pregunta:
¿Cuál es la diferencia entre las temperaturas que se tienen registradas en la Ciudad de Yakutia?
Las temperaturas en Yakutia son:
Menos 72 grados centígrados en 1926, y la temperatura promedio (en inverno), que es de menos 55 grados centígrados.
La diferencia “D” de temperaturas, entre la temperatura promedio y la mínima histórica es:
D = temperatura promedio – temperatura mínima histórica
Al sustituir, tienes que:
D = (-55°C) – (-72°C)
Ahora, resuelve esta operación.
En este caso, tienes la resta de dos números negativos, ¿cómo se hace?
Utilizando la estrategia que ya conoces, aplicarás el inverso aditivo al sustraendo para convertir la resta, en suma. Nos queda que 55 negativo menos 72 negativo es igual a cincuenta y cinco negativo más setenta y dos positivo.
La operación se resolvió por medio de la descomposición-simetrización-anulación. Quedando cero más diecisiete, que a su vez es igual a diecisiete.
Por lo tanto:
Reflexiona:
¿Qué ocurre si se resta la temperatura mínima histórica menos la temperatura promedio de Yakutia?
¿Puedes predecir qué tipo de número obtendrías como resultado?
Obtendrías el simétrico del resultado anterior, es decir: ahora en la resta, 72 negativo menos 55 negativo, obtienes 17 negativo como resultado.
Ahora en lugar de utilizar al inverso aditivo aplicado al sustraendo, utilizarás otro método, uno directo.
En este caso, puedes recurrir al concepto de cantidad para realizar la sustracción, es decir, a 72 cantidades negativas le quitas 55 cantidades negativas y quedan diecisiete cantidades negativas.
Si esto lo concretas a números, tienes que a 72 negativo le quitas 55 negativo y el resultado es 17 negativo.
Resumiendo, en las dos operaciones que se realizaron, tienes que la temperatura promedio de Yakutia menos la temperatura mínima histórica, es de 17 grados Celsius, mientras que la temperatura mínima histórica menos la temperatura promedio de Yakutia es de menos 17 grados Celsius.
Pero ¿qué significado tienen estos dos resultados?
En el primer caso estás comparando cuántos grados hay desde 72 negativo hasta 55 negativo, es decir hay 17 grados. La interpretación es que la temperatura promedio de Yakutia en invierno es mayor, por 17 grados centígrados, que la temperatura mínima histórica en 1926.
En el segundo caso estás comparando cuántos grados hay desde 55 negativo hasta 72 negativo, es decir hay menos 17 grados. Esto significa que la temperatura mínima histórica de Yakutia, en 1926 fue 17 grados más baja que la temperatura promedio en invierno.
Continúa con la siguiente pregunta.
Tercera pregunta:
¿Cuál es la diferencia de temperaturas que se presentaron en México durante el invierno?
Se pueden realizar al menos tres comparaciones; pero aquí, sólo realizarás dos de ellas.
- La temperatura mínima promedio registrada con la temperatura máxima promedio.
- Y la temperatura mínima promedio con la temperatura de las zonas montañosas.
En el primer caso la diferencia “D” es: la temperatura mínima promedio de cero grados menos la temperatura máxima promedio de 20 grados.
Para resolver esta operación sustituye al cero por su equivalente, veinte más su simétrico menos veinte.
Llevando a cabo las operaciones, queda -20.
¿Qué significa este resultado?
Esto significa que la temperatura mínima promedio en México es 20 grados menor que la temperatura máxima promedio, en invierno.
En el segundo caso la diferencia “D” es: la temperatura mínima promedio de cero grados, menos la temperatura de las zonas montañosas de menos 10 grados centígrados.
Para resolver esta operación sustituye al cero por su equivalente, ahora será diez más su simétrico menos diez.
Porque si a un número se le resta el mismo número estos se cancelan y sólo queda diez.
¿Qué significa este resultado?
Esto significa que la temperatura mínima promedio en México es 10 grados mayor que la temperatura en las zonas montañosas, de acuerdo con los datos de la tabla.
A continuación, para fortalecer lo estudiado hasta este momento, reflexiona sobre las estructuras aditivas.
¿Por qué se llaman estructuras aditivas cuando se resuelve una resta?
Se llaman estructuras aditivas a las expresiones en las que se suman o restan números, en este caso enteros, porque en matemáticas puedes convertir una sustracción en una suma aplicando el inverso aditivo al sustraendo.
a – b = a + (-b)
Operatoriamente bastaría con saber sumar enteros, ya que una resta la puedes transformar en una suma. Debes tener cuidado cuando se realicen sustracciones que van acompañadas de significados como los que has visto en esta sesión.
A lo largo de los cuestionamientos que se resolvieron, se aplicaron diferentes métodos o estrategias para resolver las operaciones.
Los casos en la adición, en todas las operaciones se utilizan los paréntesis para no confundir a la operación con el tipo de números, sean negativos o positivos.
Para ello, partirás de diferentes situaciones problemáticas.
Caso 1. Suma de dos números positivos
Se sabe que el átomo de Helio tiene dos protones y cada uno tiene una carga positiva de una unidad.
¿Cuántas cargas positivas tiene este átomo en total?
La representación matemática de esta situación es:
(+1) + (+1) = +2 = 2
Caso 2. Suma de dos números negativos
Se sabe que el átomo de Helio tiene dos electrones y cada uno tiene una carga negativa de una unidad.
¿Cuántas cargas negativas tiene este átomo en total?
La representación matemática de esta situación es:
(-1) + (-1) = -2
Caso 3. Suma de un número positivo con un número negativo
Se sabe que el átomo de Helio tiene dos protones y dos electrones.
¿Cuál es la carga total de ese átomo?
La representación matemática de esta situación es:
(+2) + (-2) = 0
Porque esta representación corresponde a la suma de un número con su simétrico, que tiene como resultado cero. En este caso el significado es que dos cargas positivas se neutralizan con dos cargas negativas, y la carga total resultante del átomo es cero.
En el caso que acabas de analizar, la suma de un número positivo con un número negativo da cero porque los números fueron simétricos, pero no siempre ocurre esto.
Analiza otra situación.
Situación, dados. Primer resultado
Se tienen dos dados, uno rojo con puntos que representan números positivos del 1 al 6 y el otro azul, que representan a los números negativos del uno negativo al seis negativo.
Al tirar ambos, los puntos se sumarán.
El primer resultado es: (+2), (-6)
La representación matemática de la suma es:
Aplica el método que se usó anteriormente, de descomposición-simetrización-anulación.
La operación anterior, da como resultado: -4
Continúa con el segundo resultado.
Segundo resultado
El segundo resultado al lanzar los dados es: (5), (-3)
La representación matemática de la suma es:
Aplica el método que se usó anteriormente, de descomposición-simetrización-anulación.
La operación anterior, da como resultado: +2
Ahora, piensa cómo explicar que el resultado de esta operación es dos y
compara tu procedimiento con el mostrado anteriormente.
¿Qué método se te hace más práctico?
¿Conoces otros métodos o estrategias para resolver estas operaciones?
Con esto has finalizado la sesión, dedicada a la recapitulación de las estructuras aditivas de los números enteros.
Recuerda que éste es un material de apoyo, y para complementar lo estudiado puedes consultar otras fuentes.
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