Actualizar Secuencia Didactica: 7989

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SUMAS REAGRUPANDO.Ya sabemos que suma es el proceso de juntar dos o más cantidades llamada sumandos con el fin de obtener una sola cantidad llamada total. El signo de la suma o adición es + y se lee más.En algunos casos vamos a encontrar sumas un poco más complejas, las cuales van a necesitar reagruparse para poder resolverse, para facilitar el proceso de la suma nos vamos a ayudar del cuadro de valor posicional donde vamos a ubicar las cifras teniendo en cuenta las unidades debajo de las unidades y las decenas debajo de las decenas.Pasos para realizar una suma por reagrupación:1. Se escriben las cantidades a sumar una debajo de otra, haciendo coincidir las unidades y las decenas.2. Empezamos a sumar de derecha a izquierda, es decir empezamos con las unidades y seguimos con las decenas.3. Si el resultado de la suma de las unidades es igual o mayor a 10, escribimos la unidad como resultado y la decena la acarreamos, es decir la escribimos arriba de las decenas de los sumandos dados, para luego sumar este número con las demás decenas.Ejemplo: vamos a sumar 34 + 281. Vamos a escribir las cantidades a sumar en el cuadro de valor posicional:<img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJwAAACPCAYAAAAP+rJ4AAARrklEQVR4Ae2dCXAVVdbHm11ERAdcQGVKwQFhxNJPHKf8Zsqy3FBxq5EdMbIoJPABIigj+56wiSAhgCAWKJAQCHteQhJIAglIQGDICiHBJCQhCSFkT/5fnW46Q146eXl5ffs9X59b1fXeu337vnvO/fW5W9/TEjiwBgzUgGTgf/FfsQbAwDEEhmrAacBVVVYj92ohfk/IM8WRdakA11JvmELWzJR8lN6q0ATZacDlZRTBe8AerBlzGH5eIVjnZXHbY/2EECwdvBcL3w8EfXd3Wef280fs3mTXAi4zuQCrRx1CUUEpKsoq3fsor0LE1gvY+s0xVJRXub2sOxceR9iP510MuJQC+I4LlpWvWTI3i4wOSMCOecfdTCptcXYvP4nwny5onnRak5pJwI0NRlmxdluvWdo/cGTUznhsnxv9B5ag8UUPXBrLwDVeXWJSMnCKXtnCieGrTq4MHANXBwqREQwcAydroLoaiE0rRGpeqUjewMAxcLIGYq4UovWEMAze8h8GTicN8KChAUVuOZkF6ZPD6LfutwZSOX6KLZyiQ9MPGnyjMiB5BKP/hnOOU9VADgwcAydrYGlYOqQRhzH0J25SG7hf7DrFTWoD6lpguQLp40P4fEdiA6kcP8UWTtGh6ZvU2QdTZQs3NSjFcaoayIGBMxlwhWWV2HA8A59ui8eAjefx2S8JCEvKx8hf4iF9GoyFlisN4OL4KUOAozkePz/g88+BjIzaha6sBLy9AS8vIDe39jmdf5m+SU3MKUZfn1OQRgZDGn4I0tCD8merLyLQZVY0pLGhWH/cqoJ0rgRDgMvPB/78Z0CSgF27aktAAP7pT8q5sLDa53T+ZWrgrt+qwNNLTsr9tIdnROOTbfGYefAyPvjhPJpNDIc0NgSS1xEc+M91ndVeOztDgEtKAtq3V6CyWGoXgM61bQu0aAGcEzsiNzVwsw9elq1Z32W/4vL1klqVsD0uG3dPjpCBC03Mr3VO7x+GABcRocBG0CUk1BaBgGvTBmjZErh4sfY5nX+ZFrjSiir0XhwLaYwFwQl5mmp9btmvMnDRl25ontcr0hDgqKmk5vSBB4BLl2oX/cQJoHlzoFMnIDW19jmdf5kWuEvXS9D6iwg8ODMaN0sr66i1sqoazy9XgItyB+COHPkvcClWo+6QEOVc585AenodXegZYVrgzmfdgjT+CHosigXBZR0qqqrxP7ctXKQ7ABcTo1ixjh0Ba+Di44FWrYAHHwTS0qxVoetv0wKXlFuMlpMj0HF6JHKLyjWV+veVcUqTG6/d5Gpe1IRIQ5rUK1eADh2UgcF5qz0F1Idj4MQ+Yn6rvEoZoXocxpcaE7uJ2cXoOvs4pM9CcOCCG4xSc3KA7t2VptN6lJqdzcAZsadh1dGryvzb+CMY9UsCjqUUICmnGGsif1dgGxcKaVwo1hz7vQl2q/GXGGLhysqAf/xDAW7YMODsWYCa0n37gKlTlea2SxfuwzW+2uxPSf00etZNnvT1OAxpfBiaTQqHNCZEiRsbCmmUBZMCtfdR2v+P2lcYAhz9Na0m0Ei1vqNdu7pTJtpFbnKsaftwqsYIuhXh6XhmcSzumnIULSdF4IF/R2HAjxfwzYHL6DQtEsvDxI7cDAOupASYMwf4y1+UOTeae+vVC/DwALp1A/r0AbKyVNUI+TQ9cKpWi8oqQVMlyTnF+L3gv4+UpxeUoryy7ihWvU6PT8OAUwublwckJyvzcYWFSiz18egQHBg4wQpuTPaGA9eYQglKw8AJUqw92TJwirZM/zycPdA4kpaBY+Ac4cfuaxk4Bs5uaBy5gIFj4Bzhx+5rGTgGzm5oHLmAgWPgHOHH7msZOAbObmgcuYCBY+Ac4cfuaxk4Bs5uaBy5gIFzNnDJBfDzstpZ5EiNuvi15NU7YNEJFy+lPsXb+92vCNviYj5+s9MK4f3RHhz4Pg4hP5yDZeNvbnuEbj6HjZNCsXzoPtB3t5Z10zksG7oPkTviNel12tJWTlohlvxrD3YvO4n9a+Kwf/Vptz0Oro3DOk8LfAYF4aDvGbeVk+qQZPUeEIQoVwOO3tPg52miJjUoCf5maVJXuWCTym7zNVsct4jkx5NcoBp5lKpUgtP6cGzhXOAuEFQEtnCCFGtPtmzhFG2xhbOHGgfSMnAMnAP42H8pA2cy4FJTU7Fq1SoMHDgQH330EWbPno1jx47ZT04Tr3AmcFFRURgyZAimT5+OW7duNVGCxl9m6j5cZWUlfH198eijj0KSpFpHixYt4OnpiRLayyk4OAu4c+fO4ZFHHpHlbtmyJc6cOSNYUsDUwMXFxdVA1qdPH3z99deYO3cu3n///Zr4ZcuWCa8EZwBXWlqKN954o0bOe++9F6dPnxYuq6mBy8rKwrvvvoupU6ci18qZ8ooVK+TKePbZZ1FGfjkEBmcAt3DhQlm+Z555Bp06dcLdd98NugFFB1MD15By8/Pzcc8996BLly7IEbwj3WjgIiMjZdnatWuHwMBA9OzZE61atWLgnPlG6MOHD6N58+bo0aOH8M60kcDRjfTCCy/I1o0sO1nvxx57jIEzwl2XtYUjS0aj0zlz5qBz585ypXz11VfWyXT/bSRwU6ZMkeXq3r273I2gQRENHNjCGfjOe+pAU0U8/vjjcmXQiJVGqWPGjEFBQYHugFlnaBRwBw4ckMEi+bZt2yYXIy8vj4Ezei2VlE53/J1TI3TX79+/35oNIb+NAC4jIwNPPfWULOOgQYNq5LgTOJ4WKa6oUYzoL1Qh1G/z9vZG79695Ypp06YNtmzZIvqvhb8RmprNDz/8UJaJ+qR3DoLKy8tr+nCJiWJfYkeK5FGqBk5UIeocFVk6mj4RGURbOFpFUK13t27dMGzYMHlFhVZWPvjgA7Rt21YeIL3++uuYOHEiLgp8OQgDVw9JpHSaDKWKCgoKqieVPtGigaMmtFmzZjXQqfDV9zljxgx9BNPIhYHTUIoapU4fbNy4UY0S8ikauOLiYnmOjQYNdPPs3LkTfn5+WL16NaZNm4b27dvLFm7kyJFYtGgRUqzf46Cj1KYGzt/fX160pjVV60DzU08++aRsFaiiRAbRwNkquzoPRw8xiA6mBu7FF1+UgaIpEeswb948+RxVxrVr16xP6/rbmcDdOUrlpS3Bo9T169fX9GveeustLFmyBMuXL8fbb79dE09Pk4gOzgSOBkQPPfSQPD/Hi/eCgSOQ6Nk3ejTHugNNy1oLFiwQzZqcv7OB69Chgyw/A2cAcFTjp06dwsyZM0FWjqYGJk+eDHow0ajgTOCqqqowf/58jBgxAtS8ig6m7sOJVm5j83cmcI0to17pGDi9NOlAPgycojzeteUARPZcysAxcPbw4nBaBs7ZwJnMmU3MniT4LzSJf7hvTyHc1fzDXUu9gZUf78f58DQknMhw+2OXdwz8vELcXk6qyw0TQ3H054uarYLT+nC5V29ifv8A+Hpa8MMXR7Bxkvsem78Mh8/AIMx9yx+bp4a7vayzXtuO6IAE1wKOHsBcNy4YlRVVmgVzt8jjuxKwY/5xdxNLU549K04i/CcXc7mqPvFbXlJ3UV1Tij94ZLR/PLbPi/6DS9G44gcui3Vd4Jy5a6tx6tMnFY9SFT06rQ+nWjgGTh+gXSkXXmlwgdpgC8cWzlAMGTgGjoETpAFuUm8rlnZqkZ8N2ib43XffISYmRpDK62ZrtIWjDUK0T2Px4sVYs2aNobIycAC2bt0qO3S58yHMu+66C0OHDgXtVxUdjAKOPAyQS7L77ruv1gOnJOuoUaNw8+ZN0aKae18qbZShClBBe+KJJ+THy59//vmaOHogU3RFGAEcPWjp5eUly0VbBl966SX0798fffv2rZGVfKqIDqa2cNR0qrDRRhrVmpHr0ZUrV4LufDq/d+9eofVgBHBHjx6VtwKSC7IdO3agokLxakCyksMekpN8xYm+uUwN3KZNm9CrVy9s2LBBE6jnnntOroh169Zpntcr0gjgVAeEgwcPrlPshIQEGcaHH34Y6enpdc7rGaEPcHHpwNmrupXLyIlf2iSsFej5fnJGSHc+bRwWGYwAbtasWbIsWsCFhITI58itRWZmpkhRdejDEWwdxgMdPIGoZF0KayRw9RVYtQjUwU5O1keu+v7LCOBoxz3dPNRNIF8j8fHxuHr1KjZv3lwzYBo+fDi0NoXXV+6mxDtu4ZYGA9IgQBoC0HcdgrOBIxcI5KCPKmjSpEk6SNRwFkYAR16SyCs7bX8kucivL1k0+k6Hh4cHrl+/3nBBdTjrOHAz9gDSUED6GNiizyM2zgKOdtiPHj26phLeeecdkItS0cEI4EiGpKQk2TWXCtmdn+PHjxc+YKAyNA24i5nA7jPAnjPAh2sBaQQgfQKM3QoEnQUCTgMnU4HqplWVM4ALDQ3F008/XQPbhAkTcOPGjaYJYOdVRgBHXtpfeeUVWT5qVgkwmvylvbgqeG+++aZwj5/2A5dbBHT7NyANVJpRyQOQPrt9EHhDlCa2+egm9+mMBo6mR9QpEHpfA604GBmMAE71ldK1a1fc6ZyHpkdoCkjtQnz77bdCRbcfuJIKYFoA8NeZQO9ZQKfJgDQKkEYDnb8E/job6PEN8E8fICWnSYU3Eri1a9fW3OHk01e04xothYgGjia4Vddj9U0B0aoKWbr33nsP1dVNbJq0hLOKsx84NYPSCoCOKf6ANEzpw60JU+KKywEHCm0UcGlpabj//vtlRRvhrVxVnfWnaOBoNEqDBHovA41OtQKtqRJwBGZ9U0Va19kb13Tg1H+atuv2oGE44HdUjXXo0yjgVO9J1HejUZyzgmjgaFqHHNaQR8/6nA36+PjIwNGynmsDt9wCSP8CpMHA9lO61JlRwNGUB93V5AWSQlFRkexwmSwfVRI56FOXgHQRrJ5MRANHrv9V54o0v2gdqMl9+eWXZV0MGDDARZtUtdSZBcC7q4GBfkCB9qy9mrSxn0YBRxOdBBwNFKjvQktZtIDfsWNHeRBBFuHVV1/FiRNiNymLBo70rr4QpHXr1vL7Jw4dOiTLFRAQIL9vjPRAi/qi/Rk73qQ2liI70hkFnLrcQ8q2PtQJUoon910igxHAZWdno1+/fnXkVOWmF6Hw0yKC/cOR90d6CJHeOUWeLunuDgsLk33D0UOKFosFBCV9FxmMAI7KT0+C0BTIa6+9Jr8jliw5vdiNLD1ZPCOCqS2cEQpuzH8YBdydZaEVFLJ61G81MjBwRmq7nv9yBnD1FEV4NAMnXMW2/4CBU3TEG6Fts6JLCgbOBYD7fpwFZeXillh0IUWnTCJ3JeLn+WKnXnQqqsPZ7FpxCmGu5szmWkoBfhh1AGVZhcCNEmV+j+b43PEoKsWJH89i1/RwoKjUPWVU662oFPvmRyLyp/Oa4DqtSS1PzUNmz3mo/ttC4H+9gZfc+PinD270nIOcrrcfeHBzWXO7TkXBZu09v04Djizc5k/3ofxKPpB9E8hx4yO7ELEb47D7qyNAdqHby7p/dgSiXM3CZaQU4HvPEJRVmKQPF5iInxeYow8X4Ip9OKOWtjQ7Ek6I5FGqonSnNakMnBOoN+gveeLXIEU39Dds4RTtsIVriBIdzzFwDJyOONnOioFj4GxTomMKBo6B0xEn21kxcAycbUp0TMHAMXA64mQ7KwaOgbNNiY4pGDgGTkecbGfFwDFwtinRMQUDx8DpiJPtrBg4Bs42JTqmYOAYOB1xsp0VA8fA2aZExxQMHAOnI062s2LgGDjblOiYgoFj4HTEyXZWDBwDZ5sSHVMwcAycjjjZzoqBY+BsU6JjCgaOgdMRJ9tZMXAMnG1KdEzBwDFwOuJkOysGjoGzTYmOKRg4Bk5HnGxnxcC5AHDrPC1Nfjmc7Sp2rRQxuxOx0yS+RYJWnkL4lguaFeC0jdBZKQVYOigIiScykPpbNi6fdd8j7UIOAn1i4TvWgrQLuW4v6/r/C8WRH13MP1zh9RJs+iIMaz8Pht/4ELc+1k8Ige84C9aODcb6CaFuL+sqj4O4GKX9unqnWThNe8uRbq8BBs7tq9i1BPx/iCnCIvAsSPUAAAAASUVORK5CYII=" alt="" width="159" height="146" style="width: 159px; height: 146px;">2. Empezamos sumando las unidades, es decir 4 + 8 al sumar obtenemos 12, es decir 1 decena y 2 unidades, vamos a ubicar el 2 debajo de las unidades y hará parte del resultado y el 1 lo llevamos a la casilla de las decenas para continuar sumando: <img src="data:image/png;base64,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" alt="" width="215" height="216" style="width: 215px; height: 216px;">3. Como ya sumamos las unidades, seguimos con la casilla de las decenas, es decir 1 + 3 + 2 al sumar obtenemos 6 y este número lo vamos a ubicar debajo de las decenas: <img src="data:image/png;base64,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" alt="" width="220" height="211" style="width: 220px; height: 211px;">Como no hay más números quiere decir que ya terminamos de sumar, el resultado de la suma 34 + 28 es igual a 62 y se escribe así: 34 + 28 = 62En el siguiente video, desde el minuto 3:04 puedes observar otro ejemplo de sumas reagrupando:<iframe width="500" height="281" src="//www.youtube.com/embed/oexd_Dfic_Q" frameborder="0" allowfullscreen=""></iframe>

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