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Explicación

La multiplicaciòn es una peracion matemàtica que consiste en sumar un nùmero tantas veces como indica otro nùmeroPARTES DE LA MULTIPLICACION <img 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IIxmp/ivs+KqWtLmRWA2SfEkRI8C20i589Rx5VR5uEKWEiSTQuAFDRSMjBR0X4enrWyaxaTAnuLm4AAGmaZmTbzUYVvmDUtki8uH61Typ/XLOPg7rf3S2MrrbqciQ689vg4aKBsYbO4J+OAafNrbpGixooVFUKqjYKoGAAPICkfxLhUc0eggLpwUIA/JsOhHp6eVXv2Xc1PdRvbXB/lMGzebL0Db7nw38mXqckxmmn1KnEdPdXLdY858l+rxrGcZ3xnHjjzrzMCVIBwSNjtt6718y3nHeI8J4w0tzI80inS5b3Z4GORpHQKRuANlIx4GoGafTTyqCASAScAHxOCcDz2BNba+WvaBztPxS+Q25kWNGCWyrkSFyQNe24djjHkMDzr6M5Vt7mO0iS7l7WcL+UfAG/XG3XAwNXjjPjQBM0UsPan7Q5rKaKyso1e4kAYkqWK6iVRUQe87EePTbY52rvK3tK4nDfx2PE4x+UdU3jCSIX2Rhp7rLk46fPbFADxooooAgeZeVLS/UC4iDMvuyL3ZYz1yrjcb746VWdPFuF9NXE7QfK9iX9kv7fhTEqI5g5htrKLtbmVY18MnvOfJFG7H4UAc/LXNtpfKTBKCy+/G3dljPQh0O43B36etTxpTjhdzxa8hvorZeHxxOHWeRf5ZcAeBjBACEZHez6E9KbFAChsPapxG5Dm14T2qq5QsJSRqHh7g8CPvpiXHM9lESk11bxyKoLo8qKyZwNwTkbkClF7JOQkneW6uFuIpoLgNF1QHHeBIZe8M1WOK8Gmjtrm1l4ZPJe/SO0N2FdlMZYbggb6iSMDbvZ6igD6KveYbOEostzDGZACgeRVLg9CoJ3G/Wo2bnayW9FgZQJSobJK9nknSqas/nCcYXHiKUV3YGGSZ77hlxe/SbeD6OyBvyeIlBjyBmNgcDpnu9N63TcKXh/ELW4l4XM0LWinsowbho5wx06nIGXXC79QCMZxQA6rrj9pFKIJLmFJWxiNpFDnPTuk53rxecyWcLMkt1BG6YLq8iKyBsadQJyM6hjPnSD4vy/Mr3sM/Dri5u7mUPb3Kh9KqzZyfAYB3B6dDgDNTvAeSPpPGJIeIxPKsdjBqcmQI8ywW0ZxIMaiMv49RmgBw3PMFpG6I9zCjuAUVpEDOD0KgnfNZ4jzDaW7rHPcwxO3uq7qrH5E0guOcszR3V3BcW11L2swMJt4InDxhsIBO6logq6RhdtsEY3rp514PLHd4it7uWdobdGE1pHcQzMkUaHTKTlDgYLIN2zuBQB9CKwIyNwaWXth4eyJFeIuTDKHOBvgqI5B+sgTH/VnzFMThIYQRB1VGEaBlX3UbSMqvoDtVB9oHNDSa7C2KliNMrkBlRTswP3EAdSc+7pyeruMpjNzSh38FW/hKHSr9ogVhqBJA26536V7W8jK6gwZeuVIYfepIrg5bsf4Ol1rCl5FkHspTh4m8Xg1ZTVjzAJwBq8aZ1t7ROHFRrkeA+KzRyIV9M6Sh/VYimOckbd/ENXU8Shj6Z/UWlrcRyv21rcGKddtcZw49JEPvr6MKY/IHN7XZktrhQt1CAW0+5Kh6SIPDwyPAmqVz1xKwv5oXsl1TRsWe5RGUMuhgsWcDWS5U5OyhTvvgyPs0tDLxGW6T3IoTCzDo8jMh0g+OkISfLWKi3lZKOpnG6vmSjtlnx2Y2qKKKgZwVH8W4VDcxmKaMSIfA+B8GU9VYeBG4qQooAU/MXLE1kDKha4thktneeAeZx+dQDx94AfW61GRuGAIIIIBBG4IO4IpzMB40ieDOn8oWP8yl1OkWOnZByV0/ojJA+FNhN9j0HCddZOXKm8+jJGoa1vjZ8Zs5wcJORDJ5HUdAJ+GpT+rU1UBzlaa4Vce9HLGwPkC6p+1l+6p2di/xaClpm/TB9D187+37j9vcXUdtEqs9uCJJfHLYPZA9CF6nyJxtg095hJPans5Oykki7smkN2bMuzaTs2Cc4pJ8r+x65/hA/TgHt4z2hcNqFySThd9xk7tn4b5BqueQKl7JOMW1pxGOS5UaSCiuekLtgBz6dVJ8M58K+qhSY9rfswkuJkurGMF5GCSxghVz4SjOABgYb5Hzpkck8NubaziguplmlRcalBwF+quTu2kbasDOBQBz858y2FgomutBkG8aYVpmI6aAdx/W2A86VXJdrLxrin8J3WmOCF17NCw3ZDmONc7kKTqZvEn12uXtB9lf8KXQufpfY4iWPT2OvOksc57RftYxjwqvWvsFKOkg4jujKw/k3ipBH896UAOytNxOkal3ZVVRksxAUDzJOwqr8y87JbS/RYInurwjIgiHugjZpHOyL0336j41FQcl3N8wm4vNrUHKWcJK20flrPWVvj67kbUAernnW4vXaHhEPa4Ol7uUFbaM+Ojxlb4enUV38vciRRSC5u5Gvbv+ml3VPSJPdQfj8KtVrapGixxoqIowqqAqqPIAbAV0UAYArNFFAGMUYrNFAGMUYrNFAGMUYrNFAGMVmiigCE5t4l9GtZZQcEKd/EAAlmHqEDEeoFJ3lwZt0kPvy/lGPmW6fIDAHoKaXtMty/DbkDqI2+AyChJ9ArEn4Ur+X5ke2iZPd04A8sbafl0plfc2OC45zz6Eka1SzKilmICgZJPQVsqQ5G4PHd3czz95LbsxHCfcZ2XX2rr9YDYLnbIJ6gYbKWEbuv1K09W7GX4ObgfLlzxDBw9taHrIdp5h5RL9RD9s+HQeNNPg/C4bWJIIEEcaDAUfiT5knck7k13gUVXbyeQvvndLdJmaKKK4JMV4dwBkkAdc+Fe6U/M3MhvXeNGxaIxXA/6SynDM58YQRgJ0cglsqArdSyTrrlZJRj3JLmfmn6Spit2K25yGmXZ5x0KW/kh3Bn6YyE1HpWYoVRQqgKB0CjCj0A8BWJJlU95lBP2nQN6d0sG+G3wr0jg9KdBJHp+HaeintJOXz/Y91Cc4ThbRlLae1miiDDJKgHtpGAG50hIjt/SCpiSQLuSB4b+Zqc9nXDTdXAv2QiCBXitM9ZGYnt7kjw1e6u/u7fVBoseFghxnUqNfKXdkjB7V+EIqoJpMKAo/ITdAMD6le/43eEf08n9xN/oq+UUg8wUP+N3hH9PJ/cTf6Kz/ABu8I/p5P7ib/RV7ooAoX8b3COnbv/czf6K9fxucJ/ppP7ib/RVD56IXmizJIA1WxJOw941YOR+fLu94xcWsjRi3iWfSqKBq0SoiMWOSTgnoQN+lAEsvtV4OGLiV9RABbsJckDoCdGSBk1u/jd4R/TSf3E3+ir3RQBRP43eEf08n9xN/oq4cOvUniSaM5SRFdSQQSrDIODuNj41Dca5wtbSeO3uS8XaKCsrIfo5OSNBk6B+7nB2wRvvU/E4IBUgg7gg5BHmDQBtopK3XtN4sZ7zsLS3e3spGWbOrWEDOuontBknQx7qnHlV64b7Q+HyQRTSXEcBeISGORsMoyVPx7wI260AXCiq9e858PhEZku4FEqhky47yno23RfU12cT5htLdEkmuIo0f3GZwA+2e6fHagCVopcct+0lZLq+jupLeOGGdYoHXV+V1NMFydTBiVjB2AHWrhLzDaK80bTxq0ChpQzY7JSAQWJ2AOR99AEvRVSvvaFw9LaS6S4jmWPAKxsNZY9FAJG5wcfA11cN5ysprQXvbxpD3QxZlHZuVVuzbf3xqGw86ALHRUbwbjdtdoZLaaOVQcEoc4PkR1B+NSVAHNd2ySxvG4DI6srA9CrAgg/EE0heD2Bsp7jh7kloXLKT9eN8FWX5FcjwJNfQVUL2k8pNcGO8t1zcwAgqOs0RzlPIsCSQD1yRtkEdi8PJa0eo5Fyn9yqV4iLxyCaFzHKuwdcHI66XU7OnofkQd64rfi8TgEHLE6ezAJl1jqojA1EjfbHhUqeGXuNQsbjT5nsgceejtNfy059Ke5Rx1PVX6nSyhiySwy08K5/QEJeKISTgTAk27E9NRO8RP6WV/Sq7xsCMggj0pKrh1YYBC92RT70erYCSNsOmdveUA5x472L2VcRdJLmwLFo4lSWHJyUR8ho8/ZDdPIH4UqUV3R5zW6WqC5lUsx/YZlFFFQM4gud7p4rC7kjOHS3lZT5EId/l1pLzWIa2EUZITSygpnOwKo+BuQCFyBvjzIwX/ADRBlKsAVIIIPQg7EH0xSn43yfLw/L26vPaZJ0DLTWw9B1kiHkO8PXepRx5LminWpuM3hSWM+hq5b5i4TFAUuLWKI76leNdgfABwNYHQFck4ywBJFRXMFzwmVdXDobtJjupt0aODPm6yEJj4AHeuu3uFdQyMGU9CDsa90xV+5r18GWdys6exHcqWP0q5SPiZ7JWOmNV/NzvjvRtIGOgkYOnYsDgHGQXpBEqKFUBVAAAAAAA2AAHQUmJ7dJUaKQ4jfAYjqhBykq+TIe98NQ8atvsp5qkuY5LO6P8ALLVij77yIp0h/UgjST8D9alzWGZfEdPOm17nnPZjBrFArXNKFBZiAB1J6CoN4KB7rNQB5rt9WnvY+1ju/wCf4VNpICARuDuCOhqELYT/ACvJOdU4Y3LAvefPZYnE7n6S1y0R0KmkRhh3Sd8lh50nuROTxecSltBOY+x7Rg4XOvspVXBGoYznPXwr6nrWkSjcKB8ABTCBsFUk+ziL/wCP4n/9W3+VXeigBN848gXEjraWzX0yuA7zXN0Wto8MdimMu+2ceo+V75C5RHDYOy7eWYnc6iezU+UadEFWmvHaDzH30AInhvs7uL3iPEhM9zawNcO2QjqlyjTSEAMcK2Bg573vVMy8ixHjcETWrNZQ2QVSyMYSy6wAzYwWyxbBPWnBRQAh+ZuVpbS9uiOFtfQTwrHbFAWFuQiooIAJTTjGdtgN9zWqbkq9tF4dPcWrX8UMTpLar32jLvI64UZ1Y1r0BGY/LBp+0UAfMkXKt8Y7ySOwni0XdvOkBR89mPpI0x5Hf061HdzUvxfgfEeIT39z9Cmi1m1l7CQECdI1CmIPgAtjDaRuNOOtOzi/MVrajM0yrk4xuzZ+AyRtUR/GPw7v/lj3Tj3H72+O5tuK5uR3axdzcCa9ivXi4IbM/R8Rl9SyPIpU6UhwFzgN3gM7DfJqNuOEXV1Y2gi4ZMi2TxtPC0Zj+nMVVXdVwC5CxBScE4l9Kc3DubrKd+zjnRm06sbjbGTuQBkeVTaOCMg5B8RRkGsCv9lnBJxe3d99Eaxt5VVI7ZhpOQRlimBpAw2Nh75xTUoorpwxVa5x5i+iIqRgPcS6uzUnuqFGXlk8o0G58SSANzVlpJzcV+mXE93nKO3ZxHqOwiYquP60gdz+p5V1LLwP01DusUF5Obh8U8E7XkU5+lSMTI8ihklBx3GQY0jYY0kEeZq323tIkRT9IsZSR9aBo3VvXS7KRnyGr41Xa1TTKil2ICgZJPQCnOtHo7uE0OOe2PJ54vxd728S8WBrZY4ZYiZdKtIjq2sz+UaLqIG/icjFXL2acEKdteuCGuNIjDDDdimdLMOoLklseC6R1FRnJ3LbXgW4uFK22QyRHZrjByjSjwhBAZU+sQGbYKA0KS/Y85c4puEPy/uZooorggKxis1jNACw9p3BY7RDxGHCDWguIxskquwTtAPCQEjcdR1qFFSXtA5hS9lWygOuGJw88g3RnU9yJT0bDd448VA86jQKdXnB6fgnM5ct35fAGvfAo2Ti3D50/nluIJD9tY4hIGPqX1/3deKkuCRk3vC1H1Rcyn4aJCPvF1HRb2IccS2RfnI1hULzXbvJAQm+CCQOpA/b5/KpuoLmfiJjQIpwz538QviapalxVT3djB06k7Y7e+SjCMn0qcsePSRRrGqqQvic565qKorztdkq3mDweotphasTWSfTmmUdUQ/DIqW4bzFHKQpyjHwPQ/A1SazVivX2xfV5KlnDqpLosMZwNLr2h+0tLFjb26rLcY7xP5uHPTVjdn8dIx6kVI3XNBt+H3ExwZIY+7n6zN3Y8/rEA184SyMzFmYszEszHqzE5JPqTW7VYrIKS8mBZW65uMvBM8Y5vv7okzXUpH2VbQg9NK4GPjmoXWc5yc+eTn76xRTBZYOA8639mQYrhyv9HITJGfTBOR+qRTp5P9qFneaI5SLe4bbQ2dDN+hJjBz4A4NfPBjIAYg4OcHwOMZx8M14IzQB9g3Nwsal3ZUUDJZiAoHqT0pM81e0aec6IMwIrnvo+XkA2GTjYeOB6Vx8Q50e54Vb27OGlJKzZyWKxsOybPTLAAnx2qpUiyXXCH1w6ZZ6lkLMXYksxJJPUk7kk+dea9RxliFUEk9ANya9z2zpjUpGRkeRGSNj8QaUONNWzkvnSWydUkd3tgGBjUKSudwVzjGD4Z6Z2qqUV1No40n3Ppqzv45RlDnYHcEHB6HBA267+lddIr2d8zm0lETFFidgWZs93p03wB8uvXpinjFKGAYEEEAgjoQehHpVmMtxVnHazj4/KyWs7r7ywyEY65CMRj50luAKBbQgdOxiPzMSE/iT99PaVAwKnoQQfgdqQ3AUaNGgc9+B2hb/sjoG39VVPzp1fc0+DyS1HX0ZJ1yNYC5u7K1f81LMTIPB1iQyaD6Np3rsrROjHSyNokjYPG/2HXoceI6gjxBIpsllHo9dXKyiUY9x2qoAwNhXqqlydzgt3+SmQQ3KjePOVcDGWiY+8BncdRkZ2IJttVjxEk08MzRRRQcPDHFK/mjml7zVDbOUttwZFJD3A6HQfqQ+GobvvggDJmPanxTs4oLXJAupSj4JBMSqWkQEdNXdQnwDGqDfSSmSCCHSsk8mgMR3VAUEkDOBgFQB5ei1KK8suaWmDzbZ+Vfq/Q67eFUUKgCqNgBsK21YovZ7cKn/tis2N9UQxn0K4YD4YqscwWV5w78pdJG9vkDtoSe4TsA8bd7c+IzTVYjdo4vQ3ta2rx6HonwHUkAbZOT5Dx88elWP2ex9ve3FyB+Rt4xaRN1VnyGmKnx0hIo9XQhBjqarPK3DpuJyM0LNHbjuNNsCucFxEOplIwNR2TwyQDTi4Xw+O3iSGJAkaKFVR0AH7T6+NLnLLMjiWrV8/h7Lsdhqj81OTcEeSqP3/AL6vFVfmHhmuTWOvdBHp0zWdr4uVWF6idBOMLsy9CK4bwzWNbbL4DxP/AKVHDpn1q3XEixxsxyFRSTjrhRk49cCo/gNxDdW6TomFfOzgEghipyfHcVnS02UsGhHWtSbZX8102VuHdVPQg/sNWX6LF9hPuFR1lfwNdS26AiSFVJ7q6cMOinr4j76hHTPOWxk9dlYSwVDn21ZLK6j/AEEb4qs0bZ+4GlDaWzyNpQZOMnwAA6lj0AHnX0RzZw554ZERdTPC8eMZJDYBx6gEn5VQeV+CdhHoI/K5PaeYYH3fTFaFNnJqa9+hQtreosT9upReGcuzznZSifbcEDHmoO7fd91WePkyIMupiVUbjozt4lm8B5AffvUvw64dpJ0aIoEcBTv3xvvv1PQ7eYrtLjOP/wCf72Ncs1FjfToMq01aXXqRXG+BrNCsaAKUIKDoo81+BH7qoHGOHNBM0Z6DdT5qeh/d8QaY/Gbh40UpF2pLquN9gfHb/e9Z45wNJlXWCGXIVgd8kYx67kfOu03OOM9mcvoU8uPdFGtlwoH7Om9dtlZSStpRS24yQDhQTjLHwX1NebK2DOsbssfgSfdUjzx4Z2prcKsoreEJCELlB38DEjAd0sR1Ga7dbt+ZCqpyOXlLlpbYdoxDSkEFlJKBc9B0323NbeL8tJKqIuyKWJQu4Xvb5X3gpB9Md4128utcG3Q3QxN3tQGPtHT02zpxXfGxPUYPxzVGU5KWcliMVtwLK95NnDSFF7q6ioGSWxjAXxPXxx0NV66tnibTIpRsA4YYOD02O9NmKG4S6lleTVAyIETJyrDGTjGB0O/jms8ZvLeKJppo1YY0YKqWbJ90Z6jqfkafG+SeO4t09Nwn6cPsm5iedHtpWyYlTs8KBiIALjI64IH3+NK3iV0J5y6R6QxULGvkAFCjHiceHnTo5G5XjtO0ljZsS4XQcHRoLA4bq2Tny2q/VnJStxjBbjSt9pXAHt5v4TgQtGQBdIu5AAwJ1HjgYDeig+BNNOllztznJLJJY2L6Sndnn2Ogn+aiHjId8t0UA+NWl3F0OasTh38FXbisAUOZo9JGQdQwRWz6WcahBdMmM61tpmTHnqCYrn5cs/4NkE1vDFM2AHWYDW36UUuCY29N1Pp1pk8N9oNk4HbP9EfxS4wn9l/ccfA0yUpI3tTr9XT3gl79WhcQ3Ucy64nIKt3XXKvHIucYJA0uPI+BIIKkgs7kHmT6dbkvjtonMUwGw1r0YDwDAg48DkeFUzj99aXd61xCy6FtZYe1XrcTMymMRgbuiEHL+7vjNdnsfjLT8QmHuGSGP0LxxnWR/aH4VCTz1MrVW86PMksPt07MaNFFFRKRSfabwSWeGKeFC8ttJ2gQe9IhUrIq/pYII89OKXssUVzGPrLnI6hlZc48mRwSR1BG4p7CqtzFyVBckyxnsLg/zqDZz4dqnuyD47+RFTjLHcvaTVxrThNZi+6KDDxXiajSOIyaB01QwtJjy7RlJPxIJ9a4p7ESsJLiSW5cbgzuXC/1U2RfkBW2JnDyQyqFlhcxyAbqTgMrKfsspBHxreaaox7no9No9LKKshHv/wC8mrku7NlxMRLtBcrqKj3QwIU4HgO8remD507QKSFhB2nErRfFdbH0BeJP2t+FO8Umfc8zr4RhfJR7ZM1y3lvrG2xG4/yPpXXWKXKKksMqp4eSBe3OrJ29D/vcV5dNEZEaqMDur0T0G3QVOS6cd7GPXpUY00Lq3ZuG6junIBqnPT7VlMtQscvBDcMvJ3b8pCiJj3g5Yk56Y0gj513/AEJSxZVAdsamAGWx01HqcVuj07ath/s1IWVzFIuY2Vh+j++o1VbyVtmHlR/gLO0CAZ3bzqG41ywJXM0TdnIw722UfAwCR4NjAyPAVZDWM1c5Udu3HQrRtlGW9PqK2+4PcRk642+IGpT8x++oxo23GrHy7w9P9irjxLm3XMILfbBOqTY5x1CA7dfE/wDrUBccPd5u2MmSWDFiBqBGMeGM7fhWXqVXVLbks6fiMZ5z48mq04fNIcRxu3rjb7ztVv4TysBhrjDtvhPqrkYyfM/s+ODUdFzW8EoWcmSNlznADpvgk4AyPxq7QyhgGU5BAII6EHxq5p6a3FTXURLXu3MY9PVCT525F+gQRzLLrGoq+RpwSSU0LvtjIOW8B51Hcr8z/RsJIpeLO2PeT4eY9Kfs8CupVgGB6g9KW3M3szjJhNoCi6lWQFicKW3cZySRnzxgCmW0qSJVXOJ1W3HbSZcLMm46FtDfccGuuKNMhu0L46ZYEDw8OpwfHNLPi/Kz21w0MpBAwwZfrKemMj5H1FWvgnE7a3hEaBxgknO5JPXesu2tQ6I16aLrIKaj0ZIcV5otYchnDsNtCd458ieg+Zpc8w8dkunyw0oudCDovqfNj51KcXghmmMgQrqbU2Du3n12BNXblHkSwZI7jLTbscPjT5aHTcHT+JPwqxpqovqu4nW020RTmujKZb8i3Pa2+pDJBMV/KQnICsAcscHSN+uPA4p38Pt+zjRM50qFz8Bj/e5+JrbDEqKFUBVUAAAYAA6ADwFbq0ox2mTKbkQ/Md2Y4sKcNI6Rg5wVDN33H6SR63A8SoFJflyPMRmIwZ3aUL4IrbIo9AgUU1/aIrCzaRR+adXb0jOUlb9WN3b9WlXy3LqtovAqgRh4hk7pB9cinV9zU4NGLvbfdLoSla3QEYIBHkcEfjWyvPB7P6berZliiCMzSlTh2QFVCo3hqZsEjcBT0JBDZSwj0GsvjRU5yWT3wyze4YxWyBmGxOPyMXTvTMNthuIh3m2yAu5aPLnBY7SBYUJOCWZ296R2Op3b1J39OnhXXYWMcMaxRIqRqMKqjAA+FddIk8nj9RqJXS3P7ehmiiioiDFQnNXMMdjAZn3OdMaZw0shzpRf3nwAJ8KkL+9SGNppGCoilmY9AoGSaTN3ePfzi9mBAwfo8R6QxnoxHjIwwSfDYeFdisss6XTS1FmyP19jVwyKXDyzMGnmkMshHQMeir6AAD5V3VrkkVRliAPMnArln4kgieWPMiorHMas6ZAzgsoKj132qx0SweujKrT1qGUsIm/ZhAZ7+6n27OARxA+JfDlgPTvEn1C02hSd9m3MtvZWChUmuJ5WaaXQmldb4wvaOVU4AAOCd81IXPPvEZCezt4IF8C7mV/mBpX8aRhvqeTlTdfNzjFvPsNOsUpG5j4k3W7C+iRRD/xKxoXjl943k/8A9t/+tRskMXDNS/8AEsnPc8naImT2ZXOB0Jzvnzxt99QXBxJ2yhCQCQGI6Y8QfDoDXNcX802O1leQr7pbs9s9fcjT8c1OcC4tFGgR10nqWGSGPr41XuyvBsV12U6VRcOvXK/7N/NN6y6Y1ONQJbzxsP8AOo3lm9MVym/dfukeG/T8cVz8WvO1lZ/DoPgP9mt/L0MbTZk91FL+PgRucdajWtqJumNekakvHUZoqB5zvjDauQcM3cHpq6n7s11HmC0EQn+kRdmejh1IPoMHc+lULmzm61vQsdtIZBG2WYDu9CBg+J61YPHaluNcmiK4EhE6eob9h/eKtngevX5ePX1qt8CfXKu2BHGR8dzv89RqyZ2PX93j+Nee4m83Y9ito4tV9fUrfMqkyqB9j/8AIk/hVw9nV+XhaIneNtv6rbj8Qaq/MOVaN1xnDLv06ePyJrh4Lxue1ZmgSOQsACrsyjA3GCM4PyrW0DzRHBCqM/xWIr8zx+g5awTVBsvaI+wns3XzMMiyKPjrCH7s1N2HOthMdInVH37koMbHH2QwGr5Zq41jua8qLIvDi19Cg86Tl72byUqo+Sj99Qhb766eMTdpcTSKe60jEHzGTj8K5gMVjTeZNn0LRw2UQj6JfsAq/ey+52mi8irj5gg/+EUv+vw/bXTaM4JCySR5G5jdkJ9CVIOKZpn/APRCOJ6d36dwj38D2zRSS7NvGa4Pxurv/nVtBP2pD/8AMXef/PrX5bPKf0jU+i+445o1dWVgCrAgg9CCMEH0xSI4lwxuGXjxNkQTNlWPQP0DZ8nGAT4OCOmCZaN9PRpx8Lu8/fORUfzHaPdwmJ55yOoDyCQBvDdkLj5NXVCS6kqtDq6JqxR7e521y3EEgkS4gfsriLOh8ZBB6o4+sh8R86i+SeHcTu4pDC0MiwlExKSrOSgYqrAHcZAy3XIrvN7LFJ2N1A0EviCQR47qfrDY7rnoc9DU90X0Zqfj9NqI8uzpn1/kafKHNSXilWHZXEYHawk5I/TQ/XjPgw+B3qyA0jpkfKTwPonj70Tjpk/Vb7UbDYimxyhxsXtpFcgaS695fsupKuvyYGlSjgwdbpHp547p9mTdFFFRKZSvawp+gZP5tZ7cyjwMQmXWG/R6E+gpbvehI7dQRmV4olbqql8DUdxkDc48fTrT0uLdJFZHUMrAqykZDAjBBHlillxL2Zyxq0dsY5oCcrDOxVot84SQKcgHpkAjzqUZYLui1PK3LONy7+h38m8l2siLdzr9IZslO076qASM46b4PQAYxt5HtP5oWO3extMPcSr2ZVMEQRtszPjZSVyFGQcnPhVWHL3EIo+x+jX6xAk6IrlWj3OTjTKGxmsWHAriIaYeGXK567RAk+ZZpMn50JerJV0QnLdZYsfVs08Is+wgji6lFAJ8Cepx6ZJrtzUjZco8SlO8cNsv2pH7V/7CYB/t1OWns9tk713JJdN9ljoh+USYBH9YtUp3Qrjl9jZfFaKoqFScsfQo8vFIFbQZU1fZBBb7hvVn4Zy88gDuSikZAxh/mCO78Dv8KttvbRRLohijiQdFjVVH4Ctlee1nGpP4aunv/BXnxK6axhIgF5WiH13/AMP+Vev+GI/tv/h/yqdorLev1DeXJiPxd3+zIH/hiP7b/wCH/Kurh/CI4GLhie6QdWMY8fD0qUzUZffSe1BjSN4wOjOVJfPU907DwHz8Kdp9RddPbKe1eWxV2rt2NNt+xXuG+yaxZu2ftiC+sAsihx1CmMIFEYO4GAeufKrxbct2sYAWCPA6ZGcfDNRn0y9PWOL++b90dee0uz1ji/vX/wCXXo46qiKw7F9zJcrGmtrwyzJAg2CqPgBXO/DYiwOgfDwPxHQ1Bhrn7EP94/8Ay69/S7wEKEiI+12jbf4M1CV+ln3kmcXM8wZYTCmMaVx5YFcdxwO2f3oY/iFAP3jBqHZrn7EJ/wC0f/l1513Q6Rw/3r/8upx1en8TQJ2p5UGcfE+WoQe4JVAO/wBn5EgnrVY5i4UY9LJkrjB8T86uZubzGOziI8u2bH4x1zot0ZEJihVOjgOWyD4gaRgiqmquUk3G1P2ya+k4rdW1vi38ym8O5duJsELoX7T7fcOpqfj5Hix3pZCfTSB92D+2rXig1gT1lkn06F63ieosfR7V7FX/AOCIf6WX/D/pr1HyXCpz2kn+H/TVnoqC1dyeVIT+O1H+7KPxPl+5RgIYmnBz7rRKR/W1uu/wz8qi7yCeEZntriIeZQSKPUtEzgD1OKZldMF2Rs24/GtvR8abxC37/wAg+I6mPVNP6Ckt7lJBqjdXHmpBH4Vuq/8AFuTbS5YyqvYyn+diwC39dSNL/MZ8iKqvEuVr2HpGJ1+1EcN843OR+qz58hW/G6Mlkt0cZrl8Nqx+xH8qcZj4bct2hCW1zoDt9WKZchXPkjjCsfBgpOxpg82cPintyz4KBck5/mzjWQ3gQO+pHRkU+FKu8u4lBWdTGDsVmRkB+TgVxxyRlezggup0P83Ck7QNnw057PH4VxxXdMztTpKXJzhYsP1NnLxYRMXI0iR9LDZWQH84B4BiGbywdtsUyfZFAV4crkECWWaVQfsPI2n7wAfnVP4Xybf3rKLmL6La5GtSwM0qg+5hfcU9D44pvwQqihVAVVAAA2AAGAAPLFclLOEJ1upjOMK4vKiu/qb6KKKgZ4UUUUAFYFFFAGar3M3vJ8G/dRRVDiX/AB5fT9yxpf7qIeiiivKG0FFFFABRRRXQMCgUUVwDNYoooAKKKKACs0UV0ANFFFcAKKKKACiiig4WPl381+salKKK9jpP7EfkjDu/uS+YGiiirIoyKzRRQAUUUUAf/9k=" alt="Elementos de la multiplicación más ejercicios divertidos -Orientacion Andujar"> La multiplicacion es una suma abreviada de sumandos iguales que puede repetirse muchas vecesejemplo: 6 + 6 + 6 + 6 = 6 x 4 2+2 = 2X2 <img src="https://www.matematicasinclusivas.com/wp-content/uploads/2021/03/tabla-de-multiplicar-del-2.jpg" alt="???? MULTIPLICACIONES ???? Segundo de Educación Primaria (7 años)"> <img 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" alt="LA MULTIPLICACIÓN COMO SUMA DE SUMANDOS IGUALES - YouTube"> OBSERVAR EL VIDEO PARA QUE ENTIENDA LO QUE ESCRIBE Y PODER AVANZAR EN EL TEMA<iframe width="500" height="281" src="//www.youtube.com/embed/rzEhtYjIO-8" frameborder="0" allowfullscreen=""></iframe>

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