MATERI AJAR
Kelas : IV
Materi : Pecahan
Sub Materi: Penaksiran Hasil Operasi Hitung
Pembelajaran : 1
Hari/Tanggal : Kamis, 17 September 2020
Mengurangi Pecahan
Biasa Penyebut Berbeda
![](data:image/png;base64,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)
2. Menyamakan Penyebut
Menyamakan penyebut dapat dilakukan dengan menghitung KPK penyebut dari pecahan yang dihitung. Berdasarkan contoh dihitung KPK dari 4 dan 6. Jika sudah sama, maka langkah ini dapat dilewati.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQQAAADXCAYAAAD81S8/AAAgAElEQVR4Ae2dC9xWQx7H6UKFdEV0v9BFlC4ipWKTDUW2e9KN2lTYlE2kq0QltWqRdFOK7kiF3LupKFFSCdm21pJSa9fOnu+85tnznvec55zn8vY+73P+8/mc9z3PucyZ+c3Mb/7zn//M/xQlQRAQBASB3xA4RZAQBAQBQcAgIIRgkJD/goAgoIQQpBIIAoJABAEhhAgUciIICAJCCFIHBAFBIIKAEEIECjkRBAQBIQSpA4KAIBBBQAghAoWcCAKCgBCC1AFBQBCIICCEEIFCTgQBQUAIQeqAICAIRBAQQohAISeCgCAghCB1QBAQBCIICCFEoJATQUAQEEKQOiAICAIRBIQQIlDIiSAgCAghSB0QBASBCAJCCBEo5EQQEASEEKQOCAKCQAQBIYQIFHIiCAgCQghSBwQBQSCCgBBCBAo5EQQEASEEqQOCgCAQQUAIIQKFnAgCgoAQgtQBQUAQiCAghBCBQk4EAUFACEHqgCAgCEQQEEKIQCEngoAgIIQgdUAQEAQiCAghRKCQE0FAEBBCkDogCAgCEQTiJoRDhw6pr776Sv373/+ORJboyd///ne1d+9etWvXLv3/xx9/TDRKz/f/9S9lpV+pX37xfEQdO6bU/v1K7d6t1BdfKLVvn9LXvN9I7M7x48fVgQMHfDEF+z179kRw+uGHHxL7sLwtCPyGQFyE8M4776jKlSurAgUKaFJIFM1//OMfauTIkapUqVLqlFNOURdccIHKkyePqlWrlpo3b16i0Wd5/8QJpXr1Uuq005T69NMst/WF+fOVathQWelRqnhxpc47L+P8qquUeu0193cSuXr06FF1/fXXq8suu0w3dre4/vnPf6oHH3xQ4wP25cqV03hdfPHFaubMmeo///mP22tyTRAIjEDMhPD1118rKiAN99RTT9U9eeCvuTyIhHHvvffq+G644Qa1aNEitWnTJvXSSy+pChUq6G9MmzbN5c34LlnJV3femdG4aezbt2eNZ/bsjPsVKyr17LNKvf++UuvXK/Xkk8pqjEqdfrpSK1ZkfS/eKzt37lTXXHONxgAS/PLLL7NE9dNPP6lWrVrpZ2655Ra1evVqtWXLFjXbSmy1atX09SeeeCLLe3JBEIgFgZgI4ZglQ9No8+XLp0qWLKny5s1ridH7Yvlelme3bt1q9b7naekAsrGHNWvWaEKoXr26QpxOJCBV//WvypJsMhp7/vwZ/50Swn//q9SVVyp1/vlKvf121i8uW6ZUoUJK1a2rVKKS+rfffqsmTJhgSSDFdYOGZOtaETMccIaxY8fqZ9q3b28NczKPc9atW6eKFi2qmjVrpg4ePOh8VX4LAoERiIkQ7r77blW4cGH1l7/8RV199dW6giZKCB9++KE666yzVO3ata3xuTVotwUaDN8rXbq0+tvf/ma7E/tpv34ZBGC1GUVHWq+eNyF88IGyel/3b1hDfCutGe+iX4g3/Pzzz9awpZfGsEWLFuqFF17Q5+DgJITDhw+ryy+/XN//AmWGS/joo48UxIAkIUEQiBeBwIQwadIkXSFnzJihvv/+e1WnTh39O1FCIK6bb75ZxzV+/Hir181QkNHT3XPPPfp6//791a+//hpvHvV7jz6q1DPPKIX+gDbTpIk7Ifh9xFKfqHPOydArWDrQuAP5hFiXLl2qe3z0A0gIDBmchIDOplixYqp58+b6ewwx5s6dq6WLOXPmWErP3XGnQ14UBOwIBCKEZZacnN+SsXv06KHf/eabb7TyiwqcKCEQIUOF3r17RxpE69atVdWqVfXQZNiwYb5ad3uGgpx/951SjRrFTgjMTHTunPHeI48oi6SCfC3YM/stccOLEF588UU9PPvjH/+ohg8frsqWLavOOOMMrWPhnfOt8Q04ZeesTLBcyFO5HQFfQvjss890BWzatGlEpIcE0IYnixDeeOMNPXZmlgHRuEOHDqp+/fqqYMGCqm3btlp5lkygEftjJQQkC0v3aeVZKUvCV5BKMkM0Qpg4caLGmuFTpUqV1HxrCoTnmaZ97733IgrJQYMGJZ08k5lHiSv1EYhKCIzbr7Q0bDR+xvMmIM6j/IIQElVirVq1SivVUByuR5X/W/ivpd171lLx8w1mNZBKkhViJQQ+bSn4I2TgovNLOGnRCOHxxx/XODCrA3k6A0OMitaUCMrZjz/+2HlbfgsCgRHwJASmAxm70yD5zzTXyy+/rMe8TANSAbk3depUfQ9bgljDvywZ3AwVnnvuOdfXGabwnccee8z1fjwXYyEEawbUIsQMMrjrLqUsc4FsCdEIAdxPs4wmatasGZHS7ImgrHr27KlxWrBggf2WnAsCMSHgSQho/BHXMRJizMo4FZGe30yTYThEQ+Uc8X7z5s0xfZiHMcZp166djuc1D2sfiILvdGbwnqQQhBDQD2CDgALxzDOVsnSq2RqiEQKzB+dYCWG2xShd7YmBELp166Zxwn5DgiAQLwKehIBWHzEdjTbH559/rg/OsQ8wxjCcY0jDNFqsAcu6IUOG6Io8ZswY19cNYfwVI4IkhSCEQHIszrN0GsqazkvSh6NEE40QkKSwYoQY0R84A7MMkDXEjc5HgiAQLwKehBAtQvQGZtrRqUNg7I8REQc9l1/Ytm2bljpQmE2ZMkXrKmgArGe4//77dSNguo1pOROIFwI6YWn64pmOhBCMWbLTMIlvWLZC1neVNQWYsY6Ba9hFYSZhDvjPbilMmpGqnEZDvBskGEK45JJLskw78j7Ei7kyB0M2cAfjDRs2qKsse2rIAuMlEygH8CFNQcqB93iO54mX902AuJHmuG7Hm+uUA+/Yr5v35H/uQyAuQti7d68ez1IJObcHGgYNmGHEypUr7bc8zxGJL730Uj21ieTBu5gtMyzBMu87h0r/A8tyCKVm9+7d9WIgz4g9bqAfbdAgo9E7TZfJDmsXIATLGFM1bpxhxIRlojksEwz9/saN//8AawwwKnoUg4c4AgvFwBPlqpvpMlEuWbJE5xvlYo0aNfQ5ikQMu9CxQAAm0FCHDh2qn8HoKUiAdCB6ZnnsQ5O1a9dqxTL6HHsH8KnFphhVoXT2MpgK8l15JnUQiIsQMCZiBoAFSfaKQ7boKQYOHKh7/cWLFwfOKRZ2r7/+up5nZ20DDWuj1eLsPZWJDBG5ZcuW2ogHK75Yw5EjyloMpNTDDytlLRzMFJC4adNW1vR9ayZPDR6c+bjvPmUNdf4vPRAByrxy5crpvGeKMOCPI1aiwPPpp5/Whl9er4HTCmshBfYIf/rTn7S04GaYBDEzvMCgCfPoIIEZCqYuWROBRGDCdos1MRLDkMpe3kg1o0aN0ulwkrZ5V/7nLgTiIgS/LFKxrrjiCvXJJ5/4PRr3fabifv/738f9fna8yDgfokyVgJ0CUktQCSFV0i3pyDkEkk4IjCuZpkS85Dw7AgpOVv6xMjJVAqbEV1vrO5xDqJxKH5IVUtYf/vCHTGJ+TqVHvps7EMgWQkAhGFSRFQ9MmOim2pgVImAolSoBQsCi1K6MTZW0STpSF4GkE0LqZlVSJggIAn4ICCH4IST3BYEQIRAzIaAXYD76ZIQAZgzWLESGjYBjz5BsSR55D6IXQVw/WRhlS0Yl0tAiEJgQmPtnOvDGG2/Uq+u6dOmiZsyYoZguS3Zg8dBttylr7YR3zFgPWtPs1l4KykqPsmYcMlYjWov/siVgQIX5NIuxvALTf8OsZcjs78CWaJh+M5XIxqkSBIHcgIAvIWBXgHkxi2s4IIIBAwZoAxoMaVgWHY8tgBc47KJGI8cwaNw496eY2StSJOMZi5+suf//v2NtE6DXHSA5JCswD48hEPl9hl1WXMJbb70VeaaxZc305z//2TJqaqzfYUk3FoUSBIFUR8CXEGbNmqUrNSvt6CVNwBKOKS0aST/2J0sw0IAx07c+Y8WZcbgtKCIJ3LeM87Jsc8a2Z1a7tTYTUcoyrks4YPmHXUGJEiV0PjEbZndjZ0CT38jaYAEsmH60BwyNuH7ttdfGtd7DHpecCwLZjUBUQqDnb2DZ+NIg2LPPGTC3ZRjBwiQs4+IN1iylZXmY0dDZ6diazteN3o0QSIYloFi7Dbt/jZ2MIIyHHlJav+D+lP9V9maoZ228SGNuaC18QEI43dpu+fnnn8/yMkRZvnx5bWptNx/mQYgTE2w2NsF+QoIgkMoIRCUEbNtpEAwTTGDfA+a37aat3HMzMTbv+P1nxa61lEHRmDElHjHCmxD84jKE8MADiRECDR8SwIyXRt2xY0fdsNGbOAMWgSxKAiu2kLcHtkrnOhJWohvF2uOVc0EgOxCISghUfiozq+gYR7dp00YvPGIBEotgWDxj30kp3gSyWandpsdaJ2R9N/Y9CNiflX1IedfauzShgHck+x6FDI/o6d0IgQ+xiUmVKlX0svARFqMtX75cKxRZrAReQRd6JZRoeVkQSBCBqIQwevRoTQhNrC2K2UqNVYzsvjx58mS9jgCywIMTZJHMwOxBrITAtCM7GvHerbcm7jPBnh+kHz9CYKjAgiMwYUNaIzHwm5kGWR5sR1TOUxUBT0KgEQy2lvlRoTkgAmcw+xWwriCRIYMz3lgJgWGG1YFrMmBZs8PfizP6mH/7EQJLgjt16qRxutNyC8VQiynIV155xSKnW/X1vn37im1CzMjLCycbAU9CICEsjoEMWMXn1Blwn2tFrPk/tlVzW4LLM/GEWAiB5cpmbwNrNzZrCjSeL0Z/x48QDE633357lojYPISl2uDotW9klpfkgiCQQwhEJQQcrVKR+/Tp45k8NuhgX0UMl5IVghKCNUy3yChDMmDfguyyVvQjBLMRrNv2ZmDCVCQ4sqGsBEEglRGISgjsZMR4mDX1btZ2zDiwW0+ZMmWSuk16EEJgAxOrjVm7P9PgshdiP0K4y1Je0OCnT5/umhCMmbjPFK0EQSCVEYhKCIi7bFNGZWaPA7utAbb6jIuzo+fzIwRrkx7ruxnbmyXoazZQ2fgRwsKFCy0HsIX0Dk5OT1YsBccLFcTJjlASBIFURiAqIZBwtskyY2Cmz9Cks38fsw6QAbsWMUVnAvsg0CPiryFeQxzEfxq8tSlSlmBtK6jvcZ9ZBSyJ0XfiwNUc7BjG3ilmCEH6sCtg5+Z4tvqCEFjDQX7dTJdZ8AQu7HWIV2xcrrERKv/RseCBCotF+0wD07XYOOCbMYjpN1unMeWJcte+5yLfxj8kegwc55oAeb/66quW+fe4LLYR5hn5Lwg4EfAlBF5AUnjyySe1u3E2Q8UhKa7HcTHm9DbMrsOY8bKLMj4J4wlPPZVhqOS2N6jV7qwpvYyNT9ki3RrNZDkwcrKEF8ugKOPrNKDrrrtO71jsNBwKkj4Igb0GsVyk8XkFnNngl5INYMGI55llcPO2xAal7MEIye7YscMrysh1SA1SIu63bX7qwRuv3Ng7QMImUGasp8DrFebnEgSBIAgEIgR7RFjbcdBIvAJ7KbKwB6/F8QT292SBoFWnswSEETzDY8zEf7eDTZpxJGWSSM+M0hPDIadIn+UDHhfYXBSLRKwW/QLPonOxb0jq9g6zDszguOlnnM8jCUAKYG9fWk05sFMTPjTs5EyeWWPBdbcZImf88lsQAIGYCcEPNioulo34CkgVU116y/usrZLpvVOlcTBMwNgJuwW7bsYPX7kvCGQnAkknBERYLBmZoUiVgAkyW4gHEc1PVppZGMbO0cl0Ynuy0i7fSV8Ekk4I6QuV5EwQSH8EhBDSv4wlh4JAYASEEAJDJQ8KAumPgBBC+pex5FAQCIyAEEJgqORBQSD9ERBCSP8ylhwKAoEREEIIDJU8KAikPwJCCOlfxpJDQSAwAkIIgaGSBwWB9EdACCH9y1hyKAgERkAIITBU8qAgkP4ICCGkfxlLDgWBwAgIIQSGSh4UBNIfASGE9C9jyaEgEBgBIYTAUMmDgkD6IyCEkP5lLDkUBAIjIIQQGCp5UBBIfwSEENK/jCWHgkBgBIQQAkMlDwoC6Y+AEEL6l7HkUBAIjIAQQmCo5EFBIP0REEJI/zKWHAoCgREQQggMlTwoCKQ/AkknBJyO2H0YngwIcQ6DPwgJgoAgkBgCvoSwdu1a7W4MR6lejQ73ZqNHj1ZNmjRRDz/8sMIxCuHZZ59VrVq10s5ir732WuU8unbtqqZMmZLFgQou0/BLePPNN0d1zvraa69p70ddunSJ26Ep7tTat2+viCvWABEtW7ZM9ejRQ7uu69atm1q8eHGs0USex/Ua/jCJr2nTpho3HMLiBzInAi7icHVPvoK4m3NLI967+vXrp3r37q0dB7s9E+TawIEDVYcOHdSWLVuCPB7TMzjLwTEvZekVtm3bpv2btm3bVtdz6jVOj7dv3+71Sq687ksINGq8HlNJ3VyOff3116p58+b6mSuuuELh19GEO+64Q1/HU3TPnj11xaJycRAffg3z5cunzj33XLVgwQLzmsKrEU5l+e7OnTsj1+0nEBQu1osXL65mWF6R8Toda1izZo067bTT9HdwZhtLAAucrJLG+vXr6/zgvJXfjzzySCxR6We/+OILBX68D169evVSN9xwg/4NPitWrIg5zkRfgARKlSqlneSSvngCjnZLly6tSpQooWhU8YbKlStrLOIh7mjfxBs4HszB3a0O4Dtz7ty5Ov3Ut5tuuilSNtSdc845J62c6foSAm7UAatPnz5ZCGHjxo2qRo0a+j4N/siRI5mwh3V5d968eZmumx9IHLgsB9RChQqprVu36luQzOWWa2fe3bVrl3lc/z9x4oQaPHiwvlezZk317rvvZrof9AfMXrFiRR1P/vz51VO4nI4h4IGZ9NWpUyciEX322WeaoIoVKxaTxIKT1kssl9bEh6RlnLYigSAxcB2MnFjEkNy4HqWxVKhQQRUtWlTt3r07rjj27NmjaMxlypRJSNLBizXltGrVqrjS4XyJYe2SJUsUdQh8Tz31VDVt2jTnY2rDhg36PqRGmZvhMGWD9Fy2bFl15plnZovkkiUxJ+FC3ISAaEzvbCqxW1oNIcCw0QJiKfEYhv72229dCQHRrk2bNvpZ3LvHW0kRhRs2bKguuugi1aBBA3X66adr34/R0ui8h4t10tyiRYtMt3ByS3yvvPJKpuvRfiDtEFenTp1cH4OsEFVjEZcR1d988031wgsvaFLBJX0057tUcOKfP3++dnkPRgz9aMxehPD555/rfPKNhQsXKjoIp3dsP0LYu3evbuQQHx0HHsOdHQugQAj0yO+//74eutIRkFbEfIaYsQSkHYaJYF6pUiVVrVo1T0LgezjltUuw9m8NGjRIx/Pggw/aL+fa85gIweRy/PjxGoSCBQtqccpcd/43hDB79mznrUy/0TtQOCNGjNDX7YRgGv1HH32kRWmeI163SpMpUo8fDC0Qx88++2y1fv16NWDAAJUnTx6ty/B4xfUyQyNESERhhh6IljQK0nf11Vdb7ugtf/QBAj0Ouhd6KHojAo2TBolOwR74hl9Auurfv7/ukans559/vhb7adTly5fX95yNdvPmzQqCZWhy3nnn6XchSzxmI0WRR1MOfB9yQYIjPiQIvlGyZElNHEhML730UqQn9SIEGiUNjfc56IH5NnWqevXqunOwDwORoM444wytW0IXBVFdcMEFejjD+4znTe/thxEERs8+cuRIRV2jPlBubhKCX1ym7jJ8TIcQmBDuuece9cMPP6i+fftq8BgqmArsBYQhBAogWrj99tt1nGZogSRghgyc09NRufPmzasmTJgQLSrfexQgeguUiQSGOjRGlJuxBjxKU5EuvPBCddttt+kerFmzZjGJxmBK71ekSBHtCXr69Olad0CcNAyGauQ/SGCogcRCmugBITwaMl6v0QXR6LhnHx4xzKGHRKp56KGH9Dj/448/VijxIDyeR9w3hAAx0zApCzBj6MU9Q648z3eMvsCNENARkTeeHTJkiCJOdA2kc/jw4RrHAgUKZBoe1K1bV5cT4jm6KSQJhlCUAcMpriPCBwnoRg4fPhx5lLIjLbESwrFjx7T+iHeXL18eiS83nwQmhM6dO2tGJ/McKNL8NM+GEKjk9Er2AzD37dunELXooWF9I/rt379fi/J8Z+zYsbqH4pxKOHPmzLjxRuwjHiqhCd27d4+bEFD0kXbi5KARuSlezbfc/tMIIDsaGT0mRHDvvfeqSZMmac28yTcV309CQKqYYSlYDdk5v0ePT3xIEAR6VHPNTeSlB+V5FIuGENDzkDY33Q3lZ/QyRmPvRgiQ/KOPPuo5s1OvXj39XZ4xAcmDtDAz5QyjRo3S9yZPnuy8Feh3vIRgsEO6QreVDiEwIdCLUiD05gZAGvGhQ4c8cTDSBD0GswbmqFWrVkQZSc/UsmXLTFOPEAKadr7HwXifRkwvQANkvBlr2LRpk+6F6UHtoqWREKZOnRo4SsRMZkpIGzMsTI9yDkkabTwKUxoRvWG0hrxu3TotvvI+vaBpeCYxH374oRbJUajxbNDA0OGtt97SWNGTIxYjJvMdQwgQCA0Y8dttapMZHsR4dEXOdJEOpAsaPkNCiJtZI0OQKOwIboSgb/z2h3hR1hEH0h8N3kgmNHQTGDIQt5u0ybvkC+nPXrbmXb//pj4HlRAYypl3kJTJY7qEwIRA7zxmzBidbyoS414KgUpg7A6coBhCaN26tS4sRFJ6Io5hw4YplGmIefaxInFACGYKjmkeehQCoi6VgvEwlShoQHFFfBQeDYXAOJ2DCgjZMd/Pb78KhWLOTFPRkyPp8B7z7OBBT4bktHTpUt3YII5oUgONCgmBNHgRHboV4mac7BcQvamsjO8hUN7jQNl52WWX6XP0JgRw5h5EBHE5Az0+aXMqFVEoQ9IQvSEAdAiQLQRCnOSf4EUIH3zwgX6e4Qj6HN5hmEBdQSLht6lvxGOUiugvnMEQAqQXDWvne+a3adxBCIFhiumsqJt0DukUAhMCDcceaGT0iBQc944ePWq/rc/NkMFLQ5vlhd8uUFGNDsFph8AYk29SUek9gwSIiHeoaBAZ5GAORHXuoVDjm35pRc/B89gI2ImMc6O5poExe8FzTz/9dFQJAeUovR96DcbubsHoKtDjRCMsyIqGyndJy6JFi3ScEBQNBSLmnpEQqMz8rl27th6+Ob/NONs5ywBp0YALFy6slcBMA9JI6DUpN/JOnNEIgWEHikCkQ0gVKQMlrZE2DXZuhOA27WhmfCDl7CQEvm2kLMoinm85MU6134EJgalBewMgI0xTGWMceh2nJaMhhDlz5sSUbzsh0OPZA2kwBk+Iu3ZDKPtz9vPVq1frsTJTRKSTA60whYpCjQrMzAA6AD/JY9y4cfp5KrIzMDRACUh8HAwlog0XzPv0NDyPxOQWDAk+/vjjUeNDyiEejL7cgkmbIQRIHGJEoUmP7QwQFD0/QwZ6esgIpSnfMDoC+ztIX/T43HcjBKYpCUiHPONlwAVBcT+VCIHhDKRN/p555hl7ttPqPDAhuBkmgQQNiApFATLOtzcAQwiIdLEEOyHQ+zgD2vRbbrlFf5MKjXIy3oCYibju1Rid8TKzQiNheszZiCBEKg5YcCCmByGslStXaoVp1apVs5jCor1H0Yj4z/RgtGCGFuTJGRh7G6tMiNAExGTSivm3XcpDSYYimXtM7yERUraNGjXS15xadd7FRNnk3dy3DxmMtIdZOs/ZGzzpIX6GRWYYYlcqmiHDyZYQSBPpJL2YkydS1wzmqfzflxD8TJfJHGIkDQTQUC4ZSQKFHdewdowlMJ5F8ci7phI53+cZI1oi6lPx4gk0BL6D5jxoYBiAZSXTXVhNMvPBsMQ0lsaNG2ulIz0Kc/gzLM2/X6C3JB2QDXGiL0GSYUwOGQSJA2nKSDzY/aMoRWro2LGjLh8aFd9AMWzKCH2QUYoyNub5iRMn6spP2nkey0ujLIU4yTvDL5P3oUOH6rwzBDCzDEYqJE3oGsiXsftnqMc1hh6M34mTb6Jc5psmDiPJgB1DF9LiZrrMrAr3mDGKR4w3Qz23qWckIeLmoDzIF20CKcEclJWbxORX5ql435cQMDJh3PTAAw9EBRtxluEDvZwRuxmzco2xbCyBsS2LR3h3r9UzeQVEUGY6qERMAcUz9cN7KOBinc5EGdquXTvdMKjA6CBQ2tGgaGQEiIMxNebZQQIGTgwfIBoaDKI6v5ktCBpodExfkh7EW/LGtBhxM99P+aC4wyzZBPQYVHJsA5AGKG9mT15//XVNDMwO2XtG9Cw8SyMn77zDMIXyoHHyTTO8QSHMcAxJzi7tIV1Rdigs+R7xQEyQBYpD4oDUUNgSSE+VKlW0/YFJt/n/8ssv6ziQUOMhBIZ/1DVDYiZehkjUe8oCQkJSQ/dB2uwHOIN5OgRfQsB2gLEhSiP7cMAt8yiFqDjGngCjGyoEmvhYAr0XcUAMpkJ4vc/wgfQxzHDqMLzesV+n8aJ0s4vL9vt+57wHaRkScD7vh5nzeX4zawOOTktFt2e9rtHIicOZLuJEujp+/HiWV2kAlJcpPx7gHPIwEoX9pYMHD+q824mYOHieg3PKj+dQeLrFgUUn6aSu2APPG2Uo16lb/HZLdyx11P4Ncw4m5NtZByg78s93OUw9o67ZD/Akj+kQfAkhHTIpeRAEBIFgCAghBMNJnhIEQoGAEEIoilkyKQgEQ0AIIRhO8pQgEAoEhBBCUcySSUEgGAJCCMFwkqcEgVAgIIQQimKWTAoCwRAQQgiGkzwlCIQCASGEUBSzZFIQCIaAEEIwnOQpQSAUCAghhKKYJZOCQDAEhBCC4SRPCQKhQEAIIRTFLJkUBIIhIIQQDCd5ShAIBQJCCKEoZsmkIBAMASGEYDjJU4JAKBAQQghFMUsmBYFgCAghBMNJnhIEQoGAEEIoilkyKQgEQ0AIIRhO8pQgEAoEhBBCUcySSUEgGAJCCMFwkqcEgVAgkHRCYFttfDmwn0ovpkwAAA7eSURBVD3envDSg9cg4+gjFKi6ZJItvvEfgA8A46cAvwTg85bld8Fvu3mXKOWSIJB0BJJKCCtWrFA1a9aMeLoxHm/4j0MOnJa67c2f9FylWIQ4MLnmmmtccTEY4U0JXwQSBIGcRCBphIDPPeNJGU8+uPfC1RWu3YwnZ3wo4vswTAFHH8a9Gt5+wGXJkiXaJRmSk/FRCTHg/SeMhBmm+pDqeU0KIeD5BvGXSo2bdDwu2QNeebp166bve7ketz+fTue4cwMX3J5t3LgxS9bwDvTwww+r/PnzaxfrDB8kCAI5hUBSCAF3YfgGxGGpl64AP4E0DJyX4mMwLAGX6vPmzXP1SWgwwEUY/hzBh2GVBEEgpxBICiH4JR4JAs+8VHin23G/d8NwHwethQsX1u7aFy9eHIYsSx5TFIFsIwR6RjwA33333Qo345ABY2TncCJFcTmpycJzMvhccsklCTl4PamJlo+lJQLZRgjDhw/XlZyKzlGwYEHtHj0ed91pibyVKbAYNmxYBJ/ly5ena1YlX7kEgWwhBObUV65cqWcYxo0bp/r166eYeYAYrr/+eu2OPJfgk23JZIqxa9euGhOmZKdPn55t35KIUxsBbHcWLlyo9XDo11A028MHH3yg7zE7xfDbHnbt2qWmTZumZs2apd3V2+/Fc54thODMEAlbv369uvjii3UDGDBggO4d40lwOryDvUbFihU1FlWqVFEoXMMQNmzYoBge3XbbbWrt2rWZsoxiFaOt9u3bayXsr7/+mun+7Nmz9b377rtP7d+/P9O93P6D2Sd0SHSYAwcOzJId9G7cK1OmjNqxY0em+5MnT9b3uL9s2bJM9+L5kS2E4JUQ7BJIOMZLVICwhUOHDqnBgwdHCrBNmzYKhWJYwoIFCyJ5nzp1aqZso3MqVqyYvt+/f/8svWTPnj31PWZjeDadwr59+xSdZOfOnbWVrzNvSI+dOnVS999/vzpw4ECm20xTcw/SSAYuSSGEEydOqIMHDyqmH6MFxsgQApJCurF8tHxzj8Iy1opU6hkzZoTOCIkynz9/vpo7d67avXt3JsgQhRGJkQQ2b96chRDoRbm3dOlS33qWKWL5ERMCSSEEChANeZ06ddQbb7zhmgAUaIiKEAINg3FTWALDpapVq+q8X3fddQpTZgmCQCoikBRCoHFT0WnsjHNefPFFLTH8/PPPCitF2N2QAc+ESYFGr3jhhRdqbFq0aKENt+gNUSp+9913WY4ff/wxFeuJpCkkCCSFEMAK7ahRGtLoS5QooRo2bKguuugilTdvXt0g8uTJo0aPHh0qURklGHhwYJ5cqFAh/Z9zt+Ouu+4KSdWTbKYiAkkjBDKHcmTkyJGqcuXKKl++fLoRsKAJG4QOHTqoV199NRUxyNY0NWrUSGuQ0SKfeeaZGgvw8DpQqEkQBHIKgaQSgskEw4TPPvtMTzVu2bJFa0ad00jm2XT/f/jwYcXsQtDjp59+SndIJH8pjEC2EEIK51eSJggIAlEQEEKIAo7cEgTChoAQQthKXPIrCERBQAghCjjpeIv9LqtXrx74uPTSS103dklHbCRPSgkhhKwWTJkyJTINaqZD/f6vWbMmZCiFN7uehMACJWwLMDLCBj2nDr7Poo2gG5CSbvZcYOemeA72QHRbnOWsIhhXDRkyRC9fZglzThwPPvigGjNmjDp27JgzeZ6/MTFn9VzQY926dUqMpTzhDHSD+pTTR9BZPk9CYLNPdgL26z1Oxn3m7IPaMGAd2bRp07jTfeedd6pffvnFt6C9dpc+GXg4v0Ejz8nAVCmr7rBByemDNSJBt7T/6quvFBJTPAcL9bC78QuffvqpuuOOO1Tbtm31ak1Wc+bEweZEpNlvE19PQoBRWGzCCit6wpw6+D7WjV57NToL5Pjx49rXAaSAqXAsBxvFPvnkk4EIYfXq1WrOnDl6oQ6LdXLqQHJjcVnQgDThZjId7ZrfpjasXDUrFZ1kdbJ/16hRI/DSevQpiaSPhVp+gbU9xYsXT+g7iaTR/m6vXr18sfEkBL+MpvJ9yIxegv+xHOadVM5boml77rnnXE2m3cyoucbW+u+8807Uz0IybPBBD0T8OXWw0S97TVDmQQIrUFk6HM9B48Lozi8w3GItz/vvv68+/PDDHDvee+89tWfPHl9s0pIQ/AopzPcRqb3Mpt2un3322erdd98NM2ShyrsQQqiKWymGVEHNqM1zQXQqIYMxbbMrhJC2RSsZEwRiR0AIIXbM5A1BIG0REEJI26KVjAkCsSMghBA7ZvKGIJC2CGQ7ITAl9cQTT2gvTs495dMWVY+MYQXJRqGDBg3S25H36dNHPfbYYwrjFQmCQCogkK2EwLw+VloYRzClFdS4KBWASWYaMFvFC7TZaNVuLMJ5qVKl1KhRowKZTCczXSc7Lubk77nnHk2Cft/GRmDmzJnayIw61LdvX+2QJMjcv1/cqXj/7bff1ha2fs5+6VTx/0lnUr9+fX00adJE+3NYtWpVIKO6aPnPVkKYOHFixEKrfPny2jAiWmLS9d7zzz8fwYGVhjQKjGjwatW4cePIPb/KkJvxwbwaAyAIsEGDBp5ZQaJ84IEHIvtwOsmTrfkwqd+7d69nHLntButK2LWcvOK3wyt88sknGjsnJvbfYIxJdrwh2wgBs06kAhLL5qrlypULJSGw67JxY8e+kk5nt6wDuPXWWzVO1apVUwwr0i3QqxufFNQHzMrdAhaGeG8ydYbnGFJh+Qh5/u53v9P3uM95bt/Kn3UFdBZ20+aHHnrIDRptbn755Zfr/JcuXVovpsNHBVIBba1jx46K/UvBpl27durIkSOu8fhdzBZCwA8BmcRNGYuFTjvtNN0oMJ0MW3jqqad0IdWqVUtvTe+Wf3o7pCkkhG+++cbtkVx5jZ6KCl6kSBGNgdl924sQEJvN5rxIUM5FSjSgSZMm6c1qqfiLFi3KlbhgHMZivdatW2tcyIshBS9CMFIma0aQKNzChAkTNCmcddZZ6rXXXnN7xPda0gmBRg8RUAmw32YcSIbpJcNICGxFT/7Zjt0ElnJv3bpVKxNzey9n8uT8jx9HtuAn7xUqVNDK1Kuuukr/9iIERGKWc6OE9lqVh/UkO1kT7zBr2XluDJAd6edgFSQL1Jo3b65/exECmxazXoTl6F4B6ZLOl3jBMJ6QVEJgh2FTWGSaYHrIMBICjR3HNSwSmjdvnqLCd+/eXW/LzjCKwmMoBVl8+eWX8ZRfyr6D2z4IYOzYsRE/ni1bttSV1YsQgmQGXYSpYwwjcmOgbSAd4PCWYRKrVf0IIUg+UdojhXEwmxVPSBohYO9OZYed7L2h2aEnjITAUIDxHj4ZunXrFhGdIYHatWsrfDyangJlI71qugS04exNYQ/Gu1cihMB4GWc3HJs2bbJHn2vOnWtD6NmNfsRLQgiSORzGUp/QNbCcPZ6QFEJgWo19C0gMHmzt6+fDTAhsoIHbd6PsqVu3rlq5cqVCkmIKjqEDqw+ZgQE7tO/pvDtRooTAHhQMP8CK+uY1rIinIeTkO4kSAu2NPUPABcmTfUziDUkhhFmzZmnGRuw5evRoprQYF/D0lDm9s0+mhJ2EH+hMIAQKimklNhJxC2wRx4wMQwg27UjXkAghsGUdS7HBskePHtpnaLrglAgh0KmwNwO4UH+mTp2aECwJEwKaYVyUYVzDOHnbtm16L0b2Y+RgXpXEIh4zruQaPWfQTSwSyl0Ov3zgwIFI79+1a1fP1CBhMYwAp2nTpnk+l9tvxEMIkGjv3r01NuCDItEugeZ2TEh/vISAgRK7Ypv2xeYwiYaECcGIKiQq6MH+bhighCFgRQYuaJO9AoRQtmxZ/ZwQwv9RogMxnrOx8mSbunQMsRICzxt9AXXrpptuUlh2JiMkTAgYjTDNyFGpUqUsB16gSTTzy/SCPIPSkbnYMATmzck/ecc+wy0wTGDIgKT15ptvuj2SFteCSgjUjaFDh0ZsEnr27Kkw8ErXEAsh7NixQzVr1kzXKYbhdCBOJWUiOCVMCPRu0Q5246VBMMvA1Jp5NpFE56Z3mTdnRgEMEO8YVmF8RKXnP9OyJUuW1PexWASfdA1BCIGp2i5dumg8ihYtqi350hUPk6+ghMAsFLNR1KUbb7xR7d6920SRtP8JE4JfSux2CInYWPt9J5XvY6BlX9iEtAA5mNkFChjWT3fDLT9CwDLRKMjo/TDLJTB9ibLaHJh7c6SLlBmEEJCQjL6gVatW2rv6999/rz2rYw7vPOKdrcp2Qhg/frxmNMTh7GC0VCYCe9pQpLKV/ZVXXqno+ZgeQmvO4ibmnpmKTPdg1jNgWOQWsMTDiAuCPPfccxX6F1b01atXL9PB9G2dOnX0Cr9kistuaToZ15h9M7omFnY5Awr4ESNGaFzAhtkEhpjGCMntP3UtnpDthAAJUNBoQJ1TkvEkOLe/Awbsf4A+Yfv27WnTywUpF8TcAgUKaF8Zbs+jWzKVnf9U/mgH1n7pMOPAsJK80EFguu0MSEgopbnPwVoFY5zl9R+vXvGEbCeEeBIl76QnArt27dJEuHPnTtcMIkUxTsYCMciBqW46TF+TB0R8pES32Tf0Slh+cj/o4RaPK+iOi0IIDkDkpyAQZgSEEMJc+pJ3QcCBgBCCAxD5KQiEGQEhhDCXvuRdEHAgIITgAER+CgJhRkAIIcylL3kXBBwICCE4AJGfgkCYERBCCHPpS94FAQcCQggOQOSnIBBmBIQQwlz6kndBwIGAEIIDEPkpCIQZASGEMJe+5F0QcCAghOAARH4KAmFGQAghzKUveRcEHAgIITgAkZ+CQJgREEIIc+lL3gUBBwJCCA5A5KcgEGYEhBDCXPqSd0HAgYAQggMQ+SkIhBkBIYQwl77kXRBwICCE4ABEfgoCYUZACCHMpS95FwQcCAghOACRn4JAmBEQQghz6UveBQEHAkIIDkDkpyAQZgSEEMJc+pJ3QcCBgBCCAxD5KQiEGQEhhDCXvuRdEHAgIITgAER+CgJhRkAIIcylL3kXBBwICCE4AJGfgkCYERBCCHPpS94FAQcCQggOQOSnIBBmBIQQwlz6kndBwIHA/wC0Z+QzbS6kqAAAAABJRU5ErkJggg==)
3. Menghitung Pecahan Senilai
Cari pecahan senilai dengan penyebut KPK-nya dari masing-masing pecahan yang dikurangi. Hal ini dapat dilakukan dengan mengalikan pembilang dan penyebut sehingga diperoleh pecahan senilai yang tepat.
Tips: Bagi penyebut KPK dengan penyebut awal untuk menemukanpasangan perkalian.
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)
4. Mengurangi dengan Pecahan Senilai
Saat mengurangi pecahan dengan penyebut sama, yang dikurangi hanya pembilang. Sampai di sini, pengurangan pecahan sudah selesai.
![](data:image/png;base64,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)
Catatan: Jika hasil pengurangan merupakan pecahan tidak biasa, maka nilai tersebut dapat diubah kebentuk yang lebih sederhana.
Agar lebih paham, simak video berikut ya
Jika video tidak tampil Klik DISINI
LATIHAN
Kelas : IV
Materi : Pecahan
Sub Materi: Penaksiran Hasil Operasi Hitung
Pembelajaran : 1
Hari/Tanggal : Kamis, 17 September 2020
Mengurangi Pecahan
Biasa Penyebut Berbeda
Mengurangi pecahan biasa berbeda penyebut dilakukan
dengan menyamakan penyebut yang dikurangi, berikut langkah-langkahnya.
1. Contoh Soal
Sebelum belajar pengurangan
pecahan campuran, perlu dipahami cara mengurangi pecahan biasa. Berikut salah
satu contoh soal mengurangi pecahan biasa.2. Menyamakan Penyebut
Menyamakan penyebut dapat dilakukan dengan menghitung KPK penyebut dari pecahan yang dihitung. Berdasarkan contoh dihitung KPK dari 4 dan 6. Jika sudah sama, maka langkah ini dapat dilewati.
3. Menghitung Pecahan Senilai
Cari pecahan senilai dengan penyebut KPK-nya dari masing-masing pecahan yang dikurangi. Hal ini dapat dilakukan dengan mengalikan pembilang dan penyebut sehingga diperoleh pecahan senilai yang tepat.
Tips: Bagi penyebut KPK dengan penyebut awal untuk menemukanpasangan perkalian.
4. Mengurangi dengan Pecahan Senilai
Saat mengurangi pecahan dengan penyebut sama, yang dikurangi hanya pembilang. Sampai di sini, pengurangan pecahan sudah selesai.
Catatan: Jika hasil pengurangan merupakan pecahan tidak biasa, maka nilai tersebut dapat diubah kebentuk yang lebih sederhana.
Agar lebih paham, simak video berikut ya
Jika video tidak tampil Klik DISINI
LATIHAN
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