Mathematics
Grade-3-
Easy
Question
The fraction with blue in the whole given is ______________.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAM8AAABRCAYAAAB17fJsAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACRkSURBVHhe7Z13dBXV9/YvICDSBCmhJRAIoYQeeu9Feu9NUKSDIkoXBUEBQUApwheQIqFIkV4VbnrvIXRBurRA6Pvdz5lz7pwb8f2txc1/mb3WLMIwKcOaT5699+xiI8sss+yNzILHMsve0Cx4LLPsDe3/hOfZs2fWYR0Z+njx4oWkwdn+E56HDx9S7969ycPDg48SVKJEcSpe3DjwMc65u5dwnMPhwX935Vr3Esa5f13L58S12jlcI67lz1Hn1PfCoc45X2uec1yb5nu5u+O8Ox8e/LG7079lhAP3nFHvPe2h/i/mzZsnqXC2/4QnLCyMbDabdVhHhj8mTpwoqXC2/4QnIiJCfnJhsrltoVnLAunyxSRKSEigdX6hlM19K/m03EPhkXGUfCZBnG804CDZCm6mhWsD6a9LxrXLfwmizEW2UJ3O+ygmNp7OJCVQdHQcVe26n2xFfqXVW0McX/fbVQFkK7CZWvQ7KP6elJhAIWGxVLr1XrLx99uyJ4wuXTCunbnYTrZ8m6jTh4fF10zka08FxJBbw92UxcuP9h6NpAvnE8W1E+eeIlveTdT3k+N09myiuPbwySjKX2MH5fHZTifs0XT+nHHtsBnBZMs1Qdx7gwb1xbmMdOBBwb337dv3tf+ekY4RI0aI/4vJkydLKpzt/4TH3d2L2oy6TDkqxdGhwGfyX4n8jqVSlnJR1GniVXmG6NZ9osaDLlDeKrHkH2P6iat3PSSbVxQNnHlNniG6couoZo9z5FYrjiLOvpJniRZsvE+20lE0diFfIC35ClHFdmeoVGOGhD9WNn3FP2QrFUkzVv4jzxBFnyPybJJIFdqcoUs35Um2MQtuiWsXbeYfUlpQ/EsqUieefLudpZsPjHP4SYZM3CjuvV27tsbJDGSLFi0S9z5+/Hh5JuParFmzXIOnso83PX7ykjqOPEu2EgG08dAdeQWJj20l/Kn9R0n0+OlLce7+oxfUsG88AxBIe07fE+dgy3fww+vmT/0nnaXnLwxYbt17QZU6xdBbFYPpZMRDcQ42f/01VjA7jfzygniYYRdvPKWSLSIpp28ohZ15JM8yQMuvims///4veYYo7mIq5a8XRgUbRlDSX0/kWaKJ8y+xstlp9koT+MD4FMpeNYTKtIlioI1fDocO/CbuvVWrVuLvGcng3+PeR40aJc9kXJs6dapr8JTxKiP+nsrPVVOGxObuT9uOmr/pd/DHNo8AajE8kVJSDYDuPHhBtRmgzGUC6aC/+Zt+zS4GqKg/q9VZeiaF6ertZ1S5YwzlZIBOR5oALfrlOtkK22nQzAvyDNHZK0+pTPNIKlgjlEITTIBm/MQAFbLT+AWX5Rko0GMqxgB5NAinuAup8iwrEADia2et+lueYYDiHlF+Bqhcqyi6dpfo+OFdFjwWPK7D4+Hh6YBCKNAIBojVZuNBU4E2HWaAWJXaMVypzwytuJfyghr3ZwXyDKTdp0wF+mknA1TEn/owQC9eKgV6TtU6swKVD6bj4SZA89YzQPygfzTLBOivm8/Is2UU5aweSiGJJkDTll8RqjJ5oQlQ4uVUKsgA5WeAEvhjZRO/vSyu/XqlCRC+1tvVQql6vyu0+KdfLXgseFyHx5apKDUYGE+370uAGI7mUCBWm18ZGmU7jzFA7gHU6sMkeihh++fhC6rVjwFiBTqgKdA6qUBdhAIZAEGBfBigHKxA9qgUcQ62eKOhQAN1Bbr6lEqzC1eAAYpIMgGaJRVobBoFKlovnNwBELtzysZ9ayjQzBWaCxeXQvkbnuPzxgPUurUFT0Y2l+HJntOdbOWCqG6/JI5nDCgeMRydoEDF/emXA6YCbTliuHCthyfR0+emAjUVChRAu/40FWjlbwZAvSawAsnA5ubd5+TLAGVlBToWairQt9KF+1ADCPFJWXazclcLEXGLsqk/MkAFTtOk70yAzlx+Qm71w6kAH7GaCzceABU8TXO0GCj0zHMq7vu9BY8Fj+vwVK3kTQfs9yl7uRBq0DtOuFiwJwxH64/hwgXQpoNpYiBWoDbDEumBhO3eI46BBiSIJMLvWhJhw57bAqCuE5LpiXT3rv/znCp2iaFsFYLplJZEWLr5Btnc7DRg+nlHEuH8tafkyQDlYwWKPPNYniX6it0xqMrI+SZAgAYKVJyPeA2gT1ilbIVO0xSGTtnWbdvFvVtuW8Y21xMGZYyEwdHQR2QrG0Q1esXRP6wmMMRAnUedEQq0Yd9tcQ627dhdspUMoOYfJJoxELtwzQcmUKZSgbTjBEfl0lYDoGL+1G18spMC1eoaS9lY8Q4Hyxwy28JNDBAr0AcMkDLEQOXbsAJxwO8fayrQdFYTAPQJxzfKzl55QsUbsgLVCaPo8yZs4wAQK9CXEqB9e3da8FjwuA5P2bJe8gzRgYD7lM0riOozQEqBnrO4vC8B0l247QAILtxQU4EQC9VngEQSQXPhNuyVCjQ22QHbTf76FRmgLOWC6YSWRFj+qwHQgKnnSeYbRBq7FCtQHg74w7Qkwjc/swIxFCPmXZJnjDR2UQYIKpSoxUCTF/0lrv12cwodO7zbgseCx3V4cuUuQat2mG8bj7AS2LyDqFqvWLrDagJ7pCnQxv0aQCfYhWMFasoK9Oip8aTf5c9pAQXi87+dNBVoDQDiz+88LpkM1IhusAtXuxsrEH8/JwWCC8cADZlmxkCXrj+liq1Zgao4K9AMqUAT5psAJf/1hNwZoEJ1wkVCQdm4haxA3olUve0yce9WzJOxzWV4bLai4t3OUj/TLdvPCvQWK1C9nnF0WyoQXK4OoxmgEv60fp8J0DZk4YQCJbACGbClMGwNBxkKtOsPU4HWSQXqDgWSsN26/5wqM0BIWhwLNQH6USrQ4CnnHSnvSzeeUUkGKCe7cCHae6B5QoHsNOobE6D4S6nkxgC51Q1zVqBlrJg551jwWPC4Dk9pTy/q+/k5jksCaYWfqUDH+UHOzIpQuXscu1hmDNQJAHEMs3m/CRsUxlYqgBoMSXCksZGFazE48V8KtP53BqhEAHUYk8wuoQEFFKhO91jKDgUKMlPeSwBQETv1Z4CUXWYF8uEYKE/lEDodbSrQl6uNJMIYDSBk4Uo2iqBCtcMoQks4fDJzg7h3y23L2OYyPD4Vyors1rAZl8Rv+kVbbhgXsB3iBzlL2SB+sPUY6BV14QcfAMEVU7b9uJFEaMUA3ZcJB8Q3TYckCrC2a0kEhwKNOeMo+8E7o+o94oTLeDjEBGjZ1puGC8cAqbKfK7efUel2UZSdXbigOFOBvl0jy37mXJRnSJTvFG4cIZIIsecNBTq43yrPseBJB3i8ZHkOrA8/oEgXL99qAvQHB/PZygdTZQ7ub9w1AAIUHdn1AkC/sJIo2/PnPeGq1eGYR70zwp8tABAUiAFThtgJLmBbjqWeSiiQhavDAGVnYA8FmgAt38YAsQL1YYVUdvnGU6r8fjTlrRRCp6LMhMPXa2Qae46zApVuwgpUM4ySrhCdPGolDCx40gGe4sVK0bU7RsGkUKBpDBD/pl+4+bo4B0Mwn4UVoRa7VnfuG6qCyoHuHPxDQX7eoykQK4xIYzNAKgYCbC2GMkAcG/lpAP0PLhwD2IUBUjEQ3hnV5FgLafNDQWYMtFTFQAyQioH+/ucZebECZWEXTk8izF9rKNAYDaDkq0+pMANUsv1FmjnfqKq24MnYli4JA+/20XThmqEqeCz7TjUUaKnmwv0Z8ZDeLhdMVVmB8KIThhep7cfJ90CaAu07ZShQPQYIMMCgQM0+MBRotxYDbT4IBWJ3DwDJNDYUrk7PWJE2P6rFQD8KBfKnXgyQcSWSCE+pUjtDgexaDDR3raFAI742XTgokOf7F8mWd664dythkLHNZXhyv1uSctQIpbJtYx0l+6/4yRw+nQEqdJoWbDQBOhLCClQuiGowQP88kArEAPUcDwWy06pdZo/Ozj8MgJpBgR4bLhxS3m0AEOrmjmox0H6Zxh6JwlPl7r2gOr1YgbwCRfZP2VI/IwYaNPmcIwYCzOX5F0DWSsF0SgPoGwBU8DSN0QA6d+0l+TT7wYLHgsd1eKpV9qZgDroL+EaQd8soOnfV7I9BqQwUaPEmPQZ6QO9wDFS9cwz9Ld09uHAdABC7YOs0Fw5lP5lKB1L9AfEiIQBDNq7pMAOg346bZT+/onfI3Z9afZxEj2QSAWnsWr3jRNr8qPYeaCV6hxjWbpPOOV6kohKhEsdAeXxCnFof5q9jF45h+2C2CdCuXVaFgQVPOsBTurSRMIhIfkJvVw+lki0j6fLNp+IcFOijmReE+7NggxkDoa0gc4VgqtIllm5rCoQ2BLhVaEtQtku6cI36m2lsKFC74QyQe4Bod1CGCgYoUAcGSLlwSHk36MsKVCaQ9trNd0bLthtJhAGfcQwkFQgZwUodYyhrxWD6QwPoGwDEKjpKArR/r5Vts+BJB3j0bFtwPCsQA+TNAOkKNAQAIYmw0QToJAOUkwGq1okV6LahQHiGOwMgJBF+MwE6wA99FlagBn3jRSMd7NGTV9RkeJIASG++24bKbbQ+fJQkXrbC8Dk1WYEyswId1rJwa1C5zQB1/uSs450RXE8AlIsVyF9z4RYy/LiHT5feo/37LHgseNIBnhw5itNXWtdl+JnHlJNjIHcG6OINAwo8lyNmGQqEDlBlaK3OVDGIKrELh1o1GFoV+goFstNKTYHQsg31qN8/3tF8hz/bfygrtw9pCiSSCP70/ogzjtYHlP006mO0f/9bgfyp3yQ03xnnkPKuygChcltv//4G7d/eieRZf4m4dyvmydjmMjy2TMWEqzTtJxOKIFag96BAzSPp/FXDhYN9AAXiGOg7HSCOgXJWCKLqrEBoeIPhGe7GaoAYaLWmQPv4oX+LH/5G/ViBZMr78bOX1BwAcQy0lVVH2XYoEEPV9sNEeigTDoibfAEQ2r+1JMJaoUD+4nuqd0Z4kVqhQzS9wy6cf7QJ0MItD8iW38q2WfCkAzzeZb1oIkr23QIcJfuwyOTHlNc3lIoxQOf+1mIgKFBBO32vxUCnOL7I7BNM5fi3/XX5IhUxUL9PzwnYVmkKtM//PtnY/arDLtz9x9KFYwXqiO5VVptNWvu3o/mO4VIdqVCgJgxfJtTNaZXbK2T7dy8GSF4qyn6Q2MjOcOt1c18t2CTu3XLbMra5DE+FcmXF36f8YLwXmbzUnP2Evv/87MJ5NXOOgT7iwBvxAwJxZSIG4t/y1RmgqzLlDes5iQHiGOinHa9RoD5m4alovkP3qrs/bdYm+PjJGKgdx0cq5X3v0Uuqje5VVqD9dlOB1u02yn7QO6TcvWtIYwMg/tlU890BK+ax4GFzGR69n2fC90bPy8zlJkAx5x7Te7XCqFjTCErWABoOgBi2hetNBfKPSaHslUKoTPtoduGkArEM9AVAbv60iuMTZQc58IcC+faOo7uyFk60f38sWx+03iE/WbndfHiigAwGBWo+MJ4ylwqk3/4w3xnhXRPcxe4Tzjq1PtTsYjTfBSW+pD+PW+U5FjzpAI+bW0mnkv0pi68It+wzTYFCk1iB2IUrwwp0QbpwsI+/MgCa+z9Ngfi3O+KMqgyQysLB+nzGABWx03INoN9ZNd4qEyTavx1lPy9fUVsAxPHORq39G/EQFKjtMDMGesCw1R0gkwha+zfeNcGF6zGeYyCtaqFClxjK1+gcjZ6y3oLHgicdEga2IlSwQTjHOKaqKAWargEUdz6VCrIClWgaSWe0QYPDABC7cAs0Fy4wNoXeYQUqywCpqgUoUJ/JhgKt1lw4tCCgjq1aLwZIprGRou6I+QnFA2iLpkCq/RsvWdWLVFQ6NBuQQJk5BtK7V3/ebShQV3bhlAJd/+cZ1ezH95bja3HvVsIgY5vL8OQvWIqKsEtWqF6kAETZtCWYk3aaPuU/lYWxAuWrGUqlGKCL10wFGv01FOg0fbXWTHn/GZVCORggVD4rBYIGDABArAoos1GGJEIWr0DR/n3nvuHuof27A7pX0Xynda9ulQNI2n5gtn+L5ruBsvlOA2gtAOIYCOVDqvAUY3cbdvnRgseCx3V4UJ6DtmWvFjFUsGaYAETZpCVQIDtN0QCK5RjIjRXIvXEEJVzWFEgAZKdvNRcOZT+5KoeQd7tounTTAAjvYnqj+c7NTiu3mQAdQ92cdxBV7RkrynJg6PURAEGBtCzcTtl813BIouNFKioRUEeHGGiXVngqKrdRtTAWzXfGuX2/WwkDC550gEeV56Cq2o0V6N1aoU59/zOWGTHQp9qs6MizqfRubQaoSQSd12KgcXMxJ81Os1abCoRuTyhQRQbIoUAsAoO/MAD6/lezbu5g4ANRRVCXAbqttT50GcMAsQu2Vqvc9jvOCsQuXBsGSG99aDqYFYjPAzBla+UEn+5jjAk+VrbNggfmMjxq9BRMKBC7ZAXZNdOn1CB9DSgmLzYBijmXSkXrcAzUkBXoopbGBkBIIvysjbplBcpbhRWoTZRZtcBHr89ReOpPP241Fehk2APKCgXqHisqBWCA4n3Z/r1Jc+H2/GkoUD0GxpHGhgIJgAJpjzY/4Zd9Rt3cgFm3afuOHRY8Fjyuw5M1WzEazQ+8svMcyxRtFkl5WIEiz5oKhPS1AEhToChWqLwMUDF24TAiV9mEb4xJnbM1BbLHpNDbDFA5VqBrdwwoXvLzPhTdq4VZgbTeoYNBrEBlg6h2jzhH6wPe23SV7d+vU6CWmJ+gWh/Y3WsuAdLbv9ei/btCIuWvtFDcuxXzZGxzGR7bW8XFb+ThX5lQIJtWBgpUw1mBvoALx6qiu3DRDBgUyKNhOMVrKe+PARBD8bUGUFBcCuVjgMq3iXYkHBDGq/bvZZoLBwXCQJAa3bTmO1agdhKgX7QhjHvR/s2xToNBZvMd/mwiXbg9mgv3y6HH/PnzLXgseFyHp2L5skbPS5FAGvnlRUeH5sXrT8m9eSS944skghYDyW0Fny8yAcKo23frhlPhf+3LwaROu1PhKdZ9vF01hLwYIEctHH9T1f69SGv/RvNdJjTfMUDqRSoUqIds/1692wRoB5IIDEozBsihQE9eUivZfIcsnbIfVlhbEix40gEeb2+jwmDJ5lvi4R3stK2AFeg1+3KmY9g6K9B4bd1HNGIgBsijQYTTvpzRAIiv1fflBMWmiH055VtHOSUcBkwzCk+XbDEBOhGK5rsg8u0aazbfMRvtZfPdem2Cz/7T90TNW4P+8aICAYYeosay/VsNINlvZdsseNjSDR7YPPS88IOO9gNl6NAs/Zp9OQIgVpXPtHUfSF0XrB9O+flIuPQaBdLWfWBoYfZqoWKM7mWZxoYCfThdtj5ovUPHw1mBGCDMT1AvUqFAvScyQEX8aaXW/o33PHjf03hggiONjdaHduhedQ+gA0HP6dSJPRY8Fjyuw1OggAf5O+3LMabUOO/LYQXCvhxWoHDNhZvFMODlKAapKxP7cliB3AGQFgONw8IphmKGtnAKlQj5q4aKjW162c9AAIQ0ttb+fZxduHfKBZNvlxjHtB+knTtKBUI6Wtk+ViC872ncP8GhQACpMQOU1fcM9Rm5xoLHgicdEga2opSVg/jjYaaqzJcKlHZfjhcrUC5WoCDNhZuGhVMFTzspUNLlVHJrYOzLweB1ZeO/MxRI39iGl7JQNXcGCHEWDAo0fAbHQPwzYPmVMgyEt1UIpkoM0E35IhVJhD4TjPbv1ZoCYVsdFKjhAOfmu7ajOb7LbpXnWPCkAzxuRTzJhx/GHJXCnPbl/CDXfQxgFVBJBPT1lG4ZKfbl6BvbsEBXzAjQ1n1gOmdRhqdEGgUy9uXYBXTKguJTKF+1ECrHX1tXoKGvab7DGGARA2nt30Cjq2z/1gH6nQHKwgA14RhIFZ4+4k/pOHiVBY8Fj+vwYLmVMakzgbKm2ZezYJPR9/8BA6TsCscn5bCtAPty4kx3bxpcOFYV5305T6lYwwgqUC+corW6ObUv5ysNIMySRvNdcXYP8a4JBmiHASCGbYmmQH9GplCWisFUjgFSzXeIgdQAEr357ne70f5dpx+a7wwFssbtWvDAXIZHVRjcfvBK7Mt5i3+ro7VamdqXg2HrcKdgcK88GaC8afblzJXD1kdow9bhthVhFw77cnQF+myhUTf3+TKzbi6Y3UGoWlkApCnQR18yQPwzIKGh7ARGYDFANTqaCgTr+akBEDpLlaFdwWi+i6eHT4gOH7C2YVvwpAM8nqVKO9wyoUCOfTlmhyaGv+PhHTJN29h24xlVbMMxEEbdxpgKhIQAoBivLZzCxjZ3VqCCtcMo6pwJ0NgFBkCztPZvvHRF71CJZpFOVQsfyAEk32suHKoWsvkEk1eHaDONDQWSAP2sAYTFXRig2HrsdVq3cZsFjwWP6/BkzlKUurO7kyqf01scG1RigJAaPh5mxkA/bjUAGjT1vGNGAEbdlgRAHK/o74HmQYEYipGv25eDjW1aGvtz0Ttkp8lpFOhdtH83d259GPGlUbmNKTjKkMbOUcFo/9ZnbveWAP2kLe6CAmWtdoaylvpW3LsV82Rscx2e7CXEC8RO4847SvbFvhwGCNsKDmvD1hdDgTiAH8gunDJsK/Bpa+zL0WdFi305DNtYfV/OX3JfTp0wMWBE2QS58hAV3MpiWIEK1Awjj6YRTs13QwVAp2mhBlAAK1AOViBvViBMzYGhGruXAMhOa3aaAB0Mfkq5yn5nwWPB4zo8lX28jbZl9yBRsq/25WClYrUesWJfDlYtKlMxEFoK1KBBvEgt1TZaFH4ic6ZsvtyXM0orPDX35TjXwk1dbAA0ealZ9hOGJAIDVIpdOKicslGy/fvrtSZAmBD6NsdAVdqbCoQ76feZAdBSrXdo7QY/ce+W25axzWV4ynoZFQZbDt0TXZtp9+XUZYDEvhxtTppYOMUPpPO+nGfGtgJWoFORJkBfASB+0NPuy/FkgArVCnN66fop5iewqkzV2r8RA6H5zqNJBCWmbb5jiL/T2r+D41IodyWj+U5VLWAdSQ85P0E131nbsC14YC7Do5fnrNtnNI11HY19OYYCiX052FbAAB3U1n0IgNiFG8QAqW0Ff995TmXfj6Ys/ADrSQS1L2eUtq0g+YqxLycfgxGjpbGn/4DWh9P0GYOkDK0RedG92jSSLmgx0Li5DBBfO3uN+dIVWxLQfOfTPtpRjQ2BxM8J2DYcemJNz7HgEeYyPO++6/7afTmtWYHUmCeRhetpbGw7osVAxr4cu2irVoYYCAqUp1Iw2bWNbXMAED+8H2kKlMRKoja26TtDJ2F+AqvV51r7dyT/OxSoJCsWPk/ZcNn+PU9r/0bhaR4GqAIUSLp74LsH5if4JFGrvivFvVsxT8Y2l+ER27C9AsnvmKkq/9vHALECYX28GpyBF4y1pQId0IatL/UzkgjYl6M2tmFKTXmOPbKyC6cv3cUDDgUa87UJEKoWijaNoNwMRhQrjDJM7kHrwxda92rU2VTKUzuMijFw5/42AVLt31ipqAzfNzsDDIDw88BevnpFg2besspzLHiEuQxPCffS1BQl+57BTjtDxb4cjoFafoyluwYUWOEBgLJiX47mwq2Q6z66c2whE3bGvhx2nfL4sAJpAKl9OcM56FeGbFppBqhwTRSeminvLwAQq4refBeV/JiKMEDI2unt3yNk+/ccrf0bWTjEYBXaRjk13w0et1bcu+W2ZWxzGR5k29A01mHEWVGyv/mwOSNgg9yX05EBcuwMTXlB9eWw9b3aqNtlcOFYgbAvR8VA2Jzg05EViAFy2pcjFOg0jdYAunD9KXk0j6RcAChZKzyVA0imaAqE5rt8dcOoMAN05ooJkNH+zQqk9Q4FxKVQNjTfMUCq+e7QAas8x4InHeApI/fzpPJz1QQLpzwCaPuxf+/LafmhuS8HC61qMUBZ0uzLwU4eFGca+3KMc2JfDitQLiiQFgMtWG/UzQ3ReoeSGYTSzSKpkK+zAk3/0VAgvA9SBhevKANUUgwgMRMOo+cZCqTPTwjgGEi0f7eOoussrscOW+U5FjzpAI+Hh6eYEQ0TCiT25fjTJm3Y+kbpwr0/IsmRRIACNerLCuSJUbcmQBinCwXq+yn25ZgKVAUKVCGYTmiV23PhwvGD/vGXpgIhxVwKCoTuVS2NPQUKhPZvzYVLuJRKBRig9xqGO6Wxx89ngPha1Nopw+Ku7KxANfpfoSVWG7YFD5vrCYNMRanRoAS688AACPFNU7kvx0/r+98uJ3W2wcY2CRtepPr2jaNMXoFO74HEvhxsK2AFUqtB8Oa/IgP0DiuQvrENy7KgQIPSKJAnKxDav5FlUzZjOVofnNu/kcYuUidcDCBJZJiUjZUKNGuVWTcnFKgBUtbGA2QlDDK2uQxP9pzuZCsXRPX7mys8AEcH7MvheEffl4PVHwIghku9SFX7cqBAaEBThr2kAKi3vi/n7nOxBAsb2/S6uXkbDAXC7h9lSDigezVP9VBR66ZsCgAqcJomawChVq5wvXAxc1tvvhsLBeLYaq4GUEjScypW43sLHgse1+FBPw/alrN5h1BDjmNuyw7NVHbPWol9OQG0RVt5qGKgthwfKdgw2aYmAMK+HH8TILUvB4Wnyt3DzLYKcl/OaS0GQr+OUKAZ5x1V3khjl2oRJXYEIcumbLZs/x6t9Q7hRatb3X83301A9ypfqzff/eq3Xdy75bZlbHM9YSD7eY4Ep5j7cuTsM8RAneS2go1Ow9bvCreuxXAzBoICNe1vbCv4TZvUuWqXBCjtvhwAVD5IjJdS9p0ECA1wylD2gxkHeaqFiMyZsqkCIDtNYjiUYeJpMVafggwROlmVjcH8BFYg1XxnledY8MBchkdfbrWPVSMrq0dDBkhtbBP7ckYa2wo2ai4c4iEA1EbbVmDsyzG2FezVXDiHAo1LFjMHYHDhyneJpSzlg+kPLYmwbLNsfZh2wdF8hzR2yZZRlJddOD0LN4fdMUAxkt0zZUhjF2H1KcZHktb6MIndPFy7YMsjOn7EKs+x4EkHeHLnLuHUNIYWBFQRVGeAsEAXhhiokwRos9O+HGPUbbNhifRYQmHsy8HGtgDarW1sw4BCVC10YQVSbtl1duFqdY2ltznmOqopkGr/Hqq1f+MlZ3lWoLxVQygwbfs3K9BETYFQeFqCFagwK1DMedPdGwMXzjuRfNstF/duxTwZ21yGR5TnePjTsm0mFPvs9ykLK5C+LwdBf3sBUIB4eapMKZDYlyMX9AK2BtiXU9p54ZTYVsAK1HM8x0ASNkzB8WGAbOzCnQgzAVqG3iGGYui0846U98Xrz8iDARLNd3r79yo033EMpCkQEgeFWH2K1IMCmS7cpB/45805x4LHgsd1eDw9y1BvFEwWC3Tal3M0+AFl8g6kKj3iRHcpDDFQRwBU3N9pY9vOE8a2gkZDzX05iIEw+hbz03QF+h+GraNqgV24F9g1wobq51rdDAXSe4cw/F003001m+8usQtXEfMTqjhXbs8UANlpnNb+DWiQwnZL23w3w1qraMGTDvD4VCgr3Kih0y+JB3WxNmwdBaDYl1OPAVJZOJTedB6dLADA4ihlflh5iBiIAVIxEN4ZNR6MurlAMUtamVIgzJxWrQ+YBFqtOysQXDht7ftSOT9hKNq/pQL9desZebaNorerOqex5/1sAKRvfcDL00KNIqhg3TCKl2OAD1nTcyx42FyGx8vLWCUPG/7NLcrkFUM/7TQfyPBkovdqJVCtfpfYxZIn2fpOuUHZysXSpkNmUH4i4hXlqBJPjT+6Qg+kp4THvfOYq5TLJ45dOKO2DLbr1HOyVYilTp9cI+nBUSoLXIshl+m96vF0JETl5ojWH0jlOCyGBs4ylfEuC0m9XheoaN1EssfKk2yL/VLIViaGxi4wlfEae45V2p+jkk3OUPJ1opPHD4l7b9eunbwi49jixYvFvU+YMEGeybg2e/bsN4MnLCxMfGLx4sXJ39+fgoICyG73pyqttnCssYoWrTpCAQH+FB0ZRDMX88P27kpq2GebuDY4OIBOnrJT6YYbKUuxn2nlhuPi2qiIIJowZz/Zcq+gtkN3iGtDQwLo2Ek7udXYQNk919AGvxPi2sjwQBr2xV6y5VpBPcfsEteGhQbS/iOnKXfFdZSTj+27/xDXhocFUu+xuzhWWUHDPt8rrsW57b//QVlKr6G8vhvo94OnxLX4fh2H7RQ/w/gv91EAX4vvtc7vJMdrP1OF9ntp1uy54t5r1aolvlZGOkaOHCnuvVu3bq/994x0DB48+M3gSU5Opnz58olPtg7ryMjH+PHjJRXO9p/wvHz5krZv306+vr5UpUoVx1G1qnHo5/7rfLpd+7pz6XDt686p81WrVhVH2msywpGR7z3tgf+HJUuWSCqc7T/hscwyy/7/ZsFjmWVvaBY8lln2hmbBY5llb2gWPJZZ9oZmwWOZZW9oFjyWWfaGZsFjmWVvZET/D4k1hlBz6nzzAAAAAElFTkSuQmCC)
- 1
- 2
![1 third](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAKNJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLcATibUD8DYh/APEtIJ4AxMKkGrQfiIOAmA1JzACId1DLpZ+oYYgSEN+gxABxIE6EhpMXNbJMAaVeEgTiACA+CcT21AgjHqhhVAE/qGGIHjTASQIHgTgUiFmAmAma0u8DcTypBtkC8RaoV35AU7oPPg0ArQs4erRAu/EAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MzwvbW4+PC9tZnJhYz48L21hdGg+q+QgMwAAAABJRU5ErkJggg==)
![2 over 3](data:image/png;base64,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)
The correct answer is: ![1 third](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAKNJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLcATibUD8DYh/APEtIJ4AxMKkGrQfiIOAmA1JzACId1DLpZ+oYYgSEN+gxABxIE6EhpMXNbJMAaVeEgTiACA+CcT21AgjHqhhVAE/qGGIHjTASQIHgTgUiFmAmAma0u8DcTypBtkC8RaoV35AU7oPPg0ArQs4erRAu/EAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MzwvbW4+PC9tZnJhYz48L21hdGg+q+QgMwAAAABJRU5ErkJggg==)
To find - the fraction of the blue shaded part in the given picture.
Fraction of shaded part = number of shaded parts / total number of parts.
In the given picture, 1 part of the 4 parts is shaded with the blue color. So the fraction with the blue color is
.
For the given picture, the fraction with the blue is .