Mathematics
Grade-3-
Easy
Question
Fractions that name the same region, part of a set, or part of a segment are called
- mixed fraction
- equivalent fractions
- unlike fractions
- like fractions
Hint:
1. Fraction refers to a number/ quantity expressed in terms of numerator (n) and a denominator (d) as n/d. A fraction generally represents a portion of the entire quantity.
2. Equivalent fractions refer to 2 or more fractions that represent the same quantity, irrespective of them having the same numerator and the same denominator or not i.e. 2/4 and 3/6, although dont have the same numerators and denominators, represent the same quantity i.e. 1/2. Hence, the 2 are equivalent fractions.
The correct answer is: equivalent fractions
GIVEN-
Given fractions represent the same region, part of a set or part of a segment.
TO FIND-
Name of such fractions.
SOLUTION-
We know that equivalent fractions represent the same quantity.
Hence, fractions that name the same region, part of a set or part of a segment are called equivalent fractions.
FINAL ANSWER-
Option 'b' i.e. 'equivalent fractions' is the correct answer to the given question.
Related Questions to study
MathematicsVideo
Compare the following fractions.
.
Compare the following fractions.
.
MathematicsGrade-3-
MathematicsVideo
Fraction of the shaded area is-
![](data:image/png;base64,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)
Fraction of the shaded area is-
![](data:image/png;base64,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)
MathematicsGrade-3-
MathematicsVideo
The symbol that should be used to compare the shaded parts of the fraction models is -
![](data:image/png;base64,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)
The symbol that should be used to compare the shaded parts of the fraction models is -
![](data:image/png;base64,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)
MathematicsGrade-3-
MathematicsVideo
The fraction is equal to 89.
The fraction is equal to 89.
MathematicsGrade-3-
MathematicsVideo
The point on the number line that represents
is
![](data:image/png;base64,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)
The point on the number line that represents
is
![](data:image/png;base64,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)
MathematicsGrade-3-
MathematicsVideo
The fraction is equal to 1.
The fraction is equal to 1.
MathematicsGrade-3-
MathematicsVideo
Compare
to the benchmark
:
__________
.
Compare
to the benchmark
:
__________
.
MathematicsGrade-3-
MathematicsVideo
Compare
to the benchmark
:
__________![1 half](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAJFJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLsAbiNUD8CYh/QaujaHIMOgjEkUDMA+VrAfFRqBjFQB6IL1HLyz+oYYgl1HsUAQ4gPgmNBLKBIBBvAGI3SgxRghqiQokhGkA8G4i5KDFEHIhXATELpYG7BeoimhZyWAEAI3M1I31CbrEAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MjwvbW4+PC9tZnJhYz48L21hdGg+ND6jrQAAAABJRU5ErkJggg==)
Compare
to the benchmark
:
__________![1 half](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAJFJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLsAbiNUD8CYh/QaujaHIMOgjEkUDMA+VrAfFRqBjFQB6IL1HLyz+oYYgl1HsUAQ4gPgmNBLKBIBBvAGI3SgxRghqiQokhGkA8G4i5KDFEHIhXATELpYG7BeoimhZyWAEAI3M1I31CbrEAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MjwvbW4+PC9tZnJhYz48L21hdGg+ND6jrQAAAABJRU5ErkJggg==)
MathematicsGrade-3-
MathematicsVideo
The position of A on the number line as a fraction is _________.
![](data:image/png;base64,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)
The position of A on the number line as a fraction is _________.
![](data:image/png;base64,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)
MathematicsGrade-3-
Mathematics
The number of thirds in 2 wholes.
The number of thirds in 2 wholes.
MathematicsGrade-3-
MathematicsVideo
Use the below number line to compare the following fractions using the symbols <, > or =.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQoAAAArCAYAAACATMbuAAAM80lEQVR4Ae2dB6wUVRSGMSK919B7h6AUpSggxSBSpENoinQkRJGmQbpKAEWICiotEOkdpSpVxUIPoBQRRYp0sGHhmO8mA/ve29nH7pwd3r53TzJv38zOnHvu2bn/3HvapBJLVgNWA/dEA2fPnpVq1arJ5s2b70n7U6dOlWeeeUZat24tvXr1kmvXrrnKkcr1G/uF1YDVQNQ0cOvWLWnVqpWkSpVKVq1aFbSdCxcuyOeff26ABDCJdPviiy/k6tWrCdro0aOHfP/993L+/Hkjx/LlyxOc4xywQOFown5aDfiogWnTpslLL70kadKkkU8++SRoy5yTIUMGqVixoqeNNpYtWxa0jXPnzsngwYOlbt26cvny5aDncNAChatq7BdWA9HRwKZNm6RDhw5y+PBh8yR/99135ciRIwkaGz9+vFkWJPgizAOAwJw5c4Je9cEHH0jJkiWlW7du8scffwQ9h4MWKFxVY7+wGoiOBt58801jG+jbt6/cd999Uq9ePZk/f36Cxl577TVp06ZNguPhHgAo5s6d63oZSxyWQNgs3CjZAMV///3n1scUcXzXrl3y5ZdfJvm+Xr9+XT7++GO5ePFikpc12gLu2bPHDNBgIEHbAAWGRq8UDCgYL4899phs2LBBvv76ayOHm62E9n0HihdffFEmTZrkte9xrt+4caOUK1dOfv755zjHve6A+O+9955XNnGux7LMmvTSpUtxjnvdefjhh+XBBx/0yub29Qzodu3aCdNkTdq3b5+5KdevX6/JNiZ5YZx87rnnZN68eUHljyZQ0ODbb78t/fv3l4EDB8pHH30UVAbnoO9AUaBAAXniiSec9lU+Fy1aZG6+48ePq/BzmGTOnFnat2/v7Kp87t6928iq7RKrU6eO1KxZU0VGmDjTUW4mTTpw4IDpvzYAacqYVHhFGyjC6afvQFG+fHnjFgpHyMTOxaLLGuuHH35I7NSwvi9UqJB07949rGsSO3nv3r1G1i1btiR2aljfM72sVatWWNeEOpmlATqdPn16qNPC/i45AAWz4q5duwouzmhSzAAFVtkpU6ao6qJSpUrG4qvJlKUHN3Uo904k7RUpUkRYfmgSYIaszCw0qWHDhsKsQotYwyKn27Q40nZOnTpl+H711VeRsnC9jrW2m3Xf9aIIvnj00UelWLFiEm27WJIGin///Vd46j3//POSNm1a48fFYqq15c+f30SjafGDz4ABA8zNh+1Dk2+OHDnM4NPkOXbsWCPrsGHDVGUtW7aslCpVSo3nO++8Y+Qkck+z/+PGjTN8hwwZosoXGXHxAW6PPPKIWXNrPzgcTPntt9/kxo0bzm7Yn4yvTz/9NM62detWuXnzZhxe0QQKlunxZWDfTWcJlh5EcLVo0cIoHKXbzeogFu+BdOnSyYoVK+IMvKSys3DhQnn99dfjbJMnTxYAKJCiCRQAU3wZ2GfGF4wSAIVzEi4sjGOFCxeWn376SU6fPq2y8dR78sknVXg5Mr3//vsG0AhVdY5pfDL7wZipwcvhgTuKgbd48WJVvjVq1DAzNacdr58HDx40cr7xxhuqcmLEpP8LFixQ5Ut/kTVjxowyfPhw+eWXX5xbWf2TiMpnn33W2igCNcu6T5MqVKggbdu21WQpa9asMTef9s0BSPbs2VNVVicajxh+TXr88ceFtbMW8XRjQM+cOVOLpeFDbgF8t23bpsoXZj/++KNoe76CCckDFEO3ho3iypUrxsMUrJ1ozijit8dkIJRx1nVGEZ+R1r71elivB0ARy+5RYmEY4F5pzJgx8vTTT8vKlSuDsvIDKLZv3y5NmjSRoUOHJrCRBArlO1AQGNWyZctAGTz/v3TpUvOUOnHihGdegQwKFixoppiBx7z+Hy336EMPPWQSh7zK51wfLfeo03+3RCin/eT+iQGeILlQFG2g+OabbyRbtmx3FdHrO1AwnW/cuHEo/YT9HUarBx54QE6ePBn2taEuQIkdO3YMdUrY33377bcG1HDpatKrr74qL7/8shpLJ+AqVPx/JI1hLCMsef/+/ZFcniyu4T5lVjVy5EgTpu0GmtEGClzqRPPOmjVLyD+Jb0wNVLbvQMFUhxh3Tfr999/N+vSff/7RZCsERREgpEnEUVCHAGNhUqa///5b1q1bZwzZSVnOWJRtyZIlBigYoMQpARrBbFbRBArGCg/Cpk2bGhtflixZTKKamz59Bwo3Qexxq4GUogE8XoCDQ/xP7Yn4RJo5+TZeqX79+gkC0QAKZuFvvfWWYd+pUyfj4XRr6460bmfEyHGe/qx/NYjAF5YzEyZMMK42zSjKQ4cOCTYVkqO06a+//lKxxGvLZfnF1QDFYgjmIzye2cX9998fdIYJUJDhyTLNy0bhm2ARqwTTYSfhXiQHiwI2buQ7UBDR9t133wk3tQZhwMSFCSprZaViR8D9BUAQ8wHyeonEc/pJUE2VKlVk9uzZkilTJmFfi4h7IeRcw6CLmwxDF54J4j6YImsu63Bj/vrrr1pdj0k+R48eNTYK7BRuDyICsygqU7p0aU8bPIi6jE/8pkTgEi1MZGso8hUoyHfPkyePGdRFixYVaih4JXIGyEdwm75Fwp9KP069BFJwCeL5888/I2EV5xrqRXCDQDxRSCzSIAYdIdzogDgFr4R9glwG1q1Zs2Y18RmhfOx32x4GUoq4UpqtX79+d3tZij0PnTOYmeF62UjL8Eq+AQV+5/Tp00vz5s0NgubNm1cIvtK4AZ3gIG0LPU++7Nmzy9q1a73q+fb18GQ9WL169aAFT2+fGMY/+MCJRmQKq1GTgziBBg0a3I4V0PiN6A7gULx4cVPVicKulmJHA74BhRO669RheOGFF8wTkKeMV2LNx9NUEyhYGj311FPq+QK4B1lyMKMi9NwrTZw40awtnehUCpAcO3bME1u8SEQfMiUlicst/j/cRgAxko4ANEKgLcWOBnwDCtblDGbWvpCTRen1poYXNza8Z8yYoaZ5bmTcmNgrWEdqTOkxZDrvTsCIVKZMGc/yvvLKK0J9BKzj1F8kmC2Yqy3chpj5YCDGYp47d2612Q/9R07tOh/h9s+eH54GfAMKDGKBQOGkG3uNzT9z5owBndSpU0uzZs2ExDCvhEwkhGHQzJUrl+TMmdPEaXjl26dPH/OkJiEKWw3Vl7UIYxT61YjPwOZBTgrk1PrQAEr4MaOwQKH1q/vHxzegwJDJjexYX8nAY99rzDzXk7jG4MY96hV4UD3LDp581I3kE4+HxjqdFH68E7iqtN2j+OaJzNRItsJAjFcGObEpEUmLgVOLAAprzNTSpj98fAMK1qcAQ+fOnYUpOE9qzWxHf9SVMloBFAEy7B0OsGv0nJKFTpGhEiVKyIgRI24vxTT4Wx7R04BvQEEXiALD88ETheQwrels9NRjOWtqgOVm1apVTXFlyvbVrl07xcdTaOo3mrx8BQo6gk2B/AkN3240FWN5Ww1YDdzRgO9Acadp7/9hj6CqUfzNq0GTmQ+ehMBt9OjRIfP1E+sNbuD4crKPzSJSIgiHJQK2mcBNuxp5pPLZ65KPBmIaKIie/OyzzxJsuPa8EG93jl9KjlfUezFoEhQWTNZg75y8W9kxjo4aNcqs9VnvO1tiL3NJjD8elPj1FIlRAZgspUwNxDRQpMyfLPq9JtYFI2bgtmPHDrtcjL7qk2wLyQYoeEUdT0FcmlrEzITlR2IJM+G2RyQpcSUa4daBbRO85uSoBB63/1sNeNVAsgAKApkaNWpkMh21slKJJSAbkwGtOfhWr14tlStXNinsLGc0iFgS8ke6dOliIkk1eMKDiNcPP/xQovGyHi0ZLR9/NBDzQMFAJrtT8+mMRwY/f+/evU0AV6gSYeH8TKSA81IlKkdpEbISDk58giYR4UmZNELEvdhRNGWyvO6dBmIeKCjswaCmZiR5+8EKdISrXuedFsxUSIsmlJsgMa+EjAAF8QS8K1QjiQ2vCYFs1DwcNGiQSoAUKfXMpjCUWrIaQAMxDxRU5mHKDTH9pn6CV8KIx+CjwA5EtqNG4VqSzEizZilDPUTa8FrAhfRy3opFVi6v6YMn72jwQk5+BxWPCOGmMJD1eHjRaOxfG/NAwRuySAeHyPjMly+f51+FgcaAY4ngvKxXI4GLFx4zO4Gc3BevLy0CKCiSCjkvQN65c6fZj/QPMx36j4vYqRquuVyKVC573b3TQMwDBa48p3ZCrVq1PAUwBf4MpMXzOkHW/v3791epcEWAGPULqSFBYRgNuwK1FLHRUFyHGQWVqZxU9sD+hPP/8uXLDVBwDbEagAb1LiylXA3EPFDw05HZSFg4Jew0ibW6pscD2fAk4MrVzB4FLAAfZgJelzLIiOeIlH2ADBsNMzaNUoCav43l5a8GkgVQ+KuylNMaBXA06pqmHI0l355aoEi+v63tmdWAmgb+B2M5big6g7nWAAAAAElFTkSuQmCC)
Use the below number line to compare the following fractions using the symbols <, > or =.
![](data:image/png;base64,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)
MathematicsGrade-3-
MathematicsVideo
Use the below number line to compare the following fractions using the symbols <, > or =.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMYAAABgCAYAAABG3g2uAAATsUlEQVR4Ae2dB9QUNRDHUUHsFewoCpZnQ2zYCypiR+w+uz4VrGAXGxYs2DsWVATsYkNEBQt2sIuKvSMWULFhi++X55z77e3d7W6Svdv9Mu/tu7u9zSQ7yT9lMjNpoTx5CXgJlEmgRdkdf8NLwEtAeWD4RuAlECEBD4wIofhbXgKZAOO3335T06ZNU3///bcViX/55Zfq1VdfVb///rsVfj///LP68ccfrfDyTIohgUyAcfbZZ6uFFlpITZo0yYrU+vbtq1q0aKHee+89K/x22GEHteyyy6o//vjDmN+ff/6pDj/8cHXhhRca84IB/K6++mp1//33W+HnmcSTQCbAOPbYY3VDfuutt+KVqsZTffr00fxsAa1Lly5qttlmswIMRkdAu8Yaa9R4i3h/M5rBb5111omXoMpT//zzT5V//V9BCVQFBg3v6KOPVt99910wTeLvp59+uq7cTz/9NHHaqAQnn3yy5vfVV19F/Z343iabbKLmm2++xOkqJZh77rnVFltsUenvxPcB7dZbb504XTgBow/1OWHChPBf/ndIApHAePfdd9Vhhx2mZp99dt0A77zzTjVu3LjU11577aX53Hrrral5BPPffffdNb/bbrvNCr9OnTqpOeecUz3xxBPG/MaOHavltvrqqxvz4p0fe+wxNeuss6q11lrLmN/o0aO13GaaaSa1995763VaqD34n/9JoAwYw4YN08Jj+PZX8WVwySWXKD/FKu8PyoCBduaee+5RG2+8cQkYTIUuu+yy1Nfmm2+ueZ100kmpeQTz33TTTTW/U045xQq/Dh066F7+4osvNuZ30UUXqdatW+vFfLDMab8PHDhQtWrVSq2wwgrGZbvgggtKdcqIdssttxhPk8ubVDHulAEj+FoPPPCAolF///33wduJv5955pm6QmytCQAEo5np2kdepGvXrtbXGN26dRP2xp9MabfddltjPjDYcsst1c0332xNdW6lUA3IpCowpLymaswTTzxRN+SJEycKS6PPY445RvOzpa7dcMMN1bzzzmtFK8XeylxzzaUY1WzQL7/8ojVmNoDG4ttTPAnEAkY8VpWfsq2uZZ+AEQMlgQ1CFUqvbNoBUJZGBoYNWTUXHpkAo3///mqBBRaw1pAvvfRSraX57LPPrNTTNttso9q3b28FGK72Mdhr8ZSdBDIBxq+//qqmTp2q/vrrr+zeLEFOP/30kzZZSZCk4qO84/Dhw9Wjjz5a8Zkkf8yYMUOhtLjuuuuSJHPy7DfffKPOO+88rcpnFsCO/EcffeQkr3ozzQQY9X5Jn78dCQS1WqLKZz11/fXX28mggbjkEhgYJB533HGKjT4TojdmA42d9IMPPlidf/756uuvvzZhqX744Qd13333qcGDB6vx48cb8Wq0xNi8CSDCny+++GKjFdeoPJkAA20IRnDsfH/xxRepC8zi+IYbblCrrLKKriBTeyQaLxV8++23qyFDhpR4pl2EP/7442qOOebQoBVN3JFHHlmYDTSsms866yxtVrLiiis2AcnOO++cul4bMaFzYKBuDG4WsgjHZDwNTZ8+XV1++eWKBkiDXm+99dKwKaWhl7viiitKv9u0aaMwlyCfNPTwww+r7bffvpQUFTCbczbUpIyStvaBSgU0+MKaceGFFy6BY5FFFlEYPMalDz74QN1xxx3qoYceUqxdsqSXX35ZYU6E+Q7r3yhyDgx6eBoxjfnzzz/X33fdddeossS+x4YjPNddd93YaWo9+Pbbb2ueTKls0Ouvv65BwYhhQkz3MNtYcMEFrVnsmpQnmHa33XbTMqMu6FDiqs9Jt9RSSymmZlgdtG3bVj399NMl1nfddZee3jLqnnDCCYkv0jE9fvPNN0s8+UKHt+qqq+p2w6Yz6yMsCqK0m86Bseeee2ojONFIrbzyymq55ZZrUuCkP5iO2QYG0zKAVqkHiVtGes1DDz1Ug8KGhS0dC42H3rljx45xi5HJc2KBQF1wPfvss7Hy3W677fQajIeHDh2q0/bu3buUFv8Y4WnyydQ9SKz/1l57bfXKK6/o23Ra8Mc0JkzOgcEeAVMUMVRjWtWuXbtwORL9tg2MQw45RHXu3FmxB2FKeCnSQJjysd7YZZddjNTUzOtZ82y00UZqySWXNC2e1fRhLVUaFbXwYFolJNbTzz33nHrnnXcSX8ieBh/kKbyDnz179tTPRfkJOQcGc26GLJlns1G1zDLLBMuX+DuGjrz4BhtskDhtOIEs5mVEY52Q1m+EBiwdAPmwo045o4bqcDlq/cbsnOlHIxGGkbyfXKwXkhDrJnxNmFUESaZorE/T0MiRI3WZqgEDjSHlBphR5BwYRx11lC6AGPyxIN1qq62iyhLrHugeMGCA5olQ77333tSaLubECIcRjRFj+eWX179ZH6QhLGuZwwox/Zl//vlTL+aFD59MARoNGFdddZWWlwAjqfstU1emVWESYHz77bfhv2L9xjqcMlUCBmtU6rxfv34V+TkHxksvvaQLydqCHp4Cpxly5Q3YIzj33HO1CTYNEcSjZUhDWA9TMViush7golLQuKShBx98UC299NIK1SVTKBpz3Hl3rfzQwMG7kcgEGMzvg0qY4CjtEhhMdbEYp3MVitpCcA4MMmdowzUTk2caY9EJq1/UkTZo1KhR2lJXemWsdoMaHBt5pOWRFhjSox9//PEK7dAee+zRxKzeJTAYJVq2bKmBgZ8R8kTzFaZMgBHO1P+OL4ExY8aoHj16qH333Vftv//++vvzzz8fn4HDJ9MAgx6bxoiP/SyzzKJnEKh6g1opV8BgaoYCg7ylo2GfKcoOzQPDYcMpOus0wEA5wXqThXfwCqrJXQED5QjgCObLd/aKwuSBEZaI/x1bAldeeWWp56UHtjVNdgWM2C+mVH5i12IazoYNNk1RV1LjP9Sz9FyVLlEvJxFmc3sWq1qZkvDJ2sEGeWAkkCKaojPOOEOddtppkdcnn3ySgJvSdkdoj3baaafIK655g2SKuQsVWul6//335dHCfLJvEQQGwSRskAeGDSmm5MFcl1Gj0hXcqIuTBfNUnHYqXbbi7MYpS1bPsCtPzCsBh40NV8rugZFVDfp8nElAzDcEHNhPRS1mpQCDBg3SfjSkC194B0LC0/YGH4aF4TzlN64HQcrt4nvKlCkKrYgNcwsEgsbitddeU2nNEIJCle+sU5KOPJI2L5+s7djtF2DwiZHoAQccoOUZfg/qjWll1MUIBLkaMWgrUflyTywzpLy5BYYEcUtqnyMvHv7cb7/9dOXa8kRjPYRN2IcffhjOqnC/6UzQUGHCHQQI+y5pSICR1i8GCwTKUckkJE6ZcgkMjNckrq6JeYkICKcVqVAbwGBTTvjh59Ec6MYbb9QmK/LefBL/OA3JVAqbNXr5pBcbduRfDRjsX1QbzXMHDGyPMC8RXwBTYBDRfbPNNivNa7HtMiG80RjNsJOicpJqt0zyrldaRscgIJha4T9fa5rL9BVZEfQ7SOz0B/ml/R72xyAPVMzwZ4ZAmFLWHVFrolwBgyEbzQeqUdl1FfOIaugPCj38HVA888wzSo4qCHt9hZ+v9RsbfwJj9+rVS1du0adSrMuCDRe3grjrNI4kIG347A8chxht8KZMc+FfQ/qwcSnmKNhJEckSbeSBBx6o87/77rvLqjVXwOBFML1GcN27d9cvxT3s+dNsyBEbiV6DUYM9DSoJH3BOQ0oDNBxkABrE/gj8AN2TTz5ZJvii3GAdIcCYeeaZS95xtd5vxIgROmgebgi21Ly18qROg05JxOui7LhdhylXwOCcDqIQYjLMYS+8FBXDTngawlcEUHFWBG6j8MPDEKvPpITQqWDSY0692GKLaX4Aj2G7iITH4+KLL67fE9nFDU4xefJk3SGxnuNckrjpbMkQ62dcFhZddNEmwTCC/HMFjGDBBe0sdG2QxMM1Ob4MQzgWdaj+dtxxR91giIgSNYe1UeZ682DaCSDkIghBLWJdwRoRz0mItIyymOmbyL5WvsH/cW7DDwcnMqZzUdFNcgkMGh69MnNTbOmZO5oQC2a8yfDRPuecc0xY6bS43oo3YDXNiHFGdWYgalEBhjT2asVi3k/EEzRPOIiRlp4bR7asZcWGIvkThSVMuQRGEAjB7+GXi/ubHoMei0W9jVisxH+ikjGq4/iyopIErBNgRC1iw++OaQwdGx57qGNJiwaPXe4068Qw/2q/qWeULBLHSmy9uBemXAIj/BL+d30kcM011+iGLcBIanaOYoK0HHVtejhRHAlIPDLOQ8EEBD9/NmGjDFA9MOJI1D8TKQFRmQswkgZDwEWXvQZOeLJ1CFBkQf+7iYIE9TIKHEYJpn7EmooiD4woqfh7sSRgCoxYmdTpIQ+MOgm+CNl6YBShFv07WJeAB4Z1kXqGRZCAaSTCRpaBn0o1cu00eNkk7qwsvk0NOhvpdT0wGqk2clYWsXAWYIhBZ85eI7K4HhiRYvE340hAHIoABsHTbEVfjJO362c8MFxLuKD82almY05GiyWWWMLKMQqNIi4PjEapiRyUA/9uYs1ieBd2Yw2H8s/B61QtYibAQKBvvPGGch1ChrMtsl4AYnqNDU4a/42qNRP6E89FbJGwTq0X4ZUnI0T4U04pqlfZbOebCTDkBNOJEyfaLn8TfpgRZ33qEJG6Cc8fjL3apFCWfmCaTWOsZMJgKZuqbPBhCAOCAMk33XRT1XR5/DMWMHADNCEcfxBo0HvKhF+ltICCY3azJHGYiuvOmbZs+A8QFRyT9rRkar2KVSxnk+A22qdPH3Xttddqi+S05WnkdBWBwdSAnoADUEypf//+GhgSN8iUX6X09NzBE40qPWfzPmcMErHENeF6i+uoCWFFCsCK7GprIp9g2jJgYJqLxSMumfTyOO8QjoToCmkvjhaDFwu3tDzipMMBBpfSOM/aemallVbSJ7RiHmGLZxSfTp066REDn/So/+Pck4AP1AUAwdfZ9RQw2Njy9L0JMJgyhUOhIER/FVMGxJ3l6DZP5RJoAgz+xiNu3LhxSs5aZsRA00PvkvaSAFoE5UrLI046DoNs37690zzC5VhzzTV1YGO8wcL/2fyN6y1rDHwe0vJlTUAnx9QPH/fmEPOqvMnHu1MGjGCysWPHKg4RNCUZwmsF4DLNpx5rDBz7OT3WNRGOx3SNgTspC+csnIJcy8M1/6rAkMxN/aqzUtcSc4o5f5bUrVs3DQzXWinOSwcYJlqpLOWS97xiAcP0JVHtMYSbRvmrVY555plHxzmq9ZzN/zlokQbrGhjkgwzruY9hU26NzisTYGC3v9pqqzmP/E0AtaijaV1WAvGjWNu4Bgaba8R49Vokl7X5P+9MgPF/dsX7xtSGjS/XJiHFk1xjv1EhgeHaJquxq9SXzoYECgUMwmGymYj1p2vCmA+tHVHsODQFI0lPxZFAJsAguh8qW+LN0nhtE7v1rC3atWunF6gHHXSQ7SzK+K2//vp6oU9MJMxQcNQhZKWnYkjAOTAARZs2bRTh3rnYbQ2fW2AqSkJrEllOYqlyPoJrYj/gkUce0dkQhR2NUe/evZ1m+9RTT+lzQaKCEDvNuBkydw6Mvn376kaDxxcXDYgzLVwQke3gnwUwguXnVB7yHT16dPC2te8s8NFIkQeXjfi61gpXUEbOgcGZEbg9CnGeAuYNLog5f9bA+Pjjj3WeHELjinAC2meffTQ4MAuJirXqKu/mytc5MLDSDe5GEx4f+yIXlDUw8N7r0KGDNrNw8T7CU1TBYlrjgSGScffpHBicYcGiWIjRg4WrC+JgSUaMI444wgX7Mp6c0RHUgNleO4UzRMHA+3lghCVj/7dzYMj52cyTOZeAisVExCbRozK/xyEf/hgTckQxG2+uSMJTckwZ83/OeOjataur7DRfWctw/oYntxJwDgzOWUOViWYKn2yciWyfZIqRIwe1YFY9fPhw7Xk4aNAg5cpjECDi6IMbLWsmTgRiVDz11FOd1BZ+MnQqchwaI5NrExQnL5Ijps6BgSwmTJig0E7R4xUlKJepH3ySNsLmIYaKjIZyIU9P7iSQCTDcFb95cJ4+fboaOXKkGjVqlHYa47t3MnJb9x4YbuXruedUAh4YOa04X2y3Esg9MKZMmaKGDRsWebEQZxriyUsgqQRyDwx2nvv16xd5oSVycRooqloCPERdAwcOTFoH/vkGlEDugVEPmU6ePFkHFCCoQPhypSKux3s25zw9MJpz7ft3ryiBQgBjxowZCpNsgsUR7ofNvaxMsxkxXIcFqlh7/g9nEigEMIYMGaI3voYOHaoPU2cTjJiyYnznQnoEj+vSpYvq1auXDvSAOYjtHX0X5fY840mgEMB44YUXFFE0hIieiOmJaTws4Rf1SZRzAi1DnFsBGG0Ep4vKy9/LXgKFAIaIjdAygwcPVm3btlWMIi4pqO1ipAIYBFb2VAwJFAYY06ZN0z04DbR79+6ZrDEw/+bkUlx28ZXwVBwJFAYYVMnUqVN1QOpWrVrpYwxch9EhsiI+Ejhf4WPiI4V4YDSUBNg7CDrv4BvByJGV3wLWw+SHKbqnYkigECMGvXbLli0V0bwnTZqkGymeg6ZHa1WrYhbaWLlCmNIDjJ49e1ZL4v/LkQQKAYzx48dr8wziyPbo0UO7m+LY45I6d+6s1xaYgBBwuWPHjn4q5VLgGfMuBDAylpnODlfdMWPGaK/BESNGZLLYr8d7Ntc8PTCaa80X+L3xrkziYRn1/L9pBrI+pbjhzQAAAABJRU5ErkJggg==)
Use the below number line to compare the following fractions using the symbols <, > or =.
![](data:image/png;base64,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)
MathematicsGrade-3-
MathematicsVideo
Use the below number line to compare the following fractions using the symbols <, > or =.
![](data:image/png;base64,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)
Use the below number line to compare the following fractions using the symbols <, > or =.
![](data:image/png;base64,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)
MathematicsGrade-3-
Mathematics
The fraction closer to whole number 1.
The fraction closer to whole number 1.
MathematicsGrade-3-
Mathematics
The equivalent fraction to whole number 4 is ______.
The equivalent fraction to whole number 4 is ______.
MathematicsGrade-3-