Mathematics
Grade-4-
Easy
Question
In stem and leaf plots, the stem is ordered in ______
- Vertically
- Horizontally
- Leaf
- Descending
The correct answer is: Vertically
In stem and leafs plot , stems are ordered as vertically .
Ex : Stem and leaf plot for 56 , 57 , 89 is Stem Leafs
5 | 6 , 7
8 | 9
Here , 5 and 8 are stems which are ordered vertically .
Related Questions to study
Mathematics
Total number of cars that were sold in all the days was______.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARYAAABmCAYAAAAOGL46AAAK1klEQVR4Ae2dPW4cRxCFeQQdQYAyRzqCbBhQqtSOlNIRrQsIcEYnyp0IjhQK8AUUyIHhRJFDgicwdAON8WQ8sbbUs9zp6Z2p6n4NDOavf6q/qn7T88PlxaQkAiIgAo0JXDSuT9WJgAiIwCRhURCIgAg0JyBhaY5UFYqACEhYFAMiIALNCUhYmiNVhSIgAhIWxYAIiEBzAhKW5khVoQiIgIRFMSACItCcgISlOVJVKAIiIGFRDIiACDQnIGFpjjRHhRcXF9P19fUXYx89enSw/+WENkSggoCEpQJaD0XevHkzQVxubm4+C8rTp0976Jb6EISAhCWII/Yw4/LycsJMhQKzhw1qs08CEpY+/XpSrzBbgahAYJREoCUBCUtLmsnqwu0PRAXi8v79+2TWy9zIBCQskb1zRtvwjAW3QUh4iMvtMzapqgciIGEZyNnsKm+B7CxFb4VIR+sWBCQsLSiqDhEQgQMCEpYDHNoRARFoQUDC0oKi6hABETggIGE5wKEdERCBFgQkLC0oqg4REIEDAhKWAxzzO3gli+89mPhJPPe1FgERuCNwN1LujmlrhgBeyfIr1R4+KkMf9IeIM87W4VUEJCwL8PH7DyswC4qHy8pZl/4QMZxr0hskYVnoQn4Cj8HYQ0J/IJSYvfTSpx78kr0PEpYFHsSXqhiAGIy9/MwAZ2G8xVuAQ1lFYJaAhGUWzdcncGXH7QMSBIbbX+fMc0R/iJjHV5kslbCc6C0/S+HziROLh8yGPkAskfSHiCFdlNYoCUta160znLdA+kPEdRxVukwghLDw6s+Hh3yWwf2y6ToqAiIQlUAIYQEc3Ovzgah9lhEVnOwSARGYJxBGWGAiHohCVCgw82brjAiIQGQCoYSFn83b+/7I8GSbCIhAmUAYYeHDRH6wVTZ3v6PeLr1F2c8Xajk+gTDCgtsf/t0Kboe4HQkhbtVgF0VQD5cjeUe2RCIQQlj81T/qWyHaFVX4IgWWbPmfAC9C9mPKXj6uPObjEMJyzMBo5zCzQmAoicCpBHDhZMzglhpL70kjZIGH+aUqxKWX4ODtHTFoNkYSbdeIGbClwLStPV5tEpYFPkFQ4HaI09se3l7ZjxNxZcUAUGpPgLfRYDxCkrCc6GU/S/HPhU6sJmQ2vvGCcOqB9HlchNkKOI/CWMJynjhKVStnYL3c3kWDb2eCYDzCrFDCEi0Kd7CHszHe6u1gQrdN8hbIzgTB2b4l6rHzEpYevbqgT3wgjSI93d4tQKCsZyAgYTkD1CxV8hbIPoTWW6Es3ottp4Qltn9knQikJBBCWHgfyitn6Uqakq6MFoFBCYQQFrDnK09s42HiKO/7B407dbtzAmGEBZxxf88lInfOpOwT/RGe8Ef0Bb8LoW18s8X9SOsRZ+ShhIVfgdqBGylAYAtmUhATJMyysn/7gQGJhSnLdxZ2sNo3W+xHtPVoM/JQwoIBCwdw4EYLDtqDgYgrZnQ7ae+xtZ2FcbAeyx/pHF+Pww98PhfJPm8LZ+NY957CCAsEBQtS5Gkt7OMA7OU5EGeKCPjIs8XSYISo2BlXKU+UY+ScjXENvxDCQuDsAK+iUa9CGICcWcHWHhKvppn6wosRxCXDYIWdjJtMnGtsDSEsNYbvVQazFF4hESTc3sueFu2yTxCXLLMwzhrRf39hasGkdR0UQdQbfUbeou8SlgUUGcx2lpLlajnXTc4OsS71b67c3sc998iD1QsfmUedkbfwrYSlBcXEdfhZSi+zsMQu6cJ0CUsXblQnRCAWAQlLLH/IGhHogsDmwvLx48dpzXJ7ezutWT58+DCtWd69ezfVLm/fvp3WLK9fv57WLK9evZrWLC9fvpxql6urq2nN8vz586l2efbs2bRmefLkybRmefz48bRmefjw4VS7PHjwYFqzfPr0qUromgkLAg4P1O5bTu3kN9/+VARSC5jl1jgYZW2AfffDLwf79lxpe01wo2ztwGK5Uwb2jz//NisAtaKCcmsEDWXvE9QX138czbNG0GsvJCznL2S//v73oovbmgvpmos4ytamZsJSa8Bcue9f/Dl3KszxDDYuhZW1T5nszmTr0vhhfgkLSVSsewyQrH3KZHcmWyuGxeciEpZactM09RggWfuUye5MttYODwlLLTkJywpy7YtmGqyZbK31lISllpyEZQW59kUzDdZMttZ6SsJSS07CsoJc+6KZBmsmW2s9JWGpJSdhWUGufdFMgzWTrbWekrDUkpOwrCDXvmimwZrJ1lpPhRWWv/75t7ZPm5XLYONSGFn7lMnuTLYujR/mDyssNFBrERCBfAQkLPl8JotFIDwBCUt4F8lAEchHQMKSz2eyWATCE5CwhHeRDBSBfAQkLPl8JotFIDwBCUt4F8U3kL/yv6Wl+N2fnn+MekuW52grjLDw/61gXUoIXgTT3PlSmdpjtKX0o1VZ/j0G+j73a/D4RXv/b0vm8p7CsLWw8FftS/xp917Cgva9XccErsT6FKbZ84QSFjoNQe4TnLmHk9BmJjHx3Er2c2BYzhjM+MX+mtRaWKwNc3XvKSyZ48GyPed2KGHBTKE0EBD0PI61TdjnQMHaDhbUhyDAgGGeY1cXWy+32S73UR512TSXh23C/r2SH5iwH/aCibULrLAwYZv2+/5ydsPzvg3W0WI9Vzfahv20wYsijltfz9Wz1Ebva1ueTGkTznmuNn/P24cjZMee0gEIFh8kdJgPDjgZCxPOw6lMHBwMMJz3dTPv3NoH0n3CwkHHNrlvBW+urXMcp71sHwywkDfbBBfa7Dlh33JGXhxDYv/sedbZYu3bZp3ws/WltQl59hIWG3+ww3Om/b2v70bhzj21DkCQ8GqKYGcA2SBjQHPA0HwbULZOnGcZ5j1lvVRYrI2s39fB41utLU9sgykFBzbYbezb/NgnN6x9Xpwv9RnHW6S5uq2f0Q7ywd9MpfMtxA91oG67MAY9N9jiY5D29b4OKSw2mOygtMcZ7N5B1rneqSzDQPBlS/u2fZwvDSybBzbaoOM2ju+VyIH9px2wDf2BbXZQgiHttmuUR36ct8n6xR5vsT1XN21nGz7ffedZbuna+tqXtbHHc2TP/VHWIYWFA4D30BQCGzzMw3N0mA0o79S5MixbWvtAYh02r81jbbR59tymGIAnbGWi3VhzhohzpQHCMiVhPWef5+q2foZtPh/6AFuZ/HkeX7oms1K5Ejcfg6VyPR4LKSwADQcieOyV1AcH8mBhwnk4l8k7laLgxYj5S+tSIMEuDkSKH9pGYhs2qEv1bn0MNoMN7UT7sB3HcM4y8Ry9rcjPeig01g8+/5p9tFOqGzZYxj4fyjB26JNSPUttQx3suy8rYbkjElZYGLDHggfd4MDgwLnr2tf3twwwO4hs/tJ2KZAoJmiTAWyDjbbjPBfbj1I75z6GQQZbbN/JozTgmJ/2gzOT7R8HU6kO5l+z9oLBumCXZerzsW+0Hz5rYSPqsL6mPViThT3mL272XM/bYYSlZ8jqmwiMRkDCMprH1V8R2ICAhGUDyGpCBEYjIGEZzePqrwhsQEDCsgFkNSECoxGQsIzmcfVXBDYgIGHZALKaEIHRCEhYRvO4+isCGxCQsGwAWU2IwGgEJCyjeVz9FYENCEhYNoCsJkRgNAISltE8rv6KwAYEJCwbQFYTIjAaAQnLaB5Xf0VgAwISlg0gqwkRGI2AhGU0j6u/IrABgf8A7zsWDfn70v8AAAAASUVORK5CYII=)
Total number of cars that were sold in all the days was______.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARYAAABmCAYAAAAOGL46AAAK1klEQVR4Ae2dPW4cRxCFeQQdQYAyRzqCbBhQqtSOlNIRrQsIcEYnyp0IjhQK8AUUyIHhRJFDgicwdAON8WQ8sbbUs9zp6Z2p6n4NDOavf6q/qn7T88PlxaQkAiIgAo0JXDSuT9WJgAiIwCRhURCIgAg0JyBhaY5UFYqACEhYFAMiIALNCUhYmiNVhSIgAhIWxYAIiEBzAhKW5khVoQiIgIRFMSACItCcgISlOVJVKAIiIGFRDIiACDQnIGFpjjRHhRcXF9P19fUXYx89enSw/+WENkSggoCEpQJaD0XevHkzQVxubm4+C8rTp0976Jb6EISAhCWII/Yw4/LycsJMhQKzhw1qs08CEpY+/XpSrzBbgahAYJREoCUBCUtLmsnqwu0PRAXi8v79+2TWy9zIBCQskb1zRtvwjAW3QUh4iMvtMzapqgciIGEZyNnsKm+B7CxFb4VIR+sWBCQsLSiqDhEQgQMCEpYDHNoRARFoQUDC0oKi6hABETggIGE5wKEdERCBFgQkLC0oqg4REIEDAhKWAxzzO3gli+89mPhJPPe1FgERuCNwN1LujmlrhgBeyfIr1R4+KkMf9IeIM87W4VUEJCwL8PH7DyswC4qHy8pZl/4QMZxr0hskYVnoQn4Cj8HYQ0J/IJSYvfTSpx78kr0PEpYFHsSXqhiAGIy9/MwAZ2G8xVuAQ1lFYJaAhGUWzdcncGXH7QMSBIbbX+fMc0R/iJjHV5kslbCc6C0/S+HziROLh8yGPkAskfSHiCFdlNYoCUta160znLdA+kPEdRxVukwghLDw6s+Hh3yWwf2y6ToqAiIQlUAIYQEc3Ovzgah9lhEVnOwSARGYJxBGWGAiHohCVCgw82brjAiIQGQCoYSFn83b+/7I8GSbCIhAmUAYYeHDRH6wVTZ3v6PeLr1F2c8Xajk+gTDCgtsf/t0Kboe4HQkhbtVgF0VQD5cjeUe2RCIQQlj81T/qWyHaFVX4IgWWbPmfAC9C9mPKXj6uPObjEMJyzMBo5zCzQmAoicCpBHDhZMzglhpL70kjZIGH+aUqxKWX4ODtHTFoNkYSbdeIGbClwLStPV5tEpYFPkFQ4HaI09se3l7ZjxNxZcUAUGpPgLfRYDxCkrCc6GU/S/HPhU6sJmQ2vvGCcOqB9HlchNkKOI/CWMJynjhKVStnYL3c3kWDb2eCYDzCrFDCEi0Kd7CHszHe6u1gQrdN8hbIzgTB2b4l6rHzEpYevbqgT3wgjSI93d4tQKCsZyAgYTkD1CxV8hbIPoTWW6Es3ottp4Qltn9knQikJBBCWHgfyitn6Uqakq6MFoFBCYQQFrDnK09s42HiKO/7B407dbtzAmGEBZxxf88lInfOpOwT/RGe8Ef0Bb8LoW18s8X9SOsRZ+ShhIVfgdqBGylAYAtmUhATJMyysn/7gQGJhSnLdxZ2sNo3W+xHtPVoM/JQwoIBCwdw4EYLDtqDgYgrZnQ7ae+xtZ2FcbAeyx/pHF+Pww98PhfJPm8LZ+NY957CCAsEBQtS5Gkt7OMA7OU5EGeKCPjIs8XSYISo2BlXKU+UY+ScjXENvxDCQuDsAK+iUa9CGICcWcHWHhKvppn6wosRxCXDYIWdjJtMnGtsDSEsNYbvVQazFF4hESTc3sueFu2yTxCXLLMwzhrRf39hasGkdR0UQdQbfUbeou8SlgUUGcx2lpLlajnXTc4OsS71b67c3sc998iD1QsfmUedkbfwrYSlBcXEdfhZSi+zsMQu6cJ0CUsXblQnRCAWAQlLLH/IGhHogsDmwvLx48dpzXJ7ezutWT58+DCtWd69ezfVLm/fvp3WLK9fv57WLK9evZrWLC9fvpxql6urq2nN8vz586l2efbs2bRmefLkybRmefz48bRmefjw4VS7PHjwYFqzfPr0qUromgkLAg4P1O5bTu3kN9/+VARSC5jl1jgYZW2AfffDLwf79lxpe01wo2ztwGK5Uwb2jz//NisAtaKCcmsEDWXvE9QX138czbNG0GsvJCznL2S//v73oovbmgvpmos4ytamZsJSa8Bcue9f/Dl3KszxDDYuhZW1T5nszmTr0vhhfgkLSVSsewyQrH3KZHcmWyuGxeciEpZactM09RggWfuUye5MttYODwlLLTkJywpy7YtmGqyZbK31lISllpyEZQW59kUzDdZMttZ6SsJSS07CsoJc+6KZBmsmW2s9JWGpJSdhWUGufdFMgzWTrbWekrDUkpOwrCDXvmimwZrJ1lpPhRWWv/75t7ZPm5XLYONSGFn7lMnuTLYujR/mDyssNFBrERCBfAQkLPl8JotFIDwBCUt4F8lAEchHQMKSz2eyWATCE5CwhHeRDBSBfAQkLPl8JotFIDwBCUt4F8U3kL/yv6Wl+N2fnn+MekuW52grjLDw/61gXUoIXgTT3PlSmdpjtKX0o1VZ/j0G+j73a/D4RXv/b0vm8p7CsLWw8FftS/xp917Cgva9XccErsT6FKbZ84QSFjoNQe4TnLmHk9BmJjHx3Er2c2BYzhjM+MX+mtRaWKwNc3XvKSyZ48GyPed2KGHBTKE0EBD0PI61TdjnQMHaDhbUhyDAgGGeY1cXWy+32S73UR512TSXh23C/r2SH5iwH/aCibULrLAwYZv2+/5ydsPzvg3W0WI9Vzfahv20wYsijltfz9Wz1Ebva1ueTGkTznmuNn/P24cjZMee0gEIFh8kdJgPDjgZCxPOw6lMHBwMMJz3dTPv3NoH0n3CwkHHNrlvBW+urXMcp71sHwywkDfbBBfa7Dlh33JGXhxDYv/sedbZYu3bZp3ws/WltQl59hIWG3+ww3Om/b2v70bhzj21DkCQ8GqKYGcA2SBjQHPA0HwbULZOnGcZ5j1lvVRYrI2s39fB41utLU9sgykFBzbYbezb/NgnN6x9Xpwv9RnHW6S5uq2f0Q7ywd9MpfMtxA91oG67MAY9N9jiY5D29b4OKSw2mOygtMcZ7N5B1rneqSzDQPBlS/u2fZwvDSybBzbaoOM2ju+VyIH9px2wDf2BbXZQgiHttmuUR36ct8n6xR5vsT1XN21nGz7ffedZbuna+tqXtbHHc2TP/VHWIYWFA4D30BQCGzzMw3N0mA0o79S5MixbWvtAYh02r81jbbR59tymGIAnbGWi3VhzhohzpQHCMiVhPWef5+q2foZtPh/6AFuZ/HkeX7oms1K5Ejcfg6VyPR4LKSwADQcieOyV1AcH8mBhwnk4l8k7laLgxYj5S+tSIMEuDkSKH9pGYhs2qEv1bn0MNoMN7UT7sB3HcM4y8Ry9rcjPeig01g8+/5p9tFOqGzZYxj4fyjB26JNSPUttQx3suy8rYbkjElZYGLDHggfd4MDgwLnr2tf3twwwO4hs/tJ2KZAoJmiTAWyDjbbjPBfbj1I75z6GQQZbbN/JozTgmJ/2gzOT7R8HU6kO5l+z9oLBumCXZerzsW+0Hz5rYSPqsL6mPViThT3mL272XM/bYYSlZ8jqmwiMRkDCMprH1V8R2ICAhGUDyGpCBEYjIGEZzePqrwhsQEDCsgFkNSECoxGQsIzmcfVXBDYgIGHZALKaEIHRCEhYRvO4+isCGxCQsGwAWU2IwGgEJCyjeVz9FYENCEhYNoCsJkRgNAISltE8rv6KwAYEJCwbQFYTIjAaAQnLaB5Xf0VgAwISlg0gqwkRGI2AhGU0j6u/IrABgf8A7zsWDfn70v8AAAAASUVORK5CYII=)
MathematicsGrade-4-
Mathematics
The range of 5, 3, 9, 7, 2, 4 is________.
The range of 5, 3, 9, 7, 2, 4 is________.
MathematicsGrade-4-
Mathematics
The mode of 6, 3, 9, 5, 7, 2, 5, 5, 3 is_________.
The mode of 6, 3, 9, 5, 7, 2, 5, 5, 3 is_________.
MathematicsGrade-4-
Mathematics
The median of 9, 3, 8, 5, 2, 9 is __________.
The median of 9, 3, 8, 5, 2, 9 is __________.
MathematicsGrade-4-
Mathematics
The mean of 8, 3, 6, 9, 7, 9 is_______.
The mean of 8, 3, 6, 9, 7, 9 is_______.
MathematicsGrade-4-
Mathematics
Make stem and leaf plot from the given data
99, 87, 60, 85, 55, 55
Make stem and leaf plot from the given data
99, 87, 60, 85, 55, 55
MathematicsGrade-4-
Mathematics
From a bag of 2 red, 3 blue and 2 black balls, a ball is picked out at random. the probability to get the red ball is
From a bag of 2 red, 3 blue and 2 black balls, a ball is picked out at random. the probability to get the red ball is
MathematicsGrade-4-
Mathematics
Tossing a coin is ___ event.
Tossing a coin is ___ event.
MathematicsGrade-4-
Mathematics
When a coin is tossed thrice, the probability of an event of head appearing twice is _____.
When a coin is tossed thrice, the probability of an event of head appearing twice is _____.
MathematicsGrade-4-
Mathematics
The probability of getting the sum of 10 when two fair dice are tossed is
The probability of getting the sum of 10 when two fair dice are tossed is
MathematicsGrade-4-
Mathematics
Count the numbers of cars sold on Saturday and Sunday.
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)
Count the numbers of cars sold on Saturday and Sunday.
![](data:image/png;base64,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)
MathematicsGrade-4-
Mathematics
The range of 81, 83, 77, 91, 83 is
The range of 81, 83, 77, 91, 83 is
MathematicsGrade-4-
Mathematics
The mode of 83, 77, 81, 85, 77, 83, 77, 91, 81, 77 is
The mode of 83, 77, 81, 85, 77, 83, 77, 91, 81, 77 is
MathematicsGrade-4-
Mathematics
The median of 14, 7, 4, 8, 12, 4, 2 is____.
The median of 14, 7, 4, 8, 12, 4, 2 is____.
MathematicsGrade-4-
Mathematics
The mean of 61, 57, 49, 60, 45 is____.
The mean of 61, 57, 49, 60, 45 is____.
MathematicsGrade-4-