Question
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the interquartile range of the box plot?
- 3
- 2
- 5
- 6
Hint:
A boxplot is a way to show a five number summary in a chart. The main part of the chart (the “box”) shows where the middle portion of the data is: the interquartile range. At the ends of the box, you” find the first quartile (the 25% mark) and the third quartile (the 75% mark). The far left of the chart (at the end of the left “whisker”) is the minimum (the smallest number in the set) and the far right is the maximum (the largest number in the set). Finally, the median is represented by a vertical bar in the center of the box.
The correct answer is: 6
Here, we have to find the interquartile range of the box plot.
Here, Q1 = 29 and Q3 = 35.
So, IQR = Q3 - Q1
= 35 - 29
= 6.
The interquartile range or IQR is the range of the middle half of a set of data. It is the difference between the upper quartile and the lower quartile.
Related Questions to study
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the maximum value of the box plot?
The maximum (the largest number in the data set), shown at the far right of the box.
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the maximum value of the box plot?
The maximum (the largest number in the data set), shown at the far right of the box.
Answer the following with the help of the box plot:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAaEAAADRCAYAAABl/Q23AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADy1SURBVHhe7d0HWFRX2gfwbHY3u9l8u9mSsvmSTS8mcY2pGtONUWPv3YiKKAKKWBAVEBApFhClSJGiIKgUEWkqHUF67733DgMM8P/umbmUKNn9Qhtg3t/znCe7dy7XmTPvnP89d+698xgIIYQQCaEQIoQQIjEUQoQQQiSGQogQQojEUAgRQgiRGAohQgghEkMhRAghRGIohAghhEgMhRAhhBCJoRAihBAiMRRChBBCJIZCiBBCiMRQCBFCCJEYCiFCCCESQyFECCFEYiiECCGESAyFECGEEImhECKEECIxFEKEEEIkhkKIEEKIxFAIEUIIkRgKIUIIIRJDIUQIIURiKIQIIYRIDIUQIYQQiaEQIoQQIjEUQoQQQiSGQogQQojEUAgRQgiRGAohQgghEkMhRAghRGIohIhISkoK/P39qVETtcDAQLS2tvLVQcjooRCSckKhEOXl5Vi3bh3+/ve/4y9/+YvUNvb6n3nmGVH761//Oug60tDYa3/11Vfh6uoKgUDAVwoho4NCSMolJCRg7dq1eOqpp/DYY49Ro9bXpk+fDnNzc75SCBkdFEJSzsfHB48//rho0Jk2bRqUlJSksikqKuK9994T9cOTTz6JlStXDrqeNLRly5bh97//vagvtmzZwlcKIaODQkjK3blzR3QIhg04bCCWZrKysqJ+eO655xAeHs4vlT4BAQF9NSEvL88vJWR0UAhJubt374q+A2ADjrKyMr9UOu3cuVPUD88//zxiYmL4pdInLCwMTz/9tKgvFBQU+KWEjA4KISk3MISkecDp7u7G9u3bRf3AZkKhoaH8I9KH1UTvTIhCiIw2CiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIylcRtCDQ0NKCgoQGpqKpKSkkT/zcvLQ21tLXp6evi1yHBRCIlRCPWjEAKam5tRVFSEtLQ00fiTkpKCnJwcVFdXo6uri1+LjIRxGULZ2dkwNzfHxo0b8cknn+Cdd97Bhx9+iNWrV8PIyAjJycn8mmS4KITEKIT6SXsIlZSUwMHBQfRz7zNnzhSNP9OmTcPixYuhq6uLBw8eQCgU8muT4RpXIcQGAvbTwoqKipg6dSr+9Kc/iT4Ive2JJ54QFcTWrVtx584dtLe3839JhopCSIxCqJ80h1BCQgKOHDmCjz76qO8nznvb448/jtdee020M+zq6orGxkb+r8hwjJsQYnsWbMrLAubhN//h9sc//hErV65EREQEOjo6+C2QoaAQEqMQ6ieNIcTe/8LCQhw8eBD//Oc/+8aawdpvfvMbzJ49G97e3mhra+O3QIZq3IRQaWkpDAwM8MILLwz6xj/c2MCppqYmOm5Lhi4kJAR/+9vfRH1KIUQhxAwMoT179vBLJ7eWlhZYW1tjypQpfWPMf2q///3vIScnh8TERH4LZKjGTQixwXDevHmivYzB3vTB2ueffw5/f39+C2Qo2OFPCiEKoYEGhpCysjK/dHJjJx1s2LABf/jDH/rGl//W3n33XdjZ2fFbIEM1bkLI0dERzz///KBv9i819kFZtmwZtLW1qQ2xycjIiA5vsv6kEKIQYlgI9e6YzJgxY9C6mWxtx44deOmll/rGlv9PY58bVVVVvtfIUI2bELp48eKvmgVRG/lGIUQhxLAQevbZZx+pD2qPNnZIji4ZGZ5xE0JWVlb43e9+N+gbTW1sGoUQhRDDQuiZZ555pD6oPdrk5eUphIZp3ISQi4sLXn755UHf6F9qbG9t165dcHJyojbExk5H7T0VnkKIQohhIdR7xuTcuXMHrZvJ1rS0tESXf/yaozF//vOfoa6uzvcaGapxE0LsArAVK1aIzsUf7A0frM2ZM0d0mjYZuqioKDoxgUMh1G/giQn79+/nl05u5eXlokNrTz75ZN/48t8au5aI7TyT4Rk3IcRuh2FhYYE333xz0Df84cZO5WandLPiIUMXGBhI1wlxKIT6DQwhJSUlfunk1traiuvXr4vu0NI7xvynxmZB7JqirKwsfgtkqMZNCLFBgN0rjr2xL7744qBvfG/7xz/+gZ07d4oubqX7OA3PwEMvFEIUQszAEJKWmmDf67AdYX19fbz99tt9Y81g7amnnhLdNSE8PBydnZ38FshQjZsQ6sWChd2f6euvv8bf//73n735bO+D3cuJfY8RGxtLATQCKITEKIT6SWMI9crNzYWJiYnou7CH75zAriGaPn26aHYYHBxMd0sYIeMuhJjKykq4ubmJzsFn3xOxi1jZ9UD79u0TfYlYXFzMr0mGi0JIjEKonzSHEMPuCefr6wtNTU2sWbNGNP6wm5fu3r0bNjY2dAhuhI3LEGLYPeGamppEP91QU1Mj+i8rDrpp6ciiEBKjEOon7SHEsHtZsp9zqKur6xt/2M/LCAQCfg0yUsZtCJGxQSEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISlHISRGIdSPQoiMJQohKUchJEYh1I9CiIwlCiEpRyEkRiHUj0KIjCUKISk3MIRUVFT4pdJJXl5e1A/PP/88EhIS+KXSJzIyEk8//TSFEBkTFEJSzt/fH0899ZRowJGVlRX9kqQ0NvbrmZs3bxb1w7PPPgtvb+9B15OG5uHhgT//+c+ivti5cydfKYSMDgohKcd+S/+Pf/yjaMB5+eWXsWDBAqlsP/74I1566SVRPzzxxBOYOXPmoOtJQ/vss8/w29/+VtQX27Zt4yuFkNFBISTlsrKyoKqqimeeeUY06FCj1tvmz5+PGzdu8JVCyOigECJob2+HsrIypk2bhqlTp0ptY6//gw8+EP333//+96DrSENjr33WrFkICQnhK4SQ0UMhREQqKipEsyJq1FjLycmBUCjkq4OQ0UMhRAghRGIohAghhEgMhRAhhBCJoRAihBAiMRRChBBCJIZCiBBCiMRQCBFCCJEYCiFCCCESQyFECCFEYiiECCGESAyFECGEEImhECKEECIxFEKEEEIkhkKIEEKIxFAIEUIIkRgKIUIIIRJDIUQIIURixn0I9fT09DVpR30hRv3Qj/pCjPqh30Tri3EdQs3NzTh79iy2b9+O48ePo6qqin9E+oSHh4v6gTVvb29+qfRhNXH69GmqCU5YWFhfTfj4+PBLpc/AmtDS0qKamGA1Ma5DqLq6Gp9//jkee+wxvP7668jOzuYfGb6SkhJER0cjPT0dra2t/NLhq6ysRGxsLJKTk9HQ0MAvHT5LS0tRP7DGBt+R0tLSgrS0NFFflJaW8kuHr729HVlZWXjw4AEKCgrQ1dXFPzI8rCZmzJgxajURFRU1YWrC3Ny8rya0tbX5pcM3kWvizTffpJoYhZoYTeM6hGpqajB79mxRh06dOhU5OTn8I8PDpqmXLl3CkiVLsGfPHtEHY6R4eHhg1apV2LJli+jDNlLY8+0trpMnT/JLhy81NRUKCgpYunQpLl++zC8dPjZ4qampYeHChTA2NkZbWxv/yPCwmvj2229HrSYWL148ajUhIyMzojVhbW3dVxP6+vr80uFjNSEvLz9qNbFo0aJRq4lp06aNWk2MZLhNtJoYTeM+hObOnSvq0OnTpyMvL49/ZPiUlJTw5JNPivacIiMj+aXDx974p556Ck8//TTc3Nz4pcNnb2/fV1wGBgb80uELDg7Gyy+/LOqLAwcO8EuHLzMzE5999hn++Mc/Yt26daJDJiOhtrYWc+bMoZrg2Nra9tXEqVOn+KXDx2riX//614SsiY8++mjUaoLNiEbKWNSEoaEhv3R8mzAh9Mknn6C+vp5/ZPjk5ORE2/3rX/+KxMREfunwsVlKbxHcunWLXzp8rq6ufds9f/48v3T42F4Y+5Cx7e7du5dfOnxsr/ett94SbZftSY6kBQsWiLYr7TVx/fr1vu2ampryS4eP1cQf/vAH0XYnWk2wkButmmCHzkbKWNQEhdAIGBhCrHhdXFwQGho67Mb29NhhIrZdVlzsAzzYekNp27Zt6ysC9t3NYOsMpR05cqRvu7t27Rp0naE0dljkf/7nf0TbXb58+aDrDKWxwzivvPKKaLuzZs2Cr6/voOv92ubl5SUKH7Zdaa8Jdmird7u7d+8edJ2hNFYTf/rTn0TbnWg18fbbb49aTZiZmQ263lDaWNQEhdAIYCE0b948UYf+7ne/w9///nc8++yzw27PPPOM6JAA2+7jjz8uKrDB1htK6/3wsvaXv/xl0HWG0v785z/3bZdN4wdbZyiNHQ74zW9+I9oumxENts5Q2t/+9jf89re/FW33iSeeEPX5YOv92vaPf/xDtD22XaoJqgnWqCb628CaoBAaAQNDiBo1atSo/f8bhdAIGBhCbG9n7dq12LFjx7CbrKws3nnnHdF22Z4eOz492HpDaR9//HFfEbAz+wZbZyjtm2++6dsuO+492DpDaexYeu9e5HvvvTfoOkNp7MwftufItstOfGBnCw623q9tmzdvxosvvijarrTXxNdff923XaoJcU2w2cto1QQ7m3aw9YbSxqImKIRGwMDvhNiZUOzUy94rgYfT2PUJ7NRItl02dWfHfgdbbyhNXV29rwicnJwGXWcobeBZL3p6eoOuM5Tm7+/f950Q+65psHWG0tiXuL1fQrNBjV0LMdh6v7axa0IGnh0nzTVhY2PTt112xuRg6wylsZroPVw00WqCnR03WjXBvnMZbL2htLGoCQqhETAwhFhxVVRU8I8MX+9ZL2zPKSYmhl86fLq6un1F4O7uzi8dPmdn577tGhkZ8UuHj11hzY5Js+2yayFGSn5+PqZMmSLaLrvepLu7m39keAQCQd/sWNprgg1evds9d+4cv3T4WE307phMtJpgJyiMVk3ExcXxS4dvLGqCQmgEPDwTys3N5R8ZHlb8GhoaojN12GEuduXySGFn0LBrCtiFlCN52ww7O7u+4hrJi9DY9TDsTKVXX31V9MEYKWxvlB2+eOmll6CoqDhi14Swmhg4ExrpmmCHiSZKTQy8gHkkBxxWEzNnzhy1mmDXII1WTbAdk9Gqifj4eP6R4ZtoNTGaxnUIsWk2GyBZh47kLVrYtDUoKEg0mLOLQMvLy/lHho/tQbP73VlYWIg+dCNltG7bw25Lwg71scM57HDDSKmrqxPN3tggxj5kHR0d/CPDw2qCDZBUExBtr7cmRvIWLaNdE+wamdGqCTawj1ZNjOQMa6LVxGga1yHEroReuXKl6Hgs2xNh0/mR0tnZKbptCLuf1UgdFmCEQuGobPfq1auifmCNXccxUthzZM+VPWf23EcK+wCzQYbdb4v19UhhNcGuXaGaABwdHftqwsTEhF86fBO5Jtjte6gmRr4mRtO4DiFWAGyPgV3Udv/+fdGbJq3Y1easH1gbyduSTDSsJtiNNakmxDOW3poYyYF3oqGa6DcRa2JchxAhhJDJjUKIEEKIxFAIEUIIkRgKIUIIIRJDIUQIIURiKIQIIYRIDIUQIYQQiaEQIoQQIjEUQoQQQiSGQogQQojEUAgRQgiRmPERQo05yI/2xA3Hy7C0vgG3B3koGHh/wx4hunt60MP/3z7VuSgrKUFpGzByt1mUoK5mtBaEIczHGTaWDrBzC8H9MgEE/MN9WkpQkR6EgMB78Pe5jXsRSUgo78bI3QZR8rorUpAbHQC/O0Hw8/RCYEI2ch/piF7tENRXIi+vDs0tk6IS+rXXojE9BJGhIfDx8sHde8F4UNaGX/4RBPYpaUJlfgGSowpR2zQyd6oeDx6picScn9dEaymaKrOQWtODOn7R5CdAS20pUrgxs7ikEV38UhFBKaozQnD3zj34ed9GQFQykqq5fuQfHi8kHEJcd3Q1oSjyOq6e2ovdP63FgvkrsUTuHM5756Na0CPusO5GtJRnID4wGg/uJyAhIQExoX7wtrPCDf9IRNdzn9VHEmqi6UBbeTLuO+tB/8A2LF+wBPOWKUD+9F2EZrdwwyzD+qsF1Sm+8LLXg56hAU5oHMXJ02aw9ElCfl3nxO+H7k50Nxcj1ccKdsb6OKF7GtoqslBWO43zXrmobO0Rf9B62tHRWI2SggLkp3vBw/MqdC4nIKNkEt28srMZNRmB8LM5iTNnTKB5+CCOKSvgkIkfgjJa0Dboe92NnsYAXLe4gH2qXojKb+SXT2CimigapCbOiGuC6whRTVQGIfW2AZRM3GF0IwJREaEICw1FSGg4wsPuIyYhE8X13GdEtNFJojMZcb6W2LfnCpzvFkC8784VRlcryuJv4Ya5FjS19aF97Ci0T12A2e0kFDUKx9VOu2RDqKca7WX34HDlJi46PUBachRi71lAc+EGrJt3AtbRDRD/gkcZSoMuQP3rzzFjyvt4//338d6/P8bsTfo4x3V8MdejE3sWwBVNeyLiwz1w2uIO7gQlID7WG256B/DT9J+wT+8uwlq51bq5/d9SP9zycoeJezySs/ORl5ONzDv28HfQh2N0CZJH5nfCJKelEPUPrKFjZAmNy7HIzuNmQIkOOLdmLXbMPw772FZxTQgLURJ2DYZHNXFIfjHm7ZXHdKMIhJZMlj1/riaK/eB/1QgKZ27B/X4ucrLuI8hCFXs+Xo8jevcQ2SJa6+e4nZTaoGNQktuADxQ94F8w0QuCI6oJq0drYpW4Jhxi21DJ1qsJQsi5dXj3vXfxwmtT8O6UKaJfcp0y5V2ufYzvlmvBOqoBVaKNTg6d6faw0liJKesvwOBOKV8P3Hte6IWL5ubYc9oLD1LzkJudze3gmsP+pAauxxYjbxylkGRDqD4ZlQFHccrBFw59P1pYiAfqi7F61pf47mICQmvZslwUBJzBnvnL8f2X87Fs1Tps2q0OQ6coRJd28Ok/kfWgM9MKvi76OO5eg1xucGHao6xgNOctfLpFG4cTutDdVo6uB9qwc3XFxRTxOiLld5HpoYmDbim4mf/IsDSxNCYg/4oMvv5yO77ZHwnxzejTcW/Dt9j43DfY5VSAZDbZ6apBfVYUvLm+uHZyPZYrb8Y/z9yHX9HErwYx7n1MOYezO5fg5W/O41xok2hpXcBp6D77CpatNoJV3sM7X1zH1EUgSHctPv1iGV7edxv+k2FmyNVEnsOWR2ri7rqvRTUh78zNnNm+R0kQwi7IYfXG5Zi/ajVWcm3NqiVYv2wGps78EZ9tuATP9FaIe3KiY0dFcpDjfBBb5n6P/1llBt1Q/kf3BMWo9ZHFIR1N7HKpBtt/ZboSnOBruAmKjmHwLhk/KSTREBLkRCDRTAmOfiEI6auMLtR5bYTyttfwj4MecEhnE+0MFCVcx5lL4XD1TUNRRQ0aJtOh/54OVNw0hLelLlyyhSjlX1tPiQ8CdP+FtzfJYJ5LA1qaStB1TwUnz+pBxacSxb15UxWI7Nu6ULmRDLfciT0nhCAbJT4a2DpfHqv2+CGW64se7v0P2/Iltj//CWSsMxD38CiSaIyTpxXwhtF9+BZMnu9AUHgNl9V2YPb3hjDyKxUNntVcCBm/+ByWLtPFuTT2aenXJahA430zuGluwUc/7sVbKrdxt4Tfo5nIuJoovq3+SE2EbJ4lqolttjlIaAc6UoIQ4XgOblFRCMvi9v7zi5CbkYC4a1yIX7wOU26Ptn7iH7cX6enuRFumBx6c34l1K3fgb+tsYBhaKn6sLgkJxh9D5fgeHAvpRENvkeS74s5FGXyhcRVG9+v5hZIn0RCqSwqC/xFl2HrcRaSgm59KAg2+P0FV5iW8sNsJlslsUElHcZIrTF2ScC+mDk1NTWhuaQP3J5NDdz1SrAxw5cRJuOY1ory3aMruIlTvX/hg5VrMvVSGOkEteuKMoCC7Bu9sPguzsEpUtLSiLdENDxyPwzIsH1Hjp7aGpqcZHbUpiAxOQGRCAzfIcm9yaxCurvsB699bBW2vMuQ+nDOxZ3Di1O7JF0KdxShMjcW9wFwU1bJir0aeuxb2v/4htuyyxU1uzOkfUoVoKMhAjK0Foq6q46fjeqIQ8i+YBPv9rCZqkh+pCcc1c0Q1oeNdiQJuUUNqEmJ9/ZDd0Ahx9HajvSoH4VYu8PZ5gCzuczUwtCeuLgibK5F0wwVxdpowuKCDl+Qu4+S9EtGjHeVB8FF5G9sUdkE9tAMNveNkgTu8zm3AmzLnoHq76KFZtORINIQakl1wTf4jrFDSgFZwNTuYwGlBvt0K7F36Bj7W8MbNPNZV2SiNtYWhnhlO6NnDxvQCLpqZ4uK9NKSIDtdNcD0VSDHfjIPrZmONWQiCy8RTofacG/DY/QJmrduB7R616OjmljdFwkVrLb58Yyqmfr4LyscNYWpnj0s3QpBc1oamCf8pY8NqN9ivSosH2AZ0xhlDZet2zJF3gF9R28+/kO/hVow6BW3DSRhCXD9093B90fue1gYjwFwR3yw5AjWnRJQNfKmCZOQl3MPlq5HICbCBtpEe3lbxgm/+ZDj4xN5wbuB9qCb2bpUV1YR/kfgM0o6mZjRU16GvWxpyUB/lhOu3YhCc89CZYxOZsAQthffgfP0Bor1d4XmV2+Hg+kHnjngm1FrgAYfFr2HVSnlohHWgsffzUugOz9Pr8OoqAyi75fb3k4RJNIQ68j0RqPMJvtq4D1udKtDOslnwAM4KS7Hsi9VQ8cxBFvtetTsTRTEO0NO3xulzN3DDyQlO1oY4cfQMHNzikN860U/RbkTVzR04vPULfHTwNjyyWdXUocj/FFRmfo7lyuZwzOv9rqMbreHGuPDjv/D0Y0/gsSefxRtLDmCPc0X/DGpSqEN1ZjC8LhnDaN8OyJx0xOn4Fn4Pd4BJHUKMED1NmUi46wp7bWUc3H8Ycs4ZCOvbvRVrTPJFlNd1uCVVcTMCN5zS1xKFkM+kCKFeD9WEntPgNSHSipqEOwgyNYFnXAnyJtEpcYLSFOR42cAlsgCFOVEIvKKDd3baQ/tOmejxlixHWE5/BUu+VYBGOBdCoqWcEg946azG69PVIWeZhvGy/y7ZExMac1Eeag5jBy/Yx3AR1FmGWt8TOLBEDmvkbiCwtFN8jUxPKWqK4+EbUYxM/guTzqpo+KsswuGDOriQKkTjeJlbDlF39i3cuWGBk25ZSK7rgaD8Nm6ry2LJnBPQvZoG8USbe5HCOtSm+cL3/AHsXj0H0994Ds+/9DG+32mL65n1aJ4sQdRVgJzgSzh9YA/kdh7C8XO3EZRciTquIH72Eid9CLWgvZQbeM21sGebPBQPm8DOKx3ZVa38kQNWE5VIuOWLmy4hyGlpAMpdoXNCC2/tm2Qh9FBNaJ33HrwmmI4UhHtfg66OLx5k1Q04bDnBdTeiOOY+bll7IbKoCj3tkfB30MFbOwaG0BXYfPQKls3mQuj+gBAqu4nbGqvw+iuq2GaczJ95LHmSDaFuIbrbG1Hf1IZGAdfyvHBt11qo7DkPq9hWNPVWTk8nhB1taGrrhrB3WUsO0kw/xjrFVVjuUoLiif79q5AbVFqaUNsiREdnEeJtj+DkGhkcsUvCg2pub5it01kLYYYLrl2/BtPbWcjJTkHyrZNQ+/4NfPbGDCw7HYDActHWJgEhOpurUV6Ui4Isfzgf3o+jMrq4GFaDn50AN+lDiNPVjIaqUhTmJ+KBhzlOrVHAcSM/3GNXZHZxIVN4C76+QXCMFqC9i+uP8mvQ0tXGmyre8CucBCcm9HmoJlR/qSa4SEp3wFVbQ8jYpCOmdBIdIigPRlKwJ6zv1SKHDZDtYfC/rIM35Rygc08cK20F13B56atYtWo31Acejityxy39tXj9hxNQcsr+hRnk2JNsCA1UEon4y6rcnos57INyIM50sc6yFGTc94JXVB6ya8QzIbTkIefKh1iwcRam6UQioXayFFo7GsNNcUXvMHQvBiCqUth3x4T2mkykXtSChYULrhfzC3vKkO+pibPbf8Ss7dY4H1I1eY599ylDrMEKbPjsE8zSugevogHHVqQhhAYQpDjAdOFb+GTJAewNrERFYxWK/F0QHJ6AVP6jgSp3nDTUx9uH7iKQq5/JqQwx+ssHr4nuZlR5yuKs9mrIuBZwYwO/fILrQQdKQrwQcdsHkc387K/zAYJcDPDWbmfoh4nvE9FV7gv3Xa9jo+wuHAtp/9mJCbfOrserG05D5Wb+uBknxkcINWUi3dcUF01M4JzUgN7xVfyNbBcaws/ARvV7LDjuCqdEfkhuzUW23QeYv/ZzTNOOQPxkCCFhHdrz/HDLQgdm1+/hfu+RlG722rg9mvx4eCqdgPMlH6RzS/qHl3wURthAQdYKZi7pj97mZwLpqs9EfqgDrtwKxK20Rv7q9ibkX1mJzd8+hz+tNYdp3IC7AEzaEGpDc4Y3Ar0cYRuUh0z+PFtB7g1c2/1P/O/ny/CDWSQSsyPhqmcM89MXcSskAAEBfghyOgoZ2S14YcVJ6DkFIqmwBvUT+HA1q4m8UPtHa+LyisFroqsI0XpfQWPzVzjqU47s3gtlJjQhelqz4HfBHMZHTuPG3bu4FxSAoJtnYai2Bf+7UBWb9dwQnVmJosJIBGpNhaKqPDcTEg4IIQ/cNv0JUxUtoXW3YtwcopR8CLH7pT2wxnX7CzDwzUeeqJa60Fxfg8KcGrQJ2lEbeAQXdk/Fd9ruuJIh+iugOQXRhh9iuexqLHcunviH49CNrrJIpHvoweCKH1xT2tjRfk4rSvMqUFNTh6bCZNw9rAtHu9tI+NmgUonKLG8YqbnD3TOP/65gYmpNd8R1pdfxwUoFbLpWzl9o14wcmxXY8sWL+N+tdrBLfuh7jriz0D2jhDfPR+NuyQQebX+mCjm2K7Fj6VS8d8gb7oXiIaMz9xquyvwv3vx6A9ZYhyM9zQeXDXRxSF4FahrqUNc4DK3d8/DVN5/i6U83Yv1eIziHZaGAy+rxMuj8Wqwmrim+9mhNWC0bpCZ60NMWDXeZj7Hnm/kwCm1GySTYPxVdiFwbidsXz+KwnAoOqx3BUU0N6Oxfg3WLP8bTHy3GF2uPwdIrGXEFmUi7vBhHdA/igN+Ai3PTnXHr3GYsPnsb9qIrvscHCYdQPYSlQXAzOw99A0e4BSciMTUFman34OnviwtOacgq6UBnuisi7dRhFJyLKFFICdFeeAeXtyyF0h4DWOd0onmijz0dGUgPuAJjrQswd7yH0IQMZKVFIjbOB2aOIbgZVo+OqjwUOhyEhZUNHDK5vWL+T9EQj7xwG5y8FAXv+FY+vCam5nQ33DzwAZbv04ZWSDs/cBYi6uQyyH35OZafe4CQioGjCrdG7BnonFbA69xjd4onxYjDvaxGbqa/GWrbvsEK82hEVosXNyRegsWidzBvkyZ0uJpoaqlCaX4u0pJTkZqahrSUGKReVcCWLcvwr58sYBWQipJabkdvoiYQh9WExyA18eDE0kFqogNdFd6wmD8F66YvhFFYK8om8Gvvx72+jjpUl+QjIyUNqSkpSE1PR6afIU7tX4gXlh+H4qVwFFQ0oUFQhbbY0ziufwqyFhmo5r8vq7xrCsdD66DuloCw2vHTKRINoY6qYESdm4sfP/oEb0/5Fgvn/YB5c2dj7pxPMHP5Zqw7l4i4Mm5I5T5ojWmBCPJ2gqOrHaytL8HyxAlo7jfDFS/uQ8bt5U3soacZVWGaMNz4EV575Qt8OWs2Fi/4AXPmfIlvZn+KWQoWMAriPnztTRDmeyHg2jmcMrHFeTsnXL5yCU62ZrBxdMeNRG7vuYHf5ATVWZeLvHtnYGmiDUOzy7jq5Ax7Cx1oKcrjmJYNPNMbUcM+VNwHsrkoDmEBHriusxQLfpiGx+ccgJKJK25FZyOlohOdEzmNe7rQkO6Juw7HoH/WBJaXXeBgcxEXtJWhKn8E565HIfGRW0W3oSY5GPeNFmHOVx/gD9+o48S1EKSW14sOx03UsZjVRO7d04PUxO6f14SIgAshT5h//yHWvL8GZ1gI8Y9MNq1FGUi5ogSVle/ht9O3Y81JD0TnFKOiqwNozETITQfoGZyD1eXruHrZARfPnoSR8SUEZdWjehx9NiQaQoLiAAQazIfM/M8xa9ZMzJwxAzNEbSZ+2KQEvbslKOR394WNeUh1PwPr88dx9KgudA6fh0NwPvIHnhUzYdWh2E8TRltn4usvPsfnM2fy/cC1z7/CltOu8C7kV+W0pPjBx1wbaicMoKurDn0TO1j4l6B6Ih+H68MNle35SPaxhN1ZbejpG0LroCpOmHvAO0vQf59AQQXqMwLg4XIRZzVksWPdUsxbqQQlHTNY+sXjfkEHOiZyCIm0ojbrHnwsdWF85jS0jx2DloYBzPyykfPQEUmmvZ7dfdwRTrpbsX3DSvy4/giOn3fBnYwSsBPEJu6EgHvmgkFqwuLmz2tCRIietkQE6+nA/OBFeGd3YKLfRGQw3Z31KIy8A2+TfTgstwzzudrfrX4RrhEp4LpE/H1xRTTivS7g9GljGJzQgbGdG1yTmzDefu1EoiHUI2xFa20JKkqLUFxUiMLCQhQUiFtJeRXqBV39p2Rze4adzbVoqKtGVVUNaqoa0NzB/9TDhMe9zpYa1FUUoaS4CEWifigQ9UNhYREq61vQNnCqJ2xDWwPXD9U1qK6pQk1dIxraJkdPiPVwL7ERTdx7XVPDvcbKKtQ2CiAYOIr2CNHV0YqmxnrU1lSisrwc5WXcf2vqUN8iQFvnIL8/NRF1tUPQyNVGbS2qq6q497seje2D131PVyfamxvRWMv1QwXXHxVc/3G10dIh7P8cTViD1ETTQzUhwi3o4fqhgRsf6prRxr3wyfTJ6MPGw7YW7jVyNVHJvdfceFnF1UZTWzu4YVFc+z0dXJ9xnw+udmqqq1HX1IqWcXjISPInJhBCCJFaFEKEEEIkhkKIEEKIxFAIEUIIkRgKIUIIIRJDIUQIIURiKIQIIYRIDIUQIYQQiaEQIoQQIjEUQoQQQiSGQogQQojEUAgRQgiRGAohQgghEkMhRAghRGIohAghhEgMhRCRKt2CZrQ1NqCxVTgKv7zaCXSUICM1FwlptRB0Tfgf8RHpETShOS8OxWXlqORe4uR4VWS8oBAiQ9SBjvpC5IRHIz2xGNXt3ADPP9KvE63FSchPiUVmddugP6jV3VqMqvwwxGYXoID9BvV/090OQUkkHgQE4HZwEUqau37VoNiaeRuxgQ64nVyF0hZ+4S/qRk93F7qF7L/8ov+ksxTNSedhZeMIs9vlaOqcJCHUVIyau+dg6+YD+5SOQX5IjpChoxAiQ1SP2lg7GH/3NeQ2GeJyJvsx6of05CP6zGqoLP8BOxySEF/HL+/Tg/qo83A++CHW6NjAJvHnP9Q8qM5aVHhth+Li7zFzzVXcLmjBr/mxyEo/OVid/AZKN1IRXcUv/CXCWtRWFSA6uxZlDf/tN5F7uHCMQITRImicMoZFjBCCyfKTnoIytEWcwz5NI/xkloii1snywsh4QCFEhqgdzVkecFj5Ar5asAZbb1ejtoN/SEQAVNyG9Zb38fJfXsWbO27gZu7DMVWJdKt9UH/3Haw/5gbXsv/H4CZsQnPUGZhqqEJBNwixFYJfNRMqv7kSxmpTsOlyIsIr+IW/pCEGEcFOWHs5Bu6Z/23aVI3yqBswWaMAg/NeiGoabGY4QXUL0F0bjktqh7Ff4Tz8CgRo4B8iZLgohMiQdTdlIctqDuauXY6P9WOQ2jxgTtJRieb7R3FM+Us8+/I8zJyqjUt+ReifDHHR0RYBD9U9mPvCThx3ykA+/8h/xI6LtdehsaYaVbVtEAp/3bGhSq+NuKD5CWSvZSH+kanbQ2r9ceu6Jp43uo9L/+3JNUcjys0QKzfawcS9EG384smjBYU2h2CpsgsnAiqQOfleIJEQCiEydJ3VaA3TwLYla/H+Knt4FnOhwD/UVZWCRNPlUDsjh+XbDuPAW8tgYBaKiL7ZUg96cqxhqLgFL35nDpPIKjZ34v6wFS0VmchNjkFcVAyio5ORmFKIsjoBf9iNhVcNKqoqkF/dgra+EOrgJkklKEhPRFJcHJKSuL9LTkd2fjZy8wqRX1SPho4ulPlugYXWR9jhEAGf+HwUZiUiISoaEZHJSCmpRYNoc10QNhSi2O8EdFRX4XlFE6hdDUV0ShaSK1vROth3W1mO8LLYjG8NvWAZP3DW1IXW6iLkp8YiLikJ8XEpSOG2k5FXgJycHBRXNaGptR3tTZUobWxAeU0FqjOiERMShKjUQpS3cM+lrQ51RZnISIhFdOQDREXEICGzEmXNot4QE9SjuaEcJdW1KCsqRGFKLOK51xWTVIyK5nZ0dDSgKjcd6XFRiAzj+jWxAKVNHexUCp4QXQ2lKE1PQPwD1u+JiE/g3ofiGrAjkezf6YzUx6WzO7HIMgGBRXRIjowMCiEydD1cbFR64vzqZZj/bwWcDa5BqeiBdjRkeePqT6tw4swV2HrawXH3u9hpYA2bdNEKHCFqfXfj4J65mHo8EH6F4vhqyvHFTf0NkN2wBIvXb8bqtVuwZNkhnLCPQgYb/Hu4XfB4U5zQP45lRuGIqeZTrSYeyVfVofDTNmzeug+HVJSwefVybNywEus3q2K/7l2ElLWgIFQetlpTsEX/HI7sP4zjsmuxfsVSzPvmeyw5YgX7TC42OhpRF3oCp9a+gSnP/xW/f+5feOH1d/DuIjnMd0xFemPf0N+nIew4XE9+CCXncPiV9T7Ovab6GNwzOYh9a1ZDVuUA9svJYNeaZVi8aTPWb90BHadIRKZmI8tfF8p2NthvdArW2z/B7A/fwTcql3AjrRY1SW5wO74RMqsXYtGqpVi98HvMkdGHxs18lPH/ErJu4N41DciZ2EH72DGcll+IFcuW4JsFR3HaNRAhEe64uE8Gihu51zrzW8ydLQc1lySkNYr/vKclG0lXNKDGvWfzlm7CqrWbsGihHJQNPBBcy04x4RQ5wfbiEbyj4Y+rqVwCEjICKITIMHB7w11ZCFBbhJ2ffY5dlzMQK5oElKA4xAp7FqrhhEUSSmvDEeewBF/vNYCcWyW/912EOJ35UF45Dzvcy8SHd4r9cc9OAXJ7lXFA3xSWDo6ws7OEpe4R7D9iAxPvItS01qE7/AA2y6zGc/K3cLeU/WElsq9Z4czc7ZDbcwZnHFzh4WoLK71d2PDJUiyeowUj7zRkNrSjIngXjJVfxNe7j0P1lANc7a1gbXkaJgdXYcHXu7HtaASS6wVoyPaCn8EqrJ8/HX+dvQELdx2GxnkHGD8oQ3nbwyHUhUJPFdgpT8NJz0RE8QN7d2sOcl23Q19pBWTVrGB1gwsTJzuYqqzA5nlTsXqvDi6E5yEvPx4pl1Zjxo9z8cbyvdDW1sRJXU2cuXEfcTmFqIy4AieLs9AxvgBTawtYmRyC/Ko5kFHWwdXMdtSzcE65ABvtRXhlizZ269vC1+kCLExO4OhPK7Fp9RZsVzGEwTkb2Npa4Lz2TuxZtBRzVtvCLowdIC1HVdxlHFRQxjrFEzC0tofNpUu4YGwLJ68YpHLvqWjy1xyMm1dMMGefO5zjqifPd15EoiiEyDA1o9hlOzQ2fYBZevfgUcQtag9F3NUDWLDTHvre3G40ilEVaoxFc49gzZEwlHR3cxOaIFxZvAg7Zu6FTWonaiFA1dX90F81Gyt1feGZ0YKOdgHaOysgyLsCg437sGXddYQVlKMx5gSUFLfh7YPc7KaCfbGTAB91LWx8wxAOIbXcPIzXGg6bubrQXOvKrSHW6CcDfcVX8MVhJzil9x085GZSXjD9bidkZpyFewn7BoST7wQXK3m8bhQMh//4nVA7Mpy1YCG3HMZ3spDET846q8Lhu+9dqKkdgFWBeBkjiDGGl+p70LkRiTD2ZFvike2wEZ999QPe33UZPuLppFhrFVoK0pDBZUX/yQBtKLD8BtpyX2P/7XrksC7IsYaF7jq8qGCDs9F8CqIGAv/9WP/dfLy35hI8+07ESECS9RGseOsAjpolc+9gDrI9juG7L5SwTicUhfxaj+iORYiNGeQX28E5qETcR4QME4UQGbaeRG6v+/BivP6TDc5FtaAt6wpu6i7BemNfXElns4ZWtBfchslX67B3nSX8S2tRm2gN1a93YsniqwhvE3IxkI/7e7fjwEtzoax/A06hsYiKuI/ImACEhdjAYMEOKP9oCo+kUpRFnsTePdvwDguhcjYCJyPQ7Cx2LTSG7b1cVHQIIeysRlOuB0y+U4fmOlfEc0+DRU6t9yZcUP8QMpcTcL/vFG3uwa5oeCxVxLEZJ3A9twf1bHG2Pa6Y7cBrhndgk/GfTh9vQ9pVE9jIK8E2PB9Z/ESpoyYBgZqroKeuDZtkAWo72fNqRdGd43BQ/Tc0roUglOVFfRQyr27DxwraWHU569FT3TndXZ0QtDShqb4e9dVFXIh8C41D32G3ZxUym7gVMi/CwkgWr5z0g0NGbwzXAPHnsZab9X14LBgJfScT5CLjqh52vLwF+7VDkI06lAddgOqMZVi9VAuWAWlIL6pFfbNwwHdGTBxCzhhB7t1zuHQrn9txIGT4KITI8LWG4O6ZfZg9bR80nMIQ4HYeZutW4YRrAiJFA18PehpTcF91JlT3KEHbKwrhDnJYLHMAc06lo1IUD3Hw3LIDcs+uhprRNTgGBuGOnzd8/b1w29cdziYOcHeMQVpJFerDtKGoxIXQAV8El7MBtwnlEVdhe0gWikfOw8Q1BIHelrDTXINNG7WhdSkTNd2ig4eour0JZlqfYuf1dERXs+fGCNEtjIXXCiXofM6FUE63eIBNvwT789vxqp4PLib/p/3+NqQ7n4KlnAxM7+aAm9iJdHdUoybIGOcPK2GHmiUuewcg5LYp9Pf/hNWyajDjAquCrVsdyf39DnysaY4tPoNdvNSGmlRf3DI5DnVFRSjslMWWuc9h/volkPesQR57aiyEzsnh1dMBcMwUneLBBWslN+m5iDUHT2PGyQhk9V1lmos0J33Iv7wR+zXuIJ7bBeiozUOm03lc3Lce25bOxrwv12LTfhdcT2jgZko8biYUbHUBO+dZwTmgiGZCZERQCJERUI6Ma7o49M4nUFNVxf4jZ7BrkQ6uPyjt31vurEKtz0aoaMvhs316MNg3BSu1jkEhqI0LBxYPCbiltAN7p2+BoVs87hcVIT83GznZOcjJKUBRRTXqO7rR2V6P9hB17FJkIeSNoHLxsS9hzj3cN9mKA1pnoGPvj9s3LuGKhSEu+t1HWFX/txcVXAiZan4M2avJiOTGaLFOLjCicHO5Eo7P0sWN3G7xqeS9IaTv+19CSIg8D1XY7p2FU95piOsbtbkELnHFZSNNbFHmZkoubvC9aYMLFk44556NtFr+cGBlJFKvciF03AybvPuelIigPB5pfmdhZX0Bp40tYXHqFAwNdHFs0+tYu20hFG7VILc3hIx34FWDO7iczk95uirQHWeGNSp6mHkiDFmtvSGUjVRHPex8ZTMOaPojhl+KrlKURzviip4K9q/fhHWLl0PR8CLc8trRxJ5qexi8HYyxRM4ZztHctsV/RciwUAiREdCB6jhr2K18Htt/eB8fLDyMH/f6437xgIGbnUmX6wh99d3457+/xA+fvgR5boC70fddSyliz8lDc+kK7HfOQjz/vUqfbiE6BEL0dHIhFHqMDyEfLoTYTIibuTxwg5eaDE6YWsPUKwLBoQlILalHfe/XPrxyr18RQqlWuGS8FS8ZBMA2V7TiL6oJOgYX7Y9xyC0Ggb2TGWEDOuKMYWqihW36rnD19ENEXAb3vNrQNnAE7w0hTVNsuj3wCtoOFPsY4eLSL6FwyhM3+yZJLShw/B7HVb/F7lsDDsf9lxDKHDSE7iCWfy69j4oIMhFxcip2b/8ee32aUMSOEda4w/GiBj456ImrSXS5KhkZFEJkRHRXcDOOk5/i6389jt/+ewM2OBQgv2XgsMb9b2EyAnTW4/vf/Ql/eWIRZC9EIqMvJISoDzmN8/sW4Kt99rCIrICgsxNCYQc6W6uQnpiBpNRqdLTVoDP8GOR2b8GbKr58CLWj0PsUjOZ+jI3b9kHZ3B1OHncQGP4A9xNykVnajA7+qVR6bcB59enY5pSEiJ+F0AN4LFGAxgxuBpfDh1CmLRyMZPCKmguMuJUF7Z0QCLrRNcgUoCvNHp4XNmLZOT9cSeEPh3VUo/yWPJR3L8AnW/Wha+KEW74BCAiPRkx8FopqBWhnz6syAilXt2O6+nms9xoYQtzrttOH/hsLoX4mCCG9Z+W1cgFx9gsoys3BzpvVyGIzrwxzmJ3djpf0/OGQNiCEYi9gpbIuPtUORUZfCGUh5Youdry4ASoadxEv7EZ7SzmKK5tR0dQjDqO2Am6nYAbUVRZCM7AdopMQk8/D8qwi5p2/j7v5D+8lEDI0FEJkZHTmo9RTAT8+8wL+OXU3DLipzKP3I21FqdNP2PvBY3jsfVXsdSsXX6Daq4GbJQSYQnvfTqxfvQU7ZGWguE8OMnL7sOPoFThF1KG1rQ7doYfw09Y1eH63F+6WsS10ofSuFSw3roDy4RM4YesI+0tmMDPWhqayDOSOGsIwsBJsYtbosxJGh97EOrsEhJWL/1lxCN3H9TnboPr+MThmCtlX+tzK4Qi/JIfvPvsU02bNw7Jdhjh1MxfF3ED9CG7dCEctLNtkCyPPInYgjntadajyUcMJ1a1YecgMJhcv4bLNRVwwUMcR5b2Q2WcL29BKNFU/QJLjJrxz6AyWufdd+cNpQXW4My6vXYw1S2SwWkEZajpnoG9qB3utZThwbCdk3GuQzk5uSDsHY/0NePq4N6xT+FMbusrQHXUWP+7SwLtHg5DWt1PABfolDWz6ywrsPnwHCV0dqEnzgLOeMvYoymP3wX04qLITO7ZvxVFzZ3BPkXs9nSh32Q9TVRkc8i5CymB9QMgQUAiREdIIYd49XD56GqdP+SKunh1MelR7jjN8LitCye4OvHL4PfaBOipRcscCZ7kgkt26Gbv37sBmOTUcvuCHoPxOdAi5v8l2ha29JQ5ws5n0+nb0VEYh+pY1zl10x62IZCRlJCIx8i78bzvC5eQyLFi7Gq8fDcfdYm5WlW6Ju67HYHW/GDm9ZzJzIdYjzEWskT1cj9/Eg4ou/sv4etTFX4fD3jXYsHABFm3Xh6FnDoqbBxuAy1EUaAeNJduhbeqL9LZOtFYlIsDWClbWHvCJzUR6ahxiQoPg724Ds+O78MM/N2G3WhBSmwpRFH0Jmq53YBb/0GGulhxkBphwQbYX22QVcEDrFE5a+SDI1wX+oT6wT2hBGcuc8nu452sN5VvJCCvle767AT0Fd2FyxROaHpko750OogIl4Z6w2WsBJ/d0lPR0oiH7Dm4bq0BVSRZyygrYq7IHB87ehltiGzfP5LbXkowbx/bg8C5NuGW3oZYyiIwQCiEygnrQ1dmFLvbTB/ySR3Whu7sTnd3d6P6lldjjgja0tbVyrY2b/QjQ3iFE38/z9HRBKBSis4ttg1seexb25/Ziw4X7uJfZhJZ2btgUtKK1sQwVYWegduwQ3lMPhHcBNxVi63d1Qsj94z0/+/d70M1tkz3/nz0v7t/qam+DoKkFLc3taOde2y897+b8QNzT/B5HTp7H1eRyFCe4QEf+JNQN/ZDW0Mo9L+51tHP/rctB2h0raE7bDa19Xojt7OH6g70e7nU9snHueXL90dHWhCZ2ijb32gSsL0SvvZtbn63BVuOeZ5cQHaLloj/kcP9D1Fdd3Lb5w2wibJvcctF2xMt7uH9f2CHgXmcTmpsa0cj6vbNb3OfCSnTEm0Fj3wnIaocgo+WhL9oIGQYKITLBcYNowRU4av2E2QsP45iZFwIS00WzjvjgG7A9sg279mrhsG85sptHd/DsactHU/BxaJw0g45bKgpTPWC5bQU2r1aE7o0wBMUnIy07AVFeFrBR34VN201h7pmPQe4CNK701OeiyP0ATpnbwTi8Fc2/lMKEDAGFEJn42guQyQWO/UlDXDA2gamlBcwtLGBtYwNTY0s43QxDWj375me0CYCmDIRFJHFBWI6m+nxk+1jC4ZwuDEwvwtTUHObW1rhocR7WFta4FJyJpP/PD/lJWHdLLaqT/ZCQlYmsNhb7hIwcCiEySXBDY0sRShIC4OfqiCtX3XErOBkZVQ9f9T/2OpsLkRXlCx9nZ1xxvgWvyAzk1g5yK25CpBCFEJlEuCASCtDW0oym5ha0tgsxXob67s42tDU3o7m5Fa0dXXShJyE8CiFCCCESQyFECCFEYiiECCGESAyFECGEEImhECKEECIxFEKEEEIkhkKIEEKIxFAIEUIIkRgKIUIIIRJDIUQIIURiKIQIIYRIDIUQIYQQiaEQIoQQIjEUQoQQQiSGQogQQojEUAgRQgiRGAohQgghEkMhRAghRGIohAghhEgMhRAhhBCJoRAihBAiIcD/AWwBzvq2k10IAAAAAElFTkSuQmCC)
What is the third quartile of the box plot?
Q3 is shown by the vertical line on the right side.
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the third quartile of the box plot?
Q3 is shown by the vertical line on the right side.
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the first quartile of the box plot?
Q1 is represented by the far left hand side of the box.
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the first quartile of the box plot?
Q1 is represented by the far left hand side of the box.
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the median of the box plot?
The median is represented by the vertical bar.
Answer the following with the help of the box plot:
![](data:image/png;base64,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)
What is the median of the box plot?
The median is represented by the vertical bar.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
What is inter-quartile range?
Interquartile is the difference between the upper quartile and the lower quartile.
Answer the following with the help of histogram:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVAAAAFICAYAAAAGbaYvAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACtDSURBVHhe7Z33cxRX/q7vv3Fr6/vjrbp1y15/d73rvdder3HCJhgDtkECBEISIgoJRM6YZBNNMgIkkogCIUzOIohogglCCCWSUEYECQml987nMAPYO2jtPqebbnifqrfUPdNM092nnz6hp+d/gBBCiCUoUEIIsQgFSgghFqFACSHEIhQoIYRYxBMCvXLlCqqqqvxzhBDiDjwh0OjoaFy9etU/Rwgh7sATAh04cCCuXbvmnyOEEHdAgRLiYhoaGpCVeRnnT5/ELz+fsj35ubn+NZPfAwVKiIvJvnIF//vv/w9fxg5H6z5xtqVN3zi06jsI/2jxER5Vc7zh90KBEuJiLpw+hbb9h2DTI2BV0WPbklxcjxUljWjTIwr3ysv8ayf/CQqUEBdz8czPaN07VklucXapbVlyrQyLcirQJiwC9yvK/Wsn/wkKlBAXQ4G6GwqUEBdDgbobCpQQF0OBuhsKlBAXQ4G6GwqUEBdDgbobCpQQF0OBupuXItD6+nrU1tb6555RXV2t3vstFCh5XaFA3Y3jAr1x4wa+/fZbtG7dGikpKf5XgWPHjiE1NRVr167F3bt3/a8+gQIlrysUqLtxVKBS6zx48CDOnj2LpKQkvPPOO3j8+LGS56BBg1BTU4Pk5GSsWrXK/y+eIALNycnxzxHy+vAyBPrgboV/7eQ/4ahAGxsb0dTUpKbz8/PRtWtX9ZxP+bt161b1+oIFCzBq1Cg1HSA2NpYCJa8lTgu0rU+gj+79ugVIXsxL6QMVkc6ZMwcHDhxAbm4uPv74Y5SXP2k2iCwnT56MrKws9O7dW+WNN95ASEiImk5MTERlZaValpBXnf179qBTjwjsKyhGQnZZUPnpRj43MbsEe7IK8K+Wn6Fjl24I6RnlS6RtCY2MRruvvsGOHTv8W+pNXopAZaft379fTaelpaFLly5qWgaQ2rRpg507d6pp6QuViDjPnDmjpqXGKgIm5HXgl9On0CZ6INbcqQkqP1ORGujy3HK836kbxu0+iRk/5+H7k9m2ZcHVUnwyYDjWrVrp31Jv4rhAMzIylDzr6upQUVGhaqExMTHqvV27diE8PPzfRujj4uKQl5fnnyPk9eGSvwm/0oEm/JLcu/hXSDjmnL6GpIL7WJpbYVvWljfhm3HfI3X9Ov+WehNHBXr06FG8//776N69O77++msl0ocPH2L69On46aefVLNemvS/haPw5HXFyT7QpUqgPTDrRJaaDracqawuqcfXY6ZRoH8EaYJnZ2fj8uXLyMzMVCPwgtz/WVBQ8MIfjqNAyesKBepuXkof6B+FAiWvKxSou6FACXExFKi7oUAJcTEUqLuhQAlxMRSou6FACXExFKi7oUAJcTEUqLuhQAlxMRSou6FACXExFKi7oUBfIU6fBlasABoa/C8Qz0OBuhsK9BXi2DFg7lx52pX/BeJ5KFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJirl2+RIG6GAqUkD/I/fv3kXXpIi6e/RmXzp2xL2fPYPOaZLSKHojk4rqgIjIVCtQaFCghf5AZ06fj7dbt0W7AEF/tcKBt+aLfYLzXoTM+6xWDNSUNQUVkKhSoNShQQv4gUyZNQt8VaUh5AKz0Na3tyvpKYPzOY/jc14RPLmIN1I1QoIT8QaZNmYJeCWux8vajoHIwleU3HmLkxj0UqIuhQAn5g1Cg+qFAHYQCJW6CAtUPBeogFChxExSofihQB6FAiZugQPVDgToIBUrcBAWqHwrUQShQ4iYoUP1QoBo0NDSgsbERTU1N/leeUFdXh9raWtTX1/tfeQIFStwEBaofClSDsrIyTJo0CevWPdt5p06dQmxsLAYMGICTJ0/6X30CBUrcBAWqHwpUk9DQUKSkpKjp8vJyTJ8+HYcPH0ZWVpb6rvHziEBzcnL8c4S8XChQ/QQEunnDev9e9SYvRaBFRUVo3749bty4oeYLCgrw+eefo1u3bqioqFCvPY/UTPPy8vxzhLxcRKBRDgh0mcMCXeIX6EyHBPqVT6BbNz6pRHmVlyLQHTt2IDw8XPWDBpBm/eDBg5UspW/03Llz6N27t8obb7yBkJAQNZ2YmIjKykr/vyLEOR4+fIjCwkIMiY/HhHmLkFZQjkXXyoMKQicJ2b7a4NUS7M0qwA/J69Epohc2FlYhwSe5YMvrZpHvczddysfeC1lo/XVnrDuQgVXXSmxd3+6bFRg0diL+2eIjdI2KRmhElG3pEtkLnbqHY+y4ccozvx170eGlCHTMmDGYPXu2f+4Z0nzv37+/Gkx6/PixatpLoqOjVR+pTD948OBX4iXEKaTcyQCoPEykz6LVSL5VHVQQprLq+j2MSdmF1tEDsbrI3ueBJmaXYHlOGVp07o4fjmciMbci6HKmsq74McLGTUPniTMx9/IdTDueZVtmnMlDv7Xb0S28pzp+JnkpAu3UqZMSoiCyDLB582asWLHi364QcXFxbMIT1+BcE74KIxxtwlc61oRP9jXhQ8Z9h15zlmBNWaNan11ZfrMK4/adRt+Ygf4jaA5HBSpX8I0bN+Kdd95Bbm6uei09PR0xMTHYtGkT0tLSgjbPOQpP3AQHkfQjfaChPoFGzkrwbZu9teukAl9NfvcJ9BkQ4z+C5nBUoFKzlAGk69evo6amRr127949nD59WtUwX1S9pkCJm6BA9UOBOggFStwEBaofCtRBKFDiJihQ/VCgDkKBEjdBgeqHAnUQCpS4CQpUPxSog1CgxE1QoPqhQB2EAiVuggLVDwXqIBQocRMUqH4oUAehQImb+G7qVApUMxSog1CgxE1Mn0aB6oYCdRAKlDRLUxMGDIxFp/AIhPSM8iXStoRGRuPPf/0b4tdso0A1QoE6CAVKmqOx7jFaduyECYcuYvrpHHx/Mtu2LLhaipa94zAwcT0FqhEK1EEoUNIcItCvwqMw7/IdJOZX+k7+CtuytrwJ7QePRszSdRSoRihQB6FASXMogfaIxA8XbmFJjvkHHD8fOfG/jBtJgWqGAnUQCpQ0BwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBraAm0rKwMc+bMwenTp/HgwQP/q+ahQElzUKD6oUCtoSXQiooKnDlzBpWVlTh+/DiOHj2K6upq/7vmoEBJc1Cg+qFAraEl0MbGRpw4cQITJkxA9+7d0a5dO6xevRr379/3L2EGCpQ0BwWqHwrUGloCzc/PR0hICJYuXYrLly+jrq4O9+7dQ3p6Om7fvu1fSh8KlDQHBaofCtQaWgIVWR4+fNg/94zt27dj3bp1/jl9KFDSHBSofihQa2gJ9O7duxg/fjxu3ryp5m/duoX6+npUVVWpmIICJc1BgeqHArWGlkClmb5nzx7/HJCVlYWzZ8/658xBgZLmoED1Q4FaQ0ugjx49QkJCAubNm4erV6+qZrsMIpmGAiXNQYHqhwK1hpZABRk4+v777/HZZ5+hY8eOajDJNBQoaQ4KVD8UqDW0BCrylCZ7Xl4eiouLcefOHf87ZqFASXNQoPqhQK2hJdCCggJ8+umniI6ORmxsLHr27Ilt27b53zUHBUqagwLVDwVqDS2Byg3zchtTUVERcnJysGbNGtUXahoKlDQHBaofCtQaWgItKSlBt27dEBUVhQ0bNqhBJTugQElzUKD6oUCtoSVQ+S78pk2bkJSUhLCwMHTo0AGnTp3yv2sOCpQ0BwWqHwrUGloClRrn+vXrVfNduHLlCsrLy9W0SShQ0hwUqH4oUGtoCVRG3SdNmoTZs2erR9vJaLx8O8k0FChpDgpUPxSoNbQEKrKUm+dTUlKU4OThIlu2bPG/aw4KlDQHBaofCtQaWgIVzp8/j7Zt26Jr167qyUwyEm8aCpQ0BwWqHwrUGloCbWhoUH9ramqQmJiIhQsXPn3NJBQoaQ4KVD8UqDW0BCoDRnIT/fDhw7Fv3z4cOHBA9YOahgIlzUGB6ocCtYaWQJuampCdnY1x48ap78K3atUKu3bt8r9rDgqUNAcFqh8K1BpaApUfkjt58iRKS0tVbVSmOQpPnIYC1Q8Fag0tgcptTHIDvXwTKT4+HhEREeq+UNNQoKQ5KFD9UKDW0BKoDB6JROWG+gsXLmDlypX8LjxxHApUPxSoNbQEKr+J1KdPHyU4uR+0sLBQ/VKnIP2jkmDISH2w92pra5/+++ehQElzUKD6oUCtoSVQ6fvcuXOnGjiSnzWWR9v17t1b/U6S/LBcMBkK8q2lKVOm/Kq5L9+hT01NVa+JmJ+HAiXNQYHqhwK1hpZA5SHK0myXprwgEpRvJc2cOROLFy9+oUCF0NBQ9QQn4dixYxg0aBCqq6uRnJz8bz8LIgINfN+ekN9CgeqHArWGlkClGS73fsogkjyRadiwYVi+fLl6T57U9KKb6kW87du3V7/iKYhMA18BlZvxR40apaYDxMXFqa+JEhKMpvo6xwSaXNKgBDrAQYF+5hPoqqL6oMuYyvMCnXniqmMCjfAJdJXNFwcR6Gg3ClSQWqb8DpLUEkWkmZmZ/ndejDT7e/TooaZl0Omjjz5S3QGCyFIeUCK/8Cn9q5I333xTSVamly1bpgauftvMJ68ncpHOzb6KtiHdMPdSoW0CXXStHMmZt5CRfxvd+8di8vxFSCsoV68HW95Elt18iGlrNyO0ZyT2FRQjIbss6HImkuDbb2uv3kHbr77BuoMZWHWtBAk+qQZb1kREoJ3Hf48RU7/H4dxbWJ51x7b1JRbcx+ztB9Gje5iqvL1obMYKWgKVWubQoUOxceNGNf977wEdM2YMZs2apaY3b/YVEJ8cBTkZ2rRpo/pPHz9+rB7YLOnVqxdOnDihpuUp+PX19c12D5DXi9rqKnTsHmF7DXTJ1RJsKKpFh9gRiFuyBsm3qoMuZypSAx2dsguto2Ow7k5N0GVMRWqgSTkVaNG5O+Yev4zE3Iqgy5lKoAYaPfNHrCt8hCXZJUGXMxGpgY7fdRy9+/U3/lVzLYFKTXDVqlWqL/P69euqNvl7aqCdO3dWN90L8hXQAQMGqOm9e/eq+0oDfaoB2IQnzfGqN+GlD5RNeOtxbRNeRCe3L0nf5/79+5UAA32gwZBaozzB/u9//ztyc3PVa1KjnDZtmvoxOqmVyldDfwtH4UlzcBBJPxxEsoaWQKUpLTVDeZjIhx9+iBYtWuDIkSP+d/8d6XuQe0Xl3zz/+0kPHz5Uo+wi02BQoKQ5KFD9UKDW0BKo1CLlQSLCjRs3VOyAAiXNQYHqhwK1hvYg0owZM9R9nHZCgZLmoED1Q4FaQ0ug8nvw8iT6Dz74QA0MyT2c8i0j01CgpDkoUP1QoNawLFAZEJJBJLmvSqSZlpaG2NhYZGRk+JcwBwVKmoMC1Q8Fag1LApXR9qlTp6Kqqsr/ir1QoKQ5KFD9UKDWsCTQrVu3qh+Tk28DyV8ZPTd5d/9voUBJc1Cg+qFArWFJoHLze+CrlDKING/ePPUoOrugQElzUKD6oUCtYUmgcjO8/JRxQkICFixYgIsXL/rfsQcKlDQHBaofCtQalgQq3zqKiYlRI+9/+ctf8N5772HChAlqFF6a9KahQElzUKD6oUCtYUmgz3+LSL4DL32iIrk//elPzX6V0yoUKGkOClQ/FKg1LAn0Rdy+fduWbyNRoKQ5KFD9UKDWMCpQu6BASXNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgZJXgm969qJANUKBWoMCJbZQX1+PgtxcXL10AdmXL9qarF/OoU2nLph3qZACtRgK1BoUKLGFk8eP4f/833+iXf94tI7qb196DcDnEX3x5xafqpOFArUWCtQaFCixhQO7d6Bd/DhsegSsKKy1LSt9YkksuI8PukRg4UU24a2GArUGBUpsIX3vbnwRO1KdKMEKtamIMBdeuq1OfPlLgVoLBWoNCpTYAgWqHwrUTChQCtRzUKD6oUDNhAKlQD0HBaofCtRMKFAK1HNQoPqhQM2EAqVAPQcFqh8K1EwoUArUc1Cg+qFAzeS1EWhjY6P6Bov8fR4K1HtQoPqhQM3ktRDozz//jEGDBilZnjp1yv/qEyhQ70GB6ocCNZNXXqB3797FrFmzkJ6ejosXL6KystL/zhNEoDk5Of454gUoUP1QoGbyygs0Pz8fLVu2RM+ePXHv3j3/q8+QmmlBQYF/jniBQ/v2OCLQxTkVWHCpEO87JNDkkga0ixuFAQ4JdMTGvfjMJ9BVRTZfiPwClf0400GBRsxa7Ns2ey8O8lXf0btPok/MQH/pNIdrmvBFRUWIiYlRsmxqasL58+fRt29flTfffBOhoaFqetmyZSguLlZClf5S4i7kmBQWFmL18iQlmtU+4QQr1CayyHfSp13Kw9ZT59H2q2+w8nwOEnIrgi5rIrK+vTfK0LNfDMb8mIRVt6uDLmcii66VIyWvDHOT16FzRBT2FRQjIbss6LImkuC78Ky9egdffPU1Fh89h8V5lUGXMxURaOfx32PklO+w/UaF2t5gy+lE9teS7BLsvJKPxVt2Iqx7D+UO8YspXDWIlJWVhX79+qGurg41NTW4c+eOSmRkJI4dO6ampXkvJ6ksY3JHEDPIMZHjs2/ndkdqoEnXfLWnCzfQonMYFjnwMJH1xbXoGDscsUvW2F4DXXn9Acam7ETr6Bisu1MTdBlTkRpokq82/6FvP845nulYDbT3zIVYa/O2rcyrwMRdGYju1994peulC/T5DdqyZYuqYf5WjHFxcaqZT7yDc034ctWEd6oPNNm3Pe0c7AOVJrz0gTrVhHe6DzRiVoJv2+ztA33ahH8V+0Bl4Eia7WlpaUhNTUVFRYX/nWdwFN57cBBJPxxEMpNXehBJRuAzMjKQnZ2tmuXBoEC9BwWqHwrUTF6bG+lfBAXqPShQ/VCgZkKBUqCegwLVDwVqJhQoBeo5KFD9UKBmQoFSoJ6DAtUPBWomFCgF6jkoUP1QoGZCgVKgnoMC1Q8FaiYUKAXqOShQ/VCgZkKBUqCew6lvIlGgZkKBWoMCJbZwPH0/BaoZCtRMKFAK1AiJSUnoFNYD3aKi0TWyl23p1qs3Pvm8FTrEj8WaUvuexiShQM2EArUGBfoaMTA2FmELkjHjTB6mZGTallnnr6P7zAR8OUgeZ8caqNVQoGZCgVKgRhg+YgQGb9yLVYU1SMy7a1tWF9chdlmKEg0Faj0UqJlQoBSoEUSgcet3qRMzWEEzFRGLCIYC1QsFaiYUKAVqBApUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGaYMHEiBq7dQYFqhAI1EwrUQV5VgTY1NWHd2rVYOG+u/Zn7Az5r2RIjfzpEgWqEAjUTCtRBXlWBPrx3D2+93wJhc5LQY85SdJ9tX6IT1uHNT9tg3E/pFKhGKFAzoUAd5FUV6L3yMnzRMxoriutVIVp1p9a2pFYDbWOGYkTKbgpUIxSomVCgDvKqCvR+RTnahEVgUU6FKsDBDr6pyAkoJ6KckBSo9VCgZkKBOggFqh8K1EwoUDOhQB2EAtUPBWomFKiZUKAOQoHqhwI1EwrUTChQB6FA9UOBmgkFaiYUqINQoPqhQM2EAjUTCtRBKFD9UKBmQoGaCQXqIBSofihQM6FAzYQCdRAKVD8UqJlQoGZCgTpIbGwsbty44Z97daiteoi23SMpUI1QoGZCgVrDEwId0L8/DuzehdwrmcjNsi85Vy7jel4ubuTnISfzctBlTOaXk8fRMiQMCXl3KVCLoUDNhAK1hicEGhEZhX9+1QVtomPQOrKfbWnXNw5/+7QV/vuDj9Gu36CgyxhLrwH4pGsE/tbqSyy78YACtRgK1EwoUGt4QqC9fRs+If0CVpc1YvntGtuSUgX0mrcMXb6dhY2PEHQZU1lVXI/5F27hg9CeqrBSoNZCgZoJBWoNbwi0/wCM3nlc7YhgO8hU5EDKAZUDa/eJLwVUCqoUWArUeihQM6FArUGBPhcK1EwoUDOhQM2EAqVAtUOBmgkFaiYUqINQoPqhQM2EAjUTCtRBKFD9UKBmQoGaCQXqIBSofihQM6FAzYQCdRAKVD8UqJlQoGZCgToIBaofCtRMKFAzoUAdhALVDwVqJhSomVCgDkKB6ocCNRMK1EwoUAfpNzAO4/efUb9vvuz6A9uyvhKInpeEbt/OxIb7CLqMqay49QjzzuWjRdcINS0nS7DlTEW2rXW/eIz9KR2ri+uDLmMqa8uaMGjFJnQcMtb2/bj8ZpU6+WU/yl+ZD7acqcj2yHbJ9sl2BlvGVOQ4yfGS4ybHL9gypiLlT8qh7EcplzIdbDlTkf0o55mcb3Zvm3hjwsFz6B83yG8Uc7hWoPL8zwsXLqh83TkEYfNWYOT2oxiadtC2jNv3M9oOGo1Peg3E+ANngy5jKsN/OowBKzbjrc++UNPD0tKDLmcq4/adwT++6oKw6T9ilK82H2wZUxmz+xS+Gvsd/tklwvb9OGzLIQxO2aP2o/yV+WDLmYpsj2yXbJ9sZ7BlTEWOkxwvOW5y/IItYypS/qQcyn6UcinTwZYzFdmPcp7J+SbnXbBlTEW80X3BSnwTEvrUKZLS0lK/bazjWoHOnTsXQ4YMUfnrX/+K8IhIDIofgrj4eNsin9+qTRt8+PHHtq8rzvf5vfv2w5t/fktNP0mw5cxEtufv7/wDoV27OrIf23fsiHff+6cj+zEmLk7tR/nrxH6U7ZLtc2I/yvGS4+bEfpTIfpRy6cR+lPNMzjcn9mN4ZKTPI28/dYokPT3dbxvreKIJP3ToUJQUF/nn7GVLWhqSEhP9c/ZSV1urnnXqFOPHj8eVzEz/nL0cPnQIM2bM8M/Zj5P7UbZLts8J5HjJcXMK2Y9SLp1AzjM535ygtLhYSdM0nhBor169cPXqVf+cvaxduxYLFizwz9mLNCF69+7tn7OfkSNH4tSpU/45e9m5cycmT57sn7OXWt8JL/tR/jqBbJdsnxPI8ZLj5hSyH000bX8Pcp7J+eYEOTk56pctTOMJgc6bNw+3bt3yz9nL/fv3UVlZ6Z+zl4aGBhT7roxOUVZWhpqaGv+cvVRVVaG8vNw/Zy9NTU1qP8pfJ5Dtku1zAjlectycQvajlEsnkPNMzjcnqKurQ0lJiX/OHJ4QKCGEuBFPCDQ/Px/nzp3D48eP/a+YRT43OzsbV65c+dXVV1775Zdf0NjY6H9FH6lR7Nu3D2fPnvW/8gSpZZw+fRoVFRX+V8xw9+5d7N2791c/yifbI9slzRo7kKv98+uz6/jJ58q+PH78OB49eqReu3fvHn7++Wdbahuy3y5evIg7d+74X4Gaz8rK8s+ZQcqIbJMMchw+fFiNGAewY33Xr19X63h+n0kN+8yZM7h9+7b/FTNIeZTj89sfiZRz79KlS/45PaRWK/tJtivAi8q87v50vUB/+uknpKSkYPv27diwYYMtzTQ5sX/44QdERUU9Fei6deuwdetWbNq0Sf01gZzkK1asQHx8PN566y1s3rxZvS6Fd+HChcjIyMCiRYuUBEwgIpOCKdvw9ddfq5NBCpJ0iciJuXjx4l+dnCaQzx81atTTfmTZd3YcP5GM3KkxbNgwNagj8yJUOY4iH9mfJvvyZD9OmDAB+/fvV81c2c6EhAQcPHgQy5YtU+s0gewfueBJWRwxYgQ6deqE4cOHq/UtWbLE+PpE0tOnT0dmZiamTZuGgoICdRGfM2eOWoccx5s3b/qX1iMvLw/ffvutEvPKlSuV0ATZnt27d2PNmjXqgqiLyD8iIkKVAUHKxvNl/vLly+p1Odd096erBSond2hoKB4+fIiioiJER0ejurra/65Zxo4di5kzZ6rpI0eOIDw8XMlUrk79DY3wSi0zcFWUgYi+ffsqyfXo0UPVPgX5DXwpYCYIyEr2Wfv27VXNSQrNpEmT1OvJyclPt9kEciHas2cPPvjgA1XLkBPGruO3evVqNbgYqA3Kuvv06aNOREHkI7IzgbREPv7446cXPGH58uVPR3V37NiBcePGqWldpMzJhS5QW5eLhNwTLRd0O9Ynohw8eLCalovRsWPH1GeLzAQppxs3blTTugwaNOjphTUtLU2JW46RnAeCSCzwf9FBzqnOnTurbRHkovp8mZdzQI6lif3paoHKSRC4hUNk+umnn6qT0TRydZcr/cmTJ9W8nOjz589X03KFbtu2rZo2iRxQkY18fseOHdVrcvLIukTgJpDP27JlC3r27Kn2n4xSyz6U5rQwZcoUdYuYCWQfyhV+165dqvYkhVgKpV3HT7pAunXrhjZt2qgau4xWf/7550/FIyeQnKS6yHZ16NABXbp0USeeCEf245dffqlqioLUamSbTXP06FFV6xTatWtny/pE1m+//baSm5QLaUbLcQp0Jcl6li5dqqZ1kbIdqGHK+SXClovg+vXr1Wupqan45ptv1LQOUpuWc0rKmtRGny/z3333nZK0VJBM7E/XClQK6RdffPH0Zle5YrRq1eppE9skUmhkh8tJ/+DBA7XDA80LKcAiV5PINgUKpQhMRCYUFhbi3XffVTUeE8j2iFhatGihms9SKxThBCQjNd9Zs2apaR3kWMnxEalJd0G/fv2UeOSkt/v4SY1dboWREzJQe5GT5l//+peRW7akNSCfJSPG8rkigaSkJLVtga4WWa9c7E0i/XjSKpJ+SbmFT8qk6fWJJOV4SW3znXfeUdsq05GRkep9acHIek3dsjVx4kTExMTgwIEDqkxKDVT2Y6A/dOrUqUqouiQmJj4tC3JRb9269dMyL7dpiTxF1Cb2p2sFKreKyJU/0OSVe7hMnOzBkBNCrsCCrE9qF4GdKztbmmumkL406dcNIM0XkZsghTcsLEzJxyRSc5Irr5wIUrsW5MRs2bKlulrrIsLv2rWrKoRSm5GTTuQVEhJi+/GTfi7pX5W+tUCflzTj5YIofV+6yLEJdOFIH7Zc1GVfBmos0iUhUpX+a5PIhVua7YL008n+FUyu78cff3za0pJaoJQN6SsMXNDlgivykYEfEwQGx6TpLJUS6baSloKIWi6sIjUT4w1yAQ90QUitNiBlKfPiFOlGCFwkdPenawUqV4znmxVy5bDj/kzZgXKySUeyICeJnDC5ublqp8oV01S/3YkTJ5RkpN9HTnrpE5XmgwhcCqnINNAXqov0m8lnyefKYMf58+fVa1Jjk9ekEM2ePdu/tB719fWquSQ1aJGy1ESlVipXdtPHT042qSnJgJEMeEiTWtYtJ4xsj2xbXFyc6h4xgbRE5EZ2qRHKwIf0s0rfrpQLWZf0xcrgUqC/2QSy/2TfBe4skO0UKZhen1xwpPxJ+ZZ+QOlWkia2XIxkXTIYKAOAphCBHjp0SJ1fcl+31Ohlf8p5sG3bNtUak1aTDlIu3nvvvacj69J19HyZlwuGiFT+Dyb2p6v7QOUWA7kKSy3A1Ejgb5ETRA7i8/2OIh65IkvhMTWSKwdIBgRkdFBkIoVTCovUtGVd0lEvV3xTSNNFCo5cgZ/vEpATRbZLCqzpmq4MFEkhDXyuXcdPTvzRo0eri1Dg+IicZbtkP5quDUoNUNYlF7rArT4iGlmf9LOaqOk+j3zub0eF7VifNOGl7Mn+ks+VsihlUsqMrEua2qaQi4F050iXgXSTBZDzTsqHvK57U72UO9kOubg9X96ClXlT+9PVAiWE2I/J2vOLEDE7sR6noUAJIcQiFCghhFiEAiWEEItQoIQQYhEKlBBCLEKBEkKIRShQQgixCAVK9GmsR11d/ZPpmhJkZOxFkT0PzbKFkmtHcPRSrn+OkN8PBUq0uHF6E+IioxAd1R1jErag9Ho6hvTuiytPvoVoiUu75iBh64uez/gYy+aOxL4Cva/8PaMJO6b3xITlTx59RsgfgQIllik+vRztW3XGruwKPHpYglMn9uHkzvUYFZ+MR3iA9fNGYeSI6ViTmoJTNyqB+9mYP2oUpq7Yi9r6Rty7dhgTR47A4h1nUff0IU0N2Di6F+ZsykTd/ZvYvmEDZk8djnELNuFhYxPOpH6Pt//Xf6Ftn1nIrwIKT6di2IiRmDh7DUp97xddPY+NSQmYnTQPyxNW4dJtqRk/xpHUbbhS2ojyzN0Y4Vt+8pwk/HTkCO7WVmHZwJFIOZWHs6kJGDl8Go7lV/q0Ssh/hgIlFqnGjKiWiF/25BmqAQ4kxGPk8v3Y9+Mw9J24CieObUGHd/+MOek5WDWuEwZOT8GRg7twOusXjItsg+lr9mP33l3IKvUbtDYfQ3sOxLa8OuSmDcf/fLsN0nZvQ99OPZF07i7KTqxA+/bDkH72Im4eT0G/sHjsPnse/Tp/iEWH87Bm6Mf4R7cJOHflAiZFtsTCQ6VoKNiHkLCBOHk+AyPCI7Bs33Gsm9gF730zDIUlBRg7YgTWblyIkO79cCh9P1KP/IJHZh8TQF5RKFBijYcnEPbRZ9jyq1+brsPKbyOxctsOnxyjkaGeCHgHg6MG41hZHTL3zkfIl2FY6xOdz5TYMn8ounTrj31Z957W+OpvpiN29DDc8Als+3fdMH6NPAi3GhMmDMX2gnrcPjgHPWc8eUL6pvEd8N/vfY1Ro4Zj5IylyCsqwLS+HbEx80n/wfYlQzFnzyVsnRGNbzecwaWUqYid9OTRgTf3zEff77ajIm87xk6YiuKS6xgT/hWGTUnE7Rrak/w+KFBijfqbGNTyXUzadE3N3rqYhRtFlzEtYgz27t2I7h2G4mp9HdJndcNfQobhSs4tlD+oRuGeufik8whkXM7Fw8e1ODp/ID7vtxiB5+EU+CQbM3gmHvma3fMjB2LH1ceoLzyA/tF9kedrjW+bHIrJa+Vh14/xbVQo4pcfQl5ePh5IS700A0NCxyLHP56VuXMBPmrZCl36TMLNWmDXhAHo98NRVJdcQdcP/4yxu3JQciAJ8f0XIKugEA2PbmLIVx0wcZuZB1qTVx8KlFgm98BSdGnzhXoc4OiZqcjLPIYRI+fj5qNS/DggBKHhkYjvE4pRCzfjbu4FjIoNR3R4XyxNv4Kbp9LQOzoK3bsORuovzx49djxpOobMPezzYw5GD56MS1VA+alVGDroR189FDi/aihatovEvpwaXD+0GuFh4ephzauP5qP0zGbEjV+JwI+GVGWn4l9/+QSrfU1/4ebRZIR+/g36Dh+MXuFh2Jf9AMeSZ2Nmcjr2J09GdEwfxIxYgJxyjREw8lpBgRItHj+8q56RWa26MJvwuOFJ9a+p/hHKS8t8jfpnVN0vR2n5s2dBVpaXorzy189ibKivR72055sann1WQwMaGgON/Ebcr6xAdd2T+Uf3ytX67z+qQ6Nv+bpfPeO0CU//mZ/qexW4++DZOuvqHvs+0UdjDUpLSuH7GEJ+NxQoIYRYhAIlhBCLUKCEEGIRCpQQQiwB/H9jzXTjvu98qQAAAABJRU5ErkJggg==)
What is inter-quartile range?
Interquartile is the difference between the upper quartile and the lower quartile.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
The five-number summary does not include _____
The mean and standard deviation can also be used together to convey the center and the spread of a set of data.
Answer the following with the help of histogram:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVAAAAFICAYAAAAGbaYvAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACtDSURBVHhe7Z33cxRX/q7vv3Fr6/vjrbp1y15/d73rvdder3HCJhgDtkECBEISIgoJRM6YZBNNMgIkkogCIUzOIohogglCCCWSUEYECQml987nMAPYO2jtPqebbnifqrfUPdNM092nnz6hp+d/gBBCiCUoUEIIsQgFSgghFqFACSHEIhQoIYRYxBMCvXLlCqqqqvxzhBDiDjwh0OjoaFy9etU/Rwgh7sATAh04cCCuXbvmnyOEEHdAgRLiYhoaGpCVeRnnT5/ELz+fsj35ubn+NZPfAwVKiIvJvnIF//vv/w9fxg5H6z5xtqVN3zi06jsI/2jxER5Vc7zh90KBEuJiLpw+hbb9h2DTI2BV0WPbklxcjxUljWjTIwr3ysv8ayf/CQqUEBdz8czPaN07VklucXapbVlyrQyLcirQJiwC9yvK/Wsn/wkKlBAXQ4G6GwqUEBdDgbobCpQQF0OBuhsKlBAXQ4G6GwqUEBdDgbobCpQQF0OBupuXItD6+nrU1tb6555RXV2t3vstFCh5XaFA3Y3jAr1x4wa+/fZbtG7dGikpKf5XgWPHjiE1NRVr167F3bt3/a8+gQIlrysUqLtxVKBS6zx48CDOnj2LpKQkvPPOO3j8+LGS56BBg1BTU4Pk5GSsWrXK/y+eIALNycnxzxHy+vAyBPrgboV/7eQ/4ahAGxsb0dTUpKbz8/PRtWtX9ZxP+bt161b1+oIFCzBq1Cg1HSA2NpYCJa8lTgu0rU+gj+79ugVIXsxL6QMVkc6ZMwcHDhxAbm4uPv74Y5SXP2k2iCwnT56MrKws9O7dW+WNN95ASEiImk5MTERlZaValpBXnf179qBTjwjsKyhGQnZZUPnpRj43MbsEe7IK8K+Wn6Fjl24I6RnlS6RtCY2MRruvvsGOHTv8W+pNXopAZaft379fTaelpaFLly5qWgaQ2rRpg507d6pp6QuViDjPnDmjpqXGKgIm5HXgl9On0CZ6INbcqQkqP1ORGujy3HK836kbxu0+iRk/5+H7k9m2ZcHVUnwyYDjWrVrp31Jv4rhAMzIylDzr6upQUVGhaqExMTHqvV27diE8PPzfRujj4uKQl5fnnyPk9eGSvwm/0oEm/JLcu/hXSDjmnL6GpIL7WJpbYVvWljfhm3HfI3X9Ov+WehNHBXr06FG8//776N69O77++msl0ocPH2L69On46aefVLNemvS/haPw5HXFyT7QpUqgPTDrRJaaDracqawuqcfXY6ZRoH8EaYJnZ2fj8uXLyMzMVCPwgtz/WVBQ8MIfjqNAyesKBepuXkof6B+FAiWvKxSou6FACXExFKi7oUAJcTEUqLuhQAlxMRSou6FACXExFKi7oUAJcTEUqLuhQAlxMRSou6FACXExFKi7oUBfIU6fBlasABoa/C8Qz0OBuhsK9BXi2DFg7lx52pX/BeJ5KFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJiKFB3Q4ES4mIoUHdDgRLiYihQd0OBEuJirl2+RIG6GAqUkD/I/fv3kXXpIi6e/RmXzp2xL2fPYPOaZLSKHojk4rqgIjIVCtQaFCghf5AZ06fj7dbt0W7AEF/tcKBt+aLfYLzXoTM+6xWDNSUNQUVkKhSoNShQQv4gUyZNQt8VaUh5AKz0Na3tyvpKYPzOY/jc14RPLmIN1I1QoIT8QaZNmYJeCWux8vajoHIwleU3HmLkxj0UqIuhQAn5g1Cg+qFAHYQCJW6CAtUPBeogFChxExSofihQB6FAiZugQPVDgToIBUrcBAWqHwrUQShQ4iYoUP1QoBo0NDSgsbERTU1N/leeUFdXh9raWtTX1/tfeQIFStwEBaofClSDsrIyTJo0CevWPdt5p06dQmxsLAYMGICTJ0/6X30CBUrcBAWqHwpUk9DQUKSkpKjp8vJyTJ8+HYcPH0ZWVpb6rvHziEBzcnL8c4S8XChQ/QQEunnDev9e9SYvRaBFRUVo3749bty4oeYLCgrw+eefo1u3bqioqFCvPY/UTPPy8vxzhLxcRKBRDgh0mcMCXeIX6EyHBPqVT6BbNz6pRHmVlyLQHTt2IDw8XPWDBpBm/eDBg5UspW/03Llz6N27t8obb7yBkJAQNZ2YmIjKykr/vyLEOR4+fIjCwkIMiY/HhHmLkFZQjkXXyoMKQicJ2b7a4NUS7M0qwA/J69Epohc2FlYhwSe5YMvrZpHvczddysfeC1lo/XVnrDuQgVXXSmxd3+6bFRg0diL+2eIjdI2KRmhElG3pEtkLnbqHY+y4ccozvx170eGlCHTMmDGYPXu2f+4Z0nzv37+/Gkx6/PixatpLoqOjVR+pTD948OBX4iXEKaTcyQCoPEykz6LVSL5VHVQQprLq+j2MSdmF1tEDsbrI3ueBJmaXYHlOGVp07o4fjmciMbci6HKmsq74McLGTUPniTMx9/IdTDueZVtmnMlDv7Xb0S28pzp+JnkpAu3UqZMSoiCyDLB582asWLHi364QcXFxbMIT1+BcE74KIxxtwlc61oRP9jXhQ8Z9h15zlmBNWaNan11ZfrMK4/adRt+Ygf4jaA5HBSpX8I0bN+Kdd95Bbm6uei09PR0xMTHYtGkT0tLSgjbPOQpP3AQHkfQjfaChPoFGzkrwbZu9teukAl9NfvcJ9BkQ4z+C5nBUoFKzlAGk69evo6amRr127949nD59WtUwX1S9pkCJm6BA9UOBOggFStwEBaofCtRBKFDiJihQ/VCgDkKBEjdBgeqHAnUQCpS4CQpUPxSog1CgxE1QoPqhQB2EAiVuggLVDwXqIBQocRMUqH4oUAehQImb+G7qVApUMxSog1CgxE1Mn0aB6oYCdRAKlDRLUxMGDIxFp/AIhPSM8iXStoRGRuPPf/0b4tdso0A1QoE6CAVKmqOx7jFaduyECYcuYvrpHHx/Mtu2LLhaipa94zAwcT0FqhEK1EEoUNIcItCvwqMw7/IdJOZX+k7+CtuytrwJ7QePRszSdRSoRihQB6FASXMogfaIxA8XbmFJjvkHHD8fOfG/jBtJgWqGAnUQCpQ0BwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBraAm0rKwMc+bMwenTp/HgwQP/q+ahQElzUKD6oUCtoSXQiooKnDlzBpWVlTh+/DiOHj2K6upq/7vmoEBJc1Cg+qFAraEl0MbGRpw4cQITJkxA9+7d0a5dO6xevRr379/3L2EGCpQ0BwWqHwrUGloCzc/PR0hICJYuXYrLly+jrq4O9+7dQ3p6Om7fvu1fSh8KlDQHBaofCtQaWgIVWR4+fNg/94zt27dj3bp1/jl9KFDSHBSofihQa2gJ9O7duxg/fjxu3ryp5m/duoX6+npUVVWpmIICJc1BgeqHArWGlkClmb5nzx7/HJCVlYWzZ8/658xBgZLmoED1Q4FaQ0ugjx49QkJCAubNm4erV6+qZrsMIpmGAiXNQYHqhwK1hpZABRk4+v777/HZZ5+hY8eOajDJNBQoaQ4KVD8UqDW0BCrylCZ7Xl4eiouLcefOHf87ZqFASXNQoPqhQK2hJdCCggJ8+umniI6ORmxsLHr27Ilt27b53zUHBUqagwLVDwVqDS2Byg3zchtTUVERcnJysGbNGtUXahoKlDQHBaofCtQaWgItKSlBt27dEBUVhQ0bNqhBJTugQElzUKD6oUCtoSVQ+S78pk2bkJSUhLCwMHTo0AGnTp3yv2sOCpQ0BwWqHwrUGloClRrn+vXrVfNduHLlCsrLy9W0SShQ0hwUqH4oUGtoCVRG3SdNmoTZs2erR9vJaLx8O8k0FChpDgpUPxSoNbQEKrKUm+dTUlKU4OThIlu2bPG/aw4KlDQHBaofCtQaWgIVzp8/j7Zt26Jr167qyUwyEm8aCpQ0BwWqHwrUGloCbWhoUH9ramqQmJiIhQsXPn3NJBQoaQ4KVD8UqDW0BCoDRnIT/fDhw7Fv3z4cOHBA9YOahgIlzUGB6ocCtYaWQJuampCdnY1x48ap78K3atUKu3bt8r9rDgqUNAcFqh8K1BpaApUfkjt58iRKS0tVbVSmOQpPnIYC1Q8Fag0tgcptTHIDvXwTKT4+HhEREeq+UNNQoKQ5KFD9UKDW0BKoDB6JROWG+gsXLmDlypX8LjxxHApUPxSoNbQEKr+J1KdPHyU4uR+0sLBQ/VKnIP2jkmDISH2w92pra5/+++ehQElzUKD6oUCtoSVQ6fvcuXOnGjiSnzWWR9v17t1b/U6S/LBcMBkK8q2lKVOm/Kq5L9+hT01NVa+JmJ+HAiXNQYHqhwK1hpZA5SHK0myXprwgEpRvJc2cOROLFy9+oUCF0NBQ9QQn4dixYxg0aBCqq6uRnJz8bz8LIgINfN+ekN9CgeqHArWGlkClGS73fsogkjyRadiwYVi+fLl6T57U9KKb6kW87du3V7/iKYhMA18BlZvxR40apaYDxMXFqa+JEhKMpvo6xwSaXNKgBDrAQYF+5hPoqqL6oMuYyvMCnXniqmMCjfAJdJXNFwcR6Gg3ClSQWqb8DpLUEkWkmZmZ/ndejDT7e/TooaZl0Omjjz5S3QGCyFIeUCK/8Cn9q5I333xTSVamly1bpgauftvMJ68ncpHOzb6KtiHdMPdSoW0CXXStHMmZt5CRfxvd+8di8vxFSCsoV68HW95Elt18iGlrNyO0ZyT2FRQjIbss6HImkuDbb2uv3kHbr77BuoMZWHWtBAk+qQZb1kREoJ3Hf48RU7/H4dxbWJ51x7b1JRbcx+ztB9Gje5iqvL1obMYKWgKVWubQoUOxceNGNf977wEdM2YMZs2apaY3b/YVEJ8cBTkZ2rRpo/pPHz9+rB7YLOnVqxdOnDihpuUp+PX19c12D5DXi9rqKnTsHmF7DXTJ1RJsKKpFh9gRiFuyBsm3qoMuZypSAx2dsguto2Ow7k5N0GVMRWqgSTkVaNG5O+Yev4zE3Iqgy5lKoAYaPfNHrCt8hCXZJUGXMxGpgY7fdRy9+/U3/lVzLYFKTXDVqlWqL/P69euqNvl7aqCdO3dWN90L8hXQAQMGqOm9e/eq+0oDfaoB2IQnzfGqN+GlD5RNeOtxbRNeRCe3L0nf5/79+5UAA32gwZBaozzB/u9//ztyc3PVa1KjnDZtmvoxOqmVyldDfwtH4UlzcBBJPxxEsoaWQKUpLTVDeZjIhx9+iBYtWuDIkSP+d/8d6XuQe0Xl3zz/+0kPHz5Uo+wi02BQoKQ5KFD9UKDW0BKo1CLlQSLCjRs3VOyAAiXNQYHqhwK1hvYg0owZM9R9nHZCgZLmoED1Q4FaQ0ug8nvw8iT6Dz74QA0MyT2c8i0j01CgpDkoUP1QoNawLFAZEJJBJLmvSqSZlpaG2NhYZGRk+JcwBwVKmoMC1Q8Fag1LApXR9qlTp6Kqqsr/ir1QoKQ5KFD9UKDWsCTQrVu3qh+Tk28DyV8ZPTd5d/9voUBJc1Cg+qFArWFJoHLze+CrlDKING/ePPUoOrugQElzUKD6oUCtYUmgcjO8/JRxQkICFixYgIsXL/rfsQcKlDQHBaofCtQalgQq3zqKiYlRI+9/+ctf8N5772HChAlqFF6a9KahQElzUKD6oUCtYUmgz3+LSL4DL32iIrk//elPzX6V0yoUKGkOClQ/FKg1LAn0Rdy+fduWbyNRoKQ5KFD9UKDWMCpQu6BASXNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgRLPQ4HqhwK1BgVKPA8Fqh8K1BoUKPE8FKh+KFBrUKDE81Cg+qFArUGBEs9DgeqHArUGBUo8DwWqHwrUGhQo8TwUqH4oUGtQoMTzUKD6oUCtQYESz0OB6ocCtQYFSjwPBaofCtQaFCjxPBSofihQa1CgxPNQoPqhQK1BgZJXgm969qJANUKBWoMCJbZQX1+PgtxcXL10AdmXL9qarF/OoU2nLph3qZACtRgK1BoUKLGFk8eP4f/833+iXf94tI7qb196DcDnEX3x5xafqpOFArUWCtQaFCixhQO7d6Bd/DhsegSsKKy1LSt9YkksuI8PukRg4UU24a2GArUGBUpsIX3vbnwRO1KdKMEKtamIMBdeuq1OfPlLgVoLBWoNCpTYAgWqHwrUTChQCtRzUKD6oUDNhAKlQD0HBaofCtRMKFAK1HNQoPqhQM2EAqVAPQcFqh8K1EwoUArUc1Cg+qFAzeS1EWhjY6P6Bov8fR4K1HtQoPqhQM3ktRDozz//jEGDBilZnjp1yv/qEyhQ70GB6ocCNZNXXqB3797FrFmzkJ6ejosXL6KystL/zhNEoDk5Of454gUoUP1QoGbyygs0Pz8fLVu2RM+ePXHv3j3/q8+QmmlBQYF/jniBQ/v2OCLQxTkVWHCpEO87JNDkkga0ixuFAQ4JdMTGvfjMJ9BVRTZfiPwClf0400GBRsxa7Ns2ey8O8lXf0btPok/MQH/pNIdrmvBFRUWIiYlRsmxqasL58+fRt29flTfffBOhoaFqetmyZSguLlZClf5S4i7kmBQWFmL18iQlmtU+4QQr1CayyHfSp13Kw9ZT59H2q2+w8nwOEnIrgi5rIrK+vTfK0LNfDMb8mIRVt6uDLmcii66VIyWvDHOT16FzRBT2FRQjIbss6LImkuC78Ky9egdffPU1Fh89h8V5lUGXMxURaOfx32PklO+w/UaF2t5gy+lE9teS7BLsvJKPxVt2Iqx7D+UO8YspXDWIlJWVhX79+qGurg41NTW4c+eOSmRkJI4dO6ampXkvJ6ksY3JHEDPIMZHjs2/ndkdqoEnXfLWnCzfQonMYFjnwMJH1xbXoGDscsUvW2F4DXXn9Acam7ETr6Bisu1MTdBlTkRpokq82/6FvP845nulYDbT3zIVYa/O2rcyrwMRdGYju1994peulC/T5DdqyZYuqYf5WjHFxcaqZT7yDc034ctWEd6oPNNm3Pe0c7AOVJrz0gTrVhHe6DzRiVoJv2+ztA33ahH8V+0Bl4Eia7WlpaUhNTUVFRYX/nWdwFN57cBBJPxxEMpNXehBJRuAzMjKQnZ2tmuXBoEC9BwWqHwrUTF6bG+lfBAXqPShQ/VCgZkKBUqCegwLVDwVqJhQoBeo5KFD9UKBmQoFSoJ6DAtUPBWomFCgF6jkoUP1QoGZCgVKgnoMC1Q8FaiYUKAXqOShQ/VCgZkKBUqCew6lvIlGgZkKBWoMCJbZwPH0/BaoZCtRMKFAK1AiJSUnoFNYD3aKi0TWyl23p1qs3Pvm8FTrEj8WaUvuexiShQM2EArUGBfoaMTA2FmELkjHjTB6mZGTallnnr6P7zAR8OUgeZ8caqNVQoGZCgVKgRhg+YgQGb9yLVYU1SMy7a1tWF9chdlmKEg0Faj0UqJlQoBSoEUSgcet3qRMzWEEzFRGLCIYC1QsFaiYUKAVqBApUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGagQPVDgZoJBeogFKgZKFD9UKBmQoE6CAVqBgpUPxSomVCgDkKBmoEC1Q8FaiYUqINQoGaYMHEiBq7dQYFqhAI1EwrUQV5VgTY1NWHd2rVYOG+u/Zn7Az5r2RIjfzpEgWqEAjUTCtRBXlWBPrx3D2+93wJhc5LQY85SdJ9tX6IT1uHNT9tg3E/pFKhGKFAzoUAd5FUV6L3yMnzRMxoriutVIVp1p9a2pFYDbWOGYkTKbgpUIxSomVCgDvKqCvR+RTnahEVgUU6FKsDBDr6pyAkoJ6KckBSo9VCgZkKBOggFqh8K1EwoUDOhQB2EAtUPBWomFKiZUKAOQoHqhwI1EwrUTChQB6FA9UOBmgkFaiYUqINQoPqhQM2EAjUTCtRBKFD9UKBmQoGaCQXqIBSofihQM6FAzYQCdRAKVD8UqJlQoGZCgTpIbGwsbty44Z97daiteoi23SMpUI1QoGZCgVrDEwId0L8/DuzehdwrmcjNsi85Vy7jel4ubuTnISfzctBlTOaXk8fRMiQMCXl3KVCLoUDNhAK1hicEGhEZhX9+1QVtomPQOrKfbWnXNw5/+7QV/vuDj9Gu36CgyxhLrwH4pGsE/tbqSyy78YACtRgK1EwoUGt4QqC9fRs+If0CVpc1YvntGtuSUgX0mrcMXb6dhY2PEHQZU1lVXI/5F27hg9CeqrBSoNZCgZoJBWoNbwi0/wCM3nlc7YhgO8hU5EDKAZUDa/eJLwVUCqoUWArUeihQM6FArUGBPhcK1EwoUDOhQM2EAqVAtUOBmgkFaiYUqINQoPqhQM2EAjUTCtRBKFD9UKBmQoGaCQXqIBSofihQM6FAzYQCdRAKVD8UqJlQoGZCgToIBaofCtRMKFAzoUAdhALVDwVqJhSomVCgDkKB6ocCNRMK1EwoUAfpNzAO4/efUb9vvuz6A9uyvhKInpeEbt/OxIb7CLqMqay49QjzzuWjRdcINS0nS7DlTEW2rXW/eIz9KR2ri+uDLmMqa8uaMGjFJnQcMtb2/bj8ZpU6+WU/yl+ZD7acqcj2yHbJ9sl2BlvGVOQ4yfGS4ybHL9gypiLlT8qh7EcplzIdbDlTkf0o55mcb3Zvm3hjwsFz6B83yG8Uc7hWoPL8zwsXLqh83TkEYfNWYOT2oxiadtC2jNv3M9oOGo1Peg3E+ANngy5jKsN/OowBKzbjrc++UNPD0tKDLmcq4/adwT++6oKw6T9ilK82H2wZUxmz+xS+Gvsd/tklwvb9OGzLIQxO2aP2o/yV+WDLmYpsj2yXbJ9sZ7BlTEWOkxwvOW5y/IItYypS/qQcyn6UcinTwZYzFdmPcp7J+SbnXbBlTEW80X3BSnwTEvrUKZLS0lK/bazjWoHOnTsXQ4YMUfnrX/+K8IhIDIofgrj4eNsin9+qTRt8+PHHtq8rzvf5vfv2w5t/fktNP0mw5cxEtufv7/wDoV27OrIf23fsiHff+6cj+zEmLk7tR/nrxH6U7ZLtc2I/yvGS4+bEfpTIfpRy6cR+lPNMzjcn9mN4ZKTPI28/dYokPT3dbxvreKIJP3ToUJQUF/nn7GVLWhqSEhP9c/ZSV1urnnXqFOPHj8eVzEz/nL0cPnQIM2bM8M/Zj5P7UbZLts8J5HjJcXMK2Y9SLp1AzjM535ygtLhYSdM0nhBor169cPXqVf+cvaxduxYLFizwz9mLNCF69+7tn7OfkSNH4tSpU/45e9m5cycmT57sn7OXWt8JL/tR/jqBbJdsnxPI8ZLj5hSyH000bX8Pcp7J+eYEOTk56pctTOMJgc6bNw+3bt3yz9nL/fv3UVlZ6Z+zl4aGBhT7roxOUVZWhpqaGv+cvVRVVaG8vNw/Zy9NTU1qP8pfJ5Dtku1zAjlectycQvajlEsnkPNMzjcnqKurQ0lJiX/OHJ4QKCGEuBFPCDQ/Px/nzp3D48eP/a+YRT43OzsbV65c+dXVV1775Zdf0NjY6H9FH6lR7Nu3D2fPnvW/8gSpZZw+fRoVFRX+V8xw9+5d7N2791c/yifbI9slzRo7kKv98+uz6/jJ58q+PH78OB49eqReu3fvHn7++Wdbahuy3y5evIg7d+74X4Gaz8rK8s+ZQcqIbJMMchw+fFiNGAewY33Xr19X63h+n0kN+8yZM7h9+7b/FTNIeZTj89sfiZRz79KlS/45PaRWK/tJtivAi8q87v50vUB/+uknpKSkYPv27diwYYMtzTQ5sX/44QdERUU9Fei6deuwdetWbNq0Sf01gZzkK1asQHx8PN566y1s3rxZvS6Fd+HChcjIyMCiRYuUBEwgIpOCKdvw9ddfq5NBCpJ0iciJuXjx4l+dnCaQzx81atTTfmTZd3YcP5GM3KkxbNgwNagj8yJUOY4iH9mfJvvyZD9OmDAB+/fvV81c2c6EhAQcPHgQy5YtU+s0gewfueBJWRwxYgQ6deqE4cOHq/UtWbLE+PpE0tOnT0dmZiamTZuGgoICdRGfM2eOWoccx5s3b/qX1iMvLw/ffvutEvPKlSuV0ATZnt27d2PNmjXqgqiLyD8iIkKVAUHKxvNl/vLly+p1Odd096erBSond2hoKB4+fIiioiJER0ejurra/65Zxo4di5kzZ6rpI0eOIDw8XMlUrk79DY3wSi0zcFWUgYi+ffsqyfXo0UPVPgX5DXwpYCYIyEr2Wfv27VXNSQrNpEmT1OvJyclPt9kEciHas2cPPvjgA1XLkBPGruO3evVqNbgYqA3Kuvv06aNOREHkI7IzgbREPv7446cXPGH58uVPR3V37NiBcePGqWldpMzJhS5QW5eLhNwTLRd0O9Ynohw8eLCalovRsWPH1GeLzAQppxs3blTTugwaNOjphTUtLU2JW46RnAeCSCzwf9FBzqnOnTurbRHkovp8mZdzQI6lif3paoHKSRC4hUNk+umnn6qT0TRydZcr/cmTJ9W8nOjz589X03KFbtu2rZo2iRxQkY18fseOHdVrcvLIukTgJpDP27JlC3r27Kn2n4xSyz6U5rQwZcoUdYuYCWQfyhV+165dqvYkhVgKpV3HT7pAunXrhjZt2qgau4xWf/7550/FIyeQnKS6yHZ16NABXbp0USeeCEf245dffqlqioLUamSbTXP06FFV6xTatWtny/pE1m+//baSm5QLaUbLcQp0Jcl6li5dqqZ1kbIdqGHK+SXClovg+vXr1Wupqan45ptv1LQOUpuWc0rKmtRGny/z3333nZK0VJBM7E/XClQK6RdffPH0Zle5YrRq1eppE9skUmhkh8tJ/+DBA7XDA80LKcAiV5PINgUKpQhMRCYUFhbi3XffVTUeE8j2iFhatGihms9SKxThBCQjNd9Zs2apaR3kWMnxEalJd0G/fv2UeOSkt/v4SY1dboWREzJQe5GT5l//+peRW7akNSCfJSPG8rkigaSkJLVtga4WWa9c7E0i/XjSKpJ+SbmFT8qk6fWJJOV4SW3znXfeUdsq05GRkep9acHIek3dsjVx4kTExMTgwIEDqkxKDVT2Y6A/dOrUqUqouiQmJj4tC3JRb9269dMyL7dpiTxF1Cb2p2sFKreKyJU/0OSVe7hMnOzBkBNCrsCCrE9qF4GdKztbmmumkL406dcNIM0XkZsghTcsLEzJxyRSc5Irr5wIUrsW5MRs2bKlulrrIsLv2rWrKoRSm5GTTuQVEhJi+/GTfi7pX5W+tUCflzTj5YIofV+6yLEJdOFIH7Zc1GVfBmos0iUhUpX+a5PIhVua7YL008n+FUyu78cff3za0pJaoJQN6SsMXNDlgivykYEfEwQGx6TpLJUS6baSloKIWi6sIjUT4w1yAQ90QUitNiBlKfPiFOlGCFwkdPenawUqV4znmxVy5bDj/kzZgXKySUeyICeJnDC5ublqp8oV01S/3YkTJ5RkpN9HTnrpE5XmgwhcCqnINNAXqov0m8lnyefKYMf58+fVa1Jjk9ekEM2ePdu/tB719fWquSQ1aJGy1ESlVipXdtPHT042qSnJgJEMeEiTWtYtJ4xsj2xbXFyc6h4xgbRE5EZ2qRHKwIf0s0rfrpQLWZf0xcrgUqC/2QSy/2TfBe4skO0UKZhen1xwpPxJ+ZZ+QOlWkia2XIxkXTIYKAOAphCBHjp0SJ1fcl+31Ohlf8p5sG3bNtUak1aTDlIu3nvvvacj69J19HyZlwuGiFT+Dyb2p6v7QOUWA7kKSy3A1Ejgb5ETRA7i8/2OIh65IkvhMTWSKwdIBgRkdFBkIoVTCovUtGVd0lEvV3xTSNNFCo5cgZ/vEpATRbZLCqzpmq4MFEkhDXyuXcdPTvzRo0eri1Dg+IicZbtkP5quDUoNUNYlF7rArT4iGlmf9LOaqOk+j3zub0eF7VifNOGl7Mn+ks+VsihlUsqMrEua2qaQi4F050iXgXSTBZDzTsqHvK57U72UO9kOubg9X96ClXlT+9PVAiWE2I/J2vOLEDE7sR6noUAJIcQiFCghhFiEAiWEEItQoIQQYhEKlBBCLEKBEkKIRShQQgixCAVK9GmsR11d/ZPpmhJkZOxFkT0PzbKFkmtHcPRSrn+OkN8PBUq0uHF6E+IioxAd1R1jErag9Ho6hvTuiytPvoVoiUu75iBh64uez/gYy+aOxL4Cva/8PaMJO6b3xITlTx59RsgfgQIllik+vRztW3XGruwKPHpYglMn9uHkzvUYFZ+MR3iA9fNGYeSI6ViTmoJTNyqB+9mYP2oUpq7Yi9r6Rty7dhgTR47A4h1nUff0IU0N2Di6F+ZsykTd/ZvYvmEDZk8djnELNuFhYxPOpH6Pt//Xf6Ftn1nIrwIKT6di2IiRmDh7DUp97xddPY+NSQmYnTQPyxNW4dJtqRk/xpHUbbhS2ojyzN0Y4Vt+8pwk/HTkCO7WVmHZwJFIOZWHs6kJGDl8Go7lV/q0Ssh/hgIlFqnGjKiWiF/25BmqAQ4kxGPk8v3Y9+Mw9J24CieObUGHd/+MOek5WDWuEwZOT8GRg7twOusXjItsg+lr9mP33l3IKvUbtDYfQ3sOxLa8OuSmDcf/fLsN0nZvQ99OPZF07i7KTqxA+/bDkH72Im4eT0G/sHjsPnse/Tp/iEWH87Bm6Mf4R7cJOHflAiZFtsTCQ6VoKNiHkLCBOHk+AyPCI7Bs33Gsm9gF730zDIUlBRg7YgTWblyIkO79cCh9P1KP/IJHZh8TQF5RKFBijYcnEPbRZ9jyq1+brsPKbyOxctsOnxyjkaGeCHgHg6MG41hZHTL3zkfIl2FY6xOdz5TYMn8ounTrj31Z957W+OpvpiN29DDc8Als+3fdMH6NPAi3GhMmDMX2gnrcPjgHPWc8eUL6pvEd8N/vfY1Ro4Zj5IylyCsqwLS+HbEx80n/wfYlQzFnzyVsnRGNbzecwaWUqYid9OTRgTf3zEff77ajIm87xk6YiuKS6xgT/hWGTUnE7Rrak/w+KFBijfqbGNTyXUzadE3N3rqYhRtFlzEtYgz27t2I7h2G4mp9HdJndcNfQobhSs4tlD+oRuGeufik8whkXM7Fw8e1ODp/ID7vtxiB5+EU+CQbM3gmHvma3fMjB2LH1ceoLzyA/tF9kedrjW+bHIrJa+Vh14/xbVQo4pcfQl5ePh5IS700A0NCxyLHP56VuXMBPmrZCl36TMLNWmDXhAHo98NRVJdcQdcP/4yxu3JQciAJ8f0XIKugEA2PbmLIVx0wcZuZB1qTVx8KlFgm98BSdGnzhXoc4OiZqcjLPIYRI+fj5qNS/DggBKHhkYjvE4pRCzfjbu4FjIoNR3R4XyxNv4Kbp9LQOzoK3bsORuovzx49djxpOobMPezzYw5GD56MS1VA+alVGDroR189FDi/aihatovEvpwaXD+0GuFh4ephzauP5qP0zGbEjV+JwI+GVGWn4l9/+QSrfU1/4ebRZIR+/g36Dh+MXuFh2Jf9AMeSZ2Nmcjr2J09GdEwfxIxYgJxyjREw8lpBgRItHj+8q56RWa26MJvwuOFJ9a+p/hHKS8t8jfpnVN0vR2n5s2dBVpaXorzy189ibKivR72055sann1WQwMaGgON/Ebcr6xAdd2T+Uf3ytX67z+qQ6Nv+bpfPeO0CU//mZ/qexW4++DZOuvqHvs+0UdjDUpLSuH7GEJ+NxQoIYRYhAIlhBCLUKCEEGIRCpQQQiwB/H9jzXTjvu98qQAAAABJRU5ErkJggg==)
The five-number summary does not include _____
The mean and standard deviation can also be used together to convey the center and the spread of a set of data.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
The skewness of a distribution is indicated by
Histogram is also used to calculate median.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
The skewness of a distribution is indicated by
Histogram is also used to calculate median.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
Which is the highest frequency interval in the histogram?
Histogram is used to calculate median of a data.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
Which is the highest frequency interval in the histogram?
Histogram is used to calculate median of a data.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
Which of the following doesn't require to describe the histogram?
Histogram can be used to calculate median.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
Which of the following doesn't require to describe the histogram?
Histogram can be used to calculate median.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
What is the shape of the histogram?
There are many shapes of histogram such as normal or symmetrical, skewed, uniform or rectangular, etc.
Answer the following with the help of histogram:
![](data:image/png;base64,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)
What is the shape of the histogram?
There are many shapes of histogram such as normal or symmetrical, skewed, uniform or rectangular, etc.
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
What is the interquartile of the data?
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
lnterquartile range = Third quartile – First quartile.
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
What is the interquartile of the data?
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
lnterquartile range = Third quartile – First quartile.
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
What is the first quartile and third quartile of the data?
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
When evaluating the quartiles, always remember to first arrange the data in increasing order.
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
What is the first quartile and third quartile of the data?
Answer the following with the help of the data:
5, 5, 6, 6, 10, 15, 15, 20, 25, 30, 35, 45, 50
When evaluating the quartiles, always remember to first arrange the data in increasing order.