Semua persamaan linear adalah fungsi

Grafik fungsi [math]y=a^x[/math] dengan [math]a>0[/math] dan [math]a\ne1[/math] mempunyai titik potong pada sumbu X

Fungsi [math]f\left(x\right)=x+1[/math] dan [math]g\left(x\right)=\frac{\left(x^2-1\right)}{\left(x-1\right)}[/math] adalah fungsi yang sama.

Perhatikan sudut berikut[br][img]data:image/png;base64,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[/img][br]Sudut A dan B bukan sudut berpelurus karena letaknya terpisah

Diketahui kubus ABCD.EFGH. Manakah pernyataan berikut yang benar

Berikut pernyataan yang benar adalah ...

Nilai dari [math]\lim_{x\longrightarrow0}\left(\frac{1}{x}\right)[/math] adalah ...

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[/img][br]Menurut 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berikut.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALgAAACtCAYAAAADKLXvAAAcyklEQVR4Ae1d+XcU15X2T/MHzI/OmUNmMvGMM0smZ044XuKxk8AAxmAnGXYMOLHBIGOCjc1isRkwBgIGLLEaC7Fj9kUYmUUgDGYXO1owArSCBGhfEd/cr1rdVLe6W13d1eqqrnfPkWp79arevV+/eu++uzwFRYoDccyBp+K4bappigOIW4BnZ2djzpw5qKqqUmJ2MAfiEuBXrlzB7NmzMWnSJCQnJ+PevXsOFrGzmx53AC8oKEBSUhK4TU9PR25uLpYuXYrq6mpnS9qhrY87gFdWVqKurk77W7dunSbWhw8foqGhwaEidnaz4w7gbnFWVFRgw4YN7kO1dSgHFMAdKninNFsB3CmSdmg7FcAdKninNFsB3CmSdmg7FcAdKninNFsB3CmSdmg7FcAdKninNNvWAK+trUViYiISEhIwfPhwbN682SM3pQf3sMLRO7YGeHNzM86dO4czZ86gb9++SEtL8wiTS/ObNm3yHKsdZ3LA1gB3i4wgHzdunPtQ2+7atQvz58/3OqcOnMeBuAD42LFjsW/fPi/p0dgqNTXV65w6cB4HbA9wGle9/vrroEGVnmgHvnHjRv0pte9ADtge4Ldu3cL06dPbiE5NMtuwxJEnbA/wx48f+xWcArhftjjupO0BHkhiCuCBOOOs8wrgzpK341qrAO44kTurwQrgzpK341qrAO44kTurwQrgzpK341qrAO44kTurwQrgzpK341qrAO44kTurwQrgzpK341qrAO44kTurwbYHeHFxMWbOnKlFsdLbpailemcBOVBrbQ1wuqzRVe3rr7/WtqdOnfK0s76+3suFzXNB7TiKA7YG+NWrV9G9e3d8+umnmDBhgleY5G+//RYLFy50lDBVY9tywNYAP3nyJJ5//nkcP34cH374IRYsWOBp4bVr1/DVV195jtWOMzlga4Dn5eVh0KBBmuRWrlyp9eJuMXL4opyO3dxw7tbWAKfY2Et369YN/fr1A7173KQmmW5OOHtre4BTfNSk+Aa4VwB3NrDdrY8LgLsbo98qgOu50UH7jx510INCf4wCeOi8UiWDceDHH4EjR4KViMk1BfCYsD3OHioTeqxdC5SVWa5hCuCWE4kNX2jbNkDyklqRFMCtKBU7vdMPPwAHDlj2jRXALSsaG7zYnTuQ8GFAS4tlX1YB3LKisfiLMe/omjXA/fuWflEFcEuLx8Ivt3s3cOmShV/Q9WoK4JYXkQVf8OxZQIzZ7EAK4HaQkpXesaQEYIp0ST5gB1IAt4OUrPKOTU0ucBPkNiHbA7xMFhfo8LB8+XKUl5d72K6W6j2sMG+HSQYkm4adyPYAX7p0KQYMGIDVq1fLQtqTlTQaX+mTUtlJKJZ814sXAU4sbUa2B/iwYcM0gPvafh89ehRJSUk2E4dFX5cdB5fiqRq0Gdke4Nu3b9eGKEOGDMGyZcs87Kd/Jnt3RRFygBaCGzYARUURVhSb220NcA5D6LZG2rp1K5iMyk3K6djNiQi36emAzpk7wto6/HZbA5x5Mj/++GPNm6dPnz6y7vBk4UFNMk3Akvi1YscOEyqKXRW2BribbXQ6LvL5hCqAu7kT5pZZ67gUX1cXZgXWuK1DAU6zBdrFdwQpgEfAZSb2Ypbo/PwIKrHGrR0KcKpQx4zpmIYrgEfA54wM4NixCCqwzq0dCnDJ2YqEBODu3egzQAE8TB5LKA58802YN1vvtg4FOJufmAiIijrqpAAeBotralzjbvZEcUIdDnBZcBT9dPS5pwAeBo9F1YrcXM+NuRdP4/vjp3G7oBDlD6o95+200+EAP30aGD8++ixSADfIY465Dx9uvekx1iQlYvznyfhux9f4j3/6R6QekaGLDanDAV5R4RqH68xGosI2BXADbGVEMGpNWtOiX0pbgZd7DoGmIKy+gud+9StcKLOHeaxvqzsc4HwB9uCiuo4qKYCHyF7quWln8uCB54aJg3+HhPmuBZ6z2+ahc9c3Ue+5aq+dmABcrFslpmB0GaUAHiJ/uVIpYaj1NPy1/0Ji6jHUVd7F4C6/xB8+XqS/bKv9mACc5iMSzjuqpAAeAntpY0JbEx/alfwRfvrMLzFtwRKMGPAGPl2136eEfQ5jAnCuAr/3XnQdshXA2wFhYaHLStAr5EMLUhfNxrbMa8jLvobqijvo/bsXsPfKE0eSdmq13OWYAJxc+OQTcxfLCkVgLTphKYAHwVpjY4BQaw0Y0vsFTEk5iOrqaqydPRoDRs6APaeXrvbHDODUhycnBxGCgUu0CX/ppZdECSA2FK1UJ5MnXycI9zXHb/fuBS5c8MuG8puXsDx5EVJSUrByw07U2Bnd0sKYATwrC5J2xKOZ8svsUE7SD7Nz5874/e9/71U8Sx5AP01FPhw4fx5IS/M5Gb+HMQM4tVO0S/GxcjXEadqD08lh/vz5YsQ1xmuIcujQISxevNhQfXFf+N4919CE3vEOoZgBnPyV5GjYH8EE/caNG/jFL36B/v37o1OnTppXj1tuyunYzYnWLV3P1q+PrEfxqdIOhzEFOKPuzpsXPpuapCe6ffu2BDc9oA1RSnTxOtQk04evjETFiFQOo5gCnHY9o0ZFHiSJ2pOLDGugIwVwHTMuXwZ27tSdcM5uTAHO6F/0E87JMZ/hCuCtPKUbFZfiJfOzEymmACfDmbuVIabNJgVw4SjVpgz5wDjeDqWYA5wWmpMmmc99BXDhqWiSom7VZr7oTK0xJIDfzj4vXjiZKCyr8nr47dxslFf5//TVPihBTn77wWL4BX33XfOX7R0PcObM4Sze4dQuwPelLsakuV9i2nt/xpLtP7Sy6xE2JE/DxBlLcK/Sf1iBmvu3MGfKOCxY1T6T2YPTz9VMcjTAq6QjSk0FmP3M4RQc4E0F6P7CC7ikuei1oL7RtUCQ9tU09HlvCsSiITi1VGHC0DeweIv7h+G/OH1cZa3GVHI0wLdsAWSNQFGQpfqGylIsGT8MT3f6NTbuTkd5bYvGr5bqO3ij28s48qM4qLZSU00ZtnyzGbmlLr+97ZtScSbXFUO67MJedOs5EPeD2DQwVsr77wNmLrA5FuD06O4Ir2638C2+DdiDN9dXY8GYAXh10Me4eiUb1Q2yEiaUn7kWL73SFzp44/yJk5g3+V38eeICpO9MkUWXXtjzg6CW1FSCbq88h7QgJpc0AqS6kOpas8iRAL95ExIz2iwWxkU9AQHO1k0b8Romp3rHeMhYPR2/HTRB1/jHaCH2H1zHy//5LBJX7dZd424j3u7RBUm7/VuvuQvT037VKvdR5FvHAZzjbYZao9OrIg8HAgO8uQyvv/QCtp8t9hTmzqGvp+J/+ozzOseDh7mH8M8/fRbf3/IdmTdjxKtdsGiHWLEFIRq50brQLHIcwKkxMbBiRu0VfY2pbOFwvbTU3CGiWXKMtJ6AAK/OO4RfP/873HANqz3PyTnwlQxRBnqcUGsflOF0RjoWLZ6LIa/3xJJdp1BWXID65lbb7Edl6PnbF7DtnGtM7qnIZ4fjb3r5mBW70FEADyHbMBUrVIvPnQuMk/6JvOawUILzan88Zli9WbMAZiph+XiggAA/u20BXuw+vI03R/P9bPTo8grOlbpmjdcPr8eLv+mOywWVyPl+I/q/NQKHT19Co4yrSZU5B9Gla28U+VeXuwq1/v/iC5fBm9fJEA7y8/PxiNZyOnIMwNvJNswOY9Ei11oDoxlw1ZhzHfbgEl5dW+wk6xjMimVpssLoY++8A6xYYX+gBwT4sgmDMGzyKh1knuyumTMawxKTXCdamtHcCmaeqKmqgO4Qs0f+CVOW7n1yc5C977835oxMI6sZM2agV69eGDlyJB7S2bOVaiQM2cZo2AC4H2CFLRFKOxOi1YdoZ//558Bf/uKKJMbhiBEi2GfPBoYOtU1KTL/N8wPwR8jJykCf3gPww80ngPG6u7kS86cmYMbCdais86//q68qxdK5n2DSZ0mobx2teNXh54Ch8WhdGKoTBG2+k8XvjWay/fr1kwRg5zy1/igSSklJ8RzH5c6uXW2yDVMjxWZLRhesXOnqmSNpO+dG7M1nzrRlih5/LmuNOJa+F+eue08u/THp9LFMlDz0v1pWdS8fmSez/N0W9Bx7HYbIM0JMI0iXtbu6sLV7xe/wC4554pX8ZBtmeBN2EHToNtO+ih+Kzz4DRoyAZLKzF0P99OCxbUBmZuixCznuvtX67WUCqkk6q61aUZvFbRpBd7Zhab+bOBobOBCgP3G0iMGa+GXQ+ZVE61Gm1Ws5gFOdS+OrgoL229go4Q8GilQXiM3tW2+9JWpg0QO3klUnmY8r8zHmr3/FpWL/Xz73+wfc0oieqbSp1xMiv6ZMAUaPBhjqJNpEKwDJ3ChJd6P9JHPqtxzA2SyqsijDUIgua5+Kc+c3PkHbrQrwg8sn4qm/+3vsyHIBNJQ2epWhDo8DYyFpOt5+G/jb3yAO116lonrAeS07ITuk77EkwBliWTq5iMiKAC/PO4FZkyaizx/6YNUBWWExSoxlsnePdteZM5AEuICEhIkJ0Thu8uSYPNrQQy0JcC76cLJkYGGuTaOtB/BmfDYuARlnr+L9/3sVC7a5euE2Lx7oBGd366TrlCW2ffshkQRim76SzkLshBjAycpkSYCTYbRNiSRuj9UAnp2RigHDJ6O2rh6jXpPwaKsOhY4LTiY3ietZbSE2SY89eLB5K76hv0TbkvzN8StiZWd9ywKcHvdcPg7XhNZSAG+pxtghvTFh5iKsElXEq7/+F0xcKmPpUOlgOnDtJFJaJ3hW0mJQ68UfnFXH45YFOGVPm4kTJ0JFgXc5KwH8UMosvD/ja88LznmnBwYmpniOg+7kXAMO7MCyVFlwGe530TLo7R1xkbFtONG1Ilka4IzNLivxYZFVAF6Sewa/+bd/wJgFW7V2NDwsxB9e/Hf8d/cElLcX2bJKVpJ3rMGSRXV4V75mVjWA4go0VYetyp2w5BWtmywNcGbVoBpMt0AZMh+sAvDqB/e0LGVFpa7koM31VbhTUITCOwWoa2pHt5e2Ccnj8zHqA+uC2y2QjAyIPVDkQZzc9Zm1tTTA2Ugu3evWb0Jut1UAHvIL+xY8m4Flg49hpAzT2EPagWh6azWHIssD/NIll8qQC3hGyNYAv5uHNb23YPj7YixlI7tsWiDKgrI+n5URkUWlrOUBzlZT32o0K5t9AV6Dg0NSMeqtKlTYpOfWI3PhQiApSX8mtvu2APgeWbyjhZwRsivAz0/ZivF/ykWZjyeVkbbHsiwdJ65cieUbeD/bFgCnQdFwUZHRadwf0S7cl+wI8JxVP2BujwwUifJEkTkcsAXA2VR63PuadzMnz1eycNKzZ0/NqpCua26qEp2aXTx6Sh6WYPzQYVj80mwUiieOIvM4YBuAM/sG3a/0ZppMNPWJjF1oUUiT2Q91bvmlYk66LlSTRPP4GVZN36zNxK+eegopK1eEdb+6KTAHbANwNoE9ON2w/NEIcTfRm8zuFO9Z5u6xOh0XL7ukV/Yga8s+PKivs/rr2u79bAVwumFRDaWPbUPn4vcl7tuXX37pxXyOwa0+RMmivU1nCbOx8TAu1dTickm5VxvUQeQcsBXA2Vx6ersjYNVLj9ejRw/Nm4cOxxyquKlSpvMbGPzdopRXIO5fXYtwbSrf8THu1tTjfo3qwc0Wl+0Azl6cdg9UR5WX35Wl/LdFT/5X8fx+B7t37/bwx8palNviWjZoYBOOjRAXu0axORUiuGsafKOCeZqjdsLkgO0AznbScq29LMlWBXhRMfCmeKenJeyVSKZZHrEdzs7H1WKZSSsylQO2BDiNr+jdHSx+ihUBTj/hN8WXcceU87I0m+YlyMr6BtQ1GrRH8KpBHfjjgC0BzoZwHM5EsoHIagCn94tEtcOmZOml94jrWbP45emo4EGlmM+qMbiOJabs2hbgzIpHvbgumJUXQ6wEcA3c8q4bN4nr2d71ElhExik+dDT3Nq6XuMbjPpfUYQQcsC3A2eYjR1w2yLr4Nx5WWAXgXKCianPtdnm14+ItfP6s5x31O43Nj9D0qEV/Su2bwAFbA5ztZyRU5lvyJSsAnGNuzhXWb5O3KxQLpN07fV/Tc3y56B5Kq2o8x2rHHA7YHuAE0aBBQF6eN0NiDXBG5iK4NxPcTfddIR+CZBs+dqMA+fcrvBuhjiLmgO0BTg4wHp+vu1QsAc6sCYwTuEtTyz+WmaUEDmwnGmazhKZqYbARRaZyIC4ATo5Qo6K3NowVwBkFoG9fgBmcNWJahRC8NU78WIjiCpsagbc21YqbuAF4tWCDWpVvv3WxORYA50KqhCl/EggnR7ryELMNn7tdgtJKNQY3+0cSNwAnY/LzXQCjH+fjxxVYv552Hh1DjMQ1dKjOKYO2BPSWprdGCNQkqiA1RAmBUQaLxBXA2faTJ13hxM6ff4g9XFCJMjFrCr3JGaRIl0EFMJht+MD1m2qIEgVZxQXAmc2B9t9u4rC3V68aMaGV2WcUiRFeqSlh7+1FYWQbzi4tB5frFZnLAdsDPD09HT/72c8kxcZnXpz57rtHeO65AjAUs9kkcfc1z/E33wSYOMuLGDshjOAgNQ1NaFYLPV6sNOPA9gDPEwU43dX+5hMc7+jR3aI6XKJNPBmw3SyidoTRthhSrk1yM463w8w2nHb5BgofVpn1mqqeVg7YHuBsB5NQzaYnhI6Ki4uxY8dqLdPHBx8A/Lt2TVfA4C6HIx995NK3t+m13XVRY0IleBhUJCrC2kZvA6wwqlG3+HAgLgDOVILTp0/3ahq96jdskAWWVuKogeNl9rzUsoRCtCNhTBb6MjNsBfEbMFUIFeAHD4ZSrd8yd2WZnvYoiszlQFwAnJNMX/9Lf3pw+nLSbsWdtppRmDg35ToMg7gzIzb16MwmNnGiq7eeOtWF26BxyrlKyTRnAdHfvtB2X8xVtijts8lwibgAuL9W+wO4uxytD5nuZr1YrnJkw1wzzEDILXt4eu5TEUIz13aJ9iUcd7cZkLd7p1eBKtGgKGtCL5aYcuBIgJvCOXclfrINuy8Z2d4Rh4dGf3a/RipRZdtwQAG8DUsMnOC4Zv9+AzcELro9Kxv3a5VHT2AOhXdFATw8vrnS/XKMYzSuc4Dn1TU1q6X6ALyJ5LQCeDjc88k2HE4VvvfQ4aFBaVF82RLxsQJ4OCxME494kxPS7Lmch2pZzVRkLgcUwI3yk+oXKsdNJloSPja5TlUdoABuBAXUG3Ldn8YoJhLBnZl7R7QoLSbWqqoiBxTAQ8UBVXhczCmUuGsmEwF+OPuWUhOazFdWpwAeKlO/+y6qyeEZzF+R+RxQAA+Fp7TSYlbaKBF78DSZZCotivkMVgBvj6d00+FSfBSTsbP3pk+mWqpvTxjBrzf7WZNQAA/OM9e4+9at9kpFfF313hGzEPfE/HOVBK2s1fnBxi3AG0XTsS1Ej/aArKUJLJfjO4D2XM3vgKfE/yMuXryogZz5m0ghA7xerOb2iP5369atMhzd4fVHf0jmx1m9erXmG+l73cjxFnHWjbQevs96WUb/QLwcuG/k+Sy7VRZyjohJ4fdjx+IbMaZKSUkxXIfvM7dv3645ZnDre22r/BBnL1uFbX6u+ZZ118Mfr+81o8dslz95Gq2H8qL8jd6nL085sZ7NYrgfjszcdR0Wl6uJYuu8kLbQRgD+SNRkd8TuOT8/H7fkk63/Y+qQ0+L8SIaxjP6akX3Ww18g6+G+kXt9y16+fFn8JpOM1yHPzb9+HaVz56JE3OGu37ih9Qi+9Rs9pmvdSvnR3JD6/N1bLLHeeL5Q8giWl91F2b1SPLx/D0UF3ny4efMmli9fjuvyjv7qMXJuxYoV4vxxKSJeU94cFrhTyBh5vr4s61kjc51Tp06F/T6sg3yeNm0aTvDrawTgWmkb/eM4jL1BWEQTWAFSLKi5rgLb92ZiS/op7Dh4BrfuK0/7UOXQJF4p/NGeZOyQVgp5iOK+wS7bYA4PQdtw7BiQkRG0SLQu1pfdwdtj52Hn6XzcvnAC/9o1AScKzV01jda7W6Heh6LxuubjeGsqwDlOnzlzppZ1eKkEC4l08WLevHngUCMY8ZM2UCJdTpgwQTR5T+ypwwI4tSWbNrV5HLMpH2Ew8jCJfFgrS/x8TyauZepDf5T6ZTLe+UIWlITKr53E/777Bap81n84Zh4wYIA23GmJwEWOz2CyXH7OI6nn6tWrEouxr5bpjvvhUrY4azOh2OjRo0GHcbPIVIDz05CQkIArV67gtddeEx9HcXIMg/ipIbh/8pOfeMZS/qphuf79+4sf5bcYNWqUNnZ3lzMMcP44qO/WhaciMDkf6NSpkwSq2uKu2vC2XNIzU3gcp46UMLiLFi3yU0cj3hk1DRvOl2vXFs+aiwGzdnuV4w+D7eSPulevXtr42auAwYMh4oX9zDPPGLzLuzjlRFBy7BvuD4VyHC5e3Zw4M3nvd1w1NokiAjgbxM/CgwcPJDlrBfiiJOao5K+aE6pQiPXwftbD+vglIMOY4JWz4kBUJFmo3mT0HaE00XyMY/y0VjIMcNFg+MaV4Hv9KIF8porn8SY/Pbv7We1t9YKnIDnjb0vNGDF8PMavOY6z5y6g98CPMGXzaRTckQWg1sLuLyLnFj179gQjB4RLu2SeMXjwYC39Yrh18L6xomnq0qWLJgdOfMOhkpISrQ52jvw6sYM0iyICOHumKVOmaI38VOIXU9NSKMZIfMn9Bly5+IPg/WTWZPH8JThJ7BnaAzh7IVJEAJceERIhKxBx2OXrtR+obKDz1Mu/J+78DFIUiM5nHsarQ6dizdEcHJch0fj5m3EurwSPWm9wA5w/uo8lICLVauEQAfXss89qP9yXX35Z+7KEUw/vYV38srADYPvCIWrMunXrpnVuVBEy56lZFBHAyXCC2v3HcVTnzp21zzob3tAQugbAXQe3bvqLxEMO9rniF6OfxCtm+Db29hwruynkHpzWgcyIHGQ8O0lc7lP95UlxP6ydbbXEduaQbcyYMZoaNdyel/VwiELVHnW9c0WVGQ5xxe/zzz+XeC8f4umnnzbUGemfR1nNmjVLfD/OY86cORKRQEIShEHUeA2T7L4c0nL49hEjLJlEEQHc9x346+Pn6i3JujRI8opQZxsJMaDPBToYBCHqO//4xz9qwxPDk0zaddO+W75EwYiLRpFMMjnc6tq1q8aXN954Q+IDHQz2uIDX2KFwnMr2crKqX5IOeFOQC6zPN+RdkOJ+L7Fz6dOnj5ZtmsPLcCkrK0v78nMIx8mvWWQqwM16KTPqCakHZ+6Tdn5AZryLqiN2HHAuwOlTuW9f7DivntwhHHAmwJkLnEMTP+aVHcJ19ZAO44DzAE5QM56JiYsJHSYt9SDDHHAewBlds4NMYA1LQ91gOgecBXAu+4umR5FzOBAXAM/NzW2jkmyjRWH0V467DejmnQOD+G2p7QFO/fTPf/7zNt47XGTymMuKvlcL+SD2woqcxQHbA5x2HVzNpJWdnjLE5PXLxYtdp0LMNqy/X+3HBwdsBXB6TTMfDzOq0YqN5gAk2q9wtVFPXD5exiGJDF9AQypFjuSArQBOq7yzogFh75yZmQnaZpBoRbhu3TovAdaKncoG2qYQ+Dova69C6iDuOWArgAeSRmJiYhtz1iqxM8kUa8TH+fmBblPnHcCBuAB4mQTFpMmtnmplGX6/WAHK9FKRgzkQFwBvIz+xYqwX75yz4kGjyNkciD+A09+Rrmc+Pbqzxezc1scfwMVeGjk5zpWoarkXB+IL4BFmG/bijDqICw7ED8C5ShlhtuG4kKhqhBcH4gPgzDbMRZ0Isw17cUYdxAUH4gPgDLUWQdCZuJCkaoRfDvw/fgRlPV4E86QAAAAASUVORK5CYII=[/img][br]garis g pada gambar di atas bukanlah garis singgung

Nilai dari [br][img]data:image/png;base64,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[/img]

Empat bilangan ganjil diketahui mempunyai mean 8, modus 13, dan median 11.[br]Tentukan keempat bilangan ganjil tersebut.

Diketahui 10 siswa mengikuti suatu ujian. Jika skor maksimum tidak diperhitungkan, rata-rata nilai mereka adalah 65. Jika skor minimum tidak diperhitungkan, rata-rata nilai mereka adalah 73. Rentang ([i]range[/i]) nilai mereka adalah ...

Median dan mean bilangan cacah berurutan selalu sama