А) [-6;6) B) (-6;) C) [-6;6] D) [-6;]
4. Функцияның ең кіші оң периодын табыңдар: ![](data:image/png;base64,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)
А)
B)
C)D)
E) 4
5. Өрнектің мәнін табыңдар: ![](data:image/png;base64,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)
А)
![](data:image/png;base64,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)
В)
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)
С)
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HjxjfffGP4WPWvM//qZsgk0mN7kZGR6ijGxR2s8/jrl19+GR0dbfhY67wqDe4jPbb3ySefuPiov7+/Zz+DOX/+/OZfWBGZR3rs7fLlywsWLHBxh2effdYip8jYvn37nj17DB/bvXt3X19fw8dCN9Jjb59//rnr58h49gPMDofDOmdcRLqQHhuLjY11fVaw8uXL169f37T1uHDr1i3Xe2cZ07Bhw5IlSxo+FiYgPTYWERHh+jrl1tnlmT9/vqqP4WN5gNm+SI+NTZ482cVHQ0NDrXMOZh2vF82VK1fbtm0NHwtzkB672rx5886dO13coUuXLtmyZTNtPS7s3r3b9VIzpmvXrgEBAYaPhTlIj119/PHHru8wYMAAUxaSNh0PMGdxviBWx1iYg/TY0okTJ5YsWeLiDvXr169YsaJZy3Hl9u3bX331leFja9asWblyZcPHwjSkx5bULk9CQoKLO1hnl2f+/Pk3btwwfCy7PHZHeuzn+vXrs2bNcnGH/PnzW+fx12nTphk+Mzg4uFOnToaPhZlIj/2ob+aoqCgXd+jTp4+fnyW+spGRkTt27DB8bLt27bJnz274WJjJEv9B4b64uDjXr1NX0bHO60V17PJkcZ6dR8dYmIn02MyCBQvOnj3r4g5t2rSxyCmKb9269fXXXxs+tmTJkg0aNDB8LExGemxm4sSJru8wePBgc1aSJtUdHc9gZpfHM5AeO1m1atXevXtd3KFatWp169Y1bT2u6Xg6j6+vr3Weoo3MID128v7777u+w6BBg8xZSZoiIyN1PIP5qaeessjhJDKJ9NiG+k7esGGDizvkyZPHOr9y1vQMZo62PAbpsY0JEya4vkOfPn0s8pomTc9gDgsLa9mypeFjIYL02MPRo0ddX7HTz8+vf//+pq3HtYiIiJs3bxo+tnPnzlmzZjV8LESQHntQuzyuXznRtm3bggULmrYe1zQdbfXs2VPHWIggPTZw9uzZL7/80vV9hgwZYs5i0nTw4MFff/3V8LGVK1euWrWq4WMhhfTYwAcffODiosbKo06mrce1mTNn6hjLLo+HIT1W9/fff6d5/PLKK6+Yspa0xcXFpbmDlgFZs2bt0qWL4WMhiPRY3UcffXT79m0XdyhUqFC7du1MW49ry5cvv3jxouFjmzVrZpFL+sAopMfSrl27NmXKFNf3GThwoHUuRDVnzhwdY3v06KFjLASRHkubNGmS699Sh4SEWOd16urYcMWKFYaPzZs3b/PmzQ0fC1mkx7pu3Ljh+qLGWZzX3syZM6cpy0nb/PnzY2NjDR/buXNni5x+CAbiK2pdkydPvn79uos7+Pj4vPrqq6atJ01z587VMZajLY9EeixKReejjz5yfZ/WrVuXKFHCnPWk6eDBgzpeL1rFyfCxEEd6LOrDDz90vcujDB061JzFuGPevHk6xvJ0Hk9Feqzo6tWrrq8sqtStW7d27drmrMcdOk5IyNN5PBjpsaKJEyem+fJLS+3ybNq06dSpU4aPbd68eVhYmOFjYQWkx3IuXLiQ5i+2SpUqZanTR+h4BnMWHmD2aKTHct555x3XT1/O4tzlcTgc5qwnTbGxsd99953hY/PmzdusWTPDx8IiSI+1HD9+/H//+5/r+4SHh1vq/MQrV668evWq4WO7dOnC03k8GF9aaxk9enSaz8p75ZVX/P39zVmPO+bPn69jLEdbno30WMiOHTsWLFjg+j45cuTo16+fOetxhzo2/P777w0fW7Vq1cqVKxs+FtZBeixk6NChiYmJru/Tv3//bNmymbMed6jupPnIVAZY6ogSOpAeq1i6dOnPP//s+j6BgYHWOTVPkjR30zKAp/N4A9JjCbGxsa+//nqad+vVq1e+fPlMWI+bbt26tWrVKsPHNm3alLPzeDzSYwmTJk06evSo6/uofYHhw4ebsx43qaOtu3fvGj72+eefN3wmrIb0yLtw4cK7776b5t3UN2ThwoVNWI/7dDydJ2fOnC1atDB8bIrOnj1bvHjxuLi4+29UO1znzp3j9/q68fmVN2zYMHXk4vo+vr6+I0aMMGc9brp9+7aOo6327dub9tSB//73vw90J4sz8XTHBHyKha1bt86dC3V26tTJOufHSLJixYro6GjDx3bt2tXwmSlSi0/xfPu9e/c2ZwFejvRIiomJceeSoT4+PiNHjjRhPemycOFCw2cWLVq0Xr16ho9N0dy5c5M/Cbt+/fplypQxZwFejvRI+ve//53mo8tZnMcgZcuWNWE97ouNjV25cqXhYzt37mz4zNSkeFoSdnlMQ3rE7N69e/z48WneTe3yjB071oT1pIs6Trxx44bhY01Lzw8//HD48OEHbsyVK9dzzz1nzgJAemTExcX16NEj+WOcyXXq1MmChwBLliwxfGalSpUqVKhg+NgU/ec//0l+Y9euXQMCAsxZAEiPjHHjxv3+++9p3s3X13fMmDEmrCe9dLxuS0XW8Jkp2rRp09atW5Pfbp3LCnkD703P5cuXR48e/cCNYWFh7jzFJpPUf/0Uf+om16VLl1KlSuleT3pFRkaeO3fO8LEdO3Y0fGaKUjzOffLJJ03b50IWb07Pl19+OW3atAduNOE3u9euXVNbSUhISPOefn5+1tzlWb58ueEza9WqVaxYMcPHJqd2NlN8OtKQIUNM2Dru8d70pHjRKBOeR9u9e/fTp0+7c88XX3zRas/lSaIjPe3btzd8Zoreeuut5DeWLVu2adOm5iwASbw0Pbt3796zZ88DNzocjieeeELrdtVxlpuPkgQHB1tzl0cdqG7fvt3Ymeozb86vltQXPcUHyK12PgBv4KXpmTNnTvIbK1asqPX6B6tXr07+6FJqBg8enD9/fn2LybCffvrJnaPFdFFHW+a8PG3s2LHJz4ikvui8YNV83pieuLi4FC8a9dhjj+nb6OHDhzt06BAfH+/OnXPmzOnOOTREqIAaPvPZZ581fGZyu3btWrZsWfLb+/XrFxgYaMICcD9vTM+KFSvUUUPy22vWrKlpi2pzLVq0SPNqoveMGDFC1UfTYjJpzZo1hs80Jz1vvvlm8htDQkI42hLhjelJ7aJR5cqV07G5qKioZs2aHTt2zM37FytW7OWXX9axksw7ePDg2bNnjZ1ZuXLl4sWLGzszubVr1/7444/Jbx8wYABXGRThdem5efPmDz/8kOKHSpYsafjm7ty507p16x07drj/V8aPH2+pC07cb/369YbPbNOmjeEzk0vxADY4ONhSF3H1Kl6Xnu+++07lIPntDofD8HOPqg21atVK/bx1/6/UqlWrQ4cOxi7DQBs2bDB8pvoUGT7zAV999VVkZGTy21966SXOxCrF69KT2slx1A9AHx8fAzd069Yttb+zbt26dP2tDz/80MA1GG7jxo3GDixYsGDVqlWNnfmA6OjoFE85or7iw4YN07ppuOBd6bl06VJqP7eN/YXxxYsXmzZtmuJPWhc6d+5ct25dA5dhrMOHD6tPoLEzmzdvbuzA5N59990Un8M5YMCAvHnz6t46UuNd6Vm6dGlqiVE/G9XxkSG/ZFXFUfs7bj5l+Z7Q0NCJEydmfuv6pPiSy0zSfVX1P/74I8UdybCwMAuefc2reFd6XJ/qQf1Ur1KlSiY3MWvWrEGDBmXgzKGjR48ODw/P5Na1Mjw9WbNm1f308cGDB8fExCS/fezYsTly5NC6abjmRem5deuW60d8f/rpp8yk5/Lly/3798/YaUNLly5t/WeX/PLLL8YOrF27dkhIiLEz7zd//vwUXymqPtuWuni0d/Ki9Kj/ha4vGvX555+rH5IZ+MV2YmLizJkz33jjjStXrmRsbWrTahcgY3/XHLdv3z506JCxM5988kljB97v0qVLqT096v333+eaE+K86AuQ4jPK7nf8+PEhQ4Z8+umn7s9U0VEHcWPGjNm/f3+GF9azZ89GjRpl+K+bY8+ePYa/dKtx48bGDrzfwIEDU3zOutpoy5Yt9W0XbvKi9Ljz/JqpU6devXr1k08+SfPpHmfPno2IiFD3d/9pyinKly/fBx98kJkJ5kjvb+vSFBAQUKtWLWNn3vPNN998++23KW5Ufck0bRTp4i3pUYH4888/3bnnggULli5d+txzz/3rX/+qVKlS4cKFQ0JC1A/8mzdvnjlz5ujRo7/99tvGjRt37NiR/DXQGaAylytXrszP0W3v3r3GDqxevbqmJ22fPHmyb9++KX5o5MiRpUuX1rFRpJe3pCddTymOjo7+wknfepKowJl2iqxMOnjwoLEDH330UWMHJomPj+/UqVOKr9QtX778G2+8oWOjyABvSc/mzZull/Cg/Pnz22jn3/DHmKtVq2bswCTDhw//9ddfk9/ucDimT59u8cfyvYq3pMfwE+tlnvpOyJ07t/Qq3BIVFXXx4kVjZ1asWNHYgVmc5yT46KOPUvzQgAED6tSpY/gWkWFekZ4bN24cOXJEehX/j5deesmE80Ab5dSpU4bPfPjhh40dqH66pHY1G5U5iz9T3At5RXp27txpyEPCRqlUqZLFXyb6gPS+KCRNISEh2bJlM3Cg+tGiUp7iOQmCgoIWLFjAtf2sxivSk5kn3RguODg4IiLCXt8Jhr9q1NjuqDI2adIktUWqypcvX97AzcEQXpGeP/74Q3oJ/7/p06eXLVtWehXpk+Fnaacmxd2TjPnzzz9Vd1LbL2vTpg2vmbAm0mOqwYMHd+7cWXoV6Xbz5k1jB16/fj0+Pt7X1zeTc/bs2dO0adMLFy6k+NEKFSqkeLU1WIFXpMfNJxPqVr9+fXs9xHOPmxfScF9iYmJkZGQmz8O/bNmy559//saNGyl+NE+ePN9//31oaGhmNgF9vCI9hh8vZEDJkiUXLVqU+Z/zInQ8SL9q1aoMpycuLm748OGTJk1K7Q7+/v6LFy8250rKyBivSI/7V6HRJFeuXMuXL7fvlQ+MfVQ4yZQpU1577bWgoKD0/sUtW7YMGDDg999/T+0ODodjxowZVj7fI7J4Q3rUwUIGTtxloICAALW/Y+uXDul46uPFixdffPHF1E6VnaIjR468++676q+43gv75JNPunXrlukFQi/PT486xlE/BqWe1+Pn5xcREdGwYUORrRtFx2WCsjhP5XXnzh21h+I6bbGxsWvXrp02bdqyZcvS/Dp++OGHap/I0GVCC89PjxIYGCiy46OSN3PmTA84O0yFChU05Xvx4sWrV6/u0qXLU089Vb16dXVMGhIScuPGDXWMfPz48cjIyO3bt69atcrNQ+bx48cPGTLE8EVCB69IT7Zs2cxPj4+Pj/p57hl7/rly5apYsaLh581IEhUVNd0pM0PUZ/ujjz4aPHiwUauCbl6RHnW8YPirH11TR3mzZ8/u2rWrmRvV6plnntGUnswLDg5Wx25qhdILQTp4RXrKly9v+CnNXVDHd19++WXbtm1N26IJ1O6bOpyx1EvhkoSHh3///ffqYE16IUgfr0hPrVq1Zs6cac62wsLCli1b9thjj5mzOdOUKVOmRYsW6ptceiH/j0aNGs2bN69gwYLSC0G6eUV6WrZs2b9/f8PPap6c2r1asmSJ4aeDsIj33ntv5cqVcXFx0gv5P7JmzfrWW28NHz7c4XBIrwUZ4RXpeeihh9SPx/Re/jy9OnTooPatgoODtW5FUIUKFUaOHPn2229LL+T/7IKpnZ1Mvg4DsrwiPcqYMWP0pSc0NPTDDz/s3bu3pvnWMXbs2G3btqV4XT1zZMuWbfTo0S+//DKnOrU7b0lPgwYNWrVqtXTpUh2TZ8+eXbx4ccMnW5A6ulm4cGGLFi3Wr19v/qZ79Ogxfvz4fPnymbxp6OAt6VFUIB555JFMXjbrfuHh4e+//36XLl2MGmgLQUFBaq9n4MCBM2bMMGeLAQEB3bp1e+2119RxljlbhAm8KD05c+ZcuXJl8+bNjx49mslRuXPnfvXVV9Vuv9ZLhluWOtiZNm3aM888M2jQoJMnT+rb0EMPPfTiiy+qrbCn43m8KD1ZnKci/+2331544YXFixdnbEKpUqX69u3bp08fTgSjDrueeuqp6dOnT5482cB9ySzOsrdt27Zjx46NGjXy8fExcDKsw7vSk8W577Nw4cLNmze/++67a9eudfMkWAULFmzVqtVzzz1n9xeCGsvf318deQ0YMODnn3/+5ptv1IHYiRMnMjYqW7ZstWvXrlevXv369dVbPz+v+5/pbbz0C6z+c6vvk8uXL3///fc7d+7cu3fvqVOnbty4cfPmTfVjVh1GqR+8xYsXV3tJNWvWrFOnju3Opmwmh8PR0Em9f+bMmR07dvz+++9qP0gdi/31119XrlyJioqKiYlJSEgICgoK+Yc6mCrhVLJkyTJlylSoUIEdHK/ipelJkidPnp5O0gvxHIWcWrduLb0QWJ1XpweAFNIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AATYLz0Oh0N6CYCFJCYmSi8hI+yRHnIDpOb+7w4bZcgG6aE7gJvUN4td6mP19NAdIF3sUh9Lp4fuABlgi/pYOj0APBXpATyQ9Xd8rJsejrYAD2bd9ADwYKQHgADrpkcdqXLMBXgq66YHQIZZ/DHmLKQHgAhLp4djLiADrL/Lk8Xi6clCfYB0skV3slg/PVmoD+A2u3Qniy3Sk8VWn1AA7rBHegB4GNIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHq8Tlxc3F9//XXeSb3zt9OVK1euXbt28+bNW7duqbe3b9+++4/Y2NiEhIT4+Hj1Vv11Pz8/Xyf1TmBgYPA/smfPnsspZ86cefLkye8UHh5esGBBdaP0PxqWQ3o81qVLl07840+npNyo0CQmJmZ4bKxT0vvXr193569ky5atmFOpUqXKli1brlw59TYsLCzDa4AHID2eQO3IHD169IDT/v37Dx48eOzYMbXnIr2u/0vtRu11uv/GAgUKVHeqUaNGnTp1KJG3IT22pI6Ddu/evX379m3btkVGRh45cuTenohdnHP64Ycfkv5YpkyZunXrNm7cuEmTJvny5ZNdG0xAemzj5MmTGzdu/OWXX1Rx1B6E7Vrj2mGnWbNmORyOKlWqNG3atE2bNjVr1pReF3QhPZamvht//sfp06ell2OGxMTE3U7jx48vXLhw27Ztu3Xrpo7LpNcFg5Eea1HfeGqP5l5uLl68KL0iSaq2k53Kly/fo0ePnj178pCQxyA9FtKyZcvNmzdfu3ZNeiGWc+DAgddff3306NEdOnQYNGhQjRo1pFeEzCI9FnLvMVek6O7du184PfHEE6NGjWrYsKH0ipBxpAf2s9apfv36EyZMqF27tvRykBGkB3a1adOmOnXqtG3b9v333y9RooT0cpA+pAf2tmjRohUrVowcOXL48OFZs2aVXg7cRXpge3fu3BkzZsxXX331xRdfPPLII9LLgVtIDzzE4cOH69at++abb44aNcrX11d6OUgD6cH/FRgYWLZs2aJFixYpUqSwk3one/bswfdJTEy84xQdHa3e3r59+/z58+f+cebMmb179548eVLqnxAXF/fWW2+tX7/+22+/zZs3r9Qy4A7S473CwsLq1KlTuXLlSpUqqbelS5f28fFJ82+FOt37Y5UqVR64w/Xr15Oejvzbb7+tXr36ypUrBq87LT///HONGjUWLVrE6zCsjPR4l4IFCzZwql+/fvny5XVsIkeOHA2d1PsJCQm//vrrypUrly1b9sAr17VS+1+NGjX65ptvmjVrZtpGkS6kx/M5HI7q1au3dEq+k6KV2o2q4/TOO++oBk2dOlUdCqkjNRM2rQ4GW7duPWPGjO7du5uwOaQX6fFk6ohDfeO1bds2PDxcei1ZajtNmjRpypQpEydOjIqK0r3FuLi4Xr16qXeojwWRHg+kjqq6du2qvt/Kli0rvZYH5c6de8yYMX379h09evTs2bPj4+O1bi4xMfGFF17w9/fv1KmT1g0hvUiPR2ncuPHAgQNbtWrlzgPGgh566KHp06cPGjSoc+fO+/fv17qthISEHj16FChQgNd8WQrp8QQqNO3bt3/99derVq0qvZZ0qFSp0rZt2wYPHjxz5kytG4qNjVVHnb/++mupUqW0bgjuIz325nA4VHTeeuut0qVLS68lI4KCgmbMmNGoUaNevXppPe/i1atXVX22b98eGBiobytwH+mxty+++KJLly7Sq8gs9U/ImTNnu3bt7t69q28r6shOHeKp0unbBNxHeuztqaeekl6CMZo3b75s2bLWrVtHR0fr24o6smvWrFmbNm30bQJuIj02VrRoUU96uUCTJk3mz5+vupCZy4SlaeDAgY8//niOHDn0bQLuID025nmv0m7ZsuXIkSP//e9/69vE+fPnhw0bNn36dH2bgDtIj43VqlVLegnGe/vtt3fu3Llq1Sp9m5g1a5ba96lcubK+TSBNpMfGPDI9Dodj7ty5ZcqU0Xd6/ISEhNdee+2nn37SNB/uID125ePj46kXZsibN+8777wzaNAgfZtYu3bt+vXrGzdurG8TcI302FW5cuVCQkKkV6FL//791WFRZGSkvk289957pEcQ6bErz3uM+X5qn27SpEmNGjXStwm147N9+3bP/jRaGemxK498oOd+DRo0UP/Gbdu26dvEZ599Nnv2bH3z4QLpsSuPT4/y2muvdejQQd/8b7755uOPP+Y5PiJIjy0FBAR4w++Gn3322eLFi584cULT/Ojo6K+++uqll17SNB8ukB5bqlq1qp+f53/tfHx8evbsOWbMGH2biIiIID0iPP+/r0fyhqOtJGrHR2t6tmzZcv78eSucxdHbkB5b8p7fy5QrV658+fIHDhzQND8hIWHp0qX9+vXTNB+pIT225D17PUq7du3efvttffNXr15NesxHeuwnR44cNj0xWMY0bdpUa3rWr18fHx/PBUtNRnrsx9uubFe9evXAwEB9l9C5fv36rl27vOcY1iJIj/141dGWkjVrVtWFTZs26dvEb7/9RnpMRnrsxwu/SerVq6c7PQMHDtQ3H8mRHvvxtr2eLM7LB2qdv2PHDq3zkRzpsZkCTtKrMFu5cuW0zj927FhsbKw6stO6FdyP9NiMFx5tKcWLF/f394+JidE0Py4u7o8//tAdONyP9NiMFx5tKb6+viVLljx48KC+TRw6dIj0mIn02Ix37vUoZcqU0ZqeU6dO6RuO5EiPnTgcDq9NT4kSJbTOP336tNb5eADpsZNSpUp57clldF9x7MyZM1rn4wGkx068dpdHyZcvn9b5ly5d0jofDyA9duKdjzEn0Z2eq1evap2PB5AeC0lISJBegnXpPuDSd9kvpIj0wB7CwsK0zr9x44bW+XgA6YE9BAQEaJ2v7/mKSBHpgT3oTk9sbKzW+XgA6YE9kB4PQ3pgD7rT4w1X+LAUPt2wB39/f63zAwMDtc7HA0gP7CEuLk7r/KCgIK3z8QDSA3vQ/Rso0mMy0gN7uHv3rtb5pMdkpAf2oDs9Xvu6XCmkB/agOz0FCxbUOh8PID2wh6ioKK3zSY/JSA/s4a+//tI6n/SYjPTAHnSfT4f0mIz0wB4uXryodX6xYsW0zscDSA/sQWt6HA5HpUqV9M1HcqQH9nDu3Dl9w9UuT7Zs2fTNR3KkB/Zw+PBhfcOrVKmibzhSRHpgD0eOHNE3nPSYj/TABq5evXr58mV982vWrKlvOFJEemADWo+2/Pz8GjZsqG8+UkR6YAORkZH6hteqVSs0NFTffKSI9MAGtmzZom94kyZN9A1HakgPbEBrep588kl9w5Ea0gOrO3/+/MmTJzUNz5cvX+3atTUNhwukB1a3YcMGfcM7derk6+urbz5SQ3pgdYsXL9Y3vFu3bvqGwwXSA0u7c+fOypUrNQ0vX7589erVNQ2Ha6QHlvbjjz/qO0lY9+7dNU1GmkgPLC0iIkLT5OzZs/fp00fTcKSJ9MC6Lly4sHDhQk3DBwwYwKngBZEeWNfUqVM1XQo9ODh4yJAhOibDTaQHFhUTEzNt2jRNw3v37p0nTx5Nw+EO0gOLUt3RdGbCsLCwUaNG6ZgM95EeWNG1a9feeustTcMnTJig6qNpONxEemBFqjtXrlzRMblu3bq9evXSMRnpQnpgOXv37v3ss890TPbz85s6daqOyUgv0gNriY6O7tixo6ZfbL333nsVK1bUMRnpRXpgLYMHDz548KCOya1btx46dKiOycgA0gMLmemkY3LJkiXnzJmjYzIyhvTAKhYuXNivXz8dk4ODg7/77rvs2bPrGI6MIT2whB9//LFLly7x8fGGTw4ICFiyZAmXu7Ea0gN5X3zxRZ8+fWJiYgyf7Ofnt2DBAk6BakGkB5ISExPfeOONiRMn6hju4+MzZ86cVq1a6RiOTCI9EHPq1KnevXv/9NNPOob7+/vPmjWrc+fOOoYj80gPBKidnSlTpowcOVLTacBy5869ZMmSevXq6RgOQ5AemG3FihVjx47duXOnpvkPP/zw8uXLS5UqpWk+DEF6YJ5ly5a98847+qKjNG3adN68eWqvR98mYAjSA+0OHTqkcvDll1+ePn1a31aCgoImTpz40ksv6dsEDER6oMXdu3e3bNmybt26VatW7dq1S/fmatSoodJWpkwZ3RuCUUgPjHHjxo0DBw7sd9q9e/cvv/yi6mPCdkNDQ0eOHDl06FA/P/4z2wlfLaTh5s2bV69eveaU9E7S2ytXrly8ePEvJ/WOptPruOBwOLp37/7ee+/lz5/f5E0j80iP11E7I8k78sAf792oJCQkSC85BfXq1Zs0aZI6zpJeCDKI9HidoKAg6SVknNrTad68+bBhw+rXry+9FmQK6YE9BAQEdO3a9bXXXitbtqz0WmAA0gOrq127dqdOnTp27Jg3b17ptcAwpAcWVbFixU5OxYoVk14LjEd6YCH58+dv3Ljx448//sQTT1Acz0Z6IMnf379s2bKVK1d+9NFHVXTKly8vvSKYhPTAbA6Ho0aNGq1bt27WrJk6quKpgN6JrzrMlpiYuMNp3LhxhQsXLl26dJkyZdS+T7ly5dTuT65cuaQXCDOQHoiJi4s74fTjjz/eu7FQoUJVqlRRu0W1nPLkySO4QuhDemAtZ5yWL1+e9MeSJUs2aNCgkZPaRZJdGwxEemBpx5xmz56t3leHZk2dGjZsGBAQIL00ZArpgW0ccZo8eXJoaGjz5s3btm2r3gYHB0uvCxlBemA/t27dinAKCQlRAXr++ecff/xxh8MhvS6kA+mBjUVFRc1zKlq0aN++fV944QVebGEXpMfr3Llz5/r16zdu3Eh6m/yd5LcrcXFx0gt35eTJkyNHjhw3blyXLl2GDRvGS0ytj/R4HX9//7xO6fpb0dHRyQt1+T6XLl06ceLEX3/9lZiYqGnlaYqJiZk9e3bSZf9UhipXriy1EqSJ9MAtQU5png9Q7VKpAB0/fvzo0aO7d++OjIw8dOhQbGysOYtMotq3ZMmSpUuXtm/f/p133nn44YfN3DrcRHpgpMDAwHJO925ReyL79+/funXrhg0bfv75Z7VzZM5KVIAiIiIWL1788ssvjx49OjQ01Jztwk2kB3qp47tqTgMGDFB/VBlau3btt99+q2JkwqGZCt/EiRPnzZv36aeftmnTRvfm4D7SA1NVcBo8ePC5c+dUgNSOya+//qp7oxcuXHj22WfbtWs3derUsLAw3ZuDO0gPZBQoUOBlp127dn3wwQffffed7l+iqU2oXS21B9S4cWOtG4I7SA+EVa9e/euvv54wYcLHH3/82Wefab16l9rVatKkydixY0ePHq1vK3AH6YElFC5c+MMPPxwwYMArr7zyww8/6NtQQkKCSs/vv/8+d+5cXoQhiPTAQkqUKLFs2bIff/xRHYgdOXJE34YWLlx4+vTp5cuX89CPFNIDy3n66acjIyPVHtCcOXP0bWXbtm316tVbs2ZNwYIF9W0FqSE9sKKgoKBZs2Y9+eST/fr1u3XrlqatHD58uEmTJps3b86dO7emTSA1pAfW1blz51q1ajVt2vTYsWOaNnHo0CE1f926dSEhIZo2gRSRHljaww8/vGnTJrVvsn//fk2b2L59e5s2bZYvX541a1ZNm0BypAdWlz9//o0bN/7rX//asWOHpk2sWbOme/fuX3/9tab5SI70wAZy586tjonq16+/Z88eTZtYsGBBo0aN+vTpo2k+HkB6YA+hoaHLli2rWbOmvhegDhkypG7duhUqVNA0H/cjPbCNwoULL1q06IknnoiJidExPzo6umPHjtu3bw8MDNQxH/cjPbATtVfy3//+t2/fvprm79+/f+jQoVOmTNE0H/eQHthM7969Fy5cuHr1ak3zP//8c7WJKlWqaJqPJKQH9jN16tRKlSrdvn1bx/CEhIQhQ4asW7dOx3DcQ3pgP8WLFx87duzw4cM1zd+wYcPixYs5tZhWpAe29Oqrr37xxRf6nmf4+uuvt2jRgicZ6kN6YEu+vr6jRo3q1KmTpvnHjh2bO3fuiy++qGk+SA/sqn379uPGjTt8+LCm+Z988gnp0Yf0wK4cDsfIkSO7d++uaf6+ffvWrVv3+OOPa5rv5UgPbKxz585qx+fEiROa5k+ePJn0aEJ6YGO+vr7qmOjNN9/UNH/58uXHjx8vUaKEpvnejPTA3nr06DFmzJj4+HgdwxMSEubPn68vbd6M9MDewsPDGzRosH79ek3zlyxZQnp0ID2wvTZt2uhLz86dO8+cOVOoUCFN870W6YHttWrVavDgwfrmqx2fgQMH6pvvnUgPbK9w4cIlSpQ4fvy4pvmkRwfSA0/QqFEjfenZvHlzbGwsL6owFumBJ6hbt+6sWbM0DY+Jidm9e/cjjzyiab53Ij3wBNWqVdM6f9u2baTHWKQHnqBixYr+/v6aTpyaxZmeAQMGaBrunUgPPIGfn1/JkiUPHjyoab5Kj6bJXov0wEM8/PDD+tJz5MiRW7duhYaGaprvhUgPPIRKj77hiYmJJ06cqFSpkr5NeBvSAw9RsGBBrfNPnTpFegxEeuAhwsPDtc5X6dE639uQHngI0mMvpAceImfOnFrnnzx5Uut8b0N64CGyZ8+udf7Zs2e1zvc2pAceIkeOHFrnR0VFaZ3vbUgPPERAQIDW+Zouduq1SA88hO5XlpMeY5EeeAjd6YmOjtY639uQHngIh8OhdT57PcYiPfAQd+/e1TqfvR5jkR54CN3p8fHx0Trf25AeeAh9J+tJ4u/vr3W+tyE98BCkx15IDzyE7vToft6QtyE98BDXr1/XOl/3a8S8DemBh7h8+bLW+blz59Y639uQHniIv//+W+v8XLlyaZ3vbUgPPITuvZ68efNqne9tSA88hO69niJFimid721IDzzExYsXtc4nPcYiPTL8/f3j4uJc3OHf//73iBEjTFuPB9B3zfUkpMdYpEdGUFDQzZs3Xdxh8+bNpi3GM+hOT+nSpbXO9zakR0ZwcLDr9GzdujUxMVH3q7E9idZzJ4eEhBQtWlTffC9EemSo9Li+w/Xr13///fcqVaqYsx67O3v2rNaXj5YvX17fcO9EemSkmR5l06ZNpMdNuo+2uPif4UiPDDfTM3DgQBMW4wH27NmjdX7t2rW1zvdCpEeGO+nhkWb3RUZGap1fp04drfO9EOmR4U56zp8/r44jSpQoYcJ67G7Xrl36hufMmZPHegxHemS4k54szmMu0pOmmJiYAwcO6JvfqFEjfcO9FumR4X56unfvrnsxdrdv377Y2Fh985s2bapvuNciPTLcT4/ulXiAdevWaZ1PenQgPTLcTM/Ro0cvXbrEa6ZdW7lypb7hlStXLlSokL75Xov0yHAzPVmcOz5t27bVuhhbi4qK2rJli775HTt21Dfcm5EeGaTHKOpoS+tZmUmPJqRHRrrSo3UldrdixQp9w+vUqVOsWDF9870Z6ZHhfnr27Nlz69at0NBQreuxqdu3by9YsEDf/L59++ob7uVIjwz30xMfH//LL780adJE63psav78+fouRBEWFta+fXtNw0F6ZLifnizOYy7Sk6LPP/9c3/BevXpx7S19SI+M9KZH30rsa6eTpuEqOq+88oqm4chCeqSkKz2//fZbbGxs1qxZ9a3Hjt577z19w3v27BkeHq5vPkiPjHSl586dOzt27Hjsscf0rcd2Nm/evHjxYk3DVeWHDx+uaTiSkB4Z6UpPFucxF+m539ChQ/UN79evH6dD1Y30yEhvetQP+ddff13TYmxnwYIF27Zt0zQ8R44cY8eO1TQc95AeGelNj9bXCtjLlStXhg0bpm/+qFGjuLy6CUiPjPSm5+rVq/v27atYsaKm9dhIr169zp49q2l45cqV+cWWOUiPjPSmJ4vz4R7S8+mnny5btkzTcB8fnxkzZvj6+mqaj/uRHhkOh8Pf3z9dr3tU6enfv7++JVnf3r17tT66rPZ3HnnkEX3zcT/SI0bt+KQrPV5+lvgLFy60bNlS38W2qlatqvWJQngA6RGj0nPt2jX373/mzJmTJ0965y99r1+/3rRpU33XF1Vfi6+//lrth2qaj+RIj5iMPdzjhem5cuVKkyZNtF5pa9q0aWXLltU3H8mRHjEZS0/Xrl11LMayTp8+3bx583379unbxGuvvdalSxd985Ei0iMmY+nRsRLL2rZtW6tWrf766y99m1DHcRMmTNA3H6khPWIykJ5Dhw7t2rWrevXqOtZjNR9//PEbb7yh9eSnjz766Lfffuvj46NvE0gN6RGTgfQojzzySIcOHUaMGFGpUiXDl2QRZ86c6dOnz6pVq7RupVy5citWrMjYVwGZR3rEZOw/fWJi4gKnJk2aDBgwoEWLFp70Qzs+Pv6zzz4bNWrUzZs3tW6obNmya9asyZUrl9atwAXSIyaTP29/cipYsODzzz/frVs3D/gFzQ8//DBs2LDDhw/r3pDaYVTd4epmskiPGEN29c+ePTveqWrVqq2dKleunPmxJlu2bNm77767Y8cOE7ZVu3Zt1TheICqO9Igx9lGG3U7jxo0rXry4CtAzzzxTp04diz9H7saNG3PnzlVHWCbs6SRp167dvHnzOOOyFZAeMZoe4Dxx4sQkp8DAQFWfxk61atXy87PK1zouLm7VqlVff/212tm5ffu2adsdPny42j00bXNwzSr/Hb2Q7t+t3LlzZ52Tej8kJKRmzZo1/lG6dGmtm07R8ePH1WJWrly5Zs0a3Y8iPyBHjhyzZ89WO4NmbhSukR4xZv5aNyoqaqNT0h+zZctWrVq1ChUqlHFSJSpWrJjD4TB2o3/++ee+ffv27t27ffv2X375ReszA12oXr16REREyZIlRbaO1JAeMYLPKFE7HT873bslICBAfXMWKVKkQIEC4eHhSW+V7NmzBzmp1aq36qhNHS7Fx8ert2qv6uY//v77b1WWixcvnj9/XhXnhFN0dLTUPzCJWu2IESNGjx5tnYNN3MOXRIylnsx29+7dA07SCzFMpUqVZs6cqQ4zpReClJEeMZZKjydRh5Pjxo0bPHgw5xu0MtIjhvQYzsfHp1u3bu+99x5X77M+0iOG9BirRYsW//nPf8qXLy+9ELiF9IghPYZwOBwtW7YcOXIkp1W2F9IjhvRkUkBAQMeOHYcNG8aejh2RHjF58+Z9/PHHf/vtt6ioKOm12EyxYsX69ev3wgsvhIWFSa8FGUR6xOTKlWvNmjXx8fGRkZGbN2/e4nThwgXpdVlXSEhImzZtnn/++SeeeMLwJ0DCZKRHmK+vb02npItenjhxYvv27Tt37tyxY4dKUrouWeGp1JHp008//eyzz7Zu3ZqjVI9BeqyluFP79u2T/njs2DGVoV27dv3+++/79+8/ffq07PLMVLhw4aeeeuqZZ55RbwMDA6WXA4ORHksr6XSvRDdv3tzvtG/fPvX20KFDZ8+eTUxMlF2kgcLDw+vUqdOoUaMmTZqIvMYVpiE9dpItW7baTvduuXPnjtozOnr06B9O6h31xzNnziQkJAiu0325cuWqXLly1apVH3nkERWdYsWKSa8IJiE99qaORCo43X9jfHz8uXPn1NGZatD9b8+fP3/58mWpV3X6+fkVLFjw4YcfVrszpUqVUm8rVqxYpEgRkcVAHOnxQL6+voWdUvyo2lG6dOnS5ftcvXpVHcrdcoqKirr1j9u3b8fExMT9v5Jetp60FcXPSRUwNDQ0JCREvVW7Zrlz586TJ09YWJh6mz9//kKFCqnFqHf4tRTuIT1eR2XCRZgAc5AeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABBAegAIID0ABJAeAAJIDwABpAeAANIDQADpASCA9AAQQHoACCA9AASQHgACSA8AAaQHgADSA0AA6QEggPQAEEB6AAggPQAEkB4AAkgPAAGkB4AA0gNAAOkBIID0ABDw/wG+WR3gaogLzAAAAABJRU5ErkJggg==)
D) 0 Е)
6. Теңдеуді шешіңдер: ![](data:image/png;base64,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)
А)
![](data:image/png;base64,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)
B)
C)
![](data:image/png;base64,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)
D)
7. Теңдеуді шешіңдер: ![](data:image/png;base64,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)
A)
![](data:image/png;base64,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)
B)
C)
![](data:image/png;base64,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)
D)
8. Функцияның туындысын табыңдар: ![](data:image/png;base64,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)
А)
В)
С)
D)
9. Функцияның берілген нүктедегі туындысын табыңдар:
А) 17 В) 16 С) -16 D) -17
10.
функциясы үшін
мәнін есептеу керек.
А) 6 В) -3 С) -1,5 D) 0,5
11. Функцияның туындысын табыңдар:
A)
![](data:image/png;base64,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)
B)
![](data:image/png;base64,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)
C)
![](data:image/png;base64,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)
D)
12.
функциясы графигіне абциссасы
нүктесінде жүргізілген жанаманың теңдеуін жазыңдар.
А)
![](data:image/png;base64,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)
В)
![](data:image/png;base64,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)
С)
![](data:image/png;base64,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)
D)
13. Функцияның максимум және минимум нүктелеріндегі мәндерінің қосындысын табыңдар: ![](data:image/png;base64,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)
А) 2 В) -1 С) 1 D) -4
14.
функциясы берілген,
теңсіздігін шешіңдер.
А)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAQCAYAAAB3AH1ZAAAACXBIWXMAAA7HAAAOxwE4ki92AAACEklEQVR4nMVVMY7CMBAcSzzE6BoKHuEoTdC1+YGvSU/EG1BoURryg7Qnp4nIIyhoEP7J3jqEkIRcjuJ0tw3Y3t3ZHa8nMyLCf9qst7IZreY5wquBlhC/CVTFgjwcQYnq5W0LsNmK5nmIKxlI/C64M5WQoComsbrQ1egWY9agU+TAOwe8Sdlqjo/C/Q9weJmVimLhYdes1kdCopo4lYjrZUVR5sNwsrYAW+ZAmPY6r2IGXzJlRomanSiDbzTJSXYc+Cfeea4S9qvjvJjXCakmTvohMN+j0re9meu0zAssN7KX6HPnulb1SuoN1h9blFZDS0yYEnXaxhxYgHPfRfoIgxwXy95yOIR3sxec+GfR2yxwti7BvVMP6NI7mueMIlggfTp45BovoLYl3mRbNhYBhr38YFxkXaOeHOqJAk4tTc/mqJ7SDzfAWyx4cNUoeICFbAuQwg8Dyrto8o377yXEueCgZy6/AY+A9JtXY0vkxRL3kasZGE6m6/B97ZG3r6D5km22xS7gZyq7IHOcN88zYLOI9w2SBtxmMZV+0hZTv7hD2jJzuwKpRXrgJxNXTqnqLZUcseZBEzsw1+uRu3zQ2EGniIWjYDfWAbr7Ha6dc9ab1DwC2xmQ2tyUSmzpJjq3e07GWK72yFk3zJBibsRwoaMhTopPh4HYDYeQleqlbxP7GfWCXy+EpXhkf+IV/I39ewFfv0D77LeYoz0AAAAASUVORK5CYII=)
В)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC0AAAAQCAYAAACC/vbpAAAACXBIWXMAAA7GAAAOxwHzzvzTAAACS0lEQVR4nNVVPY6rMBD+LO1BHG2TgkMYpQGl5QakibYF5QyR00Y0cAPayGkiOESKNCjcZN5gZyPI31Pe7nt5Ow32YI+/+ebvjYjw0+RtsGsLCkcloqNBLCFehGkgdSrIRwXS6oznDLotQhqVEY5kIPF/AO5EaRJUpyTCho4mttgcaGZ43gE+KV8Dr6UiHGG27dYB8n60lRbHJqR5MYFhpQXd7kogyl7KcJ0yYI/TwChhoz4vMDExfWKSkwgYrVHHmt46D3flFt5CfuVFEv7KLpOKoBXcw462s+6BAdqsOnaV3cl4gWS2xK6NO7adyAmioETTXhbinyGm1Acq7kL8pKjTkIrGo9kMDIL40RqpSPmUJoVubQ8PnWgb7PkzHtjd4tB2YK91Xwddb7DPP6BPYVQ6Q8O52bHrclLhI1/SuuaVemTIw/sZoMQ4AA53Tj4AzQwyK6t7v4P8s3Avrq25mBJU5tYlJfTdubC3oVdXBgePYiwtaCkmUUDl1Q33gH5kwx6bkue7ArHh59xOqgqbtGbWFVzNeJjedOIk8p157kuLw5YBZn3VDuXWw0KemO5Xpnq6g7Bz1YaEcNeC/AijJG+4OIVvabWpYu26tnZYXBamEtPEJ59zKOYfbbHEKuAWLPuYucPlma0blx4yFlnO1c7skGXnSeE+SqR/r3Nu2RBfm6iQcDqKFdhRTi/qzYzTHMmMu3jOaRkbN3nEkvK/NcY530ueB+am7dvpaMf4Ph8MvmEhWna+HerAvlHPXuExfqH7hj797+VHgv4FKO0cOfSxCTgAAAAASUVORK5CYII=)
С) (2;+
) D)
15. Функцияның туындысын табыңдар:
A)
B)
C)
D) ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABEAAAAZCAYAAADXPsWXAAAACXBIWXMAAA7KAAAOxgGdFw3pAAABg0lEQVR4nOWUsY6CQBCG/0l8kDU2FD7EGhoIrW+AjaGV3DOYpSXXwBtcS9aGuA9hYWPgTeZ2FZXoeXeE5JrbhGZ2+Gb+2ZmZMDPGnslowu8hLZfhFKvd841VQr+DtDWOywasBX2fiUmZqgis5JNjWx/h+fHFZ5F11g32rCCBayaG0+0BwTz6Ukp99OAYaIGgaKBjQSYlroyFyC4Tk1aI3pc45H39XSQnxfNhGQSpoOXF54QCibzKsSlWkYJCia0DljV8zWCTIixbyBmsFHHPqwx56iocFGiuNTFVhiyzX2fYbfbgc9SEl9sc6dK7RXQB85m2LwJysNzEUE6OVEw26y4CUNz+EBS/gcOTD+Gg7sgEXkighYvj5D68jog1cfxQU6lIy77Bgq3UR7e/7NgfIEQ0egInrvdHQ8YC/hekv4juYz8I0pZrfHSLyI3E2g1jLIZmcj9iNgdOr+9fQoSdvjlNQSucmzEokuEQO32k7Myrc23WQG+nDID01kOjYcvxsrM/ARS8rfZMdo87AAAAAElFTkSuQmCC)
Сабақ жоспары
№67
Пән:
алгебра
Сынып: 10
Күні: __________
Сабақтың тақырыбы: Есептер шығару. Қатемен жұмыс
Сабақтың мақсаты:
1. Білімділігі:Мемлекеттік стандарттың міндетті деңгейіне жетуін, оқушылардың «Тригонометриялық функциялар» және «Туынды» тараулары бойынша дайындығын тексеру.
2. Дамытушылық: Логикалық ойлау қабілеті мен есептеу дағдыларын жетілдіру, өз бетінше еңбектену, белсенділіктерін арттыру, пәнге қызуғушылығын ояту, оқушылардың құзыреттерін қалыптастыру.
3.Тәрбиелік: Оқушыларды жылдамдылыққа, ептілікке, достық қарым-қатынасқа тәрбиелеу.
Сабақ түрі:бақылау жұмысында жіберілген қателермен жұмыс
Сабақтың барысы:
Ұйымдастыру кезеңі
а) Сәлемдесуә) Оқушыларды түгендеуб) Оқушылардың назарын сабаққа аудару
в) Сабақтың мақсатымен таныстыру
ІІ Өткен тақырыпты қайталау:
Көбейтінді түрінде берілген тр/қ ф/ды қосынды н/е айырым түріне келтіру
Тригонометриялық функциялардың негізгі қасиеттері мен графиктері
Кері тригонометриялық функциялар
Тр/қ теңдеулер
Туындыны табу ережелері
Функцияның графигіне жүргізілген жанаманың теңдеуі
Тригонометриялық функциялардың туындысы
ІІІ Дамыту кезеңі. Есептер шығару:
Тақтада орындалатын тапсырмалар: №315 - №318, №325
Сабақты қорытындылау:
Оқушыларға сабаққа қатысқанына сай баға қою.
Үйге тапсырма:№319, №324, №326
Сабақ жоспары
№68
Пән:
алгебра
Сынып: 10
Күні: __________
Сабақтың тақырыбы: Есептер шығару.
Сабақтың мақсаты:
1. Білімділігі:Мемлекеттік стандарттың міндетті деңгейіне жетуін, оқушылардың «Тригонометриялық функциялар» және «Туынды» тараулары бойынша дайындығын тексеру.
2. Дамытушылық: Логикалық ойлау қабілеті мен есептеу дағдыларын жетілдіру, өз бетінше еңбектену, белсенділіктерін арттыру, пәнге қызуғушылығын ояту, оқушылардың құзыреттерін қалыптастыру.
3.Тәрбиелік: Оқушыларды жылдамдылыққа, ептілікке, достық қарым-қатынасқа тәрбиелеу.
Сабақ түрі:қайталау сабағы
Сабақтың барысы:
Ұйымдастыру кезеңі
а) Сәлемдесу
ә) Оқушыларды түгендеу
б) Оқушылардың назарын сабаққа аудару
в) Сабақтың мақсатымен таныстыру
ІІ Өткен тақырыпты қайталау:
Функция
Көбейтінді түрінде берілген тр/қ ф/ды қосынды н/е айырым түріне келтіру
Тригонометриялық функциялардың негізгі қасиеттері мен графиктері
Кері тригонометриялық функциялар
Тр/қ теңдеулер
Туындыны табу ережелері
Функцияның графигіне жүргізілген жанаманың теңдеуі
Тригонометриялық функциялардың туындысы
ІІІ Дамыту кезеңі. Есептер шығару:
Тақтада орындалатын тапсырмалар: №331, №332, №334, №338
Сабақты қорытындылау:
Оқушыларға сабаққа қатысқанына сай баға қою.
Үйге тапсырма:№339, №340, қайталау
10ә сыныбына арналған
алгебра пәнінен сабақ жоспарлары
І тоқсанда:жоспар бойынша өткізілді – 18 сағат.
ІІ тоқсанда: жоспар бойынша өткізілді – 14 сағат
ІІІ тоқсанда: жоспар бойынша өткізілді – 20 сағат
ІV тоқсанда: жоспар бойынша өткізілді – 16 сағат
Сабақ жоспары
Сабақ: №3
Пән: алгебра
Сынып: 10
Күні: __________
Сабақтың тақырыбы: Арифметикалық және геометриялық прогрессия.
Сабақтың мақсаттары:
1. Білімділік: Арифметикалық және геометриялық прогрессияның n-ші мүшесі және алғашқы n мүшесінің қосындысы.
Дамытушылық: 9 сыныпта өтілген тақырыптарды есеп шығару арқылы бекіту.
Тәрбиелік: Оқушыларды дәлдікке тәрбиелеу. Оқушылардың теориялық білімін тәжірибеде қолдануда өз-өзіне сенімділігін арттыру
Сабақтың түрі:
қайталау сабағы
Сабақтың әдістері:
Сабақтың көрнекілігі:
Сабақ барысы: І Ұйымдастыру кезеңі:
а) Сәлемдесу
ә) Оқушылар тізімін тексеру
б) Сабақтың мақсатын нұсқау
ІІ Өткен тақырыпты қайталау: - Арифметикалық прогрессияның n-ші мүшесінің формуласы және алғашқы n мүшесінің қосындысы.
- Геометриялық прогрессияның n-ші мүшесінің формуласы және алғашқы n мүшесінің қосындысы.
ІІІ Есептер шығару:
а3=25, a10=-3 болатын арифметикалық прогрессияның бірінші мүшесі мен айырымын табыңдар.
Егер a3+a6=5, a4 + a8=14 болса, арифметикалық прогрессияның бірінші мүшесі мен айырмасын, алғашқы 8 мүшесінің қосындысын табыңдар.
cn=5/3n геометриялық бірінші мүшесі мен еселігін табыңдар.
b2=2, b5=16. Геометриялық прогрессияның алғашқы 5 мүшесінің қосындысын табыңдар.
1/5+8/15+13/15+...+33/15 қосындысын есептеңдер.
Сабақты қорытындылау:
Оқушыларға сабаққа қатысқанына сай баға қою.
Үйге тапсырма:
9 сынып оқулығынан: №185, №191, №208, №226