«ЖҰМЫС ЖӘНЕ ҚУАТ» БӨЛІМІ БОЙЫНША ЖИЫНТЫҚ БАҒАЛАУ
Оқу мақсаттары:
7.2.3.1 Механикалық жұмыс ұғымының физикалық мағынасын түсіндіру
7.2.3.8 Механикалық жұмыс пен қуаттың формулаларын есептер шығаруда қолдану
Бағалау критерийі Білім алушы:
Жұмыстың мөлшерін анықтайды
Есептерді шешуде қуат және жұмыс формулаларын қолданады
Жұмыс пен қуатты анықтауда Архимед заңын қолданады
Ойлау дағдыларының деңгейлері : Білу және түсіну, қолдану
Орындау уақыты: 15 минут
І нұсқа
№1 Бала жүкті орнынан қозғалтқанда қай жағдайда көбірек жұмыс жасалады? (а әлде б)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAR4AAAB/CAIAAAC2dDrKAAAACXBIWXMAAA7EAAAOxQGMMD9aAAA3HUlEQVR4nO1dB4BUxfmfmde2Xm/c0bmjiRQRqYrYQUUEMaiIGo0aG+hfSdSoJNFIohIQNYAKauxiLIho1FgSULFgQQQ5mtTre3tb3r42/5k3u+/2dvfg7uBgD99PuXv39u17M/PmN1+Zb77hMcbAhg0bhxr8kS6ADRtHJ2xq2bDRLrCpZcNGu8Cmlg0b7QKbWjZstAtsatmw0S6wqWXDRrvAppYNG+0Cm1o2bLQLbGrZsNEusKllw0a7wKaWDRvtAptaNmy0C2xq2bDRLjiKqcUWy8DYMTySZbHxy0PaUUvHGEEAMaR8gAZdTkZ+I1JOrb66Ysv2um37dsqKhhDChkEYI4mCSxKhISmcKqtyn6JOg4cMwuQTbOjQQIhD5A4GABx3pGtm45eF9KIWEzR0cSbGkPxCiJIMIlUOLFzy1MoPPt+yfWskgqGbSiECQjxyBQ8FwiUnVP2ygKH6zLw5p59xhg44DXMIAIGQFGF6Q2gLLhuHD+lFLRj7n4BSgbIBvvPhJ4ufev7tj77Lz3eM7ZN1zqDIsd4IEWeQEM8gnNIVQYuootOp1mJ+9tKKRc8vP/2MEzng5CAVggDpOrkU27yycViRXtQClFeELlRwISpywJovvrrm+tsy3Y6/X5Z3Stf6zlkVLqghlXxkxIwpSMgDdAg4CWT5f3tOt9+tCs287/HhgwaMGtSvc34mL0gGoRa08xTYOKxIO2phU3NDVBWEn6z+/Kqbbivo5nnpSqkn2AZkLSDzdaqb2F2EehgbTMcjip+AOd4AmSH57F7yt/3rP3z1pddfWZ6d671r5uVTJk7lCFkBOtI1s/HLQtpRiwJSXm3dtv03N9xcmONYPB2WwKpADdRgtsLpEtZ0yAFsICggiLBuCJhXBIPTQnW6mMuHFp7WsO905+ubM+9atvGZ5R+eOOr0grwsW2bZOMxIN2phqrlBuPrTL6+79z4pi1t2FV8K63w+aHASAqpELiG80gHPKUQRxLqEIDGnIoRZBiQfiuEw4ZxS7Km5drBRfmrfJ77cfe5V186+5ILzp0ymTpGYMwPbXg0b7Yz0ohYxsaCpuS155umaXTtevrFTT76qzk9IgDkAqRseQwANwBkq51WMEM+HeEMydCeHNNUgIk3jOU4DYF8oM1eO3HxS7dBe2Qv/vX3OvMfOOOtMr9fLZJdhEP0Q2NSy0a5IL2pRQO6rbzd89n35FeMKR+Vs8VeLmHfQSS5KBOqQp1NdvIhVw2tIQONUBDigAHKMkYJkjTMQ5l2aWqfDLEm/ZOjOmlph2TclnCAxpyPLu2jzykZ7I72oRXq8YejLV6xUFPmy4zUt4NA4ARL9D8QmfKmjDzmUiAA0GUsCj7yuCBBlI6iHdZdqCNDQgcGrwOGAET2kgTooIhQK+Pfs2VvasxuRV9RBYgouzp5EttGeSC9qEXz7w7rlb666YpTY3VXX4MvSicqnQ9Nzjk2pRSwtqKAA1h3uHFgB4fPf5Kmye3RZ/bFFMmhAwTBsgGHEqxgqDvKlTA/McFVpvrVrPyfUojEcptSyeWWjvZF21Fr99XoYiUw7DkMZIN3HQYigAMxoCmaKQYSzBBF4wfpg0b3/0laWExVS7f21c1xP8dzBxuguGl/r0xQvdvIuj7T6B/zhd3KJw33quLHAFFaEWoRXlviyYaOdkHbUwrrozRAdhk/RRQR1Sirq2lN15OHUiCSE65D3h/qMz771/W217FLgzZPG9OxS8tk3G57+73cvbTDumei5rG+WW4G6U3lnm+OO1zKr/PwZJ7gLCwsAC44yraxfEK/KF4wum7Wmyamr38aLwTVwwpImZ0fN3/w0uCzVtePbvZBHI9KOWm6OD2DVDxwlgJN5PzAkiDXMGREccEgiJAKHly/9Z4+zh42dcRI8+bTjzho2UgfCrybVTvvuh4eeWHnrok9XDM4a2AXUw/z3vto9+9br+/fq3Kswg4VP/QK9F6seSOAKodBtlCuLMb7NYp1FoNV45qoY6QjXVs8sPczlPXqQdtRSMRKg5AI+HeEQgBnEaAKCBnkOaFg3FEXrlAurKuqnn3fOsBHHgSpf/b4qXdE9HjxuyNBjHxr6+rsfv/vhl9/UhtZt2jhi8PEzJp3BReexfpkTWateX9K83CntPQCANYlny/qPSnHWRmuRftQKK3JA1kQ3x+3m/JmAE6Ch8oBHWFSgoggCH4Bj+kau/+O8N/9xV4Hh4JWAS+I1WWjYtTc3w3nVeWOnnz/OH/LPuOSKkf27EF6pBlH/DPTLDHQizAJLlkBbCB0BpB21hg4oUQ39kf8Vzj1LzVO1qggHRUPQVZcW9LgN5MkEsvS70yNXLf6pZufO7F5DOTkAAYc5iARXvRygV2YUI+gII67W78PAEBCNOPxFonzBvXHm1JpZZXCWbTsdNqQdtYaNHH7xtIlP/PP9fNTlhnHlOaihIcgDKABvwfqQ65X/BWt9RhWOqBGF470cjKi8ohN1UeGJ3shJ2RirutIAVQHIkONd5lItA9LA+F+e1Cpf+XKyXrdkAgTJ7CJnlyRdauOgkHbU4nnHBaed8sJLrz7+RaYfFd84tqqrVBP2Z0OA562Gq34qHVEmyf7w5DMKcwsKDDWsaxhzhgjp2mSUl3P7ffc4XO7rrrlJUxVJ4Jl1xdE1Kr88Q6t05v+Mm6JG5pYFo8tu/pSdX/L62/84c0Jsis/E1Sv1f7AzGJcvPLG36dwwF3i3LPGB+UWMmtwzijQ3cZvbFfXgY03Ti1pmPeHQYSPm3Hr93X9f+tZnrlCw+Ncn5gzNrFAb/Lt2NUwbd9qCu6/V9gU5HiihBi0UQcih0bXI2JHp+vqHbxc99czpZ57hyJAyi7Ke/9dL4yeec1y/fgAJv0A3BqlyY9BJ6aw1eBaIOv/Wb96KQGmTTg/N2QhrcoKda+FTold3zCCyhNJa1WEd5mDqkl7UItChygPh8um/zs3Pueevj65cb6zdnvuPC8Xjc7dhTszgEFAdhrYXGkiNhHiEIMepWFN1w8lxfl/dicOHX37hhV5RuPOWW66++ZZpF19yxaUzfvubq7K8niNds8MNJkaanBq/ePP89WWzBvRumTcDtjhXD+MV644Jo1iab5adQB7rT6s6bb5zelGLrtfXiIoHeE4498xJgQb/w48/s1fjn1sXOX6yYAggYCCgVMuRIDTM5ZII6pomIcQjLlJVM6z/gGcXLXJBXv5p++ghJ6x4cfmtd8+5d+7c0tLSqRPPOdKVO9xAWxea01ZJjourJ7XQj9EShdAM+zSsBaxsVUEHQkoN9pAMB+lFLVIjDjoMZOgG5hC86IIZJw07+bnX3lq6bPGvhhdmOoOZIgJZuRkKBJoS9jeYkRo80XsguZ5Huq47IVID9U6XBwjizzt3VlZVSDzndbmOdM2OBDZvML0Y1EURo9eqB16+cPPqGLPKf1rf/NdaDiYbLW2wYymEKREvu44SW4tUyuAwMBSi5ikAcQCXdOt65aVTV3z4waxnA66M7ED1ljdXvlffUD2ge88h/QYoPp8aCkIeKTpho6aSEVTVPcWFdYr8+CPzHlz46AkjRvxz6ZOnnDTmF2hrxdQ/SpSYB5BSjCmDq5oEOtHPkwKd1txchm4+kLO+urp61apVQ4YMOeaYY4LBYHIjp3mzJwgoJrKIgSqK4kGW/MhTi3X6xuWJdJExTyiGsGoKL5ibm3/tJZfc+de5x3i6rinf9N76r/xGSMTOCWPGzJ52ZbZb1OSgSKSdBnjRKRXlr/zkozkPPLhx48aLfzXtb3++L9OT2srCbIWK6TzcU1319bpvMdVrsKbr1PpHZoK1pu2etlYDKSoRHaFgsGe3rqOHD7fOl85cjWem/sr4xRgvTj7d5PqWjEdut9vhcFRUVHTv1r3e54MIgoRWSmtmgaTSUhPD6/USanVsW4v13XhdQqPvgifF4iGorql68aUlCtT3yoGsQoes40Vd7ujuz9ijBjJzC+f+sGj6X255+aGHsz0lxDz779dfvLpy5QvLX51y/uQXn1jaq2cv6iAzDKIlRvPYNH0uNtOtscZTNf25F14kY5Usy5qmktIQVtM+gePZBZPeQ/oAIg5V7Nsz6dyJhFqWK/xgb9qCjuV0Ort27WqwpTpEz4CA4zv2gh1oqrgHL2yPvNQCcaMjkRg8Z6YPVLXtP29f8vzSxc89nuPKKPT0yCjIG5jX6wXune3Gtj86rlTr6l1Zzqr64EUzbkFGIILwhi3lPC/Ouu7G2/9vtsPJk3uZ94TJvAIx8ciMdCKy3n3vXVESIxGFfER6CWFjqlmaRCGWPiC10U0cwdwEsbSR0WHr8BfgUIF5ZQ7+PkeeWmzpFHsfhFe6on229tOnXnvhw9WrVQ2ePGLiNM+Y3uFuISjnQ2FV5NuXQv99oeA/N7gnZdZwwOEc2H8QoVHE0Medcea54ycQlZ/ck+ashnSWmDKICi/CkyZDqUXmrbt3XnHVVTXVNaNGjgkHQ0TGcdCcJqPfwwkqIEpjsyG6WDRululwPj0q4M3UJWluXCUgmUWHalw4rNTC5lpG+iLM3yyhLZvTZO/jjTffePbVFz/f8q1fkYcVD56Yc+IIrm9Og8enQ7cO6o3wmcLI4cXHnrPjZtxZlDV/d2fWX/98NxcfxGRaSDS0CRg8G0dpLlCjMQWACfa4lW+//eRzz2zbsaOsZ69QMMTzPGGhqqoJhQbMMDtEPtn2gNmwMNq2hz1fFY4DSPuJrP2D6TiHpPVaSi3S5+JnA+kx06foqagNAlPNbTMXRSxsBKhYF8k5wBlsFsuMPwr4/UE98sLK1/4yf16hO3tY3qDjs/oP8fTtouaDWnUvqlUdREvUMY91zecJOG/vdPHz1R95gVSxdc9rL7x2zqQJDqcTA13DBq9xBk+lC0+NNSp6zEADGCssrQp5vqZp8x997OFFj2dle08dO8rQUERTEORNVRCYmQLMzmru6ZCW+eKTrG/E5EZUITwk7GrhTWKTWql17zRHcgXjp+YOh/M9PowlTpk2nQHWaJnK8Uo6cTTTC1HMACdqCIoIRHO744ZIw8pVbz/61BLF4SoKZt3T/9dDPMc6VImXEag1GoywKulEERM0yhDCZp03qnFgGhj7nfhTZZ4wylt2w8Lbn3rn2Rnjp0+cNFGUOCDQPgZZIAEtG2LloMqKjhnZEM9vKy9//Mknu5Z0Kcj23n7DTIF3/m7ufTAW22KYthaAHSaZdXQQONQgb0w31eAOR5h0QEupxbjEptujP6NsQkxuUSTRO971h0xThfDqi+++LK/5OQM612/a/v2WdV+s/6Ewkn2Je+zYwmPdqtvnUyPACGENIN3gFEIIqssx+9gMveERDgKBRruHfHcUXtYD5j218/Xpc258PTtjwpmnN3l8fIwc+SZnpoMyqwwFPqewoKSwEPv9OQ6PTPcMIk/S2JX0Mo6jJ6Kaa9pRLGFziBYOrHQ8jklj9lKSIwAN3YCm/AGmBxW13nne0RXCQ3WrVkgtS7WLtl0sltxS9lIWiplSjJDk+w8/9Y8FTz59XvGYY40uYjByjNTttNwT+mX2yAhzwVDwZ1TLceRGNJs7uSMhEGcgnZApdjfTuwBkXRnrGnp/1ZJ38eq7hGmD+/W717nsrif+9N6X72kqzQbKxQWAUR1Pw2cNP+3scydYfohISPaHG/xy0EXoxqOdu3ZxHG/QKHrmsTe4tNMAW4fobi9x8bKsaszJYAX7gbjjqN4eq7eBMYd+gesFDhla4caI1zsJTxRVq66t5XmOqE8utyfDnSKYyLK1GMH++PjDf1vy+B/6XjwVDQ9EEJePeEwKgEPV4TocJgLFC0SdcIloZIgSQud4zHEI6zBuBoxIy0io4dTMYR/m/DA3+FpZVunZdQPUkouWVKz44qPvCK3owMvpwOolGMiRyBv/euemPTv69uv7/Y8bXG7nijfeKMjIHnbccV/+7780U0AkbG59AmPCmX0Tsq83HqcNYLJkaFpAbKpz0WP24jBA0UYxLTFsbZtJT7IzMePSnNshaoOmmx+3TiFMP7v0yKAVUssy70hD19XWzp3/97VffMHx1PTPycmZcv7kiyZPTmhW5lUnvNq9a9dzL77w1lvvzTv22pOloVX+kCaESZ8n6iQyBGJMGZyAIREaCkbUWSFgnTO7us56BoiymnZ6DGVnQyAs/dZx7i64fU7tEw0ZFw5Wey/KvjWcFxKwpgEOAt4KAhORGHJEFnZ77o2nnn9T4AWPsz7UEA4G/3jT7OzCwn+//q9QKNStpLNGiAw5ay6LVrZDD9kYWHWJUohWB0WVeHYm6k402DFN6aPrjUtK2LSgbWW1FS2WWqb7mfR2HiCiKjz27NNLn39+/Emn5rm8ZCz8futP/3fnHevXrbvqiitlrVIO8RnunMKiAm+Gm7ygij2V191828aff3xgwMzjcM+dvvqwBCRdNZCZy53cm8M60jAk1o3BYY1uewC46CpGYCAsCVDzI0U0Z054jGTeUxeJFOnu6ztNffCnl/4q/evWgl8V1OVGgCrisEoHZFdMYpG7Qknlzi85uaIy1Htgp+mXXChhl9stFRZlz5n3mAo4SZQCQRlQcZi+7vUkNDrZTW+tQQsfG/6oasdUdHLSwMjUroFlErNd/8wjEI2mjcpn6uaLG1CIioCjW2/GTE4c9UA2txbDhoWWK4QYx1rwxw0bn3hy6eQJE6+59AoQVsgnQUNd8cG/V7z/3vurP3M4wwaq1oGQkdHjqguvmjrpvF0V1d+Xf9XvmGMKpaI9vqAiaJJO1A1RxQZnmFk7ISEM7R4G+W268M2zZr9BuuoMONTOGWooyPl5PUPhIVLDRFrWBep7wrz7u19Zgysf3v3qHm1fHsyQaayNBoDSpOwGFGqzUA63e+cPK2bfNKps0KK5f9PV0Acffzx8xOhOXbtvXLfO6qwxvbfDkMyMhTTVORyVUExeRbt7jGTNq7TQ+o11XFNTt7eyQhLF3r16RQ1OZqrpALH5yFT36ThD0uFDyz2E5sbCdDmV/uKLL2nB8ITRY9X6Bl+DX9cNh9MxY+KU7MK8lSteyQ5cABp64+zyOu3tvzzwu4JOhYI7Izu3E1LcWBEjSNUEBBUNAV4gIhCqoMlKVcvypooKD3ly8QL9nc5Kzg3eicjnkaUw0EifURGRaiKvB3G2kp3B5d4ieeq9/hAwOCTxhKB6ky5AxnANhR0AOFTXtk71i9YuX/7q8gEDB+/ZtXvGlAugoXJAhzB56MVp7SGM8omuFkDUowl5jnO73ewCqy5wf6RKBOLQvEcWrnh7ZUF+wegRI08cOeKEE4aR1+5yulhkoHWveAdJYtnSr7lajiPgITSlCP35wksvP/3PZ351wdTinLxgA11EQD0ZqhZpCAWC+9w8D38e27CjEIl9c4vP6nzs83fMuamoi8frBS7RkaFwgTDWoU7UPRUovKEAyCcY4KakikZPG9iQDHEA7vxo6CVeALM8U7fplSonOzSPpoQBh7BTDBgRhLUBak9NEyJOVZAVjhhviQ0EkUFGXV0wvP082lfdtjz02tPwkUX9epdOOO1kLEdoXFQsq25HCSmIuSFoUckroDambtT7fDU1NWT4+2Lt2n37KpxOJyGc5HAYdNNnI7nXJFSSFwVfoKFLt66apr397jsffvIR0eoDDQ2ZGZl9+/Y5ZsCAsaPGFObm/RJX6LQeLY7GwDQfGXltS59e1v/YAVMnnS/7wiqNdaBjOi+JVb6aL7/7D4eH+XxIytiGOL260uA+PT+3NDsYqMjp8p0KdgddIbcuEUKpgkCMKhVpQsoOjKM9Wycao6L9RjjHyBMfql5elF84TRu3N1ytizwnOLChAVV1UFaI+/g6jDSo0WhBAQoKMuIJS3qCYFCbQTPUPL9jlNDty/qvzjlp7KxrflOS4dV9fl5ywRhAdKSHVmFMpFdPimrM5nw9EVhKWP5u3dcV+yq+X7fu7w8+oBt6OBhmF5J/xd27OdwuTdX2HwPJQRoiU9CJNHOBJDk8Lm9NTfXW7TsG9D+muLCwzuf/9pvvju3Tn1DrAGWzWWeixdQChFogGAjIijJy9Ghi79REZKok6FTHlzyudRu/NaqRWDERaxA4/RqxpTxerNQF141TQDby7xYH/vUV463TMk/uHirSInxEUzQoq0R7A4ZuRsIic6rSDKaN6oQECtYqg/WXZZxck1U7t+IpKV+9wDuhPLyTiDuOLkTGGq9BQ+cRZ+g0pxPVWAlzNTGh8BqvC5DjgcYBNMTZy4udp4w7sUdZX1CxC+TkOlTQhFqHuJEPB5ySw+WQeEEoLikifAuH5b17KlRNKe3TZ9Dxx0lOZzTEpCniacADc05d4H0N9TXVNZGw3Lmo6FeTJl04dWpeTo51WcI6oMNSuQ6JllKLxoNj4HK6BUEKBWSgUaNWJ3xDQNCwiEEER2Tygn0OkfRiwwlhSNRUTCiYWQ2UOt9mZxG46Zter273Pt5T7FomjCo1uuQp7hCnAF2SOKgrdYoRUgWnGaTE0yWQRADxhqZHApysB7XbvZP1LG1O1QsV+eFp0lg5ZMgcNpAm6tTw0A0zgoKM4NihUy+WFl946vvTiaAUBYD2CNXfadvyJO+yZ5+r9QWALCNO9AUDAs/juEAnmKQspRms0QcbuiZI4rHHH19ZUXHqySddfeWVpOMrquqr86maWlBQmJWdZZgDVioixPkDDdJA4qaffrr2+msdkuPyGZedO+Hs4uJOiV9IeRebY0lo8byW+a9869a9e/ZmjvHqOlGwAIrNM2qKSqeEHF6dCxkcpwtEGrk0Q8HE7DE4XkRO2FC9WZL2Xh0a+NaaTv/+CH5b5M7K5vNUvdoARSfwx48TB2VGsmuMOoOY0hhQvwIyl4ZwAhD0oBquDzhvybgoB3mWV77TKT/rrIJBYtipQY50Md1MPW1gBVLrnqe+fNSEWrxBi1oncQW6UCn5P6oud2d4aqrr5j/8MN0JGdMw+eNPGGHFvGMrlryDgK6MhnTuIjsnp3NJSfRsj7bcqnPn4itmzBgxfMSw44clf9qclZX+punhRyumjMOyvPSZp10O57DjhsqRCDT95rpGOIA4ieeILhch7SsBunuVgHUvFvxYJQyEqmogxEtug4ilyOcTM7PP4zt9G8xaXUXjmTpJWd+84lr/Pu5+oXPiyEhPnxzQkabBiCYiTeU4VcCcgJBzLwwU1Bg3ZE/FRdLC9c+9513tFDIMQxeJiDJ4AxqEZUSyknGa4wW6j2RTqaNQO0KUFE5zAMMbXv/j+uP6Dly8YCGH6JjwrxVvbCrfZmUmAo3rX9LYQxgHFvdOhoZgMMTOsAkuyyvTEqnCJFunok43Xn8jiC4Aa4u7okPT7Eh4CAH4efeuT9b875yzzinKzavZW4XMECeny0m0ETHDTcCpPI4AQ9EdLhWodYZBpAfHmRaUoiikC4vuGmJMhypyuL1DBOG4bCQQznkzd4AuO37u9tpi5f5ax7WnZoyOBOplAykacgLJpSMVqhpWPRwqgDn1vLGh8psrL7lq3fffqcRygro5i03nshVNIcLHjMrRoRHveKQqHuYiQNPCWOQMPhM6hvQfMOXcSf379mVXjD3ppI0/bbF8GDT+GHekpF/R3gxBfNBf4/KfuIjK/YBcQMZHXdfZgiU6U9xx5HYaohXUCoVl8up6dOsGNOrKpTNTHMcJwidffb5jz26XBLPyEVeN/JW52I+8znoZk+skna5LiAbpKpgXBR66ZdUIBDldQYKkCsEaL6oalb/zGDj4qX86H9dUeEb2CT1qs1UVh5wR4CEGmVvn9Xro/4D/br28o/znLS/MeCkc8BN5Q6wout6ei4ii0+vKUDWDh9G1rk2KTmQPtekAp1F5FoHYCaDolKKZZyDIKyggXappdRtjFGJ/phGSYwiZL94wGiPZ47nUksGY0YlDsSU/beWVbXcxtGaVMRFAIh8OBIkMIKJIIYqVN2Pnrp1vvrtKR0AgxkwkUJg3v+spJ9d9f1pDJQeyGzgy7sXPpmCHYsjkDSLOKwKNNwJIBKoriIy6hqpitOaa4nHicu9TVYEfx7rHhHh+dXjtTmWTW+BFAAIGv0nZBfhQtx4FM++7Qsc6zyOm9WA5gnTnrTfe2a9332YLLwGB/BRpOR3WdCqOBipEIoq1aiaqQaW7GyMRLF7pYJajM+FmbaOeHM1ko1VoBbVIRxQhLzqdGqQeKIkM/F4U0XVBFEMN9ZnZOWedft6GzZ9v2nlv95HbwLpLGnZludwBWYQ0DF03EwwChShwoqgZmgx1N8erKpEiMhQ4HWbuDjfkRv5zdd6ILuuLXvlc+drQPAIxoKoH+jBHtEykO7oJxxAziiiAmz+qRGZ0nLlUWRKgVKW/c1d4zqJ5j+d5vYYZOJIAg/oJMdEY2eJs3BjrbfaeuGwtjepTLG6oA/gzzFWbdJYxPgij6UEL7gEP+K3Wnu/oOJh6tUZqaYavzldb78vMzeFJt1Q1b16OUL3HV1c7cuSImb+9rn+fPqFw5NGnFyx7en7/wTUcf139thxHZg3EESToBtHCNLdADDTNhw2N4yOEcbwictRmy1IjGi/6sF5vrB7DF/R3uQIQC4KMtIpuMun41AFoNFAbgBzpTijgmNOSEElDuGxAj41b7nlx+RM3/PpmTPfT4hOaBJriiYtlyICtV/TSPATBFFrGoSpha+/ToV0X7YSWR77joqKi/v36Pr70iQa/v1fXbrqqCU7nqg/+jYHx+9mzexSXkItcTum2a2fnuAvmzru9/9Cwx3kd+lkhSlhY1yEmdFLNdwB53mXgiGEoTiQEAjx05SB3GCvZepioiXWwIhcbuQYIQx4Bbo9guAS60Jh6Iw0a1MNjPQIaJYqGZS646eSiY0/573/fv/js6TmFebiVrxrihG/AWHqkJsnSWnPL9kU6Z9Hs0DQ7Eh5CDIoK8h9/7NG/PjRvxcq3HJKD43lZiWia8oc776S8wszhqyHEX3np5ZLLc/9js7uVzQtv+DOfUcNxPKS+jxAETg65dF0GUEU4oy7kFfJ28aXPGM7NYqTUETzNv7tEq9ddPEQ8UKCmQIlon7ppA0CeLoXFnGbE228QO1FE9WXwgcGB8OvVdfU5hfmmAnhgh5iZizCaA8MKMmDLwwycKuQufZAolI9MKWzsBy2llo7oysROBUUPP/ggeLDJR2zJOzSnkHUD0fx9Bp4+efL0KRcsfeb5FcLd4c/vCleqTleEpmYAhCYhUfDU12QI+f++dL429sRz+vRYRPrGpvLNb69658U37ynOGKRvurZ2W5Yk1QocB2mWaIipxAKcmfwsuhbLXEtBbCiV0xBRL+miZC8nUG9FbLFfXCFTD6UwlpCKcgnGqMUirRBu4odji2pa2FztjQOuMj6CSGe1+XCi5dEYiGVusXQR5uOmP2k/xrGZEJ3ml8EcNtNb/HrGxQsWzSk75rlIcFokLLpFVcMRwHOBiKNWq/jDPSXTZ1wAQHQdRJ/Ssj43lhUWd/3LX2d3KbutU97Mii8HSzCEHX4ad0QdFxoxtbAu6dTtqIuaBwsBBYicpgPggVhxSJBzSrt2717x4Qeyz9+je/ezJox3IA4TdRQlZkuOn0ulFTEMEMsxBhuzVjXOICccwP2tm8SxO7SIjOYK7mjigFimipTXWMsQ2crGJtk8zcRzqJFghzGahINUXcdN/f5sMiOeZskpbuIvYFke4pOvHMxs9X6+22QheapPraa2Mhy0DS2lVuNLa3x50bkUHOdHg1CInmOZnqB26dRbnn/5/oLSSO1X12A1LDh1RUXlvq2XX+2efs1FAIjxHZTU6uIp53ncjseenFvnfrD4+Fk7PxsuauYULlB44Ma6wAkRxRGhW4MTUaobPHmJihCRhTyHgxPgfQ/N/erTtXWBYI7TWVdd89Rzz95z5x1DBgxMWSkrFBebyajjGBWrYewFWHRiByxug3TlpsYYE3q0i7AsLuYE7gHeDHscxyEzrTRzSiamUSL1Z7my2Z0THCrmjDgd5lhKbavoh012RCIRDkXHI5YbL76LJzSddT5azrhgX01VYSyP8n5Hrv2BtRJph+h2mEmwGGVdE/8gUv7oDITB3iBq8wh1aLLnxrVaE7vfMOQbZ13mD1Rs3/mJFnlr51djFFnVAD5vCrzhni4gSU+jbWqAiWedeUy//rfcNvPn0ANFY2aGt/UBWENE6yMKZ8Qb8Em8oXNIIX1JVfIimtuRW++VKnkP3rtb+7byszFDh44/+fSinJyvvl33wKML7rt/7nNLl0mS1ORBSSOS9Y4pbVjEE2p8u6aKaJii2xTOHNJ0M7NaIgfInxx7JRwdDzBogfOD9ciYtExxga5rLEbE1FVN45BagizXIu0DCLI94+Iodxi1MofLkeH1Sg7JpbtoAnAcBc/ziqKQqlkRZCkJQ84IguBwONif5HqWxri1xWCUlmWZjZIglVOXSSRygSiKXq83IUU+NG10RYk4nE5qVHBt5xU4JNRqfjKEaAkeAeLbf393Te2uXXu/qVjviTT0ycrnRp0heTI8uqGg5LW9dPJJ79Wty/1/+dvtd9++bddDrlIR6Fn07XC1XmfXLP2M4MejORSJKF2FYr+j81so6ytkBGrkWg67Zl9386hBQwN1NZoSmXT2xPWbN+3cuzsUlhOoZfVLpjgRgcFCshCO5tJHZioJquqYiIopU3rQlZpmkWkgsd6kB+jmkkpBEnUy+AFzkahxIGpBc4MPUm268xARxVhT1IQmoSFIHGclS+VFUdNVll2d2YrQVMpJHZFlZB5GhbBLly5r164lDcgoQZqQFwRNpcMBaQGPuQkTE6fxvLLIxihRUVkBzH6PWGbV1k91GGaOfkIYS99LZjJ7KOEV4XxdbS0ppxE39pGSm8tGDV99fVlZWZujKBkOlloHeDCkvganADoXdulc2AkMDgPgBUAGQNDpQi8p6dsYcCw1tN6/tPQfCxd+8MFH4XCNyLsdkrvOX/Xv/7xa6/87hmdDkJ87eG2w09MRR3mup8/xvUe6RGdublG/Xn32bdsUVHQeIle9PxyWyTgqiEKqwlGliXVoVVVqamtY92WjrOnZMKz032x4EyWJdBQiOVSi1BKhpCXOI5HLFVWp99cztcTKyL3/BmSCCJqzC2TwdjqcyaLOpCg1ycgAX1tdg6kIbRQCpDsTvlVVVgaDAXDY3d884jb9uJEUnnRr8mzd0K1Nx10uV2mvXubY0ezEIGnJ+gb/xk2bSHM5zJ4djY1ubSUwjsgRQomioiLyEi3ZlaLAPF9ZWbm5vNxBBtw43YR8pbCg4Jt132RkZpL7mGsRW5H+IPEpbfxey0CIBQ3SrDLNDWQIgHORvqfrAhme6ACMky0CSJNUEF2MUlIpzi269MJp8R+ff87U2XfPVEevlbmfdqPlue6i6ePuLu3Zx0PTenJBTavYt49OoDkll+D0NzRs3bHj2IEDHE1FVrRspshCUUsAER2AtDijFmA9XtMtrdHMsU/nrQmpSOfm6QZgjG/QyufBQBiVlZVFVXa63xQxBg+g2EBT2zSFDxS8AtVW6MpOgal8jbZcLM0/ef1mAoyo/spEEzQ32vPX+0mfiF1+mEQWGWhyc/Numz0bMFOTrrJrdM+G5bDfV2/J23j/hHWGCJDMzMwzzzzTsnzaXngMiCwiOiF5QfsZ2ohxSOjXr39/mMSccCi0/vv1ffv0id2w7UZr26nVkvrD6L45Ir2cw/QfhjRpJ242Oy0EAogun+fM0B3zBZgfkaG6qCD/T3c8eOk1F7rd0pDiU84bN60wNyvkr60J+VSivPESDddQOBHBos5FH3/+6ZZt5TfeeD2fyqKNmtVmqPgxffs8Nm9evBvDbPPYeBbd2QauWfPp3xc+kpWTQ1Q+Q9OZJkMz2XPRXlJTU3PKKSdde+VV2Hx/5AW3JHjcjFGiDxJF4bv16//2wAPA6aH9LKq2mj4kHeuQmn/VVdUvPPOU2YaNu3iTWofDoQ8++GDK5MmHe8YWNma2MdW7xvqSUYAID6IZ8hzPdGkQy20OYyH2TB1QlWgGroMNeaGLYsmbafRhJHhErAhJOpWUKs9kWJaLOhV179GDXX0w41P7Si2rb1jr4tmMU7T1UhUcNZ7nErySbG+E7l2LZZkbNGDoDZf8uqGyat+erXSHcMFBLDSO6Heqlp2V6cnKeP/jj+c9tqBzl87Djx/aTNkaC0DEWrfOJSkvi0duVlY4GMjKyaZeBxx9T6z9yRnyOkn/dkpil+LiAzdNM8C6Rqqg8lQ2moO9qY6yvSAEjjRkMBTo0bVL8heJtNtcUlKYn9/mR7cNKZlg2VHUq8PTzZgsz6G1nRqM7RqsqhpoKtDaRrDoQxG0HsSbK8fj3ZWWlmjJzGQ/h6KSErFFsQdlrx75revaAKfDUe+rC8shf32DIIgRge4iKRCVStNz8nM1gJ9e/sLSfz49Ysyo+//0p57dutF+yR0CBcnhchKzjRg2Ag0ugcwByEZfxNElzuSFesx0Zeyd0bQ5SZPXyYj6qcyJQ0mScvNyq+obXDC23t7sLgadKWez26k1zFA4XF9fH+9QPmw6YTKs7ksGCCqj2AZBcQ535j9kZi1pNp4XDtVmKKQB5XDYsnUT5iGZUk1UUHJZe++g2QGolaDhkLY4bdypy5YtPW34iUP6HlPrr3fQ5GqaJIrezMxNu3bMX/zoph83/PaG62bPujnT4zGNYt0MzD3YRuzevXt+fn59wJ/rLKDvjJjs2Ew4YHYUquKLQu/evQGzoHSjJQoFtraAoZPsMDsre9ToUUuffT4nJ9sM/4A0rYDpy+cFvs5X63Y4U97H6kDxfx5ZkKqJoihJYkSOxAsQRjMm50ntyAtyuVwWtdqs0DLyOJ3OQEMDTftvUsv6yLqMPJEUxuFwwLhc68klBwfdhh2AWsk1vPKyy1e9s+r1lSt6lZXJyAARjYyOCg/e+OCdRcueLOpc8syyZRNOpxsC0a4PWLrzQ9DVOpcUn3baqY8tWZyTl0f0DqLTm/NcgLq8DVxbXd23d++TTxwLmO2EcXK81X5qZ5p21Hl17tnnvPn2uzt3/Ny1a1dNU9n8MaGWqms7tm+/9je/ae4+6UCnBJAiZWZmVivVpEOTd2RNbTEri+2/THhF+ABaFktxQBBGZWZk1tbWEluXzbhYsot8ROQVeWJWVhaT7c2JyoPRSy10AGolo6SwYPKUKQ///eHf3HwjkgSeTktBWVXCweC5E8bfc9cfOuUXANqmuun21RN2Wz0YTL/ook+/XPvjjxu7d+tBE2tS9YyqhbV1dUQnvObaq13m1CfkWmEBJwicPqWlf55z9+/vvGPX7p+JkBR4XsfA56/fs2f3GWeecfWvr0x5E+bgToc95hp1MPOYF4Ts7Gyfz0ekOmMX0wgZr9xud2ZWplVsy5PUtj7Nvut0ubIxJk+kYSIcx/hMnkV4RfWCnBxywaGscDNoEbUOsqpKzP+TMIVn3TblDD1ofvQin15x8SU9ikv8DQ2cKLDAO1VV8nPzxo4e43G5wqa2Hb2WPbppRmUAQGOAjelow0nTKNZXYPR6uvIyw+u983e/X/jII+vXf+/xZEBTG5Qjcm5u7qXTZ5wweEgwFIpejWMLLROUtFQKTyyTGTXBdYxHjRw5d+7cl19+ecvWreyGxQV5U88/b8p5k9wuV0iWk+bmQTAc4ni+IRgQecGIRj8m0swqTGOpEmZUzR9RNx9L3toyJ2eTp8RFhLAjyekodBbRyAxV0w36HxmViI4risRo5RO+eDCCwqKoy+N2ud2EWuShFleJakosc8Q1Nkvys4gGS6QoE3dpLbVI4Xbv3v3JJ5+QEYsUmg0epk9Wiw+KM8PnDCsJETD9tgln4mHQjHmCN8MrCSI0Z59IJxAg76usemrZMqJ7xIexscA8ZjFrMdDtwHWNlYRpJikLHzuI9UNSfk3Ly8vL8niIYFQ1LRSOCKKQ7c3Mycj6au0Xq954A8XcSrFwH2zVGpnQmwZwMC+/Ed0xzwxZgoD0wNy8XGKnkI5QHwgKpJUUZfOGDTe+9z5hGql78gsnT9mze/frb7xOqp8QQcdsd/Z0NoSzsRykGtRgdAKN/iBvrV+/fgMHDdKIRUTaXBQtIcDR4AsuusU79fsyfdQ8oFEpdLWC0+mi08f0MSZFEY0Oo2ndzElbAnIxzQgWi4pmmhszXEFcUiqYKjzKesVWXVJeQPMdcTROhG4hwPF0AjDJvmKRwewmfr+/oqLip59+6ty5s9frZZpq29DuCiEp4tSpU+O9NMnXJEw+xGM/giv+gpQCMI4bOJ6f7Dy2hFFympq4K3XTImAWOMIsFtYgLS4KIjkIhcIS0QAxbggEwqGwGQMVXSpmzTuRg4hC/8NmRG/ydAozPMgQS7oy69msiJJIQfow6Q1qRFVUhRjoZFAydxdu6jIm1rmmrVu3bujQoTganxFdIwOiM3jRwC5WIzMcKTpll1xla1DDZnBjbU0NGwQDgQCb3mYXMBpYXd/6GT84WvmhWJAkG17Z6EYOiH5o2V2MWlbgueW+J89NmfKN3b+5ASK+b7AiWQVOvoaNsKw85MpPP/10x44dp59++sCBqaO6W4gWUavNYpG1MmnQtn09zcFhzuv1sOPcnGxA/j9yIAKBUPPUcaccwTKkLRjJm+vGzB1PLiDUCgaDnTp1Gjx4cGFh4UE+tN2lVrxSFz9mxI838TMe+/nUQrwSnOyaP6CKHH/bA7p6m8zGmFM0dDmnppkzoYCFERL1iO6uHdWJmn2cNcwfoGyxJVsJc5lNLmr6FHJ9JCzXVNdYE7LxjZCyNQ5ozab+NCqKIVvwGq2OOfDzdGP1qAFrblttMM8KS7xmhfZbMs1yjsNYlCZbDIJi8YegBdZOC80hpgzv5wJL8WNWOgvDP8i0Vu1ua1n+VhDXEPspbsJHzbUdbjoVeEBGJXc1q2z7L3+TgpmWIUSAE3nm+TD3SzQfzbEIg/3VaD/9uAnPETRzVUVjQzELxDe9C2y7x1j4ZeJjrNVcRlxgcYpaHKgwKY9jX7FimpC5Ig+YDr84H1F0MTaM908A07iK/zPZ983OJCyyam4ABXHGxQEHx5b0uvjhTzEB4sy5tqGdA53iKtOSASDhgua+knzZfv7cz8kDjnnW+4Mxxxo9w8btqHuDdmFm2ADI8oXub34mpQSOP4heAKNuOdxEXFFpEN3nLNWdLdujuQ6a4kGpqry/i1naEHMxW6yMdD0MdQ9AFtAWHQya3j3y2QsLHn1nw8jL7r7ulJ4pn3tANDfm7qc68aNnG0jSQpHYHA7TvFYLX2R7POIgr0/RiS2nfOyzxhDJ1pckpRhJ8PsnFSA14lWpljyxVcXb3+PZKGD1XciCPWNQa5/+w0XLNnW+8PKrTu3X6hBH3DTsMLlgLdSADjiGxh8fkm7ZIaeMbRxBJChplkyIV0HjEPxw3k23PPb9hNsml/Xt36eT1zypr//Ps1/s5gefeO6Q7hm1Gz9f9cWPjr7jpgzrlvJxzdw53WFTy0arAZvOlOzPkgn8+Pir/+k0YXq3rc9dPuHlx95987wyGr4c/Pk/v7/imS63/uuL+85d9chvpz+65+YVn0xp5nH712DTFja1bLQdFqmadYpU7N0d8I+5dM69Qz/55ITxb35acV4ZsbVQ36mzb3+vYfEr85dN7cll9eiTl3fmyNL9P6XDwaaWjVYg2bLfv60PC7p2kdzffroOjHZKjoKsLJZJQQ+pzhOnXfblNxcvWPTJ/af2cyj/01rs6OsosKl1lCB+sXo0y1dTHJKumdJ5sD+Fzdv/jr/ccettv7+43Jl7+j3Xjisyz2prFs1ZLUwef/Fv+/corfr6lS0NG998f/3Z0walfOgBJwMPIeIjNg5SEbWpdVTBmuVMJlI7DfmwmQi1GIT+42cu6zJiQ7XW+/iRJR7GEHH4udf1ErqVdj7dKeCdxxV9PF0Xsjs3d4tk92D7IZ5aMC72qg23sql1lCAcDn/55Ze9evUaPHhwZWXlunXrFEURzDTdaeIG+OL9N79ocmLf9g1xf23ftWXd4S1QEgiLKioqNm/eTNowLy+vebdni2BT6yiBKIoDBw7s2rUrz/OZmZn9+/dPyA57xKmV/oDmwk1Zls2cWekdjWHjsIEwyul0FhcXk96QaeJIl6hDoqiIris7JKadTa2jBDCWcplJKiuCAdjyqjXQNI2o1mz9XkpvUMthU+soAQsIio88BjapWo/4sMODdJ/Y1DqqYDm4bFK1GSlXTLYBNrWOErQkXNXGAYHN9dQJwr9tsKl1lOAQznX+kkGU6kAgYO27ZyuENui63VAoFB+TYVOrDRAEoaSkhCXtOMgGtKl1lMDlcp1yyilsh6sOugojHZCRkTFy5MiUu2+2Fja1jhIQUtEtoZKWGNtoFaCZBwEcCplvU8uGjXaBTS0bNtoFNrVs2GgX2NSyYaNdYFMrHVG+YHTZrDUAjJr/9oUvTyBHo+ZvXj2z2RXuNtIRNrXSDVFaXf02XlwWZRgYdeHZNq86GmxqpRdWXWOS6eq3F48nf/UeAACl1oDeNrM6HGxqpRNWXTNhCaB64G3j409fPWl8M1+wkb6wqZVGWPU6JVaj+lf+03rz7/5lR7BQNtoIm1ppg/IF9yYwa+XLtqHVcWFTK22weQMlUiOTVj1guzA6MmxqpQui2p/1Z1SGURdG+YJrVp692Ha+dyzY1EoXlMbcgRSrrrns5ejhkglw/fzNq21edTTY1EobjL9t/qgls9asmVUGZ139Nv4DgBNMhdCeLe6YsKmVPiiduRrPbPxzPMaLj1xhbBwsbGrZsNEusKllw0a7wKaWDRvtAptaNmy0C2xq2bDRLrCpZcNGu8Cmlg0b7YL/B7T8VmK0ID/mAAAAAElFTkSuQmCC) ________________________________________________________________________________________________________________________________________________________________________________________________________________________________
№2. Арбаны суретте көрсетілген бағытта 4м жерге сүйретіп апарылды. а) Жасалған жұмысты анықтаңыз.
____________________________________________________________________________________________________________
в) Арба 5с қозғалғандағы өндірілген қуатты есептеңіз
_____________________________________________________________________________
№3. Тереңдігі 9м көл түбінде массасы 3т, көлемі 0,5м3 болатын тас кесегі жатыр .
а) Тас кесегінің салмағы __________________________________________________________________________
в) Тас кесегінің судағы салмағы ________________________________________
___________________________________________________________________________
___________________________________________________________________________
с) Тасты көл бетіне көтеріп шығару үшін жасалған жұмыс.
___________________________________________________________________________
d) Қуаты 2,5 кВт болатын көтергіш кранның тас кесегін көл бетіне шығару үшін жұмсаған уақыты
___________________________________________________________________________
Бағалау критерийі
|
Тапсырма №
|
Дескриптор
|
Балл
|
Білім алушы:
|
Жұмыстың мөлшерін анықтайды
|
1
|
а жағдайдағы жұмысты есептейді
|
1
|
б жағдайдағы жұмысты есептейді
|
1
|
Жұмысқа сипаттама береді
|
1
|
Есептерді шешуде қуат және жұмыс формулаларын қолданады
|
2
|
Диномометр көрсеткіші арқылы күшті анықтайды
|
1
|
Жұмысты есептейді
|
1
|
Қуатты есептейді
|
1
|
Жұмыс пен қуатты анықтауда Архимед заңын қолданады
|
3
|
Тас кесегінің салмағын анықтайды
|
1
|
Тас кесегіне әсер ететін кері итеруші күшті анықтайды
|
1
|
Тас кесегінің судағы салмағын анықтайды
|
1
|
Тасты көл бетіне көтеріп шығару үшін жасалған жұмысты анықтайды
|
1
|
Көтергіш кранның тасты су бетіне шығаруға жұмсалған уақытты анықтайды
|
1
|
Жалпы балл
|
11
|
Достарыңызбен бөлісу: |