A)![](data:image/png;base64,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)
B)
C)![](data:image/png;base64,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)
D)
E)![](data:image/png;base64,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)
8.Анықталмаған интегралды табыңыз:
A)![](data:image/png;base64,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)
B)
C)![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHUAAAA0CAYAAAC0AHd1AAAACXBIWXMAAA7EAAAOxgGnHWyZAAAGL0lEQVR4nO2bf2gTVxzAvw1CV9BBPa/qbMpwNbk1UKb5Y8tSZXQaUmijDv2n3arUtH9soRTqhoPB5f21wiq4UAWLFWZmGXTMWTs8KpONthT/OO2ElP7CP4xV1ywtolAKzizv6rVpck1yl7skvb3PX71L2rzXz733vt/ve9mEEAKCvtiU6wYQ1IdI1SFEqg7JitTCwtnNf3R1/8o9go+tDd46l6lgIBuf+39Fc6mvXs3s7DvjH+at9cOo2Vyg9ecRNJa6PEL9/jmH5wKy02e1/CzCKppKXXz8cE/g0b436ZIuJ8tCJ1jrryCX+YSWn0nQWGp4IlAd3Ec/qzKzX9VV3YHLvt5b/Yy3lqyp2qL5mmrc9iHHMIZ7ADbYb+V+Gwr9YwYTTaRqiKTU2Gh1+Y4x7GxtOmSjsBx5BMPzlQB0Zq0kyCJBqiD0/M0e+IT9EkUl4uh1APmHOd/lWyBTLMVYbht9Qy2j9j173y9+8HSCN75raaXOqdoDQgIJUhcfP99ZfLTpG4YyTONrg6H8SW2r89icj7sVmAhX2+x02lINlO3eqYZQu9eH7nLRa5yj2qgC2aOdII8EqQaKmWbibxbTT0sAns3F3X4VHt17OSq7pMF7Egc/4nWw1DnW4vnoyK6lpRcFJtcAQi6Sn2aR9AKlhdCOOTC+tDDUbfFWZKq/Fl3lb+CfgxNTx+tgEtCfdFtLR8fbWCYsLWnUZEIq0pI6PcK1gcPTHbueiiMwNHKpvWuwt9ML9YCazQeJzNyTUiqeUofmnG/UHC+9KCVMCIYGg+ESxtSnSQtzDMuykXTfixDKi2UmqVQhEr4WOGM52tQhTKkSFL1VNm0phbGAjvPPfJGVLkml3u/rPh864PW7kkSsi3893BcoAGNwfKZmtrr04nryNyJ4lG40oZh1pU72sz9MMt6+2JJeeKTfPcXU8uLaKozkBWrPqQPWdu/V0PeLi4tbojmQbqRuVCSlYqG9PDQC723kY18odf7eUl30U+j2+fau8P7KVmpyCKKSIxAGIwRehhZgx78jl07P25t+VFJ9IqhDgtQVoRIYK8pv4uk1hC/43sZrDs99d1ReYWHZZkspF+R86K6wCZ7DAoOaJc58YznTCHau3rE++Iytrdq9cGfHwITJ6rJTl/DdBKlmFzqBXJB0e4y2u88iO6zsjy4t7Xpha0YHbeq1XxFqljjzaT1dkYlnyo4vtohxy3L/0LAfYLe14YM68f26OqOkZokzXxBnTqPDc9qNDxrEpJWr/Zu7WFEeia6Uy8+grqTKKXEqIZ2yaLLfx1W4npDN7E7zFAgeoWuESoH7VxYZKyoqei4K15VUSSRKnKmQmnqzXRbFD8z1weDXeMqtqZYu/KxAb5uNfaB0L1WqxKmEbJdFhVMjAJQYnK73PjwFu1yw5msWupaaqsSphGyURXHANzMerMGRu5wZRiQvpSZLq1ZIcYgtVYlTrOnKjXDllEWl+8EDOwgJaUm5wfBETjuSsUaqnOK1msT/Y9NJq1KRrMQZu2bGr5+pUhk5ZdH4fqQbKOEUcet2mIVH8F6KbkqyRmq+5GWZkqrEqbSf2SyLmhhrH/B8Izcy3WZbZ0YSou+RrZ+6Xeb22Pt5Of1mQqoSZ/zaigWnGp1CcJTlsigOzOqt/JVevreR/du5Kz5lEto0bqlp8VQeie+TrqSmU+KUei0dsbkoi+Lpm7WPnsO5cPcZ7nnsazh3Rc20ZPStK6mZrsXriVWrLIpHn9sEsvac8eE9N7Jtk/M7upKaCeJozXU71IBIjUEvgWJGUtduBamfbxGUoVgqzrmuw+Ho000XiFtc/h7an05hm6AtiqQK+VqY2S4m0bj+aHMYL/CDoc/JkZbco0iqEP3ZoCf23nw4WGl0HL5Apt/co0qgJOSHeNeCfFs8L8hI6somMQAFMBTG327Tw1mgjU5GUsXEWJTL+QZ+pkkEnHNUmX5ff2XxpPcqf2N8ps5aLrNqQlAX1YoPkfIK3gr8A7X+HkE56lWUxLNAVGRWPNVGyA2KpIprKDg83+JcVchbf+G+U+MsECFzlI3U18cu+cGuzuWjGfgUPHvITYTmBYqkCifYEHrHpXZrCKpAdml0CJGqQ4hUHfIfxcGSNock/7EAAAAASUVORK5CYII=)
D)
E)![](data:image/png;base64,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)
9.Тең бүйірлі үшбұрыштың табаны бүйір қабырғасынан 15 см артық, ал периметрі 75 см. Үшбұрыштың табанының ұзындығын табыңыз.
A)25 см
B)45 см
C)30 см
D)35 см
E)20 см
10. және векторлары берілген. . және векторларының арасындағы бұрыш -қа тең. неге тең болатынын анықтаңыз.
A)![](data:image/png;base64,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)
Достарыңызбен бөлісу: |