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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)
F)
G)![](data:image/png;base64,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)
H)
26. Қай теңсіздіктің шешімі суретте кескінделген?
A)
B)
C)
D)
E)
F)
G)
H)
27. функциясының туындысын табыңыз.
A)
B)![](data:image/png;base64,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)
C)
D)![](data:image/png;base64,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)
E)4,5
F)
G)![](data:image/png;base64,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)
H)
28. Қабырғасы 5 см, диагоналі 4 см және сүйір бұрышының синусы болатын параллелограмның ауданын табыңыз.
A)1400 мм2
B)21 см2
C)2100 мм2
D)14 см2
E)42 см2
F)1200 мм2
G)4200 мм2
H)12 см2
29. Cызықтармен шектелген боялған фигураның ауданы:
A)7
B)9
C)5
D)8
E)4
F)10
G)6
H)3
30. AB кесіндісінің ортасы ОХ осінде жатыр. және болса,
m+n мәні:
A)3
B)1
C)2
D)4
E)– 1
F)– 2
G)0
H)– 3
Достарыңызбен бөлісу: |