C)
D)![](data:image/png;base64,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)
E)
F)![](data:image/png;base64,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)
G)
H)![](data:image/png;base64,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)
24. Жалпы мүшесі мына формуламен берілген тізбектің алғашқы үш мүшесін табыңыз:
A)2;6;8
B)
C)1;2;5
D)
E)![](data:image/png;base64,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)
F)
G)![](data:image/png;base64,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)
H)
25. теңсіздігінің шешімі болатын жауап(тар):
A)
B)![](data:image/png;base64,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)
C)
D)![](data:image/png;base64,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)
E)
F)![](data:image/png;base64,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)
G)
H)![](data:image/png;base64,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)
26. Қай теңсіздіктің шешімі суретте кескінделген?
A)
B)![](data:image/png;base64,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)
C)
D)![](data:image/png;base64,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)
E)
F)![](data:image/png;base64,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)
G)
H)![](data:image/png;base64,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)
27. a-ның қандай мәнінде түзуі функциясының графигіне жанама болады?
A)– 5
B)4
C)1
D)2
E)– 6
F)– 7
G)7
H)– 4
28. Егер AB=8 см, ![](data:image/png;base64,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) болса, ABC үшбұрышынан АС қабырғасының ұзындығын табыңыз:
A)4 см
B)4 см
C)5 см
D) см
E)4 см
F)5 см
G)10 см
H)6 см
29. сызықтарымен шектелген фигура ауданы:
A)
B)![](data:image/png;base64,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)
C)
D)![](data:image/png;base64,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)
E)
F)![](data:image/png;base64,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)
G)
H)![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABEAAAAwCAYAAAD3nZFpAAAACXBIWXMAAA7KAAAOxwGEDDyoAAACGUlEQVR4nGNpbGxkoBSwUGzCqCHkG3JzU/3CZQxRDI1+6vFkGfL/1iafZWcZ4hiMGRaR5ZJ//+5Ibj30KluWgeHtYzzq8Bpye8uBEpFAu8n/Jy2dTJYhIG8cFvZ/liT48fwWfDbhMoSd/SnPvhvChp6hMv0M3z/yEjADuyFP9m1Pf6uRfN76588v/xgYSDfk39vjhhvf2kqlWDP2EtKM05C3N646PT77uKj+LEMRisTZZUr1Z2W9PfKSXC2Fmc7jNUTUOqW30ZoB7gpQNG9pXHzkrHHUEbITGzGAPoYwMak892tsVPYbcJeMGkIFQ+rr6/8TowlY4THiNARdkiyXkAtGDSHBkNdH5xRP2fW4B8Izvhdb72OjwsT0nGhDQNXFRgZ/YJSLMsJKtsVzRRen5TgESAMLb4KGgKqLA281xFOsRcFFJKg8sXSTnXZ21+us79+/8wIFCBvy86f0F0tLhrnIYu/ePtaTdfOfRpJ3kAG8RQB1GUmGgOqfeZN27AbWwcIMDIffHrdWNUSvKggawiRseT6l0VIEZtiOSVvWiOKIIcIFNdCw5OjXCQ1Lz26+dsfXWEWNAaN+Jyqx/VfROmvMcPYeLnniUuz71xKvGGT/aAv/f8rAgFlaYK3QQWHA4JbTDkor4HSzbkc3kD+L+IAVFH0hxsDw8eyuKT31uxiAyV72rUdevWsKDgOwGkJMjUfYJWSAwWMIACXB1Vr7H4SAAAAAAElFTkSuQmCC)
30. Биіктігі 6 см, ал диагоналі табан жазықтығымен 45° бұрыш жасайтын тікбұрышты параллепепипед цилиндрге іштей сызылған. Цилиндр көлемін табыңыз
A) см3
B) см3
C) см3
D) см3
E) см3
F) см3
G) см3
H) см3
Достарыңызбен бөлісу: |