A) 31 B) 55 C) 15 D) 13 E) 25
945. Би үйірмесіне 25 ұл және 19 қыз қатысып жүр. Әр апта сайын үйірмеге 2 ұл және 3 қыз келіп қосылды. Қанша аптадан кейін үйірмедегі ұлдар мен қыздар саны теңеседі?
A) 6 B) 2 C) 3 D) 4 E) 5
946. Бес балаға үш қызыл және төрт көк қалпақты көрсетеді. Қараңғыда үш қызыл, және екі көк қалпақты балалардың басына кигізеді. Қалған қалпақтар жасырылады. Жарық жағылған кезде балардың қайсылары өз бастарындағы қалпақтың түсін көрмей-ақ таба алады?
A) үш көк түсті қалпақ киген балалар B) екі қызыл түсті қалпақ киген балалар C) үш қызыл қалпақ киген балалар D) екі көк түсті қалпақ киген балалар
бір қызыл түсті қалпақ киген бала
947. Бір кітап сөресін жасау үшін 4 ұзын тақтай, 6 қысқа тақтай, 12 кіші бұрамалы шеге, 2 үлкен бұрамалы шеге және 14 бұранда қажет. 26 ұзын тақтай, 33 қысқа тақтай, 200 кіші бұрамалы шеге, 20 үлкен бұрамалы шеге және 510 бұрандадан қанша кітап сөресін жасауға болады?
A) 3 B) 4 C) 5 D) 7 E) 6
948. Серік пен Берікте бірдей ақша болған. Серіктің ақшасы Беріктің ақшасынан 20 теңге артық болуы үшін, Берік қанша ақшасын беруі керек?
A) 10 B) 25 C) 15 D) 20 E) 5
949. Үш қорапта күріш, кеспе, қанттар бар. Әр қораптың бетіне «кеспе», «күріш», «күріш немесе қант» деген жазулардың қай біреуі жазылған. Бірақ бұл жазулардың ешқайсысы оның ішіндегі затқа сәйкес келмейді. Күріш деп жазылған қорапта қандай зат бар екенін анықтаңыз.
Қант B) Бос C) Кеспе
D) Анықтау мүмкін емес E) Күріш
950. Үш таңбалы екі бүтін санның қосындысы 495*к санына, ал бөліндісі 4 санына тең болса, сол сандарды анықтаңыз.
A) 198 және 792 B) 315 және 675 C) 158 және 337
D) 245 және 250 E) 184 және 311
951. Алтын сағатқа ойып жазылған жазылған жазудың алғашқы 5 әріпіне 476 теңге және әрбір келесі қосымша әріпі үшін 14 теңге төленді. 644 теңге төленіп жазылған адамның аты-жөні неше әріптен тұрады?
12 әріптен B) 7 әріптен C) 19 әріптен
11 әріптен E) 17 әріптен
952. Есептеңіз: (38-1)(38-2)(38-3)...(38-41)
A) 150 B) -100 C) 38 D) 100 E) 0
953. Дұрыс тұжырымды көрсетіңіз: p+q=3 және p-q=6
A) q>0 B) q<0 C) q=0 D) q=3, p<0 E) q=-3, p=6 954. Екі санның қосындысы 30, ал олардың ең кіші ортақ еселігі 36 болса, осы сандарды табыңыз.
A) 10; 20 B) 8; 22 C) 9; 21 D) 12; 18 E) 14; 16
955. Сұрақ белгісіне тең болатын өрнекті табыңыз:
A) 3c+2b+e B) 3c+d+e C) 3c+d+2e
3c+d+b E) 3c+3d
Есепте: √2100
A) 250 B) 225 C) 210 D) 250 E) 10020
√75 саны қандай натурал сандардың арасында орналасқан?
5 және 6 B) 49 және 64 C) 8 және 9
D) 7 және 8 E) 73 және 77
958. Суретте көрсетілген сандық сәуледегі
|
27
|
-ге
|
сәйкес келетін нүкте
A) M B) Q C) L D) N E) P
959.Суреттегі көрсетілген сандық сәуледегі √20 -ге сәйкес келетін нүкте.
A) N
|
B) P
|
C) Q
|
D) M
|
E) L
|
|
|
|
|
|
|
|
|
|
|
|
|
960. Егер √
|
х − 15
|
− 7 = 0
|
|
|
болса, √
|
х
|
- неге тең?
|
A) 36
|
|
|
B) 8
|
|
|
C) 64
|
|
|
|
D) 6
|
|
|
E) 16
|
961. Егер √
|
|
|
|
|
|
|
болса, √
|
|
- неге тең?
|
х − 11
|
− 5 = 0
|
х
|
A) 36
|
|
|
B) 8
|
|
C) 4
|
|
|
D) 6
|
E) 10
|
|
|
|
|
|
|
|
|
|
962. Егер x<0 болса,
|
|x-√( − 1)2| неге тең?
|
А) 1 В) 1-2х С) -2х-1 Д) 1+2х Е) 2х-1
|
963.
|
|−3|+|−5|
|
= ,
|
|
|−7|−|−3|
|
= .
|
А және В
|
|
|
|
|
|−9|−|−2|
|
|
|−2|+|−3|
|
|
|
|
|
бағандарын салыстырыңыз:
|
|
|
|
|
А бағаны
|
|
|
|
|
|
|
|
|
|
|
|
В бағаны
|
х
|
|
|
|
|
|
|
|
|
|
|
|
у
|
|
|
|
|
A) A>B
|
|
|
B) 3A=B
|
C) A=2B
|
|
D) A=B E) A |
964. Меңзер қай санды көрсетіп тұр?
A) 2008, 2007, 2011, 2010, 2012, 2009
|
B) 2008,
|
2007, 2010, 2011, 2012, 2009
|
C) 2007, 2008, 2010,
|
2011, 2012, 2009
|
D) 2008, 2010, 2011, 2007, 2012,
|
2009
|
|
|
|
966.
|
|
|
|
![](data:image/jpeg;base64,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)
967. Квадраттық функцияның графигі бойынша a коэффициенті мен D дискриминантының таңбасын анықтаңыз. 0>0>0>
Достарыңызбен бөлісу: |