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Aptitude - Arithmetic Online Quiz
Following quiz provides Multiple Choice Questions (MCQs) related to Basic Arithmetic. You will have to read all the given answers and click over the correct answer. If you are not sure about the answer then you can check the answer using Show Answer button. You can use Next Quiz button to check new set of questions in the quiz.
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Answer : B
Explanation
Here a = 72, d = 63 - 72 = -9, Using formula Tn = a + (n - 1)d Tn = 72 + (n - 1) x -9 = 0 => 81 - 9n = 0 => n = 9
Answer : A
Explanation
29/9 = 3 and 98/9 = 10 => 10 - 3 =7.
Answer : B
Explanation
1 to 9 ------ 9 digits 10 to 50 ------ 82 digits
Q 4 - If 123 is subtracted from the square of a number, the answer so obtained is 976. What is the number?
Answer : D
Explanation
Let the number be x. According to question: x2 - 123 = 976 or, x = 52
Q 5 - If first term of an A.P. is 6, its common difference is 5 then what is its 11th term?
Answer : D
Explanation
Here numbers are 14, 21, ..., 196 which is an A.P. Here a = 6, d = 5, Using formula Tn = a + (n - 1)d T11 = 6 + (11 - 1) x 5 = 56
Answer : D
Explanation
Required sum = 101 + 103 + ... + 199 which is an A.P. where a = 101, d = 2, l = 199. Using formula Tn = a + (n - 1)d Tn = 101 + (n-1)2 = 199 => 2n = 199 - 99 = 100 => n = 50 Now Using formula Sn = (n/2)(a + l) ∴ Required sum = (50/2)(101+199) = 50 x 150 = 7500
Q 7 - If 2th and 5th terms of a G.P. are 2/3 and 16/81 then what will be the 7th term?
Answer : D
Explanation
Using formula Tn = arn- 1 T2 = ar(2 - 1) => ar = 2/3 ... (i) T5 = ar(5 - 1) => ar4 = 16/81 ... (ii) Dividing (ii) from (i) => r3 = (2/3) x (81/16) = 9/8 = (2/3)3 => r = 2/3 Using (i) a = (2/3) / (2/3) = 1 => T7 = ar(7 - 1) = (2/3)(6) = 64/729
Answer : D
Explanation
Using formula (13 + 23 ... + n3) = [(1/2)n(n+1]2 (13 + 23 ... + 153) = [(15 x 16)/2]2 = 1202 = 14400
Answer : C
Explanation
Here a = 14, d = 9 - 14 = -5, n = 15 Using formula Tn = a + (n - 1)d T15 = 14 + (15 - 1) x -5 = -56
Q 10 - If population of a bacteria doubles every 2 minutes. In how much minutes, it will grow from 1000 to 1024000?
Answer : A
Explanation
Let the required growth be 1000, 2000, 4000,...1024000. Here, a = 1000, r = 2, Tn = 512000 Using formula Tn = arn-1 => 1000 x 2n-1 = 1024000 => 2n-1 = 1024 = 219 => n - 1 = 10 => n = 11 ∴ time taken will be 2 x 10 = 20 minutes.
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