isical.ac.in B.Statistics ISI Admission Test Sample Question Paper : Indian Statistical Institute
Name of the University : Indian Statistical Institute
Exam : ISI Admission Test
Document Type : Sample/Previous Year Question Paper
Name of the Subject : B.Stat
Year : 2016
Website : http://www.isical.ac.in/~admission/IsiAdmission2017/PreviousQuestion.html
Download Sample/Previous Years’ Questions :
2016 UGA(Odd) : https://www.pdfquestion.in/uploads/11316-BStatodd-2016.pdf
2016 UGA(Even) : https://www.pdfquestion.in/uploads/11316-BStateven-2016.pdf
2015 UGA(Odd) : https://www.pdfquestion.in/uploads/11316-BStatodd-2015.pdf
2015 UGA(Even) : https://www.pdfquestion.in/uploads/11316-BStateven-2015.pdf
2014 UGA(Odd) : https://www.pdfquestion.in/uploads/11316-BStatodd-2014.pdf
2014 UGA(Even) : https://www.pdfquestion.in/uploads/11316-BStateven-2014.pdf
B.Statistics ISI Admission Test Sample Question Paper :
Test Code : UGA
Questions: 30
Time: 2 hours
Instruction :
** Write your Name, Registration Number, Test Centre, Test Code and the Number of this Booklet in the appropriate places on the Answersheet.
** This test contains 30 questions in all.
Related : Indian Statistical Institute JRF Agriculture & Ecology Entrance Exam Questions Sample : www.pdfquestion.in/7885.html
** For each of the 30 questions, there are four suggested answers. Only one of the suggested answers is correct.
** You will have to identify the correct answer in order to get full credit for that question.
** Indicate your choice of the correct answer by darkening the appropriate oval”, completely on the answersheet.
You will get :
** 4 marks for each correctly answered question,
** 0 marks for each incorrectly answered question and
** 1 mark for each unattempted question.
** All Rough Work Must Be Done On This Booklet Only.
** You Are Not Allowed To Use Calculator.
1. The polynomials” + æ” + 1 is divisible by
(A) acº — a 4 + æ” — a + 1.
(B) ar” + æ4 + 1.
(C) a ” + æ4 + æ” + a + 1.
(D) arº – a 4 + æ” + a + 1.
2. The largest integer n for which n + 5 divides n° + 5 is
(A) 3115.
(B) 3120.
(C) 3125.
(D) 3130
3. Let p, q be primes and a, b be integers. If pa is divided by q, then the remainder is 1. If qb is divided by p, then also the remainder is 1. The remainder when pa — qb is divided by pa is
(A) 1.
(B) 0.
(C) –1.
(D) 2.
4. Consider a circle of unit radius and a chord of that circle that has unit length. The area of the largest triangle that can be inscribed in the circle with that chord as its base is 1 V2 1 V2
(A) *
(B) * .
(C) +*.
(D) +*.
5. Leto – 0. If the equation p(a) = a “-9a,” +26a. – o has three positive real roots, then o must satisfy
(A) o s 27.
(B) o S 81.
(C) 27 × o s 54.
(D) 54 × os 81.
6. The largest integer which is less than or equal to (2 + V3)* is
(A) 192.
(B) 193.
(C) 194.
(D) 195.
7. Let f(a) = max{cosa, a.”), 0 < a. 3 #. If wo is the solution of the equation cosa = a,” in (0, ;), then
(A) f is continuous only at a.o.
(B) f is not continuous at a:0.
(C) f is continuous everywhere and differentiable only at a:0.
(D) f is differentiable everywhere except at a.o.
8. Let z = 3 + 4i. If 22 is a complex number such that |z2|=2, then the greatest and the least values of |z1 – 22 are respectively
(A) 7 and 3.
(B) 5 and 1.
(C) 9 and 5.
(D) 4 + V7 and V7.
9. Consider two distinct arithmetic progressions (AP) each of which has a positive first term and a positive common difference. Let Sn and T. be the sums of the first n terms of these AP. Then lim Sn equals n-yoo Tº,
(A) co or 0 depending on which AP has larger first term.
(B) co or 0 depending on which AP has larger common difference.
(C) the ratio of the first terms of the AP
(D) the ratio of the common differences of the AP
10. Suppose that both the roots of the equation a ” + aa. 4- 2016 = 0 are positive even integers. The number of possible values of a is
(A) 6.
(B) 12.
(C) 18.
(D) 24.
Test Code : UGA Even
Questions: 30
Time: 2 hours
Instructions :
** Write your Name, Registration Number, Test Centre, Test Code and the Number of this Booklet in the appropriate places on the Answer sheet.
** This test contains 30 questions in all.
** For each of the 30 questions, there are four suggested answers.
** Only one of the suggested answers is correct.
** You will have to identify the correct answer in order to get full credit for that question.
** Indicate your choice of the correct answer by darkening the appropriate oval”, completely on the answersheet
** You Will Get 4 Marks For Each Correctly Answered Question, 0 Marks For Each Incorrectly Answered Question And 1 Mark For Each Unattempted Question.
** All Rough Work Must Be Done On This Booklet Only.
** You Are Not Allowed To Use Calculator.
** Wait For The Signal To Start.
1. The polynomial a” + æ” + 1 is divisible by
(A) acº — a 4 + æ” — a + 1.
(B) ar” + æ4 + 1.
(C) a ” + æ4 + æ” + a + 1.
(D) arº – a 4 + æ” + a + 1.
2. The largest integer n for which n + 5 divides n° + 5 is
(A) 3115.
(B) 3120.
(C) 3125.
(D) 3130.
3. Let p, q be primes and a, b be integers. If pa is divided by q, then the remainder is 1. If qb is divided by p, then also the remainder is 1. The remainder when pa — qb is divided by pa is
(A) 1.
(B) 0.
(C) –1.
(D) 2.
4. Let a- 0. If the equation p(a) = a “-9a,” +26a. – o has three positive real roots, then o must satisfy
(A) a s 27.
(B) a S 81.
(C) 27 × a s 54.
(D) 54 × a s 81.
5. The largest integer which is less than or equal to (2 + V3)* is
(A) 192.
(B) 193.
(C) 194.
(D) 195