#1
13th April 2013, 04:39 PM
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ISI Kolkata Admission Test Result
Hello, when will the result of ISI Kolkata declare and provide me some model paper of this exam?
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#2
15th April 2013, 05:03 PM
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Re: ISI Kolkata Admission Test Result
Here you are looking for result of ISI Admission test but result is not declare yet because paper of this test will be held on 12 May 2013. So whenever result will de declares it will be on official website of ISI. Tentatively result will de declare in June 2013. Here I am giving you model paper of this paper. 1 Define an = (12 + 22 + . . . + n2)n and bn = nn(n!)2. Recall n! is the product of the first n natural numbers. Then, (A) an < bn for all n > 1 (B) an > bn for all n > 1 (C) an = bn for infinitely many n (D) None of the above 2 The sum of all distinct four digit numbers that can be formed using the digits 1, 2, 3, 4, and 5, each digit appearing at most once, is (A) 399900 (B) 399960 (C) 390000 (D) 360000 3 The last digit of (2004)5 is (A) 4 (B) 8 (C) 6 (D) 2 4 The coefficient of a3b4c5 in the expansion of (bc + ca + ab)6 is (A)12!3!4!5! (B) _63_3! (C) 33 (D) 3_6 3_ 5 Let ABCD be a unit square. Four points E, F, G and H are chosenon the sides AB, BC, CD and DA respectively. The lengths of thesides of the quadrilateral EFGH are _, _, and _. Which of the following is always true? (A) 1 ≤ _2 + _2 + 2 + _2 ≤ 2√2 (B) 2√2 ≤ _2 + _2 + 2 + _2 ≤ 4√2 (C) 2 ≤ _2 + _2 + 2 + _2 ≤ 4 (D) √2 ≤ _2 + _2 + 2 + _2 ≤ 2 + √2 6 If log10 x = 10log100 4 then x equals (A) 410 (B) 100 (C) log10 4 (D) none of the above 8 The set of all real numbers x satisfying the inequality x3(x+1)(x−2) ≥ 0 is (A) the interval [2,∞) (B) the interval [0,∞) (C) the interval [−1,∞) (D) none of the above 9 Let z be a non-zero complex number such that z1+z is purely imagi-nary. Then (A) z is neither real nor purely imaginary (B) z is real (C) z is purely imaginary (D) none of the above 10 Let A be the fixed point (0, 4) and B be a moving point (2t, 0). Let M be the mid-point of AB and let the perpendicular bisector of AB meet the y-axis at R. The locus of the mid-point P of MR is (A) y + x2 = 2 (B) x2 + (y − 2)2 = 1/4 (C) (y − 2)2 − x2 = 1/4 (D) none of the above 11 The sides of a triangle are given to be x2 + x + 1, 2x + 1 and x2 − 1. Then the largest of the three angles of the triangle is (A) 75◦ (B) _ x x + 1_ radians (C) 120◦ (D) 135◦ 12 Two poles, AB of length two metres and CD of length twenty me- tres are erected vertically with bases at B and D. The two poles are at a distance not less than twenty metres. It is observed that tan\ACB = 2/77. The distance between the two poles is (A) 72m (B) 68m (C) 24m (D) 24.27m Address: Indian Statistical Institute, 203 Barrackpore Trunk Road, Kolkata 700108, India Map: [MAP]Indian Statistical Institute,Kolkata [/MAP] Here I am giving you PDF of model paper which you can download with free of cost. Last edited by Quick Sam; 27th May 2015 at 10:30 AM. |
#3
27th May 2015, 10:19 AM
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Re: ISI Kolkata Admission Test Result
Will you please provide the B.MATH Programme admission test result of ndian Statistical Institute , Kolkata ?
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#4
27th May 2015, 10:29 AM
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Re: ISI Kolkata Admission Test Result
Here I am providing the list of few roll numbers of applicants who have been qualified in the B.MATH Programme admission test result of Indian Statistical Institute , Kolkata which you are looking for . BMTB-BG-0019 BMTB-BG-0027 BMTB-BG-0030 BMTB-BG-0039 BMTB-BG-0050 BMTB-BG-0102 BMTB-BG-0174 BMTB-BG-0192 BMTB-BG-0223 BMTB-BG-0224 BMTB-MN-0018 BMTB-CN-0003 BMTB-CN-0061 BMTB-CN-0101 BMTB-CN-0169 BMTB-CO-0011 BMTB-HY-0095 BMTB-HY-0109 BMTB-HY-0162 BMTB-HY-0163 BMTB-HY-0227 BMTB-HY-0234 BMTB-HY-0254 BMTB-HY-0255 BMTB-HY-0261 BMTB-HY-0273 BMTB-HY-0337 BMTB-HY-0343 BMTB-HY-0359 BMTB-HY-0368 BMTB-HY-0384 BMTB-HY-0386 Indian Statistical Institute B.MATH Programme admission test result |