Practice Questions
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Q81.Let the complex numbers Ξ± and lie on the circles z - z02 = 4 and z - z02 = 16 respectively, where z0 = 1 + i. Β―Ξ± Then, the value of 100 | Ξ±| 2 is__________.
Q81.The number of distinct real roots of the equation |x + 1||x + 3| β4|x + 2| + 5 = 0, is JEE Main 2024 (08 Apr Shift 2) JEE Main Previous Year Paper
Q81.If Ξ± satisfies the equation x2 + x + 1 = 0 and (1 + Ξ±)7 = A + BΞ± + CΞ±2, A, B, C β₯0 , then 5(3 A β2 B βC) is equal to
Q81.Let π, π, π be the length of three sides of a triangle satisfying the condition π2 + π2π₯2 β2ππ+ π π₯+ π2 + π2 = 0. If the set of all possible values of π₯ is in the interval πΌ, π½, then 12πΌ2 + π½2 is equal to _______.
Q81.The sum of the square of the modulus of the elements in the set {z = a + ib : a, b βZ, z βC, |z β1| β€1, |z β5| β€|z β5i|} is ________
Q81.There are 4 men and 5 women in Group A, and 5 men and 4 women in Group B. If 4 persons are selected from each group, then the number of ways of selecting 4 men and 4 women is _____
Q81.The number of integers, between 100 and 1000 having the sum of their digits equals to 14 , is _________
Q81.Let Ξ±, Ξ² be roots of x2 + β2x β8 = 0. If Un = Ξ±n + Ξ²n , then U10+β2U9 is equal to______ 2U8
Q82.All the letters of the word GTWENTY are written in all possible ways with or without meaning and these words are written as in a dictionary. The serial number of the word GTWENTY IS 11C2 11C9
Q82.The coefficient of x2012 in the expansion of 1 - x20081 + x + x22007 is equal to _____.
Q82.If 8 = 3 + 14 (3 + p) + 421 (3 + 2p) + 431 (3 + 3p) + β¦ β, then the value of p is JEE Main 2024 (27 Jan Shift 1) JEE Main Previous Year Paper
Q82.If ( Ξ±+11 + Ξ±+21 + β¦ β¦ + Ξ±+10121 ) β( 2β 11 + 4β 31 + 6β 51 + β¦ . . + 2024β 20231 ) = 20241 , then Ξ± is equal to________
Q82.Let 3, 7, 11, 15, . . , 403 and 2, 5, 8, 11, . . . , 404 be two arithmetic progressions. Then the sum, of the common terms in them, is equal to_________ 1 6
Q82.If three successive terms of a G.P. with common ratio ππ> 1 are the length of the sides of a triangle and π denotes the greatest integer less than or equal to r, then 3π+ βπ is equal to: 2π
Q82.An arithmetic progression is written in the following way The sum of all the terms of the 10th row is_______
Q82.Let the length of the focal chord PQ of the parabola y2 = 12x be 15 units. If the distance of PQ from the origin is p, then 10p2 is equal to _______ JEE Main 2024 (04 Apr Shift 1) JEE Main Previous Year Paper
Q82.Let the positive integers be written in the form : If the kth row contains exactly k numbers for every natural number k, then the row in which the number 5310 will be, is _______ + n+11 . If 140 < 2Ξ±Ξ² < 281, then the value of n is
Q82.Let the coefficient of π₯π in the expansion of π₯+ 3πβ1 + π₯+ 3πβ2π₯+ 2 + π₯+ 3πβ3π₯+ 22 + . ... + π₯+ 2πβ1 be πΌπ. If βπ=π 0 πΌπ= π½πβπΎπ, π½, πΎβπ, then the value of π½2 + πΎ2 equals _______.
Q82.If 1 + β3ββ2 a + loge ( ab ), where a and b are + 49β20β6180 + β¦ upto β= 2 + 2β3 + 5β2β618 + 9β3β11β236β3 (βb 1) integers with gcd(a, b) = 1, then 11a + 18 b is equal to ______
Q82.Let Ξ±, Ξ² be the roots of the equation x2 ββ6x + 3 = 0 such that Im (Ξ±) >Im (Ξ²). Let a, b be integers not + i = ββ1. Then n + a + b is divisible by 3 and n be a natural number such that Ξ±99Ξ² + Ξ±98 = 3n(a ib), equal to ___________.
Q82.If S(x) = (1 + x) + 2(1 + x)2 + 3(1 + x)3 + β―+ 60(1 + x)60, x β 0, and (60)2 S(60) = a(b)b + b, where a, b βN , then (a + b) equal to ______
Q82.In an examination of Mathematics paper, there are 20 questions of equal marks and the question paper is divided into three sections : A, B and C. A student is required to attempt total 15 questions taking at least 4 questions from each section. If section A has 8 questions, section B has 6 questions and section C has 6 questions, then the total number of ways a student can select 15 questions is _________. 6 π
Q82.The total number of words (with or without meaning) that can be formed out of the letters of the word "DISTRIBUTION" taken four at a time, is equal to ______. 3 3 1 5
Q83.If the constant term in the expansion of (1 + 2x β3x3)( 32 x2 β 3x1 ) 9
Q83.The number of solutions of sin2 x + (2 + 2x βx2) sin x β3(x β1)2 = 0, where βΟ β€x β€Ο, is________