Practice Questions
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Q73.Let π¦= ππ₯= sin3π π + 5π₯2 + 1 2. Then, at π₯= 1, 3cos 3β2-4π₯3 (1) 2π¦' + β3π2π¦= 0 (2) 2π¦' + 3π2π¦= 0 (3) β2π¦' - 3π2π¦= 0 (4) π¦' + 3π2π¦= 0
Q73.Let β³, ββ{β§, β¨} be such that (p βq) β³(pβq) is a tautology. Then (1) β³= β§, β= β¨ (2) β³= β¨, β= β§ (3) β³= β¨, β= β¨ (4) β³= β§, β= β§
Q74.The area of the region π₯, π¦: π₯2 β€π¦β€π₯2 - 4, π¦β₯1 is (1) 4 + 1) 3 (4β2 - 1) (2) 43 (4β2 (3) 3 - 1) 4 (4β2 + 1) (4) 34 (4β2 2 is
Q74.The minimum number of elements that must be added to relation R = {(a, b), (b, c), (b, d)} on the set {a, b, c, d}, so that it is an equivalence relation is
Q74.For the system of linear equations 2x + 4y + 2az = b x + 2y + 3z = 4 2x + 5y + 2z = 8 which of the following is NOT correct? (1) It has unique solution if a = b = 6 (2) It has infinitely many solutions if a = 3, b = 6 (3) It has infinitely many solutions if a = 3, b = 8 (4) It has unique solution if a = b = 8 : = Ο4 } then
Q74.The number of points on the curve π¦= 54π₯5 - 135π₯4 - 70π₯3 + 180π₯2 + 210π₯ at which the normal lines are parallel to π₯+ 90π¦+ 2 = 0 is: (1) 2 (2) 3 (3) 4 (4) 0 3π- 1 2
Q74.Let A, B, C be 3 Γ 3 matrices such that A is symmetric and B and C are skew-symmetric. Consider the statements (S1) A13 B26 βB26 A13 is symmetric (S2) A26C 13 βC 13 A26 is symmetric Then, (1) Only S2 is true (2) Only S1 is true (3) Both S1 and S2 are false (4) Both S1 and S2 are true Q75. 1 3 β10 β10 1 βi Let A = β‘ β€ and B = , where i = ββ1. If M = AT BA , then the inverse of the matrix β3 1 [0 1 ] β£ β10 β10 β¦ AM2023 AT is (1) [10 β2023i1 ] (2) [1β2023i 01 ] (3) [12023i 10 ] (4) [10 2023i1 ] m, such that x βcos x) + m
Q74.If 2π₯π¦+ 3π¦π₯= 20, then ππ¦ at 2, 2 is equal to: ππ₯ (1) - 2 + loge8 (2) - 3 + loge16 3 + loge4 4 + loge8 (3) - 3 + loge8 (4) - 3 + loge4 2 + loge4 2 + loge8 sec2 + tanπ₯
Q74.If the mean and variance of the frequency distribution xi 2 4 6 8 10 12 14 16 fi 4 4 Ξ± 15 8 Ξ² 4 5 are 9 and 15. 08 respectively, then the value of Ξ±2 + Ξ²2 βΞ±Ξ² is _____.
Q74.Let the mean and variance of 12 observations be 29 and 4 respectively. Later on, it was observed that two observations were considered as 9 and 10 instead of 7 and 14 respectively. If the correct variance is mn , where m and n are coprime, then m + n are coprime, then m + n is equal to (1) 315 (2) 316 (3) 314 (4) 317
Q74.The angle of elevation of the top P of a tower from the feet of one person standing due south of the tower is 45Β° and from the feet of another person standing due west of the tower is 30Β° . If the height of the tower is 5 meters, then the distance (in meters) between the two persons is equal to JEE Main 2023 (11 Apr Shift 2) JEE Main Previous Year Paper (1) 5 2 β5 (2) 10 (3) 5 (4) 5β5
Q74.Among the relations S = {(a, b) : a, b βR β{0}, 2 + ab > 0} and T = {(a, b) : a, b βR, a2 βb2 βZ}, (1) S is transitive but T is not (2) both S and T are symmetric (3) neither S not T is transitive (4) T is symmetric but S is not βZ β©[0, 4], 1 β€i, j β€2 . The number of matrices A such that the sum of all entries is a
Q74.The area enclosed between the curves π¦2 + 4π₯= 4 and π¦- 2π₯= 2 is 25 22 (1) (2) 3 3 (3) 9 (4) 23 3
Q74.If β«10 (5+2xβ2x2)(1+e(2β4x))1 (1) 19 (2) β21 (3) 0 (4) 21 JEE Main 2023 (15 Apr Shift 1) JEE Main Previous Year Paper
Q74.The slope of tangent at any point π₯, π¦ on a curve π¦= π¦π₯ is π₯2 + π¦2 π₯> 0. If π¦2 = 0, then a value of π¦8 is 2π₯π¦, JEE Main 2023 (10 Apr Shift 1) JEE Main Previous Year Paper (1) -4β2 (2) 2β3 (3) -2β3 (4) 4β3
Q74.Let X = {11, 12, 13, β¦ . , 40, 41} and Y = {61, 62, 63, . . . , 90, 91} be the two sets of observations. If x and y Β―are their respective means and Ο2 is the variance of all the observations in X βͺY, then x + y βΟ2 is equal to ________
Q74.Area of the region π₯, π¦: π₯2 + π¦- 22 β€4, π₯2 β₯2π¦ is 8 16 (1) π+ (2) 2π+ 3 3 (3) π- 8 (4) 2π- 16 3 3
Q74.Let the mean and variance of 8 numbers x, y, 10, 12, 6, 12, 4, 8 be 9 and 9. 25 respectively. If x > y, then 3x β2y is equal to _______
Q74.A wire of length 20 m is to be cut into two pieces. A piece of length β1 is bent to make a square of area π΄1 and the other piece of length β2 is made into a circle of area π΄2. If 2 π΄1 + 3 π΄2 is minimum then πβ1: β2 is JEE Main 2023 (31 Jan Shift 1) JEE Main Previous Year Paper equal to: (1) 6: 1 (2) 3: 1 (3) 1: 6 (4) 4: 1 π₯2 π₯3 π₯π πΌπ‘50
Q74.Let Ξ± and Ξ² be real numbers. Consider a 3 Γ 3 matrix A such that A2 = 3A + Ξ±I . If A4 = 21A + Ξ²I , then (1) Ξ± = 1 (2) Ξ± = 4 (3) Ξ² = 8 (4) Ξ² = β8
Q74.If P is a 3 Γ 3 real matrix such that P T = aP + (a β1)I, where a > 1, then (1) P is a singular matrix (2) |Adj P| > 1 (3) Adj P = 21 (4) |Adj P| = 1
Q75.Let A = βaΛiΛjββ aij prime number p β(2, 13) is _____ .
Q75. lim 1 1 1 β¦ + 1 is equal to :- πββ 1 + π+ 2 + π+ 3 + π+ 2π (1) 0 (2) loge2 3 2 (3) loge 2 (4) loge 3
Q75.Let |βπ| = 2, | βπ| = 3 and the angle between the vectors βπ and βπ be π 2 βπ) Γ (2βπ- 3 βπ)| 4. Then |( βπ+ equal to (1) 441 (2) 482 (3) 841 (4) 882
Q75.The number of square matrices of order 5 with entries from the set {0, 1}, such that the sum of all the elements in each row is 1 and the sum of all the elements in each column is also 1, is (1) 225 (2) 120 (3) 150 (4) 125