Practice Questions
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Q70.If the domain of the function ππ₯= 2π₯+ 3 + cos-12π₯- 1 is ( πΌ, π½], then the value of 5π½- 4πΌ is equal to logπ 4π₯2 + π₯- 3 π₯+ 2 (1) 10 (2) 12 (3) 11 (4) 9 π₯2ππ₯ππ₯
Q70.Let a1, a2, . . . , a10 be 10 observations such that β10k=1 ak = 50 and ββk<j ak β aj = 1100. Then the standard deviation of a1, a2, β¦ , a10 is equal to : (1) 5 (2) β5 (3) 10 (4) β115
Q70.Consider the relations π 1 and π 2 defined as ππ 1πβπ2 + π2 = 1 for all π, π, βπ and π, ππ 2π, πβπ+ π= π+ π for all π, π, π, πβπΓ π. Then (1) Only π 1 is an equivalence relation (2) Only π 2 is an equivalence relation (3) π 1 and π 2 both are equivalence relation (4) Neither π 1 nor π 2 is an equivalence relation
Q70.For the function f(x) = (cos x) βx + 1, x βR, between the following two statements (S1) f(x) = 0 for only one value of x in [0, Ο]. (S2) f(x) is decreasing in [0, Ο2 ] and increasing in [ Ο2 , Ο]. (1) Both (S1) and (S2) are correct. (2) Both (S1) and (S2) are incorrect. (3) Only (S2) is correct. (4) Only (S1) is correct.
Q70.Let the relations R1 and R2 on the set X = {1, 2, 3, β¦ , 20} be given by R1 = {(x, y) : 2x β3y = 2} and R2 = {(x, y) : β5x + 4y = 0}. If M and N be the minimum number of elements required to be added in R1 and R2 , respectively, in order to make the relations symmetric, then M + N equals (1) 12 (2) 16 (3) 8 (4) 10 Ξ±
Q70.Let the mean and the variance of 6 observation π, π, 68, 44, 48, 60 be 55 and 194, respectively if π> π, then π+ 3π is (1) 200 (2) 190 (3) 180 (4) 210 Q71. 1 1 β1 β1 0 0 Let A be a 3 Γ 3 real matrix such that π΄ 0 = 2 0 , π΄ 0 = 4 0 , π΄ 1 = 2 1 . Then, the system 1 1 1 1 0 0 π₯ 1 π΄β3πΌ π¦ = 2 has π§ 3 (1) unique solution (2) exactly two solutions (3) no solution (4) infinitely many solutions
Q70.Let a relation R on N Γ N be defined as: (x1, y1)R (x2, y2) if and only if x1 β€x2 or y1 β€y2 . Consider the two statements: (I) R is reflexive but not symmetric. (II) R is transitive Then which one of the following is true? (1) Both (I) and (II) are correct. (2) Only (II) is correct. (3) Neither (I) nor (II) is correct. (4) Only (I) is correct. JEE Main 2024 (04 Apr Shift 2) JEE Main Previous Year Paper
Q70.If the system of linear equations π₯- 2π¦+ π§= - 4 2π₯+ πΌπ¦+ 3π§= 5 3π₯- π¦+ π½π§= 3 has infinitely many solutions, then 12πΌ+ 13π½ is equal to (1) 60 (2) 64 (3) 54 (4) 58
Q70.Let A = {1, 3, 7, 9, 11} and B = {2, 4, 5, 7, 8, 10, 12}. Then the total number of one-one maps f : A βB , such that f(1) + f(3) = 14, is : (1) 480 (2) 240 (3) 120 (4) 180
Q70.Let A be a square matrix such that AAT = I. Then 12 A[( A + AT)2 + (A βAT)2] (1) A2 + I (2) A3 + I (3) A2 + AT (4) A3 + AT
Q70.If π΄= β2 1 , π΅1 , πΆ= π΄π΅π΄π and π= π΄ππΆ2π΄, then det π is equal to: β1 β2 1 1 (1) 243 (2) 729 (3) 27 (4) 891
Q71.Let f, g : R βR be defined as : f(x) = |x β1| and g(x) = {ex,x + MARA1, xx β₯0β€0 Then the function f(g(x)) is (1) neither one-one nor onto. (2) one-one but not onto. (3) onto but not one-one. (4) both one-one and onto.
Q71.Let f: R - -1 βR and g: R - -5 βR be defined as fx = 2x + 3 and gx = |x | + 1 . Then the domain of the function 2 2 2x + 1 2x + 5 fog is : 5 (1) R - - (2) π 2 7 5 7 (3) R - - (4) R - - - 4 2, 4
Q71. r 1 n22 + For Ξ±, Ξ² βR and a natural number n, let Ar = 2r 2 n2 βΞ² . Then n(3nβ1) 3r β2 3 2 (1) 0 (2) 4Ξ± + 2Ξ² (3) 2Ξ± + 4Ξ² (4) 2n
Q71.Let f(x) = ax3 + bx2 + cx + 41 be such that f(1) = 40, f β²(1) = 2 and f β²(1) = 4. Then a2 + b2 + c2 is equal to: (1) 73 (2) 62 (3) 51 (4) 54
Q71.Consider the system of linear equation x + y + z = 4ΞΌ, x + 2y + 2Ξ»z = 10ΞΌ, x + 3y + 4Ξ»2z = ΞΌ2 + 15, where Ξ», ΞΌ βR. Which one of the following statements is NOT correct? (1) The system has unique solution if Ξ» β 12 and (2) The system is inconsistent if Ξ» = 12 and ΞΌ β 1 ΞΌ β 1, 15 (3) The system has infinite number of solutions if (4) The system is consistent if Ξ» β 12 Ξ» = 21 and ΞΌ = 15 + (loge(3 βx))β1 is [βΞ±, Ξ²) β{Ξ³}, then Ξ± + Ξ² + Ξ³ is
Q71.For πΌ, π½, πΎβ 0. If sinβ1πΌ+ sinβ1π½+ sinβ1πΎ= π and πΌ+ π½+ πΎπΌβπΎ+ π½= 3πΌπ½, then πΎ equal to β3 1 (1) (2) 2 β2 (3) β3 - 1 (4) β3 2β2
Q71.If the domain of the function sinβ1 ( 3xβ222xβ19 ) + loge ( 3x2β8x+5x2β3xβ10 ) (1) 100 (2) 95 (3) 97 (4) 98
Q71.Let π: π βπ be a function defined ππ₯= π₯ / 4 and ππ₯= πππππ₯ then 18 β«0β2β5 1 + π₯41 (1) 33 (2) 36 (3) 42 (4) 39
Q71.Let x = mn (m, n are co-prime natural numbers) be a solution of the equation cos(2 sinβ1 x) = 19 and let Ξ±, Ξ²(Ξ± > Ξ²) be the roots of the equation mx2 βnx βm + n = 0. Then the point (Ξ±, Ξ²) lies on the line (1) 3x + 2y = 2 (2) 5x β8y = β9 (3) 3x β2y = β2 (4) 5x + 8y = 9 β1 < x < 1. Then at x = 12 , the value of 225(yβ² βyβ²β²) is equal to
Q71.If f(x) = { 21 +βx2x,3 , 0β1β€xβ€xβ€3< 0 ; g(x) = { x,βx,0 <β3x β€1β€x β€0 , then range of (f βg(x)) is (1) (0, 1] (2) [0, 3) (3) [0, 1] (4) [0, 1)
Q71.Let f(x) = x5 + 2x3 + 3x + 1, x βR , and g(x) be a function such that g(f(x)) = x for all x βR . Then g(7) gβ²(7) is equal to : (1) 14 (2) 42 (3) 7 (4) 1
Q71.Let f(x) = 4 cos3 x + 3β3 cos2 x β10. The number of points of local maxima of f in interval (0, 2Ο) is (1) 3 (2) 4 (3) 1 (4) 2
Q71.If the system of equations 2π₯+ 3π¦βπ§= 5 π₯+ πΌπ¦+ 3π§= β4 3π₯βπ¦+ π½π§= 7 has infinitely many solutions, then 13πΌπ½ is equal to (1) 1110 (2) 1120 (3) 1210 (4) 1220
Q71.Let the system of equations π₯+ 2π¦+ 3π§= 5, 2π₯+ 3π¦+ π§= 9, 4π₯+ 3π¦+ ππ§= π have infinite number of solutions. Then π+ 2π is equal to: (1) 28 (2) 17 (3) 22 (4) 15