Practice Questions
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Q66.Let π= π₯β- π (π½- 14 ) 2 is equal to 2, 2: 91 - tan2π₯+ 9tan2π₯= 10 and π½= βπ₯βπtan2 3,π₯ 6 (1) 16 (2) 8 (3) 64 (4) 32
Q66.Let he sum of the coefficient of first three terms in the expansion of (x β x23 ) n; x = 0, n βN be 376 . Then, the coefficient of x4 is equal to: Ο +
Q66.The compound statement ( ~ ( πβ§π) ) β¨( ( ~π) β§π) β( ( ~π) β§( ~π) ) is equivalent to (1) ( ( ~π) β¨π) β§( ( ~π) β¨π) (2) ( ~π) β¨π (3) ( ( ~π) β¨π) β§( ~π) (4) ( ~π) β¨π
Q66.Let {ak} and {bk}, k βN , be two G.P.s with common ratio r1 and r2 respectively such that a1 = b1 = 4 and r1 < r2 . Let ck = ak + bk, k βN . If c2 = 5 and c3 = 134 then ββk=1 ck β(12a6 + 8 b4) is equal to
Q66.For k βN, if the sum of the series 1 + k4 + k28 + 13k3 + 19k4 +. . . . . . is 10, then the value of k is is 1024 times 1011th term from
Q66.Let the ellipse πΈ: π₯2 + 9π¦2 = 9 intersect the positive π₯- and π¦-axes at the points π΄ and π΅ respectively. Let the major axis of πΈ be a diameter of the circle πΆ. Let the line passing through π΄ and π΅ meet the circle πΆ at the π point π. If the area of the triangle with vertices π΄, π and the origin π is π, where π and π are coprime, then π- π is equal to (1) 16 (2) 15 (3) 17 (4) 18
Q66.If the orthocentre of the triangle, whose vertices are 1, 2, 2, 3 and 3, 1 is πΌ, π½, then the quadratic equation whose roots are πΌ+ 4π½ and 4πΌ+ π½, is (1) π₯2 - 19π₯+ 90 = 0 (2) π₯2 - 18π₯+ 80 = 0 (3) π₯2 - 22π₯+ 120 = 0 (4) π₯2 - 20π₯+ 99 = 0
Q66.The sum of the common terms of the following three arithmetic progressions. 3, 7, 11, 15, β¦ β¦ β¦ β¦ , 399 2, 5, 8, 11, . . . . . . . . . 359 and 2, 7, 12, 17, β¦ β¦ , 197 , is equal to _____ .
Q66.Let x = 13 9 13) and (7β2 9) . If (8β3 (1) [x] + [y] is even (2) [x] is odd but [y] is even (3) [x] is even but [y] is odd (4) [x] and [y] are both odd Q67. 50th root of a number x is 12 and 50th root of another number y is 18 . Then the remainder obtained on dividing (x + y) by 25 is ________. O be the origin
Q66.If (20)19 + 2(21)(20)18 + 3(21)2(20)17+. . . +20(21)19 = k(20)19 , then k is equal to _____. 11 are equal, then β
Q66.If n+1 1 nCn + n1 nCnβ1+. . . + 21 nC1 +n C0 = 102310 then n is equal to (1) 9 (2) 8 (3) 7 (4) 6
Q66.The absolute difference of the coefficients of x10 and x7 in the expansion of (2x2 + 2x1 ) 11 is equal to (1) 133 β13 (2) 113 β11 (3) 103 β10 (4) 123 β12 Q67. 25190 β19190 β8190 + 2190 is divisible by (1) neither 14 nor 34 (2) 14 but not by 34 (3) 34 but not by 14 (4) both 14 and 34
Q67.The number of common tangents, to the circles x2 + y2 β18x β15y + 131 = 0 and x2 + y2 β6x β6y β7 = 0 , is (1) 3 (2) 1 (3) 4 (4) 2
Q67.Let π be a relation on πΓ π defined by π, ππ π, π if and only if πππ- π= πππ- π. Then π is (1) symmetric but neither reflexive nor transitive (2) transitive but neither reflexive nor symmetric (3) reflexive and symmetric but not transitive (4) symmetric and transitive but not reflexive Q68. 1 0 0 Let π΄= 0 4 -1 . Then the sum of the diagonal elements of the matrix π΄+ πΌ11 is equal to: 0 12 -3 (1) 6144 (2) 4094 (3) 4097 (4) 2050
Q67.If the 1011th term from the end in the binomial expansion of ( 4x5 β 2x5 ) 2022 the beginning, then 32|x| is equal to (1) 15 (2) 10 (3) 12 (4) 8
Q67.If the term without x in the expansion of 23 + 22 (x x3Ξ± ) is 7315 , then |Ξ±| is equal to _____ . m 21 . + 5β2(xβ2) log2 3) powers of 2(xβ2) log2 3 , be
Q67.Let R be a rectangle given by the lines π₯= 0, π₯= 2, π¦= 0 and π¦= 5. Let AπΌ, 0 and B0, π½, πΌβ0, 2 and π½β0, 5, be such that the line segment π΄π΅ divides the area of the rectangle π in the ratio 4: 1. Then, the mid- point of π΄π΅ lies on a (1) straight line (2) parabola (3) hyperbola (4) circle
Q67.The number of 3 digit numbers, that are divisible by either 3 or 4 but not divisible by 48 , is (1) 472 (2) 432 (3) 507 (4) 400 JEE Main 2023 (29 Jan Shift 2) JEE Main Previous Year Paper
Q67.The sum, of the coefficients of the first 50 terms in the binomial expansion of (1 βx)100, is equal to (1) 101C50 (2) 99C49 (3) β101C50 (4) β99C49
Q67.The relation π = π, π: ππππ, π= 1, 2πβ π, π, πββ€ is: (1) transitive but not reflexive (2) symmetric but not transitive (3) reflexive but not symmetric (4) neither symmetric nor transitive
Q67.The constant term in the expansion of 5 + x71 + 3x2) is _____ . (2x
Q67.If the co-efficient of x9 in 11 11 β Ξ²x3 1 ) are equal, then (Ξ±Ξ²)2 is + Ξ²x1 ) and the co-efficient of xβ9 in (Ξ±x (Ξ±x3 equal to : f
Q67.if the coefficients of three consecutive terms in the expansion of (1 + x)n are the ratio 1 : 5 : 20 then the coefficient of the fourth term is (1) 2436 (2) 5481 (3) 1827 (4) 3654 is Ξ± then [Ξ±] is
Q67.If the coefficients of x7 in (ax2 + 2bx1 ) 11 3bx2 and xβ7 in (ax 1 ) (1) 729ab = 32 (2) 32ab = 729 (3) 64ab = 243 (4) 243ab = 64
Q67.Let π΄ be the point 1, 2 and π΅ be any point on the curve π₯2 + π¦2 = 16. If the centre of the locus of the point π, which divides the line segment π΄ π΅ in the ratio 3: 2 is the point πΆπΌ, π½, then the length of the line segment π΄πΆ is (1) 3β5 (2) 4β5 5 5 (3) 2β5 (4) 6β5 5 5