Practice Questions
2,276 questions across 23 years of JEE Main β find and practise any topic!
Found 2,276 results
Q63.If all the six digit numbers x1x2x3x4x5x6 with 0 < x1 < x2 < x3 < x4 < x5 < x6 are arranged in the increasing order, then the sum of the digits in the 72th number is _______.
Q63.All words, with or without meaning, are made using all the letters of the word ππππ·π΄π. These words are written as in a dictionary with serial numbers. The serial number of the word ππππ·π΄π is JEE Main 2023 (13 Apr Shift 2) JEE Main Previous Year Paper (1) 327 (2) 328 (3) 324 (4) 326
Q63.Let x and y be distinct integers where 1 β€x β€25 and 1 β€y β€25. Then, the number of ways of choosing x and y, such that x + y is divisible by 5 , is _____ .
Q64.The sum to 20 terms of the series 2 β 22 β32 + 2 β 42 β52 + 2 β 62β. . . . . . . . . . . . is equal to __________.
Q64.Five digit numbers are formed using the digits 1, 2, 3, 5, 7 with repetitions and are written in descending order with serial numbers. For example, the number 77777 has serial number 1 . Then the serial number of 35337 is
Q64.The total number of six digit numbers, formed using the digits 4, 5, 9 only and divisible by 6, is _____ .
Q64.The number of 4 -letter words, with or without meaning, each consisting of 2 vowels and 2 consonants, which can be formed from the letters of the word UNIVERSE without repetition is _____.
Q65.The coefficient of xβ6 , in the expansion of ( 4x5 + 2x25 ) 9 5 9 x 2 4 is β84 and the coefficient of xβ3l is 2Ξ±Ξ² where 2 β xl
Q65.The 8th common term of the series S1 = 3 + 7 + 11 + 15 + 19 + β¦ S2 = 1 + 6 + 11 + 16 + 21 + β¦ . is + y = + [t] denotes the greatest integer β€t, then
Q65.Let 0 < z < y < x be three real numbers such that x1 , 1y , 1z are in an arithmetic progression and x, β2y, z are in a geometric progression. If xy + yz + zx = 3 xyz, then 3(x + y + z)2 is equal to β2
Q65.Let A1, A2, A3 be the three A.P. with the same common difference d and having their first terms as A, A + 1, A + 2, respectively. Let a, b, c be the 7th , 9th , 17th terms of A1, A2, A3 , respectively such that a 7 1 2b 17 1 + 70 = 0 . If a = 29, then the sum of first 20 terms of an AP whose first term is c βa βb and c 17 1 common difference is d , is equal to _____ . 12 JEE Main 2023 (25 Jan Shift 1) JEE Main Previous Year Paper ar ) is equal to
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.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.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.If the constant term in the binomial expansion of ( ) Ξ² < 0 is an odd number, then |Ξ±l βΞ²| is equal to _____ .
Q66.Let Ξ± be the constant term in the binomial expansion of (βx β x 32 ) , n β€15. If the sum of the coefficients of the remaining terms in the expansion is 649 and the coefficient of xβn is λα, then Ξ» is equal to ________.
Q66.For the two positive numbers a, b, if a, b and 181 are in a geometric progression, while a1 , 10 and 1b are in an arithmetic progression, then, 16a + 12b is equal to _____ . Q67. β6k=0 51βkC3 is equal to (1) 51C4 β45C4 (2) 51C3 β45C3 (3) 52C4 β45C4 (4) 52C3 β45C3
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.The constant term in the expansion of 5 + x71 + 3x2) is _____ . (2x
Q68.Let [t] denote the greatest integer β€t. if the constant term in the expansion of (3x2 β 2x51 ) 7 equal to _____ JEE Main 2023 (08 Apr Shift 1) JEE Main Previous Year Paper
Q69.If the x-intercept of a focal chord of the parabola y2 = 8x + 4y + 4 is 3 , then the length of this chord is equal to _____ .
Q69.The value of tan 9 o βtan 27 o βtan 63 o + tan 81 o is _____.
Q69.Let S be the set of all a βN such that the area of the triangle formed by the tangent at the point P(b, c), b, c βN , on the parabola y2 = 2ax and the lines x = b, y = 0 is 16 unit2 , then βaβS a is equal to _____ .
Q70.Consider a circle C1 : x 2 + y2 β 4x β 2y = Ξ± β 5. Let its mirror image in the line y = 2x + 1 be another circle C2 : 5x2 + 5y2 β10fx β 10gy + 36 = 0. Let r be the radius of C2 . Then Ξ± + r is equal to ________
Q70.Two circles in the first quadrant of radii r1 and r2 touch the coordinate axes. Each of them cuts off an intercept of 2 units with the line x + y = 2 . Then r12 + r22 βr1r2 is equal to ____. , Q, R and S be four points on the ellipse 9x2 + 4y2 = 36. Let PQ and RS be mutually 6 ),