Practice Questions
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Q63.The number of seven digits odd numbers, that can be formed using all the seven digits 1, 2, 2, 2, 3, 3, 5 is
Q63.Number of integral solutions to the equation x + y + z = 21 , where x β₯1, y β₯3, z β₯4 , is equal to _____ .
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
Q64.Let S = {1, 2, 3, 5, 7, 10, 11}. The number of non-empty subsets of S that have the sum of all elements a multiple of 3, is _____ .
Q64.Let the digits a, b, c be in A.P. Nine-digit numbers are to be formed using each of these three digits thrice such that three consecutive digits are in A.P. at least once. How many such numbers can be formed? = p1 p2 p3 . . . pm , where
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 4 -digit numbers whose greatest common divisor with 54 is 2 , is
Q64.The sum 12 β2. 32 + 3. 52 β4. 72 + 5. 92 ββ¦ . . +15. 292 is _____ . , is
Q64.The total number of six digit numbers, formed using the digits 4, 5, 9 only and divisible by 6, 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.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.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.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.The largest natural number n such that 3n divides 66! is _______
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
Q65.Let a1 = b1 = 1 and an = anβ1 + (n β1), bn = bnβ1 + anβ1, βn β₯2. If S = β10n=1( 2nbn ) and T = β8n=1 2nβ1n then 27(2S βT) 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
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.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 the constant term in the binomial expansion of ( ) Ξ² < 0 is an odd number, then |Ξ±l βΞ²| is equal to _____ .
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 (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
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