Practice Questions
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Q60.Which of the following will not show mutarotation? (1) Maltose (2) Lactose (3) Glucose (4) Sucrose
Q61.If a β R and the equation β3(x β [x])2 + 2(x β [x]) + a2 = 0 (where [x] denotes the greatest integer β€ x) has no integral solution, then all possible values of a lie in the interval (1) (β2, β1) (2) ( ββ, β2) βͺ(2,β) (3) (β1, 0) βͺ(0, 1) (4) (1, 2)
Q61.If 1 , 1 are the roots of the equation ax2 + bx + 1 = 0, (a β 0, a, b βR), then the equation βΞ± βΞ² x(x + b3) + (a3 β3abx) = 0 has roots: 2 and Ξ²β32 (1) βΞ±Ξ² and Ξ±Ξ² (2) Ξ±β3 (3) Ξ±Ξ² 21 and Ξ± 21 Ξ² (4) Ξ± 23 and Ξ² 23
Q61.The sum of the roots of the equation, x2 + |2x β3| β4 = 0, is: (1) 2 (2) β2 (3) β2 (4) ββ2
Q61.The equation β3x2 + x + 5 = x β3, where x is real, has (1) no solution (2) exactly four solutions (3) exactly one solution (4) exactly two solutions JEE Main 2014 (19 Apr Online) JEE Main Previous Year Paper
Q61.If Ξ± and Ξ² are roots of the equation, x2 β4β2kx + 2e4 ln k β1 = 0 for some k, and Ξ±2 + Ξ²2 = 66, then Ξ±3 + Ξ²3 is equal to: (1) 248β2 (2) 280β2 (3) β32β2 (4) β280β2 + arg
Q62.If z1, z2 and z3, z4 are 2 pairs of complex conjugate numbers, then arg ( z1z4 ) ( z2z3 ) equals: (1) 0 (2) Ο 2 (3) 3Ο (4) Ο 2 JEE Main 2014 (11 Apr Online) JEE Main Previous Year Paper
Q62.Let z β βi be any complex number such that z+izβi is a purely imaginary number. Then z + 1z is: (1) 0 (2) any non-zero real number other than 1 . (3) any non-zero real number. (4) a purely imaginary number. Q63.8-digit numbers are formed using the digits 1, 1, 2, 2, 2, 3, 4, 4. The number of such numbers in which the odd digits do no occupy odd places, is: (1) 160 (2) 120 (3) 60 (4) 48
Q62.If equations ax2 + bx + c = 0, (a, b, c βR, a β 0) and 2x2 + 3x + 4 = 0 have a common root, then a : b : c equals : (1) 2 : 3 : 4 (2) 4 : 3 : 2 (3) 1 : 2 : 3 (4) 3 : 2 : 1
Q62.Let Ξ± and Ξ² be the roots of equation px2 + qx + r = 0, p β 0. If p, q, r are in A.P. and Ξ±1 + Ξ²1 = 4, then the value of |Ξ± βΞ²| is (1) β34 (2) 2β13 9 9 (3) β61 (4) 2β17 9 9
Q63.An eight digit number divisible by 9 is to be formed using digits from 0 to 9 without repeating the digits. The number of ways in which this can be done is: (1) 72(7!) (2) 18(7!) (3) 40(7!) (4) 36(7!)
Q63.Two women and some men participated in a chess tournament in which every participant played two games with each of the other participants. If the number of games that the men played between them-selves exceeds the number of games that the men played with the women by 66 , then the number of men who participated in the tournament lies in the interval (1) (11, 13] (2) (14, 17) (3) [10, 12) (4) [8, 9]
Q63.If z is a complex number such that |z| β₯2, then the minimum value of z + 12 : (1) Is strictly greater than 5 (2) Is strictly greater than 3 but less than 5 2 2 2 (3) Is equal to 5 (4) Lies in the interval (1, 2) 2
Q64.Let G be the geometric mean of two positive numbers a and b, and M be the arithmetic mean of 1a and 1b . If 1 : G is 4 : 5, then a : b can be: M JEE Main 2014 (12 Apr Online) JEE Main Previous Year Paper (1) 1 : 4 (2) 1 : 2 (3) 2 : 3 (4) 3 : 4
Q64.The sum of the digits in the unit's place of all the 4 - digit numbers formed by using the numbers 3, 4, 5 and 6 , without repetition is : (1) 18 (2) 36 (3) 108 (4) 432
Q64.In a geometric progression, if the ratio of the sum of first 5 terms to the sum of their reciprocals is 49 , and the sum of the first and the third term is 35. Then the first term of this geometric progression is: (1) 7 (2) 21 (3) 28 (4) 42
Q65.Given an A.P. whose terms are all positive integers. The sum of its first nine terms is greater than 200 and less than 220. If the second term in it is 12 , then its 4th term is : (1) 8 (2) 24 (3) 20 (4) 16
Q65.The sum of the first 20 terms common between the series 3 + 7 + 11 + 15+ and 1 + 6 + 11+ 16 + β¦ .. is (1) 4000 (2) 4020 (3) 4200 (4) 4220
Q65.The number of terms in an A. P. is even, the sum of the odd terms in it is 24 and that the even terms is 30. If the last term exceeds the first term by 10 12 , then the number of terms in the A. P. is (1) 4 (2) 8 (3) 16 (4) 12
Q65.The least positive integer n such that 1 β23 β 322 ββ¦ . β 3nβ12 < 1001 , is: (1) 4 (2) 5 (3) 6 (4) 7
Q65.Three positive numbers form an increasing G. P. If the middle term in this G. P. is doubled, the new numbers are in A. P. Then the common ratio of the G. P. is : (1) 2 ββ3 (2) 2 + β3 (3) β2 + β3 (4) 3 + β2
Q66.The coefficient of x50 in the binomial expansion of (1 + x)1000 + x(1 + x)999 + x2(1 + x)998 + β¦ +x1000 is: (1) (1000)! (2) (1000)! (50)(!95Ο! (49)(!95)! (3) (1001)! (4) (1001)! (51)(!95Ο! (50)(!95)!
Q66.The coefficient of x1012 in the expansion of (1 + xn + x253) 10, (where nβ€22 is any positive integer), is (1) 253C4 (2) 10C4 (3) 4n (4) 1
Q67.The number of terms in the expansion of (1 + x)101(1 βx + x2) 100 in powers of x is (1) 301 (2) 302 (3) 101 (4) 202
Q67.If (2 + x3 ) 55 terms of the expansion are equal, then these terms are: (1) 7th and 8th (2) 8th and 9th (3) 28th and 29th (4) 27th and 28th