Practice Questions
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Q4. The sum of all local minimum values of the function β§ 1 β2x, x < β1 f(x) = 3 (7 + 2|x|), β1 β€x β€2 β¨ 1 11 β© 18 (x β4)(x β5), x > 2 is (1) 157 (2) 131 72 72 (3) 171 (4) 167 72 72
Q4. The area of the region enclosed by the curves y = ex, y = |ex β1| and y-axis is: (1) 1 βloge 2 (2) loge 2 (3) 1 + loge 2 (4) 2 loge 2 β1 y2
Q5. For some n β 10, let the coefficients of the 5 th, 6 th and 7 th terms in the binomial expansion of (1 + x)n+4 be in A.P. Then the largest coefficient in the expansion of (1 + x)n+4 is: (1) 20 (2) 10 (3) 35 (4) 70
Q5. Let nCrβ1 = 28, nCr = 56 and nCr+1 = 70. Let A(4 cos t, 4 sin t), B(2 sin t, β2 cos t) and C (3r βn, r2 βn β1) be the vertices of a triangle ABC , where t is a parameter. If (3x β1)2 + (3y)2 = Ξ±, is the locus of the centroid of triangle ABC , then Ξ± equals (1) 6 (2) 18 (3) 8 (4) 20
Q5. Marks obtains by all the students of class 12 are presented in a freqency distribution with classes of equal width. Let the median of this grouped data be 14 with median class interval 12-18 and median class frequency 12 . If the number of students whose marks are less than 12 is 18 , then the total number of students is (1) 52 (2) 48 (3) 44 (4) 40
Q5. Let [x] denote the greatest integer less than or equal to x. Then the domain of f(x) = secβ1(2[x] + 1) is : (1) (ββ, β1] βͺ[0, β) (2) (ββ, β1] βͺ[1, β) (3) (ββ, β) (4) (ββ, β) β{0}
Q5. If A and B are two events such that P(A β©B) = 0.1, and P(A β£B) and P(B β£A) are the roots of the equation β 12x2 β7x + 1 = 0, then the value of P(AβͺB) is : P(Aβ©B) (1) 4 (2) 7 3 4 (3) 5 (4) 9 3 4
Q5. Two parabolas have the same focus (4, 3) and their directrices are the x-axis and the y-axis, respectively. If these parabolas intersects at the points A and B, then (AB)2 is equal to : (1) 392 (2) 384 (3) 192 (4) 96
Q5. The equation of the chord, of the ellipse x2 = 1, whose mid-point is (3, 1) is : 25 + 16 (1) 48x + 25y = 169 (2) 5x + 16y = 31 (3) 25x + 101y = 176 (4) 4x + 122y = 134
Q5. Let A = [aij] be a matrix of order 3 Γ 3, with aij = (β2)i+j . If the sum of all the elements in the third row of A2 is Ξ± + Ξ²β2, Ξ±, Ξ² βZ, then Ξ± + Ξ² is equal to : (1) 280 (2) 224 (3) 210 (4) 168
Q5. A rod of length eight units moves such that its ends A and B always lie on the lines x βy + 2 = 0 and y + 2 = 0, respectively. If the locus of the point P , that divides the rod AB internally in the ratio 2 : 1 is 9 (x2 + Ξ±y2 + Ξ²xy + Ξ³x + 28y) β76 = 0, then Ξ± βΞ² βΞ³ is equal to : (1) 22 (2) 21 (3) 23 (4) 24
Q6. Let for f(x) = 7 tan8 x + 7 tan6 x β3 tan4 x β3 tan2 x, I1 = β«Ο/40 f(x)dx and I2 = β«Ο/40 xf(x)dx. Then 7I1 + 12I2 is equal to : (1) 2 (2) 1 (3) 2Ο (4) Ο
Q6. Let S be the set of all the words that can be formed by arranging all the letters of the word GARDEN. From the set S, one word is selected at random. The probability that the selected word will NOT have vowels in alphabetical order is : (1) 1 (2) 1 2 4 (3) 2 (4) 1 3 3 1 = aβ3 + b, a, b βZ, then a2 + b2 is equal to : Ο Ο
Q6. If the square of the shortest distance between the lines xβ2 1 = yβ12 = z+3β3 and x+12 = y+34 = z+5β5 is mn , where m, n are coprime numbers, then m + n is equal to : (1) 21 (2) 9 (3) 14 (4) 6 x
Q6. Let the points ( 112 , Ξ±) lie on or inside the triangle with sides x + y = 11, x + 2y = 16 and 2x + 3y = 29. Then the product of the smallest and the largest values of Ξ± is equal to : (1) 44 (2) 22 (3) 33 (4) 55
Q6. Let the equation of the circle, which touches x-axis at the point (a, 0), a > 0 and cuts off an intercept of length b on y-axis be x2 + y2 βΞ±x + Ξ²y + Ξ³ = 0. If the circle lies below x-axis, then the ordered pair (2a, b2) is equal to (1) (Ξ³, Ξ²2 β4Ξ±) (2) (Ξ±, Ξ²2 + 4Ξ³) (3) (Ξ³, Ξ²2 + 4Ξ±) (4) (Ξ±, Ξ²2 β4Ξ³) 2x
Q6. The product of all the rational roots of the equation (x2 β9x + 11)2 β(x β4)(x β5) = 3, is equal to (1) 14 (2) 21 (3) 28 (4) 7
Q6. Let a curve y = f(x) pass through the points (0, 5) and (loge 2, k). If the curve satisfies the differential equation 2(3 + y)e2xdx β(7 + e2x)dy = 0, then k is equal to (1) 4 (2) 32 (3) 8 (4) 16
Q7. Let the line passing through the points (β1, 2, 1) and parallel to the line xβ12 = y+13 = 4z intersect the line yβ3 x+2 3 = 2 = zβ41 at the point P . Then the distance of P from the point Q(4, β5, 1) is (1) 5 (2) 5β5 (3) 5β6 (4) 10
Q7. If all the words with or without meaning made using all the letters of the word "KANPUR" are arranged as in a dictionary, then the word at 440th position in this arrangement, is : (1) PRNAUK (2) PRKANU (3) PRKAUN (4) PRNAKU
Q7. If f(x) = , x βR, then β81k=1 f ( 82k ) is equal to 2x+β2 (1) 1.81β2 (2) 41 (3) 82 (4) 81 2
Q7. Let f : (0, β) βR be a function which is differentiable at all points of its domain and satisfies the condition x2f β²(x) = 2xf(x) + 3, with f(1) = 4. Then 2f(2) is equal to : (1) 39 (2) 19 (3) 29 (4) 23
Q7. The area of the region enclosed by the curves y = x2 β4x + 4 and y2 = 16 β8x is : (1) 8 (2) 4 3 3 (3) 8 (4) 5 x βR. Then the numbers of local maximum and local minimum points of f ,
Q7. Let the parabola y = x2 + px β3, meet the coordinate axes at the points P, Q and R . If the circle C with centre at (β1, β1) passes through the points P, Q and R, then the area of β³PQR is : (1) 7 (2) 4 (3) 6 (4) 5
Q7. Let βa = ^i + 2^j + ^k and b = 2^i + 7^j + 3^k. Let L1 :βr= (β^i + 2^j + ^k) + Ξ»βa, Ξ» βR and β L2 :βr= (^j + ^k) + ΞΌb, ΞΌ βR be two lines. If the line L3 passes through the point of intersection of L1 and L2 , and is parallel to βa + βb, then L3 passes through the point : (1) (5, 17, 4) (2) (2, 8, 5) (3) (8, 26, 12) (4) (β1, β1, 1) β β