Practice Questions
10,171 questions across 23 years of JEE Main β find and practise any topic!
Found 10,171 results
Q86.Let f(x) and g(x) be two real polynomials of degree 2 and 1 respectively. If f(g(x)) = 8x2 β2x, and g(f(x)) = 4x2 + 6x + 1, then the value of f(2) + g(2) is ______.
Q86.If f(ΞΈ) = sin ΞΈ + β« βΟ2 2 (sin ΞΈ + t cos ΞΈ) β f(t)dt, then β« 0 2 f(ΞΈ)dΞΈ is 9βx2
Q86.Let A = {n β N : H. C. F. (n, 45) = 1} and let B = {2k : k β{1, 2, β¦ , 100}} . Then the sum of all the elements of A β©B is _____.
Q86.Let π΄= 1, 2, 3, 4, 5, 6, 7 and π΅= 3, 6, 7, 9. Then the number of elements in the set πΆβπ΄: πΆβ©π΅β π is ______
Q86.Let the hyperbola H : x2 βy2 = 1 and the ellipse E : 3x2 + 4y2 = 12 be such that the length of latus rectum a2 of H is equal to the length of latus rectum of E . If eH and eE are the eccentricities of H and E respectively, then the value of 12(e2H + e2E) is equal to _____.
Q86.The mean and standard deviation of 15 observations are found to be 8 and 3 respectively. On rechecking it was found that, in the observations, 20 was misread as 5 . Then, the correct variance is equal to _____.
Q86.For the curve C : (x2 + y2 β3) + (x2 βy2 β1) 5 = 0 , the value of 3yβ² βy3yβ²β² , at the point (Ξ±, Ξ±), Ξ± > 0 , on C , is equal to ________.
Q86.Let S = {1, 2, 3, 4, 5, 6, 7, 8, 9, 10}. Define f : S βS as f(n) = { 2n2n,β11 ifif nn == 1,6, 2,7, 3,8, 4,9, 510 + 1 , if n is odd Let g : S β₯S be a function such that fog(n) = , then {nn β1 , if n is even g(10)(g(1) + g(2) + g(3) + g(4) + g(5)) is equal to
Q86.The number of distinct real roots of the equation x5(x3 βx2 βx + 1) + x(3x3 β4x2 β2x + 4) β1 = 0 is
Q86.Let the abscissae of the two points π and π be the roots of 2π₯2 - ππ₯+ π= 0 and the ordinates of π and π be the roots of π₯2 - π π₯- π= 0. If the equation of the circle described on ππ as diameter is 2π₯2 + π¦2 - 11π₯- 14π¦- 22 = 0, then 2π+ π - 2π+ π is equal to ______.
Q86.Let the equation of two diameters of a circle π₯2 + π¦2 - 2π₯+ 2ππ¦+ 1 = 0 be 2ππ₯- π¦= 1 and 2π₯+ ππ¦= 4π. Then the slope πβ0, β of the tangent to the hyperbola 3π₯2 - π¦2 = 3 passing through the centre of the circle is equal to _____. Q87. 2 -1 -1 β3i - 1 Let π΄= 1 0 -1 and π΅= π΄- πΌ. If π= , then the number of elements in the set 2 1 -1 0 πβ1, 2, β¦ , 100: π΄π+ ππ΅π= π΄+ π΅ is equal to _____ .
Q87.Let c, k βR. If f(x) = (c + 1)x2 + (1 βc2)x + 2k and f(x + y) = f(x) + f(y) βxy, for all x, y βR, then the value of |2(f(1) + f(2) + f(3) + β¦ β¦ + f(20))| is equal to ______. β2y Ο dy + = xetanβ1(β2 cot 2x), 0 < x <
Q87.Let π΄= 1 -1 and π΅= π½1 , πΌ, π½βπ . Let πΌ1 be the value of πΌ which satisfies π΄+ π΅2 = π΄2 + 2 2 and 2 πΌ 1 0 2 2 πΌ2 be the value of πΌ which satisfies π΄+ π΅2 = π΅2. Then πΌ1 - πΌ2 is equal to
Q87.Let the mean and the variance of 20 observations x1, x2, β¦ x20 be 15 and 9, respectively. For Ξ± βR, if the mean of (x1 + Ξ±)2, (x2 + Ξ±)2, β¦ , (x20 + Ξ±)2 is 178, then the square of the maximum value of Ξ± is equal to JEE Main 2022 (29 Jul Shift 1) JEE Main Previous Year Paper ______.
Q87.Let f : R βR be a function defined f(x) = e2x+e2e2x . Then f( 1001 ) + f( 1002 ) + f( 1003 ) + β¦ + f( 10099 ) is equal to ______.
Q87.Let f(x) = max{|x + 1|, |x + 2|, β¦ , |x + 5|} . Then β«0β6 f(x)dx is equal to ______.
Q87.Let A = (1βi+ i 10 ) {n β{1, 2, β¦ . , 100} : An = A} is
Q87.The number of matrices π΄= π π where π, π, π, d β-1, 0, 1, 2, 3, β¦ β¦ , 10, such that π΄= π΄-1, is ______. π π,
Q87.Let the area enclosed by the x-axis, and the tangent and normal drawn to the curve 4x3 β3xy2 + 6x2 β5xy β8y2 + 9x + 14 = 0 at the point (β2, 3) be A . Then 8A is equal to _______.
Q87.Let R1 and R2 be relations on the set {1, 2, β¦ , 50} such that R1 ={ (p, pn) : p is a prime and n β₯0 is an integer} and R2 ={ (p, pn) : p is a prime and n = 0 or 1 }. Then, the number of elements in R1 βR2 is ____.
Q87.If y(x) = (xx)x, x > 0 then d2x + 20 at x = 1 is equal to dy2 2 2 + y 3 β€1, x + y β₯0, y y) : x 3 is A , then 256AΟ is β₯0}
Q87.A water tank has the shape of a right circular cone with axis vertical and vertex downwards. Its semivertical angle is tanβ1 34 . Water is poured in it at a constant rate of 6 cubic meter per hour. The rate (in square meter per hour), at which the wet curved surface area of the tank is increasing, when the depth of water in the tank is 4 meters, is _______.
Q88.If n(2n + 1) β«10 (1 βxn)2ndx = 1177 β«10 (1 βxn)2n+1dx, then JEE Main 2022 (26 Jul Shift 1) JEE Main Previous Year Paper
Q88.The value of π> 3 for which 12 π 1 49 is equal to _____. β«3 π₯2 - 1π₯2 - 4ππ₯= logπ 40,
Q88.If the area of the region {(x,