Math [Class XI]

Class/Course - Class XI

Subject - Math

Total Number of Question/s - 3865

• 1. Sets - Quiz
  
  1. Let a relation R is defined by R = {(4,5); (1,4); (4,6); (7,6); (3,7)} then R^-1oR is
  a) {(1,1), (4,4), (4,7), (7,4),(7,7), (3,3)}
  b) {(1,1), (4,4), (7,7), (3,3)}
  c) {(1,5), (1,6), (3,6)}
  d) None of these
  

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  2. Let R = {(1,3), (2,2), (3,2)} and S = {(2,1), (3,2), (2,3)} be two relations on set A = {1,2,3}. Then RoS =
  a) {(1,3), (2,2), (3,2), (2,1), (2,3)}
  b) {(3,2), (1,3)}
  c) {(2,3), (3,2), (2,2)}
  d) {(2,3), (3,2)}
  

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• 2. Relations and Functions - Quiz
  
  
• 3. Trigonometric Functions - Quiz
  
  
• 4. Principle of Mathematical Induction - Quiz
  
  
• 5. Complex Numbers and Quadratic Equations - Quiz
  
  1. If |8 + z| + |z - 8| = 16 where z is a complex number, then the point z will lie on
  a) A circle
  b) An ellipse
  c) A straight line
  d) None of these
  

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  2. The argument of the complex number $\frac{13 - 5i}{4 - 9i}$ is
  a) $\frac{\pi}{3}$
  b) $\frac{\pi}{4}$
  c) $\frac{\pi}{5}$
  d) $\frac{\pi}{6}$
  

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• 6. Linear Inequalities - Quiz
  
  
• 7. Permutations and Combinations - Quiz
  
  1. In ⁿp_r = 30240 and ⁿC_r = 252, then the ordered pair (n,r) is equal to
  a) (12,6)
  b) (10,5)
  c) (9,4)
  d) (16,7)
  

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  2. A parallelogram is cut by two sets of m lines parallel to its sides. The number of parallelgrams thus formed is
  a) (^mC₂)²
  b) (^m+1C₂)
  c) (^m+2C₂)²
  d) None of these
  

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• 8. Binomial Theorem - Quiz
  
  1. If the coefficient of x⁷ in $\left (ax^{2} + \frac{1}{bx} \right )^{11}$ is equal to the coefficient of x⁷ in $\left (ax - \frac{1}{bx^{2} } \right )^{11}$, then ab =
  a) 1
  b) 1/2
  c) 2
  d) 3
  

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  2. The sum of coefficients in the expansion of (x + 2y + 3z)⁸ is
  a) 3⁸
  b) 5⁸
  c) 6⁸
  d) None of these
  

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• 9. Sequences and Series - Quiz
  
  
• 10. Straight Lines - Quiz
  
  1. The lines a₁x + b₁y + c₁ = 0 and a₂x + b₂y + c₂ = 0 are perpendicular to each other, if
  a) a₁b₂ - b₁a₂ = 0
  b) a₁a₂ + b₁b₂ = 0
  c) $a_{1}^{2}b_{2} + b_{1}^{2}a_{2}$ = 0
  d) a₁b₁ + a₂b₂ = 0
  

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  2. The medians AD and BE of a triangle with vertices A(0,b) , B(0,0) and C(a,0) are perpendicular to each other if,
  a) a = $\sqrt{2}$b
  b) a = -$\sqrt{2}$b
  c) Both (a) and (b)
  d) None of these
  

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• 11. Conic Sections - Quiz
  
  1. The equation of common tangents to the parabola y² = 8x and hyperbola 3x² - y² = 3, is
  a) 2x ± y + 1 = 0
  b) 2x ± y - 1 = 0
  c) x ± 2y + 1 = 0
  d) x + 2y - 1 = 0
  

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  2. If a ≠ 0 and the line abx + 3cy + 4d = 0 passes through the points of intersection of the parabola y² = 4ax and x² = 4ay, then
  a) d² + (3b - 2c)² = 0
  b) d² + (3b - 2c)² = 0
  c) d² + (2b - 3c)² = 0
  d) d² + (2b + 3c)² = 0
  

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• 12. Introduction to Three Dimensional Geometry - Quiz
  
  
• 13. Limits and Derivatives - Quiz
  
  
• 14. Mathematical Reasoning - Quiz
  
  1. The statement p → (q → p) is equivalent to
  a) p → (p ∨ q)
  b) p → (p ^ q)
  c) p → (p ↔ q)
  d) p → (p → q)
  

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  2. Negation of the proposition : If we control population growth, we prosper
  a) If we do not control population growth , we propsper
  b) Itf we control population growth, we do not prosper
  c) We control population but we do not prosper
  d) We do not control population, but we prosper
  

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• 15. Statistics - Quiz
  
  1. Two trains A and B, 100 kms apart, are travelling to each other with starting speed of 50km/hr for both . The train A is accelerating at 18km/hr² and B is decelerating at 18 km/hr². The distance where the engines cross each other from the initial position of A is
  a) 50 kms
  b) 68 kms
  c) 32 kms
  d) 59 kms
  

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  2. What will be that force when applying along any inclination plane will stop 10kilogram weight , it is given that force reaction of plane and weight of body are in arithmetic series
  a) 4kg-wt
  b) 6kg-wt
  c) 8kg-wt
  d) 7kg-wt
  

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• 16. Probability - Quiz
  
  
• 17. Quadratic Equation and Inequation - Quiz
  
  1. If k ε (-∞, -2) ∪ (2,∞), then the roots of the equation x² + 2kx + 4 = 0 are
  a) Complex
  b) Real and Unequal
  c) Real and equal
  d) One real and one imaginary
  

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  2. If one root of the equation ax² + bx + c = 0 the square of the other, then a(c - b)³ = cX, where X is
  a) a³ + b³
  b) (a - b)³
  c) a³ - b³
  d) None of these
  

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• 18. Progression - Quiz
  
  1. If a, ,b,c, d are in H.P., then ab + bc + cd is equal to
  a) 3ad
  b) (a + b)(c + d)
  c) 3ac
  d) None of these
  

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  2. If three real numbers a, ,b, c are in harmonic progression, then which of the following is true
  a) $\frac{1}{a}, b, \frac{1}{c}$ are in A.P.
  b) $\frac{1}{bc}, \frac{1}{ca}, \frac{1}{ab}$ are in H.P.
  c) ab,bc, ca are in H.P.
  d) $\frac{a}{b}, \frac{b}{c}, \frac{c}{a}$ are in H.P.
  

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• 19. Exponential and Logarithmic Series - Quiz
  
  1. If S = $\frac{1}{1.2} - \frac{1}{2.3} + \frac{1}{3.4} - \frac{1}{4.5} + .... + \infty$, then e^S =
  a) $log_{e}\left (\frac{4}{e} \right )$
  b) $\frac{4}{e}$
  c) $log_{e}\left (\frac{e}{4} \right )$
  d) $\frac{e}{4}$
  

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  2. $\frac{1}{3!} + \frac{2}{5!} + \frac{3}{7!} + ....$ =
  a) e^-1/2
  b) e
  c) e/4
  d) e/6
  

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• 20. Trigonometric Ratio, Function and Identities - Quiz
  
  1. Let f_k(x) = $\frac{1}{k}\left (sin^{k}x + cos^{k}x \right )$ where x ε R and k ≥ 1. Then f₄(x) - f₀(x) equals
  a) $\frac{1}{4}$
  b) $\frac{1}{12}$
  c) $\frac{1}{6}$
  d) $\frac{1}{3}$
  

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  2. If α, β are solution of 6cosθ + 8 sinθ = 9, then sin(α + β) =
  a) $\frac{3}{5}$
  b) $\frac{4}{5}$
  c) $\frac{24}{25}$
  d) $\frac{12}{13}$
  

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• 21. Trigonometric Equation and Inequation - Quiz
  
  1. Two straight roads intersect at an angle of 60⁰, A bus on one road is 2km away from the intersection and a car on the other road is 3km away from the intersection. Then the direct distance between the two vehivles is
  a) 1 km
  b) $\sqrt{2}$ km
  c) 4 km
  d) $\sqrt{7}$ km
  

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  2. If the sides of the triangle are 5K, 6K, 5K and radius of incircle is 6 then value of K is equal to
  a) 4
  b) 5
  c) 6
  d) 7
  

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• 22. Hyperbolic Function - Quiz
  
  1. The imaginary part of tan^-1(cosθ + isinθ) is
  a) tanh^-1(sinθ)
  b) tanh^-1(∞)
  c) 1/2tanh^-1(sinθ)
  d) None of these
  

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  2. sinh^-1x =
  a) $log\left (x + \sqrt{1 - x^{2}} \right )$
  b) $log\left (x + \sqrt{ x^{2} + 1} \right )$
  c) $log\left (x + \sqrt{ x^{2} - 1} \right )$
  d) None of these
  

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• 23. Rectangular Cartesian Coordinate - Quiz
  
  1. If the three points (0,1), (0,-1) and (x,0) are vertices of an equilateral triangle, then the values of x are
  a) $\sqrt{3},\sqrt{2}$
  b) $\sqrt{3}, -\sqrt{3}$
  c) $-\sqrt{5}, \sqrt{3}$
  d) $\sqrt{2}, -\sqrt{2}$
  e) $\sqrt{5}, -\sqrt{5}$
  

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  2. If the vertices of a triangle are A(1,4), B(3,0) and C(2,1) , then the length of the median passing through C is
  a) 1
  b) 2
  c) $\sqrt{2}$
  d) $\sqrt{3}$
  

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• 24. Circle and System of Circle - Quiz
  
  1. The locus of a point which divides the join of A(-1,1) and variable point P on the circle x² + y² = 4 in the ratio 3:2 is
  a) 25(x² + y²) + 20(x - y) + 28 = 0
  b) 25(x² + y²) + 20(x - y) - 28 = 0
  c) 20(x² + y²) + 25(x - y) + 28 = 0
  d) None of these
  

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  2. The locus of centre of the circle which cuts the circles x² + y² + 2g₁x + 2f₁y + c₁ = 0 x² + y² + 2g₂x + 2f₂y + c₂ = 0 orthogonally is
  a) An ellipse
  b) The radical axis of the given circles
  c) A conic
  d) Another circle
  

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• 25. Pair of Straight Line - Quiz
  
  1. The area (in square units) of the quadrilateral formed by the two pairs of lines l²x² - m²y² - n(lx + my) = 0 and l²x2 - m²y² + n(lx - my) = 0 is
  a) $\frac{n^{2}}{2\left | lm \right |}$
  b) $\frac{n^{2}}{\left | m \right |}$
  c) $\frac{n}{2\left | m \right |}$
  d) $\frac{n^{2}}{4\left | m \right |}$
  

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  2. The pair of lines represented by 3ax² + 5xy + (a² - 2)y² = 0 are perpendicular to each other for
  a) Two values of a
  b) ∀a
  c) For one value of a
  d) For no value of a
  

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