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1001 |
The locus of the mid-point of the line segment joining the focus to a moving point on the parabola y2 = 4ax is another parabola with directrix a) x = −a b)  c)  d) 
The locus of the mid-point of the line segment joining the focus to a moving point on the parabola y2 = 4ax is another parabola with directrix a) x = −a b) c) d)
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IIT 2002 |
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1002 |
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IIT 2006 |
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1003 |
Complex numbers  are the vertices A, B, C respectively of an isosceles right angled triangle with right angle at B. Show that 
Complex numbers are the vertices A, B, C respectively of an isosceles right angled triangle with right angle at B. Show that
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IIT 1986 |
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1004 |
Find all maximum and minimum of the curve y = x(x – 1)2, 0 ≤ x ≤ 2. Also find the area bounded by the curve y = x(x – 2)2, the Y–axis and the line y = 2. a) Local minimum at x = 1, Local maximum at x =  , Area =  b) Local minimum at x = , Local maximum at x =1, Area = c) Local minimum at x = 2, Local maximum at x =  , Area =  d) Local minimum at x = , Local maximum at x =2, Area =
Find all maximum and minimum of the curve y = x(x – 1)2, 0 ≤ x ≤ 2. Also find the area bounded by the curve y = x(x – 2)2, the Y–axis and the line y = 2. a) Local minimum at x = 1, Local maximum at x = , Area = b) Local minimum at x = , Local maximum at x =1, Area = c) Local minimum at x = 2, Local maximum at x = , Area = d) Local minimum at x = , Local maximum at x =2, Area =
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IIT 1989 |
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1005 |
A line is perpendicular to  and passes through (0, 1, 0). Then the perpendicular distance of this line from the origin is . . .
A line is perpendicular to and passes through (0, 1, 0). Then the perpendicular distance of this line from the origin is . . .
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IIT 2006 |
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1006 |
Prove that for complex numbers z and ω,  iff z = ω or  .
Prove that for complex numbers z and ω, iff z = ω or .
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IIT 1999 |
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1007 |
The curve y = ax3 + bx2 + cx + 5 touches the X – axis at (− 2, 0) and cuts the Y–axis at a point Q where the gradient is 3. Find a, b, c. a)  b)  c)  d) 
The curve y = ax3 + bx2 + cx + 5 touches the X – axis at (− 2, 0) and cuts the Y–axis at a point Q where the gradient is 3. Find a, b, c. a) b) c) d)
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IIT 1994 |
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1008 |
Points A, B, C lie on the parabola  . The tangents to the parabola at A, B, C taken in pair intersect at the points P, Q, R. Determine the ratios of the areas of ΔABC and ΔPQR.
Points A, B, C lie on the parabola . The tangents to the parabola at A, B, C taken in pair intersect at the points P, Q, R. Determine the ratios of the areas of ΔABC and ΔPQR.
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IIT 1996 |
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1009 |
Consider the lines given by L1 : x + 3y – 5 = 0; L2 = 3x – ky – 1 = 0; L3 = 5x + 2y −12 = 0. Match the statement/expressions in column 1 with column 2. | Column 1 | Column 2 | | A. L1, L2, L3 are concurrent, if | p. k = −9 | | B. One of L1, L2, L3 is parallel to at least one of the other two, if | q.  | | C. L1, L2, L3 form a triangle, if | r.  | | D.L1, L2, L3 do not form a triangle, if | s. k = 5 |
Consider the lines given by L1 : x + 3y – 5 = 0; L2 = 3x – ky – 1 = 0; L3 = 5x + 2y −12 = 0. Match the statement/expressions in column 1 with column 2. | Column 1 | Column 2 | | A. L1, L2, L3 are concurrent, if | p. k = −9 | | B. One of L1, L2, L3 is parallel to at least one of the other two, if | q. | | C. L1, L2, L3 form a triangle, if | r. | | D.L1, L2, L3 do not form a triangle, if | s. k = 5 |
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IIT 2008 |
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1010 |
 is a circle inscribed in a square whose one vertex is  . Find the remaining vertices.
a)  b)  c)  d) 
is a circle inscribed in a square whose one vertex is . Find the remaining vertices. a) b) c) d)
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IIT 2005 |
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1011 |
Let a line passing through the fixed point (h, k) cut the X–axis at P and Y–axis at Q. Then find the minimum area of ΔOPQ. a) hk b) h2/k c) k2/h d) 2hk
Let a line passing through the fixed point (h, k) cut the X–axis at P and Y–axis at Q. Then find the minimum area of ΔOPQ. a) hk b) h2/k c) k2/h d) 2hk
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IIT 1995 |
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1012 |
Match the following | Column 1 | Column 2 | | i) Re z = 0 | A) Re  = 0 | | ii) Arg z = π/4 | B) Im = 0 | | | C) Re = Im |
Match the following | Column 1 | Column 2 | | i) Re z = 0 | A) Re = 0 | | ii) Arg z = π/4 | B) Im = 0 | | | C) Re = Im |
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IIT 1992 |
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1013 |
Let An be the area bounded by the curve y = (tanx)n and the line
x = 0, y = 0 and  . Prove that for  . Hence deduce that
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IIT 1996 |
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1014 |
Consider the circle x2 + y2 = 9 and the parabola y2 = 8x. They intersect P and Q in the first and fourth quadrants respectively. Tangents to the circle at P and Q intersect the X–axis at R and tangents to the parabola at P and Q intersect the X- axis at S. The radius of the incircle of △PQR is a) 4 b) 3 c)  d) 2
Consider the circle x2 + y2 = 9 and the parabola y2 = 8x. They intersect P and Q in the first and fourth quadrants respectively. Tangents to the circle at P and Q intersect the X–axis at R and tangents to the parabola at P and Q intersect the X- axis at S. The radius of the incircle of △PQR is a) 4 b) 3 c) d) 2
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IIT 2007 |
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1015 |
ABCD is a rhombus. The diagonals AC and BD intersect at the point M and satisfy BD = 2AC. If the points D and M represent the complex numbers 1 + i and (2 – i) respectively then find the complex number x + iy represented by A. a)  b)  c)  d) 
ABCD is a rhombus. The diagonals AC and BD intersect at the point M and satisfy BD = 2AC. If the points D and M represent the complex numbers 1 + i and (2 – i) respectively then find the complex number x + iy represented by A. a) b) c) d)
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IIT 1993 |
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1016 |
Find all possible values of b > 0, so that the area of the bounded region enclosed between the parabolas  and  is maximum. a) b = 1 b) b ≥ 1 c) b ≤ 1 d) 0 < b < 1
Find all possible values of b > 0, so that the area of the bounded region enclosed between the parabolas and is maximum. a) b = 1 b) b ≥ 1 c) b ≤ 1 d) 0 < b < 1
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IIT 1997 |
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1017 |
Let f(x) = sinx and g(x) = ln|x|. If the ranges of the composition function fog and gof are R1 and R2 respectively then a)  b)  ,  c)  d) 
Let f(x) = sinx and g(x) = ln|x|. If the ranges of the composition function fog and gof are R1 and R2 respectively then a) b) , c) d)
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IIT 1994 |
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1018 |
Let C1 and C2 be the graph of the function y = x2 and y = 2x respectively. Let C3 be the graph of the function
y = f (x), 0 ≤ x ≤ 1, f (0) = 0. Consider a point P on C1. Let the lines through P, parallel to the axes meet C2 and C3 at Q and R respectively (see figure). If for every position of P (on C1) the area of the shaded regions OPQ and OPR are equal, determine the function f(x). 
a) x2 – 1 b) x3 – 1 c) x3 – x2 d) 1 + x2 + x3
Let C1 and C2 be the graph of the function y = x2 and y = 2x respectively. Let C3 be the graph of the function
y = f (x), 0 ≤ x ≤ 1, f (0) = 0. Consider a point P on C1. Let the lines through P, parallel to the axes meet C2 and C3 at Q and R respectively (see figure). If for every position of P (on C1) the area of the shaded regions OPQ and OPR are equal, determine the function f(x).
a) x2 – 1 b) x3 – 1 c) x3 – x2 d) 1 + x2 + x3
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IIT 1998 |
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1019 |
A hemispherical tank of radius 2 meters is initially full of water and has an outlet of 12cm2 cross section area at the bottom. The outlet is opened at some instant. The flow through the outlet is according to the law  where g(t) and h(t) are respectively the velocity of the flow through the outlet and the height of the water level above the outlet at the time t, and g is the acceleration due to gravity. Find the time it takes to empty the tank. (Hint: Form a differential equation by relating the decrease of water level to the outflow). a)  b)  c)  d) 
A hemispherical tank of radius 2 meters is initially full of water and has an outlet of 12cm2 cross section area at the bottom. The outlet is opened at some instant. The flow through the outlet is according to the law where g(t) and h(t) are respectively the velocity of the flow through the outlet and the height of the water level above the outlet at the time t, and g is the acceleration due to gravity. Find the time it takes to empty the tank. (Hint: Form a differential equation by relating the decrease of water level to the outflow). a) b) c) d)
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IIT 2001 |
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1020 |
Let P be a point on the ellipse  . Let the line parallel to Y–axis passing through P meets the circle  at the point Q such that P and Q are on the same side of the X–axis. For two positive real numbers r and s find the locus of the point R on PQ such that PˆR : RˆQ = r : s and P varies over the ellipse.
Let P be a point on the ellipse . Let the line parallel to Y–axis passing through P meets the circle at the point Q such that P and Q are on the same side of the X–axis. For two positive real numbers r and s find the locus of the point R on PQ such that PˆR : RˆQ = r : s and P varies over the ellipse.
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IIT 2001 |
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1021 |
Find the area bounded by the curves
x2 = y, x2 = − y and y2 = 4x – 3 a) 1 b) 3 c) 1/3 d) 1/9
Find the area bounded by the curves
x2 = y, x2 = − y and y2 = 4x – 3 a) 1 b) 3 c) 1/3 d) 1/9
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IIT 2005 |
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1022 |
Let E = {1, 2, 3, 4} and F = {1, 2}, then the number of onto functions from E to F is a) 14 b) 16 c) 12 d) 8
Let E = {1, 2, 3, 4} and F = {1, 2}, then the number of onto functions from E to F is a) 14 b) 16 c) 12 d) 8
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IIT 2001 |
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1023 |
For a twice differentiable function f(x), g(x) is defined as  If for a < b < c < d < e, f(a) = 0, f(b) = 2, f(c) = − 1, f(d) = 2, f(e) = 0 then find the maximum number of zeros of g(x). a) 1 b) 2 c) 3 d) 6
For a twice differentiable function f(x), g(x) is defined as If for a < b < c < d < e, f(a) = 0, f(b) = 2, f(c) = − 1, f(d) = 2, f(e) = 0 then find the maximum number of zeros of g(x). a) 1 b) 2 c) 3 d) 6
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IIT 2006 |
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1024 |
Find the equation of the normal to the curve 
Find the equation of the normal to the curve
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IIT 1993 |
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1025 |
The larger of cos (lnθ) and ln (cosθ) if  is a) cos(lnθ) b) ln(cosθ)
The larger of cos (lnθ) and ln (cosθ) if is a) cos(lnθ) b) ln(cosθ)
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IIT 1983 |
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