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701 |
If P = , A = and Q = PAPT then PT (Q2005) P is equal to a)  b)  c)  d) 
If P = , A = and Q = PAPT then PT (Q2005) P is equal to a)  b)  c)  d) 
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IIT 2005 |
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702 |
Consider three planes P1 : x – y + z = 1 P2 : x + y – z = −1 P3 : x – 3y + 3z = 2 Let L1, L2, L3 be lines of intersection of planes P2 and P3, P3 and P1, and P1 and P2 respectively. Statement 1 – At least two of the lines L1, L2, L3 are non parallel Statement 2 – The three planes do not have a common point. a) Statement 1 is true. Statement 2 is true. Statement 2 is a correct explanation of statement 1. b) Statement 1 is true. Statement 2 is true. Statement 2 is not a correct explanation of statement 1. c) Statement 1 is true. Statement 2 is false. d) Statement 1 is false. Statement 2 is true.
Consider three planes P1 : x – y + z = 1 P2 : x + y – z = −1 P3 : x – 3y + 3z = 2 Let L1, L2, L3 be lines of intersection of planes P2 and P3, P3 and P1, and P1 and P2 respectively. Statement 1 – At least two of the lines L1, L2, L3 are non parallel Statement 2 – The three planes do not have a common point. a) Statement 1 is true. Statement 2 is true. Statement 2 is a correct explanation of statement 1. b) Statement 1 is true. Statement 2 is true. Statement 2 is not a correct explanation of statement 1. c) Statement 1 is true. Statement 2 is false. d) Statement 1 is false. Statement 2 is true.
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IIT 2008 |
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703 |
Show that the system of equations 3x – y + 4z = 3 x + 2y − 3z = −2 6x + 5y + λz = −3 has at least one solution for any real number λ ≠ −5. Find the set of solutions if λ = −5 a)  b)  c)  d) 
Show that the system of equations 3x – y + 4z = 3 x + 2y − 3z = −2 6x + 5y + λz = −3 has at least one solution for any real number λ ≠ −5. Find the set of solutions if λ = −5 a)  b)  c)  d) 
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IIT 1983 |
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704 |
The solution of primitive equation is . If and then is a)  b)  c)  d) 
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IIT 2005 |
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705 |
If then prove that 
If then prove that 
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IIT 1983 |
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706 |
If M is a 3 x 3 matrix where det (M) = 1 and MMT = I, then prove that det (M – I) = 0.
If M is a 3 x 3 matrix where det (M) = 1 and MMT = I, then prove that det (M – I) = 0.
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IIT 2004 |
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707 |
Let f(x) be defined for all x > 0 and be continuous. If f(x) satisfies for all x, y and f(e)=1 then a) f(x) is bounded b)  c) x f(x) → 1 as x → 0 d) f(x) = lnx
Let f(x) be defined for all x > 0 and be continuous. If f(x) satisfies for all x, y and f(e)=1 then a) f(x) is bounded b)  c) x f(x) → 1 as x → 0 d) f(x) = lnx
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IIT 1995 |
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708 |
The number of values of x where the function attains its maximum is a) 0 b) 1 c) 2 d) infinite
The number of values of x where the function attains its maximum is a) 0 b) 1 c) 2 d) infinite
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IIT 1998 |
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709 |
The domain of the definition of the function y given by the equation is a) 0 < x < 1 b) 0 ≤ x ≤ 1 c) ∞ < x ≤ 0 d) ∞ < x ≤ 1
The domain of the definition of the function y given by the equation is a) 0 < x < 1 b) 0 ≤ x ≤ 1 c) ∞ < x ≤ 0 d) ∞ < x ≤ 1
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IIT 2000 |
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710 |
Solution of the differential equation is
Solution of the differential equation is
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IIT 2006 |
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711 |
Let A =  If U1, U2, U3 are column matrices satisfying AU1 = , AU2 = and AU3 =  and U is a 3 x 3 matrix whose columns are U1, U2, U3 then the value of [ 3 2 0 ] U is a)  b)  c)  d) 
Let A =  If U1, U2, U3 are column matrices satisfying AU1 = , AU2 = and AU3 =  and U is a 3 x 3 matrix whose columns are U1, U2, U3 then the value of [ 3 2 0 ] U is a)  b)  c)  d) 
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IIT 2006 |
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712 |
Let f(x) = , x ≠ then for what value of α, f(f(x)) = x a)  b)  c)  d) 
Let f(x) = , x ≠ then for what value of α, f(f(x)) = x a)  b)  c)  d) 
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IIT 2001 |
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713 |
If and then f is a) One-one and onto b) One-one but not onto c) Onto but not one-one d) Neither one-one nor onto
If and then f is a) One-one and onto b) One-one but not onto c) Onto but not one-one d) Neither one-one nor onto
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IIT 2003 |
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714 |
If  and  Then f – g is a) Neither one to one nor onto b) One to one and onto c) One to one and into d) Many one and onto
If  and  Then f – g is a) Neither one to one nor onto b) One to one and onto c) One to one and into d) Many one and onto
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IIT 2005 |
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715 |
Let a, b, c, d be real numbers in geometric progression. If u, v, w satisfy the system of equations Then show that the roots of the equation and are reciprocal of each other.
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IIT 1999 |
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716 |
Subjective Problems Let f (x + y) = f (x) . f (y) for all x, y. Suppose f (5) = 2 and = 3. Find f (5).
Subjective Problems Let f (x + y) = f (x) . f (y) for all x, y. Suppose f (5) = 2 and = 3. Find f (5).
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IIT 1981 |
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717 |
Find the natural number a for which where the function f satisfies the relation f(x + y) = f(x) f(y) for all natural numbers x and y and further f(1) = 2.
Find the natural number a for which where the function f satisfies the relation f(x + y) = f(x) f(y) for all natural numbers x and y and further f(1) = 2.
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IIT 1992 |
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718 |
The interior angles of a polygon are in Arithmetic Progression. The smallest angle is 120° and the common difference is 5. Find the number of sides of the polygon.
The interior angles of a polygon are in Arithmetic Progression. The smallest angle is 120° and the common difference is 5. Find the number of sides of the polygon.
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IIT 1980 |
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719 |
If where a > 0 and n is a positive integer then f(f(x)) = x. a) True b) False
If where a > 0 and n is a positive integer then f(f(x)) = x. a) True b) False
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IIT 1983 |
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720 |
A vector a has components 2p and 1 with respect to a rectangular cartesian system. This system is rotated through a certain angle about the origin in the counter clockwise sense. If with respect to new system a has components p + 1 and 1 then a) p ≠ 0 b) p = 1 or p =  c) p = −1 or  d) p = 1 or p = −1 e) None of these
A vector a has components 2p and 1 with respect to a rectangular cartesian system. This system is rotated through a certain angle about the origin in the counter clockwise sense. If with respect to new system a has components p + 1 and 1 then a) p ≠ 0 b) p = 1 or p =  c) p = −1 or  d) p = 1 or p = −1 e) None of these
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IIT 1986 |
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|
721 |
The domain of the function is
The domain of the function is
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IIT 1984 |
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722 |
If f is an even function defined on (−5, 5) then the four real values of x satisfying the equation are
If f is an even function defined on (−5, 5) then the four real values of x satisfying the equation are
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IIT 1996 |
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723 |
Let a1, a2, … an be positive real numbers in Geometric Progression. For each n let An, Gn, Hn be respectively the arithmetic mean, geometric mean and harmonic mean of a1, a2, . . . ., an. Find the expressions for the Geometric mean of G1, G2, . . . .Gn in terms of A1, A2, . . . .,An; H1, H2, . . . .Hn
Let a1, a2, … an be positive real numbers in Geometric Progression. For each n let An, Gn, Hn be respectively the arithmetic mean, geometric mean and harmonic mean of a1, a2, . . . ., an. Find the expressions for the Geometric mean of G1, G2, . . . .Gn in terms of A1, A2, . . . .,An; H1, H2, . . . .Hn
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IIT 2001 |
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724 |
Let , 0 < x < 2 are integers m ≠ 0, n > 0 and let p be the left hand derivative of |x − 1| at x = 1. If , then a) n = −1, m = 1 b) n = 1, m = −1 c) n = 2, m = 2 d) n > 2, n = m
Let , 0 < x < 2 are integers m ≠ 0, n > 0 and let p be the left hand derivative of |x − 1| at x = 1. If , then a) n = −1, m = 1 b) n = 1, m = −1 c) n = 2, m = 2 d) n > 2, n = m
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IIT 2008 |
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725 |
For three vectors which of the following expressions is not equal to any of the remaining three a)  b)  c)  d) 
For three vectors which of the following expressions is not equal to any of the remaining three a)  b)  c)  d) 
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IIT 1998 |
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