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1 J-Mathematics XRCIS - 01 CHCK YOUR GRASP SLCT TH CORRCT ALTRNATIV (ONLY ON CORRCT ANSWR) 1. The roots of the quadratic equation (a + b c) (a b c) + (a b + c) = 0 are - (A) a + b + c & a b + c (B) 1/ & a b + c (C) a b + c & 1/(a + b c) (D) none of these. If the A.M. of the roots of a quadratic equation is 8 5 and A.M. of their reciprocals is 8, then the quadratic 7 equation is - (A) = 0 (B) = 0 (C) = 0 (D) = 0 3. If sin & cos are the roots of the equation a + b + c = 0 then - (A) a b + ac = 0 (B) a + b + ac = 0 (C) a b ac = 0 (D) a + b ac = 0 4. If one root of the quadratic equation p + q + r = 0 (p 0) is a surd are all rationals then the other root is - a a a b, where p, q, r; a, b (A) b a a b (B) a + a(a b) b (C) a a a b b (D) a a b 5. A quadratic equation with rational coefficients one of whose roots is tan 1 b F I HG K J is - (A) + 1 = 0 (B) + 4 = 0 (C) = 0 (D) 4 1 = 0 6. a + b + c = 0 has real and distinct roots and ( > ). Further a > 0, b < 0 and c < 0, then - (A) 0 < < (B) 0 < < (C) + < 0 (D) + = b a 7. If the roots of (a + b ) b (a + c) + (b + c ) = 0 are equal then a, b, c are in _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS (A) A.P. (B) G.P. (C) H.P. (D) none of these 8. If a (b c) + b (c a) + c (a b) = 0 has equal root, then a, b, c are in (A) A.P. (B) G.P. (C) H.P. (D) none of these 9. Let p, q {1,, 3, 4}. Then number of equation of the form p + q + 1 = 0, having real roots, is (A) 15 (B) 9 (C) 7 (D) If the roots of the quadratic equation a + b + c = 0 are imaginary then for all values of a, b, c and R, the epression a + ab + ac is - (A) positive (B) non-negative (C) negative (D) may be positive, zero or negative 1 1. If, y are rational number such that + y + ( y) = y + ( y 1) 6, then (A) and y connot be determined (B) =, y = 1 (C) = 5, y = 1 (D) none of these 53

2 J-Mathematics 1. Graph of the function f() = A BX + C, where A = (sec cos) (cosec sin)(tan + cot), B = (sin + cosec) + (cos + sec) (tan + cot ) & C = 1, is represented by y y y y (A) (B) (C) (D) 1 3. The equation whose roots are the squares of the roots of the equation (A) a b c 0 (B) (C) a b ac c 0 (D) 54 a b c 0 is - a b 4ac c 0 a b ac c If, then the equation whose roots are & is (A) = 0 (B) = 0 (C) = 0 (D) none of these If are the roots of the equation = 0, then the equation with roots, will be (A) 1 = 0 (B) + 1 = 0 (C) + + = 0 (D) none of these 1 6. If 11 a and 14 a have a common factor then 'a' is equal to (A) 4 (B) 1 (C) (D) The smallest integer for which the inequality > 0 is satisfied is given by (A) 7 (B) 5 (C) 4 (D) The number of positive integral solutions of the inequation 3 4 (3 4) ( ) 5 6 ( 5) ( 7) (A) (B) 0 (C) 3 (D) The value of a for which the sum of the squares of the roots of (a ) a 1 = 0 is least is - (A) 1 (B) 3/ (C) (D) 1 0. If the roots of the quadratic equation b = 0 are real and distinct and they differ by atmost 4 then the least value of b is - (A) 5 (B) 6 (C) 7 (D) 8 1. The epression 1 7 lies in the interval ; ( R) - (A) [0, 1] (B) (, 0] [ 1, ) (C) [0, 1) (D) none of these. If the roots of the equation a + a + a 3 = 0 are real & less than 3 then - (A) a < (B) a 3 (C) 3 a 4 (D) a > 4 3. The number of integral values of m, for which the roots of m + m 1 = 0 will lie between and 4 is - (A) (B) 0 (C) 3 (D) 1 4. If the roots of the equation, 3 + P + Q 19 = 0 are each one more than the roots of the equation, 3 A + B C = 0, where A, B, C, P & Q are constants then the value of A + B + C = (A) 18 (B) 19 (C) 0 (D) none 5. If are roots of = 0, then is equal to - (A) 5 (B) is - (C) 4 (D) 5 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

3 6. Number of real solutions of the equation = is equal to - (A) 1 (B) (C) 3 (D) 4 7. The complete solution set of the inequation 18 is - (A) [ 18, ] (B) (, ) (7, ) (C) ( 18, ) (7, ) (D) [ 18, ) J-Mathematics If log1 / 3 is less than unity then must lie in the interval - (A) (, ) (5/8, ) (B) (, 5/8) (C) (, ) (1/3, 5/8) (D) (, 1/3) 9. haustive set of value of satisfying log ( + + 1) 0 is - (A) ( 1, 0) (B) (, 1) (1, ) (C) ( ) { 1, 0, 1} (D) (, 1) ( 1, 0) (1, ) 3 0. Solution set of the inequality, log ( + 3) 0 is - (A) [ 4, 1] (B) [ 4, 3) (0, 1] (C) (, 3) (1, ) (D) (, 4) [1, ) SLCT TH CORRCT ALTRNATIVS (ON OR MOR THAN ON CORRCT ANSWRS) 3 1. If is a root of the equation ( + 1) = 1, then the other root is - (A) (B) ( + 1) (C) (D) none of these 3. If b 4ac for the equation a 4 + b + c = 0, then all roots of the equation will be real if - (A) b > 0, a < 0, c > 0 (B) b < 0, a > 0, c > 0 (C) b > 0, a > 0, c > 0 (D) b > 0, a < 0, c < Let be the roots of a + b = 0, where a & b R. If + 3 = 0, then - (A) 3a + 4b = 0 (B) 3b + 4a = 0 (C) b < 0 (D) a < For [1, 5], y = has - (A) least value = 1.5 (B) greatest value = 3 (C) least value = 3.5 (D) greatest value = Integral real values of satisfying log 1/ ( 6 + 1) > is - (A) (B) 3 (C) 4 (D) 5 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS 3 6. If 1 < log 0.1 <, then - (A) the maimum value of is (C) does not lie between and 10 (B) lies between and 10 (D) the minimum value of is CHCK YOUR GRASP ANSWR KY X R CI S - 1 Que A ns. D B A C C B B C C A Que A ns. B B C C A A D C B A Que A ns. C A C A D A D A D B Que A ns. B, C B, D A,C B, C A,B,C A,B,D

4 J-Mathematics XRCIS - 0 BRAIN TASRS SLCT TH CORRCT ALTRNATIVS (ON OR MOR THAN ON CORRCT ANSWRS) 1. The equation whose roots are sec & cosec can be - (A) 1 = 0 (B) = 0 (C) = 0 (D) = 0. If cos is a root of the equation = 0, 1 < < 0, then the value of sin is - (A) 1/5 (B) 1 / 5 (C) 4 / 5 (D) 4 / 5 3. If the roots of the equation (A) p + q = r p are equal in magnitude and opposite in sign, then - q r (B) p + q = r 1 (C) product of roots = ( p q ) (D) sum of roots = 1 4. Graph of y = a + b + c = 0 is given adjacently. What conclusions can be drawn y from this graph - (A) a > 0 (B) b < 0 (C) c < 0 (D) b 4ac > 0 O Verte 5. If a, b, c are real distinct numbers satisfying the condition a + b + c = 0 then the roots of the quadratic equation 3a + 5b + 7c = 0 are - (A) positive (B) negative (C) real and distinct (D) imaginary 6. The adjoining figure shows the graph of y = a + b + c. Then - (A) a > 0 (B) b > 0 y Verte (C) c > 0 56 (D) b < 4ac 7. If + P + 1 is a factor of the epression a 3 + b + c then - 1 (A) a + c = ab (B) a c = ab (C) a c = ab (D) none of these 8. The set of values of a for which the inequality ( 3a) ( a 3) < 0 is satisfied for all in the interval 1 3 (A) (1/3, 3) (B) (0, 1/3) (C) (, 0) (D) (, 3) 9. Let p() be the cubic polynomial K. Suppose the three roots of p() form an arithmetic progression. Then the value of K, is - (A) 4 1 (B) (C) (D) If the quadratic equation a + b + 6 = 0 does not have two distinct real roots, then the least value of a + b is - (A) (B) 3 (C) 6 (D) If p & q are distinct reals, then {( p) ( q) + (p ) (p q) + (q ) (q p)} = (p q) + ( p) + ( q) is satisfied by - (A) no value of (B) eactly one value of (C) eactly two values of (D) infinite values of 1. The value of 'a' for which the epression y = + a a is perfect square, is - (A) 4 (B) ± 3 (C) ± (D) a (, 3 ] [ 3, ) _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

5 1 3. Set of values of 'K' for which roots of the quadratic (K 1) + K(K 1) = 0 are - J-Mathematics (A) both less than is K (, ) (B) of opposite sign is K (, 0) (1, ) _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS (C) of same sign is K (, 0) (1, ) (D) both greater than is K (, ) 1 4. The correct statement is / are - (A) If 1 & are roots of the equation 6 b = 0 (b > 0), then 1 1 (B) quation a + b + c = 0 has real roots if a < 0, c > 0 and b R (C) If P() = a + b + c and Q() = a + b + c, where ac 0 and a, b, c R, then P().Q() has at least two real roots. (D) If both the roots of the equation (3a + 1) (a +3b) + 3 = 0 are infinite then a = 0 & b R 1 5. If 1 < < 3 < 4 < 5 < 6, then the equation ( 1 )( 3 )( 5 )+3( )( 4 )( 6 )=0 has - (A) three real roots (B) no real root in (, 1 ) (C) one real root in ( 1, ) (D) no real root in ( 5, 6 ) 1 6. quation (a + 1) + a(a + 1) = 0 has one root less than 'a' and other root greater than 'a', if (A) 0 < a < 1 (B) 1 < a < 0 (C) a > 0 (D) a < The value(s) of 'b' for which the equation, log 1/5 (b + 8) = log 5 (1 4 ) has coincident roots, is/are - (A) b = 1 (B) b = 4 (C) b = 4 or b = 1 (D) b = 4 or b = For every R, the polynomial is - (A) positive (B) never positive (C) positive as well as negative (D) negative 1 9. If, are the roots of the quadratic equation (p + p + 1) + (p 1) + p = 0 such that unity lies between the roots then the set of values of p is - (A) (B) p (, 1) (0, (C) p ( 1, 0) (D) ( 1, 1) 0. Three roots of the equation, 4 p 3 + q r + s = 0 are tana, tanb & tanc where A, B, C are the angles of a triangle. The fourth root of the biquadratic is - p r (A) (B) 1 q s 1. If log log p r (C) 1 q s > 0 then belongs to interval - p r (D) 1 q s p r 1 q s (A) ( 5, ) (B) ( 5, 6 6 ) (C) (6, ) (D) (10, ) ANSWR KY BRAIN TASRS X R CI S - Que A ns. C C, D B, C A,B,C,D C B, C C B D B Que A ns. D C C A,B,C A,B,C A,C,D B A C A Que. 1 A ns. B, D 57

6 J-Mathematics XRCIS - 03 MISCLLANOUS TYP QUSTIONS TRU / FALS 1. If a, b, c Q, then roots of a + (a + b) (3a + b) = 0 are rational.. The necessary and sufficient condition for which a fied number 'd' lies between the roots of quadratic equation f() = a + b + c = 0; (a, b, c R), is f(d) < If 0 < p < then the quadratic equation, (cosp 1) + cosp + sinp = 0 has real roots. 4. The necessary and sufficient condition for the quadratic function f() = a + b + c, to take both positive and negative values is, b > 4ac, where a, b, c R & a 0. FILL IN TH BLANKS 1. If a + b + c = 0 & a + b + c = 1 then the value of a 4 + b 4 + c 4 is..... If sin y = 0, y (0, ) then =... & y = If, be the roots of the equation a + b + c = 0 then the value of a b c + a is equal to.... b c MATCH TH COLUMN Following question contains statements given in two columns, which have to be matched. The statements in Column-I are labelled as A, B, C and D while the statements in Column-II are labelled as p, q, r and s. Any given statement in Column-I can have correct matching with ON OR MOR statement(s) in Column-II. 1. Consider the equation + (a 1) + a + 5 = 0, where a is a parameter. Match of the real values of a so that the given equation has Column-I (A) imaginary roots (p) C olumn-ii 8, 7 (B) one root smaller than 3 and other root greater than 3 (q) ( 1, 4) (C) eactly one root in the interval (1, 3) & 1 and 3 are (r) not the root of the equation 4 8, (D) one root smaller than 1 and other root greater than 3 (s), 3 ASSRTION & R ASON These questions contains, Statement-I (assertion) and Statement-II (reason). (A) Statement-I is true, Statement-II is true ; Statement-II is correct eplanation for Statement-I. (B) Statement-I is true, Statement-II is true ; Statement-II is NOT a correct eplanation for statement-i (C) Statement-I is true, Statement-II is false (D) Statement-I is false, Statement-II is true 1. Statement-I : If equation a + b + c = 0; (a, b, c R) and = 0 have a common root, then a : b : c = : 3 : 4. B e c a u s e Statement-II : If p + iq is one root of a quadratic equation with real coefficients then p iq will be the other root ; p, q R, i = 1 (A) A (B) B (C) C (D) D 58 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

7 J-Mathematics. Statement-I : If f() is a quadratic epression such that f(1) + f() = 0. If 1 is a root of f() = 0 then the other root is 8 5. B e c a u s e Statement-II : If f() = a + b + c then sum of roots = b a and product of roots = c a (A) A (B) B (C) C (D) D 3. Statement- I : If a + b + c > 0 and a < 0 < b < c, then the roots of the equation a( b) ( c) + b( c)( a) + c( a) ( b) = 0 are of both negative. B e c a u s e Statement-II : If both roots are negative, then sum of roots < 0 and product of roots > 0 (A) A (B) B (C) C (D) D 4. Statement-I : Let (a 1, a, a 3, a 4, a 5 ) denote a re-arrangement of (1, 4, 6, 7, 10). Then the equation a a 3 + a 3 + a 4 + a 5 = 0 has at least two real roots. B e c a u s e Statement-II : If a + b + c = 0 and a + b + c = 0, (i.e. in a polynomial the sum of coefficients is zero) then = 1 is root of a + b + c = 0. (A) A (B) B (C) C (D) D 5. Statement-I : If roots of the equation b + c = 0 are two consecutive integers, then b 4c = 1. B e c a u s e Statement-II : If a, b, c are odd integer then the roots of the equation 4 abc + (b 4ac) b = 0 are real and distinct. (A) A (B) B (C) C (D) D _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS COMPRHNSION BASD QUSTIONS Comprehension # 1 If,, be the roots of the equation a 3 + b + c+ d = 0. To obtain the equation whose roots are f(), f(), f(), where f is a function, we put y = f() and simplify it to obtain = g(y) (some function of y). Now, is a root of the equation a 3 + b + c + d = 0, then we obtain the desired equation which is a{g(y)} 3 + b{g(y)} + c{g(y)} + d = 0 For eample, if,, are the roots of a 3 + b + c + d = 0. To find equation whose roots are ,, we put y = = y As is a root of a 3 + b + c + d = 0 a b c we get d 0 3 y y y This is desired equation. dy 3 + cy + by + a = 0 On t he basis of above i nformat ion, a nswer t he fol low i ng que st ions : 1. If, are the roots of the equation a + b + c = 0, then the roots of the equation a( + 1) + b( + 1) ( 1) + c( 1) = 0 are- (A) 1, (B) 1, (C) 1, 1 (D) 3, If, are the roots of the equation = 0, the equation whose roots are the reciprocals of 3 and 3 is - (A) = 0 (B) = 0 (C) = 0 (D) = 0 59

8 J-Mathematics 4. If,, are the roots of the equation 3 1 = 0, then the value of 1 1 (A) 7 (B) 5 (C) 3 (D) 1 Comprehension # is equal to - Let (a + b ) Q() + (a b ) Q() = A, where N, A R and a b = 1 (a + b ) (a b ) = 1 (a + b ) = (a b ) 1 and (a b ) = (a + b ) 1 ie, (a ± b ) = a b 1 or a b 1 By substituting Q ( ) (a b) as t in the equation we get a quadratic in t. Also a + ar + ar a... = 1 r where 1 < r < 1 On t he basis of above i nformat ion, a nswer t he fol low i ng que st ions : 1. Solution of 1 1 ( 3 ) + ( 3 ) = 4 3 (A) 1 ± 3, 1 (B) 1 ±, 1 (C) 1 ± 3, (D) 1 ±,. The number of real solutions of the equation ( ) t + ( ) t = 30 are - where t = 3. If, are the roots of the equation p q + r = 0, then the equation whose roots are + r p and + r p is- (A) p 3 + pq + r = 0 (B) p q + r = 0 (C) p 3 pq + q r = 0 (D) p + q r = 0 are- (A)0 (B) (C) 4 (D) 6 ( If a a a (5 6 ) = 10 where a = 3, then is - (A) (B) (C) (D) MISCLLANOUS TYP QUSTION ANSWR KY XRCIS -3 Tr ue / False 1. T. F 3. T 4. T Fill in the Blanks 1. 1/. = & y = / 3. Match the Column 1. (A) (q), (B) (p, r, s), (C) (r), (D) (s) Assertion & Reason 1. A. A 3. D 4. A 5. B Comprehension Based Que st ions Comprehension # 1 : 1. C. B 3. C 4. D Comprehension # : 1. B. C 3. D 60 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

9 J-Mathematics XRCIS - 04 [A] CONCPTUAL SUBJCTIV XRCIS 1. If are the roots of the equation + 3 = 0 obtain the equation whose roots are , If one root of the equation a + b + c = 0 be the square of the other, prove that b 3 + a c + ac = 3abc. 3. Show that if p, q, r & s are real numbers & pr = (q + s ), then at least one of the equations + p + q = 0, + r + s = 0 has real roots. 4. Let a, b, c, d be distinct real numbers and a and b are the roots of quadratic equation c 5d = 0. If c and d are the roots of the quadratic equation a 5b = 0 then find the numerical values of a + b + c + d. 5. Find the product of the real roots of the equation, = a (a 1) 9a 4 6. Find the range of values of a, such that f() = 8 3 is always negative. 7. Find the values of a for which 3 < a 1 < is valid for all real. 8. If the quadratic equations + b + ca = 0 & + c + ab = 0 have a common root, prove that the equation containing their other roots is + a + bc = The equation a + b = 0 & 3 p + q = 0, where b 0, q 0, have one common root & the second equation has two equal roots. Prove that (q + b ) = ap. Find the solutions of following inequations : (10 to 14) 1 0. ( )( 4)( 7) 1 ( )( 4)( 7) 1 1. ( 1)( 7) 5. _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS ( )( ) ( 3)( 4) 4 Find the solutions of following miscellaneous inequations : (15 to 0) < < log < log 1/ ( + 1 ) > log ( ). 0. log. log. log 4 > Find all values of a for which the inequality (a + 4) a + a 6 < 0 is satisfied for all R.. Find all values of a for which both roots of the equation 6a + a + 9a = 0 are greater than 3. 61

10 J-Mathematics 3. Find all the values of the parameter a for which both roots of the quadratic equation a + = 0 belong to the interval ( 0, 3 ). 4. Find the values of K so that the quadratic equation + ( K 1 ) + K + 5 = 0 has atleast one positive root. 5. If a < b < c < d then prove that the roots of the equation ; ( a )( c) + ( b ) ( d) = 0 are real & distinct. 6. Two roots of a biquadratic k = 0 have their product equal to ( 3). Find the value of k. CONCPTUAL SUBJCTIV XRCIS ANSWR KY X R C IS - 4 ( A ) = a, 7. < a < (, 7) ( 4, ) 1 1. (, 1) (, 3) 1. (, 1] (0, 1] (, 3] 1 3.,0 1, (, ) 1 4. (, ) ( 1, 3) (4, ) 1 5. ( 8, ) 1 6. (, 5] [1, ) < < 1 5 or , 4 3, 1 4 < < < < 1 ; 1 < < 1. For all a (, 6). For all a (11/9, +) a 3 4. K 1 6. k = 86 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

11 J-Mathematics XRCIS - 04 [B] BRAIN STORMING SUBJCTIV XRCIS 1. If one root of the quadratic equation a + b + c = 0 is equal to the n th power of the other, then show that (ac n ) 1/(n+1) + (a n c) 1/(n+1) + b = 0.. Let P() = + b + c, where b and c are integer. If P() is a factor of both and , find the value of P(1). 3. Find the true set of values of p for which the equation : cos cos p. p. 0 has real roots. 4. If the coefficients of the quadratic equation a + b + c = 0 are odd integers then prove that the roots of the equation cannot be rational number. 5. If the three equations + a + 1 = 0, + b + 15 = 0 and + (a + b ) + 36 = 0 have a common positive root, find a and b and the roots of the equations. 6. If the quadratic equation a + b + c = 0 has real roots, of opposite sign in the interval (,) then prove that c b 1 0 4a a. 7. Show that the function z = + y + y + y + is not smaller than For a 0, determine all real roots of the equation a a 3a = The equation n + p + q + r = 0, where n 5 & r 0 has roots 1,, 3... n. Denoting n i1 k i by S. k (a) Calculate S & deduce that the roots cannot all be real. (b) Prove that S n + ps + qs 1 + nr = 0 & hence find the value of S n Find the values of b for which the equation log 1 (b 8) log (1 4 ) has only one solution Solve the inequality : 4 3 log3 0 5 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS BRAIN STORMING SUBJCTIV XRCIS ANSWR KY X R C I S - 4 ( B ). P(1) = 4 3. [4/5, 1] 5. a = 7, b = 8 ; ( 3, 4 ) ; ( 3, 5 ) and ( 3, 1 ) 8. = ( 1 ) a or ( , ) a 9. (a) S = 0, (b) S = nr 10., 14 {4}, n 63

12 J-Mathematics XRCIS - 05 [A] J-[MAIN] : PRVIOUS YAR QUSTIONS 1. If the roots of the equation = 0 are, and the roots of the equation + p + q = 0 are ( + ) and, then- [ A I ] (1) p = 1 and q = 56 () p = 1 and q = 56 (3) p = 1 and q = 56 (4) p = 1 and q = 56. If and be the roots of the equation ( a) ( b) = c and c 0, then roots of the equation ( ) ( ) + c = 0 are - [AI - 00 ] (1) a and c () b and c (3) a and b (4) a + b and b + c 3. If = 5 3, = 5 3 then the value of + (where ) is- [AI - 00 ] (1) 19/3 () 5/3 (3) 19/3 (4) none of these 4. The value of a for which one roots of the quadratic equation (a 5a + 3) + (3a 1) + = 0 is twice as large as the other is [ A I ] (1) /3 () 1/3 (3) 1/3 (4) /3 5, If the sum of the roots of the quadratic equation a + b + c = 0 is equal to the sum of the square of their reciprocals, then a, b c a and c are in [ A I ] b (1) geometric progression () harmonic progression (3) arithmetic-geometric progression (4) arithmetic progression 6. The number of real solutions of the equation 3 + = 0, is- [ A I ] (1) 4 () 1 (3) 3 (4) 7. The real number when added to its inverse gives the minimum value of the sum at equal to- (1) 1 () 1 (3) (4) 64 [ AI-003] 8. Let two numbers have arithmetic mean 9 and geometric mean 4. Then these numbers are the roots of the quadratic equation- [ A I ] (1) = 0 () = 0 (3) = 0 (4) = 0 9. If (1 p) is a root of quadratic equation + p + (1 p) = 0 then its roots are- [AI-004] (1) 0, 1 () 1, 1 (3) 0, 1 (4) 1, 1 0. If one root of the equation + p + 1 = 0 is 4, while the equation + p + q = 0 has equal roots, then the value of q is- [ A I ] (1) 3 () 1 (3) 49/4 (4) If value of a for which the sum of the squares of the roots of the equation (a ) a 1 =0 assume the least value is- [ A I ] (1) () 3 (3) 0 (4) 1 1. If the roots of the equation - b + c = 0 be two consecutive integers, then b 4c equals- (1) 1 () (3) 3 (4) [ A I ] 1 3. If both the roots of the quadratic equation k + k + k - 5 = 0 are less than 5, then k lies in the interval- [ AI-005] (1) [4, 5] () (-, 4) (3) (6, ) (4) (5, 6) 1 4. If the equation a n n + a n-1 n a 1 = 0, a 1 0, n, has a positive root =, then the equation na n n-1 + (n - 1) a n-1 n- + + a 1 = 0 has a positive root, which is- [ A I ] (1) equal to () greater than or equal to (3) smaller than (4) greater than _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

13 J-Mathematics 1 5. All the values of m for which both roots of the equation m + m 1 = 0 are greater than but less than 4, lie in the interval- [ A I ] (1) 1 < m < 3 () 1 < m < 4 (3) < m < 0 (4) m > If the roots of the quadratic equation + p + q = 0 are tan 30 and tan 15, respectively then the value of + q p is- [AI-006] (1) 0 () 1 (3) (4) If is real, then maimum value of is- [AI-006] (1) 1 () 17 7 (3) 1 4 (4) If the difference between the roots of the equation + a + 1 = 0 is less than 5, then the set of possible values of a is [ A I ] (1) ( 3, ) () (3, ) (3) (, 3) (4) ( 3, ) (, 3) 1 9. The quadratic equations 6 + a = 0 and c + 6 = 0 have one root in common. The other roots of the first and second equations are integers in the ratio 4:3. Then the common root is [ A I ] (1) 1 () 4 (3) 3 (4) 0. If the roots of the equation b + c + a = 0 be imaginary, then for all real values of, the epression 3b + 6bc + c is :- [ A I ] (1) Greater than 4ab () Less than 4ab (3) Greater than 4ab (4) Less than 4ab 1. If and are the roots of the equation + 1 = 0, then = [AI-010] (1) () 1 (3) 1 (4). Let for a a 1 0, f() = a + b + c, g() = a 1 + b 1 + c 1 and p()=f() g(). If p() = 0 only for = 1 and p( ) =, then the value of p() is: [AI ] (1) 18 () 3 (3) 9 (4) 6 3. Sachin and Rahul attempted to solve a quadratic equation. Sachin made a mistake in writing down the constant term and ended up in roots (4, 3). Rahul made a mistake in writing down coefficient of to get roots (3, ). The correct roots of equation are: [AI ] (1) 4, 3 () 6, 1 (3) 4, 3 (4) 6, 1 4. The equation e sin e sin 4 = 0 has : [AI - 01 ] (1) eactly four real roots. () infinite number of real roots. (3) no real roots. (4) eactly one real root. _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS PRVIOUS YARS QUSTIONS ANSWR KY XRCIS-5 [A] Que A ns Que A ns Que A ns

14 J-Mathematics XRCIS - 05 [B] J-[ADVANCD] : PRVIOUS YAR QUSTIONS. 1. Let a, b, c be real numbers with a 0 and let be the roots of the equation a + b + c = 0. press the roots of a 3 + abc + c 3 = 0 in terms of [J 001, Mains, 5 out of 100]. The set of all real numbers for which + + > 0, is (A) (, ) U (, ) (B) (, ) U (, ) (C) (, 1) U (1, ) (D) (, ) [J 00 (screening), 3] 3. If + (a b) + (1 a b) = 0 where a, b R then find the values of a for which equation has unequal real roots for all values of b. [J 003, Mains-4 out of 60] 4. (a) If one root of the equation + p + q = 0 is the square of the other, then (A) p 3 + q q(3p + 1) = 0 (B) p 3 + q + q(1 + 3p) = 0 (C) p 3 + q + q(3p 1) = 0 (D) p 3 + q + q(1 3p) = 0 (b) If + a a > 0 for all R, then (A) 5 < a < (B) a < 5 (C) a > 5 (D) < a < 5 [J 004 (Screening)] 5. Find the range of values of t for which sin t = , [J 005(Mains), ] 6. (a) Let a, b, c be the sides of a triangle. No two of them are equal and R. If the roots of the equation + (a + b + c) + 3(ab + bc + ca) = 0 are real, then (A) 4 3 (B) (C) 1 5, 3 3 (D) 4 5, 3 3 [J 006, 3] (b) If roots of the equation 10c 11d = 0 are a, b and those of 10a 11b = 0 are c, d, then find the value of a + b + c + d. (a, b, c and d are distinct numbers) [J 006, 6] 7. (a) Let, be the roots of the equation p + r = 0 and /, be the roots of the equation q + r = 0. Then the value of 'r' is (A) 9 (p q)(q p) (B) (q p)(p q) 9 (C) 9 (q p)(q p) (D) (p q)(q p) 9 MATCH TH COLUMN : 6 5 (b) Let f () = 5 6 Match the epressions / statements in Column I with epressions / statements in Column II. Column I Column II (A) If 1 < < 1, then f () satisfies (P) 0 < f () < 1 (B) If 1 < <, the f () satisfies (Q) f () < 0 (C) If 3 < < 5, then f () satisfies (R) f () > 0 (D) If > 5, then f () satisfies (S) f () < 1 [J 007, 3+6] _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS

15 ASSRTION & RASON : J-Mathematics 8. Let a, b, c, p, q be real numbers. Suppose, are the roots of the equation + p + q = 0 and, 1 are the roots of the equation a + b + c = 0, where { 1, 0, 1} STATMNT-1 : (p q)(b ac) 0 a n d STATMNT- : b pa or c qa (A) Statement-1 is True, Statement- is True; Statement- is a correct eplanation for Statement-1 (B) Statement-1 is True, Statement- is True; Statement- is NOT a correct eplanation for Statement-1 (C) Statement-1 is True, Statement- is False (D) Statement-1 is False, Statement- is True [J 008, 3 ( 1)] 9. The smallest value of k, for which both the roots of the equation, 8k + 16(k k + 1) = 0 are real, distinct and have values at least 4, is [J 009, 4 ( 1)] 1 0. Let p and q be real numbers such that p 0, p 3 q and p 3 q. If and are nonzero comple numbers satisfying = p and = q, then a quadratic equation having and as its roots is (A) (p 3 + q) (p 3 + q) + (p 3 + q) = 0 (B) (p 3 + q) (p 3 q) + (p 3 + q) = 0 (C) (p 3 q) (5p 3 q) + (p 3 q) = 0 (D) (p 3 q) (5p 3 + q) + (p 3 q) = Let and be the roots of 6 = 0, with. If a n = n n for n 1, then the value of [J 010, 3] a a a 10 8 is [J 011] (A) 1 (B) (C) 3 (D) 4 1. A value of b for which the equations + b 1 = b = 0, have one root in common is - [J 011] (A) (B) i 3 (C) i 5 (D) 9 _NOD6 ()\Data\014\Kota\J-Advanced\SMP\Maths\Unit#01\ng\0. Quadratic\.XRCISS PRVIOUS YARS QUSTIONS ANSWR KY 1. = and = or = and =. B 3. a > (a) D ; (b) A 5.,, 6. (a) A; (b) (a) D; (b) (A) P, R, S; (B) Q, S; (C) Q, S; (D) P, R, S 8. B B 1 1. C 1. B XRCIS-5 [B] 67

EXERCISE - 01 CHECK YOUR GRASP

EXERCISE - 01 CHECK YOUR GRASP XRCIS - 1 CHCK YOUR GRASP SLCT TH CORRCT ALTRNATIV (ONLY ON CORRCT ANSWR) 1. If A B = 1 5 3 7 and A 3B = 5 7, then matrix B is equal to - 4 5 6 7 (B) 6 3 7 1 3 6 1. If A = cos sin sin cos, then A A is