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Quadratic Advanced Worksheet

The document contains a practice problem package on quadratic equations with 26 multiple choice questions. The questions cover topics like finding the maximum/minimum value of quadratic functions, determining the number of real roots of quadratic equations, and constraints on the coefficients of quadratic polynomials. The questions range from single answer multiple choice to multiple answer multiple choice problems.

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Sujal S
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291 views6 pages

Quadratic Advanced Worksheet

The document contains a practice problem package on quadratic equations with 26 multiple choice questions. The questions cover topics like finding the maximum/minimum value of quadratic functions, determining the number of real roots of quadratic equations, and constraints on the coefficients of quadratic polynomials. The questions range from single answer multiple choice to multiple answer multiple choice problems.

Uploaded by

Sujal S
Copyright
© © All Rights Reserved
We take content rights seriously. If you suspect this is your content, claim it here.
Available Formats
Download as PDF, TXT or read online on Scribd
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Vidyamandir Classes

Advanced Problem Package


gETf
SINGLE CORRECT ANSWER TYPE
Quadratic Equations

Each of the following Question has 4 choices A, B, C & D, out of which ONLY ONE Choice is Correct.

1. If x 2  xy  12 and 2 xy  3 y 2  5  0 then x  4 y is equal to :


(A) 0 (B) 1 (C) 2 (D) 3
2. 3
If ‘a’ and ‘b’ are distinct zeroes of the polynomial x  2 x  c and a 2
 2a 2

 4ab  3b2  3 then

 
b 2 3a 2  4ab  2b2 is equal to :
(A) 3 (B) 4 (C) 5 (D) 6
3.  
Let  and  be the real roots of the equation x2  x  k  2   k 2  3k  5  0. The maximum value of  2   2 is :

(A) 18 (B) 19 (C) 50/9 (D) 50/19

4. For x  R, the maximum value of x4  3x2  6 x  13  x4  x2  1 is :


(A) 3 (B) 10 (C) 13  3 (D) 2 3

5. Suppose A   x ; 5x  a  0 , B   x ; 6 x  b  0 , a, b  N and A  B  N  2, 3, 4 . The number of such pairs


(a, b) is:
(A) 20 (B) 25 (C) 30 (D) 35
6. The number of real solutions to the equation 3x2  18 x  52  2 x2  12 x  162 =  x2  6 x  280 is(are) :
(A) 0 (B) 1 (C) 2 (D) 3

7. a, b, c, d are distinct integers such that  x  a  x  b  x  c  x  d   4 has an integral root r. Then a  b  c  d is


equal to : I
(A) r (B) 2r (C) 3r (D) 4r
8. Let the n real roots of the equation x  2nx n n 1
 2 n  n  1 x n2
 ax n3
 bx n4
 .........  c  0 be 1 ,  2 ,  3 ...... n
n
then   1k 1  k is :
k 1
(A) Zero (B) One (C) Two (D) Three
2
9. The number of monic quadratic polynomials of the form x  ax  b with integer roots, where 1, a, b are in AP is(are)
:
(A) 0 (B) 1 (C) 2 (D) 4

APP | Quadratic Equations 1 Mathematics


Vidyamandir Classes

10.  
Let A   2, 4  , B  x ; x 2  ax  4  0 . If B  A, then the range of real a is :

(A)  1, 2  (B)  1, 2 (C) [0, 3] (D) [0, 3)

4 x 2  15 x  17 5 x 2  16 x  18
11. The sum of all real x such that,  is :
x 2  4 x  12 2 x 2  5 x  13
11 20 23
(A) 0 (B) (C)  (D)
3 3 3

12. The number of solutions to the equation 2 1  x 1   x  1 1   x  2  1   x  3 x  5   x is :

(A) 0 (B) 2 (C) 4 (D) 16

PARAGRAPH FOR QUESTIONS 13 - 15

Given that a  0 , ax 2  bx  c  1 , if 1  x  1, a, b,c  R and ax  b has its maximum value 2, when 1  x  1 .

Then :
13. a=
(A) 3 (B) 1 (C) 2 (D) 4

14. b=
(A) 1 (B) 2 (C) 1 (D) 0

15. c=
(A) 1 (B) 0 (C) 1 (D) 2

PARAGRAPH FOR QUESTIONS 16 - 18

Consider the equation x 4   k  1 x 2   2  k   0 . The complete set of possible values of real k for which the equation
has:

16. Four distinct real roots is :


(A)   , 2  (B) 2 2 ,  1, 2 
(C)  2  1, 2 2  1  (D)  2,  
17. 3 distinct real roots is :
(A) {2} (B)  2  1, 2  (C)  5 1 (D) 2 2, 3  2 
18. 2 distinct real roots is :
(A) (0, 2) (B)   , 2 2 1  (C)  2,   (D) 2 
2  1   2,  

APP | Quadratic Equations 2 Mathematics


Vidyamandir Classes

MULTIPLE CORRECT ANSWERS TYPE


Each of the following Question has 4 choices A, B, C & D, out of which ONE or MORE Choices may be Correct:
19. The function f  x   ax 2  c satisfies 4  f 1  1 and 1  f  2   5 . Which of the following statements is true?
1
(A) 1  f  3  20 (B) 2  f  3  18 (C)   f  3  20 (D) 0  f  3  20
2
20. Let a  0, b, c be integers and sin , cos  be the rational roots of the equation ax 2  bx  c  0 . Then:
(A) a is a perfect square (B) a + 2c is a perfect square
(C) a – 2c is a perfect square (D) b is a perfect square

21. If all roots of the polynomials 6 x 2  24 x  4a and x3  ax 2  bx  8 are non-negative real numbers, then:
(A) a  6 (B) a2 (C) b  10 (D) b  12
22. Let P  x   x 4  ax3  bx 2  cx  1 and Q  x   x 4  cx 3  bx 2  ax  1 with a, b, c  R and a  c. If P  x   0 and
Q  x   0 have two common roots then :
(A) b  2 (B) b2 (C) ac0 (D) a  2c  0

23. All the roots of x3  ax 2  bx  c are positive integers greater than 2 and the coefficient satisfy a  b  c  46 :
(A) a  14 (B) a  14
(C) Number of distinct roots of the equation=3 (D) Number of distinct roots of the equation=2

24. If the equations ax 3    a  b  x 2   b  c  x  c  0 and 2 x3  x 2  2 x  5  0 have a common root


 a  0, a, b, c  R  then a  b  c is equal to :
(A) 0 (B) 5a (C) 3b (D) 2c

25. Let f  x   ax 2  bx  c, a, b, c  R. Suppose f  x   1,  x   0,1 then :


(A) a 8 (B) a  2b  4c  4 (C) a  b  c  17 (D) 3a  2b  8

26. Consider the equation x  2 x  1  x  2 x  1  A


1   1
(A) For A = 2 , x   , 1 (B) For A = 2 , x  0 , 
2   2
3
(C) For A = 1, x   (D) For A = 2, x 
2
27. Suppose f  x    x 2  bx  1 and g  x   x 2  2 x  c, b, c  R, are such that maximum f  x   minimum g  x  as x
varies over R. Then possible values that c can take is(are) :
(A) 1 (B) 2 (C) 2 (D) 5
1
28. The greatest value of the function f  x   on the interval  2, 1 depending on the parameter b
2bx  x 4  3b 2
2

is(are) :
1 1
(A)  if b   0, 2 (B) if b   0, 4
3b 2 4b  4  3b 2
1 1
(C) if b  2 (D)  2 if b  2
8b  16  3b2 3b

APP | Quadratic Equations 3 Mathematics


Vidyamandir Classes

29. Given that a, b, c are positive distinct real numbers such that quadratic expressions ax 2  bx  c, bx 2  cx  a and

a2  b2  c2 I in :
2
cx  ax  b are always non-negative. Then the expression
ab  bc  ca
can never lie K
(A)   , 2 (B)   , 1 (C) (2, 4) (D)  4,  
30. The equation 8 x 4  16 x3  16 x 2  8 x  a  0 , a  R has :
(A) Atleast two real roots  a  R
(B) Atleast two imaginary roots  a  R
3
(C) The sum of all non-real roots equal to 2, if a 
2
3
(D) The sum of all non-real roots equal to 1, if a 
2

MATRIX MATCH TYPE


Each of the following question contains statements given in two columns, which have to be matched.
Statements in Column I are labelled as (A), (B), (C) & (D) whereas statements in Column 2 are labeled as p, q, r,
s & t. More than one choice from Column 2 can be matched with Column 1.
31. MATCH THE COLUMN :
Column 1 Column 2
(A) If a, b, c are length of sides of a triangle, then the roots of the (p) of opposite signs

 
equation a 2 x 2  b 2  a 2  c 2 x  b 2  0 are

(B) If a, b, c are unequal positive numbers and b is A.M. of a and c, (q) both positive
then the roots of the equation ax 2  2bx  c  0 are
(C) If a  R , then roots of the equation x 2   a  1 x  a 2  4  0 are (r) both negative

(D) If a, b, c are unequal positive numbers and b is H.M. of a and c, (s) real and distinct
2
then the roots of the equation ax  2bx  c  0 are
(t) imaginary

32. Let , ,  be three numbers such that       2,  2   2   2  6 and 3  3  3  11 , then :


Column 1 Column 2
(A)  4  4   4 is equal to (p) 13

(B) 5  5   5 is equal to (q) 26

(C)
 2
  
 4 2  4  2  4 is equal to (r) 57

(D)  6  6   6 is equal to (s) 119

(t) 129

APP | Quadratic Equations 4 Mathematics


Vidyamandir Classes

NUMERICAL VALUE TYPE


This section has Numerical Value Type Questions. The answer to each question is a NUMERICAL/INTEGER VALUE.
For each question, enter the correct numerical value of the answer. If the answer is a decimal numerical value, then
round-off the value to TWO decimal places.

8 9 10 k 1
33. The solution of the equation   is of the form , k  N then k = ___________1. ([x] denotes largest
x x  x k
integer less than or equal to x, and {x} denotes fractional part of x)

34. The value of ‘a’ so that the equation x3  6 x 2  11x  a  6  0 has exactly three integer solutions is _______.

35.  
Remainder when P x5 is divided by P  x   x 4  x 3  x 2  x  1 is ________.

36. If a, b, c  I , a  10 and  x  a  x  12   2   x  b  x  c  for all x  R then b  c  _________.

37. For real a, b, c, a  b  c  2, a 2  b 2  c 2  6 and a3  b3  c3  8 then 1  a 1  b 1  c   _______.

38. Let f  x   x 2  bx  c, b, c  R. If f  x  is a factor of both x 4  6 x 2  25 and 3x 4  4 x 2  28x  5, then the


minimum value of f  x  is ________.

39. Given that m is a real number not less than –1, such that equation x 2  2  m  2  x  m 2  3m  3  0 has two distinct

1  mx12 mx22 
real roots x1 and x2 . Find the maximum value of   .
2  1  x1 1  x2 

40. Let p be an integer such that both roots of the equation 5 x 2  5 px   66 p  1  0 are positive integers. Then the
 p
value of   is equal to ([.] denotes greatest integer function)
10 

APP | Quadratic Equations 5 Mathematics

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