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CAT 2008: Quantitative Questions a Day 1 to 50 - The discussions
Quantitative Questions and Answers Discuss Quantitative and other Math related questions. Post your math doubts and get it solved by the smartest brains this side of the universe !
Re: CAT 2008: Quantitative Questions a Day 1 to 50 - The discussions -
17-05-2008, 12:28 PM
Quote:
Originally Posted by implex
sorry !!
D(x)=x^2+(1-sqrt(3))x+2
R(x)-D(x)=x^2-(1+sqrt(3))x
clealry for any non positive x
rhs is positive
so is lhs
R(x)>D(x)
option 3)!!
Ok -> here is how we factorize x^6 + 4x^3 + 8 -> we all know the factorization of a^3 + b^3 + c^3 - 3abc = (a+b+c)(a^2 + b^2 + c^2 - ab - bc - ca). In our question, a = x^2, b = -2x, c = 2.
A small reconfirmation on the concept in the choices -> non-positive or non-negative includes 0 and hence choice (5) is our answer.
Sorry for revealing this a bit early -> but somehow I didn't want to spend more time in this dull environment where the participation is almost zilch.
What lies in front of you or behind you is nothing compared to what lies within you - T.M.W.S.H.F
The greatest events in the life aren't the loudest, but the quietest hours - Anonymous
Re: CAT 2008: Quantitative Questions a Day 1 to 50 - The discussions -
17-05-2008, 12:30 PM
by dividing given polynomial by x^3-1 we get,R(x)=2x^2+2x+2
(or split given polynomial in powers of 3 put x^3=1 n remaining gives remainder)
now for D(X),
x^6 + 4x^3 + 8=O FOR x^3 =-2+i*2 & x^3 =-2- i*2
so,x^6 + 4x^3 + 8= [x^3-(-2+i*2)][x^3-(-2-i*2)] D(X)=[x^3-(-2+i*2)] or [x^3-(-2-i*2)]
consider D(X)=[x^3-(-2+i*2)]
option 1 & 2 certainly don't apply
for option 3, f(x)={R(x)=2x^2+2x+2}- {D(X)=[x^3-(-2+i*2)]}
=2x^2+2x+2-x^3-(-2+i*2)
f(x) can be =+ve or -ve depending upon x
so we are left with option 5.
Re: CAT 2008: Quantitative Questions a Day 1 to 50 - The discussions -
17-05-2008, 12:34 PM
Quote:
Originally Posted by Aarav
Ok -> here is how we factorize x^6 + 4x^3 + 8 -> we all know the factorization of a^3 + b^3 + c^3 - 3abc = (a+b+c)(a^2 + b^2 + c^2 - ab - bc - ca). In our question, a = x^2, b = -2x, c = 2.
A small reconfirmation on the concept in the choices -> non-positive or non-negative includes 0 and hence choice (5) is our answer.
Sorry for revealing this a bit early -> but somehow I didn't want to spend more time in this dull environment where the participation is almost zilch.
@Aarav if we put the values of a,b and c as suggested lhs will becomes
x^6-20x^3+8
Re: CAT 2008: Quantitative Questions a Day 1 to 50 - The discussions -
17-05-2008, 12:35 PM
Quote:
Originally Posted by rajatkapoor1986
by dividing given polynomial by x^3-1 we get,R(x)=2x^2+2x+2
(or split given polynomial in powers of 3 put x^3=1 n remaining gives remainder)
now for D(X),
x^6 + 4x^3 + 8=O FOR x^3 =-2+i*2 & x^3 =-2- i*2
so,x^6 + 4x^3 + 8= [x^3-(-2+i*2)][x^3-(-2-i*2)] D(X)=[x^3-(-2+i*2)] or [x^3-(-2-i*2)]
consider D(X)=[x^3-(-2+i*2)]
option 1 & 2 certainly don't apply
for option 3, f(x)={R(x)=2x^2+2x+2}- {D(X)=[x^3-(-2+i*2)]}
=2x^2+2x+2-x^3-(-2+i*2)
f(x) can be =+ve or -ve depending upon x
so we are left with option 5.
Answers like these should fetch negative marks. You have made mockery of quant up there.
What lies in front of you or behind you is nothing compared to what lies within you - T.M.W.S.H.F
The greatest events in the life aren't the loudest, but the quietest hours - Anonymous
Re: CAT 2008: Quantitative Questions a Day 1 to 50 - The discussions -
17-05-2008, 12:41 PM
Quote:
Originally Posted by rajatkapoor1986
by dividing given polynomial by x^3-1 we get,R(x)=2x^2+2x+2
(or split given polynomial in powers of 3 put x^3=1 n remaining gives remainder)
now for D(X),
x^6 + 4x^3 + 8=O FOR x^3 =-2+i*2 & x^3 =-2- i*2
so,x^6 + 4x^3 + 8= [x^3-(-2+i*2)][x^3-(-2-i*2)] D(X)=[x^3-(-2+i*2)] or [x^3-(-2-i*2)]
consider D(X)=[x^3-(-2+i*2)]
option 1 & 2 certainly don't apply
for option 3, f(x)={R(x)=2x^2+2x+2}- {D(X)=[x^3-(-2+i*2)]}
=2x^2+2x+2-x^3-(-2+i*2)
f(x) can be =+ve or -ve depending upon x
so we are left with option 5.
complex numbers can't be compared
so you can't really say R(x)-D(x) is greater than 0 or not
There is no notion of value of complex numbers so their comparison is absurd
Let R(x) be the remainder when x^16 + x^8 + x^6 + x^4 + x^2 + 1 is divided by x^3 - 1. Let D(x) be the divisor (less than degree 4) of x^6 + 4x^3 + 8. Then which among the following is true?
(1) The sum of the coefficients of R(x) and D(x) is equal
(2) The sum of the absolute value of coefficients of R(x) and D(x) is equal
(3) R(x) > D(x) for all non-positive x
(4) at least 2 of the above
(5) none of the above
Ans:
The remainder when x^16 + x^8 + x^6 + x^4 + x^2 + 1 is divided by X^3-1 is 2x^2+2 +1 ---> 1
R(x)=2x^2+2+1
x^2+2 divides x^6+4X^3+8 which is degree < 4
D(x)=x^2+2
option 1 is not true
option 2 I am bit confused i assume absolute value of coefficient is constant term then this is false
option 3 is clearly false
take the value of -1 R(x) = 1 D(x) = 3
if my assumption is correct then ans is 5
Linear Mode
