If x, y, and z are nonzero numbers, is (x)(y + z) > 0?
(1) |x + y| = |x| + |y|
(2) |z + y| = |y| + |z|
Source : MGMAT CAT
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bhumika.k.shah
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thephoenix
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IMO Cbhumika.k.shah wrote:If x, y, and z are nonzero numbers, is (x)(y + z) > 0?
(1) |x + y| = |x| + |y|
(2) |z + y| = |y| + |z|
Source : MGMAT CAT
we need to prove x(y+z)>0----->x(y+z)=+ve number
it can happen if bth x and (y+z) are +ve or >0 OR bth x and (y+z) are -ve or <0 at same point of time
s1)----->either x and y are +ve or bth -ve-----> if x is >0--->y>0 or else x<0---->y<0
insuff
s2) same if z>0,y>0 or if z<0,y<0
insuff
combining
if x>0--->y>0---->z>0---->prodct>0
if x<0--->y<0---->z<0----->prod>0
hence suff
Last edited by thephoenix on Sat Apr 03, 2010 10:24 am, edited 1 time in total.
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bhumika.k.shah
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YEa but how ?
Could you pick #s and explain ?
Could you pick #s and explain ?
thephoenix wrote:IMO Cbhumika.k.shah wrote:If x, y, and z are nonzero numbers, is (x)(y + z) > 0?
(1) |x + y| = |x| + |y|
(2) |z + y| = |y| + |z|
Source : MGMAT CAT
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thephoenix
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just take simple no's x=1 y=2 and z=3bhumika.k.shah wrote:YEa but how ?
Could you pick #s and explain ?
thephoenix wrote:IMO Cbhumika.k.shah wrote:If x, y, and z are nonzero numbers, is (x)(y + z) > 0?
(1) |x + y| = |x| + |y|
(2) |z + y| = |y| + |z|
Source : MGMAT CAT
s1)1+2=3 for bth side
but if u take one -ve and one positive value at same point of time then s1 does not holds
say x=-1 and y=2
then LHS=1 and RHS =3
in order to satisfy this statement bth x and y has to be of same sign
same is with s2)
bhumika.k.shah wrote:If x, y, and z are nonzero numbers, is (x)(y + z) > 0?
(1) |x + y| = |x| + |y|
(2) |z + y| = |y| + |z|
Source : MGMAT CAT
statement 1 : insufficient
according to statement we can conclude that both x and y are of the same sign .. either -ve or +ve i.e if the x and y are of different signs then scondtion given in statement 1 can not be satisfies ( pick some number and try )
but it don't say anything about z , so by taking different values of z ... (x) (y+z) could be greater than or less than zero ( pick some no. and try )
eg.
(2) (3-4) < 0
and
(2) (3+4) >0
similarly statement 2 is insufficient
but both statement states that x,y and z are of same sign .. either -ve or +ve
so if all positive then
(2) (3 +4) > 0
and if all negative
(-2) (-3-4) >0
so taking both statement together answer is always yes...
so the answer is C
