Register

CAT 2003 | Question: 2-89

edited by
496 views

1 Answer

Best answer
1 votes
1 votes
y - x = z - y

x + z = 2y$\dots(1)$

xyz =4 $\dots(2)$

 
We know that, AM  >= GM

Hence, $\frac{x+y+z}{3}$  >= $(xyz)^{\frac{1}{3}}$

From (1) and (2)

$\frac{3y}{3}$ >= $4^{\frac{1}{3}}$

y  >= $2^{\frac{2}{3}}$

 

Hence,Option(B)$2^{\frac{2}{3}}$ is the correct choice.
selected by
User Avatar
Voting & Accepting an answer helps improve the community
← PreviousNext →
← Previous in categoryNext in category →
Answer:

Related questions

0 votes
0 votes
0 answers
1
go_editor asked May 5, 2016
618 views
CAT 2003 | Question: 2-81
Two binary operations $\oplus$ and $*$ are defined over the set $\{a, e, f, g, h\}$ as per the following tables $\oplus$ a e f g h a a e f g h e e f g h a f f g h a e g g h a e f h h a e f g $\ast$ a e f g h a a a a a a e a e f g h f a ... $\{ a10 \ast (f10 \oplus g9)\} \oplus e^8$ equals $e$ $f$ $g$ $h$
Two binary operations $\oplus$ and $*$ are defined over the set $\{a, e, f, g, h\}$ as per the following tables$\oplus$aefghaaefgheefghaffghaegghaefhhaefg $\ast$aefghaaaa...
0 votes
0 votes
1 answer
4
go_editor asked May 4, 2016
1,029 views
CAT 2003 | Question: 2-57
Let $x$ and $y$ be positive integers such that $x$ is prime and $y$ is composite. Then, $y – x$ cannot be an even integer $xy$ cannot be an even integer. $\frac{x+y}{x}$ cannot be an even integer None of these.
Let $x$ and $y$ be positive integers such that $x$ is prime and $y$ is composite. Then,$y – x$ cannot be an even integer$xy$ cannot be an even integer.$\frac{x+y}{x}$ c...
0 votes
0 votes
1 answer
5
go_editor asked May 4, 2016
469 views
CAT 2003 | Question: 2-54
If $a, a + 2$ and $a + 4$ are prime numbers, then the number of possible solutions for $a$ is: one two three more than three
If $a, a + 2$ and $a + 4$ are prime numbers, then the number of possible solutions for $a$ is:onetwothreemore than three
Link Copied!