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26 Aug 2020, 23:37
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If m and n are integers, is (mn + 2)(mn + 3)(mn + 4) divisible by 12?
(1) m is an even integer
(2) m + n is an odd integer
(1) m is an even integer
(2) m + n is an odd integer
26 Aug 2020, 23:57
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Answer: D
The number(mn + 2)(mn + 3)(mn + 4) is multiple of 3 consecutive numbers.
To find : (mn + 2)(mn + 3)(mn + 4) is divisible by 12 or not.
Statement 1:
M is even integer.
Hence mn is also even.
12=2*2*3
(mn + 2)(mn + 3)(mn + 4) =even>24 which is surely divisible by 12.
Statement 1 is sufficient.
Statement 2:
m+n=odd
=>m=odd,n=even or m=even,n=odd
So,mn=even.Hence as statement 1, statement 2 is also sufficient.
Posted from my mobile device
The number(mn + 2)(mn + 3)(mn + 4) is multiple of 3 consecutive numbers.
To find : (mn + 2)(mn + 3)(mn + 4) is divisible by 12 or not.
Statement 1:
M is even integer.
Hence mn is also even.
12=2*2*3
(mn + 2)(mn + 3)(mn + 4) =even>24 which is surely divisible by 12.
Statement 1 is sufficient.
Statement 2:
m+n=odd
=>m=odd,n=even or m=even,n=odd
So,mn=even.Hence as statement 1, statement 2 is also sufficient.
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27 Aug 2020, 00:06
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Given: If m and n are integers
To find: is (mn + 2)(mn + 3)(mn + 4) divisible by 12?
Solution:
(mn + 2),(mn + 3),and (mn + 4) are consecutive numbers.
For ex if mn is 1
(mn + 2) = 3
(mn + 3) = 4
(mn + 4) = 5
Every 3 consecutive positive numbers (1,2,&3 = 1*2*3 = 6) have 6 as its factor if are put into multiplication (2,3&4 = 2*3*4 = 24. 3*4*5 = 60 and so on.
(1) m is an even integer
If m is even
Mn will be even
And any 3 consecutive number starting with even and ending with even will have 12 as its factor.
So let m = 2.
N = 1
Mn = 2*1 = 2 (even)
(2+2)(2+3)(2+4) = (4)(5)(6)/12 (integer no.)
Let m = 14 & n = 1
(14+2)(14+3)(14+4) = 16*17*18/12
And so on......
(Sufficient)
(2) m + n is an odd integer
Odd +even = odd
Even + odd = odd
And even*odd = even
So mn = even.
And any 3 consecutive number starting with even and ending with even will have 12 as its factor.
So let m = 16.
N = 5
Mn = 16*5 = 80 (even)
(80+2)(80+3)(80+4) = (82)(83)(84)/12 (integer no.)
Let m = 10
N = 7
(70+2)(70+3)(70+4) = 72*73*74/12 = (integer no.)
And so on......
(Sufficient)
Answer is D
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To find: is (mn + 2)(mn + 3)(mn + 4) divisible by 12?
Solution:
(mn + 2),(mn + 3),and (mn + 4) are consecutive numbers.
For ex if mn is 1
(mn + 2) = 3
(mn + 3) = 4
(mn + 4) = 5
Every 3 consecutive positive numbers (1,2,&3 = 1*2*3 = 6) have 6 as its factor if are put into multiplication (2,3&4 = 2*3*4 = 24. 3*4*5 = 60 and so on.
(1) m is an even integer
If m is even
Mn will be even
And any 3 consecutive number starting with even and ending with even will have 12 as its factor.
So let m = 2.
N = 1
Mn = 2*1 = 2 (even)
(2+2)(2+3)(2+4) = (4)(5)(6)/12 (integer no.)
Let m = 14 & n = 1
(14+2)(14+3)(14+4) = 16*17*18/12
And so on......
(Sufficient)
(2) m + n is an odd integer
Odd +even = odd
Even + odd = odd
And even*odd = even
So mn = even.
And any 3 consecutive number starting with even and ending with even will have 12 as its factor.
So let m = 16.
N = 5
Mn = 16*5 = 80 (even)
(80+2)(80+3)(80+4) = (82)(83)(84)/12 (integer no.)
Let m = 10
N = 7
(70+2)(70+3)(70+4) = 72*73*74/12 = (integer no.)
And so on......
(Sufficient)
Answer is D
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