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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 04 Feb 2016, 17:50
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Is f(n) > f(n − 1)?

(1) n = 8
(2) f(n) = n - 1
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B
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 04 Feb 2016, 20:44
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Is f(n)>f(n−1)?

(1) n=8

(2) f(n) = n-1
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Statement 1: It tells us nothing about the function. Insufficient.
Statement 2:
f(n) = n - 1
f(n-1) = n - 2

We have two numbers that can be compared and the relation can be found out.
SUFFICIENT
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 05 Feb 2016, 07:05
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Is f(n)>f(n−1)?

(1) n=8

(2) f(n) = n-1
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Question : Is f(n)>f(n−1)?

We need the definition of the function f(n) to answer the question

Statement 1: n=8
Since we have no definition of function to falculate f(n) hence
NOT SUFFICIENT

Statement 2: f(n) = n-1
i.e. f(n-1) = (n-1)-1 = n-2
and (n-1) will always be less than (n-2), Hence,
SUFFICIENT

Answer: Option B
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 07 Feb 2016, 14:25
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1. No information about the function itself. f(n) could be more or less than f(n-1). NOT SUFFICIENT
2. Gives us the general function. From this we have sufficient information to test the inequality. SUFFICIENT

ANSWER D



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Is f(n)>f(n−1)?

(1) n=8

(2) f(n) = n-1
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 Updated on: 07 Jul 2020, 18:25
Originally posted by BrentGMATPrepNow on 26 Aug 2016, 12:05.
Last edited by BrentGMATPrepNow on 07 Jul 2020, 18:25, edited 1 time in total.
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Is f(n) > f(n−1)?

(1) n = 8

(2) f(n) = n-1
Show more

Target question: Is f(n) > f(n−1)?

Statement 1: n = 8
Plug n = 8 into target question to get: Is f(8) > f(8−1)?
In other words, Is f(8) > f(7)?
We cannot answer the target question with certainty, because we don't know anything about the function f.
So, statement 1 is NOT SUFFICIENT

Statement 1: f(n) = n-1
At first glance, we might assume that statement 2 is not sufficient, since we don't know the value of n.
However, now that we know how the function f behaves, we can, indeed answer the target question.
If f(n) = n-1, then...
f(n) = n - 1 and f(n - 1) = (n - 1) - 1 = n - 2
So, the original target question Is f(n) > f(n−1)? becomes Is n - 1 > n − 2?
Sure, n - 1 is definitely greater than n - 2
Since we can answer the target question with certainty, statement 2 is SUFFICIENT

Answer = B
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 16 Apr 2018, 07:45
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Is f(n)>f(n−1)?

(1) n=8

(2) f(n) = n-1
Show more

Forget conventional ways of solving math questions. For DS problems, the VA (Variable Approach) method is the quickest and easiest way to find the answer without actually solving the problem. Remember that equal numbers of variables and independent equations ensure a solution.

Since we have 1 variable (n) and 0 equations, D is most likely to be the answer. So, we should consider each of the conditions on their own first.

Condition 1) : n = 8
Since f(n) is not determined, condition 1) is not sufficient.

Condition 2) : f(n) = n - 1
Since f(n) = n - 1, we have f(n-1) = (n-1)-1 = n-2.
Since n - 1 > n - 2, f(n) > f(n-1).
Thus, the condition 2) is sufficient.

Therefore, B is the answer.

If the original condition includes “1 variable”, or “2 variables and 1 equation”, or “3 variables and 2 equations” etc., one more equation is required to answer the question. If each of conditions 1) and 2) provide an additional equation, there is a 59% chance that D is the answer, a 38% chance that A or B is the answer, and a 3% chance that the answer is C or E. Thus, answer D (conditions 1) and 2), when applied separately, are sufficient to answer the question) is most likely, but there may be cases where the answer is A,B,C or E.
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 22 Nov 2020, 10:47
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Is f(n)>f(n−1)?

(1) n=8

(2) f(n) = n-1
Show more

(1) We can rephrase the question as \(f(8)>f(7)\)?

However, we have no information regarding the function. INSUFFICIENT.

(2) We have \(n - 1 > (n - 1) - 1\)
\(n - 1 > n -2\)

SUFFICIENT.
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 15 May 2021, 07:06
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zxcvbnmas
Is f(n) > f(n−1)?

(1) n = 8

(2) f(n) = n-1

Target question: Is f(n) > f(n−1)?

Statement 1: n = 8
Plug n = 8 into target question to get: Is f(8) > f(8−1)?
In other words, Is f(8) > f(7)?
We cannot answer the target question with certainty, because we don't know anything about the function f.
So, statement 1 is NOT SUFFICIENT

Statement 1: f(n) = n-1
At first glance, we might assume that statement 2 is not sufficient, since we don't know the value of n.
However, now that we know how the function f behaves, we can, indeed answer the target question.
If f(n) = n-1, then...
f(n) = n - 1 and f(n - 1) = (n - 1) - 1 = n - 2
So, the original target question Is f(n) > f(n−1)? becomes Is n - 1 > n − 2?
Sure, n - 1 is definitely greater than n - 2
Since we can answer the target question with certainty, statement 2 is SUFFICIENT

Answer = B
Show more


BrentGMATPrepNow in ST 1 , f(8) > f(7)? what do you mean "because we don't know anything about the function f." we know what "n" is.... Can you give example how in this case function may behave :)

i thought St 1 is sufficient ... i just wrote 8>7 :lol:

Any videos on functions ? :)
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 15 May 2021, 12:08
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zxcvbnmas
Is f(n) > f(n−1)?

(1) n = 8

(2) f(n) = n-1

Target question: Is f(n) > f(n−1)?

Statement 1: n = 8
Plug n = 8 into target question to get: Is f(8) > f(8−1)?
In other words, Is f(8) > f(7)?
We cannot answer the target question with certainty, because we don't know anything about the function f.
So, statement 1 is NOT SUFFICIENT

Statement 1: f(n) = n-1
At first glance, we might assume that statement 2 is not sufficient, since we don't know the value of n.
However, now that we know how the function f behaves, we can, indeed answer the target question.
If f(n) = n-1, then...
f(n) = n - 1 and f(n - 1) = (n - 1) - 1 = n - 2
So, the original target question Is f(n) > f(n−1)? becomes Is n - 1 > n − 2?
Sure, n - 1 is definitely greater than n - 2
Since we can answer the target question with certainty, statement 2 is SUFFICIENT

Answer = B


BrentGMATPrepNow in ST 1 , f(8) > f(7)? what do you mean "because we don't know anything about the function f." we know what "n" is.... Can you give example how in this case function may behave :)

i thought St 1 is sufficient ... i just wrote 8>7 :lol:

Any videos on functions ? :)
Show more

Here's an example:

f(n) = 2 - n
(1) n = 8
So, f(n) = f(8) = 2 - 8 = -6
And f(n-1) = f(7) = 2 - 7 = -5
In this case, f(n-1) > f(n)

Now consider the function f(n) = 2n
(1) n = 8
So, f(n) = f(8) = (2)(8) = 16
And f(n-1) = f(7) = (2)(7) = 14
In this case, f(n) > f(n-1)

Does that help?
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 31 Oct 2022, 08:24
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Is f(n) > f(n−1)?

(1) n = 8

(2) f(n) = n-1

Target question: Is f(n) > f(n−1)?

Statement 1: n = 8
Plug n = 8 into target question to get: Is f(8) > f(8−1)?
In other words, Is f(8) > f(7)?
We cannot answer the target question with certainty, because we don't know anything about the function f.
So, statement 1 is NOT SUFFICIENT

Statement 1: f(n) = n-1
At first glance, we might assume that statement 2 is not sufficient, since we don't know the value of n.
However, now that we know how the function f behaves, we can, indeed answer the target question.
If f(n) = n-1, then...
f(n) = n - 1 and f(n - 1) = (n - 1) - 1 = n - 2
So, the original target question Is f(n) > f(n−1)? becomes Is n - 1 > n − 2?
Sure, n - 1 is definitely greater than n - 2
Since we can answer the target question with certainty, statement 2 is SUFFICIENT

Answer = B
Show more

Hi BrentGMATPrepNow, For St.1 not sufficient, is it because it's being given as n = 8 and not f(n) = 8? Therefore function f is not being defined.
Could we understand it this way? Thanks Brent
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 31 Oct 2022, 12:53
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Hi BrentGMATPrepNow, For St.1 not sufficient, is it because it's being given as n = 8 and not f(n) = 8? Therefore function f is not being defined.
Could we understand it this way? Thanks Brent
Show more
That's correct.
If we don't have any information about what the function does, there's no way to answer the target question.
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 31 Oct 2022, 14:56
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Kimberly77


Hi BrentGMATPrepNow, For St.1 not sufficient, is it because it's being given as n = 8 and not f(n) = 8? Therefore function f is not being defined.
Could we understand it this way? Thanks Brent
That's correct.
If we don't have any information about what the function does, there's no way to answer the target question.
Show more

Brilliant thanks BrentGMATPrepNow for great explanation always. :thumbsup: :please:
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Is f(n) > f(n 1)? (1) n = 8 (2) f(n) = n - 1 23 Sep 2025, 05:39
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