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20 Apr 2020, 13:04
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
15%
(low)
Question Stats:
83% (01:36) correct
17%
(02:02)
wrong
based on 2527
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If k and n are positive integers such that n > k, then \(k! + (n-k)*(k-1)!\) is equivalent to which of the following?
(A) \(k*n!\)
(B) \(k! *n\)
(C) \((n-k)!\)
(D) \(n*(k+1)!\)
(E) \(n*(k-1)!\)
PS70371.02
(A) \(k*n!\)
(B) \(k! *n\)
(C) \((n-k)!\)
(D) \(n*(k+1)!\)
(E) \(n*(k-1)!\)
PS70371.02
Updated on: 10 Apr 2022, 15:20
Originally posted by BrentGMATPrepNow on 30 Apr 2020, 12:28.
Last edited by BrentGMATPrepNow on 10 Apr 2022, 15:20, edited 1 time in total.
Last edited by BrentGMATPrepNow on 10 Apr 2022, 15:20, edited 1 time in total.
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gmatt1476
STRATEGY: Upon reading any GMAT Problem Solving question, we should always ask, Can I use the answer choices to my advantage?
In this case, we can easily test the answer choices for equivalency.
Now let's give ourselves up to 20 seconds to identify a faster approach.
In this case, we can also try to simplify the expression so that it matches one of the answer choices.
I think testing for equivalency will be faster, so I'll go with that...
Key concept: If two expressions are equivalent, they must evaluate to the same value for every possible value of x.
For example, since the expression 2x + 3x is equivalent to the expression 5x, the two expressions will evaluate to the same number for every value of x.
So, if x = 7, the expression 2x + 3x = 2(7) + 3(7) = 14 + 21 = 35, and the expression 5x = 5(7) = 35
Let's test n = 3 and k = 2.
Plug n = 3 and k = 2 into the given expression to get: k! + (n - k)(k -1)! = 2! + (3 - 2)(2 -1)! = 2! + (1)(1!) = 2 + 1 = 3:
Now we'll plug n = 3 and k = 2 into the five answer choices see which one(s) evaluate(s) to 3:
(A) (k)(n!) = (2)(3!) = (2)(6) = 12. No good. Eliminate.
(B) (k!)(n) = (2!)(3) = (2)(3) = 6. No good. Eliminate.
(C) (n - k)! = (3 - 2)! = 1! = 1. No good. Eliminate.
(D) (n)(k + 1)! = (3)(2 + 1)! = (3)(3!) = (3)(6) = 18. No good. Eliminate.
(E) (n)(k - 1)! = (3)(2 - 1)! = (3)(1!) = (3)(1) = 3. Perfect!!
Answer: E
----------------------------------------------------------
ALTERNATE APPROACH: Apply some algebra
Key Concept #1: k! = (k)(k-1)(k-2)(k-3)....(3)(2)(1)
Key Concept #2: (k-1)! = (k-1)(k-2)(k-3)....(3)(2)(1)
Key Concept #3: (x-y)(z) = xz - yz
So....
Take: k! + (n-k)(k-1)!
Apply concept #2 to get: k! + (n - k)(k-1)(k-2)(k-3)....(3)(2)(1)
Apply concept #3 to get: k! + (n)(k-1)(k-2)(k-3)....(3)(2)(1) - (k)(k-1)(k-2)(k-3)....(3)(2)(1)
Notice that (k)(k-1)(k-2)(k-3)....(3)(2)(1) = k!
And (k-1)(k-2)(k-3)....(3)(2)(1) = (k - 1)!
Substitute to get: k! - (n)(k - 1)! - k!
Simplify to get: (n)(k - 1)!
Answer: E
Cheers,
Brent
20 Apr 2020, 13:17
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Answer: E
k!+(n-k)*(k-1)!
=k*(k-1)!+(n-k)*(k-1)!
=(k-1)!*[k+n-k]
=n*(k-1)!
Posted from my mobile device
k!+(n-k)*(k-1)!
=k*(k-1)!+(n-k)*(k-1)!
=(k-1)!*[k+n-k]
=n*(k-1)!
Posted from my mobile device
