The sequence a1, a2,.....an...is such that an= 2an-1-x for all positive integers n>=2 and for certain number x. If a5=99 and a3=27, what is the value of x ?
A. 3
B. 9
C. 18
D. 36
E. 45
Number property problem, need explanation plz
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I think you may need to add some brackets here. As it stands, the question is very ambiguous.akpareek wrote:The sequence a1, a2,.....an...is such that an= 2an-1-x for all positive integers n>=2 and for certain number x. If a5=99 and a3=27, what is the value of x ?
A. 3
B. 9
C. 18
D. 36
E. 45
For example, what does 2an-1-x mean?
Since we're referring to terms in a sequence, and since there are no subscript options on this forum, it may be better to write term1, term2, terms(n-1) etc rather than an-1
Cheers,
Brent
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- Brent@GMATPrepNow
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Here's how I might word the question to prevent ambiguity..
So, what is term4?
From the definition of the sequence term4 = 2(term3) - x
Since we're told that term3 = 27, we'll plug this in to get:
term4 = 2(27) - x
In other words, term4 = 54 - x
We can now plug this into the formula for finding term5
term5 = 2(term4) - x
= 2(54 - x) - x
= 108 - 2x - x
= 108 - 3x
We're told that term5 = 99, so we can write: 99 = 108 - 3x
When we solve for x, we get [spoiler]x = 3[/spoiler]
Answer: A
Cheers,
Brent
From the definition of the sequence term5= 2(term4) - xThe sequence term1, term2,.....termn...is such that termn= 2[term(n-1)]- x for all positive integers n > 2 and for certain number x. If term5 = 99 and term3 = 27, what is the value of x ?
A. 3
B. 9
C. 18
D. 36
E. 45
So, what is term4?
From the definition of the sequence term4 = 2(term3) - x
Since we're told that term3 = 27, we'll plug this in to get:
term4 = 2(27) - x
In other words, term4 = 54 - x
We can now plug this into the formula for finding term5
term5 = 2(term4) - x
= 2(54 - x) - x
= 108 - 2x - x
= 108 - 3x
We're told that term5 = 99, so we can write: 99 = 108 - 3x
When we solve for x, we get [spoiler]x = 3[/spoiler]
Answer: A
Cheers,
Brent