The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer...

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BTGmoderatorLU: Moderator; Posts: 2505; Joined: Sun Oct 15, 2017 1:50 pm; Followed by:6 members

The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer...

by BTGmoderatorLU » Tue Mar 17, 2020 11:50 am

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Source: Manhattan Prep

The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer \(n \geq 4\). If \(S_1=4, S_2=0,\) and \(S_4=-4\), what is the value of \(S_6?\)

A. -2
B. -12
C. -16
D. -20
E. -24

The OA is E

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Source: Beat The GMAT — Problem Solving | Tue Mar 17, 2020 11:50 am

Jay@ManhattanReview: GMAT Instructor; Posts: 3008; Joined: Mon Aug 22, 2016 6:19 am; Location: Grand Central / New York; Thanked: 470 times; Followed by:34 members

Re: The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer...

by Jay@ManhattanReview » Tue Mar 17, 2020 11:08 pm

BTGmoderatorLU wrote: ↑
Tue Mar 17, 2020 11:50 am
Source: Manhattan Prep

The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer \(n \geq 4\). If \(S_1=4, S_2=0,\) and \(S_4=-4\), what is the value of \(S_6?\)

A. -2
B. -12
C. -16
D. -20
E. -24

The OA is E

\(S_6=S_5+S_4+S_3-5\)

\(S_6=(S_4+S_3+S_2-5)+S_4+S_3-5\)

\(S_6=2S_4+2S_3+S_2-5-5\) ---(1)

Since \(n \geq 4\), we can apply \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) to get the value of \(S_3\).

So let's find out the value of \(S_3\).

From \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\), we have

\(S_4=S_3+S_2+S_1-5\)

Plugging-in the values, we have

\(-4=S_3+0+4-5\)

\(S_3=-3\)

Coming back to equation #1.

\(S_6=2S_4+2S_3+S_2-5-5\)

\(S_6=2*-4+2*-3+0-5-5\)

\(S_6=-24\)

The correct answer: E

Hope this helps!

-Jay
_________________
Manhattan Review Test Prep

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swerve: Legendary Member; Posts: 2499; Joined: Sun Oct 29, 2017 2:04 pm; Followed by:6 members

Re: The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer...

by swerve » Wed Mar 18, 2020 7:03 am

BTGmoderatorLU wrote: ↑
Tue Mar 17, 2020 11:50 am
Source: Manhattan Prep

The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer \(n \geq 4\). If \(S_1=4, S_2=0,\) and \(S_4=-4\), what is the value of \(S_6?\)

A. -2
B. -12
C. -16
D. -20
E. -24

The OA is E

Let's find \(S_3\)

\(S_4=S_3+S_2+S_1-5\). Substitute values in the equation.

Then \(S_3=-3\)

\(S_5=S_4+S_3+S_2-5\). No need to get the value

\(S_6=S_5+S_4+S_3-5\). Substitute \(S_5\) from above then

\(S_6=2S_4+S_3+S_2-10 = -8 - 6 +0 -10 =-24\)

Answer: E

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Scott@TargetTestPrep: GMAT Instructor; Posts: 8086; Joined: Sat Apr 25, 2015 10:56 am; Location: Los Angeles, CA; Thanked: 43 times; Followed by:29 members

Re: The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer...

by Scott@TargetTestPrep » Wed Mar 18, 2020 3:54 pm

BTGmoderatorLU wrote: ↑
Tue Mar 17, 2020 11:50 am
Source: Manhattan Prep

The sequence S is defined by \(S_n=S_{n-1}+S_{n-2}+S_{n-3}-5\) for each integer \(n \geq 4\). If \(S_1=4, S_2=0,\) and \(S_4=-4\), what is the value of \(S_6?\)

A. -2
B. -12
C. -16
D. -20
E. -24

The OA is E

To find the value of s(6), we need the values of s(5), s(4) and s(3). Since we are already given the value of s(4), we need to determine the values of s(5) and s(3).

For s(3), we have:

s(4) = s(3) + s(2) + s(1) - 5

-4 = s(3) + 0 + 4 - 5

-3 = s(3)

So now for s(5), we have:

s(5) = s(4) + s(3) + s(2) - 5

s(5) = -4 + (-3) + 0 - 5

s(5) = -12

Finally, for s(6), we have:

s(6) = s(5) + s(4) + s(3) - 5

s(6) = -12 + (-4) + (-3) - 5 = - 24

Answer: E

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