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350350
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? Updated on: 04 Jun 2021, 12:08
Originally posted by 350350 on 04 Jun 2021, 12:00.
Last edited by Bunuel on 04 Jun 2021, 12:08, edited 1 time in total.
Added the options and the OA.
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

35% (medium)

Question Stats:

66% (01:23) correct 34% (02:03) wrong based on 219 sessions

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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =?

A. 14
B. 21
C. 47
D. 49
E. 51
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C
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 04 Jun 2021, 12:06
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =?

A. 14
B. 21
C. 47
D. 49
E. 51
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Square \(x^4 + x^{(-4)} = 7\):

\(x^8 + 2*x^4*x^{(-4)} + x^{(-8)} = 49\).

Notice that \(x^4*x^{(-4)} = x^4*\frac{1}{x^4} = 1\).

So we have \(x^8 + 2*1 + x^{(-8)} = 49\).

Thus \(x^8 + x^{(-8)} = 47\).

Answer: C.
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 04 Jun 2021, 23:40
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x^4 + x ^-4 = 7
x^4 + 1/x^4 = 7

Squaring on both sides we get, x^8 + 2(x^8)(1/x^8)+1/x^8 = 49
x^8+x^-8 = 49-2 = 47
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 05 Jun 2021, 04:27
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Given,
x^4 + x ^-4 = 7
(consider a = x^4 and b= x ^-4
if we square both the sides, (a+b)^2 = a*a + b*b + 2*a*b
here, 2*a*b will cancel out x term )
Squaring both the sides
x^8 + 2(x^8)(1/x^8)+1/x^8 = 49
x^8 + 1/x^8 = 47

Answer (C)
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 05 Jun 2021, 05:11
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This is a simple question where you have to apply a basic algebraic identity to obtain the value of the given expression.
\((a+b)^2\) = \(a^2 + b^2 + 2ab\).
Therefore, \(a^2 + b^2 = (a+b)^2 – 2ab\)

\(x^4 + x^{(-4)}\) = 7, can be rewritten as \(x^4 + \frac{1}{x^4}\) = 7.

\(x^8 + x^{(-8)}\) = \(x^8 + \frac{1}{x^8}\). Observe that \(x^8 = (x^4)^2\); similarly, \(\frac{1}{x^8} = (\frac{1}{x^4})^2\).

So, we are essentially trying to find the value of an expression in the form of \(a^2 + b^2\).

Therefore, \(x^8 + \frac{1}{x^8}\) = \([x^4 + \frac{1}{x^4}]^2 – 2*x^4*\frac{1}{x^4} \)
= \([7]^2\) – 2 {since the \(x^4\) cancels out}
= 49 – 2 = 47.

The correct answer option is C.

Hope that helps!
Aravind B T
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 15 Jul 2021, 09:17
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =?

A. 14
B. 21
C. 47
D. 49
E. 51
Show more

\(x^4 + \frac{1}{x^4} = 7\)

Squaring,
\(x^8 + \frac{1}{x^8} + 2 = 49\)

\(x^8 + \frac{1}{x^8} = 47\)

Hence, OA is C.
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 16 Jul 2021, 05:29
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Can someone help me to know when to use certain algebraic tools? For example, here, how did you know that squaring both sides would help get the answer. To me, it seems as if it would be complicating it more, therefore making it more difficult, so my brain doesn't think it'll help. Thanks!
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 16 Jul 2021, 07:11
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=> Let \(x^4 = A\) , then \(x^{-4} = \frac{1}{x^4} = \frac{1}{A}\)

=> \(x^4 + x^{-4} = 7 \)

=> \(A + \frac{1}{A} = 7 \)

=>\( A^2 + \frac{1}{A^2} + 2 = 49\) (On squaring both the sides)

=> \(A^2 + \frac{1}{A^2} = 49 - 2 = 47\)

=> \(x^8 = (x^4)^2 = A^2\)

=> \(x^8 + \frac{1}{(x^8)}= A^2 + \frac{1}{A^2} = 47\)

Answer C
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If x^4 + x^(-4) = 7, what is the value of x^8 + x^(-8) =? 30 Sep 2024, 07:28
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