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When x/8 the remainder is 3 ...
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30 Jul 2021, 15:14
30 Jul 2021, 15:14
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When \({\frac{x}{8}}\) the remainder is 3. What is the remainder when \({\frac{x^4}{8}}\) ?
(A) 5
(B) 4
(C) 3
(D) 2
(E) 1
(A) 5
(B) 4
(C) 3
(D) 2
(E) 1
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Re: When x/8 the remainder is 3 ...
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30 Jul 2021, 19:38
30 Jul 2021, 19:38
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motion2020 wrote:
When \({\frac{x}{8}}\) the remainder is 3. What is the remainder when \({\frac{x^4}{8}}\) ?
(A) 5
(B) 4
(C) 3
(D) 2
(E) 1
(A) 5
(B) 4
(C) 3
(D) 2
(E) 1
Remember: Whenever we divide a number with another one (\(\frac{N}{D}\)), where N < D, N becomes the remainder
Let \(x\) be 3 which will leave remainder of 3 when divided by 8
So, \(3^4 = 81\) when divided by 8 will leave remainder of 1
Also, when \(x\) is 11
\(11^4\) will also leave remainder of 1 when divided by 8
Hence, option E
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Re: When x/8 the remainder is 3 ...
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04 Sep 2022, 09:54
04 Sep 2022, 09:54
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When \({\frac{x}{8}}\) the remainder is 3
Theory: Dividend = Divisor*Quotient + Remainder
x -> Dividend
8 -> Divisor
k -> Quotient (Assume)
3 -> Remainders
=> x = 8*k + 3 = 8k + 3
What is the remainder when \({\frac{x^4}{8}}\)
\(x^4\) = \((8k + 3)^4\)
Now, \((8k + 3)^4\) will have all terms which are multiples if 8 except one term which is \(3^4\) = 81
So, Remainder of \((8k + 3)^4\) by 8 is same as remainder of 81 by 8, which is 1
So, Answer will be E
Hope it helps!
Watch the following video to learn the Basics of Remainders
Theory: Dividend = Divisor*Quotient + Remainder
x -> Dividend
8 -> Divisor
k -> Quotient (Assume)
3 -> Remainders
=> x = 8*k + 3 = 8k + 3
What is the remainder when \({\frac{x^4}{8}}\)
\(x^4\) = \((8k + 3)^4\)
Now, \((8k + 3)^4\) will have all terms which are multiples if 8 except one term which is \(3^4\) = 81
So, Remainder of \((8k + 3)^4\) by 8 is same as remainder of 81 by 8, which is 1
So, Answer will be E
Hope it helps!
Watch the following video to learn the Basics of Remainders
