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705-805 (Hard)|   Remainders|      
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paridhi987
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 03:53
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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:

85% (hard)

Question Stats:

53% (02:22) correct 47% (02:29) wrong based on 313 sessions

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­When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

A. None
B. I only
C. II only
D. III only
E. I, II, and III­
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Official Answer
C
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Natashaairan
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 05:25
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Please explain

X can have a possible value as 2
As 2^3 will leave reminder 0

But 8 cube and 20 cube won’t

So x can only be 2
2 when divided by 256

Will leave reminder 2

So I think the answer should be B ??

Posted from my mobile device
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paridhi987
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 06:21
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Natashaairan
Please explain

X can have a possible value as 2
As 2^3 will leave reminder 0

But 8 cube and 20 cube won’t

So x can only be 2
2 when divided by 256

Will leave reminder 2

So I think the answer should be B ??

Posted from my mobile device
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­But 8^3=512 which is divisible by 256?
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 06:57
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paridhi987

When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

x^3 = 256k = 2^8k = 2^6*4k

k is of the form 2m^3
x ^3 = 2^8*2m^3 = 2^9m^3
x = 2^3m = 8m

Case 1: x = 8m = 256k + 8; 256k = 8(m-1); When m = 1; x = 8; The remainder when x is divided by 256 = 8
Case 2: x = 8m = 256k + 2; 256k = 8m - 2 = 2(4m-1): Not feasible since 4m-1 is odd
Case 3: x = 8m = 256k + 20; 256k = 8m - 20 = 4(2m-5); Not feasible since 2m-5 is odd

A. None
B. I only
C. II only
D. III only
E. I, II, and III­

IMO C­
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 07:12
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Kinshook
paridhi987

When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

x^3 = 256k = 2^8k = 2^6*4k

k is of the form 2m^3
x ^3 = 2^8*2m^3 = 2^9m^3
x = 2^3m = 8m

Case 1: x = 8m = 256k + 8; 256k = 8(m-1); When m = 1; x = 8; The remainder when x is divided by 256 = 8
Case 2: x = 8m = 256k + 2; 256k = 8m - 2 = 2(4m-1): Not feasible since 4m-1 is odd
Case 3: x = 8m = 256k + 20; 256k = 8m - 20 = 4(2m-5); Not feasible since 2m-5 is odd

A. None
B. I only
C. II only
D. III only
E. I, II, and III­

IMO C­
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­Hi Kinshook , how do we get the step 'k is of the form 2m^3'?
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 07:51
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Kinshook
paridhi987

When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

x^3 = 256k = 2^8k = 2^6*4k

k is of the form 2m^3
x ^3 = 2^8*2m^3 = 2^9m^3
x = 2^3m = 8m

Case 1: x = 8m = 256k + 8; 256k = 8(m-1); When m = 1; x = 8; The remainder when x is divided by 256 = 8
Case 2: x = 8m = 256k + 2; 256k = 8m - 2 = 2(4m-1): Not feasible since 4m-1 is odd
Case 3: x = 8m = 256k + 20; 256k = 8m - 20 = 4(2m-5); Not feasible since 2m-5 is odd

A. None
B. I only
C. II only
D. III only
E. I, II, and III­

IMO C­
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­
Why is it not feasible if 4m-1 2m-5 are odd
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 14:46
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paridhi987
­When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

A. None
B. I only
C. II only
D. III only
E. I, II, and III­
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Given \(x^3\) = \(256n\)

Hence \(x\) must be a multiple of \(8\)

(I) 2 : For remainder to be \(2\)

Check multiples of \(8,16,24 \)...etc not possible to get remainder of \(2\) when divided by \(256\)

Reverse way : Any number such as \(258\) which gives a remainder of \(2\), when divided by \(256,\) will not be divisible \(256 \) when cubed.

\(\frac{(258)^3}{256} \)= not an integer. This falsifies the question

(II) For remainder to be \(8\)

If \(x = 8\) then \(\frac{8^3}{256} \)= integer, Also \(\frac{8}{256} \)= remainder \(8\). True.

(III) : For remainder to be \(20\)

Check multiples of \(8,16,24\) ...etc not possible to get remainder of \(20\) when divided by \(256\)

Reverse way : Any number such as \(276\) which gives a remainder of \(20,\) when divided by \(256\), will not be divisible by \(256\) when cubed.

\(\frac{(276)^3}{256} \)= not an integer.This falsifies the question

Ans C

Hope it helped.­
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 23 Aug 2024, 20:35
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x^3 = 256k = 2^8 * k where k is an integer

where 2^8 * k is a whole number. That means k MUST be of the form 2*m^3 where m is an integer

That means x^3 must be of the form:

x^3
= 2^8 * (k)
= 2^8 * (2*m^3)
= 2^9 * m^3

That means x must be of the form
2^3 * m or 8m

Now, for 8m, the values go like 0, 8, 16, 24 etc.

For any whole number a, the values of x can be also written as 256a + 8, 256a + 16, 256a + 24... each of which leaves a multiple of 8 as the remainder.

The only remainder that satisfies this condition in the three choices is 8.

Thus B.
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 19 Nov 2024, 08:42
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Hi.. I'm sorry but can someone explain why the "k" in 256k must be of the form 2m^3 and why not just m^3?
rish_dutton
x^3 = 256k = 2^8 * k where k is an integer

where 2^8 * k is a whole number. That means k MUST be of the form 2*m^3 where m is an integer

That means x^3 must be of the form:

x^3
= 2^8 * (k)
= 2^8 * (2*m^3)
= 2^9 * m^3

That means x must be of the form
2^3 * m or 8m

Now, for 8m, the values go like 0, 8, 16, 24 etc.

For any whole number a, the values of x can be also written as 256a + 8, 256a + 16, 256a + 24... each of which leaves a multiple of 8 as the remainder.

The only remainder that satisfies this condition in the three choices is 8.

Thus B.
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 19 Nov 2024, 10:30
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Hi.. I'm sorry but can someone explain why the "k" in 256k must be of the form 2m^3 and why not just m^3?
rish_dutton
x^3 = 256k = 2^8 * k where k is an integer

where 2^8 * k is a whole number. That means k MUST be of the form 2*m^3 where m is an integer

That means x^3 must be of the form:

x^3
= 2^8 * (k)
= 2^8 * (2*m^3)
= 2^9 * m^3

That means x must be of the form
2^3 * m or 8m

Now, for 8m, the values go like 0, 8, 16, 24 etc.

For any whole number a, the values of x can be also written as 256a + 8, 256a + 16, 256a + 24... each of which leaves a multiple of 8 as the remainder.

The only remainder that satisfies this condition in the three choices is 8.

Thus B.
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\(x^3 = 2^8 * k\)

The left-hand side is the cube of an integer, so the right-hand side must also be the cube of an integer. This means the power of 2 in 2^8 must be completed to a multiple of 3, which can be done by multiplying it by another 2. So, k must be 2 multiplied by the cube of an integer:

\(x^3 = 2^8 * k = 2^8 * (2 * m^3) = 2^9 * m^3 = (2^3 * m)^3 = (integer)^3\)

Hope it helps.
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 19 Nov 2024, 10:36
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Aw mann.. I gotta do better. Its clear now. Thank you so much!
Bunuel
Sudhanwa23
Hi.. I'm sorry but can someone explain why the "k" in 256k must be of the form 2m^3 and why not just m^3?
rish_dutton
x^3 = 256k = 2^8 * k where k is an integer

where 2^8 * k is a whole number. That means k MUST be of the form 2*m^3 where m is an integer

That means x^3 must be of the form:

x^3
= 2^8 * (k)
= 2^8 * (2*m^3)
= 2^9 * m^3

That means x must be of the form
2^3 * m or 8m

Now, for 8m, the values go like 0, 8, 16, 24 etc.

For any whole number a, the values of x can be also written as 256a + 8, 256a + 16, 256a + 24... each of which leaves a multiple of 8 as the remainder.

The only remainder that satisfies this condition in the three choices is 8.

Thus B.


\(x^3 = 2^8 * k\)

The left-hand side is the cube of an integer, so the right-hand side must also be the cube of an integer. This means the power of 2 in 2^8 must be completed to a multiple of 3, which can be done by multiplying it by another 2. So, k must be 2 multiplied by the cube of an integer:


\(x^3 = 2^8 * k = 2^8 * (2 * m^3) = 2^9 * m^3 = (2^3 * m)^3 = (integer)^3\)

Hope it helps.
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­When integer x^3 is divided by 256, the remainder is 0. Which if the 09 Apr 2026, 23:36
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Simplest way to solve is by noticing that you need 2^3 as the factor of x so that 2^3*3 = 2^9 would give remainder as 0 when divided by 256 or 2^8.
Any multiple of 8 would thus give a remainder of 0.
Thus 8y/256 would give remainder 0, 8, 16 and so on..
1 and 3 are thus out.
2 is the only answer.
paridhi987
­When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

A. None
B. I only
C. II only
D. III only
E. I, II, and III­
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­When integer x^3 is divided by 256, the remainder is 0. Which if the Updated on: 10 Apr 2026, 03:38
Originally posted by KarishmaB on 09 Apr 2026, 23:51.
Last edited by Bunuel on 10 Apr 2026, 03:38, edited 1 time in total.
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paridhi987
­When integer x^3 is divided by 256, the remainder is 0. Which if the following could be the remainder when x is divided by 256?

I. 2
II. 8
III. 20

A. None
B. I only
C. II only
D. III only
E. I, II, and III­
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x^3 is divisible by 256 = 2^8.
So x must be divisible by 2^3 = 8 at least. Hence we can make groups of 8 with nothing leftover from x.

When we divide x by 256, we will put together 32 groups of 8 to make a group of 256. Hence we may have no groups of 8 remaining, 1 group 8 remaining, 2 groups of 8 remaining etc till 31 groups of 8 remaining.
So the remainder will be 0 or 8 or 16 or 24 or 32 ... 248

Of the given options, only 8 is possible.

Answer (C)

Division and Remainders discussed here:

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