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What is the largest prime factor of 27^3−9^3−3^6? 19 Feb 2016, 04:06
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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)!

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What is the largest prime factor of \(27^3−9^3−3^6\)?

A. 2
B. 3
C. 5
D. 7
E. 11
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C
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What is the largest prime factor of 27^3−9^3−3^6? 19 Feb 2016, 04:55
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Bunuel
What is the largest prime factor of 27^3−9^3−3^6?

A. 2
B. 3
C. 5
D. 7
E. 11

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Hi,
the equation tells us that all are with base 3..
We should simplify equation...
\(27^3−9^3−3^6=(3^3)^3-(3^2)^3-3^6...\\
=3^9-2*3^6=3^6(3^3-2)=3^6*25..\)
so 5 is the greatest prime factor
C
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What is the largest prime factor of 27^3−9^3−3^6? 19 Feb 2016, 09:58
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I am probably wrong but I will my solution out there and someone will tell me where I fell down

So 27^3 - 9^3 - 3^6, get them into bases of 3s
27^3 = (3^3)^3
9^3 = (3^2)^3 = (3^3)^2
3^6 = (3^3)^2

So we have (3^3)^3 -(3^3)^2 - (3^3)^2
Factor out 3^3, we have 3^3 (3^3 - 3^2 - 3^2) ----> 3^3 (27 -9-9) ----> (27) (9) -->
Highest prime factor is 3
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What is the largest prime factor of 27^3−9^3−3^6? Updated on: 19 Feb 2016, 21:39
Originally posted by Kingsman on 19 Feb 2016, 12:08.
Last edited by Kingsman on 19 Feb 2016, 21:39, edited 1 time in total.
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One vote for C. Here is my sol:
27^3−9^3−3^6 = 3^9 - 3^6 - 3^6 = 3^6( 3^3-1-1) = 3^6 (27-2) = 3^6 * 5^2.

Two prime factors are 3 and 5. Therefore, max prime factor is 5.
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What is the largest prime factor of 27^3−9^3−3^6? 19 Feb 2016, 13:28
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Tmoni26
I am probably wrong but I will my solution out there and someone will tell me where I fell down

So 27^3 - 9^3 - 3^6, get them into bases of 3s
27^3 = (3^3)^3
9^3 = (3^2)^3 = (3^3)^2
3^6 = (3^3)^2

So we have (3^3)^3 -(3^3)^2 - (3^3)^2
Factor out 3^3, we have 3^3 (3^3 - 3^2 - 3^2) ----> 3^3 (27 -9-9) ----> (27) (9) -->
Highest prime factor is 3
Show more


Hi Tmoni,

Your approach was right, but where you "fell down" is when you factored out the \(3^3\).

Factoring out \(3^3\) from \((3^3)^3-(3^3)^2-(3^3)^2\) will give you \((3^3)[(3^3)^2-(3^3)-(3^3)]\)

Consider replacing \(3^3\) with \(x\), then the expression would look like \(x^3-x^2-x^2\)
Now if you factor out an \(x\) what happens? You get \(x(x^2-x-x)\)

Remember, \(x^2 = x*x\), so \((3^3)^2 = (3^3)*(3^3)\). When you factor out one \(3^3\), you still have one \(3^3\) left over, not \(3^2\)

So in fact you could have factored out \((3^3)^2\) and gotten \((3^3)^2[3^3-1-1] = (3^3)^2*[25] = 3^6*5^2\)

Now the expression is broken down into its prime factors and we can see that the greatest prime factor is 5.

Answer: C

Does that help?



Cheers,
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What is the largest prime factor of 27^3−9^3−3^6? 19 Feb 2016, 15:01
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What is the largest prime factor of 27^3−9^3−3^6

Step #1: Convert everything to base 3--> (3^3)^3-(3^2)^3-3^6
Step #2: Reduce using rules of powers (rules: (x^a)^b = x^(a*b) and x^a+x^b=x^(a+b)) --> 3^9-3^6-3^6
Step #3: Simplify by factoring --> 3^6(3^3-1-1) =3^6(3^3-2)
Step #4: Larget prime of this form--> 3^6(3^3-2) =3^6(27-2)= 3^6(25) -->Prime Factor =3( Prime Factor 5)
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What is the largest prime factor of 27^3−9^3−3^6? 18 Mar 2017, 14:42
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let's make the equation to the base of 3: 3^9-2*3^6=3^6(3^3-2)=3^6*25
hence 5 is the highest prime
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What is the largest prime factor of 27^3−9^3−3^6? 01 Apr 2017, 08:49
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27^3-9^3-3^6
= 3^3(3) - 3^2(3) - 3^6
= 3^9 - 3^6 - 3^6
= 3^9 - 2(3^6)
=3^6 (3^3-2)
=3^6 (27-2)
=3^6 (25)
=3^6 (5^2)

The largest prime factor is 5.
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What is the largest prime factor of 27^3−9^3−3^6? 02 Apr 2017, 00:02
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Bunuel
What is the largest prime factor of \(27^3−9^3−3^6\)?

A. 2
B. 3
C. 5
D. 7
E. 11
Show more

\(27^3−9^3−3^6\)

=>\(3^9 − 3^6 − 3^6\)

=>\(3^6 ( 3^3 − 1 − 1 )\)

=>\(3^6 ( 3^3 − 2 )\)

=>\(3^6*25\)

Thus, the largest prime factor will be 5, answer must be (C) 5
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What is the largest prime factor of 27^3−9^3−3^6? 09 Jul 2018, 19:58
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Bunuel
What is the largest prime factor of \(27^3−9^3−3^6\)?

A. 2
B. 3
C. 5
D. 7
E. 11
Show more

The key to solving this problem is to express each of the terms with a base of 3. Doing this, we have:

(3^3)^3 - (3^2)^3 - 3^6

3^9 - 3^6 - 3^6

3^6(3^3 - 1 - 1)

3^6(25) = 3^6 x 5^2

Answer: C
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What is the largest prime factor of 27^3−9^3−3^6? 16 Feb 2019, 20:37
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Bunuel
What is the largest prime factor of \(27^3−9^3−3^6\)?

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D. 7
E. 11

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\(27^3−9^3−3^6\)
Can be written as

\(3^9−3^6−3^6\)

Take \(3^6\), common to get

\(3^6\) \((3^3 -1 -1)\)

\(3^6\) * 25

5 -> largest prime factor
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What is the largest prime factor of 27^3−9^3−3^6? 02 Dec 2020, 13:21
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Given: \(27^3 - 9^3 - 3^6\)

\((3^3)^3 - (3^2)^3 - 3^6\)

\(3^9 - 3^6 - 3^6\)

\(3^6(3^3 - 1 - 1)\)

\(3^6 * 5^2\)

Largest prime factor is 5. Answer is C.
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What is the largest prime factor of 27^3−9^3−3^6? 28 Dec 2020, 09:29
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Bunuel
What is the largest prime factor of \(27^3−9^3−3^6\)?

A. 2
B. 3
C. 5
D. 7
E. 11

The key to solving this problem is to express each of the terms with a base of 3. Doing this, we have:

(3^3)^3 - (3^2)^3 - 3^6

3^9 - 3^6 - 3^6

3^6(3^3 - 1 - 1)

3^6(25) = 3^6 x 5^2

Answer: C
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Hey, why can't we subtract 3^6 from 3^6 directly, which will leave us with 27^3 only? then the answer will be 3.
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What is the largest prime factor of 27^3−9^3−3^6? 28 Dec 2020, 11:00
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Bunuel
What is the largest prime factor of \(27^3−9^3−3^6\)?

A. 2
B. 3
C. 5
D. 7
E. 11

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\(27^3−9^3−3^6\)

Or, \(3^9−3^6−3^6\)

Or, \(3^6(3^3−1−1)\)

Or, \(3^6(3^3−2)\)

Or, \(3^6(27−2)\)

Or, \(3^6*25\)

Or, \(3^6*5*5\), Thus largest prime factor is 5, Answer must be (C)
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What is the largest prime factor of 27^3−9^3−3^6? 10 Jan 2021, 17:46
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Bunuel
What is the largest prime factor of \(27^3−9^3−3^6\)?

A. 2
B. 3
C. 5
D. 7
E. 11

The key to solving this problem is to express each of the terms with a base of 3. Doing this, we have:

(3^3)^3 - (3^2)^3 - 3^6

3^9 - 3^6 - 3^6

3^6(3^3 - 1 - 1)

3^6(25) = 3^6 x 5^2

Answer: C

Hey, why can't we subtract 3^6 from 3^6 directly, which will leave us with 27^3 only? then the answer will be 3.
Show more

Response:

I think you interpreted 3^9 - 3^6 - 3^6 as 3^9 - (3^6 - 3^6), in which case we would indeed subtract 3^6 from 3^6. However, the expression 3^9 - 3^6 - 3^6 is actually equivalent to 3^9 + (-3^6) + (-3^6). It may be helpful to rewrite the expression as - 3^6 + 3^9 - 3^6 to see why it would be wrong to subtract 3^6 from 3^6 and reduce the expression to 3^9.
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What is the largest prime factor of 27^3−9^3−3^6? 04 Apr 2022, 11:54
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Would someone be willing to help me here? Trying to sharpen my understanding of what when wrong;

1. Translated bases to 3

27^3 = (3^3)^3 = 3^9
9^3 = (3^2)^3 = 3^6
3^6 = Leave as is.

2. Lined up Equation and Solved

3^9 - 3^6 - 3^6
3^3 - 3^6
3^-3

3. Concluded still only 3 factors of 3, thus 3 remains largest prime factor.
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What is the largest prime factor of 27^3−9^3−3^6? 04 Apr 2022, 19:41
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lmcclellan18
Would someone be willing to help me here? Trying to sharpen my understanding of what when wrong;

1. Translated bases to 3

27^3 = (3^3)^3 = 3^9
9^3 = (3^2)^3 = 3^6
3^6 = Leave as is.

2. Lined up Equation and Solved

3^9 - 3^6 - 3^6
3^3 - 3^6
3^-3

3. Concluded still only 3 factors of 3, thus 3 remains largest prime factor.
Show more

Portion 2 is wrong. You cannot add powers this way. Please go through exponents.
https://gmatclub.com/forum/math-number-theory-88376.html#p666609
\(3^9-3^6-3^6=3^9-2*3^6=3^6(3^3-2)=3^6*(27-2)=3^65^2\)

So 5 is the largest prime factor.
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What is the largest prime factor of 27^3−9^3−3^6? 05 Apr 2022, 23:45
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Tmoni26
I am probably wrong but I will my solution out there and someone will tell me where I fell down

So 27^3 - 9^3 - 3^6, get them into bases of 3s
27^3 = (3^3)^3
9^3 = (3^2)^3 = (3^3)^2
3^6 = (3^3)^2

So we have (3^3)^3 -(3^3)^2 - (3^3)^2
Factor out 3^3, we have 3^3 (3^3 - 3^2 - 3^2) ----> 3^3 (27 -9-9) ----> (27) (9) -->
Highest prime factor is 3
Show more


The factorization you've done is wrong. It leads to 3^6 - 3^5 - 3^5 instead.
The correct factorization would be 3^6(3^3-1-1) which leads for the highest prime factor to be 5.
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What is the largest prime factor of 27^3−9^3−3^6? 29 May 2022, 02:23
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Simplify the given equation.

(3^3)^3 - (3^2)^3 - 3^6

3^9 - 3^6 - 3^6

3^6(3^3 - 1 - 1)

3^6(25) = 3^6 x 5^2

So the answer is C

Hope it helps !
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What is the largest prime factor of 27^3−9^3−3^6? 24 Sep 2025, 22:24
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