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12 Feb 2025, 01:30
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
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Question Stats:
31% (02:28) correct
69%
(02:30)
wrong
based on 181
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x is a positive integer and has 8 factors while (x + 1) has 4 factors. If x < 100 then how many values of x are possible?
A) 0
B) 1
C) 2
D) 3
E) 4
A) 0
B) 1
C) 2
D) 3
E) 4
Updated on: 15 Feb 2025, 00:24
Originally posted by ManifestDreamMBA on 12 Feb 2025, 02:29.
Last edited by ManifestDreamMBA on 15 Feb 2025, 00:24, edited 1 time in total.
Last edited by ManifestDreamMBA on 15 Feb 2025, 00:24, edited 1 time in total.
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x has 8 factors
Then it can be expressed as p^7 or p*q^3 or pqr for different prime numbers p, q and r
Looking for p^7 of prime less than 100 : None
Looking for product of primes with cube of a prime less than 100: 8*3 = 24, 8*5 = 40, 8*7 =56, 8*11 = 88, 27*2=54
Looking for product of 3 primes less than 100: 30
x+1 could be 25, 31, 41, 57, 89, 55
x+1 has 4 factors
Then it can be expressed as p^3 or p*q for prime numbers p and q
25 can not be expressed as a cube or product of 2 different primes, out
31 and 41 are prime, out
57 = 3*19
89 is a prime, out
55 = 5*11
We have 2 numbers which satisfy both criteria
Then it can be expressed as p^7 or p*q^3 or pqr for different prime numbers p, q and r
Looking for p^7 of prime less than 100 : None
Looking for product of primes with cube of a prime less than 100: 8*3 = 24, 8*5 = 40, 8*7 =56, 8*11 = 88, 27*2=54
Looking for product of 3 primes less than 100: 30
x+1 could be 25, 31, 41, 57, 89, 55
x+1 has 4 factors
Then it can be expressed as p^3 or p*q for prime numbers p and q
25 can not be expressed as a cube or product of 2 different primes, out
31 and 41 are prime, out
57 = 3*19
89 is a prime, out
55 = 5*11
We have 2 numbers which satisfy both criteria
Bunuel
12 Feb 2025, 07:22
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We know x has 8 factors.
So, it can be expressed either as p^7 or p.q^3
Case 1: x = p^7
Taking 2 as an example, 2^7 will be 128.
So, x = 128 and x+1 = 129.
But this cannot be the answer as it is given that x < 100.
Case 2: x = p.q^3
Let q be 2 and p be 3,5,7
1. x = 3(2^3) = 24. So, x+1 = 25
2. x = 5(2^3) = 40. So, x+1 = 41
3. x = 7(2^3) = 56. So, x+1 = 57
4. x = 11(2^3) = 88. So, x+1 = 89
For 2^3, we cannot take a number beyond this as x will exceed 100.
And, let q be 3 and p be 2
5. x = 2(3^3) = 54. So, x+1 = 55
For 3^3, we cannot take a number beyond this as x will exceed 100.
Now, we know that x+1 should have 4 factors.
From above,
1. 25 has 3 factors - Out
2. 41 has 2 factors - Out
3. 57 has 4 factors (1, 3, 19, 57) - Keep
4. 89 has 2 factors - Out
5. 55 has 4 factors (1, 5, 11, 55) - Keep
So, the correct answer will be 2 (Option C)
So, it can be expressed either as p^7 or p.q^3
Case 1: x = p^7
Taking 2 as an example, 2^7 will be 128.
So, x = 128 and x+1 = 129.
But this cannot be the answer as it is given that x < 100.
Case 2: x = p.q^3
Let q be 2 and p be 3,5,7
1. x = 3(2^3) = 24. So, x+1 = 25
2. x = 5(2^3) = 40. So, x+1 = 41
3. x = 7(2^3) = 56. So, x+1 = 57
4. x = 11(2^3) = 88. So, x+1 = 89
For 2^3, we cannot take a number beyond this as x will exceed 100.
And, let q be 3 and p be 2
5. x = 2(3^3) = 54. So, x+1 = 55
For 3^3, we cannot take a number beyond this as x will exceed 100.
Now, we know that x+1 should have 4 factors.
From above,
1. 25 has 3 factors - Out
2. 41 has 2 factors - Out
3. 57 has 4 factors (1, 3, 19, 57) - Keep
4. 89 has 2 factors - Out
5. 55 has 4 factors (1, 5, 11, 55) - Keep
So, the correct answer will be 2 (Option C)
