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Difficulty:
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Question Stats:
14% (02:25) correct
86%
(02:44)
wrong
based on 36
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For how many integers \(k\) does the equation
\(x^2-kx+5400=0\)
have two positive integer roots whose sum is odd but not divisible by 5?
(A) 3
(B) 4
(C) 6
(D) 8
(E) 12
\(x^2-kx+5400=0\)
have two positive integer roots whose sum is odd but not divisible by 5?
(A) 3
(B) 4
(C) 6
(D) 8
(E) 12
ankushsambare
Joined: 13 Jun 2022
Last visit: 04 Jun 2026
Posts: 200
Given Kudos: 148
Location: India
Schools: ISB '27 Wharton '26 INSEAD Aug '26
GPA: 2.4
![For how many integers k does the equation [m]x^2-kx+](/forum/styles/gmatclub_light/imageset/icon_post_target_unread.svg "For how many integers k does the equation [m]x^2-kx+"){kind=icon}
19 May 2026, 07:01
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Let the positive integer roots be a and b.
Using Vieta’s formulas:
a + b = k
ab = 5400
We need a + b to be odd and not divisible by 5.
Factorize:
5400 = 2^3 × 3^3 × 5^2
For the sum to be odd, one root must be even and the other odd.
So the odd root must be an odd divisor of:
3^3 × 5^2 = 675
Number of odd divisors of 675:
(3 + 1)(2 + 1) = 12
So there are 12 factor pairs with odd sum.
Now remove pairs whose sum is divisible by 5.
Since ab is divisible by 25, at least one factor is divisible by 5.
For the sum to NOT be divisible by 5, exactly one factor must be divisible by 5.
That happens only when one factor contains both 5’s and the other contains none.
So the odd divisor must be:
25 × 3^a, where a = 0, 1, 2, 3
This gives 4 possibilities.
Therefore, the number of possible values of k is 4.
Answer: B
Using Vieta’s formulas:
a + b = k
ab = 5400
We need a + b to be odd and not divisible by 5.
Factorize:
5400 = 2^3 × 3^3 × 5^2
For the sum to be odd, one root must be even and the other odd.
So the odd root must be an odd divisor of:
3^3 × 5^2 = 675
Number of odd divisors of 675:
(3 + 1)(2 + 1) = 12
So there are 12 factor pairs with odd sum.
Now remove pairs whose sum is divisible by 5.
Since ab is divisible by 25, at least one factor is divisible by 5.
For the sum to NOT be divisible by 5, exactly one factor must be divisible by 5.
That happens only when one factor contains both 5’s and the other contains none.
So the odd divisor must be:
25 × 3^a, where a = 0, 1, 2, 3
This gives 4 possibilities.
Therefore, the number of possible values of k is 4.
Answer: B
19 May 2026, 07:59
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