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12 Aug 2023, 12:00
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B
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For all positive integers x and y, the expression xΘy is defined as the least multiple of y that is greater than or equal to x. For example, 2Θ3 = 3 and 3Θ2 = 4. For how many different positive integers k is 20Θk = 30?
A. One
B. Two
C. Three
D. Four
E. Five
A. One
B. Two
C. Three
D. Four
E. Five
12 Aug 2023, 12:20
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Bunuel
30 must be a multiple of k, hence k is a factor of 30
Factorization of 30
30 = 3 * 2 * 5
Positive factors of 30 = 1, 2, 3, 5, 6, 10, 15, 30
- k = 1, least multiple = 20
- k = 2, least multiple = 20
- k = 3, least multiple = 21
- k = 4, least multiple = 20
- k = 5, least multiple = 20
- k = 6, least multiple = 24
- k = 10, least multiple = 20
- k = 15, least multiple = 30
- k = 30, least multiple = 30
Hence for two values least multiple = 30
Option B
General Discussion
12 Aug 2023, 22:24
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Given: For all positive integers x and y, the expression xΘy is defined as the least multiple of y that is greater than or equal to x. For example, 2Θ3 = 3 and 3Θ2 = 4.
Asked: For how many different positive integers k is 20Θk = 30?
20Θk = 30
Since 30 is a multiple of k, k is a factor of 30.
Factor of 30=2*3*5 = {1,2,3,5,6,10,15,30}
If k = 1; 20Θk = 21
If k = 2; 20Θk = 22
If k = 3; 20Θk = 21
If k = 5; 20Θk = 25
If k = 6; 20Θk = 24
If k = 10; 20Θk = 21
If k = 15; 20Θk = 30; Correct
If k = 30; 20Θk = 30; Correct
IMO B
Asked: For how many different positive integers k is 20Θk = 30?
20Θk = 30
Since 30 is a multiple of k, k is a factor of 30.
Factor of 30=2*3*5 = {1,2,3,5,6,10,15,30}
If k = 1; 20Θk = 21
If k = 2; 20Θk = 22
If k = 3; 20Θk = 21
If k = 5; 20Θk = 25
If k = 6; 20Θk = 24
If k = 10; 20Θk = 21
If k = 15; 20Θk = 30; Correct
If k = 30; 20Θk = 30; Correct
IMO B
