Difference between revisions of "Kuznetsova equation"
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(Created page with "Kuznetsova equation refers to problem below. Find integer \( x,y,z \) such that for any integer \( n \) there exist integer \( m \) such that \( a^{bn+c}=bm+3c \)") |
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[[Kuznetsova equation]] refers to problem below. |
[[Kuznetsova equation]] refers to problem below. |
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| − | Find integer \( |
+ | Find integer \( A,B,C \) such that |
| − | for any integer \( n \) there exist integer \( m \) such that |
+ | for any non-negative integer \( n \) there exist integer \( m \) such that |
| − | \( |
+ | \( A^{B n + C} = B m+ C \) |
| + | |||
| + | Example of solution: |
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| + | |||
| + | \( A=3 \) <br> |
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| + | \( B=100 \)<br> |
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| + | \( C=87 \)<br> |
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Latest revision as of 22:24, 14 January 2020
Kuznetsova equation refers to problem below.
Find integer \( A,B,C \) such that
for any non-negative integer \( n \) there exist integer \( m \) such that
\( A^{B n + C} = B m+ C \)
Example of solution:
\( A=3 \)
\( B=100 \)
\( C=87 \)