1990 AIME Problems/Problem 13
Contents
Problem
Let . Given that has 3817 digits and that its first (leftmost) digit is 9, how many elements of have 9 as their leftmost digit?
Solution 1
Since has 3816 digits more than , numbers have 9 as their leftmost digits.
Solution 2
Let's divide all elements of T into sections. Each section ranges from to And, each section must have 1 or 2 elements. So, let's consider both cases.
If a section has 1 element, we claim that the number doesn't have 9 as the leftmost digit. Let the element be and the section ranges from to . To the contrary, let's assume the number does have 9 as the leftmost digit. Thus, But, if you divide both sides by 9, you get , and because , so we have another number in the same section. Which is a contradiction to our assumption that the section only has 1 element. So, the number doesn't have 9 as the leftmost digit.
If a section has 2 elements, we claim one has to have a 9 as the leftmost digit, one doesn't. Let the elements be and , and the section ranges from to . We know that , and thus , and since , it's leftmost digit must be 9, and the other number's leftmost digit is 1.
There are 3817 sections and 4001 elements. Each section has exactly one element that doesn't have 9 as the left most digit. We can take 4001 elements, subtract 3817 elements that don't have 9 as the leftmost digit, and get numbers that have 9 as the leftmost digit.
- AlexLikeMath
See also
1990 AIME (Problems • Answer Key • Resources) | ||
Preceded by Problem 12 |
Followed by Problem 14 | |
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