2011 AMC 12A Problems/Problem 21
Contents
Problem
Let , and for integers , let . If is the largest value of for which the domain of is nonempty, the domain of is . What is ?
Solution 1
The domain of is defined when .
Applying the domain of and the fact that square roots must be positive, we get . Simplifying, the domain of becomes .
Repeat this process for to get a domain of .
For , since square roots must be nonnegative, we can see that the negative values of the previous domain will not work, so . Thus we now arrive at being the only number in the of domain of that defines . However, since we are looking for the largest value for for which the domain of is nonempty, we must continue checking until we arrive at a domain that is empty.
We continue with to get a domain of . Since square roots cannot be negative, this is the last nonempty domain. We add to get .
Solution 2
We start with smaller values. Notice that . Notice that the mess after must be greater than 0, since it's a square root, and less than 1, since otherwise the inside of the larger square root on the outside would be negative.
Continuing, we get that , which means is the only value in the domain of . Now we move on to . The only change with is replacing the from with . Since we had in , in , , forcing .
Clearly, we can't move on from here, since would replace with , and a square root can never be negative, so , , and the answer is $5-231 = \boxed{\textbf{(A) }-226}.
-skibbysiggy
See also
2011 AMC 12A (Problems • Answer Key • Resources) | |
Preceded by Problem 20 |
Followed by Problem 22 |
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All AMC 12 Problems and Solutions |
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