1. Let A be a subset of R². We say that A is bounded if and only if (B) there is M >0 such that r² + y² ≤ M for all (x,

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1 Let A Be A Subset Of R We Say That A Is Bounded If And Only If B There Is M 0 Such That R Y M For All X 1 (14.09 KiB) Viewed 79 times

1. Let A be a subset of R². We say that A is bounded if and only if (B) there is M >0 such that r² + y² ≤ M for all (x, y) = A. (i) Write down the negation of (B) as a complete sentence. (ii) Give an example (a subset of R2) that is not bounded. (iii) Show that your example in (ii) is not bounded.