cmi-entrance 2013 QB9

cmi-entrance · India · pgmath 10 marks Not Maths

Let $K _ { 1 } \supset K _ { 2 } \supset \ldots$ be a sequence of connected compact subsets of $\mathbb { R } ^ { 2 }$. Is it true that their intersection $K = \cap _ { i = 1 } ^ { \infty } K _ { i }$ is connected also? Provide either a proof or a counterexample.

Let $K _ { 1 } \supset K _ { 2 } \supset \ldots$ be a sequence of connected compact subsets of $\mathbb { R } ^ { 2 }$. Is it true that their intersection $K = \cap _ { i = 1 } ^ { \infty } K _ { i }$ is connected also? Provide either a proof or a counterexample.

Paper Questions

QA1 QA10 QA11 QA12 QA13 QA14 QA15 QA2 QA3 QA4 QA5 QA6 QA7 QA8 QA9 QB1 QB10 QB2 QB3 QB4 QB5 QB6 QB7 QB8 QB9