Answer: True.
Step-by-step explanation:
Given statement : All sets that can be written in set builder notation cannot be written in roster form
For example : [tex]A=\left \{ { x |\ x\ \epsilon \mathbb{R}\text{ and }1\leq x\leq2} \right \}[/tex] is written in Set builder notation.
Here, x can be any real number between 1 and 2.
Since, there are infinite real number exist between them that can be impossible to write in rooster form.
Hence, the given statement is correct.
