If P is a prime ideal ina commutative ring with identity then R/P is. A. Maximal B. Prime C. integral domain D. Principal ideal View AnswerC. integral domain Related MCQs For any element a€R , let Ra ={ra∶a∈R,r∈R} then Ra is an ideal of R. If { 0} & “R” are the only ideal of a commutative ring with unity then “R” is a . Every maximal ideal is. Every I.D is not a field but it can be embedded in a field which is called. Every PID is UFD but converse not true. Characteristic of Ɍ is. If an=0, where n is least positive integer then element a is called. A bijective homomorphism is. In Principal ideal domain every non-zero prime ideal is. The ring of Gaussian integers is an example of.