) For positive integers 'a' and 3 , there exist unique integers 'q' and 'r' such that
a = 3q + r , where r must satisfy :
a). 0 ≤ r < 3 b) 1 < r < 3
c) 0 < r< 3. d) 1 ≤ r < 3
Answers
Answered by
2
Answer:
a
Step-by-step explanation:
exist unique integers 'q' and 'r' such that
a = 3q + r , where r must satisfy :
a). 0 ≤ r < 3 b) 1 < r < 3
Answered by
4
Answer:
★ For positive integers 'a' and 3 , there exist unique integers 'q' and 'r' such that
a = 3q + r , where r must satisfy :
⇒ 0 < r< 3.
As the remainder(r) should be greater than zero and less then the divisor ie, here 3 . so the option number "C" is the correct answer
Learn more :-
https://brainly.in/question/19680234?
In the above answer there divisor is 9 so there the remainder is 0< r<9 ie, it must be smaller than 9 .
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