Demonstrate with example that any whole number divided by 0 is not defined.
Answers
Answer:
let us assume the whole number as 1.
1/0=not defined because 1/0=infinity.
1/infinity-=0
hence 1/0=infinity,not defined(both are same)
hope it helps mark me as brainliest.
Answer:
simple reason
Step-by-step explanation:
let us say when we divide 1 by 0, we get a quotient and a remainder.
_________
0 ) 1
in this situation, you find out that any no. x 0 =0
so you will never reach 1
you cannot take 1 as the remainder also because 1 > 0 and remainder cannot be greater than divisor.
let us say when we divide 1 by 0, we get a quotient and a remainder.
by Euclid's division lemma, we get
D=d*q+r(dividend = divisor * quotient +remainder) here, d>r>or=0(means that r can be [0,d) anything from 0 to d but not d )
in this case,
1=0*q +r and 0>r>or=0
"0>r>or=0" this part worries us because there can be no such number that is greater or equal to 0 but less than 0
so division by 0 is not possible