show that every positive integer is of the form 2m and that every positive odd integer is of the from (2m+1),where m is some integer
Answers
Answered by
0
Answer:
Step-by-step explanation:
a = bq+ r
let the integer be a
b = 2 , 0<= r< b r = 0 ,1
a= 2q
a =2m ( let q=m)
a = 2q + 1
a = 2m +1 ( q=m) ( not divisible by 2)
hence proved.
Similar questions