Show that 9n cannot end with digit 0 for any natural number
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Answered by
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9n can never end with the digit 0 for any natural number n because for a number to end with zero it should be divisible by 10 and therefore its factors should be 5 and 2.
But as 9 has only 3 as its factor, increasing its power will not make 5 as its factor.
Thus it can never end with 0.
But as 9 has only 3 as its factor, increasing its power will not make 5 as its factor.
Thus it can never end with 0.
Answered by
258
9ⁿ cannot end with digit 0.
If a number [aⁿ] need to end with a digit 0 , it should have it's factors as 5 and 2.
But 9 in 9ⁿ has factors as 3² ,i.e., only 3 as factor .
So according to the fundamental theorem of arithmetic 9ⁿ cannot end with digit 0.
hope it helps
If a number [aⁿ] need to end with a digit 0 , it should have it's factors as 5 and 2.
But 9 in 9ⁿ has factors as 3² ,i.e., only 3 as factor .
So according to the fundamental theorem of arithmetic 9ⁿ cannot end with digit 0.
hope it helps
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