Prove that $8^{n}$ cannot end in zero for any natural number $n \in N$.
(N/A) For a number to end with the digit $0$,its prime factorization must contain the factors $2$ and $5$.
The prime factorization of $8$ is $2^3$.
Therefore,$8^n = (2^3)^n = 2^{3n}$.
The only prime factor in the prime factorization of $8^n$ is $2$.
Since the factor $5$ is not present in the prime factorization of $8^n$,it is impossible for $8^n$ to end with the digit $0$ for any natural number $n \in N$.
The prime factorization of $8$ is $2^3$.
Therefore,$8^n = (2^3)^n = 2^{3n}$.
The only prime factor in the prime factorization of $8^n$ is $2$.
Since the factor $5$ is not present in the prime factorization of $8^n$,it is impossible for $8^n$ to end with the digit $0$ for any natural number $n \in N$.
Explore More
Similar Questions
If the $HCF$ of $65$ and $117$ is expressible in the form $65m - 117$,then the value of $m$ is
Medium
View SolutionFind the square root of: $\frac{7}{4} + \sqrt{3}$
Medium
View SolutionThe irrational number which is not a surd is ...............
Easy
View SolutionShow that the cube of a positive integer of the form $6q + r$,where $q$ is an integer and $r = 0, 1, 2, 3, 4, 5$,is also of the form $6m + r$.
Difficult
View SolutionProve that $5^{n} \times 6^{n}$ ends in zero for any natural number $n \in N$.
Medium
View SolutionVedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo