Question

how the number 1953125 is equal to 5^9

Answer 1

Answer:

If a number is a perfect square, then the prime factorization of that number should be of where pi is the ith prime number and ni ∈ N. But we have, 1953125=5⁹, so it cannot be a perfect square. If the last digit of a given number is 5, then the last three digits must be perfect squares, 025 or 225 or 625.

Answer 2

Answer:

5⁹

Step-by-step explanation:

1953125=5x5x5x5x5x5x5x5x5

=5⁹