If a rational number `p//q` has a terminating decimal, then the prime factorisation of q is of the form……….

A rational number p/q has a terminating decimal expansion if prime factorization of q have

Assertion : 29/9261 will have a non-terminating repeating decimal expansion. Reason : Let a = p/q be a rational number such that p and q are co-prime and the prime factorisation of q is of the form 2^(n)xx5^(m) where n and m are non-negative integers (whole numbers). Then a has a decimal expansion, which is non-terminating repeating.

For a rational number (p)/(q) to be terminating decimal, the denominator q must be of the form 2^(m)5^(n) , where m, n are

In the rational form of a terminating decimal number prime factor of the denominator is……………….

The fraction (7)/(q) has a terminating decimal expansion. Which of these CANNOT be q?

A rational number in its decimal expansion is 1.7351. What can you about the prime factors of q this number is expressed in the form =p/q Give reason.

Write the condition to be satisfied by q so that the rational number (p)/(q) has a terminating decimal expansion.

Write the condition to be satisfied by q so that a rational number p/q has a non-terminating decimal expansion.

Write the condition to be satisfied by q so that a rational number p/q has a terminating decimal expansion.

Write the condition to be satisfied by q so that a rational number (p)/(q) has a terminating decimal expansion.