Home
Class 10
MATHS
The decimal expansion of the rational nu...

The decimal expansion of the rational number `(27)/(2^(2) * 5^(3))`, will terminate after how many places of decimals ?

Text Solution

Verified by Experts

The correct Answer is:
Three places of decimals
Promotional Banner

Topper's Solved these Questions

  • REAL NUMBERS

    NAGEEN PRAKASHAN|Exercise Revision Exercise Very Short Answer Questions|12 Videos

  • REAL NUMBERS

    NAGEEN PRAKASHAN|Exercise Revision Exercise Short Answer Questions|6 Videos

  • REAL NUMBERS

    NAGEEN PRAKASHAN|Exercise Exercise 1b|16 Videos

  • QUADRATIC EQUATIONS

    NAGEEN PRAKASHAN|Exercise Revision Exercise Long Answer Questions|6 Videos

  • SOME APPLICATIONS OF TRIGONOMETRY

    NAGEEN PRAKASHAN|Exercise Long Answer Questions|5 Videos

Similar Questions

Explore conceptually related problems

The decimal expansion of the rational number (43)/(2^(4)xx5^(3)) will terminate after how many places of decimals?

The decimal expansion of the rational number (83)/(2^(3)xx5^(4)) will terminate after how many places of decimals?

The decimal expansion of the rational number 43/((2^(4) xx 5^(3)) will termiate after how many places of decimals.

The decimal expansion of the rational number 37/(2^(2) xx5) will termination after

The decimal expansion of the rational number 327/(2^(3)xx5) will terminate after

5) The decimal expansion of the rational no 43/2^(4)X5^(3) will terminate after how many places of decimal?

The decimal expansion of the rational number (14587)/(1250) will terminate after (a) one decimal place (b) two decimal place (c) three decimal place (d) four decimal place

The decimal expansion of the rational number (14587)/(1250) will terminate after:

The decimal expansion of the rational number (14587)/(1250) will terminate after:

The decimal expression of the rational number (23/(2^2 times 5)) will terminate after……….decimal place