Advertisements
Advertisements
Question
Classify the decimal form of the given rational number into terminating and non-terminating recurring type.
`13/5`
Advertisements
Solution
Denominator = 5 = 1 × 5
Since, 5 is the only prime factor denominator.
The decimal form of the rational number `13/5` will be terminating type.
APPEARS IN
RELATED QUESTIONS
Classify the decimal form of the given rational number into terminating and non-terminating recurring type.
`29/16`
Write the following rational number in decimal form.
`127/200`
Write the following number in its decimal form.
`121/13`
Is zero a rational number? Can it be written in the form `P/q`, where p and q are integers and q ≠ 0?
Arrange `5/8, -3/16, -1/4 and 17/32` in descending order of their magnitudes.
Also, find the sum of the lowest and largest of these fractions. Express the result obtained as a decimal fraction correct to two decimal places.
Without doing any actual division, find which of the following rational numbers have terminating decimal representation: `23/125`
Without doing any actual division, find which of the following rational numbers have terminating decimal representation : `32/45`
Write the denominator of the following rational numbers: `(-3)/4`
The sum of two rational numbers is `11/24`. If one of them is `3/8`, fine the other.
Evaluate : `(32/15 + 8/5) div (32/15 - 8/5)`
Seven equal pieces are made out of a rope 5 of 21 `5/7` m. Find the length of each piece.
State if the following fraction has a terminating decimal
`(3)/(5)`
Express the following decimal as a rational number.
0.614
Convert the following fraction to a decimal:
`(13)/(25)`
Express the following decimal as a rational number.
0.7
Express the following decimal as a rational number.
2.67
Express the following decimal as a rational number.
0.017
The decimal form of the rational number `15/(-4)` is __________
Write the decimal form of the following rational numbers
`1 2/5`
Write the following rational number in decimal form.
`4/5`
