Question

$\huge\fbox\color{red}questions -$
$\star \: what \: is \: a \: rational \: number \: ? \: \\ \mapsto give \: examples \: of \: rational \: number \: ?$
$\star \: what \: do \: you \: mean \: by \: vulgar \: fraction \: ?$
$\star \: give \: some \: information \: about - \\ \dagger \: terminating \: decimals\: \\ \dagger \: non - terminating \: decimal \\ \dagger \:recurring \:decimals$
$\huge\fbox\green{note}$
$\pink{\bigstar \: dont \: spam \: or \: copy \: } \\ \pink{\bigstar \: need \: explaination \: with \: examples}$





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Answer 1

Step-by-step explanation:

A᭄nswer࿐-

$\bold{\color{pink}{rational\:\:number}}$

• If a number is expressed in the form of p/q then it is a rational number. Here p and q are integers, and q is not equal to 0. A rational number should have a numerator and denominator. Examples: 10/2, 30/3, 100/5.

$\bold{\color{pink}{vulgar\:\:fraction}}$

• vulgar fraction. • another name for a common fraction. • a fraction where the numerator and the denominator. are both integers (not fractions).

[tex[\bold{\color{pink}{Terminating\:\:decimals}}[/tex]

• Terminating decimals are those numbers which come to an end after few repetitions after decimal point.

Example: 0.5, 2.456, 123.456, etc. are all examples of terminating decimals.

$\bold{\color{pink}{non\:\:terminating\:\:decimals}}$

• Non terminating decimals: Non terminating decimals are those which keep on continuing after decimal point (i.e. they go on forever). They don’t come to end or if they do it is after a long interval.

$\huge\fbox\green{Muskan}$

Answer 2

Answer:

$\huge\fbox\color{red}answer -$

$\mapsto a \: number\: which \:can \:be \:expressed\: in \:the\\form \:of\: \frac{p}{q}\:where\: p\: and \:q\:are \:integers \\and \:q \:is \:not \:equal \:to\:p\:$

$\mapsto eg\: \: \frac{35}{89}\:, \:\frac{3}{1} \:$