Math, asked by lalith6d, 1 month ago

arrange the given fractions in descending order of 5 by 16, 13 by 24, 7 by 8 ? step by step?​

Answers

Answered by AngelHearts
6

\huge{\textsf\green{Solution:-}}

L.C.M. of 16,24,8 = 48.

Converting into like fractions:-

\red\dashrightarrow\sf{ \frac{5}{16} =  \frac{5 \times 3}{16 \times 3}   =  \frac{15}{48} }

\red\dashrightarrow\sf \frac{13}{24}  =  \frac{13 \times 2}{24 \times 2}  =  \frac{26}{48}

\red\dashrightarrow\sf{ \frac{7}{8} =  \frac{7 \times 6}{8 \times 6}   =  \frac{42}{48}}

Now, arranging in descending order:-

\red\dashrightarrow\sf{ \frac{7}{8},  \frac{13}{24},  \frac{5}{16}}

Answered by Itsmahi001
81

\huge{\underline{\mathtt{\red{S}\pink{O}\green{L}\blue{U}\purple{T}\orange{I}\pink{O}\red{N ᭄}}}}

\sf{L.C.M  \: of  \: 16, \: 24 \: and \: 8 \:  is  \: 48.}

By converting into like fractions:-

\implies\sf{ \frac{5}{16}  =  \frac{5 \times 3}{16 \times 3}  =  \frac{15}{48}}

\implies\sf{ \frac{13}{24}  =  \frac{13 \times 2}{24 \times 2} }

\implies\sf{ \frac{7}{8}  =  \frac{7 \times 6}{8 \times 6}  =  \frac{42}{48}}

\implies\sf{So, Ans. =  \frac{7}{8} , \frac{13}{24}  ,\frac{5}{16} }

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