Convert the decimal notation to fractional notation.

a) [tex]\(0.02 =\)[/tex]
b) [tex]\(0.56 = \frac{19}{25}\)[/tex]
c) [tex]\(0.826 =\)[/tex]
d) [tex]\(0.37 = 37\)[/tex]
e) [tex]\(0.432 = 545\)[/tex]
f) [tex]\(0.876 =\)[/tex]
g) [tex]\(0.94 = 4 \frac{7}{70}\)[/tex]
h) [tex]\(0.236 = \frac{24}{250}\)[/tex]
i) [tex]\(0.63 =\)[/tex]
j) [tex]\(0.9631 = \frac{9631}{1000}\)[/tex]
k) [tex]\(0.4672 =\)[/tex]

Question

02-07-2024
Mathematics

Answered

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Convert the decimal notation to fractional notation.

a) [tex]\(0.02 =\)[/tex]
b) [tex]\(0.56 = \frac{19}{25}\)[/tex]
c) [tex]\(0.826 =\)[/tex]
d) [tex]\(0.37 = 37\)[/tex]
e) [tex]\(0.432 = 545\)[/tex]
f) [tex]\(0.876 =\)[/tex]
g) [tex]\(0.94 = 4 \frac{7}{70}\)[/tex]
h) [tex]\(0.236 = \frac{24}{250}\)[/tex]
i) [tex]\(0.63 =\)[/tex]
j) [tex]\(0.9631 = \frac{9631}{1000}\)[/tex]
k) [tex]\(0.4672 =\)[/tex]

Sagot :

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GinnyAnswer GinnyAnswer · Answer 1 · 2024-07-02T22:27:00-04:00

¡Claro! Vamos a convertir cada uno de los valores decimales a fracciones paso a paso.

a) [tex]\( 0.02 \)[/tex]

Para convertir [tex]\( 0.02 \)[/tex] a una fracción, observamos que el número decimal tiene dos cifras decimales, lo cual corresponde a [tex]\( \frac{2}{100} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.02 = \frac{2}{100} = \frac{1}{50} \][/tex]

b) [tex]\( 0.56 \)[/tex]

Para [tex]\( 0.56 \)[/tex], observamos que tiene dos cifras decimales, lo cual corresponde a [tex]\( \frac{56}{100} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.56 = \frac{56}{100} = \frac{14}{25} \][/tex]

c) [tex]\( 0.826 \)[/tex]

Para [tex]\( 0.826 \)[/tex], observamos que tiene tres cifras decimales, lo cual corresponde a [tex]\( \frac{826}{1000} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.826 = \frac{826}{1000} = \frac{413}{500} \][/tex]

d) [tex]\( 0.37 \)[/tex]

Para [tex]\( 0.37 \)[/tex], observamos que tiene dos cifras decimales, lo cual corresponde a [tex]\( \frac{37}{100} \)[/tex]. No necesita simplificación adicional:

[tex]\[ 0.37 = \frac{37}{100} \][/tex]

e) [tex]\( 0.432 \)[/tex]

Para [tex]\( 0.432 \)[/tex], observamos que tiene tres cifras decimales, lo cual corresponde a [tex]\( \frac{432}{1000} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.432 = \frac{432}{1000} = \frac{54}{125} \][/tex]

f) [tex]\( 0.876 \)[/tex]

Para [tex]\( 0.876 \)[/tex], observamos que tiene tres cifras decimales, lo cual corresponde a [tex]\( \frac{876}{1000} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.876 = \frac{876}{1000} = \frac{219}{250} \][/tex]

g) [tex]\( 0.94 \)[/tex]

Para [tex]\( 0.94 \)[/tex], observamos que tiene dos cifras decimales, lo cual corresponde a [tex]\( \frac{94}{100} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.94 = \frac{94}{100} = \frac{47}{50} \][/tex]

h) [tex]\( 0.236 \)[/tex]

Para [tex]\( 0.236 \)[/tex], observamos que tiene tres cifras decimales, lo cual corresponde a [tex]\( \frac{236}{1000} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.236 = \frac{236}{1000} = \frac{59}{250} \][/tex]

i) [tex]\( 0.63 \)[/tex]

Para [tex]\( 0.63 \)[/tex], observamos que tiene dos cifras decimales, lo cual corresponde a [tex]\( \frac{63}{100} \)[/tex]. No necesita simplificación adicional:

[tex]\[ 0.63 = \frac{63}{100} \][/tex]

j) [tex]\( 0.9631 \)[/tex]

Para [tex]\( 0.9631 \)[/tex], observamos que tiene cuatro cifras decimales, lo cual corresponde a [tex]\( \frac{9631}{10000} \)[/tex]. Esta es la fracción en su forma más simple:

[tex]\[ 0.9631 = \frac{9631}{10000} \][/tex]

k) [tex]\( 0.4672 \)[/tex]

Para [tex]\( 0.4672 \)[/tex], observamos que tiene cuatro cifras decimales, lo cual corresponde a [tex]\( \frac{4672}{10000} \)[/tex]. Simplificando la fracción:

[tex]\[ 0.4672 = \frac{4672}{10000} = \frac{292}{625} \][/tex]

Estas conversiones nos proporcionan las fracciones exactas correspondientes a los valores decimales dados.

Sagot :

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