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ItzmeDipayan

Answer:

Here's your answer.

Let the number be x.

Here we have to multiply with 100 on both sides.

[tex] \implies \: 100x = 252.5252 \\ \\ \implies \: 100x = 250 \ + 2.5252... \\ \\ \implies \: 100x = 250 + x \\ \\ \implies \: 99x = 250 \\ \\ \implies \: x = \frac{250}{99} [/tex]

Therefore, sum of numerator and denominator = 25099 = 349

Hope it helps you from my side

Hrishii

Answer:

349

Step-by-step explanation:

  • 2.525252.... is a non-terminating and recurring number.

  • 2.525252.... can be expressed as [tex]2.\overline {52}[/tex]

  • Now, we convert [tex]2.\overline {52}[/tex] as a fractional number. Lets start.

  • [tex]Let \: x =2.\overline {52}[/tex]........(1)

  • Multiply both sides of eq (1) by 100, we find:

  • [tex]100x =252.\overline {52}[/tex]........(2)

  • Subtracting (2) from (1)

  • [tex]100x -x=252.\overline {52}-2.\overline {52}[/tex]

  • [tex]\implies 99x=250[/tex]

  • [tex]\implies x=\frac{250}{99}[/tex]

  • Numerator = 250

  • Denominator = 99

  • Sum of numerator and denominator = 250 + 99 = 349

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