Convert 0.2727... to a rational number in simplest form.(1 point)

The correct response is:
27 over 99

Convert 0.5555... to a fraction(1 point)

To convert 0.5555... to a fraction, let's assign x to the repeating decimal:

x = 0.5555...

Then, multiply both sides of the equation by 10 to move the decimal point one place to the right:

10x = 5.5555...

Now, subtract the original equation from the above equation to eliminate the repeating decimal:

10x - x = 5.5555... - 0.5555...

This simplifies to:

9x = 5

Divide both sides of the equation by 9 to solve for x:

x = 5/9

Therefore, 0.5555... can be written as the fraction 5/9.

Convert .33... to a fraction.(1 point)
Responses

33100
33 over 100

310
3 tenths

13
1 third

333

To convert the decimal notation ".33..." to a fraction, let's assign x to the repeating decimal:

x = 0.33...

Then, multiply both sides of the equation by 100 to move the decimal point two places to the right:

100x = 33.33...

Now, subtract the original equation from the above equation to eliminate the repeating decimal:

100x - x = 33.33... - 0.33...

This simplifies to:

99x = 33

Divide both sides of the equation by 99 to solve for x:

x = 33/99

Simplifying the fraction, we find that both the numerator and denominator can be divided by 33:

x = 1/3

Therefore, the decimal ".33..." can be written as the fraction 1/3.

If a repeating decimal has a repeating cycle of three digits, it will convert to a rational number with what denominator?(1 point)
Responses

1,000
1,000

999
999

100
100

99

If a repeating decimal has a repeating cycle of three digits, it will convert to a rational number with a denominator of 99.