0.33 as a fraction
Understand the Problem
The question is asking for the decimal number 0.33 to be converted into a fraction. The approach involves identifying the equivalent fraction for the decimal value, which typically requires expressing the decimal as a fraction with a denominator that's a power of ten.
Answer
\( \frac{33}{100} \)
Answer for screen readers
The final answer is ( \frac{33}{100} )
Steps to Solve
- Write the decimal as a fraction with a power of ten denominator
Since 0.33 has two decimal places, we can write it as:
$$ 0.33 = \frac{33}{100} $$
- Simplify the fraction
To simplify, find the greatest common divisor (GCD) of the numerator (33) and the denominator (100). In this case, the GCD is 1, so the fraction is already in its simplest form:
$$ \frac{33}{100} $$
The final answer is ( \frac{33}{100} )
More Information
The fraction ( \frac{33}{100} ) represents the same value as the decimal 0.33. Fractions are another way to represent decimals, and vice versa.
Tips
A common mistake is not simplifying the fraction if a simplification is necessary. Ensure that the fraction is expressed in its simplest form by finding the GCD of the numerator and the denominator and dividing both by that number.
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