Step-by-Step Solution for Converting 1.48 to a Fraction

Step 1: Understand the Number

The number 1.48 is a decimal, which can be broken into two parts:

• The whole number part is: 1.
• The decimal part is: 0.48.

We aim to convert the entire number into a fraction.

Step 2: Isolate the Decimal Part (0.48)

Focus on the decimal part (0.48) and represent it as a fraction.

Step 2.1: Write 0.48 as \( \frac48100 \)

The decimal 0.48 can be read as "48 hundredths." Mathematically, this is:

\[ 0.48 = \frac48100 \]

Step 2.2: Simplify the Fraction

Now simplify \( \frac48100 \) by finding the greatest common divisor (GCD) of 48 and 100.

• The GCD of 48 and 100 is: 4.
• Therefore, the simplified fraction is:

\[ \frac1225 \]

Step 3: Combine the Whole Number and Fraction

The original number 1.48 is the sum of the whole number 1 and the fraction \( \frac1225 \).

Combine these as a mixed number:

\[ 1.48 = 1 + \frac1225 = \frac37/25 \]

Step 4: Verify the Answer

To verify, divide \( \frac37/25 \):

\[ \frac37/25 = 1.48 \]

Thus, the fraction is correct.

Final Answer

The decimal 1.48 as a fraction is:

\[ \frac37/25 \]

If expressed as a mixed number:

\[ 1 12/25 \]