Consider the following decimal expansions.

To determine which fraction is correctly converted into its decimal equivalent, we can evaluate each option:

A. \( \frac{48}{999} \):

• This fraction can be simplified to \( 0.048 \).

B. \( \frac{4,772}{999} \):

• This fraction gives a decimal equivalent of \( 4.772 \).

C. \( \frac{5}{999} \):

• This fraction equals \( 0.005 \), not \( 0.0005 \).

D. \( \frac{5,76}{999} \):

• This fraction would be \( 5.076 \).

Now we can analyze the decimal expansions in context of the pattern observed with other fractions:

1. \( \frac{7}{999} = 0.007 \) corresponds to a fraction with a single digit (7) gives three decimal places.
2. \( \frac{59}{999} = 0.059 \) corresponds to a two-digit decimal giving three decimal places.
3. \( \frac{1,388}{999} = 1.388 \) corresponds to a four-digit numerator giving three digits before the decimal point and three decimal places.

Now let's check with our options:

A. \( \frac{48}{999} = 0.048 \) is consistent. B. \( \frac{4,772}{999} = 4.772 \) is also consistent.

C. \( \frac{5}{999} \) should be \( 0.005 \) but is incorrectly stated as \( 0.0005 \), so it's inconsistent.

D. \( \frac{5,76}{999} = 5.076 \) is consistent.

Thus, A, B, and D are correct, but since we must choose one, the clear choice from your original statement is B:

B. \( \frac{4,772}{999} = 4.772 \)

What is the fraction form of the following decimal expansion?
4.372

To convert the decimal \(4.372\) into fraction form, we can follow these steps:

1. Separate the whole number from the decimal: \[ 4.372 = 4 + 0.372 \]

2. Convert the decimal part \(0.372\) into a fraction:

   • The decimal \(0.372\) can be expressed as: \[ 0.372 = \frac{372}{1000} \] This is because there are three digits after the decimal point.

3. Simplify the fraction:

   • To simplify \(\frac{372}{1000}\), we must find the greatest common divisor (GCD) of \(372\) and \(1000\).
   • The prime factorization of \(372\) is: \[ 372 = 2^2 \times 3 \times 31 \]
   • The prime factorization of \(1000\) is: \[ 1000 = 2^3 \times 5^3 \]
   • The GCD is \(4\) (the common factor is \(2^2\)).
   • Now we simplify: \[ \frac{372 \div 4}{1000 \div 4} = \frac{93}{250} \]

4. Combine the whole number and the fractional part:

   • The whole number \(4\) can be expressed as a fraction with the same denominator: \[ 4 = \frac{4 \times 250}{250} = \frac{1000}{250} \]
   • Now add the two fractions: \[ 4.372 = 4 + 0.372 = \frac{1000}{250} + \frac{93}{250} = \frac{1000 + 93}{250} = \frac{1093}{250} \]

Thus, the decimal \(4.372\) in fraction form is: \[ \frac{1093}{250} \]