Simplify by removing factors of 1 . \( \frac{16 y-12}{36} \) The simplified form is

To simplify \( \frac{16y - 12}{36} \), we first factor out the greatest common factor from the numerator. The GCF of 16 and 12 is 4, so we can rewrite the numerator: \( 16y - 12 = 4(4y - 3) \) Now we can rewrite the fraction: \( \frac{4(4y - 3)}{36} \) Next, we notice that 4 and 36 can also be simplified, as 4 is a factor of 36: \( 36 = 4 \times 9 \) Thus, simplifying gives us: \( \frac{4(4y - 3)}{4 \times 9} = \frac{4y - 3}{9} \) So, the simplified form is: \( \frac{4y - 3}{9} \)