Question

complete the process of solving the equation. fill in all missing terms and select all missing descriptions. simplify any fra\\(\frac{v + 3}{4} = 13\\)\\(v + 3 = \square\\)\\(v = \square\\)

Explanation:

Step1: Multiply both sides by 4

To eliminate the denominator, we multiply both sides of the equation \(\frac{v + 3}{4}=13\) by 4. So, \(4\times\frac{v + 3}{4}=13\times4\), which simplifies to \(v + 3 = 52\).

Step2: Subtract 3 from both sides

To solve for \(v\), we subtract 3 from both sides of the equation \(v + 3 = 52\). So, \(v+3 - 3=52 - 3\), which gives \(v = 49\).

Answer:

For the first missing term (in \(v + 3=\square\)): \(52\) (description: Multiply both sides by 4)
For the second missing term (in \(v=\square\)): \(49\) (description: Subtract 3 from both sides)