# How do you write 5x = 10y + 15 in standard form?

$x - 2 y - 3 = 0$

#### Explanation:

The standard form of a straight line is $a x + b y + c = 0$

hence the standard form of given equation: $5 x = 10 y + 15$ is

$5 x - 10 y - 15 = 0$

$5 \left(x - 2 y - 3\right) = 0$

$x - 2 y - 3 = 0$

Jul 23, 2018

$5 x - 10 y = 15$

#### Explanation:

$\text{the equation of a line in "color(blue)"standard form}$ is.

$\textcolor{red}{\overline{\underline{| \textcolor{w h i t e}{\frac{2}{2}} \textcolor{b l a c k}{A x + B y = C} \textcolor{w h i t e}{\frac{2}{2}} |}}}$

$\text{where A is a positive integer and B, C are integers}$

$\text{subtract "10y" from both sides}$

$5 x - 10 y = 15 \leftarrow \textcolor{red}{\text{in standard form}}$