Direct Variation Equations — Free Game

Direct Variation Equations

A direct variation is a special type of linear relationship where two variables are directly proportional. In this relationship, as one variable increases or decreases, the other does the same at a constant rate.

The equation for a direct variation is always written in the form: $y = kx$ where $k$ is a non-zero number called the constant of variation (or constant of proportionality).

Key Features of Direct Variation

Direct variation equations have a few unique characteristics that make them easy to spot:

No y-intercept term: Unlike the general linear equation $y = mx + b$ , a direct variation equation has a $y$ -intercept of zero ( $b = 0$ ).
Passes through the origin: Because $b = 0$ , the graph of a direct variation is always a straight line that passes exactly through the origin $(0, 0)$ .

Identifying Direct Variation Equations

To determine if an equation represents a direct variation, check if it can be written strictly as $y = kx$ with nothing added or subtracted.

Example 1: Which represents direct variation: $y = 2x$ or $y = 2x + 1$ ?

$y = 2x$ is a direct variation because it perfectly matches the $y = kx$ format, where $k = 2$ .
$y = 2x + 1$ is not a direct variation. The $+ 1$ means the line crosses the y-axis at $1$ , not $0$ .

Example 2: Is $y = 4x$ a direct variation?

Yes, it is a direct variation. It is in the form $y = kx$ with a constant of variation $k = 4$ .

Solving Direct Variation Problems

If a problem states that " $y$ varies directly with $x$ ," you can use a given pair of $x$ and $y$ values to find the constant $k$ and write the full equation.

Example 3: If $y$ varies directly with $x$ , and $y = 12$ when $x = 3$ , find $k$ and write the equation.

Start with the formula: $y = kx$
Substitute the given values: $12 = k(3)$
Solve for $k$ : Divide both sides by $3$ . $k = \frac{12}{3} = 4$
Write the final equation: Now that you know $k = 4$ , plug it back into the general formula. $y = 4x$

Once you have the equation $y = 4x$ , you can use it to find $y$ for any other value of $x$ , or vice versa!