Q: What are the Conditions for parallelism and perpendicularity of linear functions?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

They are not. A vertical line is not a function so all linear equations are not functions. And all functions are not linear equations.

Linear equations are a small minority of functions.

Most functions are not like linear equations.

There are linear functions and there are quadratic functions but I am not aware of a linear quadratic function. It probably comes from the people who worked on the circular square.

y = 0 and y = 1 are two linear functions. They're not especially interesting ones.

Related questions

All linear equations are functions but not all functions are linear equations.

They are not. A vertical line is not a function so all linear equations are not functions. And all functions are not linear equations.

Linear equations are always functions.

Linear equations are a small minority of functions.

Most functions are not like linear equations.

A linear equation is a special type of function. The majority of functions are not linear.

There are linear functions and there are quadratic functions but I am not aware of a linear quadratic function. It probably comes from the people who worked on the circular square.

Linear equations are a tiny subset of functions. Linear equations are simple, continuous functions.

Functions that do not result in a line when graphed.

y = 0 and y = 1 are two linear functions. They're not especially interesting ones.

A linear function is of the form y = ax + b

Yes.