Question

How do you write `p(x) = |x-1| +4` as a piecewise function?

Answer 1

Use the definition of the absolute value function:

`|a| = {(a; a >=0),(-a;a<0):}`

Explanation:

Given: `p(x) = |x-1| +4`

Please observe that `a = x-1` with regard to the definition:

`|x-1| = {(x-1; x-1 >=0),(1-x;x-1<0):}`

Simplify the inequalities

`|x-1| = {(x-1; x >=1),(1-x;x<1):}`

Add 4 to both sides:

`|x-1|+4 = {(x-1+4; x >=1),(1-x+4;x<1):}`

Simplify the right side and substitute `p(x)` on the left:

`p(x) = {(x+3; x >=1),(5-x;x<1):}`