Transformations

Transformations of one polynomial function were discussed in the quadratic unit. To translate the graph of a quadratic function, we can use the vertex form of a quadratic function, f(x) = a(x - h)² + k. The transformations followed these rules:

• f (x) + k is f(x) shifted upward k units
• f (x) - k is f(x) shifted downward k units
• f (x + h) is f(x) shifted left h units
• f (x - h) is f(x) shifted right h units
• -f(x) is f(x) flipped upside down ("reflected about the x-axis")
• f (-x) is the mirror of f(x) ("reflected about the y-axis")
• af(x) stretches the graph vertically if a > 1
• af(x) shrinks the graph vertically if 0 < a < 1

If the parent function is f(x) = x², how does the graph of the function

f(x) = (x - 3)² + 4 compare?

The number inside the parentheses is -3, therefore the graph moves right 3.

The number outside the parentheses is + 4, therefore the graph moves up 4.

*Note: Other even polynomials will have transformations similar to those of quadratic functions but with some differences.

What transformation of creates the following function?

An a-value of 2 will cause a dilation or stretching by a factor of 2 along the y-axis (steeper).

An h-value of 2 will cause a shift of 2 units left.

A k-value of -4 will cause a shift of 4 units down.