Algebra II - Transformations of Polynomial Functions

$g(x)=4(2x-6)^{5}$

What transformations have been enacted upon when compared to its parent function, $f(x)=x^{5}$ ?

vertical stretch by a factor of 4

horizontal compression by a factor of 2

horizontal translation 3 units right

vertical stretch by a factor of 4

horizontal stretch by a factor of 2

horizontal translation 3 units right

vertical stretch by a factor of 4

horizontal stretch by a factor of 2

horizontal translation 6 units right

vertical stretch by a factor of 4

horizontal compression by a factor of 2

horizontal translation 6 units right

Explanation

First, we need to get this function into a more standard form.

$g(x)=4(2x-6)^{5}$

$g(x)=4[2(x-3)]^{5}$

Now we can see that while the function is being horizontally compressed by a factor of 2, it's being translated 3 units to the right, not 6. (It's also being vertically stretched by a factor of 4, of course.)

Shift to up two units. What is the new equation?

Explanation

We will need to determine the equation of the parabola in standard form, which is:

Use the FOIL method to expand the binomials.

Shifting this up two units will add two to the value of .

The answer is:

Transform the function by moving it two units up, and five units to the left:

Explanation

To transform a function we use the following formula,

where h represents the horizontal shift and v represents the vertical shift.

In this particular case we want to shift to the left five units,

and vertically up two units,

Therefore, the transformed function becomes,

$\f(x)=(x-h)^2+v \f(x)=(x--5)^2-1+2 \f(x)=(x+5)^2+1$ .

Write the transformation of the given function flipped, and moved one unit to the left:

Explanation

To transform a function horizontally, we must add or subtract the units we transform to x directly. To move left, we add units to x, which is opposite what one thinks should happen, but keep in mind that to move left is to be more negative. To flip a function, the entire function changes in sign.

After making both of these changes, we get

Write the transformation of the given function moved five units to the left:

Explanation

To transform the function horizontally, we must make an addition or subtraction to the input, x. Because we are asked to move the function to the left, we must add the number of units we are moving. This is the opposite of what one would expect, but if we are inputting values that are to the left of the original, they are less than what would have originally been. So, to counterbalance this, we add the units of the transformation.

For our function being transformed five units to the left, we get