Exploring the Graphs of Polynomial Functions

Zeros, factors, x-intercepts, solutions

Zeros, roots, x-intercepts, solutions

Zeros, roots, y-intercepts, solutions

Zeros, roots, x-intercepts, factors

It indicates the zeros or roots of the function.

It indicates the points where the function is undefined.

It indicates the maximum or minimum points.

It indicates the y-intercepts.

Multiply by a constant.

Divide by x.

Regroup the terms.

Find the common factor.

1, -3, 3

-1, 1, -3

1, -1, 3

-1, 1, 3

It has squared factors.

It has a leading coefficient of 1.

It has a common factor of x.

It has no real roots.

The zero is a rational number.

The zero has an odd multiplicity.

The zero has an even multiplicity.

The zero is a complex number.

It forms a vertical asymptote.

It touches and turns around.

It crosses the x-axis.

It remains constant.

3

4

2

1

It remains above the x-axis.

It forms a cusp.

It crosses the x-axis.

It bounces off the x-axis.

The graph oscillates.

The graph forms a vertical asymptote.

The graph becomes more flattened out.

The graph becomes steeper.