Unit 9 Writing and Solving Quadratic Equations
quadratic term
A term of degree two
Real Roots/Real Solutions
Can be found where the graph crosses the x-axis
Zeros of a quadratic equation
Points where the graph crosses the x-axis where the y-coordinate of the point is zero; (x, 0)
Quadratic Equation
Polynomial with degree 2
A quadratic equation will have two real solutions when...
The graph crosses the x axis in two places
Parabola
The shape of a the graph of a quadratic function
minimum value of a function
The y-value of the point where the graph changes from decreasing to increasing
Vertex Form
a way of writing a quadratic equation such that the vertex (h, k) is identifiable in the equation
standard form of a quadratic equation
ax² + bx + c = 0 such that a cannot be equal to zero
Discrminant
b^2-4ac
intercept form of a quadratic equation
the form y = a(x - p)(x - p), where the x-intercepts of the graph are p and q
quadratic formula
the formula used to find the solutions of a quadratic equation
maximum value of a function
the greatest y-value of a function
vertex of a parabola
the highest or lowest point on the graph
axis of symmetry
the line that cuts the graph into two symmetrical parts
A quadratic equation will have no real solutions when...
the parabola does not cross the x axis
x-intercept
the point where a graph crosses the x-axis
y-intercept
the point where the graph crosses the y-axis
factored form quadratic
the product of a constant and two linear terms
A quadratic equation will have one real solution when...
the vertex of the parabola is on the x axis
Zero Product Property
When the product of two or more factors is zero, one of the factors must equal zero.
