•Topic:
Factoring polynomials
Aim: How can we write a quadratic expression from a product of two binomial factors?
Aim: How can we write a quadratic expression from a product of two binomial factors?
•Do
Now: What is the quadratic expression given the
•factors
(x+2)(x-5)?
•The
product in standard form
•(x+2)(x-5)
•FOIL
method:
•First:
(x) (x) = x2
•Outer:
(x) (-5) = -5x
•Inner:
(2) (x) =
2x
•Last:
(2)
(-5) = -10
•Standard
form of the quadratic expression is:
•X2 - 5x + 2x -10 = x2
-
3x -10
•Complete
a, b, c
•Find
the quadratic expression in standard form
•Finding
the factors given the quadratic expression in standard form
•x2 + 5x + 6
•Use
the diamond method:
•
•+5
(add)
+3 +2
•+6
(multiply)
•
•Factors
are (x+ 3)(x+2).
•Check
using FOIL to see if you are correct!
•Complete
a – f
•Get
the factors given the quadratic expression
•Complete
your final project on quadratics
•Complete
all parts of the assignment!
•
•All
questions # 1, 2 (page 25)
•All
questions #1 – 3 (page 24)
•
•Make
sure you show all work clearly and include your name and period on your answer
sheets.
•Leave
in basket in front of room by the time the bell rings
•Do
NOT leave your work in your folder!!!
•Perfect
squares
•Multiply
each of these expressions to get a quadratic expression:
•
•(x +
4)2 =
(x+4)(x+4)
•F: x2
•O: 4x
•I: 4x
•L: 16
•x2 + 8x + 16
•Exit
slip
•How
do the factors you found in Question #2 relate to the x-intercepts if you were
to graph each quadratic expression?
•
•Recall
the graph of a quadratic is a parabola.
•
