Title: MODELING COMPLETING THE SQUARE
1MODELING COMPLETING THE SQUARE
Use algebra tiles to complete a perfect square
trinomial.
Model the expression x 2 6x.
Arrange the x-tiles to form part of a square.
1
1
1
1
1
1
To complete the square, add nine 1-tiles.
1
1
1
x2 6x 9 (x 3)2
You have completed the square.
2To complete the square of the expression x2 bx,
add the square of half the coefficient of x.
3What term should you add to x2 8x so that the
result is a perfect square?
SOLUTION
4Factor 2x2 x 2 0
SOLUTION
2x2 x 2 0
Write original equation.
2x2 x 2
Add 2 to each side.
Divide each side by 2.
5Write left side as a fraction.
Find the square root of each side.
6You can check the solutions on a graphing
calculator.
7CHOOSING A SOLUTION METHOD
Investigating the Quadratic Formula
ax2 bx c
Subtract c from each side.
Divide each side by a.
Add the square of half the coefficient of x to
each side.
Write the left side as a perfect square.
Use a common denominator to express the right
side as a single fraction.
8CHOOSING A SOLUTION METHOD
Investigating the Quadratic Formula
Find the square root of each side.Include on
the right side.
Solve for x by subtracting the same term from
each side.
Use a common denominator to express the right
side as a single fraction.