Chapter 1.

1.1 Problem Statement

{4,6,8,10,12,14}

$c/2

$cdiv2+1

2*$cdiv2plus1

-1*$cdiv2plus1times2

Complete the square and find the minimum or maximum value of the quadratic function.

y = 2x² - 4x - $c

1.2 Step 1

Completing the square of a quadratic function, y = ax² ± bx + c, means to edit its form by appropriately adding and subtracting a constant so that the function contains a perfect square trinomial and can be rewritten as y = a(x ± h)² + k, where a, h and k are constants. There are multiple approaches to accomplishing this.

Question Sequence

Question 1.1

The approach of this tutorial will begin by factoring out the leading coefficient, the coefficient of x², to make it 1.

y = 2x² - 4x - $c = 2(x² - XvVM00l89Is=x - 2m8LMWO29ieZby3A)

Incorrect

Correct

1.3 Step 2

Now we can focus on x² - 2x - $cdiv2 and we will remember to multiply it by 2 in Step 4 of this tutorial.

Question Sequence

Question 1.2

We want to complete the square for the terms x² − 2x by adding and subtracting the square of half the coefficient of x, , and grouping the first three terms which forms a perfect square trinomial.

x² - 2x = x² - XvVM00l89Is=x +

= (x² - 2x + 0VV1JcqyBrI=) - 1

= (x - 0VV1JcqyBrI=)² - 1

Incorrect

Correct

1.4 Step 3

Question Sequence

Question 1.3

Substituting (x − 1)² − 1 for x² − 2x in the quadratic x² − 2x − $cdiv2 we have the following.

(x² - 2x) − $cdiv2 = ((x - 1)² - 1) - $cdiv2

= (x - 1)² - jajrMk3PoV7AciqBQMDtEA==

Correct.

Incorrect.

1.5 Step 4

Question Sequence

Question 1.4

Now, substituting from Steps 1 to 3 into the original quadratic y = 2x² − 4x − $c, the completed square form of the quadratic function in the form y = a(x ± h)² + k is

y = 2x² − 4x − SFgqQUkJGdg=

= 2(x² − 2x − 2m8LMWO29ieZby3A)

= 2((x - 1)² − jajrMk3PoV7AciqBQMDtEA==)

= 2(x - 1)² − pdjJ+iAU87jvS8mqm1FimztGaJPzTZEy

Correct.

Incorrect.

1.6 Step 5

The maximum value (or minimum value) of a function is the greatest (or least) value of y = f(x) for any value of x in the domain of the function.

Question Sequence

Question 1.5

The term 2(x - 1)²WLwv7gONmdTuBoqL/S40/M2xUdssSlsqcmmkfIYB8q/ziZof/nqwCawAHmKzYxeH 0 for all x. Thus 2(x - 1)²-$cdiv2plus1times2 WLwv7gONmdTuBoqL/S40/M2xUdssSlsqcmmkfIYB8q/ziZof/nqwCawAHmKzYxeH -$cdiv2plus1times2 for all x.

Correct.

Incorrect.

1.7 Step 6

Question Sequence

Question 1.6

Since 2(x - 1)²-$cdiv2plus1times2 ≥ -$cdiv2plus1times2, or simply y ≥ -$cdiv2plus1times2, the iNI7R+IXqcLnJfkJtmHHDPtsRW8= value of y is qjqZz1N+poo= at x = 0VV1JcqyBrI=.

Correct.

Incorrect.