To determine what constant should be added to the expression x² + 6x in order to form a perfect square trinomial, we can follow a systematic approach.
A perfect square trinomial can be expressed in the form (a + b)², which expands to a² + 2ab + b². In our case, we need to rewrite the expression such that it fits this format.
We start with the first two terms of our expression:
x² + 6xHere, we can observe:
- a is the coefficient of x², which is simply x.
- 2ab corresponds to the term 6x. To find b, we can set up the equation:
2ab = 6x
We can simplify this to:
2(x)(b) = 6xDividing both sides by 2x gives us:
b = 3Now, we know that (x + 3)² would produce the desired form, but we must add b² to complete the perfect square trinomial:
b² = 3² = 9Thus, to form a perfect square trinomial from x² + 6x, we need to add 9.
Finally, our complete perfect square trinomial will be:
x² + 6x + 9 = (x + 3)²In summary, the constant that should be added to the expression x² + 6x to create a perfect square trinomial is 9.