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Complete the square to writey= x2 + 4x +9 in graphing form.

Complete the square to writey= x2 + 4x +9 in graphing form.-example-1
User Johnnycrash
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1 Answer

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In order to express y = x² + 4x +9 in graphing form and graphing it we can follow these steps:

1. complete squares to express the equation in the form y = (x - p)² + q

We have to add and subtract (b/2)² on the right, where b is the coefficient of the second term of the equation

y = x² + 4x +9 + (4/2)² - (4/2)²

y = x² + 4x +9 + (2)² - (2)²

We can gorup and factor some terms of the equation by applying the following formula:

(x + a)² = x² + 2ax + a²

then by writing 4x as 2×2x we get:

y = x² + 2×2x + (2)² - (2)² +9

y = (x + 2)² - (2)² + 9

y = (x + 2)² - 4 + 9

y = (x + 2)² + 5

For an equation of the form y = (x - p)² + q, the vertex is (q, p), then, the vertex of the parabola is (-2, 5)

2. Determine the x-intercepts by replacing 0 for y and solving for x, like this:

0 = (x + 2)² + 5

0 - 5 = (x + 2)² + 5 - 5

-5 = (x + 2)²

±√-5 = √(x + 2)²

±√-5 = x + 2

x = -2 ± √-5

As you can see, on the right side the argument of the square root is a negative number, which makes the solution of this equation a complex number, then which means that the parabola won't intercept the x-axis.

3. Find the y-intercept by replacing 0 for x:

y = (0 + 2)² + 5

y = (2)² + 5

y = 4 + 5

y = 9

Then, the y-intercept of this parabola is (0, 9)

By graphing the vertex (-2, 5) and the y-intercept (0, 9) and joining them with the parabola we get the following graph:

Complete the square to writey= x2 + 4x +9 in graphing form.-example-1
User Mbochynski
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