How do you use the graph to solve $0=x^2+6x+4$ ?

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Answer 1 · 2016-10-01T10:40:47

See below:

We're looking for where the graph intersects the X-axis (literally - we're looking for points where $y=0$ , which is the x-axis).

So let's graph the function:

graph{x^2+6x+4 [-10, 10, -5, 5]}

So where does the graph cross the x-axis? Two places:

Answer 2 · 2016-10-01T10:45:44

$x=-1.75 and x= -5.25$

First you need to have a graph of the parabola $y = x^2+6x+4$

You can do this by working out points and plotting them.

Now compare the equation of the graph with the equation to be solved:

$color(red)(y) = x^2+6x+4$
$color(red)(0)= x^2+6x+4$

You will see that the two equations are the same, except that where one has $y$ , the other has $0$ .

This means that we want to know what value of x will give $y = 0$ .
Use the graph to solve this....

$y=0$ is the equation of the $x-$ axis

The question is actually asking, ......
"where does the parabola intersect the $x$ -axis?"

Find the values from the graph. $x=-1.75 and x= -5.25$

graph{x^2+6x+4 [-7.655, 2.345, -2.69, 2.31]}

How do you use the graph to solve 0=x^2+6x+40=x^2+6x+4?