# Where is the vertex in the parabola y = x^2 +2x - 5? i dont understand this i need x and y intercepts and please show work?

##### 2 Answers

Vertex (-1, -6)

#### Explanation:

y = x^2 + 2x - 5

The x-coordinate of vertex is given by the formula:

x = - b/(2a) = - 2/2 = - 1

The y- coordinate of Vertex is given by y(-1), when x = -1 -->

y(-1) = (-1)^2 + 2(-1) - 5 = - 6

Vertex (-1, -6)

graph{x^2 + 2x - 5 [-20, 20, -10, 10]}

Vertex

Y-intercept

x-intercept

x-intercept

#### Explanation:

Given -

#y=x^2+2x-5#

Vertex is the point where the curve turns.

To find this point - first you have to calculate

for what value of

#x=(-b)/(2a)#

Where -

#x=(-2)/(2xx1)=(-2)/2=-1#

When

#y=(-1)^2+2(-1)-5=1-2-5=-6#

At point

Vertex

Look at the graph.

What is

It is the point at which the curve cuts the Y-axis. Look at the graph. At

How to find it out?

Find the What is the value of

At

At point

Y-intercept

What is X-intercept?

It is the point at which the curve cuts the x-axis. Look at this graph. The curve cuts the x axis at two points. Then, how to find it out. Find the value(s) of

#x^2+2x-5=0#

Solve to find the value of#x# [Squaring method is used]

#x^2+2x=5#

#x^2+2x+1=5+1=6#

#(x+1)^2=6#

#x+1=+-sqrt6=+-2.449#

#x=2.449-1=1.449#

x-intercept

#x=-2.449-1=-3.449#

x-intercept