How do you use the important points to sketch the graph of #y = 2x^2 + x − 15#?

1 Answer
turksvids
Feb 10, 2018

See explanation.

Explanation:

We can factor #2x^2+x-15=(2x-5)(x+3)#.

From this we know the #x#-intercepts are #(5/2,0)# and #(-3,0)#.

The #x#-coordinate of the vertex is located at the average of the #x#-coordinates of the intercepts, so at #x=-1/4#. The #y#-value of the vertex can be found by substitution:

#(2(-1/4)-5)(-1/4+3) = -121/8#.

So the vertex is #(-1/4, -121/8)#.

The #y#-intercept is found by substituting #x=0# to get #y=-15#, so the #y#-intercept is #(0,-15)#.

Plotting all of these points and sketching a parabola through them we get the graph we want.

graph{y=2x^2+x-15 [-16.83, 23.17, -14.96, 5.04]}

Related questions
See all questions in Quadratic Functions and Their Graphs
Impact of this question
1184 views around the world
You can reuse this answer
Creative Commons License