Quadratic matching

Can you match each graph to one of the statements?

Exploring and noticing Working systematically Conjecturing and generalising Visualising and representing Reasoning, convincing and proving
Being curious Being resourceful Being resilient Being collaborative

Problem



Can you match each graph to one of the statements (so that each graph is paired with a single statement)?

(1)                                                                 (2)

Image
Quadratic Matching
Image
Quadratic Matching


(3)                                                                 (4)
Image
Quadratic Matching
Image
Quadratic Matching



 



(5)                                                                 (6)
Image
Quadratic Matching
Image
Quadratic Matching


 
(7)                                                                 (8)
Image
Quadratic Matching
Image
Quadratic Matching



 



(9)
Image
Quadratic Matching

 



Assume that all the graphs have an equation of the form $y= ax^2 + bx + c$.

(a) The line of symmetry of this graph is $x=3$.

(b) This function has a non-integer root.

(c) The line of symmetry of this graph is $x=k$, where $k<0$.

(d) The $y$ values for this graph are all greater than $0$ (that is, $y>0$).

(e) The vertex of this graph lies on the line $x=1$.

(f) The constant term of this function is $-8$ (that is, $c=-8$).

(g) The sum of the roots of this function are $6$.

(h) The points $(0,8)$ and $(2,8)$ both lie on this curve.

(i) The sum of the roots of this function is an odd number (that is, $\frac ba$ is odd). 

With thanks to Don Steward, whose ideas formed the basis of this problem.