xA + yB to zC. If -(d[A])/(dt) = -(d[B])...

`xA + yB to zC`. If `-(d[A])/(dt) = -(d[B])/(dt) = 1.5 (d[C])/(dt)` then x,y and z are:

A

1,1,1

B

2,2,3

C

3,2,3

D

3,3,2

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