Question

How do you write a system of equations with one solution, a system of equations with no solution and a system of equations with infinitely many solutions?

Answer 1

Answer for linear systems assuming the student knows about lines, graphing lines and slopes:

(i) For one solution: use two lines that have different slopes.
(ii) For no solutions: use two lines that have the same slope, but different `y` imtercepts
(iii) For infinitely many solutions use two different (looking) equations for the same line:

(i): `y=3x-4` and `y=5x-4`
or `y=5/7x+1` and `y=-2x+9`

(ii) `y=3x-4` and `y=3x+9`

(iii) It's a bit pointless to write these in slope-intercept form:
`y=3x-4` `rarr` `3x-y=4`
`y=3x-4` `rarr` `-3y=-9x+12` `rarr` `9x-3y=12`

So a system is:
`3x-y=4`
`9x-3y=12`

The above is a bit obvious, so I would use:
`6x-2y=8`
`9x-3y=12`