Question

How do you determine the value(s) of k such that the system of linear equations has the indicated number of solutions: no solutions for x + 2y + kz = 6 and 3x + 6y + 8z = 4?

Answer 1

Find the values that have a solution and exclude them.

`k!=(14-8z)/(3z)` for the equations to NOT to have solutions

Note: `z!=0` as it becomes undefined. (not allowed to divide by 0)

Explanation:

Given:

`x+2y+kz=6" "....................Equation(1)`
`3x+6y+8z=4" "...................Equation(2)`

`color(blue)("Consider "Equation(1))`

Manipulation gives:
`y= -1/2 x-1/2 kz+3" "...............Equation(1_a)`

`color(blue)("Consider "Equation(1))`
Manipulation gives:

`y=-3/6 x-8/6 z+4/6`

`y=-1/2 x-4/3 z+2/3" ".........................Equation(2_a)`

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Set `Equation(1_a)=Equation(2_a)` through `y`

`cancel( -1/2 x)-1/2 kz+3" " =" "cancel(-1/2 x)-4/3 z+2/3`

`1/2 kz" "=" "3-2/3+4/3 z`

`kz=2(7/3+4/3 z)`

`k=(14-8z)/(3z)` for the equation to have solutions. So we have:

`k!=(14-8z)/(3z)` for the equation NOT to have solutions