Answer:
[tex] \displaystyle \large \boxed{ - 2x( x - 3)(x - 1)} [/tex]
Step-by-step explanation:
We are given the expression:
[tex] \displaystyle \large{8 {x}^{2} - 6x - 2 {x}^{3}} [/tex]
Notice how the expression has same x-term but not same degree, we can common factor out the x.
Factor using LCF (Least Common Factor which is 2x because 8 and 6 are multiples of 2.)
Therefore:-
[tex] \displaystyle \large{2x(4x - 3 - {x}^{2}) } [/tex]
Inside the brackets, we can still factor. First, arrange the expression:-
[tex] \displaystyle \large{2x( - {x}^{2} + 4x - 3) } [/tex]
Factor -1 or negative sign out of the expression:
[tex] \displaystyle \large{ - 2x( {x}^{2} - 4x + 3) } [/tex]
Factor x^2-4x+3 using two brackets.
What two numbers add/subtract each others and yield -4? The two numbers must multiply and yield 3 as well.
- -3 and -1 seem right value because -3-1 = -4 and -3(-1) is 3.
Thus:-
[tex] \displaystyle \large{ - 2x( x - 3)(x - 1)} [/tex]
And we're done!
