Step 1: 3(7y2 + 24y - 16)
Step 2: 3(7y - 4)(y + 4)
Assuming original expression was equal to zero, y = 4/7 or -4
6X + 33(2X + 1)==========( all the factoring I see to do here )
Very little factoring. 7X + 4X X(7 + 4) ======
(x + 8)(x + 2)
(x + 4)(2x + 3)
9x squared plus 16 = 0 factored is plus and minus 4/3 i.
Special product and factoring
6X + 33(2X + 1)==========( all the factoring I see to do here )
Very little factoring. 7X + 4X X(7 + 4) ======
3 x 7 x y x y
(x + 8)(x + 2)
(x + 2)(a + b)
(x + 4)(2x + 3)
(y + 6)(y + 3)
Factoring a quadratic expression of the form ( ax^2 + bx + c ) (where ( a \neq 1 )) typically involves methods like grouping or using the quadratic formula to find roots, as the leading coefficient complicates direct factoring. In contrast, for ( x^2 + bx + c ) (where ( a = 1 )), factoring is more straightforward, often relying on finding two numbers that multiply to ( c ) and add to ( b ). The presence of ( a ) changes the approach required, necessitating additional steps to factor out the leading coefficient or adjust the factoring process accordingly.
9x squared plus 16 = 0 factored is plus and minus 4/3 i.
(2x - 7)(x - 2)
x2 + 5xy - 18y2 can not be factored.