Multiply (2x^2-3x)(3x^2+2x-1)

Question 1

Question 2

Answer:

Step-by-step explanation: -9X3+12x2-x-2

Question 3

ANSWER:

Multiplication of
$\left(2 x^(2)-3 x\right) \text { and }\left(3 x^(2)+2 x-1\right) \text { is } 6 x^(4)-5 x^(3)-8 x^(2)+3 x$

SOLUTION:

We need to multiply
$\left(2 x^(2)-3 x\right) \text { and }\left(3 x^(2)+2 x-1\right)$

$=\left(2 x^(2)-3 x\right)\left(3 x^(2)+2 x-1\right)$

$=2 x^(2)\left(3 x^(2)+2 x-1\right)-3 x\left(3 x^(2)+2 x-1\right)$

$=\left(2 x^(2) * 3 x^(2)\right)+\left(2 x^(2) * 2 x\right)+\left(2 x^(2) *(-1)\right)-\left(3 x * 3 x^(2)\right)-(3 x * 2 x)-(3 x *(-1))$

=6 x^(4)+4 x^(3)-2 x^(2)-9 x^(3)-6 x^(2)+3 x

=6 x^(4)+(4-9) x^(3)-(2+6) x^(2)+3 x

=6 x^(4)-5 x^(3)-8 x^(2)+3 x

Hence, multiplication of
$\left(2 x^(2)-3 x\right) \text { and }\left(3 x^(2)+2 x-1\right) \text { is } 6 x^(4)-5 x^(3)-8 x^(2)+3 x$

Please log in or register to add a comment.