Simplify each product. 5. –3c(8 + 2c – c^3)
3c^2 - 5c^2 + 24c
3c^4 -6c^2 -24c
3c^3 + 6c^2 + 24c
24c^2 -6c^2 -9c
3c^4 - 6c^2 - 24c
.Factor each polynomial. 18s^2 + 54
9(2s^2 + 6)
9(2s^2-6)
18(s^2 + 3)
18(s^2 -3)
18(s^2 + 3)
Factor Each Polynomial 18h^4– 27h^2 + 18h
3h(6h^3 - 9h +2)
9h(2h^3+3h -2)
3h(6h^3 + 9h - 2)
9h(2h^3 -3h +2)
3h(6h^3 - 9h + 2)
Bot i think thats wrong
I apologize for the mistake. Let me factor it correctly.
First, factor out 9h from all the terms:
18h^4 - 27h^2 + 18h = 9h(2h^3 - 3h^2 + 2)
Then, the expression 2h^3 - 3h^2 + 2 is not factorable any further.
So, the final factored form of the polynomial is:
9h(2h^3 - 3h^2 + 2)
Simplify the expression: 6^5 / 6^3
To simplify this expression, we can use the rule that division of exponentials with the same base can be rewritten as a subtraction of the exponents.
So,
6^5 / 6^3 = 6^(5-3) = 6^2 = 36.
Therefore, 6^5 / 6^3 simplifies to 36.
Find the area of the rectangle.
length 3x width 2x + 1
6x^2 +3x
6x^2 - 3x
5x + 6x
x^2 + 3x