Completely factor the expression 16t3 − 50t2 + 36t. A. 2t(8t − 9)(t − 2)

B. Prime
C. 2t(8t + 9)(t + 2)

D. 2t(8t − 25t + 18)
  Completely factor the expression 48u4v4 − 18u2v2 − 3u8v5.

A. Nonfactorable
B. 3u2v2(16u2v2 − 6 − u6v3) C. 3(16u4v4 −6u2v2 − u8v5) D. u2v2(48u2v2 − 18 −3u6v3)

Completely factor the expression y2+ 12y + 35. A. (y + 7)(y − 5)
B. (y − 7)(y − 5)
C. (y + 7)(y + 5)

D. Prime

lease help i am so mad right now

See previous post: Thu, 5-14-15, 1:23 PM

To factor the given expressions, you can follow these steps:

1. For the first expression, 16t^3 - 50t^2 + 36t:
- First, check if there is a common factor among all terms. In this case, the common factor is 2t:
2t(8t^2 - 25t + 18)
- Then, factor the quadratic expression inside the parentheses:
2t(8t - 9)(t - 2)
Therefore, the correct answer is A. 2t(8t - 9)(t - 2).

2. For the second expression, 48u^4v^4 - 18u^2v^2 - 3u^8v^5:
- First, notice that all terms have a common factor of 3u^2v^2:
3u^2v^2(16u^2v^2 - 6 - u^6v^3)
- Then, there are no further common factors in the expression inside the parentheses, so the factoring is complete.
Therefore, the correct answer is B. 3u^2v^2(16u^2v^2 - 6 - u^6v^3).

3. For the third expression, y^2 + 12y + 35:
- Since there are no common factors, you need to find two binomials whose product equals the given expression.
- The terms 7 and 5 add up to 12 and multiply to 35, so the factors are (y + 7)(y + 5).
Therefore, the correct answer is C. (y + 7)(y + 5).

Remember to carefully apply the factoring methods, look for common factors, and use techniques such as factoring quadratics or finding suitable binomials to factor polynomials.