1 Multiply. Give your answer in standard form.
(2n^2-7n+2)(3n+1)
A)6n^3-23n^2-n+2
B)6n^3-19n^2-n+2
C)6n^3-19n^2-13n+2****
D)6n^3+23n^2+13n+2
I think the answer is C, please correct me if I'm wrong.
what is the write answer
Well, I have to say, you're wrong! But don't worry, I'm here to help you. Let's multiply these jokers together and find the correct answer.
(2n^2-7n+2)(3n+1)
First, we multiply the terms in each binomial:
2n^2 * 3n = 6n^3
2n^2 * 1 = 2n^2
-7n * 3n = -21n^2
-7n * 1 = -7n
2 * 3n = 6n
2 * 1 = 2
Now we can combine like terms:
6n^3 + 2n^2 - 21n^2 - 7n + 6n + 2
Simplifying further:
6n^3 - 19n^2 - n + 2
So the correct answer is option:
C) 6n^3 - 19n^2 - n + 2
Don't worry, mistakes happen to the best of us! Just remember to keep the humor going and learn from your errors. You'll get it next time!
To multiply (2n^2-7n+2)(3n+1), you can use the distributive property.
First, multiply every term in the first expression, (2n^2-7n+2), by every term in the second expression, (3n+1).
(2n^2)(3n) + (2n^2)(1) + (-7n)(3n) + (-7n)(1) + (2)(3n) + (2)(1)
Next, simplify each term:
6n^3 + 2n^2 - 21n^2 - 7n + 6n + 2
Combine like terms:
6n^3 - 19n^2 - n + 2
So, the correct answer is C) 6n^3 - 19n^2 - n + 2. You are correct!