factoring polynomials

stew

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Oct 29, 2005
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I'm having trouble with this problem. I'm supposed to factor 5y^5-5y^4-20y^3+20y^2. I come up with 5y^2(y-1)(y+2)(y-2). The book gives an answer of (y-1)(y+1)(y-2). How did they come up with this answer? I have tried everything. Can someone help?
 
Hello, stew!

Be more assertive . . . you're right!

Factor \(\displaystyle 5y^5\,-\,5y^4\,-\,20y^3\,+\,20y^2\)

I come up with \(\displaystyle 5y^2(y-1)(y+2)(y-2)\)

The book gives an answer of \(\displaystyle (y-1)(y+1)(y-2)\)
First of all, there is no way to disregard the \(\displaystyle 5y^2\)

The book has typos . . . obviously!


We have: .\(\displaystyle 5y^2[y^3\,-\,y^2\,-\,4y\,+\,4]\)

. . . \(\displaystyle = \;5y^2[y^2(y - 1) - 4(y - 1)]\)

. . . \(\displaystyle = \;5y^2(y - 1)[y^2 - 4]\)

. . . \(\displaystyle = \;5y^2(y - 1)(y + 2)(y - 2)\) . . . your answer!
 
Guess what...you're correct, and the book is wrong!

You can check if you're correct by giving y any value,
and substituting this value in original equation, then in your solution:
they must equal each other.

Try y = 3:
original: 5y^5-5y^4-20y^3+20y^2 = 5(3^5)-5(3^4)-20(3^3)+20(3^2) = 450
your solution: 5y^2(y-1)(y+2)(y-2) = 5(3^2)(3-1)(3+2)(3-2) = 450
 
Thanks for the help guys. I had a sneaking suspicion that it was wrong, but how often does that happen? I knew you guys would be able to help. Usually when the book has an answer that I think is impossible, after I look at it for a while it turns out to be right. Thanks for the info!
 
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