Hey everyone,
Thanks again to the people that helped me solve my last question a couple weeks ago. I took my test on friday and I feel confident, however there was a bonus question that stumped me a tad. I wanted to ask it here now to see how it was properly done. I have it partly figured out, but couldn't get the last part.
Find all the real zeros of P(x)=x^5-4x^4-x^3+10x^2+2x-4
It says find the real zeros and I presume it's only the zeros that are real numbers, however I am a tad confused as I know there are 4 zeros to this as it is a fifth degree polynomial. Two of the zeros I have found, but I am having trouble finding the other two.
I know that because of the Rational zeros Theorem (p/q where P is a factor of the constant coefficient and q is a factor of the leading coefficient) that the possible zeros are ± 1, ± 2, and ± 4. But substituting these values in I try to see which ones give me zero.
After doing that I determined that two of the zeros are -1 and 2.
Now is where I get confused.
Finding the other two zeros I tried to factor the polynomial with synthetic division with the two known zeros in an attempt to factor it down to a 2nd degree polynomial than use the quadratic formula. (If this gets sloppy please forgive me I'll try my best though)
1 │ 1 -4 -1 10 2 -4
1 -3 -4 6 4
_________________
1 -3 -4 6 4 0
So after factoring out the first zero of -1 I now have (x-1)(x^4-3x^3-4x^2+6x+4)
Now I try to factor out the zero at 2
-2│1 -3 -4 6 4
-2 10 -12 12
______________
1 -5 6 -6 14
This is where I'm stuck. After doing synthetic division I am left with a remainder which shouldn't happen when dividing by a zero. Am I doing something wrong? Or did I go wrong somewhere else. The last two zeros of this polynomial completely elude me. Any help with this would be highly appreciated. Thanks again.
*Edit*, I'm having a very hard time trying to get the numbers for the synthetic division I did to line up properly. Trying to work on it though.
Thanks again to the people that helped me solve my last question a couple weeks ago. I took my test on friday and I feel confident, however there was a bonus question that stumped me a tad. I wanted to ask it here now to see how it was properly done. I have it partly figured out, but couldn't get the last part.
Find all the real zeros of P(x)=x^5-4x^4-x^3+10x^2+2x-4
It says find the real zeros and I presume it's only the zeros that are real numbers, however I am a tad confused as I know there are 4 zeros to this as it is a fifth degree polynomial. Two of the zeros I have found, but I am having trouble finding the other two.
I know that because of the Rational zeros Theorem (p/q where P is a factor of the constant coefficient and q is a factor of the leading coefficient) that the possible zeros are ± 1, ± 2, and ± 4. But substituting these values in I try to see which ones give me zero.
After doing that I determined that two of the zeros are -1 and 2.
Now is where I get confused.
Finding the other two zeros I tried to factor the polynomial with synthetic division with the two known zeros in an attempt to factor it down to a 2nd degree polynomial than use the quadratic formula. (If this gets sloppy please forgive me I'll try my best though)
1 │ 1 -4 -1 10 2 -4
1 -3 -4 6 4
_________________
1 -3 -4 6 4 0
So after factoring out the first zero of -1 I now have (x-1)(x^4-3x^3-4x^2+6x+4)
Now I try to factor out the zero at 2
-2│1 -3 -4 6 4
-2 10 -12 12
______________
1 -5 6 -6 14
This is where I'm stuck. After doing synthetic division I am left with a remainder which shouldn't happen when dividing by a zero. Am I doing something wrong? Or did I go wrong somewhere else. The last two zeros of this polynomial completely elude me. Any help with this would be highly appreciated. Thanks again.
*Edit*, I'm having a very hard time trying to get the numbers for the synthetic division I did to line up properly. Trying to work on it though.
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