frenzal_dude
UTS Student
How would you factorise this?:
s^3 + 5s^2 + 8s + 4
s^3 + 5s^2 + 8s + 4
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Hard Factorisation Problem (1 Viewer)
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nonsenseTM
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trial and error using factors of 4, and -1 works thus we can divide the whole thing by x+1
frenzal_dude
UTS Student
how did you know to use factors of 4 and -1, and how'd u know to divide the whole thing by s+1?
I know that since there were no variations in sign, there would be no +ve roots, and when you sub in x = -x, you get 3 variations in sign, so I knew there would be 3 -ve roots (which i now know are -1, -2, -2) but how could you work out those roots without using trial and error?
nonsenseTM
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sorry i didn't make it clear, since the constant term is 4 , which comes from the multiplilcation of the roots. so there must a a factor of 4 that is root.
after you find the root using trial and error, which I found was -1, you divide the poly expression by s+1 (factor theorem)
after you find the root using trial and error, which I found was -1, you divide the poly expression by s+1 (factor theorem)
this is 3u factor theorem, not even really 4u, but used in 4u
x^3+5x^2+8x+4
=x^3+x^2+4x^2+8x+4
=x^2(x+1)+4(x^2+2x+1)
=x^2(x+1)+4(x+1)^2
=(x+1)(x^2+4x+4)
=(x+1)(x+2)^2
Try to use the 8 and 4
Hi,
Let P(s) = s^3 + 5s^2 + 8s + 4
P(-1) = (-1)^3 + 5.(-1)^2 + 8.-1 + 4 = -1 + 5 - 8 + 4 = 0
So, s+1 is a factor
So, P(s) = (s + 1)(s^2 +k.s + 4)
coeff of s^2 = 1 + k = 5, so k = 4
P(s) = (s + 1) (s^2 + 4s + 4) = (s+1)(s+2)^2
Stuart
Let P(s) = s^3 + 5s^2 + 8s + 4
P(-1) = (-1)^3 + 5.(-1)^2 + 8.-1 + 4 = -1 + 5 - 8 + 4 = 0
So, s+1 is a factor
So, P(s) = (s + 1)(s^2 +k.s + 4)
coeff of s^2 = 1 + k = 5, so k = 4
P(s) = (s + 1) (s^2 + 4s + 4) = (s+1)(s+2)^2
Stuart