Polynomials question (1 Viewer)

byakuya kuchiki

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Let P(x) = x^(n+1) - (n+1)x + n, where n is a positive integer.

show that P(x) has a double zero at x = 1.

(2008 4U HSC, Q5 b) )
 
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This is a 2 mark question.

P(1)=1-(n+1)+n=0 (This gets you the first mark)

P'(x)=(n+1)(x<sup>n</sup>-1) &there4; P'(1)=0 (This gets you the second mark)

&there4; x=1 is a double zero.

For 1 < k < n+2, P<sup>(k)</sup>(x)=(n+1)n(n-1)...(n-k+2)x<sup>n-k+1</sup> &there4; P<sup>(k)</sup>(1)=(n+1)n(n-1)...(n-k+2)&ne;0 (Note: this step is not required to get full marks, but nevertheless does show it isn't a triple, quadruple, quintuple zero, etc.)
 
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Drongoski

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Let P(x) = x^(n+1) - (n+1)x + n, where n is a positive integer.

show that P(x) has a double zero at x = 1.

(2008 4U HSC, Q5 b) )
P(x) = xn+1 - (n+1)x + n

P'(x) = (n+1) xn - (n+1)

.: P(1) = 1 - (n+1) + n = 0

& P'(1) = (n+1) -(n+1) = 0

i.e. 1 is a double (at least) root

To show not a triple root, show P''(1) =/= 0
 

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