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Cambridge 4U Ex4.2 Q8 (1 Viewer)
- Thread starter Pyrobooby
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Bored Of Fail 2
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just equate the polynomials
bn z^n + b (n-1) z^(n-1) + ..... = c n z^n + c (n-1) z^(n-1) + ....
take everything over to one side and group the z^n, z^(n-1) etc
ie ( b n -c n) z^n + ( b (n-1) - c (n-1) ) z^(n-1) + ...... =0
now this can only be true if all the coefficents of z ^n , z^(n-1) , z^(n-2) etc... are all zero
therefore the result comes out
bn z^n + b (n-1) z^(n-1) + ..... = c n z^n + c (n-1) z^(n-1) + ....
take everything over to one side and group the z^n, z^(n-1) etc
ie ( b n -c n) z^n + ( b (n-1) - c (n-1) ) z^(n-1) + ...... =0
now this can only be true if all the coefficents of z ^n , z^(n-1) , z^(n-2) etc... are all zero
therefore the result comes out
Bored Of Fail 2
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the " are equal for more than n values of z" , comes from the fact that a nth degree equation , will have n solutions
( be they real or complex or a mixture )
when we equate the two polynomials we will get a polynomial equation of degree n , and by fundamental theorm of algebra this will have n solutions ( n values of z for which equality holds ) , the only way for their to be more than n values of z for which it is true is if they are infact the same polynomial
( be they real or complex or a mixture )
when we equate the two polynomials we will get a polynomial equation of degree n , and by fundamental theorm of algebra this will have n solutions ( n values of z for which equality holds ) , the only way for their to be more than n values of z for which it is true is if they are infact the same polynomial
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Bored Of Fail 2
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its actually quite trivial, that wont be on the hsc paper , gauranteed
Could be a one marker in the earlier questions. You never know.
cookieeater1234
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Why is this?
K
khorne
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This is not a trivial problem, berks. This is an important theorem you need to know how to prove:
Consider them P(z) and Q(z)
Now consider P(z) - Q(z) as a polynomial which has more than n zeros. But the degree of P - Q is obviously less than or equal to n. So the only posibility is if P(z) - Q(z) = 0
I.e P(z) = Q(z), and then equate the coeffs.
Consider them P(z) and Q(z)
Now consider P(z) - Q(z) as a polynomial which has more than n zeros. But the degree of P - Q is obviously less than or equal to n. So the only posibility is if P(z) - Q(z) = 0
I.e P(z) = Q(z), and then equate the coeffs.
Bored Of Fail
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u are a genius man