Question: Question 8: To confirm this, show that J(poly()) = [(poly(t), y(t-1)) _ !(y() p()/(p()ly*-1) My(!) ly(*-1)) (7) You need to detail your reasoning to obtain

Question 8: To confirm this, show that J(poly()) = [(poly(t), y(t-1))

Question 8: To confirm this, show that J(poly()) = [(poly(t), y(t-1)) _ !(y() p()/(p()ly*-1) My(!) ly(*-1)) (7) You need to detail your reasoning to obtain this equation. Note that the denominator on the right-hand side of Eq. (7) does not depend on p), i.e. /(p()ly($)) is proportional to My() [p(t))(p()ly*-1). (1 Mark)

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