induction...? (1 Viewer)
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addikaye03
The A-Team
For n=1, d/dx (x^-1)=-x^-2hey,
does anyone feel like they can help with this:
<DIR>Use induction to show that the nth derivative of x^−1 is
(((−1)^n).n!) / (x^n+1 )
thanks
n=2, d^2/dx^2 (x^-1)=2x^-3=2.1.x^-3
n=3, d^3/dx^3 (x^-1)=-6x^-4=-(3.2.1)x^-4 where d^3/dx^3 notates the 3rd derivative of (x^-1)
n=4, d^4/dx^4 (x^-1)=24x^-5=4.3.2.1x^-5
...
n=n, d^n/dx^n (x^-1)= [(-1)^n.n!]/(x^(n+1)]
Seems pretty obvious just via inspection. Is an inductive proof required for the question? or did you just assume it would require induction.
Last edited:
lyounamu
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blah blah blah blah blah
we assume that it is true for n=k
i.e. d^kx/dy^k = (-1)^k k!/x^(k+1)
then we now prove that it is also true for n=k+1
i.e. d^(k+1)x/dy^(k+1) = (-1)^(k+1)k!/x^(k+2)
LHS = d/dx (d^kx/dy^k) = d/dx ((-1)^k k!/x^(k+1))
= d/dx ((-1)^k k! x^-(k+1))
= ((-1)^(k+1) (k+1)! x^-(k+2)
= RHS
blah blah blah blah
we assume that it is true for n=k
i.e. d^kx/dy^k = (-1)^k k!/x^(k+1)
then we now prove that it is also true for n=k+1
i.e. d^(k+1)x/dy^(k+1) = (-1)^(k+1)k!/x^(k+2)
LHS = d/dx (d^kx/dy^k) = d/dx ((-1)^k k!/x^(k+1))
= d/dx ((-1)^k k! x^-(k+1))
= ((-1)^(k+1) (k+1)! x^-(k+2)
= RHS
blah blah blah blah
Last edited:
addikaye03
The A-Team
Ahh yeah ofcourse, well done man.