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Prove that correlation coefficient is independent of change of origin and scale

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Answered by SSC553
2

Answer:

The correlation coefficient is independent of origin and scale:

Suppose x and y are two variables, rxy is correlation coefficient between x and y.

Suppose you define u=x-a/h and v=y-b/k for defining change of origin and scale where h,k>0;

x=a+h u; y=b+k v;

X=a+h U; Y=b+k V;

(x-X)=h(u-U); (y-Y)=k(v-V);

Formula for correlation coefficient is

r x y= c o v(x,y)/sigma(x).sigma(y)

r x y=E(x-X)(y-Y)/s q rt(E(x-X)^2)s q rt(E(y-Y)^2)

r x y=E(h(u-U)k(v-V))/s q rt(Eh^2(u-U)^2))s q rt(Ek^2(v-V)^2)

r x y=h k/h k.r u v

Therefore, r x y = r u v.

Hence proved.

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