if y = f(X) = `(ax-b)/(bx-a)` show that x = f(y) – InterviewSolution

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1.	if y = f(X) = `(ax-b)/(bx-a)` show that x = f(y)
Answer» We have, `y=f(x)=(ax-b)/(bx-a)`. `:.f(y)=f{f(x)}=f((ax-b)/(ax-))={{a((ax-b)/(bx-a))-b}}/{{b((ax-b)/(bx-a))-a}}` `={{(a^(2)x-ab)-(b^(2)x-ab)}}/((bx-a))xx((bx-a))/{{(abx-b^(2))-(abx-a^(2))}}` `=((a^(2)x-b^(2)x))/((a^(2)-b^(2)))=((a^(2)-b^(2))x)/((a^(2)-b^(2)))=x`. Hence, x=f(y).

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