" 5.If "f'(x)=sqrt(2x^(2)-1)" and "y=f(x...

" 5.If "f'(x)=sqrt(2x^(2)-1)" and "y=f(x^(2))" ,then find "(dy)/(dx)" at "x=1

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If f^(prime)(x)=sqrt(2x^2-1) and y=f(x^2) , then find (dy)/(dx) at x=1 .

If f'(x)=sqrt(2x^(2)-1) and y=f(x^(2)), then (dy)/(dx) at x=1, is

if f'(x)=sqrt(2x^(2)-1) and y=f(x^(2)) then (dy)/(dx) at x=1 is:

If f'(x)= sqrt(2x^(2)-1) and y=f(x^(2)),then (dy)/(dx) at x = 1 is

If f'(x)=sqrt(2x^(2)-1) and y=f(x^(2)), then (dy)/(dx) at x=1 is equal to 2b 1c.-2d.-1

if f'(x)=sqrt(2x^2-1) and y=f(x^2) then (dy)/(dx) at x=1 is:

if f'(x)=sqrt(2x^2-1) and y=f(x^2) then (dy)/(dx) at x=1 is:

if f'(x)=sqrt(2x^2-1) and y=f(x^2) then (dy)/(dx) at x=1 is:

Let f'(x)=sin(x^(2)) and y=f(x^(2)+1) then (dy)/(dx) at x=1 is

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