`f(x)=sgn(cot^(- 1)x),g(x)=sgn(x^2-4x+5)`

Which of the following pairs of function are identical? a. f(x)=e^(In sec^(-1)x) " and " g(x)=sec^(-1)x b. f(x)=tan(tan^(-1)x) " and " g(x)=cot(cot^(-1)x) c. f(x)=sgn(x) and g(x)=sgn(sgn(x)) d. f(x)=cot^(2)*cos^(2)x " and " g(x)=cot^(2)x-cos^(2)x

f(x)=e^(lncot), g(x)=cot^(- 1)x

Sketch the graph of {:((i) f(x)=sgn(x^(2)+1),(ii) f(x)=sgn(log_(e)x)),((iii) f(x)=sgn(sin x), (iv) f(x)=sgn(cos x)):}

f(x)=cot^(- 1)(x^2-4x+5) then range of f(x) is equal to :

If f(x) = tan^-1x,g(x) = tan^-1((1+x)/(1-x)) fo |x| < 1, show that f' (x) = g' (x) and g(x) - f(x) = pi/4

If f(x)=cot^(-1)((x^(x)-x^(-x))/(2)) then f'(1) equals

Let f and g be two functions defined by f(x) = sqrt(x-1) and g(x)= sqrt (4-x^2) . Find : f + g .

Let f and g be two functions defined by f(x) = sqrt(x-1) and g(x)= sqrt (4-x^2) . Find : f - g .

Let f and g be two functions defined by f(x) = sqrt(x-1) and g(x)= sqrt (4-x^2) . Find : g/f .

Let f and g be two functions defined by f(x) = sqrt(x-1) and g(x)= sqrt (4-x^2) . Find : g - f .