For a positive constant a find `(dy)/(dx),` where `y-a^(1+1/t)` and `x-(t+1/t)^a` .

For a positive constant a find (dy)/(dx) , where y= a^(t + (1)/(t)), and x= (t + (1)/(t))^(a)

Find (dy)/(dx) : x=t + (1)/(t) and y= t - (1)/(t)

Find (dy)/(dx) : x= te^(t),y=1 + log t

Find (dy)/(dx) , if x= a t^(2), y= 2 a t

A particle moves in the x-y plane according to the law x=at, y=at (1-alpha t) where a and alpha are positive constants and t is time. Find the velocity and acceleration vector. The moment t_(0) at which the velocity vector forms angle of 90^(@) with acceleration vector.

Find (dy)/(dx) of the functions x^(y) + y^(x)=1

Find (dy)/(dx) for y=tan^(-1)sqrt((a-x)/(a+x), -a < x < a.

If x= a t^(2), y= 2 a t" then " (dy)/(dx) = …., where t ne 0