`x = 4t, y = (4)/(t)`

If x=ct and y= (c )/(t) , find (dy)/(dx) at t=2

If x = t^(2), y = t^(3) then (d^(2)y)/(dx^(2)) is

Find the vaoue of each of the folllowing polynomials for the indicated value of variables: (i) p(x) = 4x ^(2) - 3x + 7 at x =1 (ii) q (y) = 2y ^(3) - 4y + sqrt11 at y =1 (iii) r (t) = 4t ^(4) + 3t ^(3) -t ^(2) + 6 at t =p, t in R (iv) s (z) = z ^(3) -1 at z =1 (v) p (x) = 3x ^(2) + 5x -7 at x =1 (vii) q (z) = 5z ^(3) - 4z + sqrt2 at z =2

If the parametric equation of a curve is given by x = e^(t) cos t, y = e^(t) sin t , then the tangent to the curve at the point t = pi/4 makes with the x-axis of the angle.

Find the equations of the tangent and normal to the given curve at the given points. (v) x = cos t, y = sin t at t = (pi)/4

If x = a(t+1/t), y =a(t-1/t), then dy/dx =

For the curve x = t^(2)-1, y = t^(2)-t the tangent line is perpendicular to x-axis when

If x = ct and y = c/t , find (dy)/(dx) at t = 2 .

If sin x = (2t)/(1+t^(2)), tan y = (2t)/(1-t^(2)) , then (dy)/(dx) is equal to