The value of `p(y) = y^2 - y + 1` for `p(0)` is :

Find the value of A ' if the function 'f' at y = 0 is continuous when f(x)= {((1-cos y)/(y sin y),,y,ne,0),((1/2)A,,y,=,0):}

The maximum value of p = 40 x + 50 y subject to the constraints 3x+ y le 9, x+2y le 8 , x ge 0 , y ge 0 is :

The value of lim_(x->1) y^3/(x^3-y^2-1) as (x, y)-> (1, 0) along the line y = x -1 is

If y is a function of x and log(x+y)-2x y=0, then the value of y^(prime)(0) is (a)1 (b) -1 (c) 2 (d) 0

If sum of the perpendicular distances of a variable point P (x, y) from the lines x + y - 5 = 0 and 3x - 2y + 7 = 0 is always 10. Show that P must move on a line.

Find the value of p so that the three lines 3x + y - 2 = 0, px + 2y-3 =0 and 2x-y -3 =0 may intersect at one point.

The parabola y=x^2+p x+q cuts the straight line y=2x-3 at a point with abscissa 1. Then the value of pa n dq for which the distance between the vertex of the parabola and the x-axis is the minimum is (a) p=-1,q=-1 (b) p=-2,q=0 (c) p=0,q=-2 (d) p=3/2,q=-1/2

y = (ax-b)/((x-1)(x-4)) has a turning point P (2,-1). Find the values of 'a' and 'b' and show that y is maximum at P.