`xA + yB to zC`. If `-(d[A])/(dt) = -(d[B])/(dt) = 1.5 (d[C])/(dt)` then x,y and z are:

For 3A to xB, (d[B])/(dt) is found to be 2/3rd of (d[A])/(dt) . Then the value of 'x' is

Let y = x^(3) - 8 x + 7 and x = f( t) . If ( dy)/( dt) = 2 and x = 3 at t = 0 then find the value of ( dx)/( dt) at = 0

If x=int_(0)^(y)(dt)/(sqrt(1+9t^(2)))" and "(d^(2)y)/(dx^(2))=ay , then find a.

If (a+b x)/(a-b x)=(b+c x)/(b-c x)=(c+d x)/(c-d x)(x ne 0) , then show that a, b, c and d are in G.P.

The equation of the plane containing the lines (x-1)/(2) = (y+1)/(-1) = (z)/(3) and (x)/(2) = (y-2)/(-1) = (z+1)/(3) is a) 8x - y + 5z - 8 = 0 b) 8x + y - 5z - 7 = 0 c) x - 8y + 3z + 6 = 0 d) 8x + y - 5z + 7 = 0

If the lines (2x-1)/(2) = (3-y)/(1) = (z-1)/(3) and (x+3) /(2) = (z+1)/(p) = (y+2)/(5) are perpendicular to each other, then p is equal to a) 1 b) -1 c) 10 d) - (7)/(5)

The line (x - x_(1))/(0) = (y - y_(1))/(1) = (z - z_(1))/(2) is a)perpendicular to the x-axis b)perpendicular to the yz-plane c)parallel to the y-axis d)parallel to the xz-plane