The solution of `(dy)/(dx) = (ax+ h)/( by + k)` represents a parabola, when: a)`a = 0, b =0` b)`a = 0, b =0` c)`a = 0, b ne 0` d)`a =2, b =1`

If the system of equations x - 2y +z = a , 2x + y - 2z = b, x +3y - 3z = c, has at least one solution, then a) a + b + c = 0 b) a - b + c = 0 c) -a + b + c = 0 d) a + b - c = 0

Let a be any element in a Boolean Algebra B . If a+x =1 and ax=0 , then : a) x=1 b) x=0 c) x = a d)x=a'

Evaluate lim_(x rarr 0) (sin ax + bx )/(ax + sin bx) , a, b, a + b ne 0

If x=2 is the equation of the directrix of the parabola y^(2) =-4ax , then the focus of the parabola is a) (0,1) b) (2,0) c) (-2,0) d) (0,-1)

If the line y=kx touches the parabola y=(x-1)^(2) , then the values of k are a)0, -4 b)0, 4 c)0, -2 d)0, 2

Evaluate lim_(x rarr 0) (ax + b)/(cx + 1)

If (b + c) (y + z) - ax = b - c, (c + a) (z + x) - by = c - a and (a + b) (x + y) - cz = a - b , where a + b + c ne 0, then x is equal to a) (c + b)/(a + b + c) b) (c - b)/(a + b + c) c) (a - b)/(a + b + c) d) (a + b)/(a + b + c)

If a and b are the roots of the equation x^(2) + ax + b = 0, a ne 0, b ne = 0 , then the values of a and b are respectively

The line parallel to the x-axis and passing through the point of intersection of the lines ax + 2by + 3b = 0 and bx - 2ay - 3a = 0, where (a, b) ne (0, 0) is

Evaluate lim_(x rarr 1) (ax^2 + bx + c)/(cx^2 + bx + a) , a + b + c ne 0