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'

The equation of the line passing through the origin and the point of intersection of the lines x/a+y/b=1 and x/b+y/a=1 is : a) bx-ay=0 b) x+y=0 c) ax-by=0 d) x-y=0

The value of abs((x,x-1) , (x+1,x):} is a)1 b)x c) x^2 d)0

The orthocentre of a triangle formed by the lines x-2y = 1, x=0 and 2x +y -2 =0 is a) (0,1) b) (1,0) c) (-1,-2) d) (1,2)

The normal at the point (1,1) on the curve 2 y+x^2=3 is a) x+y=0 b) x-y=0 c) x+y+1=0 d) x-y=1

If |(1,1,1),(a,b,c),(a^(3),b^(3),c^(3))| = (a - b) (b - c) (c - a) (a + b + c) , where a,b,c are all different, then the determinant |(1,1,1),((x-a)^(2),(x-b)^(2),(x-c)^(2)),((x-b)(x-c),(x-c)(x-a),(x-a)(x-b))| vanishes when a)a + b + c = 0 b) x = (1)/(3) (a + b + c) c) x = (1)/(2) (a + b + c) d) x = a + b + c

Let f(x) = ax + b and g(x) = cx +d, a ne 0 , c ne 0 . Assume a = 1 , b = 2 . If (fog) (x) = (gof) (x) for all x , what can you say about c and d ?

If the straight line y-2x+1=0 is the tangent to the curve xy+ax+by=0 at x=1 , then the values of a and b are respectively a) 1and 2 b) 1and -2 c) -1 and 2 d) -1 and -2