If a point `(a,2)` lies between the lines `x-y-1=0` and `2(x-y)-5=0`, then the set of values of `a` is
(A) `(-oo,3)uu(9/2,oo)`
(B) `(3,9/2)`
(C) `(-oo,3)`
(D) `(9/2,oo)`

If a point (a,2) lies between the lines x-y-1=0 and 2(x-y)-5=0, then the set of values of a is (A) (-oo,3)uu((9)/(2),oo) (B) (3,(9)/(2)) (B) (-oo,3) (D) ((9)/(2),oo)

If the point (1,a) lies in between the lines x+y=1 and 2(x+y)=3 then a lies in (i)(-oo,0)uu(1,oo)(ii)(0,(1)/(2))(iii)(-oo,0)uu((1)/(2),oo)(iv) none of these

If alpha,alpha^(2)) falls inside the angle made by the lines 2y=x,x>0&y=3x,x>0, then the set of values of alpha is (-oo,3) (b) ((1)/(2),3)(0,3)(d)(-oo,0)uu[(1)/(2),oo]

If the difference between the roots of the equation x^2+""a x""+""1""=""0 is less than sqrt(5) , then the set of possible values of a is (1) (-3,""3) (2) (-3,oo) (3) (3,oo) (4) (-oo,-3)

If alpha,beta are the roots of the quadratic equation (p^(2)+p+1)x^(2)+(p-1)x+p^(2)=0 such that unity lies between the roots then the set of values of p is (i) 0 (ii) p in(-oo,-1)uu(0,oo)( iii) p in(-1,oo) (iv) (-1,1)

If the point (2,k) lies outside the circles x^(2)+y^(2)+x-2y-14=0andx^(2)+y^(2)=13 then k lies in the interval (-3,-2)uu(3,4)(b)(-3,4) (c) (-oo,-3)uu(4,oo)(d)(-oo-2)uu(3,oo)

If cos^(2)x-(c-1)cos x+2c>=6 for every x in R, then the true set of values of c is (2,oo)(b)(4,oo)(c)(-oo,-2)(d)(-oo,-4)

Let f(x) be a quadratic expression such that f(-1)+f(2)=0 . If one root of f(x)=0 is 3 , then the other root of f(x)=0 lies in (A) (-oo,-3) (B) (-3,oo) (C) (0,5) (D) (5,oo)

Let f(x) be a quadratic expression such that f(-1)+f(2)=0 . If one root of f(x)=0 is 3 , then the other root of f(x)=0 lies in (A) (-oo,-3) (B) (-3,oo) (C) (0,5) (D) (5,oo)

If log_(3)(x^(2)-6x+11)<=1, then the exhaustive range of values of x is: (-oo,2)uu(4,oo)(b)(2,4)(-oo,1)uu(1,3)uu(4,oo)(d) none of these