If `a lt 0 and b lt 0`, then `(a +b)^(2) gt 0`.

State, whether the following statements are true of false. If a lt b, and c gt 0 , then a - c gt b - c where a, b, c and d are real number and c =! 0 .

Statement I If a gt 0 and b^(2)- 4ac lt 0 , then the value of the integral int(dx)/(ax^(2)+bx+c) will be of the type mu tan^(-1) . (x+A)/(B)+C , where A, B, C, mu are constants. Statement II If a gt 0, b^(2)- 4ac lt 0 , then ax^(2)+bx +C can be written as sum of two squares .

If 0 lt x lt pi/2 then

If 0 lt x lt pi /2 then

If (x-a) (x-b) lt 0 , then x lt a, and x gt b .

Statement - 1 : If x gt 1 then log_(10)x lt log_(3)x lt log_(e )x lt log_(2)x . Statement - 2 : If 0 lt x lt 1 , then log_(x)a gt log_(x)b implies a lt b .

Which is the following is always true ? (a) If a lt b, " then " a^2 lt b^2 (b ) If a lt b "then " 1/a gt 1/b ( c) If a lt b , " then " |a| lt |b|

If c lt a lt b lt d , then roots of the equation bx^(2)+(1-b(c+d)x+bcd-a=0

Let a,b,c in R and a ne 0 be such that (a + c)^(2) lt b^(2) ,then the quadratic equation ax^(2) + bx +c =0 has

If ax^(2) + bx + c = 0 , a , b, c in R has no real roots, and if c lt 0, the which of the following is ture ? (a) a lt 0 (b) a + b + c gt 0 (c) a +b +c lt 0