$: `AgeB`=C,`BgtDgtE,DgeFltG`
!:
I. AgtE
II. FltB

Statement: AgtBgtFgtC;DgtEgtC Conclusions: I. C ltA II. B gtD

Given agt0,bgt0,agtb and c!=0 . Which in-equality is not always correct?

If ax+by+c=0 is a normal to hyperbola xy=1 , then (A) alt0, blt0 (B) alt0, bgt0 (C) agt0, bgt0 (D) agt0, blt0

Statement : I. No A is B. II. All C are B. Conclusion: I. No C is A. II. Some A are C.

If agt1,bgt1,cgt1,dgt1 then the minimum value of log_(b)a+log_(a)b+log_(d)c+log_(c)d , is

Statement I is True: Statement II is True; Statement II is a correct explanation for statement I Statement I is true, Statement II is true; Statement II not a correct explanation for statement I. Statement I is true, statement II is false Statement I is false, statement II is true Statement I: cos e s^(-1)(cos e c9/5)=pi-9/5dot because Statement II: cos e c^(-1)(cos e c x)=pi-x :\ AAx in [pi/2,(3pi)/2]-{pi} a. A b. \ B c. \ C d. D

Statement/ : I. No A is B. II. All C are D. III. Some C are B. Conclusion/ : I. Some D are B. II. Some B are C. III. All C are B.

Let A, B, C, D be (not necessarily square) real matrices such that A^T=BCD: B^T=CDA; C^T=DAB and D^T=ABC. For the matrix S=ABCD, consider the two statements. I. S^3=S II. S^2=S^4 (A) II is true but not I (B) I is true but not II (C) both I and II are true (D) both I and II are false

Graph of Quadratic funtion f(x)=ax^2+bx+c for different cases (i) If agt0 and Dlt0 (ii) alt0 and Dlt0 (iii)agt0 and D=0 (iv) agt0 and Dgt0 (v) alt0 and D=0 (vi) alt0 and Dgt0

If a+b+c=3 and agt0,bgt0,cgt0 then the greatest value of a^(2)b^(2)c^(2) is