Cyt `a_(3)` possesses

If A_(1),A_(2) and A_(3) denote the areas of three adjacent faces of a cuboid,then its volume is A_(1)A_(2)A_(3)(b)2A_(1)A_(2)A_(3)sqrt(A_(1)A_(2)A_(3))(d)A_(1)A_(2)A_(3)3

If a_(0),a_(1),a_(2),a_(3) are all the positive,then 4a_(0)x^(3)+3a_(1)x^(2)+2a_(2)x+a_(3)=0 has least one root in (-1,0) if ( a )a_(0)+a_(2)=a_(1)+a_(3) and 4a_(0)+2a_(2)>3a_(1)+a_(3)(b)4a_(0)+2a_(2)<3a_(1)+a_(3)(c)4a_(0)+2a_(2)=3a_(1)+a_(0) and 4a_(0)+a_(2)

If a_(1),a_(2),a_(3),a_(4),a_(5),a_(6) are in A.P , then prove that the system of equations a_(1)x+a_(2)y=a_(3),a_(4)x+a_(5)y = a_(6) is consistent .

If a_(1), a_(2), a_(3), a_(4), a_(5) are consecutive terms of an arithmetic progression with common difference 3, then the value of |(a_(3)^(2),a_(2),a_(1)),(a_(4)^(2),a_(3),a_(2)),(a_(5)^(2),a_(4),a_(3))| is

A geometric sequence has four positive terms a_(1),a_(2),a_(3),a_(4). If (a_(3))/(a_(1))=9 and a_(1)+a_(2)=(4)/(3) then a_(4) equals

Five boys A_(1),A_(2),A_(3),A_(4),A_(5) , are sitting on the ladder in this way -A_(5) is above A_(1),A_(3) under A_(2),A_(2) , under A_(1) and A_(4) above A_(3) . Who sits at the bottom?

A_(1),A_(2) and A_(3) are three events.Show that the simultaneous occurrence of the events is P(A_(1)nn A_(2)nn A_(3))=P(A_(1))P((A_(2))/(A_(1)))P[((A_(3))/(A_(1)nn A_(2))] State under which condition P(A_(1)nn A_(2)nn A_(3))=(P(A_(1))P(A_(2))P(A_(3))

If a_(1),a_(2),a_(3),a_(4) are positive real numbers such that a_(1)+a_(2)+a_(3)+a_(4)=16 then find maximum value of (a_(1)+a_(2))(a_(3)+a_(4))

If a_(1),a_(2),a_(3),"........",a_(n) are in AP with a_(1)=0 , prove that (a_(3))/(a_(2))+(a_(4))/(a_(3))+"......"+(a_(n))/(a_(n-1))-a_(2)((1)/(a_(2))+(1)/(a_(3))"+........"+(1)/(a_(n-2)))=(a_(n-1))/(a_(2))+(a_(2))/(a_(n-1)) .