If `|a| = 3 , |b| = 4 ` , then a value of `lamda` for which `a + lamda b ` is perpendicular to `a - lamda b` is

If |veca| =3,|vecb| = 4 , then a value of lamda for which veca + lamda vecb is perpendicular to veca - lamda vecb is :

Find values of lamda for which 1/log_3lamda+1/log_4lamdagt2 .

IF lamda^(log_(5)3 =81 ,find the value of lamda .

The magnitude of the vectors vec(a) and vec(b) are equal and the angle between the is 60^(@) the vectors lamda vec(a) + vec(b) and vec(a)- lamda vec(b) are perpendicular to each other them what is the value of lamda ?

If a,b and c are the sides of a traiangle such that b.c =lamda ^(2), then the relation is a, lamdaand A is

The sum of all intergral values of lamda for which (lamda^(2) + lamda -2) x ^(2) + (lamda +2) x lt 1 AA x in R, is: