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

Find the value of the following log_(30)1

The number of distinct real values of lamda, for which the vectors : -lamda ^(2) hati+hatj+ hatk, hati - lamda ^(2) hatj+ hatk and hati + hatj- lamda ^(2) hatk are coplanar, is :

The values of lamda for which the line y=x+ lamda touches the ellipse 9x^(2)+16y^(2)=144 , are

The number of distinct real values of lamda for which the vectors veca=lamda^(3)hati+hatk, vecb=hati-lamda^(3)hatj and vecc=hati+(2lamda-sin lamda)hatj-lamdahatk are coplanar is

Let G,O,E and L be positive real numbers such that log(G.L)+log(G.E)=3,log(E.L)+log(E.O)=4, log(O.G)+log(O.L)=5 (base of the log is 10) If the value of the product (GOEL) is lamda , the value of sqrt(loglamdasqrt(loglamdasqrt(loglamda....))) is

Solve for a, lamda if log_lamda acdotlog_(5)lamdacdotlog_(lamda)25=2 .

The valur of 'lamda' for which the two vectors : 2 hati - ahtj + 2 hatk and 3 hati + lamda hatj + ahtk are perpendicular is :

For what value of lamda will the line y=2x+lamda be tangent to the circle x^(2)+y^(2)=5 ?

If cos^(-1) lamda + cos^(-1) mu + cos^(-1) gamma = 3pi , then find the value of lamda mu + mu gamma + gamma lamda

Find the value of lamda so that the points P, Q, R and S on the sides OA, OB, OC and AB, respectively, of a regular tetrahedron OABC are coplanar. It is given that (OP)/(OA) = (1)/(3), (OQ)/(OB) = (1)/(2), (OR)/(OC) = (1)/(3) and (OS)/(AB)= lamda .