`omega` is the cube root of 1 and `omega ne 1`. Now `r_(1), r_(2)` and `r_(3)` are the number obtained while tossing dice thrice. Then ………… is the probability for `omega^(r^(1)) +omega^(r^(2))+omega^(r^(3))=0`

If omega(ne 1) be a cube root of unity and (1+omega)^(7)=A+Bomega , then A and B are respectively the numbers.

The equivalent resistance between the point P and Q in the network given here is equal to (given r = (3)/(2) Omega)

Six resistances each of v ale r= 6Omega are connected between points A,B and C as shown in the figure if R_(1),R_(2) and R_(3) are the net resistances between A and B, between B and C and between A and C respectively, the R_(1):R_(2):R_(3) will be equal to

A resistor of R = 6 Omega , an inductor of L=1 H and C = 17.36 muF are connected in series with an A.C. source. Find the Q-factor.

Let omega be the complex number cos((2pi)/3)+isin((2pi)/3) . Then the number of distinct complex numbers z satisfying Delta=|(z+1,omega,omega^2),(omega,z+omega^2,1),(omega^2,1,z+omega)|=0 is

If a,b,c are distinct integers and omega(ne 1) is a cube root of unity, then the minimum value of |a+bomega+comega^(2)|+|a+bomega^(2)+comega| is

If omega is a non-real complex cube root of unity, find the values of (1+omega)(1+omega^(2) )(1+omega^(4))(1+omega^(8)) ...upto 2n factors

If 1,omega,omega^(2),...omega^(n-1) are n, nth roots of unity, find the value of (9-omega)(9-omega^(2))...(9-omega^(n-1)).

(a) Given n resistores each of resistance R. how will you combine them to get the (i) maximum (ii) minimum effective resistance? (b) Given the resistances of 1 Omega, 2 Omega, 3 Omega. how will be combine them to get an equivalent resistance of (i) (11//3) Omega (ii) (11//5) Omega, (iii) 6 Omega, (iv) (6//11) Omega ? (c ) Determine the equivalent resistance of networks shown in

Differentiate the following w.r.t.x