In Boolena algebra `bar1+ bar1` equals

In the Boolean algebra bar(A).bar(B) equals

If A = 1 and B = 0, then in terms of Boolean algebra , A + bar(B) = .

Let bar a,bar b,bar c be three non-coplanar vectors and bar d be a non-zero vector, which is perpendicularto bar a+bar b+bar c . Now, if bar d= (sin x)(bar a xx bar b) + (cos y)(bar b xx bar c) + 2(bar c xx bar a) then minimum value of x^2+y^2 is equal to

An iron bar ( L_(1) = 0.1 m, A_(1) = 0.02 m^(2) , K_(1) = 79 Wm^(-1) K^(-1) ) and a brass bar (L_(2)=0.1 m , A_(2) = 0.02 m^(2), K_(2) = 109 Wm^(-1)K^(-1) ) are soldered end to end as shown in fig. the free ends of iron bar and brass bar are maintained at 373 K and 273 K respectively. Obtain expressions for and hence compute (i) the temperature of the junction of the two bars, (ii) the equivalent thermal conductivity of the compound bar and (iii) the heat current through the compound bar. .

An iron bar ( L_(1) = 0.1 m, A_(1) = 0.02 m^(2) , K_(1) = 79 Wm^(-1) K^(-1) ) and a brass bar (L_(2)=0.1 m , A_(2) = 0.02 m^(2), K_(2) = 109 Wm^(-1)K^(-1) ) are soldered end to end as shown in fig. the free ends of iron bar and brass bar are maintained at 373 K and 273 K respectively. Obtain expressions for and hence compute (i) the temperature of the junction of the two bars, (ii) the equivalent thermal conductivity of the compound bar and (iii) the heat current through the compound bar. .

Given four non zero vectors bar a,bar b,bar c and bar d . The vectors bar a,bar b and bar c are coplanar but not collinear pair by pairand vector bar d is not coplanar with vectors bar a,bar b and bar c and hat (bar a bar b) = hat (bar b bar c) = pi/3,(bar d bar b)=beta ,If (bar d bar c)=cos^-1(mcos beta+ncos alpha) then m-n is :

Let vec a be vector parallel to line of intersection of planes P_1 and P_2 through origin. If P_1 is parallel to the vectors 2 bar j + 3 bar k and 4 bar j - 3 bar k and P_2 is parallel to bar j - bar k and 3 bar I + 3 bar j , then the angle between vec a and 2 bar i +bar j - 2 bar k is :

let baru and barv be unit vectors. If bar omega is a vector such that bar omega+(bar omega times bar u)=barv . Then prove that the maximum volume of the parallelepiped formed by baru,barv and bar omega is 1//2 .

ABCD is parallelogram. If L and M are the middle points of BC and CD, then bar(AL)+bar(AM) equals