If `V_1` and `V_2` are subspace of `R^4` given by
`V_1={(a,b,c,d):b-2c+d=0}`
`V_2={(a,b,c,d):a=d,b=2c}`

Find the values of a,b,c and d, if 3[{:(a,b),(c,d):}]=[{:(a,6),(-1,2d):}]+[{:(4,a+b),(c+d,3):}] .

If a-b:b-c:c-d=1:2:3 then (a+d):c=

V_1, V_2, V_3 and V_4 are the volumes of four cubes of side lengths x c m , 2x c m , 3x c m and 4x c m respectively. Some statements regarding these volumes are given below V_1+V_2+2V_3

a, b are the real roots of x2+ px +1-0 and c, d are the real roots of 2 x + qx + 1 = 0 then (a-c)(h-c)(a + d)(b + d) is divisible by n) a+b+c+d (b) a +b-c-d (d) a -b-c-d (c) a-b+c-d

Let R_1={(a,b)inRtimesR:a^2+b^2=1} "and" R_2={(a,b)R(c,d) such that a+d=b+c } are two relations then

Let vec a,vec b, and vec c be non-zero vectors and vec V_(1)=vec a xx(vec b xxvec c) and vec V_(2)(vec a xxvec b)xxvec c . Vectors vec V_(1)andvec V_(2) are equal.Then vec a an vec b are orthogonal b.vec a and vec c are collinear c.vec b and vec c are orthogonal d.vec b=lambda(vec a xxvec c) when lambda is a scalar

Let a, b, c and d be non-zero numbers. If the point of intersection of the lines 4a x+""2a y+c=""0 and 5b x+""2b y+d=""0 lies in the fourth quadrant and is equidistant from the two axes then (1) 2b c-3a d=""0 (2) 2b c+""3a d=""0 (3) 3b c-2a d=""0 (4) 3b c+""2a d=""0