If `[(lambda^(2)-2lambda+1,lambda-2),(1-lambda^(2)+3lambda,1-lambda^(2))]=Alambda^(2)+Blambda+C`, where A, B and C are matrices then find matrices B a

`vecr=(lambda-mu)hati+(1-mu)hatj+(2lambda+3mu)hatk` `rArr vecr= hatj+lambda(hati+2hatk)+mu(-hati-hatj+3hatk)` Comparing with equation `vecr = veca+lambdavecb+muvecc` `veca = hatj, vecb=hati+2hatk` and `vecc = -hati+hatj+3hatk` `:. vecn=vecbxxvecc=|{:(hati,hatj,hatk),(1,0,2),(-1,-1,3):}|` `= hati(0+2)-hatj(3+2)hatk(-1-0)` `=2hati-5hatj-hatk` Equation of plane in scalar product form...

Correct Answer - `35/6`

Correct Answer - A Given equation of family of lines is `(2x+y-3)+lambda(x+2y-3) =0, lambda in R.` The family of lines is concurrent at point of intersection of 2x+y-3 = 0 and...

Here a is non singular but b is singular hence only `A^(-1)` exists Now `XA=B` or `X=BA^(-1)` (1) And `AY=B` or `Y=A^(-1)B` (2) Also `A^(-1)=1/3 [(-1,1),(-4,1)]` `implies X=BA^(-1)=1/3 [(1,-1),(2,-2)][(-1,1),(-4,1)]=[(1,0),(2,0)]` `implies...

Correct Answer - A::D `(B^(T)AB)^(T)=B^(T)A^(T) (B^(T))^(T)=B^(T)A^(T)B=B^(T)AB` if `A` is symmetric. Therefore, `B^(T)AB` is symmetric if A is symmetric. Also, `(B^(T)AB)^(T)=B^(T)A^(T)B=B^(T) (-A) B=-(B^(T)A^(T)B)` Therefore, `B^(T) AB` if A is skew-symmetric if A...

Correct Answer - C `(A(BA))^(T)=(BA)^(T) A^(T)` `=(A^(T) B^(T)).A^(T)` `=(AB) A` `=A(BA)` Similarly `((AB)A)^(T)=(AB)A` Clearly both statements are true but statement 2 is not a correct explanation of statement 1.

Correct Answer - C `(c )` Roots of `4x^(2)-x-1=0` are irrational. So, one root common implies both roots are common. `:. (4)/(3)=(-1)/(lambda+mu)=(-1)/(lambda-mu)=(-2)/(2lambda)=(0)/(2mu)` So, `lambda=(-3)/(4)`, `mu=0`

Correct Answer - D `(d)` `|{:(lambda-1,3lamda+1,2lambda),(lambda-1,4lambda-2,lambda+3),(2,3lambda+1,3(lambda-1)):}|=0` `implieslambda=0` or `3` If `lambda=0`, the equations become `-x+y=0`, `-x-2y+3z=0` and `2x+y-3z=0`, `:. (x)/(6-3)=(y)/(6-3)=(z)/(-1+4)`

Correct Answer - `[1.25 lambda, 4 lambda]`

Correct Answer - [38]