Determine `3B+4C-D` if `B, C` and D are given by
`B=((2,3,0),(1,-1,5)), C=((-1,-2,3),(-1,0,2)), D=((0,4,-1),(5,6,-5))`

Verify the property A(B+C) = AB+AC, when the matrices A,B, and C are given by A=[(2,0,-3),(1,4,5)],B=[(3,1),(-1,0),(4,2)],and C=[(4,7),(2,1),(1,-1)] .

Determine whether the given points are collinear. A (0, 2) , B(1, -0.5), C(2,-3)

find the projection of bar(AB) on bar(CD) where A,B,C,D are the points (4,-3,0),(7,-5,-1),(-2,1,3)(0,2,5) .

Find matrix C if A =[{:(3,7),(2,5):}] , B =[{:(-3,2),(4,-1):}] and 5C+ 2B =A

Find the value of a, b, c, d from the equation ((a-b,2a+c),(2a-b,3c+d))=((1,5),(0,2))

Let A=[(1, 2), (1, 3)], B=[(4, 0), (1, 5)], C=[(2, 0), (1, 2)] show that (A-B)C=AC-BC

One of the diagonals of a square is the portion of the line x/2+y/3=2 intercepted between the axes. Then the extremities of the other diagonal are: (a) (5,5),(-1,1) (b) (0,0),(4,6) (c) (0,0),(-1,1) (d) (5,5),4,6)