Let A and B be n-rowed square matrices
STATEMENT - 1 The identity `(x+y)^(2)=x^(2)+2xy+y^(2)` doesn't hold when x and y are substituted by A and B.
and
STATEMENT- 2 : Matrix multiplication is not commutative

STATEMENT -1 : The differential equation (dy)/(dx) = (2xy)/(x^(2) + y^(2)) Can't be solved by the substitution x = vy. and STATEMENT-2 : When the differential equation is homogeneous of first order and first degree, then the substitution that solves the equation is y = vx.

Let A and B be square matrices of the same order. Does (A+B)^2=A^2+2A B+B^2 hold? If not, why?

Let A and B be two square matrices satisfying A+BA^(T)=I and B+AB^(T)=I and O is null matrix then identity the correct statement.

STATEMENT-1 : The line y = (b)/(a)x will not meet the hyperbola (x^(2))/(a^(2)) -(y^(2))/(b^(2)) =1, (a gt b gt 0) . and STATEMENT-2 : The line y = (b)/(a)x is an asymptote to the hyperbola.

Let A and B two symmetric matrices of order 3. Statement 1 : A(BA) and (AB)A are symmetric matrices. Statement 2 : AB is symmetric matrix if matrix multiplication of A with B is commutative.

STATEMENT-1: In square planar complexes , d_(x^(2)-y^(2)) is higher in energy than d_(xy) and STATEMENT-2: Ligands approach along x and y axis in , d_(x^(2)-y^(2)) .

Given the matrices A and B as A=[(1,-1),(4,-1)] and B=[(1,-1),(2,-2)] . The two matrices X and Y are such that XA=B and AY=B , then find the matrix 3(X+Y)

STATEMENT-1 : The area bounded by the region {(x,y) : 0 le y le x^(2) + 1 , 0 le y le x + 1 , 0 le x le 2} is (23)/(9) sq. units and STATEMENT-2 : Required Area is int_(a)^(b) (y_(2) - y_(1)) dx

Solve: y(2xy+1)dx+x(1+2xy+x^2y^2)dy=0

Statement 1 the condition on a and b for which two distinct chords of the ellipse x^(2)/a^(2)+y^(2)/b^(2)=2 passing through (a,-b) are bisected by the line x+y=b is a^(2)+6ab-7b^(2)gt0 . Statement 2 Equation of chord of the ellipse x^(2)/a^(2)+y^(2)/b^(2)=1 whose mid-point (x_1,y_1) is T=S_1