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))`.

In case of D_(x^(2)-y^(2) orbital :

If y= sin x+cos x then (d^(2)y)/(dx^(2)) is :-

If y=(log x)/(x) then (d^(2)y)/(dx^(2))=

STATEMENT-1 : Solution of the differential equation xdy-y dx = y dy is ye^(x//y) = c . and STATEMENT-2 : Given differential equation can be re-written as d((x)/(y)) = -(dy)/(y) .

y=x*cos x then find (d^2y)/(dx^(2)) .

If y=x^x , find (d^2y)/(dx^2) .

STATEMENT-1 : y = e^(x) is a particular solution of (dy)/(dx) = y . STATEMENT-2 : The differential equation representing family of curve y = a cos omega t + b sin omega t , where a and b are parameters, is (d^(2)y)/(dt^(2)) - omega^(2) y = 0 . STATEMENT-3 : y = (1)/(2)x^(3)+c_(1)x+c_(2) is a general solution of (d^(2)y)/(dx^(2)) = 3x .

Statement-1: H_(2)O_(2) is more polar than H_(2)O Statement-2: D_(2)O has higher boiling point than H_(2)O Statement-3: H_(2) bond bond energy is less than D_(2) .

y= "tan"^(-1)x then find (d^2y)/(dx^(2)) .

If x=at^2,y=2 at then find (d^2y)/(dx^2) .