For each of the functions find the f (x)...

For each of the functions find the `f _(x), f _(y),` and show that `f _(xy) = f _(yx).`
`f (x,y) = tan ^(-1)"" ((x)/(y))`

DIFFERENTIALS AND PARTIAL DERIVATIVES
FULL MARKS|Exercise EXERCISE - 8.5|5 Videos
DIFFERENTIALS AND PARTIAL DERIVATIVES
FULL MARKS|Exercise EXERCISE - 8.6|8 Videos
DIFFERENTIALS AND PARTIAL DERIVATIVES
FULL MARKS|Exercise EXERCISE - 8.3|7 Videos
COMPLEX NUMBERS
FULL MARKS|Exercise EXERCISE - 2.9|25 Videos
DISCRETE MATHEMATICS
FULL MARKS|Exercise Additional Question Solved|20 Videos

Similar Questions

Explore conceptually related problems

For each of the functions find the f _(x), f _(y), and show that f _(xy) = f _(yx). f (x,y) = cos (x ^(2) - 3xy )

For each of the functions find the f _(x), f _(y), and show that f _(xy) = f _(yx). f (x,y) = (3x)/( y + sin x)

If f(x,y,z) = sin (xy) + cos(xz) , then f_("xx") is

If a function f: R ->R be such that f(x-f(y)) = f(f(y) )+xf(y)+f(x) -1 AA x , y in R then f(2)=

If f (x/y)= f(x)/f(y) , AA y, f (y)!=0 and f' (1) = 2 , find f(x) .

If for a function f : R to R f (x +y ) =F(x ) + f(y) for all x and y then f(0) is

A function f: R -> R satisfy the equation f (x)f(y) - f (xy)= x+y for all x, y in R and f(y) > 0 , then

If f (x,y) =e ^(2x+3y) find 3f_(x) (0,0) - 2f_(y) (0,0):

If f is a function satisfying f (x +y) = f(x) f(y) for all x, y in N such that f(1) = 3 and sum _(x=1)^nf(x)=120 , find the value of n.