Let `f: R-{-4/3}->R`be a function as `f(x)=(4x)/(3x+4)`. The inverse of f is map, `g:" Range "f->R-{-4/3}`given by.(a) `g(y)=(3y)/(3-4y)` (b) `g(y)=(4y)/(4-3y)`(c) `g(y)=(4y)/(3-4y)` (d) `g(y)=(3y)/(4-3y)`

Let f:R->R be a function such that f((x+y)/3)=(f(x)+f(y))/3 ,f(0) = 0 and f'(0)=3 ,then

Let f:R->R be a function such that f((x+y)/3)=(f(x)+f(y))/3 ,f(0) = 0 and f'(0)=3 ,then

Let f"":""NvecY be a function defined as f""(x)""=""4x""+""3 , where Y""=""{y in N"":""y""=""4x""+""3 for some x in N} . Show that f is invertible and its inverse is (1) g(y)=(3y+4)/3 (2) g(y)=4+(y+3)/4 (3) g(y)=(y+3)/4 (4) g(y)=(y-3)/4

Let f"":""NvecY be a function defined as f""(x)""=""4x""+""3 , where Y""=""{y in N"":""y""=""4x""+""3 for some x in N} . Show that f is invertible and its inverse is (1) g(y)=(3y+4)/3 (2) g(y)=4+(y+3)/4 (3) g(y)=(y+3)/4 (4) g(y)=(y-3)/4

Evaluate : (i) (2x + 3y) ( 3x +4y)

1/(3x+y)+1/(3x-y)=3/4 and 1/(3x+y)-1/(3x-y)= -1/4

Solve : {:((34)/(3x+4y)+(15)/(3x-2y)=5),((25)/(3x-2y)-(8.50)/(3x+4y)=4.5):}

If y=f(x)=(5x+3)/(4x-5) , then show that f(y)=x.

Multiply (4x+(3y)/5)a n d\ (3x-(4y)/5)

consider the function f(X) = 3x^(4)+4x^(3)-12x^(2) The range of the function y=f(x) is