Prove that the relation R in Z of intege...

Prove that the relation R in Z of integers given by: `R = {(x, y): x - y` is an integer } is an equivalence relation. [3] If `f: RrarrR` defined by `f(x) = (3- 2x)/4` is an invertible function, find `f^-1`.

Similar Questions

Explore conceptually related problems

Prove that the relation R in Z of integers given by: R = {(x, y): 2x - 2y is an integer } is an equivalence relation. [3] If f: RrarrR defined by f(x) = (4- 3x)/5 is an invertible function, find f^-1 .

Prove that the relation R in Z of integers given by: R = {(x, y): 3x - 3y is an integer } is an equivalence relation. [3] If f: RrarrR defined by f(x) = (6- 5x)/7 is an invertible function, find f^-1 .

If f: R rarr R defined by f(x) = (3x+5)/2 is an invertible function, find f^-1

If: f : R rarr R defined by f(x)= (2x+3)/4 is an invertible function, find f^(-1)

If f :Rrarr R defined by f(x)= (5x+6)/7 is an invertible function, find f^(-1) .

If f : R rarr R defined by : f(x) = frac {3-2x}{4} is an inversible function, find f^-1 .

If f : R rarr R defined by : f(x) = frac {4-3x}{5} is an inversible function, find f^-1 .

Prove that the relation R in Z of integers given by: `R = {(x, y): x - y` is an integer } is an equivalence relation. [3] If `f: RrarrR` defined by `f(x) = (3- 2x)/4` is an invertible function, find `f^-1`.

Similar Questions

Recommended Questions