Statement 1 : f (x) = |x - 3| + |x - 4| + |x - 7| where `4 lt x lt 7` is an identity function.
Statement 2 : `f : A to A ` defined by f (x) = x is an identity function.

If f(x) is an identity function, then f(5) is equal to

Statement-1 : f(x) = x^(7) + x^(6) - x^(5) + 3 is an onto function. and Statement -2 : f(x) is a continuous function.

If f : R rarr R defined by f(x) = (2x-7)/(4) is an invertible function, then f^(-1) =

If function f:RtoR is defined by f(x)=3x-4 then f^(-1)(x) is given by

Show that the function f defined by f(x)=|1-x+x|, where x is any real number, is a continuous function.

Statement-1 : f : R rarr R, f(x) = x^(2) log(|x| + 1) is an into function. and Statement-2 : f(x) = x^(2) log(|x|+1) is a continuous even function.

If f: RvecR be the function defined by f(x)=4x^3+7, show that f is a bijection.

Statement-1 : The function f defined as f(x) = a^(x) satisfies the inequality f(x_(1)) lt f(x_(2)) for x_(1) gt x_(2) when 0 lt a lt 1 . and Statement-2 : The function f defined as f(x) = a^(x) satisfies the inequality f(x_(1)) lt f(x_(2)) for x_(1) lt x_(2) when a gt 1 .

If f: R->R be the function defined by f(x)=4x^3+7, show that f is a bijection.

If f: R->R be the function defined by f(x)=4x^3+7 , show that f is a bijection.