Prove or disprove the following statements:
(a) There exists a monotone function f:[0,1]→[0,1] such that for each y∈[0,1] the equation f(x)=y has uncountably many solutions x.
(b) There exists a continuously differentiable function f:[0,1]→[0,1] such that for each y∈[0,1] the equation f(x)=y has uncountably many solutions x. functionreal analysisreal analysis solved