A continuous and differentiable function...

A continuous and differentiable function `y=f(x)` is such that its graph cuts line `y=m x+c` at `n` distinct points. Then the minimum number of points at which `f''(x)=0` is/are (a)`n-1` (b) `n-3` `n-2` (d) cannot say

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A continuous and differentiable function y=f(x) is such that its graph cuts line y=m x+c at n distinct points. Then the minimum number of points at which f(x)=0 is/are (a) n-1 (b) n-3 (c) n-2 (d) cannot say

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A continuous and differentiable function `y=f(x)` is such that its graph cuts line `y=m x+c` at `n` distinct points. Then the minimum number of points at which `f''(x)=0` is/are (a)`n-1` (b) `n-3` `n-2` (d) cannot say

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