Let f:R-> R and g:R-> R be respectively...

Let `f:R-> R and g:R-> R` be respectively given by `f(x) = |x| +1 and g(x) = x^2 + 1`. Define `h:R-> R` by `h(x)={max{f(x), g(x)}, if xleq 0 and min{f(x), g(x)}, if x > 0`.The number of points at which `h(x)` is not differentiable is

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Let f: R to R and g:R to R be respectively given by f(x) =|x|+1 and g(x) =x^(2)+1) . Define h: R to R by h(x) ={{:( max{f(x) , g(x) },if xle0),(min{f(x) ,g(x) },if x gt 0):} then number of point at which h(x) is not differentiable is

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Let `f:R-> R and g:R-> R` be respectively given by `f(x) = |x| +1 and g(x) = x^2 + 1`. Define `h:R-> R` by `h(x)={max{f(x), g(x)}, if xleq 0 and min{f(x), g(x)}, if x > 0`.The number of points at which `h(x)` is not differentiable is

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