Question: Use the Graph of the function f(x) pictured to identify the following (a)lim_(x->-2^(-))f(x)(b)lim_(x->-2^(+))f(x)(c)lim_(x->-2)f(x)(d) f(-2)(e)lim_(x->0^(-))f(x)(f)lim_(x->0^(+))f(x)(g)lim_(x->0)f(x)(h) f(0)(i)lim_(x->2^(-))f(x)(j)lim_(x->2^(+))f(x)(k)lim_(x->2)f(x)(I) f(2)(m)lim_(x->4^(-))f(x)(n)lim_(x->4^(+))f(x)(o)lim_(x->4)f(x)(p) f(4)(q)lim_(x->-infty )f(x)(r)lim_(x->+infty )f(x)(s) Identify the values of x for
Use the Graph of the function f(x) pictured to identify the following (a)\lim_(x->-2^(-))f(x)(b)\lim_(x->-2^(+))f(x)(c)\lim_(x->-2)f(x)(d) f(-2)(e)\lim_(x->0^(-))f(x)(f)\lim_(x->0^(+))f(x)(g)\lim_(x->0)f(x)(h) f(0)(i)\lim_(x->2^(-))f(x)(j)\lim_(x->2^(+))f(x)(k)\lim_(x->2)f(x)(I) f(2)(m)\lim_(x->4^(-))f(x)(n)\lim_(x->4^(+))f(x)(o)\lim_(x->4)f(x)(p) f(4)(q)\lim_(x->-\infty )f(x)(r)\lim_(x->+\infty )f(x)(s) Identify the values of x for which f(x) is not continuous. Classify each as either removable or non-removable. (t) Identify the values of x for which f(x) is not differentiable. Give a reason why f(x) is not differentiable there.
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