Question: Let f be defined by S1 + mx if xs1 14 - mx if x > 1 f(x) where m is a constant. (A) Graph

Let f be defined by

S1 + mx if xs1 14 - mx if x > 1

S1 + mx if xs1 14 - mx if x > 1 f(x) where m is a constant. (A) Graph f for m = 1, and find lim f(x) and lim f(x) (B) Graph f for m 2, and find lim f(x) lim f(x) and (C) Find m so that lim f(x) = lim f(x) and graph f for this value of m. (D) Write a brief verbal description of each graph. How does the graph in part (C) differ from the graphs in parts (A) and (B)?

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