Question: Let f(x) = mr+b, where m and b are constants and m # 0. Prove that the function g(x) = f() + 5 is injective

Let f(x) = mr+b, where m and b are constants and
m # 0. Prove that the function g(x) = f() + 5

Let f(x) = mr+b, where m and b are constants and m # 0. Prove that the function g(x) = f() + 5 is injective on its domain. f(x) - 3

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