Question: Show that the two formulas are equivalent. sec(x) dx = In(|sec(x) + tan(x)|) + C sec(x) dx = -In(|sec(x) - tan(x)|) + C -Select--- V

Show that the two formulas are equivalent. sec(x) dx = In(|sec(x)

+ tan(x)|) + C sec(x) dx = -In(|sec(x) - tan(x)|) + C

Show that the two formulas are equivalent. sec(x) dx = In(|sec(x) + tan(x)|) + C sec(x) dx = -In(|sec(x) - tan(x)|) + C -Select--- V (sec ( x ) - tan ( x ) ) In(| sec(x) + tan(x)|) + C = In + C -Select--- -Select--- --Select--- = In + C -Select--- V 1 = In + C -Select--- Y = -In(|sec(x) - tan(x) |) + C

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