Q.3 Let the functions f:R R and g: R→ R be defined by f(x) = ex-1 - e-lx-1| and g(x) = (e*-1 + e1-*). Then the area of the region in the first quadrant bounded by the curves y = f(x), y = g(x) and x = 0 is (A) (2– V3) +(e - e-1) (B) (2+ v3) +(e - e-!) (C) (2- V3) +(e + e-!) (D) (2+ v3) +(e + e-1)

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Q.3 Let the functions f:R R and g: R→ R be defined by f(x) = ex-1 – e-lx-1| and g(x) = ÷(e*-1 + e1-*). Then the area of the region in the first quadrant bounded by the curves y = f(x), y = g(x) and x = 0 is (A) (2 - v3) +(e - e-t) (B) (2+ v3) +(e - e-!) (C) (2– V3) +(e+ e-1) (D) (2+ v3) +(e + e-1)