問題 4. 曲線 C dy dx=3-2t=0 £²1 to ² t= 2-2t =0 $4 t = 1 dt dix at X = 0 O + + OT dt y (x, y) (0,0) x = 3t-t² y = 2tt² 0 J m + 27 2 1↓ 0 0≦t≦2の部分と軸で囲まれた部分の面積Sを求めよ. of S = √²+ Y₁ dx = y₂dz 3 — î 3 [↓] 4 ((-4,-²)/ 1 2 2 O YA g₁ =量のときのyy 量もののりをりとおく = -√² (et-t² (3-2 t)dt-√²2² (at-t²³) (3-e tidt = ["²(et-t²) (3-et) dt = [ (2+² - 7+²+ 6t) dt O oft 60 56 = [1 +*_ _Zt²+3+²]* = 8-²/3 + 12 = 40 + 6 = 4 =[ビー子ピナピ]=8-5+1 56 3