05/ a- Use implicit differentiation to find of the following curve at the point (T, dx2 2n). y? = x² + sin xy a5 is zero in two differentiation steps only. f(x, y) = xev²/2. əx²əy3 b- Show that f. ax²əy3 a5 is zero in three differentiation steps only. f(x,y) = y? + c- Show that y(sin x – x*). ду Ans./ a- first make then dx you will need to substitute 2 ax ax dx2 as a3 a b- ax2əy3 EO) then continue %3D %3D ду a? (a ax? \ay dy ay3 ax C- then continue %3D

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Q5/ d2, a- Use implicit differentiation to find of the following curve at the point (T, dx2 2n). y? = x2 + sin xy a5 is zero in two differentiation steps only. f(x, y) = xev²/2. əx²əy3 b- Show that a5 is zero in three differentiation steps only. f(x, y) = y2 + ax2ay3 c- Show that y(sinx – x*). ду d², then Ans./ a- first make ax ду in ax you will need to substitute a5 b- a3 (a? ay a3 then continue %3D (ax дуз a2 a then continue C- əx²əy3 %3D ax2