If z(x+y) =x^2+y^2, Show that (del z/del x – del z/del y) ^2= 4(1- (del z/del x)-(del z/ del y))
Question
Question
If z(x+y) =x^2+y^2, Show that (del z/del x – del z/del y) ^2= 4(1- (del z/del x)-(del z/ del y))
Total Derivatives Problems
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- If z=f(x, y) where x=r cos(theta) and y=r sin(theta), Show that (del z/del x)^2 + (del z/del y) ^2 = (del z/del r)^2+1/r^2 . (del z/del (theta))^2
- If z = sin (ax+y) + cos (ax-y), Prove that (del)^2 z / del x^2 = a^2 (del)^2 z / del y^2
- If z(x+y) =x^2+y^2, Show that (del z/del x – del z/del y) ^2= 4(1- (del z/del x)-(del z/ del y))