y====/y/dx/x/x/x/xx/xx=y

y====/y/dx/x/x/x/xx/xx=y

( x^y )
( x=x^y+x )
[ ^^ ]
( e^y )
Dy/dx = e^y/ ( 1-e ^y ) x=

y=y ( x ) = ( x^2+y^2 ) =x+y-1 , dy/dx를 찾아봅시다

( x2+y2 ) =x+y-1
양쪽 모두 x에서 파생되었습니다 .
( 2x+2=2 ) / ( x2+y2 )
다음과 같이 정렬됩니다 .
( 2x-x2y2 ) / ( x2+y2-2y )
구구구
Dy/dx = ( 2x-x2y2 ) / ( x2 +y2-2y )

y를 y=y+x/y=y/dx라는 방정식으로 결정하고 dy/dx를 찾아봅시다

Lny+y+x/y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+y+yyy+boxy+y+y+y+y+y+y+y+y+yyyyyy+yyy+y+y+y+y+y+y+y+yyyyyyyyyyyyyy+y+zy+y+y+y+y+y+zy+zy+zy+zy+zy+y+y+y+y+zy+zy+y+y+y+zy+zy+y+y+y+y+y+y+y+y+y+y+y+y+y+y+zy+zy+y+zy+zy+cy+zy+zy+zy+zy+zy+boxy=y+y+y+y+
방정식의 양 변은 파생되었습니다 .
Y는 1/y+y+y+x*y+x *y2=y2
( 1/yx/y2 ) y=-1/y
( - ) / ( 1/y-x/y2 ) =-y/ ( y-x )
Dy/dx=y/ ( y-x )

함수 y=mx+ ( 1+x^2 ) 를 보면 , dx/dy

0

y= ( tt2x ) ^ ( x/2 ) =y/dx

0

x=신 ( y/x ) +e^2 dy/dx

( x ) ( y/x ) + ( x ) = dy/dx ( y/x ) + ( y ) IMT2000 3GPP2