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Let $f ( x , y ) = \frac { x - 1 } { y + 2 }$

Question 92

Multiple Choice

Let $f ( x , y ) = \frac { x - 1 } { y + 2 }$ . Then $f ( x , y + \Delta y ) - f ( x , y )$ is

A) $\frac { ( 1 - x ) \Delta y } { ( y + 2 ) ( y + 2 + \Delta y ) }$
B) $\frac { ( 1 + x ) \Delta y } { ( y + 2 ) ( y + 2 + \Delta y ) }$
C) $\frac { ( 1 - x ) \Delta y } { ( y - 2 ) ( y + 2 + \Delta y ) }$
D) $\frac { ( 1 + x ) \Delta y } { ( y - 2 ) ( y + 2 + \Delta y ) }$
E) $\frac { ( 1 - x ) \Delta y } { ( y + 2 ) ( y + 2 - \Delta y ) }$

Let f(x,y)=x−1y+2f ( x , y ) = \frac { x - 1 } { y + 2 }f(x,y)=y+2x−1​

Multiple Choice

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Let $f ( x , y ) = \frac { x - 1 } { y + 2 }$

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