c3-t2-a

# Lim x y 14 π xy 2 sec 2 xy 1 4 π 2 sec 2 π 4 π 2

This preview shows pages 4–5. Sign up to view the full content.

lim ( x , y ) ( 1/4, π ) ( xy 2 sec 2 ( xy )) ( 1 4 )( π ) 2 sec 2 ( π 4 ) π 2 2 (b) Evaluate the limit, if it exists, by converting to polar coordinates. since for a polar squeeze.

This preview has intentionally blurred sections. Sign up to view the full version.

View Full Document
TEST2/MAC2313 Page 5 of 5 ______________________________________________________________________ 9. (10 pts.) (a) Calculate z / x using implicit differentiation when 3 x 2 +4 y 2 + tan( z ) = 12. Leave your answer in terms of x , y , and z . By pretending z is a function of the two independent variables x and y and performing partial differentiations on both sides of the equation above, we have x 3 x 2 4 y 2 tan( z ) [12] x 6 x sec 2 ( z ) z x 0 z x 6 x sec 2 ( z ) provided z is not an odd integer multiple of π /2. (b) Find all second-order partial derivatives for the function f ( x , y )= x 3 y 4 . Label correctly. Since f x ( x , y )=3 x 2 y 4 and f y ( x , y )=4 x 3 y 3 , we have f xx ( x , y )=6 xy 4 , f yy ( x , y )=1 2 x 3 y 2 , and f xy ( x , y )=f yx ( x , y )=1 2 x 2 y 3 . ______________________________________________________________________ 10. (10 pts.) (a) Compute the total differential dz when z = tan -1 ( xy ). dz f x ( x , y ) dx f y ( x , y ) dy y 1 ( xy ) 2 dx x 1 ( xy ) 2 dy . (b) Assume f (1,-2)=4a n d f ( x , y ) is differentiable at (1,-2) with f x (1,-2)=2a n d f y (1,-2) = -3. Obtain an equation for the plane tangent to the graph of f at P (1,-2,4). z f (1, 2) f x (1, 2)( x 1) f y (1, 2)( y ( 2)) 4 2( x 1) 3( y 2) ______________________________________________________________________ Silly 10 Point Bonus: (a) State the definition of differentiability for a function of two variables. [You may either state the definition found in the text or the one given by the instructor in class.] (b) Then using only the definition you stated, show the function f ( x , y )
This is the end of the preview. Sign up to access the rest of the document.

{[ snackBarMessage ]}

### Page4 / 5

lim x y 14 π xy 2 sec 2 xy 1 4 π 2 sec 2 π 4 π 2 2 b

This preview shows document pages 4 - 5. Sign up to view the full document.

View Full Document
Ask a homework question - tutors are online