Differentiability In Exercises 35-38, show that: the function is differentiable by finding values ε 1 and ε 2 as designated in the definition of differentiability, and verify that both ε 1 , and ε 2 approach 0 as ( Δ x , Δ y ) → ( 0 , 0 ) . f ( x , y ) = 5 x − 10 y + y 3
Solution Summary: The author explains the function f(x,y)=5x-10y+y
Differentiability In Exercises 35-38, show that: the function is differentiable by finding values
ε
1
and
ε
2
as designated in the definition of differentiability, and verify that both
ε
1
, and
ε
2
approach 0 as
(
Δ
x
,
Δ
y
)
→
(
0
,
0
)
.
f
(
x
,
y
)
=
5
x
−
10
y
+
y
3
With integration, one of the major concepts of calculus. Differentiation is the derivative or rate of change of a function with respect to the independent variable.
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