Limits & Continuity

MAYURBHANJ SCHOOL OF ENGINEERING

By

ABHILASH MOHANTY

Limits for Functions of One Variable.

What do we mean when we say that

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Informally, we might say that as x gets “closer and closer” to a, f(x) should get “closer and closer” to L.

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This informal explanation served pretty well in beginning calculus, but in order to extend the idea to functions of several variables, we have to be a bit more precise.

Defining the Limit

a

L

Means that

• given any tolerance T for L
• we can find a tolerance t for a

such that

• if x is between a-t and a+t, but x is not a,
• f(x) will be between L-T and L+T.

L+T

L-T

a+t

a-t

(Graphically, this means that the part of the graph that lies in the yellow vertical strip---that is, those values that come from (a-t,a+t)--- will also lie in the orange horizontal strip.)

Remember: the pt. (a,f(a)) is excluded!

This isn’t True for This function!

a

L

L+T

L-T

No amount of making the Tolerance around a smaller is going to force the graph of that part of the function within the bright orange strip!

Changing the value of L doesn’t help either!�

a

L

L+T

L-T

Functions of Two Variables

How does this extend to functions of two variables?

We can start with informal language as before:

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means that as (x,y) gets “closer and closer” to (a,b) , f(x,y) gets closer and closer to L.

“Closer and Closer”

• The words “closer and closer” obviously have to do with measuring distance.
• In the real numbers, one number is “close” to another if it is within a certain tolerance---say no bigger than a+.01 and no smaller than a-.01.
• In the plane, one point is “close” to another if it is within a certain fixed distance---a radius!

r

What about those strips?

The vertical strip becomes a cylinder!

Horizontal Strip?

L

L+T

L-T

The horizontal strip becomes a “sandwich”!

Remember that the function values are back in the real numbers, so “closeness” is once again measured in terms of “tolerance.”

The set of all z-values that lie between L-T and L+T, are “trapped” between the two horizontal planes z=L-T and z=L+T

L lies on the z-axis.

We are interested in function values that lie between z=L-T and z=L+T

Putting it All Together

The part of the graph that lies above the green circle must also lie between the two horizontal planes.

Defining the Limit

Means that

• given any tolerance T for L
• we can find a radius r about (a,b)

such that

• if (x,y) lies within a distance r from (a,b), with (x,y) different from (a,b) ,
• f(x,y) will be between L-T and L+T.

Once again, the pt. ((a,b), f(a,b)) can be anywhere (or nowhere) !