(14)

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Step 1:

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The function is $\"\"$ .

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Definition of continuity :

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A function $\"\"$ is continuous at $\"\"$ , if $\"\"$ then it should satisfy three conditions :

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(1) $\"\"$ is defined.

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(2) $\"\"$ exists.

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(3) $\"\"$ .

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Condition (1): $\"\"$ is defined.

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If $\"\"$ then $\"\"$ .

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Substitute $\"\"$ in above function.

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$\"\"$

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$\"\"$ .

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$\"\"$ is defined.

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Step 2:

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Condition (2): $\"\"$ exists.

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$\"\"$

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$\"\"$ .

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$\"\"$ exists.

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Step 3:

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Condition (3): $\"\"$ .

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$\"\"$ and $\"\"$ .

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$\"\"$ .

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The three conditions of continuity are satisfied, hence the function is continuous.

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The function $\"\"$ is continuous at $\"\"$ .

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(15)

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Step 1:

\

The function is $\"\"$ .

\

Definition of continuity :

\

A function $\"\"$ is continuous at $\"\"$ , if $\"\"$ then it should satisfy three conditions :

\

(1) $\"\"$ is defined.

\

(2) $\"\"$ exists.

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(3) $\"\"$ .

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Condition (1): $\"\"$ is defined.

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If $\"\"$ then $\"\"$ .

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Substitute $\"\"$ in above function.

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$\"\"$

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$\"\"$ .

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$\"\"$ is defined.

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Step 2:

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Step 2:

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Condition (2): $\"\"$ exists.

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Left hand limit :

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If $\"\"$ then $\"\"$ .

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$\"\"$

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$\"\"$ .

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Right hand limit :

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If $\"\"$ then $\"\"$ .

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$\"\"$

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$\"\"$ .

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Left hand limit and right hand limit are not equal, limit does not exist.

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$\"\"$ does not exists.

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Here limit does not exist at $\"\"$

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The three conditions of continuity are not satisfied, hence the function is discontinuous.

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The function $\"\"$ is discontinuous at $\"\"$ .

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Solution :

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The function $\"\"$ is continuous at $\"\"$ .

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The function $\"\"$ is discontinuous at $\"\"$ .